contestId int64 0 1.01k | index stringclasses 57 values | name stringlengths 2 58 | type stringclasses 2 values | rating int64 0 3.5k | tags listlengths 0 11 | title stringclasses 522 values | time-limit stringclasses 8 values | memory-limit stringclasses 8 values | problem-description stringlengths 0 7.15k | input-specification stringlengths 0 2.05k | output-specification stringlengths 0 1.5k | demo-input listlengths 0 7 | demo-output listlengths 0 7 | note stringlengths 0 5.24k | points float64 0 425k | test_cases listlengths 0 402 | creationTimeSeconds int64 1.37B 1.7B | relativeTimeSeconds int64 8 2.15B | programmingLanguage stringclasses 3 values | verdict stringclasses 14 values | testset stringclasses 12 values | passedTestCount int64 0 1k | timeConsumedMillis int64 0 15k | memoryConsumedBytes int64 0 805M | code stringlengths 3 65.5k | prompt stringlengths 262 8.2k | response stringlengths 17 65.5k | score float64 -1 3.99 |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
3 | D | Least Cost Bracket Sequence | PROGRAMMING | 2,600 | [
"greedy"
] | D. Least Cost Bracket Sequence | 1 | 64 | This is yet another problem on regular bracket sequences.
A bracket sequence is called regular, if by inserting "+" and "1" into it we get a correct mathematical expression. For example, sequences "(())()", "()" and "(()(()))" are regular, while ")(", "(()" and "(()))(" are not. You have a pattern of a bracket sequence that consists of characters "(", ")" and "?". You have to replace each character "?" with a bracket so, that you get a regular bracket sequence.
For each character "?" the cost of its replacement with "(" and ")" is given. Among all the possible variants your should choose the cheapest. | The first line contains a non-empty pattern of even length, consisting of characters "(", ")" and "?". Its length doesn't exceed 5·104. Then there follow *m* lines, where *m* is the number of characters "?" in the pattern. Each line contains two integer numbers *a**i* and *b**i* (1<=≤<=*a**i*,<=<=*b**i*<=≤<=106), where *a**i* is the cost of replacing the *i*-th character "?" with an opening bracket, and *b**i* — with a closing one. | Print the cost of the optimal regular bracket sequence in the first line, and the required sequence in the second.
Print -1, if there is no answer. If the answer is not unique, print any of them. | [
"(??)\n1 2\n2 8\n"
] | [
"4\n()()\n"
] | none | 0 | [
{
"input": "(??)\n1 2\n2 8",
"output": "4\n()()"
},
{
"input": "??\n1 1\n1 1",
"output": "2\n()"
},
{
"input": "(???\n1 1\n1 1\n1 1",
"output": "3\n(())"
},
{
"input": "(??)\n2 1\n1 1",
"output": "2\n()()"
},
{
"input": "(???)?\n3 3\n3 1\n3 3\n2 3",
"output": "10\n(()())"
},
{
"input": "((????\n3 2\n3 2\n1 1\n2 3",
"output": "8\n(())()"
},
{
"input": "???())\n2 4\n3 3\n4 1",
"output": "6\n(()())"
},
{
"input": "((????\n3 5\n4 1\n2 2\n1 5",
"output": "11\n((()))"
},
{
"input": "?(?)(???\n2 3\n2 2\n3 2\n3 1\n3 1",
"output": "8\n((()()))"
},
{
"input": "(??????)\n1 1\n3 3\n3 3\n3 2\n1 3\n3 3",
"output": "13\n((())())"
},
{
"input": "?????)??\n2 3\n2 1\n1 3\n5 1\n3 3\n1 3\n3 2",
"output": "11\n()()()()"
},
{
"input": "?)???(??\n1 4\n3 4\n2 4\n2 5\n3 3\n3 1",
"output": "14\n()()(())"
},
{
"input": "???(??))\n2 1\n2 1\n2 1\n1 2\n2 1",
"output": "7\n(()(()))"
},
{
"input": "??(()??)\n3 2\n3 3\n1 3\n2 2",
"output": "9\n()(()())"
},
{
"input": "????(???\n2 2\n1 3\n1 3\n3 3\n4 1\n4 4\n2 4",
"output": "16\n((()()))"
},
{
"input": "?(??????\n1 5\n2 4\n4 4\n4 3\n4 5\n5 4\n2 3",
"output": "21\n((())())"
},
{
"input": "???????)\n6 3\n5 3\n4 1\n1 4\n4 1\n2 6\n4 3",
"output": "19\n(()()())"
},
{
"input": "??????)?\n2 2\n4 2\n3 5\n3 2\n7 4\n6 2\n1 6",
"output": "24\n(((())))"
},
{
"input": "?((?)?)?\n1 2\n4 2\n1 3\n1 2",
"output": "6\n((())())"
},
{
"input": "??(????)\n3 2\n1 4\n4 4\n2 3\n2 3\n2 4",
"output": "16\n((()))()"
},
{
"input": "???(?)??(??)?)(?(?????????(?()????)(????(?)????)???)??))(?(?????????))???(??)?????))???????(????????\n9 10\n6 3\n8 2\n9 10\n9 3\n6 2\n8 5\n6 7\n2 6\n7 8\n6 10\n1 7\n1 7\n10 7\n10 7\n8 4\n5 9\n9 3\n3 10\n1 10\n8 2\n8 8\n4 8\n6 6\n4 10\n4 5\n5 2\n5 6\n7 7\n7 3\n10 1\n1 4\n5 10\n3 2\n2 8\n8 9\n6 5\n8 6\n3 4\n8 6\n8 5\n7 7\n10 9\n5 5\n2 1\n2 7\n2 3\n5 10\n9 7\n1 9\n10 9\n4 5\n8 2\n2 5\n6 7\n3 6\n4 2\n2 5\n3 9\n4 4\n6 3\n4 9\n3 1\n5 7\n8 7\n6 9\n5 3\n6 4\n8 3\n5 8\n8 4\n7 6\n1 4",
"output": "309\n(()(()))()()()(((((()))()(((())((()((()((()))(())(()))))((())))))((()))()(())((()())())()()(()))()))"
},
{
"input": "(?(((???))(??)?)?))))(?)????(()()???(?)????(??(??????)()(????(?)))))??(???(??)?(??)????????(????(?()\n39 78\n1 83\n2 35\n28 89\n53 53\n96 67\n16 46\n43 28\n25 73\n8 97\n57 41\n15 25\n47 49\n23 18\n97 77\n38 33\n68 80\n38 98\n62 8\n61 79\n84 50\n71 48\n12 16\n97 95\n16 70\n72 58\n55 85\n88 42\n49 56\n39 63\n51 100\n41 15\n97 17\n71 63\n21 44\n1 41\n22 14\n42 65\n88 33\n57 95\n57 28\n59 8\n56 42\n18 99\n43 6\n75 93\n34 23\n62 57\n62 71\n67 92\n91 60\n49 58\n97 14\n75 68\n20 9\n55 98\n12 3",
"output": "2140\n(((((((())(())())))))(()()(((()())))(()()()()(((()()()()((())())))))((()()(()))()())())(()(())))()()"
},
{
"input": "(())()",
"output": "0\n(())()"
},
{
"input": "?(?(??\n1 1\n2 2\n1 1\n1 1",
"output": "5\n(()())"
},
{
"input": "(????(\n1 1\n2 1\n2 1\n3 3",
"output": "-1"
},
{
"input": "(?(???\n2 3\n1 1\n3 3\n1 4",
"output": "10\n((()))"
},
{
"input": "))))))",
"output": "-1"
},
{
"input": ")?)??)\n4 4\n3 5\n3 6",
"output": "-1"
},
{
"input": "((((((",
"output": "-1"
},
{
"input": "((((((",
"output": "-1"
},
{
"input": "()()()",
"output": "0\n()()()"
},
{
"input": "????((\n7 6\n1 10\n9 8\n4 4",
"output": "-1"
},
{
"input": "))))))",
"output": "-1"
},
{
"input": "))))))",
"output": "-1"
},
{
"input": "((((((",
"output": "-1"
},
{
"input": "((()))",
"output": "0\n((()))"
},
{
"input": "?))?))\n9 13\n8 11",
"output": "-1"
},
{
"input": "))))))",
"output": "-1"
},
{
"input": "?(?)?)\n6 14\n8 6\n4 3",
"output": "16\n(())()"
},
{
"input": "?(?(((\n8 7\n17 15",
"output": "-1"
},
{
"input": "))))))",
"output": "-1"
}
] | 1,639,731,805 | 2,147,483,647 | PyPy 3 | OK | TESTS | 80 | 996 | 10,342,400 | import heapq as hq
s = list(input().strip())
n = len(s)
buc = [0]*n
count = 0
for i in range(n):
if s[i] == '?':
buc[i] = count
count += 1
a = [0]*count
b = [0]*count
cur = 0
ans = 0
queue = []
flag = True
if count:
for i in range(count):
a[i], b[i] = map(int, input().split())
for i in range(n):
if s[i] == '(':
cur += 1
elif s[i] == ')':
cur -= 1
else:
ans += b[buc[i]]
s[i] = ')'
cur -= 1
hq.heappush(queue, (a[buc[i]]-b[buc[i]], i))
if cur < 0:
if queue:
p = hq.heappop(queue)
ans += p[0]
s[p[1]] = '('
cur += 2
else:
flag = False
break
if not flag or cur != 0:
print(-1)
else:
print(ans)
print(''.join(s))
| Title: Least Cost Bracket Sequence
Time Limit: 1 seconds
Memory Limit: 64 megabytes
Problem Description:
This is yet another problem on regular bracket sequences.
A bracket sequence is called regular, if by inserting "+" and "1" into it we get a correct mathematical expression. For example, sequences "(())()", "()" and "(()(()))" are regular, while ")(", "(()" and "(()))(" are not. You have a pattern of a bracket sequence that consists of characters "(", ")" and "?". You have to replace each character "?" with a bracket so, that you get a regular bracket sequence.
For each character "?" the cost of its replacement with "(" and ")" is given. Among all the possible variants your should choose the cheapest.
Input Specification:
The first line contains a non-empty pattern of even length, consisting of characters "(", ")" and "?". Its length doesn't exceed 5·104. Then there follow *m* lines, where *m* is the number of characters "?" in the pattern. Each line contains two integer numbers *a**i* and *b**i* (1<=≤<=*a**i*,<=<=*b**i*<=≤<=106), where *a**i* is the cost of replacing the *i*-th character "?" with an opening bracket, and *b**i* — with a closing one.
Output Specification:
Print the cost of the optimal regular bracket sequence in the first line, and the required sequence in the second.
Print -1, if there is no answer. If the answer is not unique, print any of them.
Demo Input:
['(??)\n1 2\n2 8\n']
Demo Output:
['4\n()()\n']
Note:
none | ```python
import heapq as hq
s = list(input().strip())
n = len(s)
buc = [0]*n
count = 0
for i in range(n):
if s[i] == '?':
buc[i] = count
count += 1
a = [0]*count
b = [0]*count
cur = 0
ans = 0
queue = []
flag = True
if count:
for i in range(count):
a[i], b[i] = map(int, input().split())
for i in range(n):
if s[i] == '(':
cur += 1
elif s[i] == ')':
cur -= 1
else:
ans += b[buc[i]]
s[i] = ')'
cur -= 1
hq.heappush(queue, (a[buc[i]]-b[buc[i]], i))
if cur < 0:
if queue:
p = hq.heappop(queue)
ans += p[0]
s[p[1]] = '('
cur += 2
else:
flag = False
break
if not flag or cur != 0:
print(-1)
else:
print(ans)
print(''.join(s))
``` | 3.424943 |
39 | C | Moon Craters | PROGRAMMING | 2,100 | [
"dp",
"sortings"
] | C. Moon Craters | 1 | 256 | There are lots of theories concerning the origin of moon craters. Most scientists stick to the meteorite theory, which says that the craters were formed as a result of celestial bodies colliding with the Moon. The other version is that the craters were parts of volcanoes.
An extraterrestrial intelligence research specialist professor Okulov (the namesake of the Okulov, the author of famous textbooks on programming) put forward an alternate hypothesis. Guess what kind of a hypothesis it was –– sure, the one including extraterrestrial mind involvement. Now the professor is looking for proofs of his hypothesis.
Professor has data from the moon robot that moves linearly in one direction along the Moon surface. The moon craters are circular in form with integer-valued radii. The moon robot records only the craters whose centers lay on his path and sends to the Earth the information on the distance from the centers of the craters to the initial point of its path and on the radii of the craters.
According to the theory of professor Okulov two craters made by an extraterrestrial intelligence for the aims yet unknown either are fully enclosed one in the other or do not intersect at all. Internal or external tangency is acceptable. However the experimental data from the moon robot do not confirm this theory! Nevertheless, professor Okulov is hopeful. He perfectly understands that to create any logical theory one has to ignore some data that are wrong due to faulty measuring (or skillful disguise by the extraterrestrial intelligence that will be sooner or later found by professor Okulov!) That’s why Okulov wants to choose among the available crater descriptions the largest set that would satisfy his theory. | The first line has an integer *n* (1<=≤<=*n*<=≤<=2000) — the number of discovered craters. The next *n* lines contain crater descriptions in the "*c**i* *r**i*" format, where *c**i* is the coordinate of the center of the crater on the moon robot’s path, *r**i* is the radius of the crater. All the numbers *c**i* and *r**i* are positive integers not exceeding 109. No two craters coincide. | In the first line output the number of craters in the required largest set. In the next line output space-separated numbers of craters that this set consists of. The craters are numbered from 1 to *n* in the order in which they were given in the input data. The numbers may be output in any order. If the result is not unique, output any. | [
"4\n1 1\n2 2\n4 1\n5 1\n"
] | [
"3\n1 2 4\n"
] | none | 0 | [] | 1,692,280,871 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 0 | 62 | 0 | print("_RANDOM_GUESS_1692280871.7285643")# 1692280871.7285812 | Title: Moon Craters
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
There are lots of theories concerning the origin of moon craters. Most scientists stick to the meteorite theory, which says that the craters were formed as a result of celestial bodies colliding with the Moon. The other version is that the craters were parts of volcanoes.
An extraterrestrial intelligence research specialist professor Okulov (the namesake of the Okulov, the author of famous textbooks on programming) put forward an alternate hypothesis. Guess what kind of a hypothesis it was –– sure, the one including extraterrestrial mind involvement. Now the professor is looking for proofs of his hypothesis.
Professor has data from the moon robot that moves linearly in one direction along the Moon surface. The moon craters are circular in form with integer-valued radii. The moon robot records only the craters whose centers lay on his path and sends to the Earth the information on the distance from the centers of the craters to the initial point of its path and on the radii of the craters.
According to the theory of professor Okulov two craters made by an extraterrestrial intelligence for the aims yet unknown either are fully enclosed one in the other or do not intersect at all. Internal or external tangency is acceptable. However the experimental data from the moon robot do not confirm this theory! Nevertheless, professor Okulov is hopeful. He perfectly understands that to create any logical theory one has to ignore some data that are wrong due to faulty measuring (or skillful disguise by the extraterrestrial intelligence that will be sooner or later found by professor Okulov!) That’s why Okulov wants to choose among the available crater descriptions the largest set that would satisfy his theory.
Input Specification:
The first line has an integer *n* (1<=≤<=*n*<=≤<=2000) — the number of discovered craters. The next *n* lines contain crater descriptions in the "*c**i* *r**i*" format, where *c**i* is the coordinate of the center of the crater on the moon robot’s path, *r**i* is the radius of the crater. All the numbers *c**i* and *r**i* are positive integers not exceeding 109. No two craters coincide.
Output Specification:
In the first line output the number of craters in the required largest set. In the next line output space-separated numbers of craters that this set consists of. The craters are numbered from 1 to *n* in the order in which they were given in the input data. The numbers may be output in any order. If the result is not unique, output any.
Demo Input:
['4\n1 1\n2 2\n4 1\n5 1\n']
Demo Output:
['3\n1 2 4\n']
Note:
none | ```python
print("_RANDOM_GUESS_1692280871.7285643")# 1692280871.7285812
``` | 0 |
266 | A | Stones on the Table | PROGRAMMING | 800 | [
"implementation"
] | null | null | There are *n* stones on the table in a row, each of them can be red, green or blue. Count the minimum number of stones to take from the table so that any two neighboring stones had different colors. Stones in a row are considered neighboring if there are no other stones between them. | The first line contains integer *n* (1<=≤<=*n*<=≤<=50) — the number of stones on the table.
The next line contains string *s*, which represents the colors of the stones. We'll consider the stones in the row numbered from 1 to *n* from left to right. Then the *i*-th character *s* equals "R", if the *i*-th stone is red, "G", if it's green and "B", if it's blue. | Print a single integer — the answer to the problem. | [
"3\nRRG\n",
"5\nRRRRR\n",
"4\nBRBG\n"
] | [
"1\n",
"4\n",
"0\n"
] | none | 500 | [
{
"input": "3\nRRG",
"output": "1"
},
{
"input": "5\nRRRRR",
"output": "4"
},
{
"input": "4\nBRBG",
"output": "0"
},
{
"input": "1\nB",
"output": "0"
},
{
"input": "2\nBG",
"output": "0"
},
{
"input": "3\nBGB",
"output": "0"
},
{
"input": "4\nRBBR",
"output": "1"
},
{
"input": "5\nRGGBG",
"output": "1"
},
{
"input": "10\nGGBRBRGGRB",
"output": "2"
},
{
"input": "50\nGRBGGRBRGRBGGBBBBBGGGBBBBRBRGBRRBRGBBBRBBRRGBGGGRB",
"output": "18"
},
{
"input": "15\nBRRBRGGBBRRRRGR",
"output": "6"
},
{
"input": "20\nRRGBBRBRGRGBBGGRGRRR",
"output": "6"
},
{
"input": "25\nBBGBGRBGGBRRBGRRBGGBBRBRB",
"output": "6"
},
{
"input": "30\nGRGGGBGGRGBGGRGRBGBGBRRRRRRGRB",
"output": "9"
},
{
"input": "35\nGBBGBRGBBGGRBBGBRRGGRRRRRRRBRBBRRGB",
"output": "14"
},
{
"input": "40\nGBBRRGBGGGRGGGRRRRBRBGGBBGGGBGBBBBBRGGGG",
"output": "20"
},
{
"input": "45\nGGGBBRBBRRGRBBGGBGRBRGGBRBRGBRRGBGRRBGRGRBRRG",
"output": "11"
},
{
"input": "50\nRBGGBGGRBGRBBBGBBGRBBBGGGRBBBGBBBGRGGBGGBRBGBGRRGG",
"output": "17"
},
{
"input": "50\nGGGBBRGGGGGRRGGRBGGRGBBRBRRBGRGBBBGBRBGRGBBGRGGBRB",
"output": "16"
},
{
"input": "50\nGBGRGRRBRRRRRGGBBGBRRRBBBRBBBRRGRBBRGBRBGGRGRBBGGG",
"output": "19"
},
{
"input": "10\nGRRBRBRBGR",
"output": "1"
},
{
"input": "10\nBRBGBGRRBR",
"output": "1"
},
{
"input": "20\nGBGBGGRRRRGRBBGRGRGR",
"output": "5"
},
{
"input": "20\nRRGGRBBGBBRBGRRBRRBG",
"output": "6"
},
{
"input": "30\nBGBRGBBBGRGBBRGBGRBBBRGGRRGRRB",
"output": "8"
},
{
"input": "30\nBBBBGGBRBGBBGBGBGBGGGRGRRGGBBB",
"output": "11"
},
{
"input": "40\nGBRRGRBGBRRGBRGGGBRGBGBRGBBRRGRGGBBGBGBB",
"output": "9"
},
{
"input": "40\nBRGRGGRGGRBBRRRBRBBGGGRRGBGBBGRBBRGBRRGG",
"output": "13"
},
{
"input": "50\nRBGBGGRRGGRGGBGBGRRBGGBGBRRBBGBBGBBBGBBRBBRBRBRGRG",
"output": "13"
},
{
"input": "50\nRBRRGBGRRRBGRRBGRRGRBBRBBRRBRGGBRBRRBGGRBGGBRBRGRB",
"output": "12"
},
{
"input": "2\nBB",
"output": "1"
},
{
"input": "50\nRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRR",
"output": "49"
},
{
"input": "50\nRRRRRRRRGRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRRR",
"output": "47"
},
{
"input": "50\nRRRRRRRRRRRRGGRRRRRRRRRBRRRRRRRRRRRRRRBBRRRRRRRRRR",
"output": "43"
}
] | 1,695,036,784 | 2,147,483,647 | Python 3 | COMPILATION_ERROR | TESTS | 0 | 0 | 0 | b = input()
s = input()
n = 0
for i in range(b-1):
if s[i]=s[i+1]:
n = n+1
print(n) | Title: Stones on the Table
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
There are *n* stones on the table in a row, each of them can be red, green or blue. Count the minimum number of stones to take from the table so that any two neighboring stones had different colors. Stones in a row are considered neighboring if there are no other stones between them.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=50) — the number of stones on the table.
The next line contains string *s*, which represents the colors of the stones. We'll consider the stones in the row numbered from 1 to *n* from left to right. Then the *i*-th character *s* equals "R", if the *i*-th stone is red, "G", if it's green and "B", if it's blue.
Output Specification:
Print a single integer — the answer to the problem.
Demo Input:
['3\nRRG\n', '5\nRRRRR\n', '4\nBRBG\n']
Demo Output:
['1\n', '4\n', '0\n']
Note:
none | ```python
b = input()
s = input()
n = 0
for i in range(b-1):
if s[i]=s[i+1]:
n = n+1
print(n)
``` | -1 | |
50 | A | Domino piling | PROGRAMMING | 800 | [
"greedy",
"math"
] | A. Domino piling | 2 | 256 | You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions. | In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16). | Output one number — the maximal number of dominoes, which can be placed. | [
"2 4\n",
"3 3\n"
] | [
"4\n",
"4\n"
] | none | 500 | [
{
"input": "2 4",
"output": "4"
},
{
"input": "3 3",
"output": "4"
},
{
"input": "1 5",
"output": "2"
},
{
"input": "1 6",
"output": "3"
},
{
"input": "1 15",
"output": "7"
},
{
"input": "1 16",
"output": "8"
},
{
"input": "2 5",
"output": "5"
},
{
"input": "2 6",
"output": "6"
},
{
"input": "2 7",
"output": "7"
},
{
"input": "2 14",
"output": "14"
},
{
"input": "2 15",
"output": "15"
},
{
"input": "1 4",
"output": "2"
},
{
"input": "2 16",
"output": "16"
},
{
"input": "3 5",
"output": "7"
},
{
"input": "3 6",
"output": "9"
},
{
"input": "3 10",
"output": "15"
},
{
"input": "3 14",
"output": "21"
},
{
"input": "3 15",
"output": "22"
},
{
"input": "3 16",
"output": "24"
},
{
"input": "5 7",
"output": "17"
},
{
"input": "16 16",
"output": "128"
},
{
"input": "15 16",
"output": "120"
},
{
"input": "2 3",
"output": "3"
},
{
"input": "15 15",
"output": "112"
},
{
"input": "14 16",
"output": "112"
},
{
"input": "11 13",
"output": "71"
},
{
"input": "5 16",
"output": "40"
},
{
"input": "8 15",
"output": "60"
},
{
"input": "2 2",
"output": "2"
},
{
"input": "3 4",
"output": "6"
},
{
"input": "4 4",
"output": "8"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "1 2",
"output": "1"
},
{
"input": "1 3",
"output": "1"
},
{
"input": "14 15",
"output": "105"
}
] | 1,692,909,333 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 0 | 30 | 0 | mn=input ("")
m=int (mn[0]+ mn[1])
n=int(mn[2:])
max=m*n//2
print (m)
print(n) | Title: Domino piling
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions.
Input Specification:
In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16).
Output Specification:
Output one number — the maximal number of dominoes, which can be placed.
Demo Input:
['2 4\n', '3 3\n']
Demo Output:
['4\n', '4\n']
Note:
none | ```python
mn=input ("")
m=int (mn[0]+ mn[1])
n=int(mn[2:])
max=m*n//2
print (m)
print(n)
``` | 0 |
11 | D | A Simple Task | PROGRAMMING | 2,200 | [
"bitmasks",
"dp",
"graphs"
] | D. A Simple Task | 2 | 256 | Given a simple graph, output the number of simple cycles in it. A simple cycle is a cycle with no repeated vertices or edges. | The first line of input contains two integers *n* and *m* (1<=≤<=*n*<=≤<=19, 0<=≤<=*m*) – respectively the number of vertices and edges of the graph. Each of the subsequent *m* lines contains two integers *a* and *b*, (1<=≤<=*a*,<=*b*<=≤<=*n*, *a*<=≠<=*b*) indicating that vertices *a* and *b* are connected by an undirected edge. There is no more than one edge connecting any pair of vertices. | Output the number of cycles in the given graph. | [
"4 6\n1 2\n1 3\n1 4\n2 3\n2 4\n3 4\n"
] | [
"7\n"
] | The example graph is a clique and contains four cycles of length 3 and three cycles of length 4. | 0 | [
{
"input": "4 6\n1 2\n1 3\n1 4\n2 3\n2 4\n3 4",
"output": "7"
},
{
"input": "10 3\n4 8\n9 4\n8 9",
"output": "1"
},
{
"input": "8 28\n1 2\n1 3\n1 4\n1 5\n1 6\n1 7\n1 8\n2 3\n2 4\n2 5\n2 6\n2 7\n2 8\n3 4\n3 5\n3 6\n3 7\n3 8\n4 5\n4 6\n4 7\n4 8\n5 6\n5 7\n5 8\n6 7\n6 8\n7 8",
"output": "8018"
},
{
"input": "12 10\n1 6\n4 5\n4 9\n5 10\n6 12\n7 9\n7 10\n8 10\n10 12\n11 12",
"output": "1"
},
{
"input": "3 0",
"output": "0"
},
{
"input": "6 0",
"output": "0"
},
{
"input": "2 1\n1 2",
"output": "0"
},
{
"input": "2 1\n1 2",
"output": "0"
},
{
"input": "3 3\n1 2\n1 3\n2 3",
"output": "1"
},
{
"input": "3 0",
"output": "0"
},
{
"input": "3 0",
"output": "0"
},
{
"input": "3 0",
"output": "0"
},
{
"input": "7 16\n1 2\n1 3\n1 5\n1 7\n2 3\n2 4\n2 6\n3 4\n3 5\n3 6\n3 7\n4 5\n4 6\n4 7\n5 6\n6 7",
"output": "214"
},
{
"input": "14 32\n1 2\n1 3\n1 6\n1 7\n1 9\n1 11\n1 13\n2 8\n2 9\n2 14\n3 7\n3 8\n3 9\n3 13\n4 5\n4 11\n4 14\n6 7\n6 8\n6 9\n6 14\n7 12\n7 13\n8 9\n8 10\n8 11\n9 10\n10 13\n10 14\n11 12\n11 13\n13 14",
"output": "9239"
},
{
"input": "18 45\n1 2\n1 5\n1 12\n1 13\n2 3\n2 4\n2 11\n2 14\n2 15\n3 7\n3 16\n4 7\n4 8\n4 10\n4 18\n5 8\n5 10\n5 16\n5 17\n6 12\n6 16\n7 9\n7 12\n8 10\n8 16\n9 11\n9 12\n9 16\n9 17\n10 11\n10 15\n11 12\n11 14\n11 15\n12 13\n12 14\n12 15\n12 18\n13 15\n13 16\n13 17\n14 15\n14 18\n16 17\n17 18",
"output": "467111"
},
{
"input": "19 11\n3 4\n3 12\n3 14\n4 12\n5 11\n8 9\n8 10\n9 10\n9 13\n11 19\n15 16",
"output": "2"
},
{
"input": "1 0",
"output": "0"
},
{
"input": "10 44\n1 2\n1 3\n1 4\n1 5\n1 6\n1 7\n1 8\n1 9\n1 10\n2 3\n2 4\n2 5\n2 6\n2 7\n2 8\n2 9\n2 10\n3 4\n3 5\n3 6\n3 7\n3 8\n3 10\n4 5\n4 6\n4 7\n4 8\n4 9\n4 10\n5 6\n5 7\n5 8\n5 9\n5 10\n6 7\n6 8\n6 9\n6 10\n7 8\n7 9\n7 10\n8 9\n8 10\n9 10",
"output": "446414"
},
{
"input": "16 11\n1 2\n2 7\n2 12\n3 12\n4 5\n4 15\n6 7\n6 9\n7 8\n12 14\n14 16",
"output": "0"
},
{
"input": "1 0",
"output": "0"
},
{
"input": "3 3\n1 2\n1 3\n2 3",
"output": "1"
},
{
"input": "6 1\n2 5",
"output": "0"
},
{
"input": "2 1\n1 2",
"output": "0"
},
{
"input": "3 3\n1 2\n1 3\n2 3",
"output": "1"
},
{
"input": "2 0",
"output": "0"
},
{
"input": "1 0",
"output": "0"
},
{
"input": "18 54\n1 7\n1 11\n1 14\n1 15\n1 18\n2 7\n3 4\n3 9\n3 10\n3 11\n3 12\n3 13\n3 16\n3 17\n3 18\n4 5\n4 9\n4 11\n4 13\n5 12\n5 13\n5 14\n5 15\n5 16\n5 18\n6 9\n6 10\n6 12\n6 13\n6 17\n7 8\n7 17\n8 10\n8 11\n8 12\n8 14\n8 15\n9 11\n9 12\n10 11\n10 13\n10 16\n10 17\n11 12\n11 15\n11 16\n12 15\n12 18\n13 15\n13 17\n14 15\n14 16\n15 17\n17 18",
"output": "6418594"
},
{
"input": "3 0",
"output": "0"
},
{
"input": "5 8\n1 3\n1 4\n1 5\n2 3\n2 4\n3 4\n3 5\n4 5",
"output": "12"
},
{
"input": "19 48\n1 5\n1 6\n1 14\n1 17\n1 18\n2 3\n2 4\n2 7\n2 13\n2 16\n2 18\n2 19\n3 8\n3 11\n3 16\n3 17\n4 5\n4 13\n4 17\n4 19\n5 8\n5 13\n5 15\n5 16\n5 19\n6 7\n6 11\n6 12\n6 14\n7 8\n7 11\n8 11\n8 19\n9 14\n9 17\n9 18\n10 13\n10 19\n11 12\n11 18\n12 14\n13 16\n13 17\n13 19\n14 15\n16 17\n17 18\n18 19",
"output": "824798"
},
{
"input": "2 0",
"output": "0"
},
{
"input": "6 15\n1 2\n1 3\n1 4\n1 5\n1 6\n2 3\n2 4\n2 5\n2 6\n3 4\n3 5\n3 6\n4 5\n4 6\n5 6",
"output": "197"
},
{
"input": "19 22\n1 10\n1 14\n1 17\n2 10\n2 12\n2 13\n3 8\n3 13\n3 14\n4 10\n4 19\n7 9\n7 12\n9 18\n10 11\n11 13\n11 19\n12 13\n14 16\n16 17\n16 19\n17 19",
"output": "60"
},
{
"input": "1 0",
"output": "0"
},
{
"input": "3 0",
"output": "0"
}
] | 1,580,235,291 | 2,147,483,647 | PyPy 3 | WRONG_ANSWER | TESTS | 1 | 109 | 0 | def dfs(v,p,visit):
global c
if visit[v]==1:
c+=1
return
visit[v]=1
for k in g[v]:
if k!=p:
dfs(k,v,visit)
n,m=map(int,input().split())
g=[[] for _ in range(n)]
for _ in range(m):
x,y=map(int,input().split())
g[x-1].append(y-1)
g[y-1].append(x-1)
visit=[0 for _ in range(n)]
c=0
dfs(0,-1,visit)
print(c+1) | Title: A Simple Task
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Given a simple graph, output the number of simple cycles in it. A simple cycle is a cycle with no repeated vertices or edges.
Input Specification:
The first line of input contains two integers *n* and *m* (1<=≤<=*n*<=≤<=19, 0<=≤<=*m*) – respectively the number of vertices and edges of the graph. Each of the subsequent *m* lines contains two integers *a* and *b*, (1<=≤<=*a*,<=*b*<=≤<=*n*, *a*<=≠<=*b*) indicating that vertices *a* and *b* are connected by an undirected edge. There is no more than one edge connecting any pair of vertices.
Output Specification:
Output the number of cycles in the given graph.
Demo Input:
['4 6\n1 2\n1 3\n1 4\n2 3\n2 4\n3 4\n']
Demo Output:
['7\n']
Note:
The example graph is a clique and contains four cycles of length 3 and three cycles of length 4. | ```python
def dfs(v,p,visit):
global c
if visit[v]==1:
c+=1
return
visit[v]=1
for k in g[v]:
if k!=p:
dfs(k,v,visit)
n,m=map(int,input().split())
g=[[] for _ in range(n)]
for _ in range(m):
x,y=map(int,input().split())
g[x-1].append(y-1)
g[y-1].append(x-1)
visit=[0 for _ in range(n)]
c=0
dfs(0,-1,visit)
print(c+1)
``` | 0 |
289 | B | Polo the Penguin and Matrix | PROGRAMMING | 1,400 | [
"brute force",
"dp",
"implementation",
"sortings",
"ternary search"
] | null | null | Little penguin Polo has an *n*<=×<=*m* matrix, consisting of integers. Let's index the matrix rows from 1 to *n* from top to bottom and let's index the columns from 1 to *m* from left to right. Let's represent the matrix element on the intersection of row *i* and column *j* as *a**ij*.
In one move the penguin can add or subtract number *d* from some matrix element. Find the minimum number of moves needed to make all matrix elements equal. If the described plan is impossible to carry out, say so. | The first line contains three integers *n*, *m* and *d* (1<=≤<=*n*,<=*m*<=≤<=100,<=1<=≤<=*d*<=≤<=104) — the matrix sizes and the *d* parameter. Next *n* lines contain the matrix: the *j*-th integer in the *i*-th row is the matrix element *a**ij* (1<=≤<=*a**ij*<=≤<=104). | In a single line print a single integer — the minimum number of moves the penguin needs to make all matrix elements equal. If that is impossible, print "-1" (without the quotes). | [
"2 2 2\n2 4\n6 8\n",
"1 2 7\n6 7\n"
] | [
"4\n",
"-1\n"
] | none | 1,000 | [
{
"input": "2 2 2\n2 4\n6 8",
"output": "4"
},
{
"input": "1 2 7\n6 7",
"output": "-1"
},
{
"input": "3 2 1\n5 7\n1 2\n5 100",
"output": "104"
},
{
"input": "3 3 3\n5 8 5\n11 11 17\n14 5 2",
"output": "12"
},
{
"input": "3 3 3\n5 8 5\n11 11 17\n14 5 3",
"output": "-1"
},
{
"input": "2 2 4\n5 5\n5 5",
"output": "0"
},
{
"input": "7 4 5\n7 7 7 12\n7 12 12 7\n7 7 7 7\n7 7 12 7\n7 7 12 12\n12 12 7 12\n7 7 7 7",
"output": "9"
},
{
"input": "7 7 47\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91\n91 91 91 91 91 91 91",
"output": "0"
},
{
"input": "7 7 47\n47 47 47 47 47 47 47\n47 47 47 47 77 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 47 47\n47 47 47 47 47 127 47",
"output": "-1"
},
{
"input": "7 5 47\n9583 1734 4601 5353 2110\n3802 5165 7985 6293 324\n7045 653 9160 7891 4930\n1781 3520 4178 2298 3943\n1405 2956 5447 5494 6528\n3097 1640 7750 4883 8032\n4225 8455 1875 4789 4366",
"output": "1508"
},
{
"input": "1 1 1\n1",
"output": "0"
},
{
"input": "1 1 8\n12",
"output": "0"
}
] | 1,620,320,247 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 2 | 122 | 6,963,200 | import math
def LCMofArray(a):
lcm = a[0]
for i in range(1,len(a)):
lcm = lcm*a[i]//math.gcd(lcm,a[i])
return lcm
n,m,d=map(int,input().split(' '))
l=[]
count=0
for i in range(n):
l.append(list(map(int,input().split(' '))))
a=[]
for i in l:
for j in i:
a.append(j)
e=LCMofArray(a)//(n*m)
for i in a:
if(abs(e-i)%d==0):
count+=abs(e-i)//d
else:
print(-1)
exit()
print(count) | Title: Polo the Penguin and Matrix
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Little penguin Polo has an *n*<=×<=*m* matrix, consisting of integers. Let's index the matrix rows from 1 to *n* from top to bottom and let's index the columns from 1 to *m* from left to right. Let's represent the matrix element on the intersection of row *i* and column *j* as *a**ij*.
In one move the penguin can add or subtract number *d* from some matrix element. Find the minimum number of moves needed to make all matrix elements equal. If the described plan is impossible to carry out, say so.
Input Specification:
The first line contains three integers *n*, *m* and *d* (1<=≤<=*n*,<=*m*<=≤<=100,<=1<=≤<=*d*<=≤<=104) — the matrix sizes and the *d* parameter. Next *n* lines contain the matrix: the *j*-th integer in the *i*-th row is the matrix element *a**ij* (1<=≤<=*a**ij*<=≤<=104).
Output Specification:
In a single line print a single integer — the minimum number of moves the penguin needs to make all matrix elements equal. If that is impossible, print "-1" (without the quotes).
Demo Input:
['2 2 2\n2 4\n6 8\n', '1 2 7\n6 7\n']
Demo Output:
['4\n', '-1\n']
Note:
none | ```python
import math
def LCMofArray(a):
lcm = a[0]
for i in range(1,len(a)):
lcm = lcm*a[i]//math.gcd(lcm,a[i])
return lcm
n,m,d=map(int,input().split(' '))
l=[]
count=0
for i in range(n):
l.append(list(map(int,input().split(' '))))
a=[]
for i in l:
for j in i:
a.append(j)
e=LCMofArray(a)//(n*m)
for i in a:
if(abs(e-i)%d==0):
count+=abs(e-i)//d
else:
print(-1)
exit()
print(count)
``` | 0 | |
58 | A | Chat room | PROGRAMMING | 1,000 | [
"greedy",
"strings"
] | A. Chat room | 1 | 256 | Vasya has recently learned to type and log on to the Internet. He immediately entered a chat room and decided to say hello to everybody. Vasya typed the word *s*. It is considered that Vasya managed to say hello if several letters can be deleted from the typed word so that it resulted in the word "hello". For example, if Vasya types the word "ahhellllloou", it will be considered that he said hello, and if he types "hlelo", it will be considered that Vasya got misunderstood and he didn't manage to say hello. Determine whether Vasya managed to say hello by the given word *s*. | The first and only line contains the word *s*, which Vasya typed. This word consisits of small Latin letters, its length is no less that 1 and no more than 100 letters. | If Vasya managed to say hello, print "YES", otherwise print "NO". | [
"ahhellllloou\n",
"hlelo\n"
] | [
"YES\n",
"NO\n"
] | none | 500 | [
{
"input": "ahhellllloou",
"output": "YES"
},
{
"input": "hlelo",
"output": "NO"
},
{
"input": "helhcludoo",
"output": "YES"
},
{
"input": "hehwelloho",
"output": "YES"
},
{
"input": "pnnepelqomhhheollvlo",
"output": "YES"
},
{
"input": "tymbzjyqhymedasloqbq",
"output": "NO"
},
{
"input": "yehluhlkwo",
"output": "NO"
},
{
"input": "hatlevhhalrohairnolsvocafgueelrqmlqlleello",
"output": "YES"
},
{
"input": "hhhtehdbllnhwmbyhvelqqyoulretpbfokflhlhreeflxeftelziclrwllrpflflbdtotvlqgoaoqldlroovbfsq",
"output": "YES"
},
{
"input": "rzlvihhghnelqtwlexmvdjjrliqllolhyewgozkuovaiezgcilelqapuoeglnwmnlftxxiigzczlouooi",
"output": "YES"
},
{
"input": "pfhhwctyqdlkrwhebfqfelhyebwllhemtrmeblgrynmvyhioesqklclocxmlffuormljszllpoo",
"output": "YES"
},
{
"input": "lqllcolohwflhfhlnaow",
"output": "NO"
},
{
"input": "heheeellollvoo",
"output": "YES"
},
{
"input": "hellooo",
"output": "YES"
},
{
"input": "o",
"output": "NO"
},
{
"input": "hhqhzeclohlehljlhtesllylrolmomvuhcxsobtsckogdv",
"output": "YES"
},
{
"input": "yoegfuzhqsihygnhpnukluutocvvwuldiighpogsifealtgkfzqbwtmgghmythcxflebrkctlldlkzlagovwlstsghbouk",
"output": "YES"
},
{
"input": "uatqtgbvrnywfacwursctpagasnhydvmlinrcnqrry",
"output": "NO"
},
{
"input": "tndtbldbllnrwmbyhvqaqqyoudrstpbfokfoclnraefuxtftmgzicorwisrpfnfpbdtatvwqgyalqtdtrjqvbfsq",
"output": "NO"
},
{
"input": "rzlvirhgemelnzdawzpaoqtxmqucnahvqnwldklrmjiiyageraijfivigvozgwngiulttxxgzczptusoi",
"output": "YES"
},
{
"input": "kgyelmchocojsnaqdsyeqgnllytbqietpdlgknwwumqkxrexgdcnwoldicwzwofpmuesjuxzrasscvyuqwspm",
"output": "YES"
},
{
"input": "pnyvrcotjvgynbeldnxieghfltmexttuxzyac",
"output": "NO"
},
{
"input": "dtwhbqoumejligbenxvzhjlhosqojetcqsynlzyhfaevbdpekgbtjrbhlltbceobcok",
"output": "YES"
},
{
"input": "crrfpfftjwhhikwzeedrlwzblckkteseofjuxjrktcjfsylmlsvogvrcxbxtffujqshslemnixoeezivksouefeqlhhokwbqjz",
"output": "YES"
},
{
"input": "jhfbndhyzdvhbvhmhmefqllujdflwdpjbehedlsqfdsqlyelwjtyloxwsvasrbqosblzbowlqjmyeilcvotdlaouxhdpoeloaovb",
"output": "YES"
},
{
"input": "hwlghueoemiqtjhhpashjsouyegdlvoyzeunlroypoprnhlyiwiuxrghekaylndhrhllllwhbebezoglydcvykllotrlaqtvmlla",
"output": "YES"
},
{
"input": "wshiaunnqnqxodholbipwhhjmyeblhgpeleblklpzwhdunmpqkbuzloetmwwxmeltkrcomulxauzlwmlklldjodozxryghsnwgcz",
"output": "YES"
},
{
"input": "shvksednttggehroewuiptvvxtrzgidravtnjwuqrlnnkxbplctzkckinpkgjopjfoxdbojtcvsuvablcbkrzajrlhgobkcxeqti",
"output": "YES"
},
{
"input": "hyyhddqhxhekehkwfhlnlsihzefwchzerevcjtokefplholrbvxlltdlafjxrfhleglrvlolojoqaolagtbeyogxlbgfolllslli",
"output": "YES"
},
{
"input": "iaagrdhhelxpdegueiulflquvlzidoprzkehthkldaytrjwhyhprwjxlltinxvuilxohqgjqcvkkdcuoliekcnlilwgqlnlzouoo",
"output": "YES"
},
{
"input": "wfluaeseldgxyvxpwuhkptdmlflnlhktwxiabsvkolsquymrmhzczzoybvlilhmvsuunggvgxzgyyffk",
"output": "NO"
},
{
"input": "loee",
"output": "NO"
},
{
"input": "izdipwylefqmjbuoznfglgcfvedeouflkeehxbasaqmiooppfsqlhprospqgxvzrcpwlfdddngoqvpwvggsnvvxhmjoslwjudjlo",
"output": "NO"
},
{
"input": "pplynflbjlseflaegzqpdxswgunhnlglqhycrbcwdfhclmcrwekkzsoosmfblljeenwfjyifcvxihhhbyhmhlkvtskeglaovjnsi",
"output": "YES"
},
{
"input": "xqjqmenkodmlhzyzmmvofdngktygbbxbzpluzcohohmalkoeuwfikblltaaigv",
"output": "NO"
},
{
"input": "hello",
"output": "YES"
},
{
"input": "oohell",
"output": "NO"
},
{
"input": "hell",
"output": "NO"
},
{
"input": "eloellohoelo",
"output": "NO"
},
{
"input": "helllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllllo",
"output": "YES"
}
] | 1,549,573,498 | 2,147,483,647 | Python 3 | OK | TESTS | 40 | 109 | 0 | l=list(input())
j=['h','e','l','l','o']
k=0
g=j[0]
for i in range(len(l)):
if g==l[i]:
if k>3:
k+=1
break
k+=1
g=j[k]
print('YES' if k==5 else 'NO')
| Title: Chat room
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Vasya has recently learned to type and log on to the Internet. He immediately entered a chat room and decided to say hello to everybody. Vasya typed the word *s*. It is considered that Vasya managed to say hello if several letters can be deleted from the typed word so that it resulted in the word "hello". For example, if Vasya types the word "ahhellllloou", it will be considered that he said hello, and if he types "hlelo", it will be considered that Vasya got misunderstood and he didn't manage to say hello. Determine whether Vasya managed to say hello by the given word *s*.
Input Specification:
The first and only line contains the word *s*, which Vasya typed. This word consisits of small Latin letters, its length is no less that 1 and no more than 100 letters.
Output Specification:
If Vasya managed to say hello, print "YES", otherwise print "NO".
Demo Input:
['ahhellllloou\n', 'hlelo\n']
Demo Output:
['YES\n', 'NO\n']
Note:
none | ```python
l=list(input())
j=['h','e','l','l','o']
k=0
g=j[0]
for i in range(len(l)):
if g==l[i]:
if k>3:
k+=1
break
k+=1
g=j[k]
print('YES' if k==5 else 'NO')
``` | 3.9455 |
611 | A | New Year and Days | PROGRAMMING | 900 | [
"implementation"
] | null | null | Today is Wednesday, the third day of the week. What's more interesting is that tomorrow is the last day of the year 2015.
Limak is a little polar bear. He enjoyed this year a lot. Now, he is so eager to the coming year 2016.
Limak wants to prove how responsible a bear he is. He is going to regularly save candies for the entire year 2016! He considers various saving plans. He can save one candy either on some fixed day of the week or on some fixed day of the month.
Limak chose one particular plan. He isn't sure how many candies he will save in the 2016 with his plan. Please, calculate it and tell him. | The only line of the input is in one of the following two formats:
- "*x* of week" where *x* (1<=≤<=*x*<=≤<=7) denotes the day of the week. The 1-st day is Monday and the 7-th one is Sunday. - "*x* of month" where *x* (1<=≤<=*x*<=≤<=31) denotes the day of the month. | Print one integer — the number of candies Limak will save in the year 2016. | [
"4 of week\n",
"30 of month\n"
] | [
"52\n",
"11\n"
] | Polar bears use the Gregorian calendar. It is the most common calendar and you likely use it too. You can read about it on Wikipedia if you want to – [https://en.wikipedia.org/wiki/Gregorian_calendar](https://en.wikipedia.org/wiki/Gregorian_calendar). The week starts with Monday.
In the first sample Limak wants to save one candy on each Thursday (the 4-th day of the week). There are 52 Thursdays in the 2016. Thus, he will save 52 candies in total.
In the second sample Limak wants to save one candy on the 30-th day of each month. There is the 30-th day in exactly 11 months in the 2016 — all months but February. It means that Limak will save 11 candies in total. | 500 | [
{
"input": "4 of week",
"output": "52"
},
{
"input": "30 of month",
"output": "11"
},
{
"input": "17 of month",
"output": "12"
},
{
"input": "31 of month",
"output": "7"
},
{
"input": "6 of week",
"output": "53"
},
{
"input": "1 of week",
"output": "52"
},
{
"input": "2 of week",
"output": "52"
},
{
"input": "3 of week",
"output": "52"
},
{
"input": "5 of week",
"output": "53"
},
{
"input": "7 of week",
"output": "52"
},
{
"input": "1 of month",
"output": "12"
},
{
"input": "2 of month",
"output": "12"
},
{
"input": "3 of month",
"output": "12"
},
{
"input": "4 of month",
"output": "12"
},
{
"input": "5 of month",
"output": "12"
},
{
"input": "6 of month",
"output": "12"
},
{
"input": "7 of month",
"output": "12"
},
{
"input": "8 of month",
"output": "12"
},
{
"input": "9 of month",
"output": "12"
},
{
"input": "10 of month",
"output": "12"
},
{
"input": "11 of month",
"output": "12"
},
{
"input": "12 of month",
"output": "12"
},
{
"input": "13 of month",
"output": "12"
},
{
"input": "14 of month",
"output": "12"
},
{
"input": "15 of month",
"output": "12"
},
{
"input": "16 of month",
"output": "12"
},
{
"input": "18 of month",
"output": "12"
},
{
"input": "19 of month",
"output": "12"
},
{
"input": "20 of month",
"output": "12"
},
{
"input": "21 of month",
"output": "12"
},
{
"input": "22 of month",
"output": "12"
},
{
"input": "23 of month",
"output": "12"
},
{
"input": "24 of month",
"output": "12"
},
{
"input": "25 of month",
"output": "12"
},
{
"input": "26 of month",
"output": "12"
},
{
"input": "27 of month",
"output": "12"
},
{
"input": "28 of month",
"output": "12"
},
{
"input": "29 of month",
"output": "12"
}
] | 1,612,985,201 | 701 | Python 3 | OK | TESTS | 38 | 77 | 0 | # basic method of input output
# input N
import sys
s = sys.stdin.readline()
if "of week" in s:
d = int(s[:-8])
if d == 5 or d == 6:
print(53)
exit(0)
print(52)
exit(0)
m = int(s[:-9])
if m > 30: # in [1,3,5,7,8,10,12]:
print(7)
exit(0)
if m == 30:
print(11)
exit(0)
print(12)
| Title: New Year and Days
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Today is Wednesday, the third day of the week. What's more interesting is that tomorrow is the last day of the year 2015.
Limak is a little polar bear. He enjoyed this year a lot. Now, he is so eager to the coming year 2016.
Limak wants to prove how responsible a bear he is. He is going to regularly save candies for the entire year 2016! He considers various saving plans. He can save one candy either on some fixed day of the week or on some fixed day of the month.
Limak chose one particular plan. He isn't sure how many candies he will save in the 2016 with his plan. Please, calculate it and tell him.
Input Specification:
The only line of the input is in one of the following two formats:
- "*x* of week" where *x* (1<=≤<=*x*<=≤<=7) denotes the day of the week. The 1-st day is Monday and the 7-th one is Sunday. - "*x* of month" where *x* (1<=≤<=*x*<=≤<=31) denotes the day of the month.
Output Specification:
Print one integer — the number of candies Limak will save in the year 2016.
Demo Input:
['4 of week\n', '30 of month\n']
Demo Output:
['52\n', '11\n']
Note:
Polar bears use the Gregorian calendar. It is the most common calendar and you likely use it too. You can read about it on Wikipedia if you want to – [https://en.wikipedia.org/wiki/Gregorian_calendar](https://en.wikipedia.org/wiki/Gregorian_calendar). The week starts with Monday.
In the first sample Limak wants to save one candy on each Thursday (the 4-th day of the week). There are 52 Thursdays in the 2016. Thus, he will save 52 candies in total.
In the second sample Limak wants to save one candy on the 30-th day of each month. There is the 30-th day in exactly 11 months in the 2016 — all months but February. It means that Limak will save 11 candies in total. | ```python
# basic method of input output
# input N
import sys
s = sys.stdin.readline()
if "of week" in s:
d = int(s[:-8])
if d == 5 or d == 6:
print(53)
exit(0)
print(52)
exit(0)
m = int(s[:-9])
if m > 30: # in [1,3,5,7,8,10,12]:
print(7)
exit(0)
if m == 30:
print(11)
exit(0)
print(12)
``` | 3 | |
540 | A | Combination Lock | PROGRAMMING | 800 | [
"implementation"
] | null | null | Scrooge McDuck keeps his most treasured savings in a home safe with a combination lock. Each time he wants to put there the treasures that he's earned fair and square, he has to open the lock.
The combination lock is represented by *n* rotating disks with digits from 0 to 9 written on them. Scrooge McDuck has to turn some disks so that the combination of digits on the disks forms a secret combination. In one move, he can rotate one disk one digit forwards or backwards. In particular, in one move he can go from digit 0 to digit 9 and vice versa. What minimum number of actions does he need for that? | The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of disks on the combination lock.
The second line contains a string of *n* digits — the original state of the disks.
The third line contains a string of *n* digits — Scrooge McDuck's combination that opens the lock. | Print a single integer — the minimum number of moves Scrooge McDuck needs to open the lock. | [
"5\n82195\n64723\n"
] | [
"13\n"
] | In the sample he needs 13 moves:
- 1 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b8967f65a723782358b93eff9ce69f336817cf70.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 2 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/07fa58573ece0d32c4d555e498d2b24d2f70f36a.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 3 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/cc2275d9252aae35a6867c6a5b4ba7596e9a7626.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 4 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b100aea470fcaaab4e9529b234ba0d7875943c10.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 5 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/eb2cbe4324cebca65b85816262a85e473cd65967.png" style="max-width: 100.0%;max-height: 100.0%;"/> | 500 | [
{
"input": "5\n82195\n64723",
"output": "13"
},
{
"input": "12\n102021090898\n010212908089",
"output": "16"
},
{
"input": "1\n8\n1",
"output": "3"
},
{
"input": "2\n83\n57",
"output": "7"
},
{
"input": "10\n0728592530\n1362615763",
"output": "27"
},
{
"input": "100\n4176196363694273682807653052945037727131821799902563705176501742060696655282954944720643131654235909\n3459912084922154505910287499879975659298239371519889866585472674423008837878123067103005344986554746",
"output": "245"
},
{
"input": "1\n8\n1",
"output": "3"
},
{
"input": "2\n83\n57",
"output": "7"
},
{
"input": "3\n607\n684",
"output": "5"
},
{
"input": "4\n0809\n0636",
"output": "8"
},
{
"input": "5\n84284\n08941",
"output": "16"
},
{
"input": "25\n8037856825987124762280548\n9519431339078678836940020",
"output": "72"
},
{
"input": "125\n23269567683904664184142384849516523616863461607751021071772615078579713054027902974007001544768640273491193035874486891541257\n47635110303703399505805044019026243695451609639556649012447370081552870340011971572363458960190590266459684717415349529509024",
"output": "305"
},
{
"input": "5\n84284\n08941",
"output": "16"
},
{
"input": "25\n8037856825987124762285484\n9519431339078678836940202",
"output": "74"
},
{
"input": "125\n23269567689466418414238845152168634610771021717726157879713054270294007001544768647391193035874486891412573389247025830678706\n47635110307339950580504010224954516093956649124473708152870340117152363458960190596659684717415349529090241694059599629136831",
"output": "357"
},
{
"input": "5\n84284\n08941",
"output": "16"
},
{
"input": "25\n8378525987476228048406972\n9194339078883694020217816",
"output": "55"
},
{
"input": "125\n23269576839046618414238484916523616863461607750210717761078579713054027902974007015447686027349193035874486891541257338624472\n47635103037033950580504401926243695451609639556490124437081552870340011971572363489601905026645984717415349529509024169604599",
"output": "274"
},
{
"input": "1\n0\n0",
"output": "0"
},
{
"input": "1\n7\n7",
"output": "0"
},
{
"input": "1\n0\n5",
"output": "5"
},
{
"input": "1\n2\n7",
"output": "5"
},
{
"input": "1\n7\n9",
"output": "2"
},
{
"input": "1\n9\n7",
"output": "2"
},
{
"input": "1\n2\n9",
"output": "3"
},
{
"input": "1\n9\n2",
"output": "3"
},
{
"input": "25\n3164978461316464614169874\n9413979197249127496597357",
"output": "66"
},
{
"input": "4\n9999\n9999",
"output": "0"
},
{
"input": "2\n11\n11",
"output": "0"
}
] | 1,642,589,684 | 2,147,483,647 | Python 3 | RUNTIME_ERROR | TESTS | 0 | 46 | 0 | def fun(a, b):
i = b
c = 0
while i%10!=a:
i += 1
c += 1
m = 0
i = b
while i%10!=a:
i -=1
m += 1
return min(m, c)
for t in range(int(input())):
x = list(input())
y = list(input())
z = 0
for i in range(len(x)):
z = z + fun(int(x[i]), int(y[i]))
print(z) | Title: Combination Lock
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Scrooge McDuck keeps his most treasured savings in a home safe with a combination lock. Each time he wants to put there the treasures that he's earned fair and square, he has to open the lock.
The combination lock is represented by *n* rotating disks with digits from 0 to 9 written on them. Scrooge McDuck has to turn some disks so that the combination of digits on the disks forms a secret combination. In one move, he can rotate one disk one digit forwards or backwards. In particular, in one move he can go from digit 0 to digit 9 and vice versa. What minimum number of actions does he need for that?
Input Specification:
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of disks on the combination lock.
The second line contains a string of *n* digits — the original state of the disks.
The third line contains a string of *n* digits — Scrooge McDuck's combination that opens the lock.
Output Specification:
Print a single integer — the minimum number of moves Scrooge McDuck needs to open the lock.
Demo Input:
['5\n82195\n64723\n']
Demo Output:
['13\n']
Note:
In the sample he needs 13 moves:
- 1 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b8967f65a723782358b93eff9ce69f336817cf70.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 2 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/07fa58573ece0d32c4d555e498d2b24d2f70f36a.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 3 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/cc2275d9252aae35a6867c6a5b4ba7596e9a7626.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 4 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b100aea470fcaaab4e9529b234ba0d7875943c10.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 5 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/eb2cbe4324cebca65b85816262a85e473cd65967.png" style="max-width: 100.0%;max-height: 100.0%;"/> | ```python
def fun(a, b):
i = b
c = 0
while i%10!=a:
i += 1
c += 1
m = 0
i = b
while i%10!=a:
i -=1
m += 1
return min(m, c)
for t in range(int(input())):
x = list(input())
y = list(input())
z = 0
for i in range(len(x)):
z = z + fun(int(x[i]), int(y[i]))
print(z)
``` | -1 | |
719 | B | Anatoly and Cockroaches | PROGRAMMING | 1,400 | [
"greedy"
] | null | null | Anatoly lives in the university dorm as many other students do. As you know, cockroaches are also living there together with students. Cockroaches might be of two colors: black and red. There are *n* cockroaches living in Anatoly's room.
Anatoly just made all his cockroaches to form a single line. As he is a perfectionist, he would like the colors of cockroaches in the line to alternate. He has a can of black paint and a can of red paint. In one turn he can either swap any two cockroaches, or take any single cockroach and change it's color.
Help Anatoly find out the minimum number of turns he needs to make the colors of cockroaches in the line alternate. | The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of cockroaches.
The second line contains a string of length *n*, consisting of characters 'b' and 'r' that denote black cockroach and red cockroach respectively. | Print one integer — the minimum number of moves Anatoly has to perform in order to make the colors of cockroaches in the line to alternate. | [
"5\nrbbrr\n",
"5\nbbbbb\n",
"3\nrbr\n"
] | [
"1\n",
"2\n",
"0\n"
] | In the first sample, Anatoly has to swap third and fourth cockroaches. He needs 1 turn to do this.
In the second sample, the optimum answer is to paint the second and the fourth cockroaches red. This requires 2 turns.
In the third sample, the colors of cockroaches in the line are alternating already, thus the answer is 0. | 1,000 | [
{
"input": "5\nrbbrr",
"output": "1"
},
{
"input": "5\nbbbbb",
"output": "2"
},
{
"input": "3\nrbr",
"output": "0"
},
{
"input": "13\nrbbbrbrrbrrbb",
"output": "3"
},
{
"input": "18\nrrrrrrrrrrrrrrrrrb",
"output": "8"
},
{
"input": "100\nbrbbbrrrbbrbrbbrbbrbbbbrbbrrbbbrrbbbbrbrbbbbbbbbbbbbbbbbrrrrbbbbrrrbbbbbbbrbrrbrbbbbrrrbbbbrbbrbbbrb",
"output": "34"
},
{
"input": "166\nrbbbbbbbbbbbbrbrrbbrbbbrbbbbbbbbbbrbbbbbbrbbbrbbbbbrbbbbbbbrbbbbbbbrbbrbbbbbbbbrbbbbbbbbbbbbbbrrbbbrbbbbbbbbbbbbbbrbrbbbbbbbbbbbrbbbbbbbbbbbbbbrbbbbbbbbbbbbbbbbbbbbbb",
"output": "70"
},
{
"input": "1\nr",
"output": "0"
},
{
"input": "1\nb",
"output": "0"
},
{
"input": "2\nrb",
"output": "0"
},
{
"input": "2\nbr",
"output": "0"
},
{
"input": "2\nrr",
"output": "1"
},
{
"input": "2\nbb",
"output": "1"
},
{
"input": "8\nrbbrbrbr",
"output": "1"
},
{
"input": "7\nrrbrbrb",
"output": "1"
}
] | 1,474,639,863 | 3,963 | Python 3 | WRONG_ANSWER | PRETESTS | 4 | 62 | 0 | n = int(input())
colors = list(input())
a = colors[0]
b = colors[1]
invalid = 0
for i in range(2, n):
c = colors[i]
if a == c and a == b:
invalid += 1
if a is 'r':
b = 'b'
else:
b = 'r'
change_one = True
change_two = False
elif a == b and b != c:
invalid += 1
aux = b
b = c
c = aux
change_two = True
change_one = False
a = b
b = c
if invalid is not 0:
print(invalid)
else:
print(0)
| Title: Anatoly and Cockroaches
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Anatoly lives in the university dorm as many other students do. As you know, cockroaches are also living there together with students. Cockroaches might be of two colors: black and red. There are *n* cockroaches living in Anatoly's room.
Anatoly just made all his cockroaches to form a single line. As he is a perfectionist, he would like the colors of cockroaches in the line to alternate. He has a can of black paint and a can of red paint. In one turn he can either swap any two cockroaches, or take any single cockroach and change it's color.
Help Anatoly find out the minimum number of turns he needs to make the colors of cockroaches in the line alternate.
Input Specification:
The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of cockroaches.
The second line contains a string of length *n*, consisting of characters 'b' and 'r' that denote black cockroach and red cockroach respectively.
Output Specification:
Print one integer — the minimum number of moves Anatoly has to perform in order to make the colors of cockroaches in the line to alternate.
Demo Input:
['5\nrbbrr\n', '5\nbbbbb\n', '3\nrbr\n']
Demo Output:
['1\n', '2\n', '0\n']
Note:
In the first sample, Anatoly has to swap third and fourth cockroaches. He needs 1 turn to do this.
In the second sample, the optimum answer is to paint the second and the fourth cockroaches red. This requires 2 turns.
In the third sample, the colors of cockroaches in the line are alternating already, thus the answer is 0. | ```python
n = int(input())
colors = list(input())
a = colors[0]
b = colors[1]
invalid = 0
for i in range(2, n):
c = colors[i]
if a == c and a == b:
invalid += 1
if a is 'r':
b = 'b'
else:
b = 'r'
change_one = True
change_two = False
elif a == b and b != c:
invalid += 1
aux = b
b = c
c = aux
change_two = True
change_one = False
a = b
b = c
if invalid is not 0:
print(invalid)
else:
print(0)
``` | 0 | |
227 | B | Effective Approach | PROGRAMMING | 1,100 | [
"implementation"
] | null | null | Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute. | The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat. | Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier. | [
"2\n1 2\n1\n1\n",
"2\n2 1\n1\n1\n",
"3\n3 1 2\n3\n1 2 3\n"
] | [
"1 2\n",
"2 1\n",
"6 6\n"
] | In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element). | 1,000 | [
{
"input": "2\n1 2\n1\n1",
"output": "1 2"
},
{
"input": "2\n2 1\n1\n1",
"output": "2 1"
},
{
"input": "3\n3 1 2\n3\n1 2 3",
"output": "6 6"
},
{
"input": "9\n2 9 3 1 6 4 7 8 5\n9\n5 1 5 2 8 4 4 4 5",
"output": "58 32"
},
{
"input": "10\n3 10 9 2 7 6 5 8 4 1\n1\n4",
"output": "9 2"
},
{
"input": "10\n5 2 10 8 3 1 9 7 6 4\n9\n2 5 9 2 3 2 5 9 8",
"output": "31 68"
},
{
"input": "9\n3 8 4 7 1 2 5 6 9\n3\n2 7 1",
"output": "15 15"
},
{
"input": "9\n5 3 8 4 2 6 1 7 9\n4\n6 1 9 2",
"output": "27 13"
},
{
"input": "4\n1 3 2 4\n4\n3 1 2 3",
"output": "8 12"
},
{
"input": "3\n1 2 3\n8\n3 2 1 1 2 3 1 2",
"output": "15 17"
}
] | 1,629,339,066 | 2,147,483,647 | Python 3 | TIME_LIMIT_EXCEEDED | TESTS | 6 | 2,000 | 16,486,400 | n,a,m,b=int(input()),list(map(int,input().split())),int(input()),list(map(int,input().split()))
v,p,=0,0
for x in b:
v+=a.index(x)+1
p+=len(a)-a.index(x)
print(v,p) | Title: Effective Approach
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat.
Output Specification:
Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier.
Demo Input:
['2\n1 2\n1\n1\n', '2\n2 1\n1\n1\n', '3\n3 1 2\n3\n1 2 3\n']
Demo Output:
['1 2\n', '2 1\n', '6 6\n']
Note:
In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element). | ```python
n,a,m,b=int(input()),list(map(int,input().split())),int(input()),list(map(int,input().split()))
v,p,=0,0
for x in b:
v+=a.index(x)+1
p+=len(a)-a.index(x)
print(v,p)
``` | 0 | |
474 | B | Worms | PROGRAMMING | 1,200 | [
"binary search",
"implementation"
] | null | null | It is lunch time for Mole. His friend, Marmot, prepared him a nice game for lunch.
Marmot brought Mole *n* ordered piles of worms such that *i*-th pile contains *a**i* worms. He labeled all these worms with consecutive integers: worms in first pile are labeled with numbers 1 to *a*1, worms in second pile are labeled with numbers *a*1<=+<=1 to *a*1<=+<=*a*2 and so on. See the example for a better understanding.
Mole can't eat all the worms (Marmot brought a lot) and, as we all know, Mole is blind, so Marmot tells him the labels of the best juicy worms. Marmot will only give Mole a worm if Mole says correctly in which pile this worm is contained.
Poor Mole asks for your help. For all juicy worms said by Marmot, tell Mole the correct answers. | The first line contains a single integer *n* (1<=≤<=*n*<=≤<=105), the number of piles.
The second line contains *n* integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=103, *a*1<=+<=*a*2<=+<=...<=+<=*a**n*<=≤<=106), where *a**i* is the number of worms in the *i*-th pile.
The third line contains single integer *m* (1<=≤<=*m*<=≤<=105), the number of juicy worms said by Marmot.
The fourth line contains *m* integers *q*1,<=*q*2,<=...,<=*q**m* (1<=≤<=*q**i*<=≤<=*a*1<=+<=*a*2<=+<=...<=+<=*a**n*), the labels of the juicy worms. | Print *m* lines to the standard output. The *i*-th line should contain an integer, representing the number of the pile where the worm labeled with the number *q**i* is. | [
"5\n2 7 3 4 9\n3\n1 25 11\n"
] | [
"1\n5\n3\n"
] | For the sample input:
- The worms with labels from [1, 2] are in the first pile. - The worms with labels from [3, 9] are in the second pile. - The worms with labels from [10, 12] are in the third pile. - The worms with labels from [13, 16] are in the fourth pile. - The worms with labels from [17, 25] are in the fifth pile. | 1,000 | [
{
"input": "5\n2 7 3 4 9\n3\n1 25 11",
"output": "1\n5\n3"
}
] | 1,696,746,704 | 2,147,483,647 | Python 3 | OK | TESTS | 38 | 312 | 18,124,800 | pile=int(input())
piles=list(map(int,input().split()))
worm=int(input())
worms=list(map(int,input().split()))
worms_copy=worms[:]
worms.sort()
answers={}
digit=0
pre=0
for i in worms:
tem=i
i-=pre
while i > 0:
i-=piles[digit]
if i>0:
digit+=1
if digit>0:
pre=tem-i-piles[digit]
answers[tem]=digit+1
for keys in worms_copy:
print(answers[keys]) | Title: Worms
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
It is lunch time for Mole. His friend, Marmot, prepared him a nice game for lunch.
Marmot brought Mole *n* ordered piles of worms such that *i*-th pile contains *a**i* worms. He labeled all these worms with consecutive integers: worms in first pile are labeled with numbers 1 to *a*1, worms in second pile are labeled with numbers *a*1<=+<=1 to *a*1<=+<=*a*2 and so on. See the example for a better understanding.
Mole can't eat all the worms (Marmot brought a lot) and, as we all know, Mole is blind, so Marmot tells him the labels of the best juicy worms. Marmot will only give Mole a worm if Mole says correctly in which pile this worm is contained.
Poor Mole asks for your help. For all juicy worms said by Marmot, tell Mole the correct answers.
Input Specification:
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=105), the number of piles.
The second line contains *n* integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=103, *a*1<=+<=*a*2<=+<=...<=+<=*a**n*<=≤<=106), where *a**i* is the number of worms in the *i*-th pile.
The third line contains single integer *m* (1<=≤<=*m*<=≤<=105), the number of juicy worms said by Marmot.
The fourth line contains *m* integers *q*1,<=*q*2,<=...,<=*q**m* (1<=≤<=*q**i*<=≤<=*a*1<=+<=*a*2<=+<=...<=+<=*a**n*), the labels of the juicy worms.
Output Specification:
Print *m* lines to the standard output. The *i*-th line should contain an integer, representing the number of the pile where the worm labeled with the number *q**i* is.
Demo Input:
['5\n2 7 3 4 9\n3\n1 25 11\n']
Demo Output:
['1\n5\n3\n']
Note:
For the sample input:
- The worms with labels from [1, 2] are in the first pile. - The worms with labels from [3, 9] are in the second pile. - The worms with labels from [10, 12] are in the third pile. - The worms with labels from [13, 16] are in the fourth pile. - The worms with labels from [17, 25] are in the fifth pile. | ```python
pile=int(input())
piles=list(map(int,input().split()))
worm=int(input())
worms=list(map(int,input().split()))
worms_copy=worms[:]
worms.sort()
answers={}
digit=0
pre=0
for i in worms:
tem=i
i-=pre
while i > 0:
i-=piles[digit]
if i>0:
digit+=1
if digit>0:
pre=tem-i-piles[digit]
answers[tem]=digit+1
for keys in worms_copy:
print(answers[keys])
``` | 3 | |
401 | C | Team | PROGRAMMING | 1,400 | [
"constructive algorithms",
"greedy",
"implementation"
] | null | null | Now it's time of Olympiads. Vanya and Egor decided to make his own team to take part in a programming Olympiad. They've been best friends ever since primary school and hopefully, that can somehow help them in teamwork.
For each team Olympiad, Vanya takes his play cards with numbers. He takes only the cards containing numbers 1 and 0. The boys are very superstitious. They think that they can do well at the Olympiad if they begin with laying all the cards in a row so that:
- there wouldn't be a pair of any side-adjacent cards with zeroes in a row; - there wouldn't be a group of three consecutive cards containing numbers one.
Today Vanya brought *n* cards with zeroes and *m* cards with numbers one. The number of cards was so much that the friends do not know how to put all those cards in the described way. Help them find the required arrangement of the cards or else tell the guys that it is impossible to arrange cards in such a way. | The first line contains two integers: *n* (1<=≤<=*n*<=≤<=106) — the number of cards containing number 0; *m* (1<=≤<=*m*<=≤<=106) — the number of cards containing number 1. | In a single line print the required sequence of zeroes and ones without any spaces. If such sequence is impossible to obtain, print -1. | [
"1 2\n",
"4 8\n",
"4 10\n",
"1 5\n"
] | [
"101\n",
"110110110101\n",
"11011011011011\n",
"-1\n"
] | none | 1,500 | [
{
"input": "1 2",
"output": "101"
},
{
"input": "4 8",
"output": "110110110101"
},
{
"input": "4 10",
"output": "11011011011011"
},
{
"input": "1 5",
"output": "-1"
},
{
"input": "3 4",
"output": "1010101"
},
{
"input": "3 10",
"output": "-1"
},
{
"input": "74 99",
"output": "11011011011011011011011011011011011011011011011011011011011011011011011010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101"
},
{
"input": "19 30",
"output": "1101101101101101101101101101101010101010101010101"
},
{
"input": "33 77",
"output": "-1"
},
{
"input": "3830 6966",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "1000000 1000000",
"output": "1010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101..."
},
{
"input": "1027 2030",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "4610 4609",
"output": "0101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010..."
},
{
"input": "3342 3339",
"output": "-1"
},
{
"input": "7757 7755",
"output": "-1"
},
{
"input": "10 8",
"output": "-1"
},
{
"input": "4247 8495",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "7101 14204",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "9801 19605",
"output": "-1"
},
{
"input": "4025 6858",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "7129 13245",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "8826 12432",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "6322 9256",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "8097 14682",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "6196 6197",
"output": "1010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101..."
},
{
"input": "1709 2902",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "455 512",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101..."
},
{
"input": "1781 1272",
"output": "-1"
},
{
"input": "3383 5670",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "954 1788",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "9481 15554",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "9079 100096",
"output": "-1"
},
{
"input": "481533 676709",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "423472 564888",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "227774 373297",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "42346 51898",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "739107 1000000",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "455043 798612",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "801460 801459",
"output": "0101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010101010..."
},
{
"input": "303498 503791",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "518822 597833",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "32342 64687",
"output": "-1"
},
{
"input": "873192 873189",
"output": "-1"
},
{
"input": "384870 450227",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "201106 208474",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "775338 980888",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "263338 393171",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "241043 330384",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "307203 614408",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "379310 417986",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "661101 785111",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "284634 319008",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "500000 1000000",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "499999 1000000",
"output": "1101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101101..."
},
{
"input": "3 1",
"output": "-1"
},
{
"input": "14124 242112",
"output": "-1"
},
{
"input": "2 1",
"output": "010"
},
{
"input": "2 3",
"output": "10101"
},
{
"input": "1 4",
"output": "11011"
},
{
"input": "2 6",
"output": "11011011"
},
{
"input": "2 5",
"output": "1101101"
},
{
"input": "2 4",
"output": "110101"
},
{
"input": "2 3",
"output": "10101"
},
{
"input": "2 2",
"output": "1010"
},
{
"input": "2 1",
"output": "010"
},
{
"input": "1 1",
"output": "10"
},
{
"input": "1 3",
"output": "1101"
},
{
"input": "3 2",
"output": "01010"
},
{
"input": "5 4",
"output": "010101010"
},
{
"input": "4 3",
"output": "0101010"
},
{
"input": "11 10",
"output": "010101010101010101010"
},
{
"input": "8 7",
"output": "010101010101010"
},
{
"input": "4 2",
"output": "-1"
},
{
"input": "6 5",
"output": "01010101010"
},
{
"input": "3 7",
"output": "1101101101"
},
{
"input": "5 1",
"output": "-1"
},
{
"input": "10 1",
"output": "-1"
},
{
"input": "4 9",
"output": "1101101101101"
},
{
"input": "6 4",
"output": "-1"
},
{
"input": "12 10",
"output": "-1"
},
{
"input": "4 100",
"output": "-1"
}
] | 1,624,424,492 | 2,147,483,647 | Python 3 | OK | TESTS | 81 | 77 | 3,686,400 | # -*- coding: utf-8 -*-
"""Untitled68.ipynb
Automatically generated by Colaboratory.
Original file is located at
https://colab.research.google.com/drive/1yvZY7V0Q83TMsZCyMfFGv331MUmhHXMr
"""
n0,n1=map(int,input().split())
if n1==n0:
str="10"*n0
elif n1>n0 and n1<=n0*2+2:
if n1<=n0*2:
str="110"*(n1-n0)
str=str+"10"*(2*n0-n1)
else:
str="110"*n0
str=str+"1"*(n1-2*n0)
elif n0>n1 and n0<=n1+1:
str="01"*n1
str=str+"0"
else:
str="-1"
print(str) | Title: Team
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Now it's time of Olympiads. Vanya and Egor decided to make his own team to take part in a programming Olympiad. They've been best friends ever since primary school and hopefully, that can somehow help them in teamwork.
For each team Olympiad, Vanya takes his play cards with numbers. He takes only the cards containing numbers 1 and 0. The boys are very superstitious. They think that they can do well at the Olympiad if they begin with laying all the cards in a row so that:
- there wouldn't be a pair of any side-adjacent cards with zeroes in a row; - there wouldn't be a group of three consecutive cards containing numbers one.
Today Vanya brought *n* cards with zeroes and *m* cards with numbers one. The number of cards was so much that the friends do not know how to put all those cards in the described way. Help them find the required arrangement of the cards or else tell the guys that it is impossible to arrange cards in such a way.
Input Specification:
The first line contains two integers: *n* (1<=≤<=*n*<=≤<=106) — the number of cards containing number 0; *m* (1<=≤<=*m*<=≤<=106) — the number of cards containing number 1.
Output Specification:
In a single line print the required sequence of zeroes and ones without any spaces. If such sequence is impossible to obtain, print -1.
Demo Input:
['1 2\n', '4 8\n', '4 10\n', '1 5\n']
Demo Output:
['101\n', '110110110101\n', '11011011011011\n', '-1\n']
Note:
none | ```python
# -*- coding: utf-8 -*-
"""Untitled68.ipynb
Automatically generated by Colaboratory.
Original file is located at
https://colab.research.google.com/drive/1yvZY7V0Q83TMsZCyMfFGv331MUmhHXMr
"""
n0,n1=map(int,input().split())
if n1==n0:
str="10"*n0
elif n1>n0 and n1<=n0*2+2:
if n1<=n0*2:
str="110"*(n1-n0)
str=str+"10"*(2*n0-n1)
else:
str="110"*n0
str=str+"1"*(n1-2*n0)
elif n0>n1 and n0<=n1+1:
str="01"*n1
str=str+"0"
else:
str="-1"
print(str)
``` | 3 | |
78 | B | Easter Eggs | PROGRAMMING | 1,200 | [
"constructive algorithms",
"implementation"
] | B. Easter Eggs | 2 | 256 | The Easter Rabbit laid *n* eggs in a circle and is about to paint them.
Each egg should be painted one color out of 7: red, orange, yellow, green, blue, indigo or violet. Also, the following conditions should be satisfied:
- Each of the seven colors should be used to paint at least one egg. - Any four eggs lying sequentially should be painted different colors.
Help the Easter Rabbit paint the eggs in the required manner. We know that it is always possible. | The only line contains an integer *n* — the amount of eggs (7<=≤<=*n*<=≤<=100). | Print one line consisting of *n* characters. The *i*-th character should describe the color of the *i*-th egg in the order they lie in the circle. The colors should be represented as follows: "R" stands for red, "O" stands for orange, "Y" stands for yellow, "G" stands for green, "B" stands for blue, "I" stands for indigo, "V" stands for violet.
If there are several answers, print any of them. | [
"8\n",
"13\n"
] | [
"ROYGRBIV\n",
"ROYGBIVGBIVYG\n"
] | The way the eggs will be painted in the first sample is shown on the picture: | 1,000 | [
{
"input": "8",
"output": "ROYGBIVG"
},
{
"input": "13",
"output": "ROYGBIVOYGBIV"
},
{
"input": "7",
"output": "ROYGBIV"
},
{
"input": "10",
"output": "ROYGBIVYGB"
},
{
"input": "14",
"output": "ROYGBIVROYGBIV"
},
{
"input": "50",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVG"
},
{
"input": "9",
"output": "ROYGBIVGB"
},
{
"input": "11",
"output": "ROYGBIVYGBI"
},
{
"input": "12",
"output": "ROYGBIVOYGBI"
},
{
"input": "15",
"output": "ROYGBIVROYGBIVG"
},
{
"input": "16",
"output": "ROYGBIVROYGBIVGB"
},
{
"input": "17",
"output": "ROYGBIVROYGBIVYGB"
},
{
"input": "18",
"output": "ROYGBIVROYGBIVYGBI"
},
{
"input": "19",
"output": "ROYGBIVROYGBIVOYGBI"
},
{
"input": "20",
"output": "ROYGBIVROYGBIVOYGBIV"
},
{
"input": "21",
"output": "ROYGBIVROYGBIVROYGBIV"
},
{
"input": "22",
"output": "ROYGBIVROYGBIVROYGBIVG"
},
{
"input": "23",
"output": "ROYGBIVROYGBIVROYGBIVGB"
},
{
"input": "24",
"output": "ROYGBIVROYGBIVROYGBIVYGB"
},
{
"input": "25",
"output": "ROYGBIVROYGBIVROYGBIVYGBI"
},
{
"input": "28",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIV"
},
{
"input": "29",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVG"
},
{
"input": "34",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVOYGBIV"
},
{
"input": "43",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVG"
},
{
"input": "61",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVOYGBI"
},
{
"input": "79",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVGB"
},
{
"input": "81",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVYGBI"
},
{
"input": "92",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVG"
},
{
"input": "95",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVYGBI"
},
{
"input": "96",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVOYGBI"
},
{
"input": "97",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVOYGBIV"
},
{
"input": "98",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIV"
},
{
"input": "99",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVG"
},
{
"input": "100",
"output": "ROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVROYGBIVGB"
}
] | 1,603,996,726 | 2,147,483,647 | Python 3 | OK | TESTS | 34 | 218 | 0 | n=int(input())
j=0;x=3;f=0
s=["R","O","Y","G","B","I","V"]
for i in range(0,n):
print(s[j],end='');j+=1;
if(j==7):j=3
| Title: Easter Eggs
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
The Easter Rabbit laid *n* eggs in a circle and is about to paint them.
Each egg should be painted one color out of 7: red, orange, yellow, green, blue, indigo or violet. Also, the following conditions should be satisfied:
- Each of the seven colors should be used to paint at least one egg. - Any four eggs lying sequentially should be painted different colors.
Help the Easter Rabbit paint the eggs in the required manner. We know that it is always possible.
Input Specification:
The only line contains an integer *n* — the amount of eggs (7<=≤<=*n*<=≤<=100).
Output Specification:
Print one line consisting of *n* characters. The *i*-th character should describe the color of the *i*-th egg in the order they lie in the circle. The colors should be represented as follows: "R" stands for red, "O" stands for orange, "Y" stands for yellow, "G" stands for green, "B" stands for blue, "I" stands for indigo, "V" stands for violet.
If there are several answers, print any of them.
Demo Input:
['8\n', '13\n']
Demo Output:
['ROYGRBIV\n', 'ROYGBIVGBIVYG\n']
Note:
The way the eggs will be painted in the first sample is shown on the picture: | ```python
n=int(input())
j=0;x=3;f=0
s=["R","O","Y","G","B","I","V"]
for i in range(0,n):
print(s[j],end='');j+=1;
if(j==7):j=3
``` | 3.9455 |
764 | A | Taymyr is calling you | PROGRAMMING | 800 | [
"brute force",
"implementation",
"math"
] | null | null | Comrade Dujikov is busy choosing artists for Timofey's birthday and is recieving calls from Taymyr from Ilia-alpinist.
Ilia-alpinist calls every *n* minutes, i.e. in minutes *n*, 2*n*, 3*n* and so on. Artists come to the comrade every *m* minutes, i.e. in minutes *m*, 2*m*, 3*m* and so on. The day is *z* minutes long, i.e. the day consists of minutes 1,<=2,<=...,<=*z*. How many artists should be killed so that there are no artists in the room when Ilia calls? Consider that a call and a talk with an artist take exactly one minute. | The only string contains three integers — *n*, *m* and *z* (1<=≤<=*n*,<=*m*,<=*z*<=≤<=104). | Print single integer — the minimum number of artists that should be killed so that there are no artists in the room when Ilia calls. | [
"1 1 10\n",
"1 2 5\n",
"2 3 9\n"
] | [
"10\n",
"2\n",
"1\n"
] | Taymyr is a place in the north of Russia.
In the first test the artists come each minute, as well as the calls, so we need to kill all of them.
In the second test we need to kill artists which come on the second and the fourth minutes.
In the third test — only the artist which comes on the sixth minute. | 500 | [
{
"input": "1 1 10",
"output": "10"
},
{
"input": "1 2 5",
"output": "2"
},
{
"input": "2 3 9",
"output": "1"
},
{
"input": "4 8 9",
"output": "1"
},
{
"input": "7 9 2",
"output": "0"
},
{
"input": "10000 10000 10000",
"output": "1"
},
{
"input": "24 22 9235",
"output": "34"
},
{
"input": "74 8 417",
"output": "1"
},
{
"input": "972 1 203",
"output": "0"
},
{
"input": "550 1 754",
"output": "1"
},
{
"input": "860 1 884",
"output": "1"
},
{
"input": "358 2 809",
"output": "2"
},
{
"input": "33 27 216",
"output": "0"
},
{
"input": "2940 1 9311",
"output": "3"
},
{
"input": "4624 1 1953",
"output": "0"
},
{
"input": "2696 2 7345",
"output": "2"
},
{
"input": "3443 2 6701",
"output": "0"
},
{
"input": "3 613 2275",
"output": "1"
},
{
"input": "1 10000 10000",
"output": "1"
},
{
"input": "10000 1 10000",
"output": "1"
},
{
"input": "1 1 1",
"output": "1"
},
{
"input": "1 1 10000",
"output": "10000"
},
{
"input": "34 27 10000",
"output": "10"
},
{
"input": "2 2 9999",
"output": "4999"
},
{
"input": "2 2 1",
"output": "0"
},
{
"input": "6 4 36",
"output": "3"
},
{
"input": "33 6 3005",
"output": "45"
},
{
"input": "5 1 20",
"output": "4"
},
{
"input": "1 2 10",
"output": "5"
},
{
"input": "2 1 100",
"output": "50"
},
{
"input": "10 20 10000",
"output": "500"
},
{
"input": "8 12 12",
"output": "0"
}
] | 1,649,389,309 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 3 | 31 | 0 | a,b,c = map(int,input().split())
print(c//(a*b)) | Title: Taymyr is calling you
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Comrade Dujikov is busy choosing artists for Timofey's birthday and is recieving calls from Taymyr from Ilia-alpinist.
Ilia-alpinist calls every *n* minutes, i.e. in minutes *n*, 2*n*, 3*n* and so on. Artists come to the comrade every *m* minutes, i.e. in minutes *m*, 2*m*, 3*m* and so on. The day is *z* minutes long, i.e. the day consists of minutes 1,<=2,<=...,<=*z*. How many artists should be killed so that there are no artists in the room when Ilia calls? Consider that a call and a talk with an artist take exactly one minute.
Input Specification:
The only string contains three integers — *n*, *m* and *z* (1<=≤<=*n*,<=*m*,<=*z*<=≤<=104).
Output Specification:
Print single integer — the minimum number of artists that should be killed so that there are no artists in the room when Ilia calls.
Demo Input:
['1 1 10\n', '1 2 5\n', '2 3 9\n']
Demo Output:
['10\n', '2\n', '1\n']
Note:
Taymyr is a place in the north of Russia.
In the first test the artists come each minute, as well as the calls, so we need to kill all of them.
In the second test we need to kill artists which come on the second and the fourth minutes.
In the third test — only the artist which comes on the sixth minute. | ```python
a,b,c = map(int,input().split())
print(c//(a*b))
``` | 0 | |
584 | B | Kolya and Tanya | PROGRAMMING | 1,500 | [
"combinatorics"
] | null | null | Kolya loves putting gnomes at the circle table and giving them coins, and Tanya loves studying triplets of gnomes, sitting in the vertexes of an equilateral triangle.
More formally, there are 3*n* gnomes sitting in a circle. Each gnome can have from 1 to 3 coins. Let's number the places in the order they occur in the circle by numbers from 0 to 3*n*<=-<=1, let the gnome sitting on the *i*-th place have *a**i* coins. If there is an integer *i* (0<=≤<=*i*<=<<=*n*) such that *a**i*<=+<=*a**i*<=+<=*n*<=+<=*a**i*<=+<=2*n*<=≠<=6, then Tanya is satisfied.
Count the number of ways to choose *a**i* so that Tanya is satisfied. As there can be many ways of distributing coins, print the remainder of this number modulo 109<=+<=7. Two ways, *a* and *b*, are considered distinct if there is index *i* (0<=≤<=*i*<=<<=3*n*), such that *a**i*<=≠<=*b**i* (that is, some gnome got different number of coins in these two ways). | A single line contains number *n* (1<=≤<=*n*<=≤<=105) — the number of the gnomes divided by three. | Print a single number — the remainder of the number of variants of distributing coins that satisfy Tanya modulo 109<=+<=7. | [
"1\n",
"2\n"
] | [
"20",
"680"
] | 20 ways for *n* = 1 (gnome with index 0 sits on the top of the triangle, gnome 1 on the right vertex, gnome 2 on the left vertex): <img class="tex-graphics" src="https://espresso.codeforces.com/64df38b85ccb482cf88d02dc52e348e33313f9da.png" style="max-width: 100.0%;max-height: 100.0%;"/> | 1,000 | [
{
"input": "1",
"output": "20"
},
{
"input": "2",
"output": "680"
},
{
"input": "3",
"output": "19340"
},
{
"input": "4",
"output": "529040"
},
{
"input": "5",
"output": "14332100"
},
{
"input": "7",
"output": "459529590"
},
{
"input": "10",
"output": "848178170"
},
{
"input": "14",
"output": "356372551"
},
{
"input": "58000",
"output": "66667472"
},
{
"input": "6",
"output": "387302840"
},
{
"input": "8",
"output": "423769706"
},
{
"input": "9",
"output": "557078005"
},
{
"input": "15",
"output": "83420839"
},
{
"input": "20",
"output": "208683407"
},
{
"input": "22",
"output": "695178405"
},
{
"input": "48",
"output": "974152357"
},
{
"input": "74",
"output": "972015869"
},
{
"input": "100",
"output": "364994225"
},
{
"input": "866",
"output": "363347020"
},
{
"input": "1673",
"output": "112069243"
},
{
"input": "555",
"output": "506150275"
},
{
"input": "2000",
"output": "394190362"
},
{
"input": "9877",
"output": "915063121"
},
{
"input": "5984",
"output": "546302050"
},
{
"input": "2091",
"output": "982683445"
},
{
"input": "10000",
"output": "246305722"
},
{
"input": "10868",
"output": "118127713"
},
{
"input": "66115",
"output": "413345995"
},
{
"input": "62212",
"output": "587210092"
},
{
"input": "100000",
"output": "192156836"
},
{
"input": "2441",
"output": "149858187"
},
{
"input": "18569",
"output": "54080463"
},
{
"input": "69289",
"output": "582363404"
},
{
"input": "85417",
"output": "796810422"
},
{
"input": "68841",
"output": "371243141"
},
{
"input": "10000",
"output": "246305722"
},
{
"input": "4343",
"output": "682818914"
},
{
"input": "12312",
"output": "837337190"
},
{
"input": "5462",
"output": "719513799"
},
{
"input": "100",
"output": "364994225"
},
{
"input": "11",
"output": "550315374"
},
{
"input": "100000",
"output": "192156836"
}
] | 1,675,344,992 | 2,147,483,647 | PyPy 3-64 | OK | TESTS | 42 | 62 | 2,560,000 | MOD=pow(10,9)+7
n=int(input())
print((pow(3,3*n)-pow(7,n))%MOD) | Title: Kolya and Tanya
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Kolya loves putting gnomes at the circle table and giving them coins, and Tanya loves studying triplets of gnomes, sitting in the vertexes of an equilateral triangle.
More formally, there are 3*n* gnomes sitting in a circle. Each gnome can have from 1 to 3 coins. Let's number the places in the order they occur in the circle by numbers from 0 to 3*n*<=-<=1, let the gnome sitting on the *i*-th place have *a**i* coins. If there is an integer *i* (0<=≤<=*i*<=<<=*n*) such that *a**i*<=+<=*a**i*<=+<=*n*<=+<=*a**i*<=+<=2*n*<=≠<=6, then Tanya is satisfied.
Count the number of ways to choose *a**i* so that Tanya is satisfied. As there can be many ways of distributing coins, print the remainder of this number modulo 109<=+<=7. Two ways, *a* and *b*, are considered distinct if there is index *i* (0<=≤<=*i*<=<<=3*n*), such that *a**i*<=≠<=*b**i* (that is, some gnome got different number of coins in these two ways).
Input Specification:
A single line contains number *n* (1<=≤<=*n*<=≤<=105) — the number of the gnomes divided by three.
Output Specification:
Print a single number — the remainder of the number of variants of distributing coins that satisfy Tanya modulo 109<=+<=7.
Demo Input:
['1\n', '2\n']
Demo Output:
['20', '680']
Note:
20 ways for *n* = 1 (gnome with index 0 sits on the top of the triangle, gnome 1 on the right vertex, gnome 2 on the left vertex): <img class="tex-graphics" src="https://espresso.codeforces.com/64df38b85ccb482cf88d02dc52e348e33313f9da.png" style="max-width: 100.0%;max-height: 100.0%;"/> | ```python
MOD=pow(10,9)+7
n=int(input())
print((pow(3,3*n)-pow(7,n))%MOD)
``` | 3 | |
776 | B | Sherlock and his girlfriend | PROGRAMMING | 1,200 | [
"constructive algorithms",
"number theory"
] | null | null | Sherlock has a new girlfriend (so unlike him!). Valentine's day is coming and he wants to gift her some jewelry.
He bought *n* pieces of jewelry. The *i*-th piece has price equal to *i*<=+<=1, that is, the prices of the jewelry are 2,<=3,<=4,<=... *n*<=+<=1.
Watson gave Sherlock a challenge to color these jewelry pieces such that two pieces don't have the same color if the price of one piece is a prime divisor of the price of the other piece. Also, Watson asked him to minimize the number of different colors used.
Help Sherlock complete this trivial task. | The only line contains single integer *n* (1<=≤<=*n*<=≤<=100000) — the number of jewelry pieces. | The first line of output should contain a single integer *k*, the minimum number of colors that can be used to color the pieces of jewelry with the given constraints.
The next line should consist of *n* space-separated integers (between 1 and *k*) that specify the color of each piece in the order of increasing price.
If there are multiple ways to color the pieces using *k* colors, you can output any of them. | [
"3\n",
"4\n"
] | [
"2\n1 1 2 ",
"2\n2 1 1 2\n"
] | In the first input, the colors for first, second and third pieces of jewelry having respective prices 2, 3 and 4 are 1, 1 and 2 respectively.
In this case, as 2 is a prime divisor of 4, colors of jewelry having prices 2 and 4 must be distinct. | 1,000 | [
{
"input": "3",
"output": "2\n1 1 2 "
},
{
"input": "4",
"output": "2\n1 1 2 1 "
},
{
"input": "17",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 "
},
{
"input": "25",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 "
},
{
"input": "85",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 "
},
{
"input": "105",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 "
},
{
"input": "123",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 "
},
{
"input": "452",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "641",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "293",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "733",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "1",
"output": "1\n1 "
},
{
"input": "10",
"output": "2\n1 1 2 1 2 1 2 2 2 1 "
},
{
"input": "287",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "3202",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "728",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "3509",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "5137",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "2023",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "4890",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
},
{
"input": "8507",
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{
"input": "99971",
"output": "2\n1 1 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 1 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 1 2 1 2 2 2 1 2 2 2 2 2 1 2 1 2 2 2 2 2 2 2 2 2 1 2 2 2 2 ..."
}
] | 1,627,506,385 | 2,147,483,647 | PyPy 3 | OK | TESTS | 53 | 187 | 30,617,600 | n=100002
arr=[1]*n
for i in range(2,n):
if arr[i]==1:
arr[i]=i
for j in range(i*i,n,i):
arr[j]=i
n,d,ans=int(input()),{},[]
nums=list(range(2,n+2))
for i in nums:
lst=set()
while(i>1):
lst.add(arr[i])
i//=arr[i]
if i>=2:
lst.add(i)
k=1
for j in lst:
if j in d.keys():
if d[j]==k:
k+=1
else:
d[j]=k
ans.append(k)
print(len(set(ans)))
print(*ans) | Title: Sherlock and his girlfriend
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Sherlock has a new girlfriend (so unlike him!). Valentine's day is coming and he wants to gift her some jewelry.
He bought *n* pieces of jewelry. The *i*-th piece has price equal to *i*<=+<=1, that is, the prices of the jewelry are 2,<=3,<=4,<=... *n*<=+<=1.
Watson gave Sherlock a challenge to color these jewelry pieces such that two pieces don't have the same color if the price of one piece is a prime divisor of the price of the other piece. Also, Watson asked him to minimize the number of different colors used.
Help Sherlock complete this trivial task.
Input Specification:
The only line contains single integer *n* (1<=≤<=*n*<=≤<=100000) — the number of jewelry pieces.
Output Specification:
The first line of output should contain a single integer *k*, the minimum number of colors that can be used to color the pieces of jewelry with the given constraints.
The next line should consist of *n* space-separated integers (between 1 and *k*) that specify the color of each piece in the order of increasing price.
If there are multiple ways to color the pieces using *k* colors, you can output any of them.
Demo Input:
['3\n', '4\n']
Demo Output:
['2\n1 1 2 ', '2\n2 1 1 2\n']
Note:
In the first input, the colors for first, second and third pieces of jewelry having respective prices 2, 3 and 4 are 1, 1 and 2 respectively.
In this case, as 2 is a prime divisor of 4, colors of jewelry having prices 2 and 4 must be distinct. | ```python
n=100002
arr=[1]*n
for i in range(2,n):
if arr[i]==1:
arr[i]=i
for j in range(i*i,n,i):
arr[j]=i
n,d,ans=int(input()),{},[]
nums=list(range(2,n+2))
for i in nums:
lst=set()
while(i>1):
lst.add(arr[i])
i//=arr[i]
if i>=2:
lst.add(i)
k=1
for j in lst:
if j in d.keys():
if d[j]==k:
k+=1
else:
d[j]=k
ans.append(k)
print(len(set(ans)))
print(*ans)
``` | 3 | |
441 | C | Valera and Tubes | PROGRAMMING | 1,500 | [
"constructive algorithms",
"dfs and similar",
"implementation"
] | null | null | Valera has got a rectangle table consisting of *n* rows and *m* columns. Valera numbered the table rows starting from one, from top to bottom and the columns – starting from one, from left to right. We will represent cell that is on the intersection of row *x* and column *y* by a pair of integers (*x*,<=*y*).
Valera wants to place exactly *k* tubes on his rectangle table. A tube is such sequence of table cells (*x*1,<=*y*1), (*x*2,<=*y*2), ..., (*x**r*,<=*y**r*), that:
- *r*<=≥<=2; - for any integer *i* (1<=≤<=*i*<=≤<=*r*<=-<=1) the following equation |*x**i*<=-<=*x**i*<=+<=1|<=+<=|*y**i*<=-<=*y**i*<=+<=1|<==<=1 holds; - each table cell, which belongs to the tube, must occur exactly once in the sequence.
Valera thinks that the tubes are arranged in a fancy manner if the following conditions are fulfilled:
- no pair of tubes has common cells; - each cell of the table belongs to some tube.
Help Valera to arrange *k* tubes on his rectangle table in a fancy manner. | The first line contains three space-separated integers *n*,<=*m*,<=*k* (2<=≤<=*n*,<=*m*<=≤<=300; 2<=≤<=2*k*<=≤<=*n*·*m*) — the number of rows, the number of columns and the number of tubes, correspondingly. | Print *k* lines. In the *i*-th line print the description of the *i*-th tube: first print integer *r**i* (the number of tube cells), then print 2*r**i* integers *x**i*1,<=*y**i*1,<=*x**i*2,<=*y**i*2,<=...,<=*x**ir**i*,<=*y**ir**i* (the sequence of table cells).
If there are multiple solutions, you can print any of them. It is guaranteed that at least one solution exists. | [
"3 3 3\n",
"2 3 1\n"
] | [
"3 1 1 1 2 1 3\n3 2 1 2 2 2 3\n3 3 1 3 2 3 3\n",
"6 1 1 1 2 1 3 2 3 2 2 2 1\n"
] | Picture for the first sample:
Picture for the second sample: | 1,500 | [
{
"input": "3 3 3",
"output": "3 1 1 1 2 1 3\n3 2 1 2 2 2 3\n3 3 1 3 2 3 3"
},
{
"input": "2 3 1",
"output": "6 1 1 1 2 1 3 2 3 2 2 2 1"
},
{
"input": "2 3 1",
"output": "6 1 1 1 2 1 3 2 3 2 2 2 1"
},
{
"input": "300 300 2",
"output": "2 1 1 1 2\n89998 1 3 1 4 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99 1 100 1 101 1 10..."
},
{
"input": "300 300 150",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "300 299 299",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "300 300 45000",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "300 299 44850",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "2 2 2",
"output": "2 1 1 1 2\n2 2 2 2 1"
},
{
"input": "2 3 3",
"output": "2 1 1 1 2\n2 1 3 2 3\n2 2 2 2 1"
},
{
"input": "3 3 4",
"output": "2 1 1 1 2\n2 1 3 2 3\n2 2 2 2 1\n3 3 1 3 2 3 3"
},
{
"input": "5 5 12",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 2 5\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 3 5 4 5\n2 4 4 4 3\n2 4 2 4 1\n2 5 1 5 2\n3 5 3 5 4 5 5"
},
{
"input": "7 5 17",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 2 5\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 3 5 4 5\n2 4 4 4 3\n2 4 2 4 1\n2 5 1 5 2\n2 5 3 5 4\n2 5 5 6 5\n2 6 4 6 3\n2 6 2 6 1\n2 7 1 7 2\n3 7 3 7 4 7 5"
},
{
"input": "135 91 4352",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "32 27 153",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 2 27\n2 2 26 2 25\n2 2 24 2 23\n2 2 22 2 21\n2 2 20 2 19\n2 2 18 2 17\n2 2 16 2 15\n2 2 14 2 13\n2 2 12 2 11\n2 2 10 2 9\n2 2 8 2 7\n2 2 6 2 5\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 3 5 3 6\n2 3 7 3 8\n2 3 9 3 10\n2 3 11 3 12\n2 3 13 3 14\n2 3 15 3 16\n2 3 17 3 18\n2 3 19 3 20\n2 3 21 3 22\n2 3 23 3 24\n2 3 25 3 26\n2 3 27 4 27\n2 4 2..."
},
{
"input": "74 83 2667",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "296 218 5275",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "89 82 2330",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "15 68 212",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 2 68 2 67\n2 2 66 2 65\n2 2 64 2 63\n2 2 62 2 61\n2 2 60 2 59\n2 2 58 2 57\n..."
},
{
"input": "95 4 177",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 4 4 4 3\n2 4 2 4 1\n2 5 1 5 2\n2 5 3 5 4\n2 6 4 6 3\n2 6 2 6 1\n2 7 1 7 2\n2 7 3 7 4\n2 8 4 8 3\n2 8 2 8 1\n2 9 1 9 2\n2 9 3 9 4\n2 10 4 10 3\n2 10 2 10 1\n2 11 1 11 2\n2 11 3 11 4\n2 12 4 12 3\n2 12 2 12 1\n2 13 1 13 2\n2 13 3 13 4\n2 14 4 14 3\n2 14 2 14 1\n2 15 1 15 2\n2 15 3 15 4\n2 16 4 16 3\n2 16 2 16 1\n2 17 1 17 2\n2 17 3 17 4\n2 18 4 18 3\n2 18 2 18 1\n2 19 1 19 2\n2 19 3 19 4\n2 20 4 20 3\n2 20 2 20 1\n2 21 1 21 2\n2 21 3 21 4\n2..."
},
{
"input": "60 136 8",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n8146 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99..."
},
{
"input": "91 183 7827",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "2 15 3",
"output": "2 1 1 1 2\n2 1 3 1 4\n26 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 2 15 2 14 2 13 2 12 2 11 2 10 2 9 2 8 2 7 2 6 2 5 2 4 2 3 2 2 2 1"
},
{
"input": "139 275 10770",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "114 298 7143",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "260 182 9496",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "42 297 3703",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "236 156 9535",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "201 226 1495",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "299 299 100",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "299 298 100",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "298 299 100",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "299 299 2",
"output": "2 1 1 1 2\n89399 1 3 1 4 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99 1 100 1 101 1 10..."
},
{
"input": "299 299 1",
"output": "89401 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99 1 100 1 101 1 102 1..."
},
{
"input": "298 299 1",
"output": "89102 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99 1 100 1 101 1 102 1..."
},
{
"input": "299 298 11",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n89082 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97..."
},
{
"input": "298 300 12",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n89378 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1..."
},
{
"input": "298 2 1",
"output": "596 1 1 1 2 2 2 2 1 3 1 3 2 4 2 4 1 5 1 5 2 6 2 6 1 7 1 7 2 8 2 8 1 9 1 9 2 10 2 10 1 11 1 11 2 12 2 12 1 13 1 13 2 14 2 14 1 15 1 15 2 16 2 16 1 17 1 17 2 18 2 18 1 19 1 19 2 20 2 20 1 21 1 21 2 22 2 22 1 23 1 23 2 24 2 24 1 25 1 25 2 26 2 26 1 27 1 27 2 28 2 28 1 29 1 29 2 30 2 30 1 31 1 31 2 32 2 32 1 33 1 33 2 34 2 34 1 35 1 35 2 36 2 36 1 37 1 37 2 38 2 38 1 39 1 39 2 40 2 40 1 41 1 41 2 42 2 42 1 43 1 43 2 44 2 44 1 45 1 45 2 46 2 46 1 47 1 47 2 48 2 48 1 49 1 49 2 50 2 50 1 51 1 51 2 52 2 52 1 53 1 ..."
},
{
"input": "2 298 1",
"output": "596 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99 1 100 1 101 1 102 1 1..."
},
{
"input": "300 300 500",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "300 300 501",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "300 300 44999",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "5 5 3",
"output": "2 1 1 1 2\n2 1 3 1 4\n21 1 5 2 5 2 4 2 3 2 2 2 1 3 1 3 2 3 3 3 4 3 5 4 5 4 4 4 3 4 2 4 1 5 1 5 2 5 3 5 4 5 5"
},
{
"input": "2 4 3",
"output": "2 1 1 1 2\n2 1 3 1 4\n4 2 4 2 3 2 2 2 1"
}
] | 1,593,599,991 | 2,147,483,647 | Python 3 | OK | TESTS | 44 | 421 | 5,017,600 | n, m, k = list(map(int, input().split()))
result = []
for row in range(1, n+1):
if row & 1:
for col in range(1, m+1):
result.append([row, col])
else:
for col in range(m, 0, -1):
result.append([row, col])
i = 0
while i//2 < k-1:
print(2, result[i][0], result[i][1], result[i+1][0], result[i+1][1])
i += 2
print(len(result) - i, end =' ')
while i < len(result):
print(result[i][0], result[i][1], end =' ')
i += 1
| Title: Valera and Tubes
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Valera has got a rectangle table consisting of *n* rows and *m* columns. Valera numbered the table rows starting from one, from top to bottom and the columns – starting from one, from left to right. We will represent cell that is on the intersection of row *x* and column *y* by a pair of integers (*x*,<=*y*).
Valera wants to place exactly *k* tubes on his rectangle table. A tube is such sequence of table cells (*x*1,<=*y*1), (*x*2,<=*y*2), ..., (*x**r*,<=*y**r*), that:
- *r*<=≥<=2; - for any integer *i* (1<=≤<=*i*<=≤<=*r*<=-<=1) the following equation |*x**i*<=-<=*x**i*<=+<=1|<=+<=|*y**i*<=-<=*y**i*<=+<=1|<==<=1 holds; - each table cell, which belongs to the tube, must occur exactly once in the sequence.
Valera thinks that the tubes are arranged in a fancy manner if the following conditions are fulfilled:
- no pair of tubes has common cells; - each cell of the table belongs to some tube.
Help Valera to arrange *k* tubes on his rectangle table in a fancy manner.
Input Specification:
The first line contains three space-separated integers *n*,<=*m*,<=*k* (2<=≤<=*n*,<=*m*<=≤<=300; 2<=≤<=2*k*<=≤<=*n*·*m*) — the number of rows, the number of columns and the number of tubes, correspondingly.
Output Specification:
Print *k* lines. In the *i*-th line print the description of the *i*-th tube: first print integer *r**i* (the number of tube cells), then print 2*r**i* integers *x**i*1,<=*y**i*1,<=*x**i*2,<=*y**i*2,<=...,<=*x**ir**i*,<=*y**ir**i* (the sequence of table cells).
If there are multiple solutions, you can print any of them. It is guaranteed that at least one solution exists.
Demo Input:
['3 3 3\n', '2 3 1\n']
Demo Output:
['3 1 1 1 2 1 3\n3 2 1 2 2 2 3\n3 3 1 3 2 3 3\n', '6 1 1 1 2 1 3 2 3 2 2 2 1\n']
Note:
Picture for the first sample:
Picture for the second sample: | ```python
n, m, k = list(map(int, input().split()))
result = []
for row in range(1, n+1):
if row & 1:
for col in range(1, m+1):
result.append([row, col])
else:
for col in range(m, 0, -1):
result.append([row, col])
i = 0
while i//2 < k-1:
print(2, result[i][0], result[i][1], result[i+1][0], result[i+1][1])
i += 2
print(len(result) - i, end =' ')
while i < len(result):
print(result[i][0], result[i][1], end =' ')
i += 1
``` | 3 | |
33 | A | What is for dinner? | PROGRAMMING | 1,200 | [
"greedy",
"implementation"
] | A. What is for dinner? | 2 | 256 | In one little known, but very beautiful country called Waterland, lives a lovely shark Valerie. Like all the sharks, she has several rows of teeth, and feeds on crucians. One of Valerie's distinguishing features is that while eating one crucian she uses only one row of her teeth, the rest of the teeth are "relaxing".
For a long time our heroine had been searching the sea for crucians, but a great misfortune happened. Her teeth started to ache, and she had to see the local dentist, lobster Ashot. As a professional, Ashot quickly relieved Valerie from her toothache. Moreover, he managed to determine the cause of Valerie's developing caries (for what he was later nicknamed Cap).
It turned that Valerie eats too many crucians. To help Valerie avoid further reoccurrence of toothache, Ashot found for each Valerie's tooth its residual viability. Residual viability of a tooth is a value equal to the amount of crucians that Valerie can eat with this tooth. Every time Valerie eats a crucian, viability of all the teeth used for it will decrease by one. When the viability of at least one tooth becomes negative, the shark will have to see the dentist again.
Unhappy, Valerie came back home, where a portion of crucians was waiting for her. For sure, the shark couldn't say no to her favourite meal, but she had no desire to go back to the dentist. That's why she decided to eat the maximum amount of crucians from the portion but so that the viability of no tooth becomes negative.
As Valerie is not good at mathematics, she asked you to help her to find out the total amount of crucians that she can consume for dinner.
We should remind you that while eating one crucian Valerie uses exactly one row of teeth and the viability of each tooth from this row decreases by one. | The first line contains three integers *n*, *m*, *k* (1<=≤<=*m*<=≤<=*n*<=≤<=1000,<=0<=≤<=*k*<=≤<=106) — total amount of Valerie's teeth, amount of tooth rows and amount of crucians in Valerie's portion for dinner. Then follow *n* lines, each containing two integers: *r* (1<=≤<=*r*<=≤<=*m*) — index of the row, where belongs the corresponding tooth, and *c* (0<=≤<=*c*<=≤<=106) — its residual viability.
It's guaranteed that each tooth row has positive amount of teeth. | In the first line output the maximum amount of crucians that Valerie can consume for dinner. | [
"4 3 18\n2 3\n1 2\n3 6\n2 3\n",
"2 2 13\n1 13\n2 12\n"
] | [
"11\n",
"13\n"
] | none | 500 | [
{
"input": "4 3 18\n2 3\n1 2\n3 6\n2 3",
"output": "11"
},
{
"input": "2 2 13\n1 13\n2 12",
"output": "13"
},
{
"input": "5 4 8\n4 6\n4 5\n1 3\n2 0\n3 3",
"output": "8"
},
{
"input": "1 1 0\n1 3",
"output": "0"
},
{
"input": "7 1 30\n1 8\n1 15\n1 5\n1 17\n1 9\n1 16\n1 16",
"output": "5"
},
{
"input": "4 2 8\n1 9\n1 10\n1 4\n2 6",
"output": "8"
},
{
"input": "10 4 14\n2 6\n1 5\n2 8\n2 6\n2 5\n4 1\n4 0\n2 4\n3 4\n1 0",
"output": "8"
},
{
"input": "54 22 1009\n15 7\n17 7\n11 9\n5 11\n12 9\n13 8\n13 12\n22 11\n20 9\n20 7\n16 11\n19 12\n3 12\n15 9\n1 12\n2 10\n16 10\n16 10\n14 10\n9 11\n9 9\n14 8\n10 10\n16 12\n1 8\n3 8\n21 11\n18 12\n2 6\n9 11\n11 7\n15 9\n20 11\n6 8\n8 8\n19 11\n15 7\n9 9\n22 7\n12 9\n17 9\n17 11\n12 7\n15 9\n5 11\n11 6\n18 8\n7 10\n4 10\n13 12\n4 8\n20 6\n15 12\n9 7",
"output": "180"
},
{
"input": "1 1 1000000\n1 1000000",
"output": "1000000"
},
{
"input": "4 3 181818\n3 1299\n1 1694\n3 1164\n2 1278",
"output": "4136"
},
{
"input": "50 50 0\n33 0\n26 0\n30 0\n41 0\n38 0\n36 0\n16 0\n7 0\n23 0\n5 0\n39 0\n29 0\n40 0\n47 0\n24 0\n43 0\n14 0\n10 0\n20 0\n3 0\n6 0\n34 0\n13 0\n18 0\n21 0\n9 0\n8 0\n22 0\n25 0\n4 0\n11 0\n17 0\n32 0\n44 0\n49 0\n50 0\n27 0\n28 0\n45 0\n12 0\n35 0\n15 0\n42 0\n31 0\n2 0\n1 0\n48 0\n19 0\n37 0\n46 0",
"output": "0"
},
{
"input": "19 12 199\n7 1\n8 6\n6 14\n1 7\n4 1\n6 6\n3 4\n1 5\n9 2\n5 3\n11 3\n9 4\n1 12\n4 7\n7 3\n12 14\n2 1\n10 8\n6 12",
"output": "54"
}
] | 1,617,871,497 | 2,147,483,647 | Python 3 | RUNTIME_ERROR | TESTS | 0 | 154 | 0 | w = int(input())
result = []
for x in range(w):
if x % 2 == 0 and (w - x) % 2 == 0:
result.append((x, w-x))
print(result) | Title: What is for dinner?
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
In one little known, but very beautiful country called Waterland, lives a lovely shark Valerie. Like all the sharks, she has several rows of teeth, and feeds on crucians. One of Valerie's distinguishing features is that while eating one crucian she uses only one row of her teeth, the rest of the teeth are "relaxing".
For a long time our heroine had been searching the sea for crucians, but a great misfortune happened. Her teeth started to ache, and she had to see the local dentist, lobster Ashot. As a professional, Ashot quickly relieved Valerie from her toothache. Moreover, he managed to determine the cause of Valerie's developing caries (for what he was later nicknamed Cap).
It turned that Valerie eats too many crucians. To help Valerie avoid further reoccurrence of toothache, Ashot found for each Valerie's tooth its residual viability. Residual viability of a tooth is a value equal to the amount of crucians that Valerie can eat with this tooth. Every time Valerie eats a crucian, viability of all the teeth used for it will decrease by one. When the viability of at least one tooth becomes negative, the shark will have to see the dentist again.
Unhappy, Valerie came back home, where a portion of crucians was waiting for her. For sure, the shark couldn't say no to her favourite meal, but she had no desire to go back to the dentist. That's why she decided to eat the maximum amount of crucians from the portion but so that the viability of no tooth becomes negative.
As Valerie is not good at mathematics, she asked you to help her to find out the total amount of crucians that she can consume for dinner.
We should remind you that while eating one crucian Valerie uses exactly one row of teeth and the viability of each tooth from this row decreases by one.
Input Specification:
The first line contains three integers *n*, *m*, *k* (1<=≤<=*m*<=≤<=*n*<=≤<=1000,<=0<=≤<=*k*<=≤<=106) — total amount of Valerie's teeth, amount of tooth rows and amount of crucians in Valerie's portion for dinner. Then follow *n* lines, each containing two integers: *r* (1<=≤<=*r*<=≤<=*m*) — index of the row, where belongs the corresponding tooth, and *c* (0<=≤<=*c*<=≤<=106) — its residual viability.
It's guaranteed that each tooth row has positive amount of teeth.
Output Specification:
In the first line output the maximum amount of crucians that Valerie can consume for dinner.
Demo Input:
['4 3 18\n2 3\n1 2\n3 6\n2 3\n', '2 2 13\n1 13\n2 12\n']
Demo Output:
['11\n', '13\n']
Note:
none | ```python
w = int(input())
result = []
for x in range(w):
if x % 2 == 0 and (w - x) % 2 == 0:
result.append((x, w-x))
print(result)
``` | -1 |
118 | A | String Task | PROGRAMMING | 1,000 | [
"implementation",
"strings"
] | null | null | Petya started to attend programming lessons. On the first lesson his task was to write a simple program. The program was supposed to do the following: in the given string, consisting if uppercase and lowercase Latin letters, it:
- deletes all the vowels, - inserts a character "." before each consonant, - replaces all uppercase consonants with corresponding lowercase ones.
Vowels are letters "A", "O", "Y", "E", "U", "I", and the rest are consonants. The program's input is exactly one string, it should return the output as a single string, resulting after the program's processing the initial string.
Help Petya cope with this easy task. | The first line represents input string of Petya's program. This string only consists of uppercase and lowercase Latin letters and its length is from 1 to 100, inclusive. | Print the resulting string. It is guaranteed that this string is not empty. | [
"tour\n",
"Codeforces\n",
"aBAcAba\n"
] | [
".t.r\n",
".c.d.f.r.c.s\n",
".b.c.b\n"
] | none | 500 | [
{
"input": "tour",
"output": ".t.r"
},
{
"input": "Codeforces",
"output": ".c.d.f.r.c.s"
},
{
"input": "aBAcAba",
"output": ".b.c.b"
},
{
"input": "obn",
"output": ".b.n"
},
{
"input": "wpwl",
"output": ".w.p.w.l"
},
{
"input": "ggdvq",
"output": ".g.g.d.v.q"
},
{
"input": "pumesz",
"output": ".p.m.s.z"
},
{
"input": "g",
"output": ".g"
},
{
"input": "zjuotps",
"output": ".z.j.t.p.s"
},
{
"input": "jzbwuehe",
"output": ".j.z.b.w.h"
},
{
"input": "tnkgwuugu",
"output": ".t.n.k.g.w.g"
},
{
"input": "kincenvizh",
"output": ".k.n.c.n.v.z.h"
},
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{
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"output": ".j.v.v.z.c.d.c.x.j.s.t.b.b.k.s.m.q.j.s.n.g.x.k.g.t.t.t.d.x.r.l.j.j.x.t.w.p.t.g.w.w.q.z.p.v.q.c.h.v.g.r.k.q.l.z.x.m.p.t.z.b.l.x.h.h.s.m.r.k.m.z.z.m.g.d.f.s.k.h.t.m.m.n.q.z.z.f.l.p.m.q.d.c.t.v.r.f.g.t.x"
},
{
"input": "YB",
"output": ".b"
},
{
"input": "fly",
"output": ".f.l"
},
{
"input": "YyyYYYyyYxdwdawdDAWDdaddYYYY",
"output": ".x.d.w.d.w.d.d.w.d.d.d.d"
}
] | 1,695,466,362 | 2,147,483,647 | Python 3 | OK | TESTS | 42 | 92 | 0 | s=input().lower()
p=len(s)
t=''
for i in range(p):
if s[i]!='a' and s[i]!='e' and s[i]!='i' and s[i]!='o' and s[i]!='u' and s[i]!='y':
t=t+'.'+s[i]
print(t)
| Title: String Task
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Petya started to attend programming lessons. On the first lesson his task was to write a simple program. The program was supposed to do the following: in the given string, consisting if uppercase and lowercase Latin letters, it:
- deletes all the vowels, - inserts a character "." before each consonant, - replaces all uppercase consonants with corresponding lowercase ones.
Vowels are letters "A", "O", "Y", "E", "U", "I", and the rest are consonants. The program's input is exactly one string, it should return the output as a single string, resulting after the program's processing the initial string.
Help Petya cope with this easy task.
Input Specification:
The first line represents input string of Petya's program. This string only consists of uppercase and lowercase Latin letters and its length is from 1 to 100, inclusive.
Output Specification:
Print the resulting string. It is guaranteed that this string is not empty.
Demo Input:
['tour\n', 'Codeforces\n', 'aBAcAba\n']
Demo Output:
['.t.r\n', '.c.d.f.r.c.s\n', '.b.c.b\n']
Note:
none | ```python
s=input().lower()
p=len(s)
t=''
for i in range(p):
if s[i]!='a' and s[i]!='e' and s[i]!='i' and s[i]!='o' and s[i]!='u' and s[i]!='y':
t=t+'.'+s[i]
print(t)
``` | 3 | |
41 | A | Translation | PROGRAMMING | 800 | [
"implementation",
"strings"
] | A. Translation | 2 | 256 | The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly. | The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols. | If the word *t* is a word *s*, written reversely, print YES, otherwise print NO. | [
"code\nedoc\n",
"abb\naba\n",
"code\ncode\n"
] | [
"YES\n",
"NO\n",
"NO\n"
] | none | 500 | [
{
"input": "code\nedoc",
"output": "YES"
},
{
"input": "abb\naba",
"output": "NO"
},
{
"input": "code\ncode",
"output": "NO"
},
{
"input": "abacaba\nabacaba",
"output": "YES"
},
{
"input": "q\nq",
"output": "YES"
},
{
"input": "asrgdfngfnmfgnhweratgjkk\nasrgdfngfnmfgnhweratgjkk",
"output": "NO"
},
{
"input": "z\na",
"output": "NO"
},
{
"input": "asd\ndsa",
"output": "YES"
},
{
"input": "abcdef\nfecdba",
"output": "NO"
},
{
"input": "ywjjbirapvskozubvxoemscfwl\ngnduubaogtfaiowjizlvjcu",
"output": "NO"
},
{
"input": "mfrmqxtzvgaeuleubcmcxcfqyruwzenguhgrmkuhdgnhgtgkdszwqyd\nmfxufheiperjnhyczclkmzyhcxntdfskzkzdwzzujdinf",
"output": "NO"
},
{
"input": "bnbnemvybqizywlnghlykniaxxxlkhftppbdeqpesrtgkcpoeqowjwhrylpsziiwcldodcoonpimudvrxejjo\ntiynnekmlalogyvrgptbinkoqdwzuiyjlrldxhzjmmp",
"output": "NO"
},
{
"input": "pwlpubwyhzqvcitemnhvvwkmwcaawjvdiwtoxyhbhbxerlypelevasmelpfqwjk\nstruuzebbcenziscuoecywugxncdwzyfozhljjyizpqcgkyonyetarcpwkqhuugsqjuixsxptmbnlfupdcfigacdhhrzb",
"output": "NO"
},
{
"input": "gdvqjoyxnkypfvdxssgrihnwxkeojmnpdeobpecytkbdwujqfjtxsqspxvxpqioyfagzjxupqqzpgnpnpxcuipweunqch\nkkqkiwwasbhezqcfeceyngcyuogrkhqecwsyerdniqiocjehrpkljiljophqhyaiefjpavoom",
"output": "NO"
},
{
"input": "umeszdawsvgkjhlqwzents\nhxqhdungbylhnikwviuh",
"output": "NO"
},
{
"input": "juotpscvyfmgntshcealgbsrwwksgrwnrrbyaqqsxdlzhkbugdyx\nibqvffmfktyipgiopznsqtrtxiijntdbgyy",
"output": "NO"
},
{
"input": "zbwueheveouatecaglziqmudxemhrsozmaujrwlqmppzoumxhamwugedikvkblvmxwuofmpafdprbcftew\nulczwrqhctbtbxrhhodwbcxwimncnexosksujlisgclllxokrsbnozthajnnlilyffmsyko",
"output": "NO"
},
{
"input": "nkgwuugukzcv\nqktnpxedwxpxkrxdvgmfgoxkdfpbzvwsduyiybynbkouonhvmzakeiruhfmvrktghadbfkmwxduoqv",
"output": "NO"
},
{
"input": "incenvizhqpcenhjhehvjvgbsnfixbatrrjstxjzhlmdmxijztphxbrldlqwdfimweepkggzcxsrwelodpnryntepioqpvk\ndhjbjjftlvnxibkklxquwmzhjfvnmwpapdrslioxisbyhhfymyiaqhlgecpxamqnocizwxniubrmpyubvpenoukhcobkdojlybxd",
"output": "NO"
},
{
"input": "w\nw",
"output": "YES"
},
{
"input": "vz\nzv",
"output": "YES"
},
{
"input": "ry\nyr",
"output": "YES"
},
{
"input": "xou\nuox",
"output": "YES"
},
{
"input": "axg\ngax",
"output": "NO"
},
{
"input": "zdsl\nlsdz",
"output": "YES"
},
{
"input": "kudl\nldku",
"output": "NO"
},
{
"input": "zzlzwnqlcl\nlclqnwzlzz",
"output": "YES"
},
{
"input": "vzzgicnzqooejpjzads\nsdazjpjeooqzncigzzv",
"output": "YES"
},
{
"input": "raqhmvmzuwaykjpyxsykr\nxkysrypjkyawuzmvmhqar",
"output": "NO"
},
{
"input": "ngedczubzdcqbxksnxuavdjaqtmdwncjnoaicvmodcqvhfezew\nwezefhvqcdomvciaonjcnwdmtqajdvauxnskxbqcdzbuzcdegn",
"output": "YES"
},
{
"input": "muooqttvrrljcxbroizkymuidvfmhhsjtumksdkcbwwpfqdyvxtrlymofendqvznzlmim\nmimlznzvqdnefomylrtxvydqfpwwbckdskmutjshhmfvdiumykziorbxcjlrrvttqooum",
"output": "YES"
},
{
"input": "vxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaivg\ngviayyikkitmuomcpiakhbxszgbnhvwyzkftwoagzixaearxpjacrnvpvbuzenvovehkmmxvblqyxvctroddksdsgebcmlluqpxv",
"output": "YES"
},
{
"input": "mnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfdc\ncdfmkdgrdptkpewbsqvszipgxvgvuiuzbkkwuowbafkikgvnqdkxnayzdjygvezmtsgywnupocdntipiyiorblqkrzjpzatxahnm",
"output": "NO"
},
{
"input": "dgxmzbqofstzcdgthbaewbwocowvhqpinehpjatnnbrijcolvsatbblsrxabzrpszoiecpwhfjmwuhqrapvtcgvikuxtzbftydkw\nwkdytfbztxukivgctvparqhuwmjfhwpceiozsprzbaxrslbbqasvlocjirbnntajphenipthvwocowbweabhtgdcztsfoqbzmxgd",
"output": "NO"
},
{
"input": "gxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwgeh\nhegwxvocotmzstqfbmpjvijgkcyodlxyjawrpkczpmdspsuhoiruavnnnuwvtwohglkdxjetshkboalvzqbgjgthoteceixioxg",
"output": "YES"
},
{
"input": "sihxuwvmaambplxvjfoskinghzicyfqebjtkysotattkahssumfcgrkheotdxwjckpvapbkaepqrxseyfrwtyaycmrzsrsngkh\nhkgnsrszrmcyaytwrfyesxrqpeakbpavpkcjwxdtoehkrgcfmusshakttatosyktjbeqfycizhgniksofjvxlpbmaamvwuxhis",
"output": "YES"
},
{
"input": "ycnahksbughnonldzrhkysujmylcgcfuludjvjiahtkyzqvkopzqcnwhltbzfugzojqkjjlggmvnultascmygelkiktmfieok\nkoeifmtkiklegkmcsatlunvmggkjjlqjozgufzbtlhwncqzpokvqzykthaijvjdulufcgclymjusyyhrzdlnonhgubskhancy",
"output": "NO"
},
{
"input": "wbqasaehtkfojruzyhrlgwmtyiovmzyfifslvlemhqheyaelzwnthrenjsbmntwaoryzwfbxmscmypvxlfmzpnkkjlvwvmtz\nztmvwvljkknpzmflxvpymcsmxbfwzyroawtnmbsjnerhtnwzleayehqhmelvlsfifyzmvoiytmwglrhyzurjofktheasaqbw",
"output": "YES"
},
{
"input": "imippqurprbhfugngtgifelytadegwrgaefnfhbjjnmzikvjaccotqzemufqieqldgnbmviisgkynzeldlhqxuqphjfmyij\njiymfjhpquxqhldleznykgsiivmbngdlqeiqfumezqtoccajvkizmnjjbhfnfeagrwgedatylefigtgngufhbrpruqppimi",
"output": "YES"
},
{
"input": "bikydffiuisckpvzqlteqfhegsagimodb\nbdomigasgehfqetlqzvpkcsiuiffdykib",
"output": "YES"
}
] | 1,663,166,193 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 2 | 62 | 0 | n = input()
y = [u for u in n]
b = input()
j = [o for o in b]
y.sort()
j.sort()
if y == j:
print('YES')
else:
print('NO')
| Title: Translation
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly.
Input Specification:
The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols.
Output Specification:
If the word *t* is a word *s*, written reversely, print YES, otherwise print NO.
Demo Input:
['code\nedoc\n', 'abb\naba\n', 'code\ncode\n']
Demo Output:
['YES\n', 'NO\n', 'NO\n']
Note:
none | ```python
n = input()
y = [u for u in n]
b = input()
j = [o for o in b]
y.sort()
j.sort()
if y == j:
print('YES')
else:
print('NO')
``` | 0 |
978 | A | Remove Duplicates | PROGRAMMING | 800 | [
"implementation"
] | null | null | Petya has an array $a$ consisting of $n$ integers. He wants to remove duplicate (equal) elements.
Petya wants to leave only the rightmost entry (occurrence) for each element of the array. The relative order of the remaining unique elements should not be changed. | The first line contains a single integer $n$ ($1 \le n \le 50$) — the number of elements in Petya's array.
The following line contains a sequence $a_1, a_2, \dots, a_n$ ($1 \le a_i \le 1\,000$) — the Petya's array. | In the first line print integer $x$ — the number of elements which will be left in Petya's array after he removed the duplicates.
In the second line print $x$ integers separated with a space — Petya's array after he removed the duplicates. For each unique element only the rightmost entry should be left. | [
"6\n1 5 5 1 6 1\n",
"5\n2 4 2 4 4\n",
"5\n6 6 6 6 6\n"
] | [
"3\n5 6 1 \n",
"2\n2 4 \n",
"1\n6 \n"
] | In the first example you should remove two integers $1$, which are in the positions $1$ and $4$. Also you should remove the integer $5$, which is in the position $2$.
In the second example you should remove integer $2$, which is in the position $1$, and two integers $4$, which are in the positions $2$ and $4$.
In the third example you should remove four integers $6$, which are in the positions $1$, $2$, $3$ and $4$. | 0 | [
{
"input": "6\n1 5 5 1 6 1",
"output": "3\n5 6 1 "
},
{
"input": "5\n2 4 2 4 4",
"output": "2\n2 4 "
},
{
"input": "5\n6 6 6 6 6",
"output": "1\n6 "
},
{
"input": "7\n1 2 3 4 2 2 3",
"output": "4\n1 4 2 3 "
},
{
"input": "9\n100 100 100 99 99 99 100 100 100",
"output": "2\n99 100 "
},
{
"input": "27\n489 489 487 488 750 230 43 645 42 42 489 42 973 42 973 750 645 355 868 112 868 489 750 489 887 489 868",
"output": "13\n487 488 230 43 42 973 645 355 112 750 887 489 868 "
},
{
"input": "40\n151 421 421 909 117 222 909 954 227 421 227 954 954 222 421 227 421 421 421 151 421 227 222 222 222 222 421 183 421 227 421 954 222 421 954 421 222 421 909 421",
"output": "8\n117 151 183 227 954 222 909 421 "
},
{
"input": "48\n2 2 2 903 903 2 726 2 2 2 2 2 2 2 2 2 2 726 2 2 2 2 2 2 2 726 2 2 2 2 62 2 2 2 2 2 2 2 2 726 62 726 2 2 2 903 903 2",
"output": "4\n62 726 903 2 "
},
{
"input": "1\n1",
"output": "1\n1 "
},
{
"input": "13\n5 37 375 5 37 33 37 375 37 2 3 3 2",
"output": "6\n5 33 375 37 3 2 "
},
{
"input": "50\n1 2 3 4 5 4 3 2 1 2 3 2 1 4 5 5 4 3 2 1 1 2 3 4 5 4 3 2 1 2 3 2 1 4 5 5 4 3 2 1 4 3 2 5 1 6 6 6 6 6",
"output": "6\n4 3 2 5 1 6 "
},
{
"input": "47\n233 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "2\n233 1 "
},
{
"input": "47\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "1\n1 "
},
{
"input": "2\n964 964",
"output": "1\n964 "
},
{
"input": "2\n1000 1000",
"output": "1\n1000 "
},
{
"input": "1\n1000",
"output": "1\n1000 "
},
{
"input": "45\n991 991 996 996 992 992 999 1000 998 1000 992 999 996 999 991 991 999 993 992 999 1000 997 992 999 996 991 994 996 991 999 1000 993 999 997 999 992 991 997 991 998 998 995 998 994 993",
"output": "10\n996 1000 999 992 997 991 995 998 994 993 "
},
{
"input": "6\n994 993 1000 998 991 994",
"output": "5\n993 1000 998 991 994 "
},
{
"input": "48\n992 995 992 991 994 992 995 999 996 993 999 995 993 992 1000 992 997 996 991 993 992 998 998 998 999 995 992 992 993 992 992 995 996 995 997 991 997 991 999 994 994 997 1000 998 1000 992 1000 999",
"output": "10\n993 996 995 991 994 997 998 992 1000 999 "
},
{
"input": "3\n6 6 3",
"output": "2\n6 3 "
},
{
"input": "36\n999 1000 993 993 1000 999 996 997 998 995 995 997 999 995 1000 998 998 994 993 998 994 999 1000 995 996 994 991 991 999 996 993 999 996 998 991 997",
"output": "9\n1000 995 994 993 999 996 998 991 997 "
},
{
"input": "49\n991 997 995 991 995 998 994 996 997 991 998 993 992 999 996 995 991 991 999 997 995 993 997 1000 997 993 993 994 999 994 992 991 1000 996 994 996 996 999 992 992 1000 991 997 993 991 994 997 991 996",
"output": "10\n998 995 999 992 1000 993 994 997 991 996 "
},
{
"input": "2\n1000 999",
"output": "2\n1000 999 "
},
{
"input": "28\n997 994 991 994 994 995 1000 992 995 994 994 995 991 996 991 996 991 999 999 993 994 997 995 992 991 992 998 1000",
"output": "10\n996 999 993 994 997 995 991 992 998 1000 "
},
{
"input": "15\n991 995 995 1000 991 993 997 998 1000 994 1000 992 991 995 992",
"output": "8\n993 997 998 994 1000 991 995 992 "
},
{
"input": "6\n1000 1 1000 2 1000 1",
"output": "3\n2 1000 1 "
},
{
"input": "6\n1000 1 1000 2 1 1000",
"output": "3\n2 1 1000 "
},
{
"input": "7\n1 1000 1 999 1000 1 2",
"output": "4\n999 1000 1 2 "
}
] | 1,673,971,318 | 2,147,483,647 | Python 3 | OK | TESTS | 28 | 46 | 0 | n = int(input())
a = list(map(int,input().split()))
a.reverse()
s = []
for i in range(n):
if(a[i] not in s):
s.append(a[i])
s.reverse()
print(len(s))
print(*s) | Title: Remove Duplicates
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Petya has an array $a$ consisting of $n$ integers. He wants to remove duplicate (equal) elements.
Petya wants to leave only the rightmost entry (occurrence) for each element of the array. The relative order of the remaining unique elements should not be changed.
Input Specification:
The first line contains a single integer $n$ ($1 \le n \le 50$) — the number of elements in Petya's array.
The following line contains a sequence $a_1, a_2, \dots, a_n$ ($1 \le a_i \le 1\,000$) — the Petya's array.
Output Specification:
In the first line print integer $x$ — the number of elements which will be left in Petya's array after he removed the duplicates.
In the second line print $x$ integers separated with a space — Petya's array after he removed the duplicates. For each unique element only the rightmost entry should be left.
Demo Input:
['6\n1 5 5 1 6 1\n', '5\n2 4 2 4 4\n', '5\n6 6 6 6 6\n']
Demo Output:
['3\n5 6 1 \n', '2\n2 4 \n', '1\n6 \n']
Note:
In the first example you should remove two integers $1$, which are in the positions $1$ and $4$. Also you should remove the integer $5$, which is in the position $2$.
In the second example you should remove integer $2$, which is in the position $1$, and two integers $4$, which are in the positions $2$ and $4$.
In the third example you should remove four integers $6$, which are in the positions $1$, $2$, $3$ and $4$. | ```python
n = int(input())
a = list(map(int,input().split()))
a.reverse()
s = []
for i in range(n):
if(a[i] not in s):
s.append(a[i])
s.reverse()
print(len(s))
print(*s)
``` | 3 | |
958 | D1 | Hyperspace Jump (easy) | PROGRAMMING | 1,400 | [
"expression parsing",
"math"
] | null | null | The Rebel fleet is on the run. It consists of *m* ships currently gathered around a single planet. Just a few seconds ago, the vastly more powerful Empire fleet has appeared in the same solar system, and the Rebels will need to escape into hyperspace. In order to spread the fleet, the captain of each ship has independently come up with the coordinate to which that ship will jump. In the obsolete navigation system used by the Rebels, this coordinate is given as the value of an arithmetic expression of the form .
To plan the future of the resistance movement, Princess Heidi needs to know, for each ship, how many ships are going to end up at the same coordinate after the jump. You are her only hope! | The first line of the input contains a single integer *m* (1<=≤<=*m*<=≤<=200<=000) – the number of ships. The next *m* lines describe one jump coordinate each, given as an arithmetic expression. An expression has the form (a+b)/c. Namely, it consists of: an opening parenthesis (, a positive integer *a* of up to two decimal digits, a plus sign +, a positive integer *b* of up to two decimal digits, a closing parenthesis ), a slash /, and a positive integer *c* of up to two decimal digits. | Print a single line consisting of *m* space-separated integers. The *i*-th integer should be equal to the number of ships whose coordinate is equal to that of the *i*-th ship (including the *i*-th ship itself). | [
"4\n(99+98)/97\n(26+4)/10\n(12+33)/15\n(5+1)/7\n"
] | [
"1 2 2 1 "
] | In the sample testcase, the second and the third ship will both end up at the coordinate 3.
Note that this problem has only two versions – easy and hard. | 0 | [
{
"input": "4\n(99+98)/97\n(26+4)/10\n(12+33)/15\n(5+1)/7",
"output": "1 2 2 1 "
},
{
"input": "10\n(44+98)/19\n(36+58)/47\n(62+74)/68\n(69+95)/82\n(26+32)/29\n(32+46)/39\n(32+24)/28\n(47+61)/54\n(39+13)/26\n(98+98)/98",
"output": "1 9 9 9 9 9 9 9 9 9 "
},
{
"input": "30\n(89+76)/87\n(81+78)/18\n(60+97)/32\n(41+14)/48\n(55+65)/27\n(29+15)/95\n(64+13)/96\n(78+30)/75\n(43+6)/60\n(69+34)/48\n(62+2)/97\n(85+42)/3\n(4+97)/42\n(1+18)/39\n(46+55)/76\n(22+59)/24\n(62+81)/98\n(64+8)/51\n(9+59)/48\n(47+2)/80\n(33+74)/76\n(61+83)/44\n(86+4)/51\n(65+41)/49\n(53+36)/45\n(6+19)/15\n(51+21)/68\n(98+36)/86\n(92+65)/86\n(27+58)/78",
"output": "1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 "
}
] | 1,683,013,833 | 2,147,483,647 | Python 3 | OK | TESTS | 16 | 2,370 | 4,608,000 | n=int(input())
id=[0]*n
di={}
for i in range(n):
s=input()
id[i]=eval(s)
if id[i] not in di:
di[id[i]]=1
else:
di[id[i]]+=1
for i in range(n):
print(di[id[i]],end=' ') | Title: Hyperspace Jump (easy)
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The Rebel fleet is on the run. It consists of *m* ships currently gathered around a single planet. Just a few seconds ago, the vastly more powerful Empire fleet has appeared in the same solar system, and the Rebels will need to escape into hyperspace. In order to spread the fleet, the captain of each ship has independently come up with the coordinate to which that ship will jump. In the obsolete navigation system used by the Rebels, this coordinate is given as the value of an arithmetic expression of the form .
To plan the future of the resistance movement, Princess Heidi needs to know, for each ship, how many ships are going to end up at the same coordinate after the jump. You are her only hope!
Input Specification:
The first line of the input contains a single integer *m* (1<=≤<=*m*<=≤<=200<=000) – the number of ships. The next *m* lines describe one jump coordinate each, given as an arithmetic expression. An expression has the form (a+b)/c. Namely, it consists of: an opening parenthesis (, a positive integer *a* of up to two decimal digits, a plus sign +, a positive integer *b* of up to two decimal digits, a closing parenthesis ), a slash /, and a positive integer *c* of up to two decimal digits.
Output Specification:
Print a single line consisting of *m* space-separated integers. The *i*-th integer should be equal to the number of ships whose coordinate is equal to that of the *i*-th ship (including the *i*-th ship itself).
Demo Input:
['4\n(99+98)/97\n(26+4)/10\n(12+33)/15\n(5+1)/7\n']
Demo Output:
['1 2 2 1 ']
Note:
In the sample testcase, the second and the third ship will both end up at the coordinate 3.
Note that this problem has only two versions – easy and hard. | ```python
n=int(input())
id=[0]*n
di={}
for i in range(n):
s=input()
id[i]=eval(s)
if id[i] not in di:
di[id[i]]=1
else:
di[id[i]]+=1
for i in range(n):
print(di[id[i]],end=' ')
``` | 3 | |
304 | A | Pythagorean Theorem II | PROGRAMMING | 1,200 | [
"brute force",
"math"
] | null | null | In mathematics, the Pythagorean theorem — is a relation in Euclidean geometry among the three sides of a right-angled triangle. In terms of areas, it states:
In any right-angled triangle, the area of the square whose side is the hypotenuse (the side opposite the right angle) is equal to the sum of the areas of the squares whose sides are the two legs (the two sides that meet at a right angle).
The theorem can be written as an equation relating the lengths of the sides *a*, *b* and *c*, often called the Pythagorean equation:
where *c* represents the length of the hypotenuse, and *a* and *b* represent the lengths of the other two sides.
Given *n*, your task is to count how many right-angled triangles with side-lengths *a*, *b* and *c* that satisfied an inequality 1<=≤<=*a*<=≤<=*b*<=≤<=*c*<=≤<=*n*. | The only line contains one integer *n* (1<=≤<=*n*<=≤<=104) as we mentioned above. | Print a single integer — the answer to the problem. | [
"5\n",
"74\n"
] | [
"1\n",
"35\n"
] | none | 500 | [
{
"input": "5",
"output": "1"
},
{
"input": "74",
"output": "35"
},
{
"input": "1000",
"output": "881"
},
{
"input": "586",
"output": "472"
},
{
"input": "2",
"output": "0"
},
{
"input": "362",
"output": "258"
},
{
"input": "778",
"output": "653"
},
{
"input": "194",
"output": "120"
},
{
"input": "906",
"output": "786"
},
{
"input": "659",
"output": "535"
},
{
"input": "75",
"output": "37"
},
{
"input": "787",
"output": "664"
},
{
"input": "851",
"output": "730"
},
{
"input": "563",
"output": "446"
},
{
"input": "979",
"output": "862"
},
{
"input": "395",
"output": "291"
},
{
"input": "755",
"output": "634"
},
{
"input": "171",
"output": "103"
},
{
"input": "883",
"output": "759"
},
{
"input": "400",
"output": "294"
},
{
"input": "817",
"output": "693"
},
{
"input": "177",
"output": "107"
},
{
"input": "593",
"output": "476"
},
{
"input": "305",
"output": "214"
},
{
"input": "721",
"output": "595"
},
{
"input": "785",
"output": "664"
},
{
"input": "497",
"output": "383"
},
{
"input": "913",
"output": "791"
},
{
"input": "625",
"output": "507"
},
{
"input": "334",
"output": "236"
},
{
"input": "10000",
"output": "12471"
},
{
"input": "9999",
"output": "12467"
}
] | 1,620,648,074 | 2,147,483,647 | Python 3 | TIME_LIMIT_EXCEEDED | TESTS | 2 | 3,000 | 6,758,400 | n=int(input())
count=0
for i in range(1,n-1):
for j in range(i+1,n):
for k in range(j+1,n+1):
if k**2==i**2 + j**2:
count+=1
print(count) | Title: Pythagorean Theorem II
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
In mathematics, the Pythagorean theorem — is a relation in Euclidean geometry among the three sides of a right-angled triangle. In terms of areas, it states:
In any right-angled triangle, the area of the square whose side is the hypotenuse (the side opposite the right angle) is equal to the sum of the areas of the squares whose sides are the two legs (the two sides that meet at a right angle).
The theorem can be written as an equation relating the lengths of the sides *a*, *b* and *c*, often called the Pythagorean equation:
where *c* represents the length of the hypotenuse, and *a* and *b* represent the lengths of the other two sides.
Given *n*, your task is to count how many right-angled triangles with side-lengths *a*, *b* and *c* that satisfied an inequality 1<=≤<=*a*<=≤<=*b*<=≤<=*c*<=≤<=*n*.
Input Specification:
The only line contains one integer *n* (1<=≤<=*n*<=≤<=104) as we mentioned above.
Output Specification:
Print a single integer — the answer to the problem.
Demo Input:
['5\n', '74\n']
Demo Output:
['1\n', '35\n']
Note:
none | ```python
n=int(input())
count=0
for i in range(1,n-1):
for j in range(i+1,n):
for k in range(j+1,n+1):
if k**2==i**2 + j**2:
count+=1
print(count)
``` | 0 | |
231 | A | Team | PROGRAMMING | 800 | [
"brute force",
"greedy"
] | null | null | One day three best friends Petya, Vasya and Tonya decided to form a team and take part in programming contests. Participants are usually offered several problems during programming contests. Long before the start the friends decided that they will implement a problem if at least two of them are sure about the solution. Otherwise, the friends won't write the problem's solution.
This contest offers *n* problems to the participants. For each problem we know, which friend is sure about the solution. Help the friends find the number of problems for which they will write a solution. | The first input line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of problems in the contest. Then *n* lines contain three integers each, each integer is either 0 or 1. If the first number in the line equals 1, then Petya is sure about the problem's solution, otherwise he isn't sure. The second number shows Vasya's view on the solution, the third number shows Tonya's view. The numbers on the lines are separated by spaces. | Print a single integer — the number of problems the friends will implement on the contest. | [
"3\n1 1 0\n1 1 1\n1 0 0\n",
"2\n1 0 0\n0 1 1\n"
] | [
"2\n",
"1\n"
] | In the first sample Petya and Vasya are sure that they know how to solve the first problem and all three of them know how to solve the second problem. That means that they will write solutions for these problems. Only Petya is sure about the solution for the third problem, but that isn't enough, so the friends won't take it.
In the second sample the friends will only implement the second problem, as Vasya and Tonya are sure about the solution. | 500 | [
{
"input": "3\n1 1 0\n1 1 1\n1 0 0",
"output": "2"
},
{
"input": "2\n1 0 0\n0 1 1",
"output": "1"
},
{
"input": "1\n1 0 0",
"output": "0"
},
{
"input": "2\n1 0 0\n1 1 1",
"output": "1"
},
{
"input": "5\n1 0 0\n0 1 0\n1 1 1\n0 0 1\n0 0 0",
"output": "1"
},
{
"input": "10\n0 1 0\n0 1 0\n1 1 0\n1 0 0\n0 0 1\n0 1 1\n1 1 1\n1 1 0\n0 0 0\n0 0 0",
"output": "4"
},
{
"input": "15\n0 1 0\n1 0 0\n1 1 0\n1 1 1\n0 1 0\n0 0 1\n1 0 1\n1 0 1\n1 0 1\n0 0 0\n1 1 1\n1 1 0\n0 1 1\n1 1 0\n1 1 1",
"output": "10"
},
{
"input": "50\n0 0 0\n0 1 1\n1 1 1\n0 1 0\n1 0 1\n1 1 1\n0 0 1\n1 0 0\n1 1 0\n1 0 1\n0 1 0\n0 0 1\n1 1 0\n0 1 0\n1 1 0\n0 0 0\n1 1 1\n1 0 1\n0 0 1\n1 1 0\n1 1 1\n0 1 1\n1 1 0\n0 0 0\n0 0 0\n1 1 1\n0 0 0\n1 1 1\n0 1 1\n0 0 1\n0 0 0\n0 0 0\n1 1 0\n1 1 0\n1 0 1\n1 0 0\n1 0 1\n1 0 1\n0 1 1\n1 1 0\n1 1 0\n0 1 0\n1 0 1\n0 0 0\n0 0 0\n0 0 0\n0 0 1\n1 1 1\n0 1 1\n1 0 1",
"output": "29"
},
{
"input": "1\n1 1 1",
"output": "1"
},
{
"input": "8\n0 0 0\n0 0 1\n0 0 0\n0 1 1\n1 0 0\n1 0 1\n1 1 0\n1 1 1",
"output": "4"
},
{
"input": "16\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1\n1 1 1",
"output": "16"
}
] | 1,698,177,444 | 2,147,483,647 | Python 3 | OK | TESTS | 21 | 92 | 0 | n = int(input())
no_of_answers = 0
for i in range(n):
guess = (input().split(' '))
if guess.count('1') > 1:
no_of_answers += 1
print(no_of_answers) | Title: Team
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
One day three best friends Petya, Vasya and Tonya decided to form a team and take part in programming contests. Participants are usually offered several problems during programming contests. Long before the start the friends decided that they will implement a problem if at least two of them are sure about the solution. Otherwise, the friends won't write the problem's solution.
This contest offers *n* problems to the participants. For each problem we know, which friend is sure about the solution. Help the friends find the number of problems for which they will write a solution.
Input Specification:
The first input line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of problems in the contest. Then *n* lines contain three integers each, each integer is either 0 or 1. If the first number in the line equals 1, then Petya is sure about the problem's solution, otherwise he isn't sure. The second number shows Vasya's view on the solution, the third number shows Tonya's view. The numbers on the lines are separated by spaces.
Output Specification:
Print a single integer — the number of problems the friends will implement on the contest.
Demo Input:
['3\n1 1 0\n1 1 1\n1 0 0\n', '2\n1 0 0\n0 1 1\n']
Demo Output:
['2\n', '1\n']
Note:
In the first sample Petya and Vasya are sure that they know how to solve the first problem and all three of them know how to solve the second problem. That means that they will write solutions for these problems. Only Petya is sure about the solution for the third problem, but that isn't enough, so the friends won't take it.
In the second sample the friends will only implement the second problem, as Vasya and Tonya are sure about the solution. | ```python
n = int(input())
no_of_answers = 0
for i in range(n):
guess = (input().split(' '))
if guess.count('1') > 1:
no_of_answers += 1
print(no_of_answers)
``` | 3 | |
699 | A | Launch of Collider | PROGRAMMING | 1,000 | [
"implementation"
] | null | null | There will be a launch of a new, powerful and unusual collider very soon, which located along a straight line. *n* particles will be launched inside it. All of them are located in a straight line and there can not be two or more particles located in the same point. The coordinates of the particles coincide with the distance in meters from the center of the collider, *x**i* is the coordinate of the *i*-th particle and its position in the collider at the same time. All coordinates of particle positions are even integers.
You know the direction of each particle movement — it will move to the right or to the left after the collider's launch start. All particles begin to move simultaneously at the time of the collider's launch start. Each particle will move straight to the left or straight to the right with the constant speed of 1 meter per microsecond. The collider is big enough so particles can not leave it in the foreseeable time.
Write the program which finds the moment of the first collision of any two particles of the collider. In other words, find the number of microseconds before the first moment when any two particles are at the same point. | The first line contains the positive integer *n* (1<=≤<=*n*<=≤<=200<=000) — the number of particles.
The second line contains *n* symbols "L" and "R". If the *i*-th symbol equals "L", then the *i*-th particle will move to the left, otherwise the *i*-th symbol equals "R" and the *i*-th particle will move to the right.
The third line contains the sequence of pairwise distinct even integers *x*1,<=*x*2,<=...,<=*x**n* (0<=≤<=*x**i*<=≤<=109) — the coordinates of particles in the order from the left to the right. It is guaranteed that the coordinates of particles are given in the increasing order. | In the first line print the only integer — the first moment (in microseconds) when two particles are at the same point and there will be an explosion.
Print the only integer -1, if the collision of particles doesn't happen. | [
"4\nRLRL\n2 4 6 10\n",
"3\nLLR\n40 50 60\n"
] | [
"1\n",
"-1\n"
] | In the first sample case the first explosion will happen in 1 microsecond because the particles number 1 and 2 will simultaneously be at the same point with the coordinate 3.
In the second sample case there will be no explosion because there are no particles which will simultaneously be at the same point. | 500 | [
{
"input": "4\nRLRL\n2 4 6 10",
"output": "1"
},
{
"input": "3\nLLR\n40 50 60",
"output": "-1"
},
{
"input": "4\nRLLR\n46 230 264 470",
"output": "92"
},
{
"input": "6\nLLRLLL\n446 492 650 844 930 970",
"output": "97"
},
{
"input": "8\nRRLLLLLL\n338 478 512 574 594 622 834 922",
"output": "17"
},
{
"input": "10\nLRLRLLRRLR\n82 268 430 598 604 658 670 788 838 1000",
"output": "3"
},
{
"input": "2\nRL\n0 1000000000",
"output": "500000000"
},
{
"input": "12\nLRLLRRRRLRLL\n254 1260 1476 1768 2924 4126 4150 4602 5578 7142 8134 9082",
"output": "108"
},
{
"input": "14\nRLLRRLRLLRLLLR\n698 2900 3476 3724 3772 3948 4320 4798 5680 6578 7754 8034 8300 8418",
"output": "88"
},
{
"input": "16\nRRLLLRLRLLLLRLLR\n222 306 968 1060 1636 1782 2314 2710 3728 4608 5088 6790 6910 7156 7418 7668",
"output": "123"
},
{
"input": "18\nRLRLLRRRLLLRLRRLRL\n1692 2028 2966 3008 3632 4890 5124 5838 6596 6598 6890 8294 8314 8752 8868 9396 9616 9808",
"output": "10"
},
{
"input": "20\nRLLLLLLLRRRRLRRLRRLR\n380 902 1400 1834 2180 2366 2562 2596 2702 2816 3222 3238 3742 5434 6480 7220 7410 8752 9708 9970",
"output": "252"
},
{
"input": "22\nLRRRRRRRRRRRLLRRRRRLRL\n1790 2150 2178 2456 2736 3282 3622 4114 4490 4772 5204 5240 5720 5840 5910 5912 6586 7920 8584 9404 9734 9830",
"output": "48"
},
{
"input": "24\nLLRLRRLLRLRRRRLLRRLRLRRL\n100 360 864 1078 1360 1384 1438 2320 2618 3074 3874 3916 3964 5178 5578 6278 6630 6992 8648 8738 8922 8930 9276 9720",
"output": "27"
},
{
"input": "26\nRLLLLLLLRLRRLRLRLRLRLLLRRR\n908 1826 2472 2474 2728 3654 3716 3718 3810 3928 4058 4418 4700 5024 5768 6006 6128 6386 6968 7040 7452 7774 7822 8726 9338 9402",
"output": "59"
},
{
"input": "28\nRRLRLRRRRRRLLLRRLRRLLLRRLLLR\n156 172 1120 1362 2512 3326 3718 4804 4990 5810 6242 6756 6812 6890 6974 7014 7088 7724 8136 8596 8770 8840 9244 9250 9270 9372 9400 9626",
"output": "10"
},
{
"input": "30\nRLLRLRLLRRRLRRRLLLLLLRRRLRRLRL\n128 610 1680 2436 2896 2994 3008 3358 3392 4020 4298 4582 4712 4728 5136 5900 6088 6232 6282 6858 6934 7186 7224 7256 7614 8802 8872 9170 9384 9794",
"output": "7"
},
{
"input": "10\nLLLLRRRRRR\n0 2 4 6 8 10 12 14 16 18",
"output": "-1"
},
{
"input": "5\nLLLLL\n0 10 20 30 40",
"output": "-1"
},
{
"input": "6\nRRRRRR\n40 50 60 70 80 100",
"output": "-1"
},
{
"input": "1\nR\n0",
"output": "-1"
},
{
"input": "2\nRL\n2 1000000000",
"output": "499999999"
},
{
"input": "2\nRL\n0 400000",
"output": "200000"
},
{
"input": "2\nRL\n0 200002",
"output": "100001"
},
{
"input": "2\nRL\n2 20000000",
"output": "9999999"
},
{
"input": "4\nLLRL\n2 4 10 100",
"output": "45"
},
{
"input": "4\nRLRL\n2 10 12 14",
"output": "1"
},
{
"input": "2\nRL\n0 100000000",
"output": "50000000"
},
{
"input": "2\nRL\n2 600002",
"output": "300000"
},
{
"input": "1\nL\n0",
"output": "-1"
},
{
"input": "2\nRL\n0 600000",
"output": "300000"
},
{
"input": "5\nRRRRR\n0 2 4 6 8",
"output": "-1"
},
{
"input": "2\nRL\n2 200000000",
"output": "99999999"
},
{
"input": "2\nRL\n0 267382766",
"output": "133691383"
},
{
"input": "3\nRRL\n4 8 999999998",
"output": "499999995"
},
{
"input": "2\nRL\n0 2",
"output": "1"
},
{
"input": "2\nRL\n2 400002",
"output": "200000"
},
{
"input": "2\nLL\n2 4",
"output": "-1"
},
{
"input": "2\nLL\n0 2",
"output": "-1"
},
{
"input": "2\nRL\n0 100000",
"output": "50000"
},
{
"input": "2\nRL\n2 200000020",
"output": "100000009"
},
{
"input": "2\nRL\n2000000 4000000",
"output": "1000000"
},
{
"input": "2\nRL\n0 199998",
"output": "99999"
},
{
"input": "3\nLRR\n40 50 60",
"output": "-1"
},
{
"input": "2\nRL\n200 400400",
"output": "200100"
},
{
"input": "2\nRL\n2 400004",
"output": "200001"
},
{
"input": "2\nRL\n0 200000000",
"output": "100000000"
}
] | 1,470,899,172 | 2,147,483,647 | Python 3 | OK | TESTS | 85 | 171 | 20,582,400 | n = int(input())
s = input()
x = [int(y) for y in input().split()]
t = float('inf')
pos = s.find('RL')
if pos==-1:
print(-1)
else:
while pos!=-1:
t = min(t, (x[pos+1]-x[pos])/2)
pos = s.find('RL', pos+1)
print(int(t))
| Title: Launch of Collider
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
There will be a launch of a new, powerful and unusual collider very soon, which located along a straight line. *n* particles will be launched inside it. All of them are located in a straight line and there can not be two or more particles located in the same point. The coordinates of the particles coincide with the distance in meters from the center of the collider, *x**i* is the coordinate of the *i*-th particle and its position in the collider at the same time. All coordinates of particle positions are even integers.
You know the direction of each particle movement — it will move to the right or to the left after the collider's launch start. All particles begin to move simultaneously at the time of the collider's launch start. Each particle will move straight to the left or straight to the right with the constant speed of 1 meter per microsecond. The collider is big enough so particles can not leave it in the foreseeable time.
Write the program which finds the moment of the first collision of any two particles of the collider. In other words, find the number of microseconds before the first moment when any two particles are at the same point.
Input Specification:
The first line contains the positive integer *n* (1<=≤<=*n*<=≤<=200<=000) — the number of particles.
The second line contains *n* symbols "L" and "R". If the *i*-th symbol equals "L", then the *i*-th particle will move to the left, otherwise the *i*-th symbol equals "R" and the *i*-th particle will move to the right.
The third line contains the sequence of pairwise distinct even integers *x*1,<=*x*2,<=...,<=*x**n* (0<=≤<=*x**i*<=≤<=109) — the coordinates of particles in the order from the left to the right. It is guaranteed that the coordinates of particles are given in the increasing order.
Output Specification:
In the first line print the only integer — the first moment (in microseconds) when two particles are at the same point and there will be an explosion.
Print the only integer -1, if the collision of particles doesn't happen.
Demo Input:
['4\nRLRL\n2 4 6 10\n', '3\nLLR\n40 50 60\n']
Demo Output:
['1\n', '-1\n']
Note:
In the first sample case the first explosion will happen in 1 microsecond because the particles number 1 and 2 will simultaneously be at the same point with the coordinate 3.
In the second sample case there will be no explosion because there are no particles which will simultaneously be at the same point. | ```python
n = int(input())
s = input()
x = [int(y) for y in input().split()]
t = float('inf')
pos = s.find('RL')
if pos==-1:
print(-1)
else:
while pos!=-1:
t = min(t, (x[pos+1]-x[pos])/2)
pos = s.find('RL', pos+1)
print(int(t))
``` | 3 | |
547 | B | Mike and Feet | PROGRAMMING | 1,900 | [
"binary search",
"data structures",
"dp",
"dsu"
] | null | null | Mike is the president of country What-The-Fatherland. There are *n* bears living in this country besides Mike. All of them are standing in a line and they are numbered from 1 to *n* from left to right. *i*-th bear is exactly *a**i* feet high.
A group of bears is a non-empty contiguous segment of the line. The size of a group is the number of bears in that group. The strength of a group is the minimum height of the bear in that group.
Mike is a curious to know for each *x* such that 1<=≤<=*x*<=≤<=*n* the maximum strength among all groups of size *x*. | The first line of input contains integer *n* (1<=≤<=*n*<=≤<=2<=×<=105), the number of bears.
The second line contains *n* integers separated by space, *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=109), heights of bears. | Print *n* integers in one line. For each *x* from 1 to *n*, print the maximum strength among all groups of size *x*. | [
"10\n1 2 3 4 5 4 3 2 1 6\n"
] | [
"6 4 4 3 3 2 2 1 1 1 \n"
] | none | 1,000 | [
{
"input": "10\n1 2 3 4 5 4 3 2 1 6",
"output": "6 4 4 3 3 2 2 1 1 1 "
},
{
"input": "3\n524125987 923264237 374288891",
"output": "923264237 524125987 374288891 "
},
{
"input": "5\n585325539 365329221 412106895 291882089 564718673",
"output": "585325539 365329221 365329221 291882089 291882089 "
},
{
"input": "20\n452405440 586588704 509061481 552472140 16115810 148658854 66743034 628305150 677780684 519361360 208050516 401554301 954478790 346543678 387546138 832279893 641889899 80960260 717802881 588066499",
"output": "954478790 641889899 519361360 452405440 346543678 346543678 208050516 208050516 208050516 208050516 80960260 80960260 80960260 66743034 66743034 16115810 16115810 16115810 16115810 16115810 "
},
{
"input": "1\n1376",
"output": "1376 "
},
{
"input": "2\n10 10",
"output": "10 10 "
},
{
"input": "2\n10 9",
"output": "10 9 "
},
{
"input": "3\n1 2 3",
"output": "3 2 1 "
},
{
"input": "3\n1 3 2",
"output": "3 2 1 "
},
{
"input": "10\n802030518 598196518 640274071 983359971 71550121 96204862 799843967 446173607 796619138 402690754",
"output": "983359971 640274071 598196518 598196518 96204862 71550121 71550121 71550121 71550121 71550121 "
},
{
"input": "19\n519879446 764655030 680293934 914539062 744988123 317088317 653721289 239862203 605157354 943428394 261437390 821695238 312192823 432992892 547139308 408916833 829654733 223751525 672158759",
"output": "943428394 744988123 680293934 680293934 519879446 317088317 317088317 261437390 261437390 239862203 239862203 239862203 239862203 239862203 239862203 239862203 239862203 223751525 223751525 "
}
] | 1,590,180,918 | 2,147,483,647 | PyPy 3 | WRONG_ANSWER | TESTS | 0 | 124 | 0 | size = int(input())
heights = input().split()
final = []
indi = []
indi_last = []
for x in range(1, size+1):
for i in range(0, size):
if i+x == size+1:
break
else:
indi.append(heights[i:i+x])
i+=1
for j in indi:
indi_last.append(min(j))
final.append(max(indi_last))
indi.clear()
indi_last.clear()
print(final) | Title: Mike and Feet
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Mike is the president of country What-The-Fatherland. There are *n* bears living in this country besides Mike. All of them are standing in a line and they are numbered from 1 to *n* from left to right. *i*-th bear is exactly *a**i* feet high.
A group of bears is a non-empty contiguous segment of the line. The size of a group is the number of bears in that group. The strength of a group is the minimum height of the bear in that group.
Mike is a curious to know for each *x* such that 1<=≤<=*x*<=≤<=*n* the maximum strength among all groups of size *x*.
Input Specification:
The first line of input contains integer *n* (1<=≤<=*n*<=≤<=2<=×<=105), the number of bears.
The second line contains *n* integers separated by space, *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=109), heights of bears.
Output Specification:
Print *n* integers in one line. For each *x* from 1 to *n*, print the maximum strength among all groups of size *x*.
Demo Input:
['10\n1 2 3 4 5 4 3 2 1 6\n']
Demo Output:
['6 4 4 3 3 2 2 1 1 1 \n']
Note:
none | ```python
size = int(input())
heights = input().split()
final = []
indi = []
indi_last = []
for x in range(1, size+1):
for i in range(0, size):
if i+x == size+1:
break
else:
indi.append(heights[i:i+x])
i+=1
for j in indi:
indi_last.append(min(j))
final.append(max(indi_last))
indi.clear()
indi_last.clear()
print(final)
``` | 0 | |
380 | C | Sereja and Brackets | PROGRAMMING | 2,000 | [
"data structures",
"schedules"
] | null | null | Sereja has a bracket sequence *s*1,<=*s*2,<=...,<=*s**n*, or, in other words, a string *s* of length *n*, consisting of characters "(" and ")".
Sereja needs to answer *m* queries, each of them is described by two integers *l**i*,<=*r**i* (1<=≤<=*l**i*<=≤<=*r**i*<=≤<=*n*). The answer to the *i*-th query is the length of the maximum correct bracket subsequence of sequence *s**l**i*,<=*s**l**i*<=+<=1,<=...,<=*s**r**i*. Help Sereja answer all queries.
You can find the definitions for a subsequence and a correct bracket sequence in the notes. | The first line contains a sequence of characters *s*1,<=*s*2,<=...,<=*s**n* (1<=≤<=*n*<=≤<=106) without any spaces. Each character is either a "(" or a ")". The second line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. Each of the next *m* lines contains a pair of integers. The *i*-th line contains integers *l**i*,<=*r**i* (1<=≤<=*l**i*<=≤<=*r**i*<=≤<=*n*) — the description of the *i*-th query. | Print the answer to each question on a single line. Print the answers in the order they go in the input. | [
"())(())(())(\n7\n1 1\n2 3\n1 2\n1 12\n8 12\n5 11\n2 10\n"
] | [
"0\n0\n2\n10\n4\n6\n6\n"
] | A subsequence of length |*x*| of string *s* = *s*<sub class="lower-index">1</sub>*s*<sub class="lower-index">2</sub>... *s*<sub class="lower-index">|*s*|</sub> (where |*s*| is the length of string *s*) is string *x* = *s*<sub class="lower-index">*k*<sub class="lower-index">1</sub></sub>*s*<sub class="lower-index">*k*<sub class="lower-index">2</sub></sub>... *s*<sub class="lower-index">*k*<sub class="lower-index">|*x*|</sub></sub> (1 ≤ *k*<sub class="lower-index">1</sub> < *k*<sub class="lower-index">2</sub> < ... < *k*<sub class="lower-index">|*x*|</sub> ≤ |*s*|).
A correct bracket sequence is a bracket sequence that can be transformed into a correct aryphmetic expression by inserting characters "1" and "+" between the characters of the string. For example, bracket sequences "()()", "(())" are correct (the resulting expressions "(1)+(1)", "((1+1)+1)"), and ")(" and "(" are not.
For the third query required sequence will be «()».
For the fourth query required sequence will be «()(())(())». | 1,500 | [
{
"input": "())(())(())(\n7\n1 1\n2 3\n1 2\n1 12\n8 12\n5 11\n2 10",
"output": "0\n0\n2\n10\n4\n6\n6"
},
{
"input": "(((((()((((((((((()((()(((((\n1\n8 15",
"output": "0"
},
{
"input": "((()((())(((((((((()(()(()(((((((((((((((()(()((((((((((((((()(((((((((((((((((((()(((\n39\n28 56\n39 46\n57 63\n29 48\n51 75\n14 72\n5 70\n51 73\n10 64\n31 56\n50 54\n15 78\n78 82\n1 11\n1 70\n1 19\n10 22\n13 36\n3 10\n34 40\n51 76\n64 71\n36 75\n24 71\n1 63\n5 14\n46 67\n32 56\n39 43\n43 56\n61 82\n2 78\n1 21\n10 72\n49 79\n12 14\n53 79\n15 31\n7 47",
"output": "4\n4\n2\n4\n2\n12\n16\n2\n12\n4\n0\n12\n0\n6\n18\n6\n2\n6\n6\n0\n2\n0\n6\n8\n18\n4\n2\n4\n2\n2\n2\n18\n8\n12\n2\n0\n2\n6\n12"
},
{
"input": "))(()))))())())))))())((()()))))()))))))))))))\n9\n26 42\n21 22\n6 22\n7 26\n43 46\n25 27\n32 39\n22 40\n2 45",
"output": "4\n0\n6\n8\n0\n2\n2\n10\n20"
},
{
"input": "(()((((()(())((((((((()((((((()((((\n71\n15 29\n17 18\n5 26\n7 10\n16 31\n26 35\n2 30\n16 24\n2 24\n7 12\n15 18\n12 13\n25 30\n1 30\n12 13\n16 20\n6 35\n20 28\n18 23\n9 31\n12 35\n14 17\n8 16\n3 10\n12 33\n7 19\n2 33\n7 17\n21 27\n10 30\n29 32\n9 28\n18 32\n28 31\n31 33\n4 26\n15 27\n10 17\n8 14\n11 28\n8 23\n17 33\n4 14\n3 6\n6 34\n19 23\n4 21\n16 27\n14 27\n6 19\n31 32\n29 32\n9 17\n1 21\n2 31\n18 29\n16 26\n15 18\n4 5\n13 20\n9 28\n18 30\n1 32\n2 9\n16 24\n1 20\n4 15\n16 23\n19 34\n5 22\n5 23",
"output": "2\n0\n8\n2\n4\n2\n10\n2\n10\n4\n0\n0\n0\n10\n0\n0\n10\n2\n2\n8\n4\n0\n6\n2\n4\n6\n12\n6\n2\n6\n2\n6\n4\n2\n0\n8\n2\n4\n6\n4\n8\n4\n6\n0\n10\n2\n6\n2\n2\n6\n0\n2\n4\n8\n12\n2\n2\n0\n0\n0\n6\n2\n12\n4\n2\n8\n6\n2\n4\n6\n8"
},
{
"input": "(((())((((()()((((((()((()(((((((((((()((\n6\n20 37\n28 32\n12 18\n7 25\n21 33\n4 5",
"output": "4\n0\n2\n6\n4\n2"
},
{
"input": "(((()((((()()()(()))((((()(((()))()((((()))()((())\n24\n37 41\n13 38\n31 34\n14 16\n29 29\n12 46\n1 26\n15 34\n8 47\n11 23\n6 32\n2 22\n9 27\n17 40\n6 15\n4 49\n12 33\n3 48\n22 47\n19 48\n10 27\n23 25\n4 44\n27 48",
"output": "2\n16\n0\n2\n0\n26\n16\n12\n30\n8\n18\n14\n14\n12\n6\n34\n16\n32\n18\n18\n12\n0\n30\n16"
},
{
"input": ")()((((((((((((((((()(((()()(()((((((()(((((((()()))((((())(((((((((()(((((((((\n51\n29 53\n31 69\n54 59\n3 52\n26 46\n14 62\n6 54\n39 56\n17 27\n46 74\n60 72\n18 26\n38 46\n4 27\n22 52\n44 49\n42 77\n2 20\n39 57\n61 70\n33 54\n10 30\n67 70\n46 66\n17 77\n5 52\n33 77\n26 32\n1 72\n40 78\n38 68\n19 47\n30 53\n19 29\n52 71\n1 11\n22 53\n17 42\n2 51\n4 12\n24 76\n22 34\n21 69\n11 69\n36 52\n17 31\n57 58\n54 62\n23 71\n5 46\n51 53",
"output": "12\n14\n4\n18\n6\n22\n18\n8\n4\n12\n2\n4\n2\n4\n16\n2\n14\n2\n8\n2\n10\n6\n2\n10\n24\n18\n16\n4\n26\n14\n14\n10\n12\n6\n6\n2\n16\n10\n18\n0\n22\n6\n20\n22\n10\n8\n2\n4\n22\n10\n0"
},
{
"input": "(\n1\n1 1",
"output": "0"
},
{
"input": ")\n1\n1 1",
"output": "0"
},
{
"input": "()\n1\n1 2",
"output": "2"
},
{
"input": ")(\n1\n1 2",
"output": "0"
}
] | 1,629,860,378 | 2,147,483,647 | PyPy 3 | OK | TESTS | 40 | 545 | 60,211,200 | import io, os, sys
pypyin = io.BytesIO(os.read(0, os.fstat(0).st_size)).readline
cpyin = sys.stdin.readline
input = pypyin if 'PyPy' in sys.version else cpyin
def strput():
return input().decode() if 'PyPy' in sys.version else input()
# code starts here
class SegmentTree:
n, l, r = [], [], []
size = 0
def __init__(self, n):
self.n = [0] * (n * 2)
self.l = [0] * (n * 2)
self.r = [0] * (n * 2)
self.size = n
def build(self, s):
n = self.size
for i in range(n):
if s[i] == '(':
self.l[n + i] = 1
elif s[i] == ')':
self.r[n + i] = 1
for i in range(n - 1, -1, -1):
match = min(self.l[i << 1], self.r[i << 1 | 1])
self.n[i] = self.n[i << 1] + self.n[i << 1 | 1] + match * 2
self.l[i] = self.l[i << 1] + self.l[i << 1 | 1] - match
self.r[i] = self.r[i << 1] + self.r[i << 1 | 1] - match
def get(self, u, v): # [u, v)
u += self.size
v += self.size
left, right = [], []
while u < v:
if u & 1:
left.append((self.n[u], self.l[u], self.r[u]))
u += 1
if v & 1:
v -= 1
right.append((self.n[v], self.l[v], self.r[v]))
u >>= 1
v >>= 1
n, l, r = 0, 0, 0
leave = left
leave.extend(right[::-1])
for nn, ll, rr in leave:
match = min(l, rr)
n += nn + match * 2
l += ll - match
r += rr - match
return n
def main():
s = strput().rstrip()
tree = SegmentTree(len(s))
tree.build(s)
q = int(input())
for i in range(q):
l, r = [int(x) for x in input().split()]
print(tree.get(l - 1, r))
if __name__ == "__main__":
main() | Title: Sereja and Brackets
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Sereja has a bracket sequence *s*1,<=*s*2,<=...,<=*s**n*, or, in other words, a string *s* of length *n*, consisting of characters "(" and ")".
Sereja needs to answer *m* queries, each of them is described by two integers *l**i*,<=*r**i* (1<=≤<=*l**i*<=≤<=*r**i*<=≤<=*n*). The answer to the *i*-th query is the length of the maximum correct bracket subsequence of sequence *s**l**i*,<=*s**l**i*<=+<=1,<=...,<=*s**r**i*. Help Sereja answer all queries.
You can find the definitions for a subsequence and a correct bracket sequence in the notes.
Input Specification:
The first line contains a sequence of characters *s*1,<=*s*2,<=...,<=*s**n* (1<=≤<=*n*<=≤<=106) without any spaces. Each character is either a "(" or a ")". The second line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. Each of the next *m* lines contains a pair of integers. The *i*-th line contains integers *l**i*,<=*r**i* (1<=≤<=*l**i*<=≤<=*r**i*<=≤<=*n*) — the description of the *i*-th query.
Output Specification:
Print the answer to each question on a single line. Print the answers in the order they go in the input.
Demo Input:
['())(())(())(\n7\n1 1\n2 3\n1 2\n1 12\n8 12\n5 11\n2 10\n']
Demo Output:
['0\n0\n2\n10\n4\n6\n6\n']
Note:
A subsequence of length |*x*| of string *s* = *s*<sub class="lower-index">1</sub>*s*<sub class="lower-index">2</sub>... *s*<sub class="lower-index">|*s*|</sub> (where |*s*| is the length of string *s*) is string *x* = *s*<sub class="lower-index">*k*<sub class="lower-index">1</sub></sub>*s*<sub class="lower-index">*k*<sub class="lower-index">2</sub></sub>... *s*<sub class="lower-index">*k*<sub class="lower-index">|*x*|</sub></sub> (1 ≤ *k*<sub class="lower-index">1</sub> < *k*<sub class="lower-index">2</sub> < ... < *k*<sub class="lower-index">|*x*|</sub> ≤ |*s*|).
A correct bracket sequence is a bracket sequence that can be transformed into a correct aryphmetic expression by inserting characters "1" and "+" between the characters of the string. For example, bracket sequences "()()", "(())" are correct (the resulting expressions "(1)+(1)", "((1+1)+1)"), and ")(" and "(" are not.
For the third query required sequence will be «()».
For the fourth query required sequence will be «()(())(())». | ```python
import io, os, sys
pypyin = io.BytesIO(os.read(0, os.fstat(0).st_size)).readline
cpyin = sys.stdin.readline
input = pypyin if 'PyPy' in sys.version else cpyin
def strput():
return input().decode() if 'PyPy' in sys.version else input()
# code starts here
class SegmentTree:
n, l, r = [], [], []
size = 0
def __init__(self, n):
self.n = [0] * (n * 2)
self.l = [0] * (n * 2)
self.r = [0] * (n * 2)
self.size = n
def build(self, s):
n = self.size
for i in range(n):
if s[i] == '(':
self.l[n + i] = 1
elif s[i] == ')':
self.r[n + i] = 1
for i in range(n - 1, -1, -1):
match = min(self.l[i << 1], self.r[i << 1 | 1])
self.n[i] = self.n[i << 1] + self.n[i << 1 | 1] + match * 2
self.l[i] = self.l[i << 1] + self.l[i << 1 | 1] - match
self.r[i] = self.r[i << 1] + self.r[i << 1 | 1] - match
def get(self, u, v): # [u, v)
u += self.size
v += self.size
left, right = [], []
while u < v:
if u & 1:
left.append((self.n[u], self.l[u], self.r[u]))
u += 1
if v & 1:
v -= 1
right.append((self.n[v], self.l[v], self.r[v]))
u >>= 1
v >>= 1
n, l, r = 0, 0, 0
leave = left
leave.extend(right[::-1])
for nn, ll, rr in leave:
match = min(l, rr)
n += nn + match * 2
l += ll - match
r += rr - match
return n
def main():
s = strput().rstrip()
tree = SegmentTree(len(s))
tree.build(s)
q = int(input())
for i in range(q):
l, r = [int(x) for x in input().split()]
print(tree.get(l - 1, r))
if __name__ == "__main__":
main()
``` | 3 | |
895 | A | Pizza Separation | PROGRAMMING | 1,200 | [
"brute force",
"implementation"
] | null | null | Students Vasya and Petya are studying at the BSU (Byteland State University). At one of the breaks they decided to order a pizza. In this problem pizza is a circle of some radius. The pizza was delivered already cut into *n* pieces. The *i*-th piece is a sector of angle equal to *a**i*. Vasya and Petya want to divide all pieces of pizza into two continuous sectors in such way that the difference between angles of these sectors is minimal. Sector angle is sum of angles of all pieces in it. Pay attention, that one of sectors can be empty. | The first line contains one integer *n* (1<=≤<=*n*<=≤<=360) — the number of pieces into which the delivered pizza was cut.
The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=360) — the angles of the sectors into which the pizza was cut. The sum of all *a**i* is 360. | Print one integer — the minimal difference between angles of sectors that will go to Vasya and Petya. | [
"4\n90 90 90 90\n",
"3\n100 100 160\n",
"1\n360\n",
"4\n170 30 150 10\n"
] | [
"0\n",
"40\n",
"360\n",
"0\n"
] | In first sample Vasya can take 1 and 2 pieces, Petya can take 3 and 4 pieces. Then the answer is |(90 + 90) - (90 + 90)| = 0.
In third sample there is only one piece of pizza that can be taken by only one from Vasya and Petya. So the answer is |360 - 0| = 360.
In fourth sample Vasya can take 1 and 4 pieces, then Petya will take 2 and 3 pieces. So the answer is |(170 + 10) - (30 + 150)| = 0.
Picture explaning fourth sample:
<img class="tex-graphics" src="https://espresso.codeforces.com/4bb3450aca241f92fedcba5479bf1b6d22cf813d.png" style="max-width: 100.0%;max-height: 100.0%;"/>
Both red and green sectors consist of two adjacent pieces of pizza. So Vasya can take green sector, then Petya will take red sector. | 500 | [
{
"input": "4\n90 90 90 90",
"output": "0"
},
{
"input": "3\n100 100 160",
"output": "40"
},
{
"input": "1\n360",
"output": "360"
},
{
"input": "4\n170 30 150 10",
"output": "0"
},
{
"input": "5\n10 10 10 10 320",
"output": "280"
},
{
"input": "8\n45 45 45 45 45 45 45 45",
"output": "0"
},
{
"input": "3\n120 120 120",
"output": "120"
},
{
"input": "5\n110 90 70 50 40",
"output": "40"
},
{
"input": "2\n170 190",
"output": "20"
},
{
"input": "15\n25 25 25 25 25 25 25 25 25 25 25 25 25 25 10",
"output": "10"
},
{
"input": "5\n30 60 180 60 30",
"output": "0"
},
{
"input": "2\n359 1",
"output": "358"
},
{
"input": "5\n100 100 30 100 30",
"output": "40"
},
{
"input": "5\n36 34 35 11 244",
"output": "128"
},
{
"input": "5\n96 94 95 71 4",
"output": "18"
},
{
"input": "2\n85 275",
"output": "190"
},
{
"input": "3\n281 67 12",
"output": "202"
},
{
"input": "5\n211 113 25 9 2",
"output": "62"
},
{
"input": "13\n286 58 6 1 1 1 1 1 1 1 1 1 1",
"output": "212"
},
{
"input": "15\n172 69 41 67 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "20\n226 96 2 20 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "92"
},
{
"input": "50\n148 53 32 11 4 56 8 2 5 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "3\n1 1 358",
"output": "356"
},
{
"input": "20\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 341",
"output": "322"
},
{
"input": "33\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 328",
"output": "296"
},
{
"input": "70\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 291",
"output": "222"
},
{
"input": "130\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 231",
"output": "102"
},
{
"input": "200\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 161",
"output": "0"
},
{
"input": "222\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 139",
"output": "0"
},
{
"input": "10\n8 3 11 4 1 10 10 1 8 304",
"output": "248"
},
{
"input": "12\n8 7 7 3 11 2 10 1 10 8 10 283",
"output": "206"
},
{
"input": "13\n10 8 9 10 5 9 4 1 10 11 1 7 275",
"output": "190"
},
{
"input": "14\n1 6 3 11 9 5 9 8 5 6 7 3 7 280",
"output": "200"
},
{
"input": "15\n10 11 5 4 11 5 4 1 5 4 5 5 9 6 275",
"output": "190"
},
{
"input": "30\n8 7 5 8 3 7 2 4 3 8 11 3 9 11 2 4 1 4 5 6 11 5 8 3 6 3 11 2 11 189",
"output": "18"
},
{
"input": "70\n5 3 6 8 9 2 8 9 11 5 2 8 9 11 7 6 6 9 7 11 7 6 3 8 2 4 4 8 4 3 2 2 3 5 6 5 11 2 7 7 5 8 10 5 2 1 10 9 4 10 7 1 8 10 9 1 5 1 1 1 2 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "29\n2 10 1 5 7 2 9 11 9 9 10 8 4 11 2 5 4 1 4 9 6 10 8 3 1 3 8 9 189",
"output": "18"
},
{
"input": "35\n3 4 11 4 4 2 3 4 3 9 7 10 2 7 8 3 11 3 6 4 6 7 11 10 8 7 6 7 2 8 5 3 2 2 168",
"output": "0"
},
{
"input": "60\n4 10 3 10 6 3 11 8 11 9 3 5 9 2 6 5 6 9 4 10 1 1 3 7 2 10 5 5 3 10 5 2 1 2 9 11 11 9 11 4 11 7 5 6 10 9 3 4 7 8 7 3 6 7 8 5 1 1 1 5",
"output": "0"
},
{
"input": "71\n3 11 8 1 10 1 7 9 6 4 11 10 11 2 4 1 11 7 9 10 11 4 8 7 11 3 8 4 1 8 4 2 9 9 7 10 10 9 5 7 9 7 2 1 7 6 5 11 5 9 4 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "63\n2 11 5 8 7 9 9 8 10 5 9 10 11 8 10 2 3 5 3 7 5 10 2 9 4 8 1 8 5 9 7 7 1 8 7 7 9 10 10 10 8 7 7 2 2 8 9 7 10 8 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "81\n5 8 7 11 2 7 1 1 5 8 7 2 3 11 4 9 7 6 4 4 2 1 1 7 9 4 1 8 3 1 4 10 7 9 9 8 11 3 4 3 10 8 6 4 7 2 4 3 6 11 11 10 7 10 2 10 8 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "47\n5 3 7 4 2 7 8 1 9 10 5 11 10 7 7 5 1 3 2 11 3 8 6 1 6 10 8 3 2 10 5 6 8 6 9 7 10 9 7 4 8 11 10 1 5 11 68",
"output": "0"
},
{
"input": "100\n5 8 9 3 2 3 9 8 11 10 4 8 1 1 1 1 6 5 10 9 5 3 7 7 2 11 10 2 3 2 2 8 7 3 5 5 10 9 2 5 10 6 7 7 4 7 7 8 2 8 9 9 2 4 1 1 3 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "120\n9 11 3 7 3 7 9 1 10 7 11 4 1 5 3 5 6 3 1 11 8 8 11 7 3 5 1 9 1 7 10 10 10 10 9 5 4 8 2 8 2 1 4 5 3 11 3 5 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "200\n7 7 9 8 2 8 5 8 3 9 7 10 2 9 11 8 11 7 5 2 6 3 11 9 5 1 10 2 1 2 2 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "220\n3 2 8 1 3 5 5 11 1 5 2 6 9 2 2 6 8 10 7 1 3 2 10 9 10 10 4 10 9 5 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "0"
},
{
"input": "6\n27 15 28 34 41 215",
"output": "70"
},
{
"input": "7\n41 38 41 31 22 41 146",
"output": "14"
},
{
"input": "8\n24 27 34 23 29 23 30 170",
"output": "20"
},
{
"input": "9\n11 11 20 20 33 32 35 26 172",
"output": "6"
},
{
"input": "10\n36 13 28 13 33 34 23 25 34 121",
"output": "0"
},
{
"input": "11\n19 37 13 41 37 15 32 12 19 35 100",
"output": "10"
},
{
"input": "12\n37 25 34 38 21 24 34 38 11 29 28 41",
"output": "2"
},
{
"input": "13\n24 40 20 26 25 29 39 29 35 28 19 18 28",
"output": "2"
},
{
"input": "14\n11 21 40 19 28 34 13 16 23 30 34 22 25 44",
"output": "4"
},
{
"input": "3\n95 91 174",
"output": "12"
},
{
"input": "4\n82 75 78 125",
"output": "46"
},
{
"input": "6\n87 75 88 94 15 1",
"output": "4"
},
{
"input": "10\n27 52 58 64 45 64 1 19 2 28",
"output": "12"
},
{
"input": "50\n14 12 11 8 1 6 11 6 7 8 4 11 4 5 7 3 5 4 7 24 10 2 3 4 6 13 2 1 8 7 5 13 10 8 5 20 1 2 23 7 14 3 4 4 2 8 8 2 6 1",
"output": "0"
},
{
"input": "100\n3 3 4 3 3 6 3 2 8 2 13 3 1 1 2 1 3 4 1 7 1 2 2 6 3 2 10 3 1 2 5 6 2 3 3 2 3 11 8 3 2 6 1 3 3 4 7 7 2 2 1 2 6 3 3 2 3 1 3 8 2 6 4 2 1 12 2 2 2 1 4 1 4 1 3 1 3 1 5 2 6 6 7 1 2 3 2 4 4 2 5 9 8 2 4 6 5 1 1 3",
"output": "0"
},
{
"input": "150\n1 5 1 2 2 2 1 4 2 2 2 3 1 2 1 2 2 2 2 1 2 2 2 1 5 3 4 1 3 4 5 2 4 2 1 2 2 1 1 2 3 2 4 2 2 3 3 1 1 5 2 3 2 1 9 2 1 1 2 1 4 1 1 3 2 2 2 1 2 2 2 1 3 3 4 2 2 1 3 3 3 1 4 3 4 1 2 2 1 1 1 2 2 5 4 1 1 1 2 1 2 3 2 2 6 3 3 3 1 2 1 1 2 8 2 2 4 3 4 5 3 1 4 2 2 2 2 1 4 4 1 1 2 2 4 9 6 3 1 1 2 1 3 4 1 3 2 2 2 1",
"output": "0"
},
{
"input": "200\n1 2 1 3 1 3 1 2 1 4 6 1 2 2 2 2 1 1 1 1 3 2 1 2 2 2 1 2 2 2 2 1 1 1 3 2 3 1 1 2 1 1 2 1 1 1 1 1 1 2 1 2 2 4 1 3 1 2 1 2 2 1 2 1 3 1 1 2 2 1 1 1 1 2 4 1 2 1 1 1 2 1 3 1 1 3 1 2 2 4 1 1 2 1 2 1 2 2 2 2 1 1 2 1 2 1 3 3 1 1 1 2 1 3 3 1 2 1 3 1 3 3 1 2 2 1 4 1 2 2 1 2 2 4 2 5 1 2 2 1 2 1 2 1 5 2 1 2 2 1 2 4 1 2 2 4 2 3 2 3 1 2 1 1 2 2 2 1 1 2 1 4 1 2 1 1 2 1 2 3 1 1 1 2 2 3 1 3 2 2 3 1 2 1 2 1 1 2 1 2",
"output": "0"
},
{
"input": "5\n35 80 45 100 100",
"output": "40"
},
{
"input": "4\n90 179 90 1",
"output": "2"
},
{
"input": "5\n50 50 20 160 80",
"output": "0"
},
{
"input": "5\n30 175 30 5 120",
"output": "10"
},
{
"input": "4\n170 30 10 150",
"output": "20"
},
{
"input": "6\n90 30 90 30 90 30",
"output": "60"
},
{
"input": "4\n70 80 110 100",
"output": "20"
},
{
"input": "7\n35 45 70 100 10 10 90",
"output": "0"
},
{
"input": "6\n50 90 10 90 20 100",
"output": "20"
},
{
"input": "6\n10 155 162 1 26 6",
"output": "18"
},
{
"input": "7\n80 90 80 45 10 10 45",
"output": "20"
},
{
"input": "4\n18 36 162 144",
"output": "36"
},
{
"input": "5\n20 50 50 160 80",
"output": "40"
},
{
"input": "5\n10 30 140 20 160",
"output": "0"
},
{
"input": "6\n90 80 60 50 40 40",
"output": "20"
},
{
"input": "9\n40 20 20 20 20 20 20 40 160",
"output": "40"
},
{
"input": "4\n90 54 90 126",
"output": "72"
},
{
"input": "4\n150 170 30 10",
"output": "20"
},
{
"input": "8\n130 12 13 85 41 67 5 7",
"output": "26"
},
{
"input": "7\n70 170 20 10 30 30 30",
"output": "20"
},
{
"input": "8\n100 100 50 50 15 15 15 15",
"output": "40"
},
{
"input": "4\n100 70 80 110",
"output": "20"
},
{
"input": "5\n160 130 40 20 10",
"output": "20"
},
{
"input": "4\n20 149 151 40",
"output": "22"
},
{
"input": "4\n100 10 100 150",
"output": "60"
},
{
"input": "6\n19 64 105 168 1 3",
"output": "16"
},
{
"input": "8\n10 10 70 70 90 90 10 10",
"output": "0"
}
] | 1,511,713,170 | 870 | Python 3 | WRONG_ANSWER | PRETESTS | 4 | 61 | 5,529,600 | n = int(input())
ai = list(map(int,input().split()))
ai2 = [0] * n
summ = sum(ai)
ai2[0] = ai[0]
minim = 360
for i in range(1,n):
ai2[i] = ai[i-1] +ai[i]
minim = min(minim, abs(ai2[i]-(360 - ai2[i])))
for i in range(n-1,-1,-1):
for j in range(i):
minim = min(minim,abs((180-(ai2[i]-ai2[j]))*2))
print(minim)
| Title: Pizza Separation
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Students Vasya and Petya are studying at the BSU (Byteland State University). At one of the breaks they decided to order a pizza. In this problem pizza is a circle of some radius. The pizza was delivered already cut into *n* pieces. The *i*-th piece is a sector of angle equal to *a**i*. Vasya and Petya want to divide all pieces of pizza into two continuous sectors in such way that the difference between angles of these sectors is minimal. Sector angle is sum of angles of all pieces in it. Pay attention, that one of sectors can be empty.
Input Specification:
The first line contains one integer *n* (1<=≤<=*n*<=≤<=360) — the number of pieces into which the delivered pizza was cut.
The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=360) — the angles of the sectors into which the pizza was cut. The sum of all *a**i* is 360.
Output Specification:
Print one integer — the minimal difference between angles of sectors that will go to Vasya and Petya.
Demo Input:
['4\n90 90 90 90\n', '3\n100 100 160\n', '1\n360\n', '4\n170 30 150 10\n']
Demo Output:
['0\n', '40\n', '360\n', '0\n']
Note:
In first sample Vasya can take 1 and 2 pieces, Petya can take 3 and 4 pieces. Then the answer is |(90 + 90) - (90 + 90)| = 0.
In third sample there is only one piece of pizza that can be taken by only one from Vasya and Petya. So the answer is |360 - 0| = 360.
In fourth sample Vasya can take 1 and 4 pieces, then Petya will take 2 and 3 pieces. So the answer is |(170 + 10) - (30 + 150)| = 0.
Picture explaning fourth sample:
<img class="tex-graphics" src="https://espresso.codeforces.com/4bb3450aca241f92fedcba5479bf1b6d22cf813d.png" style="max-width: 100.0%;max-height: 100.0%;"/>
Both red and green sectors consist of two adjacent pieces of pizza. So Vasya can take green sector, then Petya will take red sector. | ```python
n = int(input())
ai = list(map(int,input().split()))
ai2 = [0] * n
summ = sum(ai)
ai2[0] = ai[0]
minim = 360
for i in range(1,n):
ai2[i] = ai[i-1] +ai[i]
minim = min(minim, abs(ai2[i]-(360 - ai2[i])))
for i in range(n-1,-1,-1):
for j in range(i):
minim = min(minim,abs((180-(ai2[i]-ai2[j]))*2))
print(minim)
``` | 0 | |
644 | B | Processing Queries | PROGRAMMING | 1,700 | [
"*special",
"constructive algorithms",
"data structures",
"two pointers"
] | null | null | In this problem you have to simulate the workflow of one-thread server. There are *n* queries to process, the *i*-th will be received at moment *t**i* and needs to be processed for *d**i* units of time. All *t**i* are guaranteed to be distinct.
When a query appears server may react in three possible ways:
1. If server is free and query queue is empty, then server immediately starts to process this query. 1. If server is busy and there are less than *b* queries in the queue, then new query is added to the end of the queue. 1. If server is busy and there are already *b* queries pending in the queue, then new query is just rejected and will never be processed.
As soon as server finished to process some query, it picks new one from the queue (if it's not empty, of course). If a new query comes at some moment *x*, and the server finishes to process another query at exactly the same moment, we consider that first query is picked from the queue and only then new query appears.
For each query find the moment when the server will finish to process it or print -1 if this query will be rejected. | The first line of the input contains two integers *n* and *b* (1<=≤<=*n*,<=*b*<=≤<=200<=000) — the number of queries and the maximum possible size of the query queue.
Then follow *n* lines with queries descriptions (in chronological order). Each description consists of two integers *t**i* and *d**i* (1<=≤<=*t**i*,<=*d**i*<=≤<=109), where *t**i* is the moment of time when the *i*-th query appears and *d**i* is the time server needs to process it. It is guaranteed that *t**i*<=-<=1<=<<=*t**i* for all *i*<=><=1. | Print the sequence of *n* integers *e*1,<=*e*2,<=...,<=*e**n*, where *e**i* is the moment the server will finish to process the *i*-th query (queries are numbered in the order they appear in the input) or <=-<=1 if the corresponding query will be rejected. | [
"5 1\n2 9\n4 8\n10 9\n15 2\n19 1\n",
"4 1\n2 8\n4 8\n10 9\n15 2\n"
] | [
"11 19 -1 21 22 \n",
"10 18 27 -1 \n"
] | Consider the first sample.
1. The server will start to process first query at the moment 2 and will finish to process it at the moment 11. 1. At the moment 4 second query appears and proceeds to the queue. 1. At the moment 10 third query appears. However, the server is still busy with query 1, *b* = 1 and there is already query 2 pending in the queue, so third query is just rejected. 1. At the moment 11 server will finish to process first query and will take the second query from the queue. 1. At the moment 15 fourth query appears. As the server is currently busy it proceeds to the queue. 1. At the moment 19 two events occur simultaneously: server finishes to proceed the second query and the fifth query appears. As was said in the statement above, first server will finish to process the second query, then it will pick the fourth query from the queue and only then will the fifth query appear. As the queue is empty fifth query is proceed there. 1. Server finishes to process query number 4 at the moment 21. Query number 5 is picked from the queue. 1. Server finishes to process query number 5 at the moment 22. | 1,000 | [
{
"input": "5 1\n2 9\n4 8\n10 9\n15 2\n19 1",
"output": "11 19 -1 21 22 "
},
{
"input": "4 1\n2 8\n4 8\n10 9\n15 2",
"output": "10 18 27 -1 "
},
{
"input": "1 1\n1000000000 1000000000",
"output": "2000000000 "
},
{
"input": "4 3\n999999996 1000000000\n999999997 1000000000\n999999998 1000000000\n999999999 1000000000",
"output": "1999999996 2999999996 3999999996 4999999996 "
},
{
"input": "5 1\n2 1\n3 6\n4 5\n6 4\n7 2",
"output": "3 9 14 -1 -1 "
},
{
"input": "10 2\n4 14\n5 2\n6 6\n7 11\n8 6\n9 5\n10 13\n11 8\n13 2\n20 2",
"output": "18 20 26 -1 -1 -1 -1 -1 -1 28 "
},
{
"input": "6 4\n2 4\n4 2\n5 2\n6 2\n7 2\n9 2",
"output": "6 8 10 12 14 16 "
},
{
"input": "8 3\n1 2\n3 1\n4 3\n5 3\n6 1\n7 2\n8 8\n9 7",
"output": "3 4 7 10 11 13 21 -1 "
},
{
"input": "10 3\n1 14\n3 2\n5 4\n6 9\n9 1\n12 22\n15 11\n18 8\n28 2\n29 4",
"output": "15 17 21 30 -1 -1 41 49 51 -1 "
},
{
"input": "5 2\n2 7\n3 3\n7 4\n9 1\n10 2",
"output": "9 12 16 17 -1 "
},
{
"input": "4 1\n2 1\n6 5\n9 2\n10 3",
"output": "3 11 13 -1 "
},
{
"input": "4 1\n1 2\n2 1\n3 1\n4 3",
"output": "3 4 5 8 "
},
{
"input": "6 3\n1 2\n2 3\n100 200\n200 300\n10000 20000\n20000 30000",
"output": "3 6 300 600 30000 60000 "
}
] | 1,667,823,252 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 5 | 93 | 3,481,600 | from enum import Flag
import queue
q, sizeq = map(int,input().split(" "))
lst = queue.Queue()
for i in range(q):
lst.put(list(map(int, input().split(" "))))
que = queue.Queue()
begin = lst.queue[0][0]
que.put(lst.get())
flag = False
check = []
while not lst.empty() or not que.empty():
begin = begin + que.get()[1]
while que.qsize() < sizeq and not lst.empty():
que.put(lst.get())
# print("Debug: ", que.qsize())
print(begin)
if(flag):
while len(check) > 0:
print(-1)
check.pop()
flag = False
while((not lst.empty()) and (lst.queue[0][0] < begin)):
check.append(-1)
flag = True
lst.get()
| Title: Processing Queries
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
In this problem you have to simulate the workflow of one-thread server. There are *n* queries to process, the *i*-th will be received at moment *t**i* and needs to be processed for *d**i* units of time. All *t**i* are guaranteed to be distinct.
When a query appears server may react in three possible ways:
1. If server is free and query queue is empty, then server immediately starts to process this query. 1. If server is busy and there are less than *b* queries in the queue, then new query is added to the end of the queue. 1. If server is busy and there are already *b* queries pending in the queue, then new query is just rejected and will never be processed.
As soon as server finished to process some query, it picks new one from the queue (if it's not empty, of course). If a new query comes at some moment *x*, and the server finishes to process another query at exactly the same moment, we consider that first query is picked from the queue and only then new query appears.
For each query find the moment when the server will finish to process it or print -1 if this query will be rejected.
Input Specification:
The first line of the input contains two integers *n* and *b* (1<=≤<=*n*,<=*b*<=≤<=200<=000) — the number of queries and the maximum possible size of the query queue.
Then follow *n* lines with queries descriptions (in chronological order). Each description consists of two integers *t**i* and *d**i* (1<=≤<=*t**i*,<=*d**i*<=≤<=109), where *t**i* is the moment of time when the *i*-th query appears and *d**i* is the time server needs to process it. It is guaranteed that *t**i*<=-<=1<=<<=*t**i* for all *i*<=><=1.
Output Specification:
Print the sequence of *n* integers *e*1,<=*e*2,<=...,<=*e**n*, where *e**i* is the moment the server will finish to process the *i*-th query (queries are numbered in the order they appear in the input) or <=-<=1 if the corresponding query will be rejected.
Demo Input:
['5 1\n2 9\n4 8\n10 9\n15 2\n19 1\n', '4 1\n2 8\n4 8\n10 9\n15 2\n']
Demo Output:
['11 19 -1 21 22 \n', '10 18 27 -1 \n']
Note:
Consider the first sample.
1. The server will start to process first query at the moment 2 and will finish to process it at the moment 11. 1. At the moment 4 second query appears and proceeds to the queue. 1. At the moment 10 third query appears. However, the server is still busy with query 1, *b* = 1 and there is already query 2 pending in the queue, so third query is just rejected. 1. At the moment 11 server will finish to process first query and will take the second query from the queue. 1. At the moment 15 fourth query appears. As the server is currently busy it proceeds to the queue. 1. At the moment 19 two events occur simultaneously: server finishes to proceed the second query and the fifth query appears. As was said in the statement above, first server will finish to process the second query, then it will pick the fourth query from the queue and only then will the fifth query appear. As the queue is empty fifth query is proceed there. 1. Server finishes to process query number 4 at the moment 21. Query number 5 is picked from the queue. 1. Server finishes to process query number 5 at the moment 22. | ```python
from enum import Flag
import queue
q, sizeq = map(int,input().split(" "))
lst = queue.Queue()
for i in range(q):
lst.put(list(map(int, input().split(" "))))
que = queue.Queue()
begin = lst.queue[0][0]
que.put(lst.get())
flag = False
check = []
while not lst.empty() or not que.empty():
begin = begin + que.get()[1]
while que.qsize() < sizeq and not lst.empty():
que.put(lst.get())
# print("Debug: ", que.qsize())
print(begin)
if(flag):
while len(check) > 0:
print(-1)
check.pop()
flag = False
while((not lst.empty()) and (lst.queue[0][0] < begin)):
check.append(-1)
flag = True
lst.get()
``` | 0 | |
25 | A | IQ test | PROGRAMMING | 1,300 | [
"brute force"
] | A. IQ test | 2 | 256 | Bob is preparing to pass IQ test. The most frequent task in this test is to find out which one of the given *n* numbers differs from the others. Bob observed that one number usually differs from the others in evenness. Help Bob — to check his answers, he needs a program that among the given *n* numbers finds one that is different in evenness. | The first line contains integer *n* (3<=≤<=*n*<=≤<=100) — amount of numbers in the task. The second line contains *n* space-separated natural numbers, not exceeding 100. It is guaranteed, that exactly one of these numbers differs from the others in evenness. | Output index of number that differs from the others in evenness. Numbers are numbered from 1 in the input order. | [
"5\n2 4 7 8 10\n",
"4\n1 2 1 1\n"
] | [
"3\n",
"2\n"
] | none | 0 | [
{
"input": "5\n2 4 7 8 10",
"output": "3"
},
{
"input": "4\n1 2 1 1",
"output": "2"
},
{
"input": "3\n1 2 2",
"output": "1"
},
{
"input": "3\n100 99 100",
"output": "2"
},
{
"input": "3\n5 3 2",
"output": "3"
},
{
"input": "4\n43 28 1 91",
"output": "2"
},
{
"input": "4\n75 13 94 77",
"output": "3"
},
{
"input": "4\n97 8 27 3",
"output": "2"
},
{
"input": "10\n95 51 12 91 85 3 1 31 25 7",
"output": "3"
},
{
"input": "20\n88 96 66 51 14 88 2 92 18 72 18 88 20 30 4 82 90 100 24 46",
"output": "4"
},
{
"input": "30\n20 94 56 50 10 98 52 32 14 22 24 60 4 8 98 46 34 68 82 82 98 90 50 20 78 49 52 94 64 36",
"output": "26"
},
{
"input": "50\n79 27 77 57 37 45 27 49 65 33 57 21 71 19 75 85 65 61 23 97 85 9 23 1 9 3 99 77 77 21 79 69 15 37 15 7 93 81 13 89 91 31 45 93 15 97 55 80 85 83",
"output": "48"
},
{
"input": "60\n46 11 73 65 3 69 3 53 43 53 97 47 55 93 31 75 35 3 9 73 23 31 3 81 91 79 61 21 15 11 11 11 81 7 83 75 39 87 83 59 89 55 93 27 49 67 67 29 1 93 11 17 9 19 35 21 63 31 31 25",
"output": "1"
},
{
"input": "70\n28 42 42 92 64 54 22 38 38 78 62 38 4 38 14 66 4 92 66 58 94 26 4 44 41 88 48 82 44 26 74 44 48 4 16 92 34 38 26 64 94 4 30 78 50 54 12 90 8 16 80 98 28 100 74 50 36 42 92 18 76 98 8 22 2 50 58 50 64 46",
"output": "25"
},
{
"input": "100\n43 35 79 53 13 91 91 45 65 83 57 9 42 39 85 45 71 51 61 59 31 13 63 39 25 21 79 39 91 67 21 61 97 75 93 83 29 79 59 97 11 37 63 51 39 55 91 23 21 17 47 23 35 75 49 5 69 99 5 7 41 17 25 89 15 79 21 63 53 81 43 91 59 91 69 99 85 15 91 51 49 37 65 7 89 81 21 93 61 63 97 93 45 17 13 69 57 25 75 73",
"output": "13"
},
{
"input": "100\n50 24 68 60 70 30 52 22 18 74 68 98 20 82 4 46 26 68 100 78 84 58 74 98 38 88 68 86 64 80 82 100 20 22 98 98 52 6 94 10 48 68 2 18 38 22 22 82 44 20 66 72 36 58 64 6 36 60 4 96 76 64 12 90 10 58 64 60 74 28 90 26 24 60 40 58 2 16 76 48 58 36 82 60 24 44 4 78 28 38 8 12 40 16 38 6 66 24 31 76",
"output": "99"
},
{
"input": "100\n47 48 94 48 14 18 94 36 96 22 12 30 94 20 48 98 40 58 2 94 8 36 98 18 98 68 2 60 76 38 18 100 8 72 100 68 2 86 92 72 58 16 48 14 6 58 72 76 6 88 80 66 20 28 74 62 86 68 90 86 2 56 34 38 56 90 4 8 76 44 32 86 12 98 38 34 54 92 70 94 10 24 82 66 90 58 62 2 32 58 100 22 58 72 2 22 68 72 42 14",
"output": "1"
},
{
"input": "99\n38 20 68 60 84 16 28 88 60 48 80 28 4 92 70 60 46 46 20 34 12 100 76 2 40 10 8 86 6 80 50 66 12 34 14 28 26 70 46 64 34 96 10 90 98 96 56 88 50 74 70 94 2 94 24 66 68 46 22 30 6 10 64 32 88 14 98 100 64 58 50 18 50 50 8 38 8 16 54 2 60 54 62 84 92 98 4 72 66 26 14 88 99 16 10 6 88 56 22",
"output": "93"
},
{
"input": "99\n50 83 43 89 53 47 69 1 5 37 63 87 95 15 55 95 75 89 33 53 89 75 93 75 11 85 49 29 11 97 49 67 87 11 25 37 97 73 67 49 87 43 53 97 43 29 53 33 45 91 37 73 39 49 59 5 21 43 87 35 5 63 89 57 63 47 29 99 19 85 13 13 3 13 43 19 5 9 61 51 51 57 15 89 13 97 41 13 99 79 13 27 97 95 73 33 99 27 23",
"output": "1"
},
{
"input": "98\n61 56 44 30 58 14 20 24 88 28 46 56 96 52 58 42 94 50 46 30 46 80 72 88 68 16 6 60 26 90 10 98 76 20 56 40 30 16 96 20 88 32 62 30 74 58 36 76 60 4 24 36 42 54 24 92 28 14 2 74 86 90 14 52 34 82 40 76 8 64 2 56 10 8 78 16 70 86 70 42 70 74 22 18 76 98 88 28 62 70 36 72 20 68 34 48 80 98",
"output": "1"
},
{
"input": "98\n66 26 46 42 78 32 76 42 26 82 8 12 4 10 24 26 64 44 100 46 94 64 30 18 88 28 8 66 30 82 82 28 74 52 62 80 80 60 94 86 64 32 44 88 92 20 12 74 94 28 34 58 4 22 16 10 94 76 82 58 40 66 22 6 30 32 92 54 16 76 74 98 18 48 48 30 92 2 16 42 84 74 30 60 64 52 50 26 16 86 58 96 79 60 20 62 82 94",
"output": "93"
},
{
"input": "95\n9 31 27 93 17 77 75 9 9 53 89 39 51 99 5 1 11 39 27 49 91 17 27 79 81 71 37 75 35 13 93 4 99 55 85 11 23 57 5 43 5 61 15 35 23 91 3 81 99 85 43 37 39 27 5 67 7 33 75 59 13 71 51 27 15 93 51 63 91 53 43 99 25 47 17 71 81 15 53 31 59 83 41 23 73 25 91 91 13 17 25 13 55 57 29",
"output": "32"
},
{
"input": "100\n91 89 81 45 53 1 41 3 77 93 55 97 55 97 87 27 69 95 73 41 93 21 75 35 53 56 5 51 87 59 91 67 33 3 99 45 83 17 97 47 75 97 7 89 17 99 23 23 81 25 55 97 27 35 69 5 77 35 93 19 55 59 37 21 31 37 49 41 91 53 73 69 7 37 37 39 17 71 7 97 55 17 47 23 15 73 31 39 57 37 9 5 61 41 65 57 77 79 35 47",
"output": "26"
},
{
"input": "99\n38 56 58 98 80 54 26 90 14 16 78 92 52 74 40 30 84 14 44 80 16 90 98 68 26 24 78 72 42 16 84 40 14 44 2 52 50 2 12 96 58 66 8 80 44 52 34 34 72 98 74 4 66 74 56 21 8 38 76 40 10 22 48 32 98 34 12 62 80 68 64 82 22 78 58 74 20 22 48 56 12 38 32 72 6 16 74 24 94 84 26 38 18 24 76 78 98 94 72",
"output": "56"
},
{
"input": "100\n44 40 6 40 56 90 98 8 36 64 76 86 98 76 36 92 6 30 98 70 24 98 96 60 24 82 88 68 86 96 34 42 58 10 40 26 56 10 88 58 70 32 24 28 14 82 52 12 62 36 70 60 52 34 74 30 78 76 10 16 42 94 66 90 70 38 52 12 58 22 98 96 14 68 24 70 4 30 84 98 8 50 14 52 66 34 100 10 28 100 56 48 38 12 38 14 91 80 70 86",
"output": "97"
},
{
"input": "100\n96 62 64 20 90 46 56 90 68 36 30 56 70 28 16 64 94 34 6 32 34 50 94 22 90 32 40 2 72 10 88 38 28 92 20 26 56 80 4 100 100 90 16 74 74 84 8 2 30 20 80 32 16 46 92 56 42 12 96 64 64 42 64 58 50 42 74 28 2 4 36 32 70 50 54 92 70 16 45 76 28 16 18 50 48 2 62 94 4 12 52 52 4 100 70 60 82 62 98 42",
"output": "79"
},
{
"input": "99\n14 26 34 68 90 58 50 36 8 16 18 6 2 74 54 20 36 84 32 50 52 2 26 24 3 64 20 10 54 26 66 44 28 72 4 96 78 90 96 86 68 28 94 4 12 46 100 32 22 36 84 32 44 94 76 94 4 52 12 30 74 4 34 64 58 72 44 16 70 56 54 8 14 74 8 6 58 62 98 54 14 40 80 20 36 72 28 98 20 58 40 52 90 64 22 48 54 70 52",
"output": "25"
},
{
"input": "95\n82 86 30 78 6 46 80 66 74 72 16 24 18 52 52 38 60 36 86 26 62 28 22 46 96 26 94 84 20 46 66 88 76 32 12 86 74 18 34 88 4 48 94 6 58 6 100 82 4 24 88 32 54 98 34 48 6 76 42 88 42 28 100 4 22 2 10 66 82 54 98 20 60 66 38 98 32 47 86 58 6 100 12 46 2 42 8 84 78 28 24 70 34 28 86",
"output": "78"
},
{
"input": "90\n40 50 8 42 76 24 58 42 26 68 20 48 54 12 34 84 14 36 32 88 6 50 96 56 20 92 48 16 40 34 96 46 20 84 30 50 20 98 8 44 96 42 8 76 70 38 84 30 40 88 84 72 2 22 52 58 16 62 100 66 80 40 50 32 14 62 88 72 22 99 76 50 84 82 8 82 98 46 26 40 2 98 18 78 30 72 70 18 34 68",
"output": "70"
},
{
"input": "80\n81 43 87 1 55 43 53 61 27 19 43 13 89 9 33 83 75 55 97 71 91 37 95 5 21 69 81 93 95 69 31 83 55 7 97 7 79 57 8 61 27 85 49 1 15 97 63 79 29 73 41 85 5 41 31 93 67 11 63 59 15 99 91 77 43 69 23 23 81 73 19 1 67 51 1 75 99 67 3 81",
"output": "39"
},
{
"input": "98\n13 83 61 27 35 1 85 95 97 73 95 65 73 45 5 43 27 83 91 19 11 3 85 59 9 39 69 23 45 7 51 85 5 71 5 95 1 51 75 3 43 57 3 11 33 71 21 99 47 41 87 39 71 87 31 85 91 49 83 5 49 85 47 91 55 99 33 23 31 23 23 73 29 77 55 31 25 5 81 49 91 15 15 39 87 5 9 40 69 47 29 33 11 21 49 79 51 83",
"output": "88"
},
{
"input": "3\n100 100 1",
"output": "3"
}
] | 1,585,353,973 | 2,147,483,647 | Python 3 | OK | TESTS | 32 | 218 | 307,200 | n = input()
number_list = [int(x) for x in input().split(' ')]
pair = (number_list[0]%2 == 0 and number_list[1]%2 == 0) or\
(number_list[0]%2 == 0 and number_list[2]%2 == 0) or \
(number_list[1]%2 == 0 and number_list[2]%2 == 0)
for i, number in enumerate(number_list):
if pair and number%2 != 0:
print(i+1)
break
elif not pair and number%2 == 0:
print(i+1)
break
| Title: IQ test
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Bob is preparing to pass IQ test. The most frequent task in this test is to find out which one of the given *n* numbers differs from the others. Bob observed that one number usually differs from the others in evenness. Help Bob — to check his answers, he needs a program that among the given *n* numbers finds one that is different in evenness.
Input Specification:
The first line contains integer *n* (3<=≤<=*n*<=≤<=100) — amount of numbers in the task. The second line contains *n* space-separated natural numbers, not exceeding 100. It is guaranteed, that exactly one of these numbers differs from the others in evenness.
Output Specification:
Output index of number that differs from the others in evenness. Numbers are numbered from 1 in the input order.
Demo Input:
['5\n2 4 7 8 10\n', '4\n1 2 1 1\n']
Demo Output:
['3\n', '2\n']
Note:
none | ```python
n = input()
number_list = [int(x) for x in input().split(' ')]
pair = (number_list[0]%2 == 0 and number_list[1]%2 == 0) or\
(number_list[0]%2 == 0 and number_list[2]%2 == 0) or \
(number_list[1]%2 == 0 and number_list[2]%2 == 0)
for i, number in enumerate(number_list):
if pair and number%2 != 0:
print(i+1)
break
elif not pair and number%2 == 0:
print(i+1)
break
``` | 3.944928 |
378 | A | Playing with Dice | PROGRAMMING | 800 | [
"brute force"
] | null | null | Two players are playing a game. First each of them writes an integer from 1 to 6, and then a dice is thrown. The player whose written number got closer to the number on the dice wins. If both payers have the same difference, it's a draw.
The first player wrote number *a*, the second player wrote number *b*. How many ways to throw a dice are there, at which the first player wins, or there is a draw, or the second player wins? | The single line contains two integers *a* and *b* (1<=≤<=*a*,<=*b*<=≤<=6) — the numbers written on the paper by the first and second player, correspondingly. | Print three integers: the number of ways to throw the dice at which the first player wins, the game ends with a draw or the second player wins, correspondingly. | [
"2 5\n",
"2 4\n"
] | [
"3 0 3\n",
"2 1 3\n"
] | The dice is a standard cube-shaped six-sided object with each side containing a number from 1 to 6, and where all numbers on all sides are distinct.
You can assume that number *a* is closer to number *x* than number *b*, if |*a* - *x*| < |*b* - *x*|. | 500 | [
{
"input": "2 5",
"output": "3 0 3"
},
{
"input": "2 4",
"output": "2 1 3"
},
{
"input": "5 3",
"output": "2 1 3"
},
{
"input": "1 6",
"output": "3 0 3"
},
{
"input": "5 1",
"output": "3 1 2"
},
{
"input": "6 3",
"output": "2 0 4"
},
{
"input": "2 3",
"output": "2 0 4"
},
{
"input": "5 6",
"output": "5 0 1"
},
{
"input": "4 4",
"output": "0 6 0"
},
{
"input": "1 1",
"output": "0 6 0"
},
{
"input": "6 4",
"output": "1 1 4"
},
{
"input": "1 4",
"output": "2 0 4"
},
{
"input": "5 5",
"output": "0 6 0"
},
{
"input": "4 5",
"output": "4 0 2"
},
{
"input": "4 3",
"output": "3 0 3"
},
{
"input": "1 5",
"output": "2 1 3"
},
{
"input": "6 5",
"output": "1 0 5"
},
{
"input": "2 2",
"output": "0 6 0"
},
{
"input": "1 3",
"output": "1 1 4"
},
{
"input": "3 6",
"output": "4 0 2"
},
{
"input": "3 1",
"output": "4 1 1"
},
{
"input": "3 2",
"output": "4 0 2"
},
{
"input": "3 5",
"output": "3 1 2"
},
{
"input": "3 3",
"output": "0 6 0"
},
{
"input": "6 2",
"output": "2 1 3"
},
{
"input": "4 1",
"output": "4 0 2"
},
{
"input": "5 2",
"output": "3 0 3"
},
{
"input": "4 2",
"output": "3 1 2"
},
{
"input": "2 1",
"output": "5 0 1"
},
{
"input": "6 1",
"output": "3 0 3"
},
{
"input": "4 6",
"output": "4 1 1"
},
{
"input": "2 6",
"output": "3 1 2"
},
{
"input": "3 4",
"output": "3 0 3"
},
{
"input": "1 2",
"output": "1 0 5"
},
{
"input": "6 6",
"output": "0 6 0"
},
{
"input": "5 4",
"output": "2 0 4"
},
{
"input": "3 3",
"output": "0 6 0"
},
{
"input": "1 1",
"output": "0 6 0"
}
] | 1,618,085,605 | 2,147,483,647 | PyPy 3 | WRONG_ANSWER | TESTS | 8 | 93 | 0 | import math
a,b=[int(i) for i in input().split(" ")]
w1,w2,t=0,0,0
if (a<b):
tmp=int((b-a-1)/2)
w1=a+tmp
w2=7-b+tmp
t=math.ceil(b-a-1)%2
else:
tmp=int((a-b-1)/2)
w1=7-a+tmp
w2=b+tmp
t=math.ceil(a-b-1)%2
print(w1,t,w2) | Title: Playing with Dice
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Two players are playing a game. First each of them writes an integer from 1 to 6, and then a dice is thrown. The player whose written number got closer to the number on the dice wins. If both payers have the same difference, it's a draw.
The first player wrote number *a*, the second player wrote number *b*. How many ways to throw a dice are there, at which the first player wins, or there is a draw, or the second player wins?
Input Specification:
The single line contains two integers *a* and *b* (1<=≤<=*a*,<=*b*<=≤<=6) — the numbers written on the paper by the first and second player, correspondingly.
Output Specification:
Print three integers: the number of ways to throw the dice at which the first player wins, the game ends with a draw or the second player wins, correspondingly.
Demo Input:
['2 5\n', '2 4\n']
Demo Output:
['3 0 3\n', '2 1 3\n']
Note:
The dice is a standard cube-shaped six-sided object with each side containing a number from 1 to 6, and where all numbers on all sides are distinct.
You can assume that number *a* is closer to number *x* than number *b*, if |*a* - *x*| < |*b* - *x*|. | ```python
import math
a,b=[int(i) for i in input().split(" ")]
w1,w2,t=0,0,0
if (a<b):
tmp=int((b-a-1)/2)
w1=a+tmp
w2=7-b+tmp
t=math.ceil(b-a-1)%2
else:
tmp=int((a-b-1)/2)
w1=7-a+tmp
w2=b+tmp
t=math.ceil(a-b-1)%2
print(w1,t,w2)
``` | 0 | |
227 | B | Effective Approach | PROGRAMMING | 1,100 | [
"implementation"
] | null | null | Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute. | The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat. | Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier. | [
"2\n1 2\n1\n1\n",
"2\n2 1\n1\n1\n",
"3\n3 1 2\n3\n1 2 3\n"
] | [
"1 2\n",
"2 1\n",
"6 6\n"
] | In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element). | 1,000 | [
{
"input": "2\n1 2\n1\n1",
"output": "1 2"
},
{
"input": "2\n2 1\n1\n1",
"output": "2 1"
},
{
"input": "3\n3 1 2\n3\n1 2 3",
"output": "6 6"
},
{
"input": "9\n2 9 3 1 6 4 7 8 5\n9\n5 1 5 2 8 4 4 4 5",
"output": "58 32"
},
{
"input": "10\n3 10 9 2 7 6 5 8 4 1\n1\n4",
"output": "9 2"
},
{
"input": "10\n5 2 10 8 3 1 9 7 6 4\n9\n2 5 9 2 3 2 5 9 8",
"output": "31 68"
},
{
"input": "9\n3 8 4 7 1 2 5 6 9\n3\n2 7 1",
"output": "15 15"
},
{
"input": "9\n5 3 8 4 2 6 1 7 9\n4\n6 1 9 2",
"output": "27 13"
},
{
"input": "4\n1 3 2 4\n4\n3 1 2 3",
"output": "8 12"
},
{
"input": "3\n1 2 3\n8\n3 2 1 1 2 3 1 2",
"output": "15 17"
}
] | 1,662,128,530 | 2,147,483,647 | PyPy 3-64 | TIME_LIMIT_EXCEEDED | TESTS | 6 | 2,000 | 17,408,000 | def solve():
n = int(input())
a = [int(i) for i in input().split()]
m = int(input())
b = [int(i) for i in input().split()]
l = len(a)
vasya = 0
petya = 0
for i in b:
vasya += a.index(i)+1
petya += l - a.index(i)
print(vasya, petya)
solve()
| Title: Effective Approach
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Once at a team training Vasya, Petya and Sasha got a problem on implementing linear search in an array.
According to the boys, linear search works as follows. The array elements in a pre-selected order are in turn compared with the number that you need to find. Once you find the array element that is equal to the required one, the search ends. The efficiency of the algorithm is the number of performed comparisons. The fewer comparisons the linear search has made, the more effective it is.
Vasya believes that a linear search would work better if it sequentially iterates through the elements, starting with the 1-st one (in this problem we consider the elements of the array indexed from 1 to *n*) and ending with the *n*-th one. And Petya says that Vasya is wrong: the search will need less comparisons if it sequentially iterates the elements starting from the *n*-th and ending with the 1-st one. Sasha argues that the two approaches are equivalent.
To finally begin the task, the teammates decided to settle the debate and compare the two approaches on an example. For this, they took an array that is a permutation of integers from 1 to *n*, and generated *m* queries of the form: find element with value *b**i* in the array. They want to calculate for both approaches how many comparisons in total the linear search will need to respond to all queries. If the first search needs fewer comparisons, then the winner of the dispute is Vasya. If the second one does, then the winner is Petya. If both approaches make the same number of comparisons, then Sasha's got the upper hand.
But the problem is, linear search is too slow. That's why the boys aren't going to find out who is right before the end of the training, unless you come in here. Help them to determine who will win the dispute.
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of elements in the array. The second line contains *n* distinct space-separated integers *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=*n*) — the elements of array.
The third line contains integer *m* (1<=≤<=*m*<=≤<=105) — the number of queries. The last line contains *m* space-separated integers *b*1,<=*b*2,<=...,<=*b**m* (1<=≤<=*b**i*<=≤<=*n*) — the search queries. Note that the queries can repeat.
Output Specification:
Print two integers, showing how many comparisons Vasya's approach needs and how many comparisons Petya's approach needs. Separate the numbers by spaces.
Please, do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier.
Demo Input:
['2\n1 2\n1\n1\n', '2\n2 1\n1\n1\n', '3\n3 1 2\n3\n1 2 3\n']
Demo Output:
['1 2\n', '2 1\n', '6 6\n']
Note:
In the first sample Vasya's approach will make one comparison (it starts with the 1-st element and immediately finds the required number), and Petya's approach makes two comparisons (first he compares with the 2-nd array element, doesn't find the search item and compares with the 1-st element).
In the second sample, on the contrary, Vasya's approach will need two comparisons (first with 1-st element, and then with the 2-nd), and Petya's approach will find the required value in one comparison (the first comparison with the 2-nd element). | ```python
def solve():
n = int(input())
a = [int(i) for i in input().split()]
m = int(input())
b = [int(i) for i in input().split()]
l = len(a)
vasya = 0
petya = 0
for i in b:
vasya += a.index(i)+1
petya += l - a.index(i)
print(vasya, petya)
solve()
``` | 0 | |
143 | A | Help Vasilisa the Wise 2 | PROGRAMMING | 1,000 | [
"brute force",
"math"
] | null | null | Vasilisa the Wise from the Kingdom of Far Far Away got a magic box with a secret as a present from her friend Hellawisa the Wise from the Kingdom of A Little Closer. However, Vasilisa the Wise does not know what the box's secret is, since she cannot open it again. She hopes that you will help her one more time with that.
The box's lock looks as follows: it contains 4 identical deepenings for gems as a 2<=×<=2 square, and some integer numbers are written at the lock's edge near the deepenings. The example of a lock is given on the picture below.
The box is accompanied with 9 gems. Their shapes match the deepenings' shapes and each gem contains one number from 1 to 9 (each number is written on exactly one gem). The box will only open after it is decorated with gems correctly: that is, each deepening in the lock should be filled with exactly one gem. Also, the sums of numbers in the square's rows, columns and two diagonals of the square should match the numbers written at the lock's edge. For example, the above lock will open if we fill the deepenings with gems with numbers as is shown on the picture below.
Now Vasilisa the Wise wants to define, given the numbers on the box's lock, which gems she should put in the deepenings to open the box. Help Vasilisa to solve this challenging task. | The input contains numbers written on the edges of the lock of the box. The first line contains space-separated integers *r*1 and *r*2 that define the required sums of numbers in the rows of the square. The second line contains space-separated integers *c*1 and *c*2 that define the required sums of numbers in the columns of the square. The third line contains space-separated integers *d*1 and *d*2 that define the required sums of numbers on the main and on the side diagonals of the square (1<=≤<=*r*1,<=*r*2,<=*c*1,<=*c*2,<=*d*1,<=*d*2<=≤<=20). Correspondence between the above 6 variables and places where they are written is shown on the picture below. For more clarifications please look at the second sample test that demonstrates the example given in the problem statement. | Print the scheme of decorating the box with stones: two lines containing two space-separated integers from 1 to 9. The numbers should be pairwise different. If there is no solution for the given lock, then print the single number "-1" (without the quotes).
If there are several solutions, output any. | [
"3 7\n4 6\n5 5\n",
"11 10\n13 8\n5 16\n",
"1 2\n3 4\n5 6\n",
"10 10\n10 10\n10 10\n"
] | [
"1 2\n3 4\n",
"4 7\n9 1\n",
"-1\n",
"-1\n"
] | Pay attention to the last test from the statement: it is impossible to open the box because for that Vasilisa the Wise would need 4 identical gems containing number "5". However, Vasilisa only has one gem with each number from 1 to 9. | 500 | [
{
"input": "3 7\n4 6\n5 5",
"output": "1 2\n3 4"
},
{
"input": "11 10\n13 8\n5 16",
"output": "4 7\n9 1"
},
{
"input": "1 2\n3 4\n5 6",
"output": "-1"
},
{
"input": "10 10\n10 10\n10 10",
"output": "-1"
},
{
"input": "5 13\n8 10\n11 7",
"output": "3 2\n5 8"
},
{
"input": "12 17\n10 19\n13 16",
"output": "-1"
},
{
"input": "11 11\n17 5\n12 10",
"output": "9 2\n8 3"
},
{
"input": "12 11\n11 12\n16 7",
"output": "-1"
},
{
"input": "5 9\n7 7\n8 6",
"output": "3 2\n4 5"
},
{
"input": "10 7\n4 13\n11 6",
"output": "-1"
},
{
"input": "18 10\n16 12\n12 16",
"output": "-1"
},
{
"input": "13 6\n10 9\n6 13",
"output": "-1"
},
{
"input": "14 16\n16 14\n18 12",
"output": "-1"
},
{
"input": "16 10\n16 10\n12 14",
"output": "-1"
},
{
"input": "11 9\n12 8\n11 9",
"output": "-1"
},
{
"input": "5 14\n10 9\n10 9",
"output": "-1"
},
{
"input": "2 4\n1 5\n3 3",
"output": "-1"
},
{
"input": "17 16\n14 19\n18 15",
"output": "-1"
},
{
"input": "12 12\n14 10\n16 8",
"output": "9 3\n5 7"
},
{
"input": "15 11\n16 10\n9 17",
"output": "7 8\n9 2"
},
{
"input": "8 10\n9 9\n13 5",
"output": "6 2\n3 7"
},
{
"input": "13 7\n10 10\n5 15",
"output": "4 9\n6 1"
},
{
"input": "14 11\n9 16\n16 9",
"output": "-1"
},
{
"input": "12 8\n14 6\n8 12",
"output": "-1"
},
{
"input": "10 6\n6 10\n4 12",
"output": "-1"
},
{
"input": "10 8\n10 8\n4 14",
"output": "-1"
},
{
"input": "14 13\n9 18\n14 13",
"output": "-1"
},
{
"input": "9 14\n8 15\n8 15",
"output": "-1"
},
{
"input": "3 8\n2 9\n6 5",
"output": "-1"
},
{
"input": "14 17\n18 13\n15 16",
"output": "-1"
},
{
"input": "16 14\n15 15\n17 13",
"output": "9 7\n6 8"
},
{
"input": "14 11\n16 9\n13 12",
"output": "9 5\n7 4"
},
{
"input": "13 10\n11 12\n7 16",
"output": "4 9\n7 3"
},
{
"input": "14 8\n11 11\n13 9",
"output": "8 6\n3 5"
},
{
"input": "12 11\n13 10\n10 13",
"output": "-1"
},
{
"input": "6 5\n2 9\n5 6",
"output": "-1"
},
{
"input": "7 8\n8 7\n12 3",
"output": "-1"
},
{
"input": "7 11\n7 11\n6 12",
"output": "-1"
},
{
"input": "8 5\n11 2\n8 5",
"output": "-1"
},
{
"input": "10 16\n14 12\n14 12",
"output": "-1"
},
{
"input": "7 9\n4 12\n5 11",
"output": "-1"
},
{
"input": "11 13\n19 5\n12 12",
"output": "-1"
},
{
"input": "8 12\n5 15\n11 9",
"output": "2 6\n3 9"
},
{
"input": "16 5\n13 8\n10 11",
"output": "9 7\n4 1"
},
{
"input": "3 14\n8 9\n10 7",
"output": "2 1\n6 8"
},
{
"input": "12 14\n11 15\n9 17",
"output": "3 9\n8 6"
},
{
"input": "13 7\n9 11\n14 6",
"output": "8 5\n1 6"
},
{
"input": "13 8\n15 6\n11 10",
"output": "9 4\n6 2"
},
{
"input": "9 6\n5 10\n3 12",
"output": "1 8\n4 2"
},
{
"input": "12 7\n5 14\n8 11",
"output": "3 9\n2 5"
},
{
"input": "9 12\n3 17\n10 10",
"output": "-1"
},
{
"input": "3 8\n4 6\n5 5",
"output": "-1"
}
] | 1,578,833,482 | 2,147,483,647 | PyPy 3 | WRONG_ANSWER | TESTS | 50 | 312 | 0 | r1, r2 = list(map(int, input().rstrip().split()))
c1, c2 = list(map(int, input().rstrip().split()))
d1, d2 = list(map(int, input().rstrip().split()))
li = [1, 2, 3, 4, 5, 6, 7, 8, 9]
flag = 0
for i in li:
a = i
c = c1 - a
b = r1 - a
d = d1 - a
if c in li and b in li and d in li:
if (b == d2 - c) and (b == c2 - d):
flag=1
break
if a == b or a == c or a == d or b == c or b == d or c == d:
flag=0
if flag == 1:
print(a, b)
print(c, d)
else:
print(-1)
| Title: Help Vasilisa the Wise 2
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasilisa the Wise from the Kingdom of Far Far Away got a magic box with a secret as a present from her friend Hellawisa the Wise from the Kingdom of A Little Closer. However, Vasilisa the Wise does not know what the box's secret is, since she cannot open it again. She hopes that you will help her one more time with that.
The box's lock looks as follows: it contains 4 identical deepenings for gems as a 2<=×<=2 square, and some integer numbers are written at the lock's edge near the deepenings. The example of a lock is given on the picture below.
The box is accompanied with 9 gems. Their shapes match the deepenings' shapes and each gem contains one number from 1 to 9 (each number is written on exactly one gem). The box will only open after it is decorated with gems correctly: that is, each deepening in the lock should be filled with exactly one gem. Also, the sums of numbers in the square's rows, columns and two diagonals of the square should match the numbers written at the lock's edge. For example, the above lock will open if we fill the deepenings with gems with numbers as is shown on the picture below.
Now Vasilisa the Wise wants to define, given the numbers on the box's lock, which gems she should put in the deepenings to open the box. Help Vasilisa to solve this challenging task.
Input Specification:
The input contains numbers written on the edges of the lock of the box. The first line contains space-separated integers *r*1 and *r*2 that define the required sums of numbers in the rows of the square. The second line contains space-separated integers *c*1 and *c*2 that define the required sums of numbers in the columns of the square. The third line contains space-separated integers *d*1 and *d*2 that define the required sums of numbers on the main and on the side diagonals of the square (1<=≤<=*r*1,<=*r*2,<=*c*1,<=*c*2,<=*d*1,<=*d*2<=≤<=20). Correspondence between the above 6 variables and places where they are written is shown on the picture below. For more clarifications please look at the second sample test that demonstrates the example given in the problem statement.
Output Specification:
Print the scheme of decorating the box with stones: two lines containing two space-separated integers from 1 to 9. The numbers should be pairwise different. If there is no solution for the given lock, then print the single number "-1" (without the quotes).
If there are several solutions, output any.
Demo Input:
['3 7\n4 6\n5 5\n', '11 10\n13 8\n5 16\n', '1 2\n3 4\n5 6\n', '10 10\n10 10\n10 10\n']
Demo Output:
['1 2\n3 4\n', '4 7\n9 1\n', '-1\n', '-1\n']
Note:
Pay attention to the last test from the statement: it is impossible to open the box because for that Vasilisa the Wise would need 4 identical gems containing number "5". However, Vasilisa only has one gem with each number from 1 to 9. | ```python
r1, r2 = list(map(int, input().rstrip().split()))
c1, c2 = list(map(int, input().rstrip().split()))
d1, d2 = list(map(int, input().rstrip().split()))
li = [1, 2, 3, 4, 5, 6, 7, 8, 9]
flag = 0
for i in li:
a = i
c = c1 - a
b = r1 - a
d = d1 - a
if c in li and b in li and d in li:
if (b == d2 - c) and (b == c2 - d):
flag=1
break
if a == b or a == c or a == d or b == c or b == d or c == d:
flag=0
if flag == 1:
print(a, b)
print(c, d)
else:
print(-1)
``` | 0 | |
424 | A | Squats | PROGRAMMING | 900 | [
"implementation"
] | null | null | Pasha has many hamsters and he makes them work out. Today, *n* hamsters (*n* is even) came to work out. The hamsters lined up and each hamster either sat down or stood up.
For another exercise, Pasha needs exactly hamsters to stand up and the other hamsters to sit down. In one minute, Pasha can make some hamster ether sit down or stand up. How many minutes will he need to get what he wants if he acts optimally well? | The first line contains integer *n* (2<=≤<=*n*<=≤<=200; *n* is even). The next line contains *n* characters without spaces. These characters describe the hamsters' position: the *i*-th character equals 'X', if the *i*-th hamster in the row is standing, and 'x', if he is sitting. | In the first line, print a single integer — the minimum required number of minutes. In the second line, print a string that describes the hamsters' position after Pasha makes the required changes. If there are multiple optimal positions, print any of them. | [
"4\nxxXx\n",
"2\nXX\n",
"6\nxXXxXx\n"
] | [
"1\nXxXx\n",
"1\nxX\n",
"0\nxXXxXx\n"
] | none | 500 | [
{
"input": "4\nxxXx",
"output": "1\nXxXx"
},
{
"input": "2\nXX",
"output": "1\nxX"
},
{
"input": "6\nxXXxXx",
"output": "0\nxXXxXx"
},
{
"input": "4\nxXXX",
"output": "1\nxxXX"
},
{
"input": "2\nXx",
"output": "0\nXx"
},
{
"input": "22\nXXxXXxxXxXxXXXXXXXXXxx",
"output": "4\nxxxxxxxXxXxXXXXXXXXXxx"
},
{
"input": "30\nXXxXxxXXXXxxXXxxXXxxxxXxxXXXxx",
"output": "0\nXXxXxxXXXXxxXXxxXXxxxxXxxXXXxx"
},
{
"input": "104\nxxXxXxxXXXxxXxXxxXXXxxxXxxXXXxxXXXxXxXxXXxxXxxxxxXXXXxXXXXxXXXxxxXxxxxxxxXxxXxXXxxXXXXxXXXxxXXXXXXXXXxXX",
"output": "4\nxxxxxxxxxXxxXxXxxXXXxxxXxxXXXxxXXXxXxXxXXxxXxxxxxXXXXxXXXXxXXXxxxXxxxxxxxXxxXxXXxxXXXXxXXXxxXXXXXXXXXxXX"
},
{
"input": "78\nxxxXxxXxXxxXxxxxxXxXXXxXXXXxxxxxXxXXXxxXxXXXxxxxXxxXXXxxxxxxxxXXXXxXxXXxXXXxXX",
"output": "3\nXXXXxxXxXxxXxxxxxXxXXXxXXXXxxxxxXxXXXxxXxXXXxxxxXxxXXXxxxxxxxxXXXXxXxXXxXXXxXX"
},
{
"input": "200\nxxXXxxXXxXxxXxxXxXxxXxXxXxXxxxxxXXxXXxxXXXXxXXXxXXxXxXxxxxXxxXXXxxxXxXxxxXxxXXxXxXxxxxxxxXxxXxXxxXxXXXxxXxXXXXxxXxxxXxXXXXXXxXxXXxxxxXxxxXxxxXxXXXxXxXXXXxXXxxxXxXXxxXXxxxXxXxXXxXXXxXxXxxxXXxxxxXXxXXXX",
"output": "4\nXXXXXXXXxXxxXxxXxXxxXxXxXxXxxxxxXXxXXxxXXXXxXXXxXXxXxXxxxxXxxXXXxxxXxXxxxXxxXXxXxXxxxxxxxXxxXxXxxXxXXXxxXxXXXXxxXxxxXxXXXXXXxXxXXxxxxXxxxXxxxXxXXXxXxXXXXxXXxxxXxXXxxXXxxxXxXxXXxXXXxXxXxxxXXxxxxXXxXXXX"
},
{
"input": "198\nxXxxXxxXxxXXxXxXxXxxXXXxxXxxxxXXXXxxXxxxxXXXXxXxXXxxxXXXXXXXxXXXxxxxXXxXXxXxXXxxxxXxXXXXXXxXxxXxXxxxXxXXXXxxXXxxXxxxXXxXxXXxXxXXxXXXXxxxxxXxXXxxxXxXXXXxXxXXxxXxXXxXxXXxxxXxXXXXxXxxXxXXXxxxxXxXXXXxXx",
"output": "5\nxxxxxxxxxxxxxXxXxXxxXXXxxXxxxxXXXXxxXxxxxXXXXxXxXXxxxXXXXXXXxXXXxxxxXXxXXxXxXXxxxxXxXXXXXXxXxxXxXxxxXxXXXXxxXXxxXxxxXXxXxXXxXxXXxXXXXxxxxxXxXXxxxXxXXXXxXxXXxxXxXXxXxXXxxxXxXXXXxXxxXxXXXxxxxXxXXXXxXx"
},
{
"input": "200\nxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx",
"output": "100\nXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx"
},
{
"input": "198\nxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx",
"output": "99\nXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx"
},
{
"input": "200\nXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXX",
"output": "100\nxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXX"
},
{
"input": "198\nXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXX",
"output": "99\nxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXX"
},
{
"input": "2\nxx",
"output": "1\nXx"
},
{
"input": "2\nXx",
"output": "0\nXx"
},
{
"input": "2\nxX",
"output": "0\nxX"
},
{
"input": "4\nXXXX",
"output": "2\nxxXX"
},
{
"input": "4\nxxxx",
"output": "2\nXXxx"
},
{
"input": "4\nxxXX",
"output": "0\nxxXX"
},
{
"input": "4\nXXxx",
"output": "0\nXXxx"
},
{
"input": "4\nxXxx",
"output": "1\nXXxx"
},
{
"input": "4\nXxxx",
"output": "1\nXXxx"
},
{
"input": "4\nxxxX",
"output": "1\nXxxX"
},
{
"input": "4\nxxXx",
"output": "1\nXxXx"
},
{
"input": "4\nXXXx",
"output": "1\nxXXx"
},
{
"input": "4\nxXXX",
"output": "1\nxxXX"
},
{
"input": "4\nXxXX",
"output": "1\nxxXX"
},
{
"input": "4\nXXxX",
"output": "1\nxXxX"
},
{
"input": "4\nXxXx",
"output": "0\nXxXx"
},
{
"input": "6\nxXXxXX",
"output": "1\nxxXxXX"
}
] | 1,400,528,249 | 2,147,483,647 | Python 3 | RUNTIME_ERROR | TESTS | 0 | 46 | 0 | n = int(input())
s = input()
print(abs(s.count('X') - n//2))
if s.count('X') > n // 2:
print(s.replase('X', 'x', s.count('X') - n // 2))
elif s.count('X') == n//2:
print(s)
else:
print(s.replase('x', 'X', s.count('X') - n // 2)) | Title: Squats
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Pasha has many hamsters and he makes them work out. Today, *n* hamsters (*n* is even) came to work out. The hamsters lined up and each hamster either sat down or stood up.
For another exercise, Pasha needs exactly hamsters to stand up and the other hamsters to sit down. In one minute, Pasha can make some hamster ether sit down or stand up. How many minutes will he need to get what he wants if he acts optimally well?
Input Specification:
The first line contains integer *n* (2<=≤<=*n*<=≤<=200; *n* is even). The next line contains *n* characters without spaces. These characters describe the hamsters' position: the *i*-th character equals 'X', if the *i*-th hamster in the row is standing, and 'x', if he is sitting.
Output Specification:
In the first line, print a single integer — the minimum required number of minutes. In the second line, print a string that describes the hamsters' position after Pasha makes the required changes. If there are multiple optimal positions, print any of them.
Demo Input:
['4\nxxXx\n', '2\nXX\n', '6\nxXXxXx\n']
Demo Output:
['1\nXxXx\n', '1\nxX\n', '0\nxXXxXx\n']
Note:
none | ```python
n = int(input())
s = input()
print(abs(s.count('X') - n//2))
if s.count('X') > n // 2:
print(s.replase('X', 'x', s.count('X') - n // 2))
elif s.count('X') == n//2:
print(s)
else:
print(s.replase('x', 'X', s.count('X') - n // 2))
``` | -1 | |
32 | A | Reconnaissance | PROGRAMMING | 800 | [
"brute force"
] | A. Reconnaissance | 2 | 256 | According to the regulations of Berland's army, a reconnaissance unit should consist of exactly two soldiers. Since these two soldiers shouldn't differ much, their heights can differ by at most *d* centimeters. Captain Bob has *n* soldiers in his detachment. Their heights are *a*1,<=*a*2,<=...,<=*a**n* centimeters. Some soldiers are of the same height. Bob wants to know, how many ways exist to form a reconnaissance unit of two soldiers from his detachment.
Ways (1,<=2) and (2,<=1) should be regarded as different. | The first line contains two integers *n* and *d* (1<=≤<=*n*<=≤<=1000,<=1<=≤<=*d*<=≤<=109) — amount of soldiers in Bob's detachment and the maximum allowed height difference respectively. The second line contains *n* space-separated integers — heights of all the soldiers in Bob's detachment. These numbers don't exceed 109. | Output one number — amount of ways to form a reconnaissance unit of two soldiers, whose height difference doesn't exceed *d*. | [
"5 10\n10 20 50 60 65\n",
"5 1\n55 30 29 31 55\n"
] | [
"6\n",
"6\n"
] | none | 500 | [
{
"input": "5 10\n10 20 50 60 65",
"output": "6"
},
{
"input": "5 1\n55 30 29 31 55",
"output": "6"
},
{
"input": "6 10\n4 6 4 1 9 3",
"output": "30"
},
{
"input": "7 100\n19 1694 261 162 1 234 513",
"output": "8"
},
{
"input": "8 42\n37 53 74 187 568 22 5 65",
"output": "20"
},
{
"input": "10 4\n11 6 76 49 28 20 57 152 5 32",
"output": "4"
},
{
"input": "100 100\n51 93 101 960 2 477 213 129 663 925 254 78 1486 274 160 481 132 156 412 372 5 57 152 298 1771 7 359 468 254 406 202 929 221 366 552 97 555 29 822 118 539 140 992 854 7 163 134 103 940 30 409 1003 398 43 555 79 107 40 23 103 643 171 310 382 770 337 18 189 570 177 29 54 855 171 205 291 299 935 620 180 114 358 88 292 118 400 218 537 369 60 683 192 13 537 59 824 264 191 3 300",
"output": "2404"
}
] | 1,613,492,126 | 2,147,483,647 | Python 3 | OK | TESTS | 32 | 1,154 | 307,200 |
datos = input().split()
n, d = int(datos[0]), int(datos[1])
estaturas = []
lista = input().split()
for elemento in lista:
estaturas.append(int(elemento))
contador = 0
for i in range(n):
for j in range(n):
if i != j:
if abs(estaturas[i] - estaturas[j]) <= d:
contador = contador+1
print(contador) | Title: Reconnaissance
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
According to the regulations of Berland's army, a reconnaissance unit should consist of exactly two soldiers. Since these two soldiers shouldn't differ much, their heights can differ by at most *d* centimeters. Captain Bob has *n* soldiers in his detachment. Their heights are *a*1,<=*a*2,<=...,<=*a**n* centimeters. Some soldiers are of the same height. Bob wants to know, how many ways exist to form a reconnaissance unit of two soldiers from his detachment.
Ways (1,<=2) and (2,<=1) should be regarded as different.
Input Specification:
The first line contains two integers *n* and *d* (1<=≤<=*n*<=≤<=1000,<=1<=≤<=*d*<=≤<=109) — amount of soldiers in Bob's detachment and the maximum allowed height difference respectively. The second line contains *n* space-separated integers — heights of all the soldiers in Bob's detachment. These numbers don't exceed 109.
Output Specification:
Output one number — amount of ways to form a reconnaissance unit of two soldiers, whose height difference doesn't exceed *d*.
Demo Input:
['5 10\n10 20 50 60 65\n', '5 1\n55 30 29 31 55\n']
Demo Output:
['6\n', '6\n']
Note:
none | ```python
datos = input().split()
n, d = int(datos[0]), int(datos[1])
estaturas = []
lista = input().split()
for elemento in lista:
estaturas.append(int(elemento))
contador = 0
for i in range(n):
for j in range(n):
if i != j:
if abs(estaturas[i] - estaturas[j]) <= d:
contador = contador+1
print(contador)
``` | 3.710928 |
1 | A | Theatre Square | PROGRAMMING | 1,000 | [
"math"
] | A. Theatre Square | 1 | 256 | Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square. | The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109). | Write the needed number of flagstones. | [
"6 6 4\n"
] | [
"4\n"
] | none | 0 | [
{
"input": "6 6 4",
"output": "4"
},
{
"input": "1 1 1",
"output": "1"
},
{
"input": "2 1 1",
"output": "2"
},
{
"input": "1 2 1",
"output": "2"
},
{
"input": "2 2 1",
"output": "4"
},
{
"input": "2 1 2",
"output": "1"
},
{
"input": "1 1 3",
"output": "1"
},
{
"input": "2 3 4",
"output": "1"
},
{
"input": "1000000000 1000000000 1",
"output": "1000000000000000000"
},
{
"input": "12 13 4",
"output": "12"
},
{
"input": "222 332 5",
"output": "3015"
},
{
"input": "1000 1000 10",
"output": "10000"
},
{
"input": "1001 1000 10",
"output": "10100"
},
{
"input": "100 10001 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 1000000000",
"output": "1"
},
{
"input": "1000000000 1000000000 999999999",
"output": "4"
},
{
"input": "1000000000 1000000000 192",
"output": "27126743055556"
},
{
"input": "1000000000 987654321 1",
"output": "987654321000000000"
},
{
"input": "456784567 1000000000 51",
"output": "175618850864484"
},
{
"input": "39916800 134217728 40320",
"output": "3295710"
}
] | 1,662,734,294 | 2,147,483,647 | Python 3 | OK | TESTS | 20 | 31 | 0 | n,m,a=map(int,input().split())
print((-n//a)*(-m//a)) | Title: Theatre Square
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Theatre Square in the capital city of Berland has a rectangular shape with the size *n*<=×<=*m* meters. On the occasion of the city's anniversary, a decision was taken to pave the Square with square granite flagstones. Each flagstone is of the size *a*<=×<=*a*.
What is the least number of flagstones needed to pave the Square? It's allowed to cover the surface larger than the Theatre Square, but the Square has to be covered. It's not allowed to break the flagstones. The sides of flagstones should be parallel to the sides of the Square.
Input Specification:
The input contains three positive integer numbers in the first line: *n*,<=<=*m* and *a* (1<=≤<=<=*n*,<=*m*,<=*a*<=≤<=109).
Output Specification:
Write the needed number of flagstones.
Demo Input:
['6 6 4\n']
Demo Output:
['4\n']
Note:
none | ```python
n,m,a=map(int,input().split())
print((-n//a)*(-m//a))
``` | 3.9845 |
129 | A | Cookies | PROGRAMMING | 900 | [
"implementation"
] | null | null | Olga came to visit the twins Anna and Maria and saw that they have many cookies. The cookies are distributed into bags. As there are many cookies, Olga decided that it's no big deal if she steals a bag. However, she doesn't want the sisters to quarrel because of nothing when they divide the cookies. That's why Olga wants to steal a bag with cookies so that the number of cookies in the remaining bags was even, that is, so that Anna and Maria could evenly divide it into two (even 0 remaining cookies will do, just as any other even number). How many ways there are to steal exactly one cookie bag so that the total number of cookies in the remaining bags was even? | The first line contains the only integer *n* (1<=≤<=*n*<=≤<=100) — the number of cookie bags Anna and Maria have. The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=100) — the number of cookies in the *i*-th bag. | Print in the only line the only number — the sought number of ways. If there are no such ways print 0. | [
"1\n1\n",
"10\n1 2 2 3 4 4 4 2 2 2\n",
"11\n2 2 2 2 2 2 2 2 2 2 99\n"
] | [
"1\n",
"8\n",
"1\n"
] | In the first sample Olga should take the only bag so that the twins ended up with the even number of cookies.
In the second sample Olga can take any of five bags with two cookies or any of three bags with four cookies — 5 + 3 = 8 ways in total.
In the third sample, no matter which bag with two cookies Olga chooses, the twins are left with 2 * 9 + 99 = 117 cookies. Thus, Olga has only one option: to take the bag with 99 cookies. | 500 | [
{
"input": "1\n1",
"output": "1"
},
{
"input": "10\n1 2 2 3 4 4 4 2 2 2",
"output": "8"
},
{
"input": "11\n2 2 2 2 2 2 2 2 2 2 99",
"output": "1"
},
{
"input": "2\n1 1",
"output": "0"
},
{
"input": "2\n2 2",
"output": "2"
},
{
"input": "2\n1 2",
"output": "1"
},
{
"input": "7\n7 7 7 7 7 7 7",
"output": "7"
},
{
"input": "8\n1 2 3 4 5 6 7 8",
"output": "4"
},
{
"input": "100\n1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 2 2 2 2",
"output": "50"
},
{
"input": "99\n99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99 100 99",
"output": "49"
},
{
"input": "82\n43 44 96 33 23 42 33 66 53 87 8 90 43 91 40 88 51 18 48 62 59 10 22 20 54 6 13 63 2 56 31 52 98 42 54 32 26 77 9 24 33 91 16 30 39 34 78 82 73 90 12 15 67 76 30 18 44 86 84 98 65 54 100 79 28 34 40 56 11 43 72 35 86 59 89 40 30 33 7 19 44 15",
"output": "50"
},
{
"input": "17\n50 14 17 77 74 74 38 76 41 27 45 29 66 98 38 73 38",
"output": "7"
},
{
"input": "94\n81 19 90 99 26 11 86 44 78 36 80 59 99 90 78 72 71 20 94 56 42 40 71 84 10 85 10 70 52 27 39 55 90 16 48 25 7 79 99 100 38 10 99 56 3 4 78 9 16 57 14 40 52 54 57 70 30 86 56 84 97 60 59 69 49 66 23 92 90 46 86 73 53 47 1 83 14 20 24 66 13 45 41 14 86 75 55 88 48 95 82 24 47 87",
"output": "39"
},
{
"input": "88\n64 95 12 90 40 65 98 45 52 54 79 7 81 25 98 19 68 82 41 53 35 50 5 22 32 21 8 39 8 6 72 27 81 30 12 79 21 42 60 2 66 87 46 93 62 78 52 71 76 32 78 94 86 85 55 15 34 76 41 20 32 26 94 81 89 45 74 49 11 40 40 39 49 46 80 85 90 23 80 40 86 58 70 26 48 93 23 53",
"output": "37"
},
{
"input": "84\n95 9 43 43 13 84 60 90 1 8 97 99 54 34 59 83 33 15 51 26 40 12 66 65 19 30 29 78 92 60 25 13 19 84 71 73 12 24 54 49 16 41 11 40 57 59 34 40 39 9 71 83 1 77 79 53 94 47 78 55 77 85 29 52 80 90 53 77 97 97 27 79 28 23 83 25 26 22 49 86 63 56 3 32",
"output": "51"
},
{
"input": "47\n61 97 76 94 91 22 2 68 62 73 90 47 16 79 44 71 98 68 43 6 53 52 40 27 68 67 43 96 14 91 60 61 96 24 97 13 32 65 85 96 81 77 34 18 23 14 80",
"output": "21"
},
{
"input": "69\n71 1 78 74 58 89 30 6 100 90 22 61 11 59 14 74 27 25 78 61 45 19 25 33 37 4 52 43 53 38 9 100 56 67 69 38 76 91 63 60 93 52 28 61 9 98 8 14 57 63 89 64 98 51 36 66 36 86 13 82 50 91 52 64 86 78 78 83 81",
"output": "37"
},
{
"input": "52\n38 78 36 75 19 3 56 1 39 97 24 79 84 16 93 55 96 64 12 24 1 86 80 29 12 32 36 36 73 39 76 65 53 98 30 20 28 8 86 43 70 22 75 69 62 65 81 25 53 40 71 59",
"output": "28"
},
{
"input": "74\n81 31 67 97 26 75 69 81 11 13 13 74 77 88 52 20 52 64 66 75 72 28 41 54 26 75 41 91 75 15 18 36 13 83 63 61 14 48 53 63 19 67 35 48 23 65 73 100 44 55 92 88 99 17 73 25 83 7 31 89 12 80 98 39 42 75 14 29 81 35 77 87 33 94",
"output": "47"
},
{
"input": "44\n46 56 31 31 37 71 94 2 14 100 45 72 36 72 80 3 38 54 42 98 50 32 31 42 62 31 45 50 95 100 18 17 64 22 18 25 52 56 70 57 43 40 81 28",
"output": "15"
},
{
"input": "22\n28 57 40 74 51 4 45 84 99 12 95 14 92 60 47 81 84 51 31 91 59 42",
"output": "11"
},
{
"input": "59\n73 45 94 76 41 49 65 13 74 66 36 25 47 75 40 23 92 72 11 32 32 8 81 26 68 56 41 8 76 47 96 55 70 11 84 14 83 18 70 22 30 39 28 100 48 11 92 45 78 69 86 1 54 90 98 91 13 17 35",
"output": "33"
},
{
"input": "63\n20 18 44 94 68 57 16 43 74 55 68 24 21 95 76 84 50 50 47 86 86 12 58 55 28 72 86 18 34 45 81 88 3 72 41 9 60 90 81 93 12 6 9 6 2 41 1 7 9 29 81 14 64 80 20 36 67 54 7 5 35 81 22",
"output": "37"
},
{
"input": "28\n49 84 48 19 44 91 11 82 96 95 88 90 71 82 87 25 31 23 18 13 98 45 26 65 35 12 31 14",
"output": "15"
},
{
"input": "61\n34 18 28 64 28 45 9 77 77 20 63 92 79 16 16 100 86 2 91 91 57 15 31 95 10 88 84 5 82 83 53 98 59 17 97 80 76 80 81 3 91 81 87 93 61 46 10 49 6 22 21 75 63 89 21 81 30 19 67 38 77",
"output": "35"
},
{
"input": "90\n41 90 43 1 28 75 90 50 3 70 76 64 81 63 25 69 83 82 29 91 59 66 21 61 7 55 72 49 38 69 72 20 64 58 30 81 61 29 96 14 39 5 100 20 29 98 75 29 44 78 97 45 26 77 73 59 22 99 41 6 3 96 71 20 9 18 96 18 90 62 34 78 54 5 41 6 73 33 2 54 26 21 18 6 45 57 43 73 95 75",
"output": "42"
},
{
"input": "45\n93 69 4 27 20 14 71 48 79 3 32 26 49 30 57 88 13 56 49 61 37 32 47 41 41 70 45 68 82 18 8 6 25 20 15 13 71 99 28 6 52 34 19 59 26",
"output": "23"
},
{
"input": "33\n29 95 48 49 91 10 83 71 47 25 66 36 51 12 34 10 54 74 41 96 89 26 89 1 42 33 1 62 9 32 49 65 78",
"output": "15"
},
{
"input": "34\n98 24 42 36 41 82 28 58 89 34 77 70 76 44 74 54 66 100 13 79 4 88 21 1 11 45 91 29 87 100 29 54 82 78",
"output": "13"
},
{
"input": "29\n91 84 26 84 9 63 52 9 65 56 90 2 36 7 67 33 91 14 65 38 53 36 81 83 85 14 33 95 51",
"output": "17"
},
{
"input": "100\n2 88 92 82 87 100 78 28 84 43 78 32 43 33 97 19 15 52 29 84 57 72 54 13 99 28 82 79 40 70 34 92 91 53 9 88 27 43 14 92 72 37 26 37 20 95 19 34 49 64 33 37 34 27 80 79 9 54 99 68 25 4 68 73 46 66 24 78 3 87 26 52 50 84 4 95 23 83 39 58 86 36 33 16 98 2 84 19 53 12 69 60 10 11 78 17 79 92 77 59",
"output": "45"
},
{
"input": "100\n2 95 45 73 9 54 20 97 57 82 88 26 18 71 25 27 75 54 31 11 58 85 69 75 72 91 76 5 25 80 45 49 4 73 8 81 81 38 5 12 53 77 7 96 90 35 28 80 73 94 19 69 96 17 94 49 69 9 32 19 5 12 46 29 26 40 59 59 6 95 82 50 72 2 45 69 12 5 72 29 39 72 23 96 81 28 28 56 68 58 37 41 30 1 90 84 15 24 96 43",
"output": "53"
},
{
"input": "100\n27 72 35 91 13 10 35 45 24 55 83 84 63 96 29 79 34 67 63 92 48 83 18 77 28 27 49 66 29 88 55 15 6 58 14 67 94 36 77 7 7 64 61 52 71 18 36 99 76 6 50 67 16 13 41 7 89 73 61 51 78 22 78 32 76 100 3 31 89 71 63 53 15 85 77 54 89 33 68 74 3 23 57 5 43 89 75 35 9 86 90 11 31 46 48 37 74 17 77 8",
"output": "40"
},
{
"input": "100\n69 98 69 88 11 49 55 8 25 91 17 81 47 26 15 73 96 71 18 42 42 61 48 14 92 78 35 72 4 27 62 75 83 79 17 16 46 80 96 90 82 54 37 69 85 21 67 70 96 10 46 63 21 59 56 92 54 88 77 30 75 45 44 29 86 100 51 11 65 69 66 56 82 63 27 1 51 51 13 10 3 55 26 85 34 16 87 72 13 100 81 71 90 95 86 50 83 55 55 54",
"output": "53"
},
{
"input": "100\n34 35 99 64 2 66 78 93 20 48 12 79 19 10 87 7 42 92 60 79 5 2 24 89 57 48 63 92 74 4 16 51 7 12 90 48 87 17 18 73 51 58 97 97 25 38 15 97 96 73 67 91 6 75 14 13 87 79 75 3 15 55 35 95 71 45 10 13 20 37 82 26 2 22 13 83 97 84 39 79 43 100 54 59 98 8 61 34 7 65 75 44 24 77 73 88 34 95 44 77",
"output": "55"
},
{
"input": "100\n15 86 3 1 51 26 74 85 37 87 64 58 10 6 57 26 30 47 85 65 24 72 50 40 12 35 91 47 91 60 47 87 95 34 80 91 26 3 36 39 14 86 28 70 51 44 28 21 72 79 57 61 16 71 100 94 57 67 36 74 24 21 89 85 25 2 97 67 76 53 76 80 97 64 35 13 8 32 21 52 62 61 67 14 74 73 66 44 55 76 24 3 43 42 99 61 36 80 38 66",
"output": "52"
},
{
"input": "100\n45 16 54 54 80 94 74 93 75 85 58 95 79 30 81 2 84 4 57 23 92 64 78 1 50 36 13 27 56 54 10 77 87 1 5 38 85 74 94 82 30 45 72 83 82 30 81 82 82 3 69 82 7 92 39 60 94 42 41 5 3 17 67 21 79 44 79 96 28 3 53 68 79 89 63 83 1 44 4 31 84 15 73 77 19 66 54 6 73 1 67 24 91 11 86 45 96 82 20 89",
"output": "51"
},
{
"input": "100\n84 23 50 32 90 71 92 43 58 70 6 82 7 55 85 19 70 89 12 26 29 56 74 30 2 27 4 39 63 67 91 81 11 33 75 10 82 88 39 43 43 80 68 35 55 67 53 62 73 65 86 74 43 51 14 48 42 92 83 57 22 33 24 99 5 27 78 96 7 28 11 15 8 38 85 67 5 92 24 96 57 59 14 95 91 4 9 18 45 33 74 83 64 85 14 51 51 94 29 2",
"output": "53"
},
{
"input": "100\n77 56 56 45 73 55 32 37 39 50 30 95 79 21 44 34 51 43 86 91 39 30 85 15 35 93 100 14 57 31 80 79 38 40 88 4 91 54 7 95 76 26 62 84 17 33 67 47 6 82 69 51 17 2 59 24 11 12 31 90 12 11 55 38 72 49 30 50 42 46 5 97 9 9 30 45 86 23 19 82 40 42 5 40 35 98 35 32 60 60 5 28 84 35 21 49 68 53 68 23",
"output": "48"
},
{
"input": "100\n78 38 79 61 45 86 83 83 86 90 74 69 2 84 73 39 2 5 20 71 24 80 54 89 58 34 77 40 39 62 2 47 28 53 97 75 88 98 94 96 33 71 44 90 47 36 19 89 87 98 90 87 5 85 34 79 82 3 42 88 89 63 35 7 89 30 40 48 12 41 56 76 83 60 80 80 39 56 77 4 72 96 30 55 57 51 7 19 11 1 66 1 91 87 11 62 95 85 79 25",
"output": "48"
},
{
"input": "100\n5 34 23 20 76 75 19 51 17 82 60 13 83 6 65 16 20 43 66 54 87 10 87 73 50 24 16 98 33 28 80 52 54 82 26 92 14 13 84 92 94 29 61 21 60 20 48 94 24 20 75 70 58 27 68 45 86 89 29 8 67 38 83 48 18 100 11 22 46 84 52 97 70 19 50 75 3 7 52 53 72 41 18 31 1 38 49 53 11 64 99 76 9 87 48 12 100 32 44 71",
"output": "58"
},
{
"input": "100\n76 89 68 78 24 72 73 95 98 72 58 15 2 5 56 32 9 65 50 70 94 31 29 54 89 52 31 93 43 56 26 35 72 95 51 55 78 70 11 92 17 5 54 94 81 31 78 95 73 91 95 37 59 9 53 48 65 55 84 8 45 97 64 37 96 34 36 53 66 17 72 48 99 23 27 18 92 84 44 73 60 78 53 29 68 99 19 39 61 40 69 6 77 12 47 29 15 4 8 45",
"output": "53"
},
{
"input": "100\n82 40 31 53 8 50 85 93 3 84 54 17 96 59 51 42 18 19 35 84 79 31 17 46 54 82 72 49 35 73 26 89 61 73 3 50 12 29 25 77 88 21 58 24 22 89 96 54 82 29 96 56 77 16 1 68 90 93 20 23 57 22 31 18 92 90 51 14 50 72 31 54 12 50 66 62 2 34 17 45 68 50 87 97 23 71 1 72 17 82 42 15 20 78 4 49 66 59 10 17",
"output": "54"
},
{
"input": "100\n32 82 82 24 39 53 48 5 29 24 9 37 91 37 91 95 1 97 84 52 12 56 93 47 22 20 14 17 40 22 79 34 24 2 69 30 69 29 3 89 21 46 60 92 39 29 18 24 49 18 40 22 60 13 77 50 39 64 50 70 99 8 66 31 90 38 20 54 7 21 5 56 41 68 69 20 54 89 69 62 9 53 43 89 81 97 15 2 52 78 89 65 16 61 59 42 56 25 32 52",
"output": "49"
},
{
"input": "100\n72 54 23 24 97 14 99 87 15 25 7 23 17 87 72 31 71 87 34 82 51 77 74 85 62 38 24 7 84 48 98 21 29 71 70 84 25 58 67 92 18 44 32 9 81 15 53 29 63 18 86 16 7 31 38 99 70 32 89 16 23 11 66 96 69 82 97 59 6 9 49 80 85 19 6 9 52 51 85 74 53 46 73 55 31 63 78 61 34 80 77 65 87 77 92 52 89 8 52 31",
"output": "44"
},
{
"input": "100\n56 88 8 19 7 15 11 54 35 50 19 57 63 72 51 43 50 19 57 90 40 100 8 92 11 96 30 32 59 65 93 47 62 3 50 41 30 50 72 83 61 46 83 60 20 46 33 1 5 18 83 22 34 16 41 95 63 63 7 59 55 95 91 29 64 60 64 81 45 45 10 9 88 37 69 85 21 82 41 76 42 34 47 78 51 83 65 100 13 22 59 76 63 1 26 86 36 94 99 74",
"output": "46"
},
{
"input": "100\n27 89 67 60 62 80 43 50 28 88 72 5 94 11 63 91 18 78 99 3 71 26 12 97 74 62 23 24 22 3 100 72 98 7 94 32 12 75 61 88 42 48 10 14 45 9 48 56 73 76 70 70 79 90 35 39 96 37 81 11 19 65 99 39 23 79 34 61 35 74 90 37 73 23 46 21 94 84 73 58 11 89 13 9 10 85 42 78 73 32 53 39 49 90 43 5 28 31 97 75",
"output": "53"
},
{
"input": "100\n33 24 97 96 1 14 99 51 13 65 67 20 46 88 42 44 20 49 5 89 98 83 15 40 74 83 58 3 10 79 34 2 69 28 37 100 55 52 14 8 44 94 97 89 6 42 11 28 30 33 55 56 20 57 52 25 75 1 87 42 62 41 37 12 54 85 95 80 42 36 94 96 28 76 54 36 4 17 26 24 62 15 17 79 84 36 92 78 74 91 96 77 54 92 81 91 62 98 37 37",
"output": "43"
},
{
"input": "100\n86 24 61 15 11 85 1 31 47 36 23 36 59 34 3 27 16 29 82 28 58 52 52 66 71 61 98 39 60 20 67 41 67 90 73 29 92 17 70 95 58 98 58 32 21 73 46 56 87 72 80 75 40 27 94 31 59 92 93 37 14 99 96 21 97 23 81 91 52 52 96 94 92 28 38 29 52 16 57 27 17 24 91 21 79 55 96 98 95 94 23 78 79 12 77 35 32 75 100 82",
"output": "51"
},
{
"input": "100\n88 85 41 37 69 21 7 69 36 5 92 26 64 75 22 46 67 20 70 22 62 66 38 24 47 49 68 30 90 31 67 86 86 82 9 51 43 45 48 42 73 44 31 94 45 60 54 66 20 87 11 94 34 32 87 66 56 28 75 39 37 90 72 93 55 72 31 42 30 71 87 61 4 12 12 81 23 61 56 98 71 32 30 33 96 63 92 16 8 78 47 91 47 54 49 3 81 82 41 5",
"output": "47"
},
{
"input": "1\n2",
"output": "1"
},
{
"input": "5\n1 1 3 2 2",
"output": "3"
}
] | 1,560,935,507 | 2,147,483,647 | Python 3 | OK | TESTS | 52 | 218 | 0 | n = int(input())
bags = list(map(int, input().split()))
count = 0
for i in range(n):
if (sum(bags)-bags[i]) % 2 == 0:
count+=1
print(count) | Title: Cookies
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Olga came to visit the twins Anna and Maria and saw that they have many cookies. The cookies are distributed into bags. As there are many cookies, Olga decided that it's no big deal if she steals a bag. However, she doesn't want the sisters to quarrel because of nothing when they divide the cookies. That's why Olga wants to steal a bag with cookies so that the number of cookies in the remaining bags was even, that is, so that Anna and Maria could evenly divide it into two (even 0 remaining cookies will do, just as any other even number). How many ways there are to steal exactly one cookie bag so that the total number of cookies in the remaining bags was even?
Input Specification:
The first line contains the only integer *n* (1<=≤<=*n*<=≤<=100) — the number of cookie bags Anna and Maria have. The second line contains *n* integers *a**i* (1<=≤<=*a**i*<=≤<=100) — the number of cookies in the *i*-th bag.
Output Specification:
Print in the only line the only number — the sought number of ways. If there are no such ways print 0.
Demo Input:
['1\n1\n', '10\n1 2 2 3 4 4 4 2 2 2\n', '11\n2 2 2 2 2 2 2 2 2 2 99\n']
Demo Output:
['1\n', '8\n', '1\n']
Note:
In the first sample Olga should take the only bag so that the twins ended up with the even number of cookies.
In the second sample Olga can take any of five bags with two cookies or any of three bags with four cookies — 5 + 3 = 8 ways in total.
In the third sample, no matter which bag with two cookies Olga chooses, the twins are left with 2 * 9 + 99 = 117 cookies. Thus, Olga has only one option: to take the bag with 99 cookies. | ```python
n = int(input())
bags = list(map(int, input().split()))
count = 0
for i in range(n):
if (sum(bags)-bags[i]) % 2 == 0:
count+=1
print(count)
``` | 3 | |
25 | A | IQ test | PROGRAMMING | 1,300 | [
"brute force"
] | A. IQ test | 2 | 256 | Bob is preparing to pass IQ test. The most frequent task in this test is to find out which one of the given *n* numbers differs from the others. Bob observed that one number usually differs from the others in evenness. Help Bob — to check his answers, he needs a program that among the given *n* numbers finds one that is different in evenness. | The first line contains integer *n* (3<=≤<=*n*<=≤<=100) — amount of numbers in the task. The second line contains *n* space-separated natural numbers, not exceeding 100. It is guaranteed, that exactly one of these numbers differs from the others in evenness. | Output index of number that differs from the others in evenness. Numbers are numbered from 1 in the input order. | [
"5\n2 4 7 8 10\n",
"4\n1 2 1 1\n"
] | [
"3\n",
"2\n"
] | none | 0 | [
{
"input": "5\n2 4 7 8 10",
"output": "3"
},
{
"input": "4\n1 2 1 1",
"output": "2"
},
{
"input": "3\n1 2 2",
"output": "1"
},
{
"input": "3\n100 99 100",
"output": "2"
},
{
"input": "3\n5 3 2",
"output": "3"
},
{
"input": "4\n43 28 1 91",
"output": "2"
},
{
"input": "4\n75 13 94 77",
"output": "3"
},
{
"input": "4\n97 8 27 3",
"output": "2"
},
{
"input": "10\n95 51 12 91 85 3 1 31 25 7",
"output": "3"
},
{
"input": "20\n88 96 66 51 14 88 2 92 18 72 18 88 20 30 4 82 90 100 24 46",
"output": "4"
},
{
"input": "30\n20 94 56 50 10 98 52 32 14 22 24 60 4 8 98 46 34 68 82 82 98 90 50 20 78 49 52 94 64 36",
"output": "26"
},
{
"input": "50\n79 27 77 57 37 45 27 49 65 33 57 21 71 19 75 85 65 61 23 97 85 9 23 1 9 3 99 77 77 21 79 69 15 37 15 7 93 81 13 89 91 31 45 93 15 97 55 80 85 83",
"output": "48"
},
{
"input": "60\n46 11 73 65 3 69 3 53 43 53 97 47 55 93 31 75 35 3 9 73 23 31 3 81 91 79 61 21 15 11 11 11 81 7 83 75 39 87 83 59 89 55 93 27 49 67 67 29 1 93 11 17 9 19 35 21 63 31 31 25",
"output": "1"
},
{
"input": "70\n28 42 42 92 64 54 22 38 38 78 62 38 4 38 14 66 4 92 66 58 94 26 4 44 41 88 48 82 44 26 74 44 48 4 16 92 34 38 26 64 94 4 30 78 50 54 12 90 8 16 80 98 28 100 74 50 36 42 92 18 76 98 8 22 2 50 58 50 64 46",
"output": "25"
},
{
"input": "100\n43 35 79 53 13 91 91 45 65 83 57 9 42 39 85 45 71 51 61 59 31 13 63 39 25 21 79 39 91 67 21 61 97 75 93 83 29 79 59 97 11 37 63 51 39 55 91 23 21 17 47 23 35 75 49 5 69 99 5 7 41 17 25 89 15 79 21 63 53 81 43 91 59 91 69 99 85 15 91 51 49 37 65 7 89 81 21 93 61 63 97 93 45 17 13 69 57 25 75 73",
"output": "13"
},
{
"input": "100\n50 24 68 60 70 30 52 22 18 74 68 98 20 82 4 46 26 68 100 78 84 58 74 98 38 88 68 86 64 80 82 100 20 22 98 98 52 6 94 10 48 68 2 18 38 22 22 82 44 20 66 72 36 58 64 6 36 60 4 96 76 64 12 90 10 58 64 60 74 28 90 26 24 60 40 58 2 16 76 48 58 36 82 60 24 44 4 78 28 38 8 12 40 16 38 6 66 24 31 76",
"output": "99"
},
{
"input": "100\n47 48 94 48 14 18 94 36 96 22 12 30 94 20 48 98 40 58 2 94 8 36 98 18 98 68 2 60 76 38 18 100 8 72 100 68 2 86 92 72 58 16 48 14 6 58 72 76 6 88 80 66 20 28 74 62 86 68 90 86 2 56 34 38 56 90 4 8 76 44 32 86 12 98 38 34 54 92 70 94 10 24 82 66 90 58 62 2 32 58 100 22 58 72 2 22 68 72 42 14",
"output": "1"
},
{
"input": "99\n38 20 68 60 84 16 28 88 60 48 80 28 4 92 70 60 46 46 20 34 12 100 76 2 40 10 8 86 6 80 50 66 12 34 14 28 26 70 46 64 34 96 10 90 98 96 56 88 50 74 70 94 2 94 24 66 68 46 22 30 6 10 64 32 88 14 98 100 64 58 50 18 50 50 8 38 8 16 54 2 60 54 62 84 92 98 4 72 66 26 14 88 99 16 10 6 88 56 22",
"output": "93"
},
{
"input": "99\n50 83 43 89 53 47 69 1 5 37 63 87 95 15 55 95 75 89 33 53 89 75 93 75 11 85 49 29 11 97 49 67 87 11 25 37 97 73 67 49 87 43 53 97 43 29 53 33 45 91 37 73 39 49 59 5 21 43 87 35 5 63 89 57 63 47 29 99 19 85 13 13 3 13 43 19 5 9 61 51 51 57 15 89 13 97 41 13 99 79 13 27 97 95 73 33 99 27 23",
"output": "1"
},
{
"input": "98\n61 56 44 30 58 14 20 24 88 28 46 56 96 52 58 42 94 50 46 30 46 80 72 88 68 16 6 60 26 90 10 98 76 20 56 40 30 16 96 20 88 32 62 30 74 58 36 76 60 4 24 36 42 54 24 92 28 14 2 74 86 90 14 52 34 82 40 76 8 64 2 56 10 8 78 16 70 86 70 42 70 74 22 18 76 98 88 28 62 70 36 72 20 68 34 48 80 98",
"output": "1"
},
{
"input": "98\n66 26 46 42 78 32 76 42 26 82 8 12 4 10 24 26 64 44 100 46 94 64 30 18 88 28 8 66 30 82 82 28 74 52 62 80 80 60 94 86 64 32 44 88 92 20 12 74 94 28 34 58 4 22 16 10 94 76 82 58 40 66 22 6 30 32 92 54 16 76 74 98 18 48 48 30 92 2 16 42 84 74 30 60 64 52 50 26 16 86 58 96 79 60 20 62 82 94",
"output": "93"
},
{
"input": "95\n9 31 27 93 17 77 75 9 9 53 89 39 51 99 5 1 11 39 27 49 91 17 27 79 81 71 37 75 35 13 93 4 99 55 85 11 23 57 5 43 5 61 15 35 23 91 3 81 99 85 43 37 39 27 5 67 7 33 75 59 13 71 51 27 15 93 51 63 91 53 43 99 25 47 17 71 81 15 53 31 59 83 41 23 73 25 91 91 13 17 25 13 55 57 29",
"output": "32"
},
{
"input": "100\n91 89 81 45 53 1 41 3 77 93 55 97 55 97 87 27 69 95 73 41 93 21 75 35 53 56 5 51 87 59 91 67 33 3 99 45 83 17 97 47 75 97 7 89 17 99 23 23 81 25 55 97 27 35 69 5 77 35 93 19 55 59 37 21 31 37 49 41 91 53 73 69 7 37 37 39 17 71 7 97 55 17 47 23 15 73 31 39 57 37 9 5 61 41 65 57 77 79 35 47",
"output": "26"
},
{
"input": "99\n38 56 58 98 80 54 26 90 14 16 78 92 52 74 40 30 84 14 44 80 16 90 98 68 26 24 78 72 42 16 84 40 14 44 2 52 50 2 12 96 58 66 8 80 44 52 34 34 72 98 74 4 66 74 56 21 8 38 76 40 10 22 48 32 98 34 12 62 80 68 64 82 22 78 58 74 20 22 48 56 12 38 32 72 6 16 74 24 94 84 26 38 18 24 76 78 98 94 72",
"output": "56"
},
{
"input": "100\n44 40 6 40 56 90 98 8 36 64 76 86 98 76 36 92 6 30 98 70 24 98 96 60 24 82 88 68 86 96 34 42 58 10 40 26 56 10 88 58 70 32 24 28 14 82 52 12 62 36 70 60 52 34 74 30 78 76 10 16 42 94 66 90 70 38 52 12 58 22 98 96 14 68 24 70 4 30 84 98 8 50 14 52 66 34 100 10 28 100 56 48 38 12 38 14 91 80 70 86",
"output": "97"
},
{
"input": "100\n96 62 64 20 90 46 56 90 68 36 30 56 70 28 16 64 94 34 6 32 34 50 94 22 90 32 40 2 72 10 88 38 28 92 20 26 56 80 4 100 100 90 16 74 74 84 8 2 30 20 80 32 16 46 92 56 42 12 96 64 64 42 64 58 50 42 74 28 2 4 36 32 70 50 54 92 70 16 45 76 28 16 18 50 48 2 62 94 4 12 52 52 4 100 70 60 82 62 98 42",
"output": "79"
},
{
"input": "99\n14 26 34 68 90 58 50 36 8 16 18 6 2 74 54 20 36 84 32 50 52 2 26 24 3 64 20 10 54 26 66 44 28 72 4 96 78 90 96 86 68 28 94 4 12 46 100 32 22 36 84 32 44 94 76 94 4 52 12 30 74 4 34 64 58 72 44 16 70 56 54 8 14 74 8 6 58 62 98 54 14 40 80 20 36 72 28 98 20 58 40 52 90 64 22 48 54 70 52",
"output": "25"
},
{
"input": "95\n82 86 30 78 6 46 80 66 74 72 16 24 18 52 52 38 60 36 86 26 62 28 22 46 96 26 94 84 20 46 66 88 76 32 12 86 74 18 34 88 4 48 94 6 58 6 100 82 4 24 88 32 54 98 34 48 6 76 42 88 42 28 100 4 22 2 10 66 82 54 98 20 60 66 38 98 32 47 86 58 6 100 12 46 2 42 8 84 78 28 24 70 34 28 86",
"output": "78"
},
{
"input": "90\n40 50 8 42 76 24 58 42 26 68 20 48 54 12 34 84 14 36 32 88 6 50 96 56 20 92 48 16 40 34 96 46 20 84 30 50 20 98 8 44 96 42 8 76 70 38 84 30 40 88 84 72 2 22 52 58 16 62 100 66 80 40 50 32 14 62 88 72 22 99 76 50 84 82 8 82 98 46 26 40 2 98 18 78 30 72 70 18 34 68",
"output": "70"
},
{
"input": "80\n81 43 87 1 55 43 53 61 27 19 43 13 89 9 33 83 75 55 97 71 91 37 95 5 21 69 81 93 95 69 31 83 55 7 97 7 79 57 8 61 27 85 49 1 15 97 63 79 29 73 41 85 5 41 31 93 67 11 63 59 15 99 91 77 43 69 23 23 81 73 19 1 67 51 1 75 99 67 3 81",
"output": "39"
},
{
"input": "98\n13 83 61 27 35 1 85 95 97 73 95 65 73 45 5 43 27 83 91 19 11 3 85 59 9 39 69 23 45 7 51 85 5 71 5 95 1 51 75 3 43 57 3 11 33 71 21 99 47 41 87 39 71 87 31 85 91 49 83 5 49 85 47 91 55 99 33 23 31 23 23 73 29 77 55 31 25 5 81 49 91 15 15 39 87 5 9 40 69 47 29 33 11 21 49 79 51 83",
"output": "88"
},
{
"input": "3\n100 100 1",
"output": "3"
}
] | 1,606,628,949 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 2 | 186 | 0 | n = int(input())
data = list(map(int,input().split()))
mymin = min(data)
imin = data[0]
t = True
for i, c in enumerate(data):
if c % mymin != 0:
print(i+1)
t = False
if t:
print(data.index(max(data)) + 1)
| Title: IQ test
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Bob is preparing to pass IQ test. The most frequent task in this test is to find out which one of the given *n* numbers differs from the others. Bob observed that one number usually differs from the others in evenness. Help Bob — to check his answers, he needs a program that among the given *n* numbers finds one that is different in evenness.
Input Specification:
The first line contains integer *n* (3<=≤<=*n*<=≤<=100) — amount of numbers in the task. The second line contains *n* space-separated natural numbers, not exceeding 100. It is guaranteed, that exactly one of these numbers differs from the others in evenness.
Output Specification:
Output index of number that differs from the others in evenness. Numbers are numbered from 1 in the input order.
Demo Input:
['5\n2 4 7 8 10\n', '4\n1 2 1 1\n']
Demo Output:
['3\n', '2\n']
Note:
none | ```python
n = int(input())
data = list(map(int,input().split()))
mymin = min(data)
imin = data[0]
t = True
for i, c in enumerate(data):
if c % mymin != 0:
print(i+1)
t = False
if t:
print(data.index(max(data)) + 1)
``` | 0 |
59 | A | Word | PROGRAMMING | 800 | [
"implementation",
"strings"
] | A. Word | 2 | 256 | Vasya is very upset that many people on the Net mix uppercase and lowercase letters in one word. That's why he decided to invent an extension for his favorite browser that would change the letters' register in every word so that it either only consisted of lowercase letters or, vice versa, only of uppercase ones. At that as little as possible letters should be changed in the word. For example, the word HoUse must be replaced with house, and the word ViP — with VIP. If a word contains an equal number of uppercase and lowercase letters, you should replace all the letters with lowercase ones. For example, maTRIx should be replaced by matrix. Your task is to use the given method on one given word. | The first line contains a word *s* — it consists of uppercase and lowercase Latin letters and possesses the length from 1 to 100. | Print the corrected word *s*. If the given word *s* has strictly more uppercase letters, make the word written in the uppercase register, otherwise - in the lowercase one. | [
"HoUse\n",
"ViP\n",
"maTRIx\n"
] | [
"house\n",
"VIP\n",
"matrix\n"
] | none | 500 | [
{
"input": "HoUse",
"output": "house"
},
{
"input": "ViP",
"output": "VIP"
},
{
"input": "maTRIx",
"output": "matrix"
},
{
"input": "BNHWpnpawg",
"output": "bnhwpnpawg"
},
{
"input": "VTYGP",
"output": "VTYGP"
},
{
"input": "CHNenu",
"output": "chnenu"
},
{
"input": "ERPZGrodyu",
"output": "erpzgrodyu"
},
{
"input": "KSXBXWpebh",
"output": "KSXBXWPEBH"
},
{
"input": "qvxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaiv",
"output": "qvxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaiv"
},
{
"input": "Amnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfd",
"output": "amnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfd"
},
{
"input": "ISAGFJFARYFBLOPQDSHWGMCNKMFTLVFUGNJEWGWNBLXUIATXEkqiettmmjgydwcpafqrppdsrrrtguinqbgmzzfqwonkpgpcwenv",
"output": "isagfjfaryfblopqdshwgmcnkmftlvfugnjewgwnblxuiatxekqiettmmjgydwcpafqrppdsrrrtguinqbgmzzfqwonkpgpcwenv"
},
{
"input": "XHRPXZEGHSOCJPICUIXSKFUZUPYTSGJSDIYBCMNMNBPNDBXLXBzhbfnqvwcffvrdhtickyqhupmcehlsyvncqmfhautvxudqdhgg",
"output": "xhrpxzeghsocjpicuixskfuzupytsgjsdiybcmnmnbpndbxlxbzhbfnqvwcffvrdhtickyqhupmcehlsyvncqmfhautvxudqdhgg"
},
{
"input": "RJIQZMJCIMSNDBOHBRAWIENODSALETAKGKPYUFGVEFGCBRENZGAdkcetqjljtmttlonpekcovdzebzdkzggwfsxhapmjkdbuceak",
"output": "RJIQZMJCIMSNDBOHBRAWIENODSALETAKGKPYUFGVEFGCBRENZGADKCETQJLJTMTTLONPEKCOVDZEBZDKZGGWFSXHAPMJKDBUCEAK"
},
{
"input": "DWLWOBHNMMGTFOLFAECKBRNNGLYLYDXTGTVRLMEESZOIUATZZZXUFUZDLSJXMEVRTESSFBWLNZZCLCQWEVNNUCXYVHNGNXHCBDFw",
"output": "DWLWOBHNMMGTFOLFAECKBRNNGLYLYDXTGTVRLMEESZOIUATZZZXUFUZDLSJXMEVRTESSFBWLNZZCLCQWEVNNUCXYVHNGNXHCBDFW"
},
{
"input": "NYCNHJWGBOCOTSPETKKHVWFGAQYNHOVJWJHCIEFOUQZXOYUIEQDZALFKTEHTVDBVJMEUBJUBCMNVPWGDPNCHQHZJRCHYRFPVIGUB",
"output": "NYCNHJWGBOCOTSPETKKHVWFGAQYNHOVJWJHCIEFOUQZXOYUIEQDZALFKTEHTVDBVJMEUBJUBCMNVPWGDPNCHQHZJRCHYRFPVIGUB"
},
{
"input": "igxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwge",
"output": "igxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwge"
},
{
"input": "Ykkekrsqolzryiwsmdlnbmfautxxxauoojrddvwklgnlyrfcvhorrzbmtcrvpaypqhcffdqhwziipyyskcmztjprjqvmzzqhqnw",
"output": "ykkekrsqolzryiwsmdlnbmfautxxxauoojrddvwklgnlyrfcvhorrzbmtcrvpaypqhcffdqhwziipyyskcmztjprjqvmzzqhqnw"
},
{
"input": "YQOMLKYAORUQQUCQZCDYMIVDHGWZFFRMUVTAWCHERFPMNRYRIkgqrciokgajamehmcxgerpudvsqyonjonsxgbnefftzmygncks",
"output": "yqomlkyaoruqqucqzcdymivdhgwzffrmuvtawcherfpmnryrikgqrciokgajamehmcxgerpudvsqyonjonsxgbnefftzmygncks"
},
{
"input": "CDOZDPBVVVHNBJVBYHEOXWFLJKRWJCAJMIFCOZWWYFKVWOGTVJcuusigdqfkumewjtdyitveeiaybwrhomrwmpdipjwiuxfnwuz",
"output": "CDOZDPBVVVHNBJVBYHEOXWFLJKRWJCAJMIFCOZWWYFKVWOGTVJCUUSIGDQFKUMEWJTDYITVEEIAYBWRHOMRWMPDIPJWIUXFNWUZ"
},
{
"input": "WHIUVEXHVOOIJIDVJVPQUBJMEVPMPDKQWJKFBZSGSKUXMIPPMJWuckzcpxosodcjaaakvlxpbiigsiauviilylnnqlyucziihqg",
"output": "WHIUVEXHVOOIJIDVJVPQUBJMEVPMPDKQWJKFBZSGSKUXMIPPMJWUCKZCPXOSODCJAAAKVLXPBIIGSIAUVIILYLNNQLYUCZIIHQG"
},
{
"input": "VGHUNFOXKETUYMZDJNGTAOIOANYXSGYNFOGOFFLDAWEUKYFOZXCJTCAFXZYLQZERYZLRSQXYQGAPCSUDPMEYTNCTTTMFAGVDWBO",
"output": "VGHUNFOXKETUYMZDJNGTAOIOANYXSGYNFOGOFFLDAWEUKYFOZXCJTCAFXZYLQZERYZLRSQXYQGAPCSUDPMEYTNCTTTMFAGVDWBO"
},
{
"input": "EDUANHCQDOCJHFONTTSWBUJSTTIXBIXMAIUFSGFLXWAYIURTVAVZPYQDLAWIGCLMPHXCEFCJPFAAHXVNGQUFNHADAIUAZIDMHDd",
"output": "EDUANHCQDOCJHFONTTSWBUJSTTIXBIXMAIUFSGFLXWAYIURTVAVZPYQDLAWIGCLMPHXCEFCJPFAAHXVNGQUFNHADAIUAZIDMHDD"
},
{
"input": "EBWOVSNLYTWWXrnovgugogtjahnmatomubebyxakas",
"output": "ebwovsnlytwwxrnovgugogtjahnmatomubebyxakas"
},
{
"input": "AORNNDKTRLRVGDPXJKXFTPFpopuzrlqumrxssskvbm",
"output": "AORNNDKTRLRVGDPXJKXFTPFPOPUZRLQUMRXSSSKVBM"
},
{
"input": "DBBZJCWQEVGYHEEUHJAWRHBDPsnplijbwtdibqrrheebfxqcvn",
"output": "dbbzjcwqevgyheeuhjawrhbdpsnplijbwtdibqrrheebfxqcvn"
},
{
"input": "t",
"output": "t"
},
{
"input": "N",
"output": "N"
},
{
"input": "kv",
"output": "kv"
},
{
"input": "Ur",
"output": "ur"
},
{
"input": "CN",
"output": "CN"
}
] | 1,614,409,298 | 2,147,483,647 | Python 3 | OK | TESTS | 30 | 154 | 0 | a = input()
upper =[]
lower= []
for char in a:
if char == char.upper():
upper.append(char)
else:
lower.append(char)
if len(upper)>len(lower):
print(a.upper())
else:
print(a.lower()) | Title: Word
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Vasya is very upset that many people on the Net mix uppercase and lowercase letters in one word. That's why he decided to invent an extension for his favorite browser that would change the letters' register in every word so that it either only consisted of lowercase letters or, vice versa, only of uppercase ones. At that as little as possible letters should be changed in the word. For example, the word HoUse must be replaced with house, and the word ViP — with VIP. If a word contains an equal number of uppercase and lowercase letters, you should replace all the letters with lowercase ones. For example, maTRIx should be replaced by matrix. Your task is to use the given method on one given word.
Input Specification:
The first line contains a word *s* — it consists of uppercase and lowercase Latin letters and possesses the length from 1 to 100.
Output Specification:
Print the corrected word *s*. If the given word *s* has strictly more uppercase letters, make the word written in the uppercase register, otherwise - in the lowercase one.
Demo Input:
['HoUse\n', 'ViP\n', 'maTRIx\n']
Demo Output:
['house\n', 'VIP\n', 'matrix\n']
Note:
none | ```python
a = input()
upper =[]
lower= []
for char in a:
if char == char.upper():
upper.append(char)
else:
lower.append(char)
if len(upper)>len(lower):
print(a.upper())
else:
print(a.lower())
``` | 3.9615 |
279 | E | Beautiful Decomposition | PROGRAMMING | 1,900 | [
"dp",
"games",
"greedy",
"number theory"
] | null | null | Valera considers a number beautiful, if it equals 2*k* or -2*k* for some integer *k* (*k*<=≥<=0). Recently, the math teacher asked Valera to represent number *n* as the sum of beautiful numbers. As Valera is really greedy, he wants to complete the task using as few beautiful numbers as possible.
Help Valera and find, how many numbers he is going to need. In other words, if you look at all decompositions of the number *n* into beautiful summands, you need to find the size of the decomposition which has the fewest summands. | The first line contains string *s* (1<=≤<=|*s*|<=≤<=106), that is the binary representation of number *n* without leading zeroes (*n*<=><=0). | Print a single integer — the minimum amount of beautiful numbers that give a total of *n*. | [
"10\n",
"111\n",
"1101101\n"
] | [
"1\n",
"2\n",
"4\n"
] | In the first sample *n* = 2 is a beautiful number.
In the second sample *n* = 7 and Valera can decompose it into sum 2<sup class="upper-index">3</sup> + ( - 2<sup class="upper-index">0</sup>).
In the third sample *n* = 109 can be decomposed into the sum of four summands as follows: 2<sup class="upper-index">7</sup> + ( - 2<sup class="upper-index">4</sup>) + ( - 2<sup class="upper-index">2</sup>) + 2<sup class="upper-index">0</sup>. | 2,000 | [] | 1,678,765,847 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 0 | 30 | 0 | num = int(input())
num1, num0 = 0, 0
while num != 0:
num1 += (num&1)
num0 += ((num&1) ^ 1)
num >>= 1
if num0 < num1-2:
print(num0+2)
else:
print(num1)
| Title: Beautiful Decomposition
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Valera considers a number beautiful, if it equals 2*k* or -2*k* for some integer *k* (*k*<=≥<=0). Recently, the math teacher asked Valera to represent number *n* as the sum of beautiful numbers. As Valera is really greedy, he wants to complete the task using as few beautiful numbers as possible.
Help Valera and find, how many numbers he is going to need. In other words, if you look at all decompositions of the number *n* into beautiful summands, you need to find the size of the decomposition which has the fewest summands.
Input Specification:
The first line contains string *s* (1<=≤<=|*s*|<=≤<=106), that is the binary representation of number *n* without leading zeroes (*n*<=><=0).
Output Specification:
Print a single integer — the minimum amount of beautiful numbers that give a total of *n*.
Demo Input:
['10\n', '111\n', '1101101\n']
Demo Output:
['1\n', '2\n', '4\n']
Note:
In the first sample *n* = 2 is a beautiful number.
In the second sample *n* = 7 and Valera can decompose it into sum 2<sup class="upper-index">3</sup> + ( - 2<sup class="upper-index">0</sup>).
In the third sample *n* = 109 can be decomposed into the sum of four summands as follows: 2<sup class="upper-index">7</sup> + ( - 2<sup class="upper-index">4</sup>) + ( - 2<sup class="upper-index">2</sup>) + 2<sup class="upper-index">0</sup>. | ```python
num = int(input())
num1, num0 = 0, 0
while num != 0:
num1 += (num&1)
num0 += ((num&1) ^ 1)
num >>= 1
if num0 < num1-2:
print(num0+2)
else:
print(num1)
``` | 0 | |
660 | B | Seating On Bus | PROGRAMMING | 1,000 | [
"implementation"
] | null | null | Consider 2*n* rows of the seats in a bus. *n* rows of the seats on the left and *n* rows of the seats on the right. Each row can be filled by two people. So the total capacity of the bus is 4*n*.
Consider that *m* (*m*<=≤<=4*n*) people occupy the seats in the bus. The passengers entering the bus are numbered from 1 to *m* (in the order of their entering the bus). The pattern of the seat occupation is as below:
1-st row left window seat, 1-st row right window seat, 2-nd row left window seat, 2-nd row right window seat, ... , *n*-th row left window seat, *n*-th row right window seat.
After occupying all the window seats (for *m*<=><=2*n*) the non-window seats are occupied:
1-st row left non-window seat, 1-st row right non-window seat, ... , *n*-th row left non-window seat, *n*-th row right non-window seat.
All the passengers go to a single final destination. In the final destination, the passengers get off in the given order.
1-st row left non-window seat, 1-st row left window seat, 1-st row right non-window seat, 1-st row right window seat, ... , *n*-th row left non-window seat, *n*-th row left window seat, *n*-th row right non-window seat, *n*-th row right window seat.
You are given the values *n* and *m*. Output *m* numbers from 1 to *m*, the order in which the passengers will get off the bus. | The only line contains two integers, *n* and *m* (1<=≤<=*n*<=≤<=100,<=1<=≤<=*m*<=≤<=4*n*) — the number of pairs of rows and the number of passengers. | Print *m* distinct integers from 1 to *m* — the order in which the passengers will get off the bus. | [
"2 7\n",
"9 36\n"
] | [
"5 1 6 2 7 3 4\n",
"19 1 20 2 21 3 22 4 23 5 24 6 25 7 26 8 27 9 28 10 29 11 30 12 31 13 32 14 33 15 34 16 35 17 36 18\n"
] | none | 0 | [
{
"input": "2 7",
"output": "5 1 6 2 7 3 4"
},
{
"input": "9 36",
"output": "19 1 20 2 21 3 22 4 23 5 24 6 25 7 26 8 27 9 28 10 29 11 30 12 31 13 32 14 33 15 34 16 35 17 36 18"
},
{
"input": "1 1",
"output": "1"
},
{
"input": "1 4",
"output": "3 1 4 2"
},
{
"input": "10 1",
"output": "1"
},
{
"input": "10 10",
"output": "1 2 3 4 5 6 7 8 9 10"
},
{
"input": "10 40",
"output": "21 1 22 2 23 3 24 4 25 5 26 6 27 7 28 8 29 9 30 10 31 11 32 12 33 13 34 14 35 15 36 16 37 17 38 18 39 19 40 20"
},
{
"input": "10 39",
"output": "21 1 22 2 23 3 24 4 25 5 26 6 27 7 28 8 29 9 30 10 31 11 32 12 33 13 34 14 35 15 36 16 37 17 38 18 39 19 20"
},
{
"input": "77 1",
"output": "1"
},
{
"input": "77 13",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13"
},
{
"input": "77 53",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53"
},
{
"input": "77 280",
"output": "155 1 156 2 157 3 158 4 159 5 160 6 161 7 162 8 163 9 164 10 165 11 166 12 167 13 168 14 169 15 170 16 171 17 172 18 173 19 174 20 175 21 176 22 177 23 178 24 179 25 180 26 181 27 182 28 183 29 184 30 185 31 186 32 187 33 188 34 189 35 190 36 191 37 192 38 193 39 194 40 195 41 196 42 197 43 198 44 199 45 200 46 201 47 202 48 203 49 204 50 205 51 206 52 207 53 208 54 209 55 210 56 211 57 212 58 213 59 214 60 215 61 216 62 217 63 218 64 219 65 220 66 221 67 222 68 223 69 224 70 225 71 226 72 227 73 228 74 22..."
},
{
"input": "100 1",
"output": "1"
},
{
"input": "100 13",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13"
},
{
"input": "100 77",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77"
},
{
"input": "100 103",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103"
},
{
"input": "100 200",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 155..."
},
{
"input": "100 199",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 155..."
},
{
"input": "100 201",
"output": "201 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "100 300",
"output": "201 1 202 2 203 3 204 4 205 5 206 6 207 7 208 8 209 9 210 10 211 11 212 12 213 13 214 14 215 15 216 16 217 17 218 18 219 19 220 20 221 21 222 22 223 23 224 24 225 25 226 26 227 27 228 28 229 29 230 30 231 31 232 32 233 33 234 34 235 35 236 36 237 37 238 38 239 39 240 40 241 41 242 42 243 43 244 44 245 45 246 46 247 47 248 48 249 49 250 50 251 51 252 52 253 53 254 54 255 55 256 56 257 57 258 58 259 59 260 60 261 61 262 62 263 63 264 64 265 65 266 66 267 67 268 68 269 69 270 70 271 71 272 72 273 73 274 74 27..."
},
{
"input": "100 399",
"output": "201 1 202 2 203 3 204 4 205 5 206 6 207 7 208 8 209 9 210 10 211 11 212 12 213 13 214 14 215 15 216 16 217 17 218 18 219 19 220 20 221 21 222 22 223 23 224 24 225 25 226 26 227 27 228 28 229 29 230 30 231 31 232 32 233 33 234 34 235 35 236 36 237 37 238 38 239 39 240 40 241 41 242 42 243 43 244 44 245 45 246 46 247 47 248 48 249 49 250 50 251 51 252 52 253 53 254 54 255 55 256 56 257 57 258 58 259 59 260 60 261 61 262 62 263 63 264 64 265 65 266 66 267 67 268 68 269 69 270 70 271 71 272 72 273 73 274 74 27..."
},
{
"input": "100 400",
"output": "201 1 202 2 203 3 204 4 205 5 206 6 207 7 208 8 209 9 210 10 211 11 212 12 213 13 214 14 215 15 216 16 217 17 218 18 219 19 220 20 221 21 222 22 223 23 224 24 225 25 226 26 227 27 228 28 229 29 230 30 231 31 232 32 233 33 234 34 235 35 236 36 237 37 238 38 239 39 240 40 241 41 242 42 243 43 244 44 245 45 246 46 247 47 248 48 249 49 250 50 251 51 252 52 253 53 254 54 255 55 256 56 257 57 258 58 259 59 260 60 261 61 262 62 263 63 264 64 265 65 266 66 267 67 268 68 269 69 270 70 271 71 272 72 273 73 274 74 27..."
},
{
"input": "3 9",
"output": "7 1 8 2 9 3 4 5 6"
}
] | 1,564,726,531 | 2,147,483,647 | PyPy 3 | WRONG_ANSWER | TESTS | 5 | 140 | 0 | n, m = map(int, input().split())
a = []
w = 1
w1 = 0
for i in range(m):
w1 += i + 1
for i in range(n * 2 + 1, m + 1):
for j in range(w, n * 2 + 1):
a.append(i)
a.append(j)
w += 1
break
if m % 2 == 0:
print(*a)
else:
a.append(abs(sum(a) - w1))
print(*a)
| Title: Seating On Bus
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Consider 2*n* rows of the seats in a bus. *n* rows of the seats on the left and *n* rows of the seats on the right. Each row can be filled by two people. So the total capacity of the bus is 4*n*.
Consider that *m* (*m*<=≤<=4*n*) people occupy the seats in the bus. The passengers entering the bus are numbered from 1 to *m* (in the order of their entering the bus). The pattern of the seat occupation is as below:
1-st row left window seat, 1-st row right window seat, 2-nd row left window seat, 2-nd row right window seat, ... , *n*-th row left window seat, *n*-th row right window seat.
After occupying all the window seats (for *m*<=><=2*n*) the non-window seats are occupied:
1-st row left non-window seat, 1-st row right non-window seat, ... , *n*-th row left non-window seat, *n*-th row right non-window seat.
All the passengers go to a single final destination. In the final destination, the passengers get off in the given order.
1-st row left non-window seat, 1-st row left window seat, 1-st row right non-window seat, 1-st row right window seat, ... , *n*-th row left non-window seat, *n*-th row left window seat, *n*-th row right non-window seat, *n*-th row right window seat.
You are given the values *n* and *m*. Output *m* numbers from 1 to *m*, the order in which the passengers will get off the bus.
Input Specification:
The only line contains two integers, *n* and *m* (1<=≤<=*n*<=≤<=100,<=1<=≤<=*m*<=≤<=4*n*) — the number of pairs of rows and the number of passengers.
Output Specification:
Print *m* distinct integers from 1 to *m* — the order in which the passengers will get off the bus.
Demo Input:
['2 7\n', '9 36\n']
Demo Output:
['5 1 6 2 7 3 4\n', '19 1 20 2 21 3 22 4 23 5 24 6 25 7 26 8 27 9 28 10 29 11 30 12 31 13 32 14 33 15 34 16 35 17 36 18\n']
Note:
none | ```python
n, m = map(int, input().split())
a = []
w = 1
w1 = 0
for i in range(m):
w1 += i + 1
for i in range(n * 2 + 1, m + 1):
for j in range(w, n * 2 + 1):
a.append(i)
a.append(j)
w += 1
break
if m % 2 == 0:
print(*a)
else:
a.append(abs(sum(a) - w1))
print(*a)
``` | 0 | |
808 | A | Lucky Year | PROGRAMMING | 900 | [
"implementation"
] | null | null | Apart from having lots of holidays throughout the year, residents of Berland also have whole lucky years. Year is considered lucky if it has no more than 1 non-zero digit in its number. So years 100, 40000, 5 are lucky and 12, 3001 and 12345 are not.
You are given current year in Berland. Your task is to find how long will residents of Berland wait till the next lucky year. | The first line contains integer number *n* (1<=≤<=*n*<=≤<=109) — current year in Berland. | Output amount of years from the current year to the next lucky one. | [
"4\n",
"201\n",
"4000\n"
] | [
"1\n",
"99\n",
"1000\n"
] | In the first example next lucky year is 5. In the second one — 300. In the third — 5000. | 0 | [
{
"input": "4",
"output": "1"
},
{
"input": "201",
"output": "99"
},
{
"input": "4000",
"output": "1000"
},
{
"input": "9",
"output": "1"
},
{
"input": "10",
"output": "10"
},
{
"input": "1",
"output": "1"
},
{
"input": "100000000",
"output": "100000000"
},
{
"input": "900000000",
"output": "100000000"
},
{
"input": "999999999",
"output": "1"
},
{
"input": "1000000000",
"output": "1000000000"
},
{
"input": "9999999",
"output": "1"
},
{
"input": "100000001",
"output": "99999999"
},
{
"input": "3660",
"output": "340"
},
{
"input": "21",
"output": "9"
},
{
"input": "900000001",
"output": "99999999"
},
{
"input": "62911",
"output": "7089"
},
{
"input": "11",
"output": "9"
},
{
"input": "940302010",
"output": "59697990"
},
{
"input": "91",
"output": "9"
},
{
"input": "101",
"output": "99"
},
{
"input": "1090",
"output": "910"
},
{
"input": "987654321",
"output": "12345679"
},
{
"input": "703450474",
"output": "96549526"
},
{
"input": "1091",
"output": "909"
},
{
"input": "89",
"output": "1"
},
{
"input": "109",
"output": "91"
},
{
"input": "190",
"output": "10"
},
{
"input": "19",
"output": "1"
},
{
"input": "8",
"output": "1"
},
{
"input": "482",
"output": "18"
},
{
"input": "1",
"output": "1"
},
{
"input": "2",
"output": "1"
},
{
"input": "3",
"output": "1"
},
{
"input": "4",
"output": "1"
},
{
"input": "5",
"output": "1"
},
{
"input": "6",
"output": "1"
},
{
"input": "7",
"output": "1"
},
{
"input": "8",
"output": "1"
},
{
"input": "9",
"output": "1"
},
{
"input": "10",
"output": "10"
},
{
"input": "11",
"output": "9"
},
{
"input": "12",
"output": "8"
},
{
"input": "13",
"output": "7"
},
{
"input": "14",
"output": "6"
},
{
"input": "15",
"output": "5"
},
{
"input": "16",
"output": "4"
},
{
"input": "17",
"output": "3"
},
{
"input": "18",
"output": "2"
},
{
"input": "19",
"output": "1"
},
{
"input": "20",
"output": "10"
},
{
"input": "21",
"output": "9"
},
{
"input": "22",
"output": "8"
},
{
"input": "23",
"output": "7"
},
{
"input": "24",
"output": "6"
},
{
"input": "25",
"output": "5"
},
{
"input": "26",
"output": "4"
},
{
"input": "27",
"output": "3"
},
{
"input": "28",
"output": "2"
},
{
"input": "29",
"output": "1"
},
{
"input": "30",
"output": "10"
},
{
"input": "31",
"output": "9"
},
{
"input": "32",
"output": "8"
},
{
"input": "33",
"output": "7"
},
{
"input": "34",
"output": "6"
},
{
"input": "35",
"output": "5"
},
{
"input": "36",
"output": "4"
},
{
"input": "37",
"output": "3"
},
{
"input": "38",
"output": "2"
},
{
"input": "39",
"output": "1"
},
{
"input": "40",
"output": "10"
},
{
"input": "41",
"output": "9"
},
{
"input": "42",
"output": "8"
},
{
"input": "43",
"output": "7"
},
{
"input": "44",
"output": "6"
},
{
"input": "45",
"output": "5"
},
{
"input": "46",
"output": "4"
},
{
"input": "47",
"output": "3"
},
{
"input": "48",
"output": "2"
},
{
"input": "49",
"output": "1"
},
{
"input": "50",
"output": "10"
},
{
"input": "51",
"output": "9"
},
{
"input": "52",
"output": "8"
},
{
"input": "53",
"output": "7"
},
{
"input": "54",
"output": "6"
},
{
"input": "55",
"output": "5"
},
{
"input": "56",
"output": "4"
},
{
"input": "57",
"output": "3"
},
{
"input": "58",
"output": "2"
},
{
"input": "59",
"output": "1"
},
{
"input": "60",
"output": "10"
},
{
"input": "61",
"output": "9"
},
{
"input": "62",
"output": "8"
},
{
"input": "63",
"output": "7"
},
{
"input": "64",
"output": "6"
},
{
"input": "65",
"output": "5"
},
{
"input": "66",
"output": "4"
},
{
"input": "67",
"output": "3"
},
{
"input": "68",
"output": "2"
},
{
"input": "69",
"output": "1"
},
{
"input": "70",
"output": "10"
},
{
"input": "71",
"output": "9"
},
{
"input": "72",
"output": "8"
},
{
"input": "73",
"output": "7"
},
{
"input": "74",
"output": "6"
},
{
"input": "75",
"output": "5"
},
{
"input": "76",
"output": "4"
},
{
"input": "77",
"output": "3"
},
{
"input": "78",
"output": "2"
},
{
"input": "79",
"output": "1"
},
{
"input": "80",
"output": "10"
},
{
"input": "81",
"output": "9"
},
{
"input": "82",
"output": "8"
},
{
"input": "83",
"output": "7"
},
{
"input": "84",
"output": "6"
},
{
"input": "85",
"output": "5"
},
{
"input": "86",
"output": "4"
},
{
"input": "87",
"output": "3"
},
{
"input": "88",
"output": "2"
},
{
"input": "89",
"output": "1"
},
{
"input": "90",
"output": "10"
},
{
"input": "91",
"output": "9"
},
{
"input": "92",
"output": "8"
},
{
"input": "93",
"output": "7"
},
{
"input": "94",
"output": "6"
},
{
"input": "95",
"output": "5"
},
{
"input": "96",
"output": "4"
},
{
"input": "97",
"output": "3"
},
{
"input": "98",
"output": "2"
},
{
"input": "99",
"output": "1"
},
{
"input": "100",
"output": "100"
},
{
"input": "100",
"output": "100"
},
{
"input": "100",
"output": "100"
},
{
"input": "1000",
"output": "1000"
},
{
"input": "1000",
"output": "1000"
},
{
"input": "1000",
"output": "1000"
},
{
"input": "10000",
"output": "10000"
},
{
"input": "10000",
"output": "10000"
},
{
"input": "101",
"output": "99"
},
{
"input": "110",
"output": "90"
},
{
"input": "1001",
"output": "999"
},
{
"input": "1100",
"output": "900"
},
{
"input": "1010",
"output": "990"
},
{
"input": "10010",
"output": "9990"
},
{
"input": "10100",
"output": "9900"
},
{
"input": "102",
"output": "98"
},
{
"input": "120",
"output": "80"
},
{
"input": "1002",
"output": "998"
},
{
"input": "1200",
"output": "800"
},
{
"input": "1020",
"output": "980"
},
{
"input": "10020",
"output": "9980"
},
{
"input": "10200",
"output": "9800"
},
{
"input": "108",
"output": "92"
},
{
"input": "180",
"output": "20"
},
{
"input": "1008",
"output": "992"
},
{
"input": "1800",
"output": "200"
},
{
"input": "1080",
"output": "920"
},
{
"input": "10080",
"output": "9920"
},
{
"input": "10800",
"output": "9200"
},
{
"input": "109",
"output": "91"
},
{
"input": "190",
"output": "10"
},
{
"input": "1009",
"output": "991"
},
{
"input": "1900",
"output": "100"
},
{
"input": "1090",
"output": "910"
},
{
"input": "10090",
"output": "9910"
},
{
"input": "10900",
"output": "9100"
},
{
"input": "200",
"output": "100"
},
{
"input": "200",
"output": "100"
},
{
"input": "2000",
"output": "1000"
},
{
"input": "2000",
"output": "1000"
},
{
"input": "2000",
"output": "1000"
},
{
"input": "20000",
"output": "10000"
},
{
"input": "20000",
"output": "10000"
},
{
"input": "201",
"output": "99"
},
{
"input": "210",
"output": "90"
},
{
"input": "2001",
"output": "999"
},
{
"input": "2100",
"output": "900"
},
{
"input": "2010",
"output": "990"
},
{
"input": "20010",
"output": "9990"
},
{
"input": "20100",
"output": "9900"
},
{
"input": "202",
"output": "98"
},
{
"input": "220",
"output": "80"
},
{
"input": "2002",
"output": "998"
},
{
"input": "2200",
"output": "800"
},
{
"input": "2020",
"output": "980"
},
{
"input": "20020",
"output": "9980"
},
{
"input": "20200",
"output": "9800"
},
{
"input": "208",
"output": "92"
},
{
"input": "280",
"output": "20"
},
{
"input": "2008",
"output": "992"
},
{
"input": "2800",
"output": "200"
},
{
"input": "2080",
"output": "920"
},
{
"input": "20080",
"output": "9920"
},
{
"input": "20800",
"output": "9200"
},
{
"input": "209",
"output": "91"
},
{
"input": "290",
"output": "10"
},
{
"input": "2009",
"output": "991"
},
{
"input": "2900",
"output": "100"
},
{
"input": "2090",
"output": "910"
},
{
"input": "20090",
"output": "9910"
},
{
"input": "20900",
"output": "9100"
},
{
"input": "800",
"output": "100"
},
{
"input": "800",
"output": "100"
},
{
"input": "8000",
"output": "1000"
},
{
"input": "8000",
"output": "1000"
},
{
"input": "8000",
"output": "1000"
},
{
"input": "80000",
"output": "10000"
},
{
"input": "80000",
"output": "10000"
},
{
"input": "801",
"output": "99"
},
{
"input": "810",
"output": "90"
},
{
"input": "8001",
"output": "999"
},
{
"input": "8100",
"output": "900"
},
{
"input": "8010",
"output": "990"
},
{
"input": "80010",
"output": "9990"
},
{
"input": "80100",
"output": "9900"
},
{
"input": "802",
"output": "98"
},
{
"input": "820",
"output": "80"
},
{
"input": "8002",
"output": "998"
},
{
"input": "8200",
"output": "800"
},
{
"input": "8020",
"output": "980"
},
{
"input": "80020",
"output": "9980"
},
{
"input": "80200",
"output": "9800"
},
{
"input": "808",
"output": "92"
},
{
"input": "880",
"output": "20"
},
{
"input": "8008",
"output": "992"
},
{
"input": "8800",
"output": "200"
},
{
"input": "8080",
"output": "920"
},
{
"input": "80080",
"output": "9920"
},
{
"input": "80800",
"output": "9200"
},
{
"input": "809",
"output": "91"
},
{
"input": "890",
"output": "10"
},
{
"input": "8009",
"output": "991"
},
{
"input": "8900",
"output": "100"
},
{
"input": "8090",
"output": "910"
},
{
"input": "80090",
"output": "9910"
},
{
"input": "80900",
"output": "9100"
},
{
"input": "900",
"output": "100"
},
{
"input": "900",
"output": "100"
},
{
"input": "9000",
"output": "1000"
},
{
"input": "9000",
"output": "1000"
},
{
"input": "9000",
"output": "1000"
},
{
"input": "90000",
"output": "10000"
},
{
"input": "90000",
"output": "10000"
},
{
"input": "901",
"output": "99"
},
{
"input": "910",
"output": "90"
},
{
"input": "9001",
"output": "999"
},
{
"input": "9100",
"output": "900"
},
{
"input": "9010",
"output": "990"
},
{
"input": "90010",
"output": "9990"
},
{
"input": "90100",
"output": "9900"
},
{
"input": "902",
"output": "98"
},
{
"input": "920",
"output": "80"
},
{
"input": "9002",
"output": "998"
},
{
"input": "9200",
"output": "800"
},
{
"input": "9020",
"output": "980"
},
{
"input": "90020",
"output": "9980"
},
{
"input": "90200",
"output": "9800"
},
{
"input": "908",
"output": "92"
},
{
"input": "980",
"output": "20"
},
{
"input": "9008",
"output": "992"
},
{
"input": "9800",
"output": "200"
},
{
"input": "9080",
"output": "920"
},
{
"input": "90080",
"output": "9920"
},
{
"input": "90800",
"output": "9200"
},
{
"input": "909",
"output": "91"
},
{
"input": "990",
"output": "10"
},
{
"input": "9009",
"output": "991"
},
{
"input": "9900",
"output": "100"
},
{
"input": "9090",
"output": "910"
},
{
"input": "90090",
"output": "9910"
},
{
"input": "90900",
"output": "9100"
},
{
"input": "92651241",
"output": "7348759"
}
] | 1,690,958,160 | 2,147,483,647 | Python 3 | OK | TESTS | 271 | 46 | 0 | t=int(input())
k=str(t)
print(10**(len(k)-1)-t%10**(len(k)-1))
| Title: Lucky Year
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Apart from having lots of holidays throughout the year, residents of Berland also have whole lucky years. Year is considered lucky if it has no more than 1 non-zero digit in its number. So years 100, 40000, 5 are lucky and 12, 3001 and 12345 are not.
You are given current year in Berland. Your task is to find how long will residents of Berland wait till the next lucky year.
Input Specification:
The first line contains integer number *n* (1<=≤<=*n*<=≤<=109) — current year in Berland.
Output Specification:
Output amount of years from the current year to the next lucky one.
Demo Input:
['4\n', '201\n', '4000\n']
Demo Output:
['1\n', '99\n', '1000\n']
Note:
In the first example next lucky year is 5. In the second one — 300. In the third — 5000. | ```python
t=int(input())
k=str(t)
print(10**(len(k)-1)-t%10**(len(k)-1))
``` | 3 | |
496 | B | Secret Combination | PROGRAMMING | 1,500 | [
"brute force",
"constructive algorithms",
"implementation"
] | null | null | You got a box with a combination lock. The lock has a display showing *n* digits. There are two buttons on the box, each button changes digits on the display. You have quickly discovered that the first button adds 1 to all the digits (all digits 9 become digits 0), and the second button shifts all the digits on the display one position to the right (the last digit becomes the first one). For example, if the display is currently showing number 579, then if we push the first button, the display will show 680, and if after that we push the second button, the display will show 068.
You know that the lock will open if the display is showing the smallest possible number that can be obtained by pushing the buttons in some order. The leading zeros are ignored while comparing numbers. Now your task is to find the desired number. | The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of digits on the display.
The second line contains *n* digits — the initial state of the display. | Print a single line containing *n* digits — the desired state of the display containing the smallest possible number. | [
"3\n579\n",
"4\n2014\n"
] | [
"024\n",
"0142\n"
] | none | 1,000 | [
{
"input": "3\n579",
"output": "024"
},
{
"input": "4\n2014",
"output": "0142"
},
{
"input": "1\n1",
"output": "0"
},
{
"input": "3\n039",
"output": "014"
},
{
"input": "4\n4444",
"output": "0000"
},
{
"input": "5\n46802",
"output": "02468"
},
{
"input": "10\n4447444444",
"output": "0000000003"
},
{
"input": "10\n5810438174",
"output": "0147609473"
},
{
"input": "30\n027027027027027027027027027027",
"output": "027027027027027027027027027027"
},
{
"input": "50\n41012516454101251645410125164541012516454101251645",
"output": "01076781720107678172010767817201076781720107678172"
},
{
"input": "72\n464553044645330446455304464553064645530445455304464553044645530446455304",
"output": "001011960020119600201196002011960020119600201996002011960020119620201196"
},
{
"input": "100\n2144315253572020279108092911160072328496568665545836825277616363478721946398140227406814602154768031",
"output": "0005996121738545755443472571416650525236761083528703911639570359104365792010332041424619191680979818"
},
{
"input": "200\n79025531557298703099245700860027432585447902553155729870309924570086002743258544790255315572987030992457008600274325854479025531557298703099245700860027432585447902553155729870309924570086002743258544",
"output": "00274325854479025531557298703099245700860027432585447902553155729870309924570086002743258544790255315572987030992457008600274325854479025531557298703099245700860027432585447902553155729870309924570086"
},
{
"input": "100\n6669666666666666666866266666666666666666666666666666666666666666626666666666666966666766665667666656",
"output": "0000000000000000000000000000000000000000006000000000000030000010000900100009000030000000000000002006"
},
{
"input": "1\n0",
"output": "0"
}
] | 1,490,555,588 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 2 | 61 | 4,608,000 | a=int(input())
b=input()
mn=int(b)
for i in range(a-1):
b=b[1:]+b[0]
mn=min(mn,int(b))
for j in range(9):
x=''
for m in b:
x+=str(int(m)+1)[-1]
b=x
for i in range(a-1):
b=b[1:]+b[0]
mn=min(mn,int(b))
print('0'*(a-len(str(mn)))+str(mn))
| Title: Secret Combination
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You got a box with a combination lock. The lock has a display showing *n* digits. There are two buttons on the box, each button changes digits on the display. You have quickly discovered that the first button adds 1 to all the digits (all digits 9 become digits 0), and the second button shifts all the digits on the display one position to the right (the last digit becomes the first one). For example, if the display is currently showing number 579, then if we push the first button, the display will show 680, and if after that we push the second button, the display will show 068.
You know that the lock will open if the display is showing the smallest possible number that can be obtained by pushing the buttons in some order. The leading zeros are ignored while comparing numbers. Now your task is to find the desired number.
Input Specification:
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of digits on the display.
The second line contains *n* digits — the initial state of the display.
Output Specification:
Print a single line containing *n* digits — the desired state of the display containing the smallest possible number.
Demo Input:
['3\n579\n', '4\n2014\n']
Demo Output:
['024\n', '0142\n']
Note:
none | ```python
a=int(input())
b=input()
mn=int(b)
for i in range(a-1):
b=b[1:]+b[0]
mn=min(mn,int(b))
for j in range(9):
x=''
for m in b:
x+=str(int(m)+1)[-1]
b=x
for i in range(a-1):
b=b[1:]+b[0]
mn=min(mn,int(b))
print('0'*(a-len(str(mn)))+str(mn))
``` | 0 | |
835 | A | Key races | PROGRAMMING | 800 | [
"math"
] | null | null | Two boys decided to compete in text typing on the site "Key races". During the competition, they have to type a text consisting of *s* characters. The first participant types one character in *v*1 milliseconds and has ping *t*1 milliseconds. The second participant types one character in *v*2 milliseconds and has ping *t*2 milliseconds.
If connection ping (delay) is *t* milliseconds, the competition passes for a participant as follows:
1. Exactly after *t* milliseconds after the start of the competition the participant receives the text to be entered. 1. Right after that he starts to type it. 1. Exactly *t* milliseconds after he ends typing all the text, the site receives information about it.
The winner is the participant whose information on the success comes earlier. If the information comes from both participants at the same time, it is considered that there is a draw.
Given the length of the text and the information about participants, determine the result of the game. | The first line contains five integers *s*, *v*1, *v*2, *t*1, *t*2 (1<=≤<=*s*,<=*v*1,<=*v*2,<=*t*1,<=*t*2<=≤<=1000) — the number of characters in the text, the time of typing one character for the first participant, the time of typing one character for the the second participant, the ping of the first participant and the ping of the second participant. | If the first participant wins, print "First". If the second participant wins, print "Second". In case of a draw print "Friendship". | [
"5 1 2 1 2\n",
"3 3 1 1 1\n",
"4 5 3 1 5\n"
] | [
"First\n",
"Second\n",
"Friendship\n"
] | In the first example, information on the success of the first participant comes in 7 milliseconds, of the second participant — in 14 milliseconds. So, the first wins.
In the second example, information on the success of the first participant comes in 11 milliseconds, of the second participant — in 5 milliseconds. So, the second wins.
In the third example, information on the success of the first participant comes in 22 milliseconds, of the second participant — in 22 milliseconds. So, it is be a draw. | 500 | [
{
"input": "5 1 2 1 2",
"output": "First"
},
{
"input": "3 3 1 1 1",
"output": "Second"
},
{
"input": "4 5 3 1 5",
"output": "Friendship"
},
{
"input": "1000 1000 1000 1000 1000",
"output": "Friendship"
},
{
"input": "1 1 1 1 1",
"output": "Friendship"
},
{
"input": "8 8 1 1 1",
"output": "Second"
},
{
"input": "15 14 32 65 28",
"output": "First"
},
{
"input": "894 197 325 232 902",
"output": "First"
},
{
"input": "1 2 8 8 5",
"output": "Friendship"
},
{
"input": "37 261 207 1 1000",
"output": "Friendship"
},
{
"input": "29 344 406 900 1",
"output": "Friendship"
},
{
"input": "1 2 8 9 8",
"output": "First"
},
{
"input": "2 9 8 8 9",
"output": "Friendship"
},
{
"input": "213 480 811 134 745",
"output": "First"
},
{
"input": "2 313 856 964 421",
"output": "Friendship"
},
{
"input": "1 10 2 6 10",
"output": "Friendship"
},
{
"input": "2 7 6 2 3",
"output": "Friendship"
},
{
"input": "637 324 69 612 998",
"output": "Second"
},
{
"input": "13 849 819 723 918",
"output": "Friendship"
},
{
"input": "9 5 7 8 7",
"output": "First"
},
{
"input": "6 5 7 10 4",
"output": "Friendship"
},
{
"input": "61 464 623 89 548",
"output": "First"
},
{
"input": "641 31 29 161 802",
"output": "Friendship"
},
{
"input": "3 3 1 6 9",
"output": "Friendship"
},
{
"input": "2 3 9 8 2",
"output": "Friendship"
},
{
"input": "485 117 368 567 609",
"output": "First"
},
{
"input": "4 202 512 995 375",
"output": "Friendship"
},
{
"input": "424 41 41 909 909",
"output": "Friendship"
},
{
"input": "884 913 263 641 265",
"output": "Second"
},
{
"input": "12 462 8 311 327",
"output": "Second"
},
{
"input": "436 306 266 493 580",
"output": "Second"
},
{
"input": "69 1 2 1 2",
"output": "First"
}
] | 1,597,341,533 | 2,147,483,647 | Python 3 | OK | TESTS | 32 | 109 | 0 | a, b, c, d, e = map(int,input().split())
wynik_pierwszego = d + (b * a) + d
wynik_drugiego = e + (c * a) + e
if wynik_pierwszego < wynik_drugiego:
print("First")
elif wynik_pierwszego > wynik_drugiego:
print("Second")
elif wynik_drugiego == wynik_pierwszego:
print("Friendship") | Title: Key races
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Two boys decided to compete in text typing on the site "Key races". During the competition, they have to type a text consisting of *s* characters. The first participant types one character in *v*1 milliseconds and has ping *t*1 milliseconds. The second participant types one character in *v*2 milliseconds and has ping *t*2 milliseconds.
If connection ping (delay) is *t* milliseconds, the competition passes for a participant as follows:
1. Exactly after *t* milliseconds after the start of the competition the participant receives the text to be entered. 1. Right after that he starts to type it. 1. Exactly *t* milliseconds after he ends typing all the text, the site receives information about it.
The winner is the participant whose information on the success comes earlier. If the information comes from both participants at the same time, it is considered that there is a draw.
Given the length of the text and the information about participants, determine the result of the game.
Input Specification:
The first line contains five integers *s*, *v*1, *v*2, *t*1, *t*2 (1<=≤<=*s*,<=*v*1,<=*v*2,<=*t*1,<=*t*2<=≤<=1000) — the number of characters in the text, the time of typing one character for the first participant, the time of typing one character for the the second participant, the ping of the first participant and the ping of the second participant.
Output Specification:
If the first participant wins, print "First". If the second participant wins, print "Second". In case of a draw print "Friendship".
Demo Input:
['5 1 2 1 2\n', '3 3 1 1 1\n', '4 5 3 1 5\n']
Demo Output:
['First\n', 'Second\n', 'Friendship\n']
Note:
In the first example, information on the success of the first participant comes in 7 milliseconds, of the second participant — in 14 milliseconds. So, the first wins.
In the second example, information on the success of the first participant comes in 11 milliseconds, of the second participant — in 5 milliseconds. So, the second wins.
In the third example, information on the success of the first participant comes in 22 milliseconds, of the second participant — in 22 milliseconds. So, it is be a draw. | ```python
a, b, c, d, e = map(int,input().split())
wynik_pierwszego = d + (b * a) + d
wynik_drugiego = e + (c * a) + e
if wynik_pierwszego < wynik_drugiego:
print("First")
elif wynik_pierwszego > wynik_drugiego:
print("Second")
elif wynik_drugiego == wynik_pierwszego:
print("Friendship")
``` | 3 | |
2 | A | Winner | PROGRAMMING | 1,500 | [
"hashing",
"implementation"
] | A. Winner | 1 | 64 | The winner of the card game popular in Berland "Berlogging" is determined according to the following rules. If at the end of the game there is only one player with the maximum number of points, he is the winner. The situation becomes more difficult if the number of such players is more than one. During each round a player gains or loses a particular number of points. In the course of the game the number of points is registered in the line "name score", where name is a player's name, and score is the number of points gained in this round, which is an integer number. If score is negative, this means that the player has lost in the round. So, if two or more players have the maximum number of points (say, it equals to *m*) at the end of the game, than wins the one of them who scored at least *m* points first. Initially each player has 0 points. It's guaranteed that at the end of the game at least one player has a positive number of points. | The first line contains an integer number *n* (1<=<=≤<=<=*n*<=<=≤<=<=1000), *n* is the number of rounds played. Then follow *n* lines, containing the information about the rounds in "name score" format in chronological order, where name is a string of lower-case Latin letters with the length from 1 to 32, and score is an integer number between -1000 and 1000, inclusive. | Print the name of the winner. | [
"3\nmike 3\nandrew 5\nmike 2\n",
"3\nandrew 3\nandrew 2\nmike 5\n"
] | [
"andrew\n",
"andrew\n"
] | none | 0 | [
{
"input": "3\nmike 3\nandrew 5\nmike 2",
"output": "andrew"
},
{
"input": "3\nandrew 3\nandrew 2\nmike 5",
"output": "andrew"
},
{
"input": "5\nkaxqybeultn -352\nmgochgrmeyieyskhuourfg -910\nkaxqybeultn 691\nmgochgrmeyieyskhuourfg -76\nkaxqybeultn -303",
"output": "kaxqybeultn"
},
{
"input": "7\nksjuuerbnlklcfdjeyq 312\ndthjlkrvvbyahttifpdewvyslsh -983\nksjuuerbnlklcfdjeyq 268\ndthjlkrvvbyahttifpdewvyslsh 788\nksjuuerbnlklcfdjeyq -79\nksjuuerbnlklcfdjeyq -593\nksjuuerbnlklcfdjeyq 734",
"output": "ksjuuerbnlklcfdjeyq"
},
{
"input": "12\natrtthfpcvishmqbakprquvnejr 185\natrtthfpcvishmqbakprquvnejr -699\natrtthfpcvishmqbakprquvnejr -911\natrtthfpcvishmqbakprquvnejr -220\nfcgslzkicjrpbqaifgweyzreajjfdo 132\nfcgslzkicjrpbqaifgweyzreajjfdo -242\nm 177\nm -549\natrtthfpcvishmqbakprquvnejr -242\nm 38\natrtthfpcvishmqbakprquvnejr -761\nfcgslzkicjrpbqaifgweyzreajjfdo 879",
"output": "fcgslzkicjrpbqaifgweyzreajjfdo"
},
{
"input": "15\naawtvezfntstrcpgbzjbf 681\nzhahpvqiptvksnbjkdvmknb -74\naawtvezfntstrcpgbzjbf 661\njpdwmyke 474\naawtvezfntstrcpgbzjbf -547\naawtvezfntstrcpgbzjbf 600\nzhahpvqiptvksnbjkdvmknb -11\njpdwmyke 711\nbjmj 652\naawtvezfntstrcpgbzjbf -1000\naawtvezfntstrcpgbzjbf -171\nbjmj -302\naawtvezfntstrcpgbzjbf 961\nzhahpvqiptvksnbjkdvmknb 848\nbjmj -735",
"output": "aawtvezfntstrcpgbzjbf"
},
{
"input": "17\nqdplghhx -649\nivhgbxiv 424\nivhgbxiv -72\nivhgbxiv 479\nugowfouebkelargxylsxn 83\nugowfouebkelargxylsxn -840\nivhgbxiv 382\nqdplghhx -904\nivhgbxiv -710\nugowfouebkelargxylsxn -838\nqdplghhx -974\nqdplghhx 571\nivhgbxiv -145\nugowfouebkelargxylsxn -788\nivhgbxiv 209\nivhgbxiv 420\nqdplghhx -158",
"output": "ivhgbxiv"
}
] | 1,622,555,608 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 9 | 186 | 204,800 | n = int(input())
d = {}
scores = []
for _ in ' '*n:
name, point = input().split(); point = int(point)
d[name] = d.get(name, 0) + point
scores.append([name, point])
nametoind = {}
# indtoname = {}
j = 0
maxscr = -10**9
for i in d:
nametoind[i] = j
# indtoname[j] = i
j+=1
if d[i] > maxscr: maxscr = d[i]
point = [0]*len(d)
for name, score in scores:
point[nametoind[name]] += score
if point[nametoind[name]] >= maxscr:
print(name)
break
# d = name: final score
# scores: list
| Title: Winner
Time Limit: 1 seconds
Memory Limit: 64 megabytes
Problem Description:
The winner of the card game popular in Berland "Berlogging" is determined according to the following rules. If at the end of the game there is only one player with the maximum number of points, he is the winner. The situation becomes more difficult if the number of such players is more than one. During each round a player gains or loses a particular number of points. In the course of the game the number of points is registered in the line "name score", where name is a player's name, and score is the number of points gained in this round, which is an integer number. If score is negative, this means that the player has lost in the round. So, if two or more players have the maximum number of points (say, it equals to *m*) at the end of the game, than wins the one of them who scored at least *m* points first. Initially each player has 0 points. It's guaranteed that at the end of the game at least one player has a positive number of points.
Input Specification:
The first line contains an integer number *n* (1<=<=≤<=<=*n*<=<=≤<=<=1000), *n* is the number of rounds played. Then follow *n* lines, containing the information about the rounds in "name score" format in chronological order, where name is a string of lower-case Latin letters with the length from 1 to 32, and score is an integer number between -1000 and 1000, inclusive.
Output Specification:
Print the name of the winner.
Demo Input:
['3\nmike 3\nandrew 5\nmike 2\n', '3\nandrew 3\nandrew 2\nmike 5\n']
Demo Output:
['andrew\n', 'andrew\n']
Note:
none | ```python
n = int(input())
d = {}
scores = []
for _ in ' '*n:
name, point = input().split(); point = int(point)
d[name] = d.get(name, 0) + point
scores.append([name, point])
nametoind = {}
# indtoname = {}
j = 0
maxscr = -10**9
for i in d:
nametoind[i] = j
# indtoname[j] = i
j+=1
if d[i] > maxscr: maxscr = d[i]
point = [0]*len(d)
for name, score in scores:
point[nametoind[name]] += score
if point[nametoind[name]] >= maxscr:
print(name)
break
# d = name: final score
# scores: list
``` | 0 |
239 | A | Two Bags of Potatoes | PROGRAMMING | 1,200 | [
"greedy",
"implementation",
"math"
] | null | null | Valera had two bags of potatoes, the first of these bags contains *x* (*x*<=≥<=1) potatoes, and the second — *y* (*y*<=≥<=1) potatoes. Valera — very scattered boy, so the first bag of potatoes (it contains *x* potatoes) Valera lost. Valera remembers that the total amount of potatoes (*x*<=+<=*y*) in the two bags, firstly, was not gerater than *n*, and, secondly, was divisible by *k*.
Help Valera to determine how many potatoes could be in the first bag. Print all such possible numbers in ascending order. | The first line of input contains three integers *y*, *k*, *n* (1<=≤<=*y*,<=*k*,<=*n*<=≤<=109; <=≤<=105). | Print the list of whitespace-separated integers — all possible values of *x* in ascending order. You should print each possible value of *x* exactly once.
If there are no such values of *x* print a single integer -1. | [
"10 1 10\n",
"10 6 40\n"
] | [
"-1\n",
"2 8 14 20 26 \n"
] | none | 500 | [
{
"input": "10 1 10",
"output": "-1"
},
{
"input": "10 6 40",
"output": "2 8 14 20 26 "
},
{
"input": "10 1 20",
"output": "1 2 3 4 5 6 7 8 9 10 "
},
{
"input": "1 10000 1000000000",
"output": "9999 19999 29999 39999 49999 59999 69999 79999 89999 99999 109999 119999 129999 139999 149999 159999 169999 179999 189999 199999 209999 219999 229999 239999 249999 259999 269999 279999 289999 299999 309999 319999 329999 339999 349999 359999 369999 379999 389999 399999 409999 419999 429999 439999 449999 459999 469999 479999 489999 499999 509999 519999 529999 539999 549999 559999 569999 579999 589999 599999 609999 619999 629999 639999 649999 659999 669999 679999 689999 699999 709999 719999 729999 739999 7499..."
},
{
"input": "84817 1 33457",
"output": "-1"
},
{
"input": "21 37 99",
"output": "16 53 "
},
{
"input": "78 7 15",
"output": "-1"
},
{
"input": "74 17 27",
"output": "-1"
},
{
"input": "79 23 43",
"output": "-1"
},
{
"input": "32 33 3",
"output": "-1"
},
{
"input": "55 49 44",
"output": "-1"
},
{
"input": "64 59 404",
"output": "54 113 172 231 290 "
},
{
"input": "61 69 820",
"output": "8 77 146 215 284 353 422 491 560 629 698 "
},
{
"input": "17 28 532",
"output": "11 39 67 95 123 151 179 207 235 263 291 319 347 375 403 431 459 487 515 "
},
{
"input": "46592 52 232",
"output": "-1"
},
{
"input": "1541 58 648",
"output": "-1"
},
{
"input": "15946 76 360",
"output": "-1"
},
{
"input": "30351 86 424",
"output": "-1"
},
{
"input": "1 2 37493",
"output": "1 3 5 7 9 11 13 15 17 19 21 23 25 27 29 31 33 35 37 39 41 43 45 47 49 51 53 55 57 59 61 63 65 67 69 71 73 75 77 79 81 83 85 87 89 91 93 95 97 99 101 103 105 107 109 111 113 115 117 119 121 123 125 127 129 131 133 135 137 139 141 143 145 147 149 151 153 155 157 159 161 163 165 167 169 171 173 175 177 179 181 183 185 187 189 191 193 195 197 199 201 203 205 207 209 211 213 215 217 219 221 223 225 227 229 231 233 235 237 239 241 243 245 247 249 251 253 255 257 259 261 263 265 267 269 271 273 275 277 279 281 28..."
},
{
"input": "1 3 27764",
"output": "2 5 8 11 14 17 20 23 26 29 32 35 38 41 44 47 50 53 56 59 62 65 68 71 74 77 80 83 86 89 92 95 98 101 104 107 110 113 116 119 122 125 128 131 134 137 140 143 146 149 152 155 158 161 164 167 170 173 176 179 182 185 188 191 194 197 200 203 206 209 212 215 218 221 224 227 230 233 236 239 242 245 248 251 254 257 260 263 266 269 272 275 278 281 284 287 290 293 296 299 302 305 308 311 314 317 320 323 326 329 332 335 338 341 344 347 350 353 356 359 362 365 368 371 374 377 380 383 386 389 392 395 398 401 404 407 410..."
},
{
"input": "10 4 9174",
"output": "2 6 10 14 18 22 26 30 34 38 42 46 50 54 58 62 66 70 74 78 82 86 90 94 98 102 106 110 114 118 122 126 130 134 138 142 146 150 154 158 162 166 170 174 178 182 186 190 194 198 202 206 210 214 218 222 226 230 234 238 242 246 250 254 258 262 266 270 274 278 282 286 290 294 298 302 306 310 314 318 322 326 330 334 338 342 346 350 354 358 362 366 370 374 378 382 386 390 394 398 402 406 410 414 418 422 426 430 434 438 442 446 450 454 458 462 466 470 474 478 482 486 490 494 498 502 506 510 514 518 522 526 530 534 53..."
},
{
"input": "33 7 4971",
"output": "2 9 16 23 30 37 44 51 58 65 72 79 86 93 100 107 114 121 128 135 142 149 156 163 170 177 184 191 198 205 212 219 226 233 240 247 254 261 268 275 282 289 296 303 310 317 324 331 338 345 352 359 366 373 380 387 394 401 408 415 422 429 436 443 450 457 464 471 478 485 492 499 506 513 520 527 534 541 548 555 562 569 576 583 590 597 604 611 618 625 632 639 646 653 660 667 674 681 688 695 702 709 716 723 730 737 744 751 758 765 772 779 786 793 800 807 814 821 828 835 842 849 856 863 870 877 884 891 898 905 912 919..."
},
{
"input": "981 1 3387",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 155..."
},
{
"input": "386 1 2747",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 155..."
},
{
"input": "123 2 50000",
"output": "1 3 5 7 9 11 13 15 17 19 21 23 25 27 29 31 33 35 37 39 41 43 45 47 49 51 53 55 57 59 61 63 65 67 69 71 73 75 77 79 81 83 85 87 89 91 93 95 97 99 101 103 105 107 109 111 113 115 117 119 121 123 125 127 129 131 133 135 137 139 141 143 145 147 149 151 153 155 157 159 161 163 165 167 169 171 173 175 177 179 181 183 185 187 189 191 193 195 197 199 201 203 205 207 209 211 213 215 217 219 221 223 225 227 229 231 233 235 237 239 241 243 245 247 249 251 253 255 257 259 261 263 265 267 269 271 273 275 277 279 281 28..."
},
{
"input": "3123 100 10000000",
"output": "77 177 277 377 477 577 677 777 877 977 1077 1177 1277 1377 1477 1577 1677 1777 1877 1977 2077 2177 2277 2377 2477 2577 2677 2777 2877 2977 3077 3177 3277 3377 3477 3577 3677 3777 3877 3977 4077 4177 4277 4377 4477 4577 4677 4777 4877 4977 5077 5177 5277 5377 5477 5577 5677 5777 5877 5977 6077 6177 6277 6377 6477 6577 6677 6777 6877 6977 7077 7177 7277 7377 7477 7577 7677 7777 7877 7977 8077 8177 8277 8377 8477 8577 8677 8777 8877 8977 9077 9177 9277 9377 9477 9577 9677 9777 9877 9977 10077 10177 10277 1037..."
},
{
"input": "2 10000 1000000000",
"output": "9998 19998 29998 39998 49998 59998 69998 79998 89998 99998 109998 119998 129998 139998 149998 159998 169998 179998 189998 199998 209998 219998 229998 239998 249998 259998 269998 279998 289998 299998 309998 319998 329998 339998 349998 359998 369998 379998 389998 399998 409998 419998 429998 439998 449998 459998 469998 479998 489998 499998 509998 519998 529998 539998 549998 559998 569998 579998 589998 599998 609998 619998 629998 639998 649998 659998 669998 679998 689998 699998 709998 719998 729998 739998 7499..."
},
{
"input": "3 10000 1000000000",
"output": "9997 19997 29997 39997 49997 59997 69997 79997 89997 99997 109997 119997 129997 139997 149997 159997 169997 179997 189997 199997 209997 219997 229997 239997 249997 259997 269997 279997 289997 299997 309997 319997 329997 339997 349997 359997 369997 379997 389997 399997 409997 419997 429997 439997 449997 459997 469997 479997 489997 499997 509997 519997 529997 539997 549997 559997 569997 579997 589997 599997 609997 619997 629997 639997 649997 659997 669997 679997 689997 699997 709997 719997 729997 739997 7499..."
},
{
"input": "12312223 10000 1000000000",
"output": "7777 17777 27777 37777 47777 57777 67777 77777 87777 97777 107777 117777 127777 137777 147777 157777 167777 177777 187777 197777 207777 217777 227777 237777 247777 257777 267777 277777 287777 297777 307777 317777 327777 337777 347777 357777 367777 377777 387777 397777 407777 417777 427777 437777 447777 457777 467777 477777 487777 497777 507777 517777 527777 537777 547777 557777 567777 577777 587777 597777 607777 617777 627777 637777 647777 657777 667777 677777 687777 697777 707777 717777 727777 737777 7477..."
},
{
"input": "500000000 1000000000 1000000000",
"output": "500000000 "
},
{
"input": "1 1000000000 1000000000",
"output": "999999999 "
},
{
"input": "10 6 11",
"output": "-1"
},
{
"input": "2 100 10",
"output": "-1"
},
{
"input": "1 100000007 1000000000",
"output": "100000006 200000013 300000020 400000027 500000034 600000041 700000048 800000055 900000062 "
},
{
"input": "1 999999999 1000000000",
"output": "999999998 "
},
{
"input": "100000000 1000000000 1000000000",
"output": "900000000 "
},
{
"input": "11 2 12",
"output": "1 "
},
{
"input": "31 10 39",
"output": "-1"
},
{
"input": "48 6 50",
"output": "-1"
},
{
"input": "500000000 500000000 1000000000",
"output": "500000000 "
},
{
"input": "1 1000000000 999999999",
"output": "-1"
},
{
"input": "4 2 10",
"output": "2 4 6 "
},
{
"input": "1000000000 1 1",
"output": "-1"
},
{
"input": "1000000000 1 100000",
"output": "-1"
},
{
"input": "1000000000 1 10",
"output": "-1"
},
{
"input": "10 5 14",
"output": "-1"
},
{
"input": "500000000 499999999 1000000000",
"output": "499999998 "
},
{
"input": "1 999999997 1000000000",
"output": "999999996 "
}
] | 1,683,538,253 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 29 | 280 | 102,400 |
a=input().split()
b=[int(i) for i in a]
if b[0]==b[-1]:
print(-1)
elif b[-1]-b[0]<b[1]:
print(-1)
else:
l=b[0]-(b[0]%b[1])+b[1]
k=l//b[1]
g=(b[-1])//b[1]
for j in range(k,g+1):
print((j*b[1])-b[0],end=" ")
print()
| Title: Two Bags of Potatoes
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Valera had two bags of potatoes, the first of these bags contains *x* (*x*<=≥<=1) potatoes, and the second — *y* (*y*<=≥<=1) potatoes. Valera — very scattered boy, so the first bag of potatoes (it contains *x* potatoes) Valera lost. Valera remembers that the total amount of potatoes (*x*<=+<=*y*) in the two bags, firstly, was not gerater than *n*, and, secondly, was divisible by *k*.
Help Valera to determine how many potatoes could be in the first bag. Print all such possible numbers in ascending order.
Input Specification:
The first line of input contains three integers *y*, *k*, *n* (1<=≤<=*y*,<=*k*,<=*n*<=≤<=109; <=≤<=105).
Output Specification:
Print the list of whitespace-separated integers — all possible values of *x* in ascending order. You should print each possible value of *x* exactly once.
If there are no such values of *x* print a single integer -1.
Demo Input:
['10 1 10\n', '10 6 40\n']
Demo Output:
['-1\n', '2 8 14 20 26 \n']
Note:
none | ```python
a=input().split()
b=[int(i) for i in a]
if b[0]==b[-1]:
print(-1)
elif b[-1]-b[0]<b[1]:
print(-1)
else:
l=b[0]-(b[0]%b[1])+b[1]
k=l//b[1]
g=(b[-1])//b[1]
for j in range(k,g+1):
print((j*b[1])-b[0],end=" ")
print()
``` | 0 | |
919 | B | Perfect Number | PROGRAMMING | 1,100 | [
"binary search",
"brute force",
"dp",
"implementation",
"number theory"
] | null | null | We consider a positive integer perfect, if and only if the sum of its digits is exactly $10$. Given a positive integer $k$, your task is to find the $k$-th smallest perfect positive integer. | A single line with a positive integer $k$ ($1 \leq k \leq 10\,000$). | A single number, denoting the $k$-th smallest perfect integer. | [
"1\n",
"2\n"
] | [
"19\n",
"28\n"
] | The first perfect integer is $19$ and the second one is $28$. | 750 | [
{
"input": "1",
"output": "19"
},
{
"input": "2",
"output": "28"
},
{
"input": "13",
"output": "136"
},
{
"input": "101",
"output": "1432"
},
{
"input": "1023",
"output": "100270"
},
{
"input": "9999",
"output": "10800010"
},
{
"input": "10000",
"output": "10800100"
},
{
"input": "2333",
"output": "310060"
},
{
"input": "9139",
"output": "10134010"
},
{
"input": "9859",
"output": "10422001"
},
{
"input": "5987",
"output": "2221201"
},
{
"input": "3",
"output": "37"
},
{
"input": "4",
"output": "46"
},
{
"input": "5",
"output": "55"
},
{
"input": "7",
"output": "73"
},
{
"input": "9",
"output": "91"
},
{
"input": "10",
"output": "109"
},
{
"input": "15",
"output": "154"
},
{
"input": "51",
"output": "613"
},
{
"input": "99",
"output": "1414"
},
{
"input": "138",
"output": "2224"
},
{
"input": "233",
"output": "5050"
},
{
"input": "666",
"output": "27100"
},
{
"input": "1234",
"output": "110206"
},
{
"input": "3567",
"output": "1033003"
},
{
"input": "4445",
"output": "1221301"
},
{
"input": "5689",
"output": "2114002"
},
{
"input": "6666",
"output": "3102004"
},
{
"input": "7777",
"output": "5300200"
},
{
"input": "8888",
"output": "10110061"
},
{
"input": "9411",
"output": "10214200"
},
{
"input": "5539",
"output": "2101114"
},
{
"input": "6259",
"output": "2511100"
},
{
"input": "2387",
"output": "312220"
},
{
"input": "8515",
"output": "10030114"
}
] | 1,625,395,717 | 2,147,483,647 | PyPy 3 | WRONG_ANSWER | TESTS | 3 | 108 | 1,331,200 | n = int(input())
a = [19]
for i in range(1, 10001):
last = a[i-1]
while (last+9)%10 == 0:
last = last+9
a.append(last+9)
print(a[n-1]) | Title: Perfect Number
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
We consider a positive integer perfect, if and only if the sum of its digits is exactly $10$. Given a positive integer $k$, your task is to find the $k$-th smallest perfect positive integer.
Input Specification:
A single line with a positive integer $k$ ($1 \leq k \leq 10\,000$).
Output Specification:
A single number, denoting the $k$-th smallest perfect integer.
Demo Input:
['1\n', '2\n']
Demo Output:
['19\n', '28\n']
Note:
The first perfect integer is $19$ and the second one is $28$. | ```python
n = int(input())
a = [19]
for i in range(1, 10001):
last = a[i-1]
while (last+9)%10 == 0:
last = last+9
a.append(last+9)
print(a[n-1])
``` | 0 | |
327 | A | Flipping Game | PROGRAMMING | 1,200 | [
"brute force",
"dp",
"implementation"
] | null | null | Iahub got bored, so he invented a game to be played on paper.
He writes *n* integers *a*1,<=*a*2,<=...,<=*a**n*. Each of those integers can be either 0 or 1. He's allowed to do exactly one move: he chooses two indices *i* and *j* (1<=≤<=*i*<=≤<=*j*<=≤<=*n*) and flips all values *a**k* for which their positions are in range [*i*,<=*j*] (that is *i*<=≤<=*k*<=≤<=*j*). Flip the value of *x* means to apply operation *x*<==<=1 - *x*.
The goal of the game is that after exactly one move to obtain the maximum number of ones. Write a program to solve the little game of Iahub. | The first line of the input contains an integer *n* (1<=≤<=*n*<=≤<=100). In the second line of the input there are *n* integers: *a*1,<=*a*2,<=...,<=*a**n*. It is guaranteed that each of those *n* values is either 0 or 1. | Print an integer — the maximal number of 1s that can be obtained after exactly one move. | [
"5\n1 0 0 1 0\n",
"4\n1 0 0 1\n"
] | [
"4\n",
"4\n"
] | In the first case, flip the segment from 2 to 5 (*i* = 2, *j* = 5). That flip changes the sequence, it becomes: [1 1 1 0 1]. So, it contains four ones. There is no way to make the whole sequence equal to [1 1 1 1 1].
In the second case, flipping only the second and the third element (*i* = 2, *j* = 3) will turn all numbers into 1. | 500 | [
{
"input": "5\n1 0 0 1 0",
"output": "4"
},
{
"input": "4\n1 0 0 1",
"output": "4"
},
{
"input": "1\n1",
"output": "0"
},
{
"input": "1\n0",
"output": "1"
},
{
"input": "8\n1 0 0 0 1 0 0 0",
"output": "7"
},
{
"input": "18\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "18"
},
{
"input": "23\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "22"
},
{
"input": "100\n0 1 0 1 1 1 0 1 0 1 0 0 1 1 1 1 0 0 1 1 1 1 1 1 1 0 0 1 1 1 0 1 1 0 0 0 1 1 1 1 0 0 1 1 1 0 0 1 1 0 1 1 1 0 0 0 1 0 0 0 0 0 1 1 0 0 1 1 1 1 1 1 1 1 0 1 1 1 0 1 0 0 0 0 0 1 1 1 1 1 1 1 1 1 1 1 1 1 0 1",
"output": "70"
},
{
"input": "100\n0 1 1 0 1 0 0 1 0 0 0 1 1 0 0 0 1 1 1 0 1 0 0 0 0 0 1 0 1 0 1 0 1 0 1 0 0 0 1 0 0 0 0 0 1 1 0 1 0 1 0 1 1 1 0 1 0 1 1 0 0 1 1 0 0 1 1 1 0 0 1 0 0 1 1 0 1 0 0 1 1 0 1 0 0 1 1 0 0 0 0 1 0 0 0 0 1 1 1 1",
"output": "60"
},
{
"input": "18\n0 1 0 1 0 1 0 1 0 1 1 0 1 1 0 1 1 0",
"output": "11"
},
{
"input": "25\n0 1 0 0 0 0 0 1 0 1 0 1 0 0 0 0 1 1 1 0 0 1 1 0 1",
"output": "18"
},
{
"input": "55\n0 0 1 1 0 0 0 1 0 1 1 0 1 1 1 0 1 1 1 1 1 0 0 1 0 0 1 0 1 1 0 0 1 0 1 1 0 1 1 1 1 0 1 1 0 0 0 0 1 1 0 1 1 1 1",
"output": "36"
},
{
"input": "75\n1 1 0 1 0 1 1 0 0 0 0 0 1 1 1 1 1 0 1 0 1 0 0 0 0 1 1 1 0 1 0 0 1 1 0 1 0 0 1 1 0 1 0 1 0 1 0 0 0 0 1 0 0 1 1 1 0 0 1 0 1 1 0 0 0 0 1 1 0 0 0 1 0 0 0",
"output": "44"
},
{
"input": "100\n0 0 1 0 1 0 0 1 1 0 1 1 0 1 0 1 1 0 0 0 0 0 1 0 0 1 1 0 0 0 1 0 0 1 1 0 0 1 1 1 0 0 0 0 1 0 1 1 1 0 0 1 0 1 1 1 1 1 1 1 0 1 0 1 0 0 1 0 1 1 1 0 0 0 0 1 0 1 1 0 0 1 1 0 1 1 1 1 0 1 1 1 0 0 1 1 0 1 0 1",
"output": "61"
},
{
"input": "100\n0 0 0 1 0 0 0 1 0 1 1 0 1 1 1 1 1 0 1 0 1 1 0 0 1 1 0 1 0 1 0 1 0 1 1 0 1 1 0 0 0 1 1 1 1 0 1 1 0 1 1 1 1 0 1 0 0 1 0 1 0 0 0 0 1 1 0 0 1 0 0 1 1 0 1 1 0 1 0 0 1 1 0 1 1 1 1 0 1 0 0 1 0 1 1 1 0 1 1 0",
"output": "61"
},
{
"input": "100\n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0",
"output": "100"
},
{
"input": "100\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "99"
},
{
"input": "100\n0 0 1 1 1 0 1 1 0 0 1 0 1 0 1 0 0 1 0 1 1 0 0 1 1 1 1 1 1 0 1 0 0 1 0 0 0 0 1 1 1 0 1 1 1 0 1 1 1 0 0 1 0 0 1 1 0 0 0 1 1 1 0 1 1 0 0 0 0 1 0 0 1 0 1 0 0 0 0 0 0 1 1 1 0 1 1 1 0 1 1 1 1 1 0 0 0 0 1 0",
"output": "61"
},
{
"input": "100\n0 1 1 1 1 1 1 0 0 0 1 1 0 0 0 1 0 0 0 0 0 0 1 1 1 0 0 0 1 1 1 0 1 0 0 1 1 0 0 0 1 1 1 1 1 1 1 1 1 1 0 0 1 0 1 0 0 0 0 1 0 1 0 1 0 0 1 0 1 0 1 1 0 0 0 0 0 1 1 1 0 1 1 0 1 1 0 0 0 1 0 1 1 0 0 0 0 0 0 1",
"output": "59"
},
{
"input": "99\n1 1 0 0 0 1 0 0 0 0 0 0 0 0 0 1 1 1 1 1 1 1 1 1 1 1 1 0 1 1 0 0 0 0 0 0 1 1 0 0 1 0 1 1 1 0 0 0 0 0 1 0 0 0 0 0 0 1 0 1 1 0 1 0 0 1 1 0 1 0 0 0 1 1 1 1 0 1 1 1 0 0 1 1 0 0 0 0 1 0 0 0 0 0 1 0 1 1 1",
"output": "61"
},
{
"input": "2\n1 1",
"output": "1"
}
] | 1,648,735,058 | 2,147,483,647 | PyPy 3-64 | OK | TESTS | 21 | 184 | 3,584,000 | n=int(input())
*l,=map(int,input().split())
print(max(sum(l)+j-i-2*sum(l[i:j])for i in range(n)for j in range(i+1,n+1))) | Title: Flipping Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Iahub got bored, so he invented a game to be played on paper.
He writes *n* integers *a*1,<=*a*2,<=...,<=*a**n*. Each of those integers can be either 0 or 1. He's allowed to do exactly one move: he chooses two indices *i* and *j* (1<=≤<=*i*<=≤<=*j*<=≤<=*n*) and flips all values *a**k* for which their positions are in range [*i*,<=*j*] (that is *i*<=≤<=*k*<=≤<=*j*). Flip the value of *x* means to apply operation *x*<==<=1 - *x*.
The goal of the game is that after exactly one move to obtain the maximum number of ones. Write a program to solve the little game of Iahub.
Input Specification:
The first line of the input contains an integer *n* (1<=≤<=*n*<=≤<=100). In the second line of the input there are *n* integers: *a*1,<=*a*2,<=...,<=*a**n*. It is guaranteed that each of those *n* values is either 0 or 1.
Output Specification:
Print an integer — the maximal number of 1s that can be obtained after exactly one move.
Demo Input:
['5\n1 0 0 1 0\n', '4\n1 0 0 1\n']
Demo Output:
['4\n', '4\n']
Note:
In the first case, flip the segment from 2 to 5 (*i* = 2, *j* = 5). That flip changes the sequence, it becomes: [1 1 1 0 1]. So, it contains four ones. There is no way to make the whole sequence equal to [1 1 1 1 1].
In the second case, flipping only the second and the third element (*i* = 2, *j* = 3) will turn all numbers into 1. | ```python
n=int(input())
*l,=map(int,input().split())
print(max(sum(l)+j-i-2*sum(l[i:j])for i in range(n)for j in range(i+1,n+1)))
``` | 3 | |
50 | A | Domino piling | PROGRAMMING | 800 | [
"greedy",
"math"
] | A. Domino piling | 2 | 256 | You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions. | In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16). | Output one number — the maximal number of dominoes, which can be placed. | [
"2 4\n",
"3 3\n"
] | [
"4\n",
"4\n"
] | none | 500 | [
{
"input": "2 4",
"output": "4"
},
{
"input": "3 3",
"output": "4"
},
{
"input": "1 5",
"output": "2"
},
{
"input": "1 6",
"output": "3"
},
{
"input": "1 15",
"output": "7"
},
{
"input": "1 16",
"output": "8"
},
{
"input": "2 5",
"output": "5"
},
{
"input": "2 6",
"output": "6"
},
{
"input": "2 7",
"output": "7"
},
{
"input": "2 14",
"output": "14"
},
{
"input": "2 15",
"output": "15"
},
{
"input": "1 4",
"output": "2"
},
{
"input": "2 16",
"output": "16"
},
{
"input": "3 5",
"output": "7"
},
{
"input": "3 6",
"output": "9"
},
{
"input": "3 10",
"output": "15"
},
{
"input": "3 14",
"output": "21"
},
{
"input": "3 15",
"output": "22"
},
{
"input": "3 16",
"output": "24"
},
{
"input": "5 7",
"output": "17"
},
{
"input": "16 16",
"output": "128"
},
{
"input": "15 16",
"output": "120"
},
{
"input": "2 3",
"output": "3"
},
{
"input": "15 15",
"output": "112"
},
{
"input": "14 16",
"output": "112"
},
{
"input": "11 13",
"output": "71"
},
{
"input": "5 16",
"output": "40"
},
{
"input": "8 15",
"output": "60"
},
{
"input": "2 2",
"output": "2"
},
{
"input": "3 4",
"output": "6"
},
{
"input": "4 4",
"output": "8"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "1 2",
"output": "1"
},
{
"input": "1 3",
"output": "1"
},
{
"input": "14 15",
"output": "105"
}
] | 1,630,148,274 | 2,147,483,647 | Python 3 | RUNTIME_ERROR | TESTS | 0 | 62 | 6,758,400 | n=int(input())
k=int(input())
k=n*k//2
print(k) | Title: Domino piling
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions.
Input Specification:
In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16).
Output Specification:
Output one number — the maximal number of dominoes, which can be placed.
Demo Input:
['2 4\n', '3 3\n']
Demo Output:
['4\n', '4\n']
Note:
none | ```python
n=int(input())
k=int(input())
k=n*k//2
print(k)
``` | -1 |
59 | A | Word | PROGRAMMING | 800 | [
"implementation",
"strings"
] | A. Word | 2 | 256 | Vasya is very upset that many people on the Net mix uppercase and lowercase letters in one word. That's why he decided to invent an extension for his favorite browser that would change the letters' register in every word so that it either only consisted of lowercase letters or, vice versa, only of uppercase ones. At that as little as possible letters should be changed in the word. For example, the word HoUse must be replaced with house, and the word ViP — with VIP. If a word contains an equal number of uppercase and lowercase letters, you should replace all the letters with lowercase ones. For example, maTRIx should be replaced by matrix. Your task is to use the given method on one given word. | The first line contains a word *s* — it consists of uppercase and lowercase Latin letters and possesses the length from 1 to 100. | Print the corrected word *s*. If the given word *s* has strictly more uppercase letters, make the word written in the uppercase register, otherwise - in the lowercase one. | [
"HoUse\n",
"ViP\n",
"maTRIx\n"
] | [
"house\n",
"VIP\n",
"matrix\n"
] | none | 500 | [
{
"input": "HoUse",
"output": "house"
},
{
"input": "ViP",
"output": "VIP"
},
{
"input": "maTRIx",
"output": "matrix"
},
{
"input": "BNHWpnpawg",
"output": "bnhwpnpawg"
},
{
"input": "VTYGP",
"output": "VTYGP"
},
{
"input": "CHNenu",
"output": "chnenu"
},
{
"input": "ERPZGrodyu",
"output": "erpzgrodyu"
},
{
"input": "KSXBXWpebh",
"output": "KSXBXWPEBH"
},
{
"input": "qvxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaiv",
"output": "qvxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaiv"
},
{
"input": "Amnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfd",
"output": "amnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfd"
},
{
"input": "ISAGFJFARYFBLOPQDSHWGMCNKMFTLVFUGNJEWGWNBLXUIATXEkqiettmmjgydwcpafqrppdsrrrtguinqbgmzzfqwonkpgpcwenv",
"output": "isagfjfaryfblopqdshwgmcnkmftlvfugnjewgwnblxuiatxekqiettmmjgydwcpafqrppdsrrrtguinqbgmzzfqwonkpgpcwenv"
},
{
"input": "XHRPXZEGHSOCJPICUIXSKFUZUPYTSGJSDIYBCMNMNBPNDBXLXBzhbfnqvwcffvrdhtickyqhupmcehlsyvncqmfhautvxudqdhgg",
"output": "xhrpxzeghsocjpicuixskfuzupytsgjsdiybcmnmnbpndbxlxbzhbfnqvwcffvrdhtickyqhupmcehlsyvncqmfhautvxudqdhgg"
},
{
"input": "RJIQZMJCIMSNDBOHBRAWIENODSALETAKGKPYUFGVEFGCBRENZGAdkcetqjljtmttlonpekcovdzebzdkzggwfsxhapmjkdbuceak",
"output": "RJIQZMJCIMSNDBOHBRAWIENODSALETAKGKPYUFGVEFGCBRENZGADKCETQJLJTMTTLONPEKCOVDZEBZDKZGGWFSXHAPMJKDBUCEAK"
},
{
"input": "DWLWOBHNMMGTFOLFAECKBRNNGLYLYDXTGTVRLMEESZOIUATZZZXUFUZDLSJXMEVRTESSFBWLNZZCLCQWEVNNUCXYVHNGNXHCBDFw",
"output": "DWLWOBHNMMGTFOLFAECKBRNNGLYLYDXTGTVRLMEESZOIUATZZZXUFUZDLSJXMEVRTESSFBWLNZZCLCQWEVNNUCXYVHNGNXHCBDFW"
},
{
"input": "NYCNHJWGBOCOTSPETKKHVWFGAQYNHOVJWJHCIEFOUQZXOYUIEQDZALFKTEHTVDBVJMEUBJUBCMNVPWGDPNCHQHZJRCHYRFPVIGUB",
"output": "NYCNHJWGBOCOTSPETKKHVWFGAQYNHOVJWJHCIEFOUQZXOYUIEQDZALFKTEHTVDBVJMEUBJUBCMNVPWGDPNCHQHZJRCHYRFPVIGUB"
},
{
"input": "igxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwge",
"output": "igxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwge"
},
{
"input": "Ykkekrsqolzryiwsmdlnbmfautxxxauoojrddvwklgnlyrfcvhorrzbmtcrvpaypqhcffdqhwziipyyskcmztjprjqvmzzqhqnw",
"output": "ykkekrsqolzryiwsmdlnbmfautxxxauoojrddvwklgnlyrfcvhorrzbmtcrvpaypqhcffdqhwziipyyskcmztjprjqvmzzqhqnw"
},
{
"input": "YQOMLKYAORUQQUCQZCDYMIVDHGWZFFRMUVTAWCHERFPMNRYRIkgqrciokgajamehmcxgerpudvsqyonjonsxgbnefftzmygncks",
"output": "yqomlkyaoruqqucqzcdymivdhgwzffrmuvtawcherfpmnryrikgqrciokgajamehmcxgerpudvsqyonjonsxgbnefftzmygncks"
},
{
"input": "CDOZDPBVVVHNBJVBYHEOXWFLJKRWJCAJMIFCOZWWYFKVWOGTVJcuusigdqfkumewjtdyitveeiaybwrhomrwmpdipjwiuxfnwuz",
"output": "CDOZDPBVVVHNBJVBYHEOXWFLJKRWJCAJMIFCOZWWYFKVWOGTVJCUUSIGDQFKUMEWJTDYITVEEIAYBWRHOMRWMPDIPJWIUXFNWUZ"
},
{
"input": "WHIUVEXHVOOIJIDVJVPQUBJMEVPMPDKQWJKFBZSGSKUXMIPPMJWuckzcpxosodcjaaakvlxpbiigsiauviilylnnqlyucziihqg",
"output": "WHIUVEXHVOOIJIDVJVPQUBJMEVPMPDKQWJKFBZSGSKUXMIPPMJWUCKZCPXOSODCJAAAKVLXPBIIGSIAUVIILYLNNQLYUCZIIHQG"
},
{
"input": "VGHUNFOXKETUYMZDJNGTAOIOANYXSGYNFOGOFFLDAWEUKYFOZXCJTCAFXZYLQZERYZLRSQXYQGAPCSUDPMEYTNCTTTMFAGVDWBO",
"output": "VGHUNFOXKETUYMZDJNGTAOIOANYXSGYNFOGOFFLDAWEUKYFOZXCJTCAFXZYLQZERYZLRSQXYQGAPCSUDPMEYTNCTTTMFAGVDWBO"
},
{
"input": "EDUANHCQDOCJHFONTTSWBUJSTTIXBIXMAIUFSGFLXWAYIURTVAVZPYQDLAWIGCLMPHXCEFCJPFAAHXVNGQUFNHADAIUAZIDMHDd",
"output": "EDUANHCQDOCJHFONTTSWBUJSTTIXBIXMAIUFSGFLXWAYIURTVAVZPYQDLAWIGCLMPHXCEFCJPFAAHXVNGQUFNHADAIUAZIDMHDD"
},
{
"input": "EBWOVSNLYTWWXrnovgugogtjahnmatomubebyxakas",
"output": "ebwovsnlytwwxrnovgugogtjahnmatomubebyxakas"
},
{
"input": "AORNNDKTRLRVGDPXJKXFTPFpopuzrlqumrxssskvbm",
"output": "AORNNDKTRLRVGDPXJKXFTPFPOPUZRLQUMRXSSSKVBM"
},
{
"input": "DBBZJCWQEVGYHEEUHJAWRHBDPsnplijbwtdibqrrheebfxqcvn",
"output": "dbbzjcwqevgyheeuhjawrhbdpsnplijbwtdibqrrheebfxqcvn"
},
{
"input": "t",
"output": "t"
},
{
"input": "N",
"output": "N"
},
{
"input": "kv",
"output": "kv"
},
{
"input": "Ur",
"output": "ur"
},
{
"input": "CN",
"output": "CN"
}
] | 1,664,289,419 | 2,147,483,647 | Python 3 | OK | TESTS | 30 | 92 | 0 | x=input()
count1=0
count2=0
for i in x:
if i.islower():
count1+=1
elif i.isupper():
count2+=1
y=''
if count1>=count2:
for i in x:
a=i.lower()
y=y+a
else:
for i in x:
a=i.upper()
y=y+a
print(y)
| Title: Word
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Vasya is very upset that many people on the Net mix uppercase and lowercase letters in one word. That's why he decided to invent an extension for his favorite browser that would change the letters' register in every word so that it either only consisted of lowercase letters or, vice versa, only of uppercase ones. At that as little as possible letters should be changed in the word. For example, the word HoUse must be replaced with house, and the word ViP — with VIP. If a word contains an equal number of uppercase and lowercase letters, you should replace all the letters with lowercase ones. For example, maTRIx should be replaced by matrix. Your task is to use the given method on one given word.
Input Specification:
The first line contains a word *s* — it consists of uppercase and lowercase Latin letters and possesses the length from 1 to 100.
Output Specification:
Print the corrected word *s*. If the given word *s* has strictly more uppercase letters, make the word written in the uppercase register, otherwise - in the lowercase one.
Demo Input:
['HoUse\n', 'ViP\n', 'maTRIx\n']
Demo Output:
['house\n', 'VIP\n', 'matrix\n']
Note:
none | ```python
x=input()
count1=0
count2=0
for i in x:
if i.islower():
count1+=1
elif i.isupper():
count2+=1
y=''
if count1>=count2:
for i in x:
a=i.lower()
y=y+a
else:
for i in x:
a=i.upper()
y=y+a
print(y)
``` | 3.977 |
689 | C | Mike and Chocolate Thieves | PROGRAMMING | 1,700 | [
"binary search",
"combinatorics",
"math"
] | null | null | Bad news came to Mike's village, some thieves stole a bunch of chocolates from the local factory! Horrible!
Aside from loving sweet things, thieves from this area are known to be very greedy. So after a thief takes his number of chocolates for himself, the next thief will take exactly *k* times more than the previous one. The value of *k* (*k*<=><=1) is a secret integer known only to them. It is also known that each thief's bag can carry at most *n* chocolates (if they intend to take more, the deal is cancelled) and that there were exactly four thieves involved.
Sadly, only the thieves know the value of *n*, but rumours say that the numbers of ways they could have taken the chocolates (for a fixed *n*, but not fixed *k*) is *m*. Two ways are considered different if one of the thieves (they should be numbered in the order they take chocolates) took different number of chocolates in them.
Mike want to track the thieves down, so he wants to know what their bags are and value of *n* will help him in that. Please find the smallest possible value of *n* or tell him that the rumors are false and there is no such *n*. | The single line of input contains the integer *m* (1<=≤<=*m*<=≤<=1015) — the number of ways the thieves might steal the chocolates, as rumours say. | Print the only integer *n* — the maximum amount of chocolates that thieves' bags can carry. If there are more than one *n* satisfying the rumors, print the smallest one.
If there is no such *n* for a false-rumoured *m*, print <=-<=1. | [
"1\n",
"8\n",
"10\n"
] | [
"8\n",
"54\n",
"-1\n"
] | In the first sample case the smallest *n* that leads to exactly one way of stealing chocolates is *n* = 8, whereas the amounts of stealed chocolates are (1, 2, 4, 8) (the number of chocolates stolen by each of the thieves).
In the second sample case the smallest *n* that leads to exactly 8 ways is *n* = 54 with the possibilities: (1, 2, 4, 8), (1, 3, 9, 27), (2, 4, 8, 16), (2, 6, 18, 54), (3, 6, 12, 24), (4, 8, 16, 32), (5, 10, 20, 40), (6, 12, 24, 48).
There is no *n* leading to exactly 10 ways of stealing chocolates in the third sample case. | 1,500 | [
{
"input": "1",
"output": "8"
},
{
"input": "8",
"output": "54"
},
{
"input": "10",
"output": "-1"
},
{
"input": "27",
"output": "152"
},
{
"input": "28206",
"output": "139840"
},
{
"input": "32",
"output": "184"
},
{
"input": "115",
"output": "608"
},
{
"input": "81258",
"output": "402496"
},
{
"input": "116003",
"output": "574506"
},
{
"input": "149344197",
"output": "739123875"
},
{
"input": "57857854",
"output": "286347520"
},
{
"input": "999999999999999",
"output": "-1"
},
{
"input": "181023403153",
"output": "895903132760"
},
{
"input": "196071196742",
"output": "970376182648"
},
{
"input": "49729446417673",
"output": "246116048009288"
},
{
"input": "14821870173923",
"output": "73354931125416"
},
{
"input": "29031595887308",
"output": "143680297402952"
},
{
"input": "195980601490039",
"output": "969927770453672"
},
{
"input": "181076658641313",
"output": "896166653569800"
},
{
"input": "166173583620704",
"output": "822409831653228"
},
{
"input": "151269640772354",
"output": "748648714769352"
},
{
"input": "136366565751970",
"output": "674891892852776"
},
{
"input": "121463490731834",
"output": "601135070936200"
},
{
"input": "106559547884220",
"output": "527373954052328"
},
{
"input": "91656472864718",
"output": "453617132135750"
},
{
"input": "184061307002930",
"output": "910937979445720"
},
{
"input": "57857853",
"output": "-1"
},
{
"input": "1000000000000000",
"output": "4949100894494448"
},
{
"input": "375402146575334",
"output": "-1"
},
{
"input": "550368702711851",
"output": "-1"
},
{
"input": "645093839227897",
"output": "-1"
},
{
"input": "431",
"output": "-1"
},
{
"input": "99999",
"output": "-1"
},
{
"input": "2",
"output": "16"
},
{
"input": "3",
"output": "24"
},
{
"input": "4",
"output": "27"
},
{
"input": "5",
"output": "32"
},
{
"input": "6",
"output": "40"
},
{
"input": "7",
"output": "48"
},
{
"input": "13",
"output": "80"
},
{
"input": "999999999999998",
"output": "-1"
},
{
"input": "999999999999997",
"output": "4949100894494440"
},
{
"input": "999999999999996",
"output": "4949100894494432"
},
{
"input": "999999999999995",
"output": "4949100894494424"
},
{
"input": "999999999999993",
"output": "4949100894494416"
},
{
"input": "999999999999991",
"output": "4949100894494400"
},
{
"input": "999999999999992",
"output": "4949100894494408"
},
{
"input": "999999999999994",
"output": "4949100894494421"
},
{
"input": "4235246",
"output": "-1"
},
{
"input": "34",
"output": "-1"
},
{
"input": "998749999999991",
"output": "4942914518376840"
},
{
"input": "999999874999991",
"output": "4949100275856792"
},
{
"input": "987654129875642",
"output": "4887999937625136"
},
{
"input": "237648237648000",
"output": "1176145105832192"
}
] | 1,467,829,241 | 6,341 | Python 3 | WRONG_ANSWER | TESTS | 12 | 62 | 0 | k=int(input())
ans=-1
def calc(n):
t,ans=2,0
while t*t*t<=n:
ans+=n//t//t//t
t+=1
return ans
l,r=0,10**9
while l<=r:
s=(l+r)//2
t=calc(s)
if k==t: ans=s; r=s-1
if k>t: l=s+1
if k<t: r=s-1
print(ans) | Title: Mike and Chocolate Thieves
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Bad news came to Mike's village, some thieves stole a bunch of chocolates from the local factory! Horrible!
Aside from loving sweet things, thieves from this area are known to be very greedy. So after a thief takes his number of chocolates for himself, the next thief will take exactly *k* times more than the previous one. The value of *k* (*k*<=><=1) is a secret integer known only to them. It is also known that each thief's bag can carry at most *n* chocolates (if they intend to take more, the deal is cancelled) and that there were exactly four thieves involved.
Sadly, only the thieves know the value of *n*, but rumours say that the numbers of ways they could have taken the chocolates (for a fixed *n*, but not fixed *k*) is *m*. Two ways are considered different if one of the thieves (they should be numbered in the order they take chocolates) took different number of chocolates in them.
Mike want to track the thieves down, so he wants to know what their bags are and value of *n* will help him in that. Please find the smallest possible value of *n* or tell him that the rumors are false and there is no such *n*.
Input Specification:
The single line of input contains the integer *m* (1<=≤<=*m*<=≤<=1015) — the number of ways the thieves might steal the chocolates, as rumours say.
Output Specification:
Print the only integer *n* — the maximum amount of chocolates that thieves' bags can carry. If there are more than one *n* satisfying the rumors, print the smallest one.
If there is no such *n* for a false-rumoured *m*, print <=-<=1.
Demo Input:
['1\n', '8\n', '10\n']
Demo Output:
['8\n', '54\n', '-1\n']
Note:
In the first sample case the smallest *n* that leads to exactly one way of stealing chocolates is *n* = 8, whereas the amounts of stealed chocolates are (1, 2, 4, 8) (the number of chocolates stolen by each of the thieves).
In the second sample case the smallest *n* that leads to exactly 8 ways is *n* = 54 with the possibilities: (1, 2, 4, 8), (1, 3, 9, 27), (2, 4, 8, 16), (2, 6, 18, 54), (3, 6, 12, 24), (4, 8, 16, 32), (5, 10, 20, 40), (6, 12, 24, 48).
There is no *n* leading to exactly 10 ways of stealing chocolates in the third sample case. | ```python
k=int(input())
ans=-1
def calc(n):
t,ans=2,0
while t*t*t<=n:
ans+=n//t//t//t
t+=1
return ans
l,r=0,10**9
while l<=r:
s=(l+r)//2
t=calc(s)
if k==t: ans=s; r=s-1
if k>t: l=s+1
if k<t: r=s-1
print(ans)
``` | 0 | |
468 | A | 24 Game | PROGRAMMING | 1,500 | [
"constructive algorithms",
"greedy",
"math"
] | null | null | Little X used to play a card game called "24 Game", but recently he has found it too easy. So he invented a new game.
Initially you have a sequence of *n* integers: 1,<=2,<=...,<=*n*. In a single step, you can pick two of them, let's denote them *a* and *b*, erase them from the sequence, and append to the sequence either *a*<=+<=*b*, or *a*<=-<=*b*, or *a*<=×<=*b*.
After *n*<=-<=1 steps there is only one number left. Can you make this number equal to 24? | The first line contains a single integer *n* (1<=≤<=*n*<=≤<=105). | If it's possible, print "YES" in the first line. Otherwise, print "NO" (without the quotes).
If there is a way to obtain 24 as the result number, in the following *n*<=-<=1 lines print the required operations an operation per line. Each operation should be in form: "*a* *op* *b* = *c*". Where *a* and *b* are the numbers you've picked at this operation; *op* is either "+", or "-", or "*"; *c* is the result of corresponding operation. Note, that the absolute value of *c* mustn't be greater than 1018. The result of the last operation must be equal to 24. Separate operator sign and equality sign from numbers with spaces.
If there are multiple valid answers, you may print any of them. | [
"1\n",
"8\n"
] | [
"NO\n",
"YES\n8 * 7 = 56\n6 * 5 = 30\n3 - 4 = -1\n1 - 2 = -1\n30 - -1 = 31\n56 - 31 = 25\n25 + -1 = 24\n"
] | none | 500 | [
{
"input": "1",
"output": "NO"
},
{
"input": "8",
"output": "YES\n8 * 7 = 56\n6 * 5 = 30\n3 - 4 = -1\n1 - 2 = -1\n30 - -1 = 31\n56 - 31 = 25\n25 + -1 = 24"
},
{
"input": "12",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24"
},
{
"input": "100",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "1000",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "987",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24\n9 - 8 = 1\n24 * 1 = 24\n11 - 10 = 1\n24 * 1 = 24\n13 - 12 = 1\n24 * 1 = 24\n15 - 14 = 1\n24 * 1 = 24\n17 - 16 = 1\n24 * 1 = 24\n19 - 18 = 1\n24 * 1 = 24\n21 - 20 = 1\n24 * 1 = 24\n23 - 22 = 1\n24 * 1 = 24\n25 - 24 = 1\n24 * 1 = 24\n27 - 26 = 1\n24 * 1 = 24\n29 - 28 = 1\n24 * 1 = 24\n31 - 30 = 1\n24 * 1 = 24\n33 - 32 = 1\n24 * 1 = 24\n35 - 34 = 1\n24 * 1 = 24\n37 - 36 = 1\n24 * 1 = 24\n39 - 38 = 1\n24 * 1 = 24\n41 - 40 = 1\n24 * 1 = 2..."
},
{
"input": "2",
"output": "NO"
},
{
"input": "3",
"output": "NO"
},
{
"input": "4",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24"
},
{
"input": "5",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24"
},
{
"input": "6",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24"
},
{
"input": "7",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24"
},
{
"input": "100000",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "99999",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24\n9 - 8 = 1\n24 * 1 = 24\n11 - 10 = 1\n24 * 1 = 24\n13 - 12 = 1\n24 * 1 = 24\n15 - 14 = 1\n24 * 1 = 24\n17 - 16 = 1\n24 * 1 = 24\n19 - 18 = 1\n24 * 1 = 24\n21 - 20 = 1\n24 * 1 = 24\n23 - 22 = 1\n24 * 1 = 24\n25 - 24 = 1\n24 * 1 = 24\n27 - 26 = 1\n24 * 1 = 24\n29 - 28 = 1\n24 * 1 = 24\n31 - 30 = 1\n24 * 1 = 24\n33 - 32 = 1\n24 * 1 = 24\n35 - 34 = 1\n24 * 1 = 24\n37 - 36 = 1\n24 * 1 = 24\n39 - 38 = 1\n24 * 1 = 24\n41 - 40 = 1\n24 * 1 = 2..."
},
{
"input": "99998",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "99997",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24\n9 - 8 = 1\n24 * 1 = 24\n11 - 10 = 1\n24 * 1 = 24\n13 - 12 = 1\n24 * 1 = 24\n15 - 14 = 1\n24 * 1 = 24\n17 - 16 = 1\n24 * 1 = 24\n19 - 18 = 1\n24 * 1 = 24\n21 - 20 = 1\n24 * 1 = 24\n23 - 22 = 1\n24 * 1 = 24\n25 - 24 = 1\n24 * 1 = 24\n27 - 26 = 1\n24 * 1 = 24\n29 - 28 = 1\n24 * 1 = 24\n31 - 30 = 1\n24 * 1 = 24\n33 - 32 = 1\n24 * 1 = 24\n35 - 34 = 1\n24 * 1 = 24\n37 - 36 = 1\n24 * 1 = 24\n39 - 38 = 1\n24 * 1 = 24\n41 - 40 = 1\n24 * 1 = 2..."
},
{
"input": "580",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "422",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "116",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "447",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24\n9 - 8 = 1\n24 * 1 = 24\n11 - 10 = 1\n24 * 1 = 24\n13 - 12 = 1\n24 * 1 = 24\n15 - 14 = 1\n24 * 1 = 24\n17 - 16 = 1\n24 * 1 = 24\n19 - 18 = 1\n24 * 1 = 24\n21 - 20 = 1\n24 * 1 = 24\n23 - 22 = 1\n24 * 1 = 24\n25 - 24 = 1\n24 * 1 = 24\n27 - 26 = 1\n24 * 1 = 24\n29 - 28 = 1\n24 * 1 = 24\n31 - 30 = 1\n24 * 1 = 24\n33 - 32 = 1\n24 * 1 = 24\n35 - 34 = 1\n24 * 1 = 24\n37 - 36 = 1\n24 * 1 = 24\n39 - 38 = 1\n24 * 1 = 24\n41 - 40 = 1\n24 * 1 = 2..."
},
{
"input": "62052",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "25770",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "56118",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "86351",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24\n9 - 8 = 1\n24 * 1 = 24\n11 - 10 = 1\n24 * 1 = 24\n13 - 12 = 1\n24 * 1 = 24\n15 - 14 = 1\n24 * 1 = 24\n17 - 16 = 1\n24 * 1 = 24\n19 - 18 = 1\n24 * 1 = 24\n21 - 20 = 1\n24 * 1 = 24\n23 - 22 = 1\n24 * 1 = 24\n25 - 24 = 1\n24 * 1 = 24\n27 - 26 = 1\n24 * 1 = 24\n29 - 28 = 1\n24 * 1 = 24\n31 - 30 = 1\n24 * 1 = 24\n33 - 32 = 1\n24 * 1 = 24\n35 - 34 = 1\n24 * 1 = 24\n37 - 36 = 1\n24 * 1 = 24\n39 - 38 = 1\n24 * 1 = 24\n41 - 40 = 1\n24 * 1 = 2..."
},
{
"input": "48108",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "33373",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24\n9 - 8 = 1\n24 * 1 = 24\n11 - 10 = 1\n24 * 1 = 24\n13 - 12 = 1\n24 * 1 = 24\n15 - 14 = 1\n24 * 1 = 24\n17 - 16 = 1\n24 * 1 = 24\n19 - 18 = 1\n24 * 1 = 24\n21 - 20 = 1\n24 * 1 = 24\n23 - 22 = 1\n24 * 1 = 24\n25 - 24 = 1\n24 * 1 = 24\n27 - 26 = 1\n24 * 1 = 24\n29 - 28 = 1\n24 * 1 = 24\n31 - 30 = 1\n24 * 1 = 24\n33 - 32 = 1\n24 * 1 = 24\n35 - 34 = 1\n24 * 1 = 24\n37 - 36 = 1\n24 * 1 = 24\n39 - 38 = 1\n24 * 1 = 24\n41 - 40 = 1\n24 * 1 = 2..."
},
{
"input": "9782",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "19082",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24\n6 - 5 = 1\n24 * 1 = 24\n8 - 7 = 1\n24 * 1 = 24\n10 - 9 = 1\n24 * 1 = 24\n12 - 11 = 1\n24 * 1 = 24\n14 - 13 = 1\n24 * 1 = 24\n16 - 15 = 1\n24 * 1 = 24\n18 - 17 = 1\n24 * 1 = 24\n20 - 19 = 1\n24 * 1 = 24\n22 - 21 = 1\n24 * 1 = 24\n24 - 23 = 1\n24 * 1 = 24\n26 - 25 = 1\n24 * 1 = 24\n28 - 27 = 1\n24 * 1 = 24\n30 - 29 = 1\n24 * 1 = 24\n32 - 31 = 1\n24 * 1 = 24\n34 - 33 = 1\n24 * 1 = 24\n36 - 35 = 1\n24 * 1 = 24\n38 - 37 = 1\n24 * 1 = 24\n40 - 39 = 1\n24 * 1 = 24\n42 - 41..."
},
{
"input": "4",
"output": "YES\n3 * 4 = 12\n2 * 1 = 2\n12 * 2 = 24"
},
{
"input": "7",
"output": "YES\n5 - 3 = 2\n2 * 4 = 8\n1 + 2 = 3\n8 * 3 = 24\n7 - 6 = 1\n24 * 1 = 24"
},
{
"input": "3",
"output": "NO"
}
] | 1,537,952,645 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 1 | 109 | 0 | n=int(input())
if n<=3:
print("NO")
elif n==4:
print("YES")
print("""4*3=12
12*2=24
24*1=24""")
elif n==5:
print("""5-3=2
2+1=3
3*4=12
12*2=24""")
elif n>5:
for i in range(n,5):
print(str(n)+"-"+str(n-1)+"="+"1")
print("""4*3=12
12*2=24
24*1=24""")
| Title: 24 Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Little X used to play a card game called "24 Game", but recently he has found it too easy. So he invented a new game.
Initially you have a sequence of *n* integers: 1,<=2,<=...,<=*n*. In a single step, you can pick two of them, let's denote them *a* and *b*, erase them from the sequence, and append to the sequence either *a*<=+<=*b*, or *a*<=-<=*b*, or *a*<=×<=*b*.
After *n*<=-<=1 steps there is only one number left. Can you make this number equal to 24?
Input Specification:
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=105).
Output Specification:
If it's possible, print "YES" in the first line. Otherwise, print "NO" (without the quotes).
If there is a way to obtain 24 as the result number, in the following *n*<=-<=1 lines print the required operations an operation per line. Each operation should be in form: "*a* *op* *b* = *c*". Where *a* and *b* are the numbers you've picked at this operation; *op* is either "+", or "-", or "*"; *c* is the result of corresponding operation. Note, that the absolute value of *c* mustn't be greater than 1018. The result of the last operation must be equal to 24. Separate operator sign and equality sign from numbers with spaces.
If there are multiple valid answers, you may print any of them.
Demo Input:
['1\n', '8\n']
Demo Output:
['NO\n', 'YES\n8 * 7 = 56\n6 * 5 = 30\n3 - 4 = -1\n1 - 2 = -1\n30 - -1 = 31\n56 - 31 = 25\n25 + -1 = 24\n']
Note:
none | ```python
n=int(input())
if n<=3:
print("NO")
elif n==4:
print("YES")
print("""4*3=12
12*2=24
24*1=24""")
elif n==5:
print("""5-3=2
2+1=3
3*4=12
12*2=24""")
elif n>5:
for i in range(n,5):
print(str(n)+"-"+str(n-1)+"="+"1")
print("""4*3=12
12*2=24
24*1=24""")
``` | 0 | |
379 | A | New Year Candles | PROGRAMMING | 1,000 | [
"implementation"
] | null | null | Vasily the Programmer loves romance, so this year he decided to illuminate his room with candles.
Vasily has *a* candles.When Vasily lights up a new candle, it first burns for an hour and then it goes out. Vasily is smart, so he can make *b* went out candles into a new candle. As a result, this new candle can be used like any other new candle.
Now Vasily wonders: for how many hours can his candles light up the room if he acts optimally well? Help him find this number. | The single line contains two integers, *a* and *b* (1<=≤<=*a*<=≤<=1000; 2<=≤<=*b*<=≤<=1000). | Print a single integer — the number of hours Vasily can light up the room for. | [
"4 2\n",
"6 3\n"
] | [
"7\n",
"8\n"
] | Consider the first sample. For the first four hours Vasily lights up new candles, then he uses four burned out candles to make two new ones and lights them up. When these candles go out (stop burning), Vasily can make another candle. Overall, Vasily can light up the room for 7 hours. | 500 | [
{
"input": "4 2",
"output": "7"
},
{
"input": "6 3",
"output": "8"
},
{
"input": "1000 1000",
"output": "1001"
},
{
"input": "123 5",
"output": "153"
},
{
"input": "1000 2",
"output": "1999"
},
{
"input": "1 2",
"output": "1"
},
{
"input": "1 3",
"output": "1"
},
{
"input": "1 4",
"output": "1"
},
{
"input": "2 2",
"output": "3"
},
{
"input": "3 2",
"output": "5"
},
{
"input": "3 3",
"output": "4"
},
{
"input": "999 2",
"output": "1997"
},
{
"input": "1000 3",
"output": "1499"
},
{
"input": "1000 4",
"output": "1333"
},
{
"input": "1 1000",
"output": "1"
},
{
"input": "80 970",
"output": "80"
},
{
"input": "80 970",
"output": "80"
},
{
"input": "80 970",
"output": "80"
},
{
"input": "80 970",
"output": "80"
},
{
"input": "80 970",
"output": "80"
},
{
"input": "80 970",
"output": "80"
},
{
"input": "10 4",
"output": "13"
},
{
"input": "4 3",
"output": "5"
},
{
"input": "91 5",
"output": "113"
},
{
"input": "777 17",
"output": "825"
},
{
"input": "100 4",
"output": "133"
},
{
"input": "5 3",
"output": "7"
},
{
"input": "6 4",
"output": "7"
},
{
"input": "26 8",
"output": "29"
},
{
"input": "9 4",
"output": "11"
},
{
"input": "20 3",
"output": "29"
},
{
"input": "17 3",
"output": "25"
}
] | 1,644,319,887 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 3 | 62 | 0 | import math
n, x = map(int, input().split())
def counter(n,x):
count = n
while(n>=1):
count += int(n/x)
n = n/x
return count
print(counter(n,x)) | Title: New Year Candles
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasily the Programmer loves romance, so this year he decided to illuminate his room with candles.
Vasily has *a* candles.When Vasily lights up a new candle, it first burns for an hour and then it goes out. Vasily is smart, so he can make *b* went out candles into a new candle. As a result, this new candle can be used like any other new candle.
Now Vasily wonders: for how many hours can his candles light up the room if he acts optimally well? Help him find this number.
Input Specification:
The single line contains two integers, *a* and *b* (1<=≤<=*a*<=≤<=1000; 2<=≤<=*b*<=≤<=1000).
Output Specification:
Print a single integer — the number of hours Vasily can light up the room for.
Demo Input:
['4 2\n', '6 3\n']
Demo Output:
['7\n', '8\n']
Note:
Consider the first sample. For the first four hours Vasily lights up new candles, then he uses four burned out candles to make two new ones and lights them up. When these candles go out (stop burning), Vasily can make another candle. Overall, Vasily can light up the room for 7 hours. | ```python
import math
n, x = map(int, input().split())
def counter(n,x):
count = n
while(n>=1):
count += int(n/x)
n = n/x
return count
print(counter(n,x))
``` | 0 | |
802 | G | Fake News (easy) | PROGRAMMING | 800 | [
"implementation",
"strings"
] | null | null | As it's the first of April, Heidi is suspecting that the news she reads today are fake, and she does not want to look silly in front of all the contestants. She knows that a newspiece is fake if it contains heidi as a subsequence. Help Heidi assess whether the given piece is true, but please be discreet about it... | The first and only line of input contains a single nonempty string *s* of length at most 1000 composed of lowercase letters (a-z). | Output YES if the string *s* contains heidi as a subsequence and NO otherwise. | [
"abcheaibcdi\n",
"hiedi\n"
] | [
"YES",
"NO"
] | A string *s* contains another string *p* as a subsequence if it is possible to delete some characters from *s* and obtain *p*. | 0 | [
{
"input": "abcheaibcdi",
"output": "YES"
},
{
"input": "hiedi",
"output": "NO"
},
{
"input": "ihied",
"output": "NO"
},
{
"input": "diehi",
"output": "NO"
},
{
"input": "deiih",
"output": "NO"
},
{
"input": "iheid",
"output": "NO"
},
{
"input": "eihdi",
"output": "NO"
},
{
"input": "ehdii",
"output": "NO"
},
{
"input": "edhii",
"output": "NO"
},
{
"input": "deiih",
"output": "NO"
},
{
"input": "ehdii",
"output": "NO"
},
{
"input": "eufyajkssayhjhqcwxmctecaeepjwmfoscqprpcxsqfwnlgzsmmuwuoruantipholrauvxydfvftwfzhnckxswussvlidcojiciflpvkcxkkcmmvtfvxrkwcpeelwsuzqgamamdtdgzscmikvojfvqehblmjczkvtdeymgertgkwfwfukafqlfdhtedcctixhyetdypswgagrpyto",
"output": "YES"
},
{
"input": "arfbvxgdvqzuloojjrwoyqqbxamxybaqltfimofulusfebodjkwwrgwcppkwiodtpjaraglyplgerrpqjkpoggjmfxhwtqrijpijrcyxnoodvwpyjfpvqaoazllbrpzananbrvvybboedidtuvqquklkpeflfaltukjhzjgiofombhbmqbihgtapswykfvlgdoapjqntvqsaohmbvnphvyyhvhavslamczuqifxnwknkaenqmlvetrqogqxmlptgrmqvxzdxdmwobjesmgxckpmawtioavwdngyiwkzypfnxcovwzdohshwlavwsthdssiadhiwmhpvgkrbezm",
"output": "YES"
},
{
"input": "zcectngbqnejjjtsfrluummmqabzqbyccshjqbrjthzhlbmzjfxugvjouwhumsgrnopiyakfadjnbsesamhynsbfbfunupwbxvohfmpwlcpxhovwpfpciclatgmiufwdvtsqrsdcymvkldpnhfeisrzhyhhlkwdzthgprvkpyldeysvbmcibqkpudyrraqdlxpjecvwcvuiklcrsbgvqasmxmtxqzmawcjtozioqlfflinnxpeexbzloaeqjvglbdeufultpjqexvjjjkzemtzuzmxvawilcqdrcjzpqyhtwfphuonzwkotthsaxrmwtnlmcdylxqcfffyndqeouztluqwlhnkkvzwcfiscikv",
"output": "YES"
},
{
"input": "plqaykgovxkvsiahdbglktdlhcqwelxxmtlyymrsyubxdskvyjkrowvcbpdofpjqspsrgpakdczletxujzlsegepzleipiyycpinzxgwjsgslnxsotouddgfcybozfpjhhocpybfjbaywsehbcfrayvancbrumdfngqytnhihyxnlvilrqyhnxeckprqafofelospffhtwguzjbbjlzbqrtiielbvzutzgpqxosiaqznndgobcluuqlhmffiowkjdlkokehtjdyjvmxsiyxureflmdomerfekxdvtitvwzmdsdzplkpbtafxqfpudnhfqpoiwvjnylanunmagoweobdvfjgepbsymfutrjarlxclhgavpytiiqwvojrptofuvlohzeguxdsrihsbucelhhuedltnnjgzxwyblbqvnoliiydfinzlogbvucwykryzcyibnniggbkdkdcdgcsbvvnavtyhtkanrblpvomvjs",
"output": "YES"
},
{
"input": "fbldqzggeunkpwcfirxanmntbfrudijltoertsdvcvcmbwodbibsrxendzebvxwydpasaqnisrijctsuatihxxygbeovhxjdptdcppkvfytdpjspvrannxavmkmisqtygntxkdlousdypyfkrpzapysfpdbyprufwzhunlsfugojddkmxzinatiwfxdqmgyrnjnxvrclhxyuwxtshoqdjptmeecvgmrlvuwqtmnfnfeeiwcavwnqmyustawbjodzwsqmnjxhpqmgpysierlwbbdzcwprpsexyvreewcmlbvaiytjlxdqdaqftefdlmtmmjcwvfejshymhnouoshdzqcwzxpzupkbcievodzqkqvyjuuxxwepxjalvkzufnveji",
"output": "YES"
},
{
"input": "htsyljgoelbbuipivuzrhmfpkgderqpoprlxdpasxhpmxvaztccldtmujjzjmcpdvsdghzpretlsyyiljhjznseaacruriufswuvizwwuvdioazophhyytvbiogttnnouauxllbdn",
"output": "YES"
},
{
"input": "ikmxzqdzxqlvgeojsnhqzciujslwjyzzexnregabdqztpplosdakimjxmuqccbnwvzbajoiqgdobccwnrwmixohrbdarhoeeelzbpigiybtesybwefpcfx",
"output": "YES"
},
{
"input": "bpvbpjvbdfiodsmahxpcubjxdykesubnypalhypantshkjffmxjmelblqnjdmtaltneuyudyevkgedkqrdmrfeemgpghwrifcwincfixokfgurhqbcfzeajrgkgpwqwsepudxulywowwxzdxkumsicsvnzfxspmjpaixgejeaoyoibegosqoyoydmphfpbutrrewyjecowjckvpcceoamtfbitdneuwqfvnagswlskmsmkhmxyfsrpqwhxzocyffiumcy",
"output": "YES"
},
{
"input": "vllsexwrazvlfvhvrtqeohvzzresjdiuhomfpgqcxpqdevplecuaepixhlijatxzegciizpvyvxuembiplwklahlqibykfideysjygagjbgqkbhdhkatddcwlxboinfuomnpc",
"output": "YES"
},
{
"input": "pnjdwpxmvfoqkjtbhquqcuredrkwqzzfjmdvpnbqtypzdovemhhclkvigjvtprrpzbrbcbatkucaqteuciuozytsptvsskkeplaxdaqmjkmef",
"output": "NO"
},
{
"input": "jpwfhvlxvsdhtuozvlmnfiotrgapgjxtcsgcjnodcztupysvvvmjpzqkpommadppdrykuqkcpzojcwvlogvkddedwbggkrhuvtsvdiokehlkdlnukcufjvqxnikcdawvexxwffxtriqbdmkahxdtygodzohwtdmmuvmatdkvweqvaehaxiefpevkvqpyxsrhtmgjsdfcwzqobibeduooldrmglbinrepmunizheqzvgqvpdskhxfidxfnbisyizhepwyrcykcmjxnkyfjgrqlkixcvysa",
"output": "YES"
},
{
"input": "aftcrvuumeqbfvaqlltscnuhkpcifrrhnutjinxdhhdbzvizlrapzjdatuaynoplgjketupgaejciosofuhcgcjdcucarfvtsofgubtphijciswsvidnvpztlaarydkeqxzwdhfbmullkimerukusbrdnnujviydldrwhdfllsjtziwfeaiqotbiprespmxjulnyunkdtcghrzvhtcychkwatqqmladxpvmvlkzscthylbzkpgwlzfjqwarqvdeyngekqvrhrftpxnkfcibbowvnqdkulcdydspcubwlgoyinpnzgidbgunparnueddzwtzdiavbprbbg",
"output": "YES"
},
{
"input": "oagjghsidigeh",
"output": "NO"
},
{
"input": "chdhzpfzabupskiusjoefrwmjmqkbmdgboicnszkhdrlegeqjsldurmbshijadlwsycselhlnudndpdhcnhruhhvsgbthpruiqfirxkhpqhzhqdfpyozolbionodypfcqfeqbkcgmqkizgeyyelzeoothexcoaahedgrvoemqcwccbvoeqawqeuusyjxmgjkpfwcdttfmwunzuwvsihliexlzygqcgpbdiawfvqukikhbjerjkyhpcknlndaystrgsinghlmekbvhntcpypmchcwoglsmwwdulqneuabuuuvtyrnjxfcgoothalwkzzfxakneusezgnnepkpipzromqubraiggqndliz",
"output": "YES"
},
{
"input": "lgirxqkrkgjcutpqitmffvbujcljkqardlalyigxorscczuzikoylcxenryhskoavymexysvmhbsvhtycjlmzhijpuvcjshyfeycvvcfyzytzoyvxajpqdjtfiatnvxnyeqtfcagfftafllhhjhplbdsrfpctkqpinpdfrtlzyjllfbeffputywcckupyslkbbzpgcnxgbmhtqeqqehpdaokkjtatrhyiuusjhwgiiiikxpzdueasemosmmccoakafgvxduwiuflovhhfhffgnnjhoperhhjtvocpqytjxkmrknnknqeglffhfuplopmktykxuvcmbwpoeisrlyyhdpxfvzseucofyhziuiikihpqheqdyzwigeaqzhxzvporgisxgvhyicqyejovqloibhbunsvsunpvmdckkbuokitdzleilfwutcvuuytpupizinfjrzhxudsmjcjyfcpfgthujjowdwtgbvi",
"output": "YES"
},
{
"input": "uuehrvufgerqbzyzksmqnewacotuimawhlbycdbsmhshrsbqwybbkwjwsrkwptvlbbwjiivqugzrxxwgidrcrhrwsmwgeoleptfamzefgaeyxouxocrpvomjrazmxrnffdwrrmblgdiabdncvfougtmjgvvazasnygdrigbsrieoonirlivfyodvulouslxosswgpdexuldmkdbpdlgutiotvxjyecbrsvbmqxrlcpcipjjncduyqtohlzybvlemmfdeubihwlwqglkgjvnwrbgydcpwklmjeewqklmqdbajqgrpnynaxfvxjzgibqerxyhnxenrmcdqaaeksbzyrcaepozqpetaurlhjuxxhwppuhgoihxdxbmxeiahyaqkbknktlzkheaarjoqqrsyeducvoygwalgarldcdlqogfvsncejssmx",
"output": "YES"
},
{
"input": "iiopulfjxoitgiusqrhgbkiyzinphjtclodbkkydetylvuimkhdkklmyoacmekdvjpuxcrvqnjhqhhbfenlpzpwijtykqziocilvtpqhxuyrphdlamawjuzgjwiebkqyrzyqgtkcrhntjxqmcgkrqcslogjegfrivzidfedeegwbbsopvxvdoididlpypjogxaodtueebbwuwilacunqpozczcgrpaxxrtogpxgfkudtxchoravrrdtimhenwmnafxaruuojduxxglefejycfcyxllfimkszmbrhcwpnwjqgwvzysmlaaifdxfjjpgjmcksiigpanappjdloiolojmcqbnpnjjzaufdpjaknylmyvolhwypygwepmqwpiglpcnpypnudhdzpdvgzosyjthzcwtytxq",
"output": "YES"
}
] | 1,612,365,804 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 6 | 61 | 0 | c = " "
for i in input():
if i in "heidi" and c[-1] != i:
c += i
if c.split()[-1] == 'heidi':
print("YES")
else:
print("NO") | Title: Fake News (easy)
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
As it's the first of April, Heidi is suspecting that the news she reads today are fake, and she does not want to look silly in front of all the contestants. She knows that a newspiece is fake if it contains heidi as a subsequence. Help Heidi assess whether the given piece is true, but please be discreet about it...
Input Specification:
The first and only line of input contains a single nonempty string *s* of length at most 1000 composed of lowercase letters (a-z).
Output Specification:
Output YES if the string *s* contains heidi as a subsequence and NO otherwise.
Demo Input:
['abcheaibcdi\n', 'hiedi\n']
Demo Output:
['YES', 'NO']
Note:
A string *s* contains another string *p* as a subsequence if it is possible to delete some characters from *s* and obtain *p*. | ```python
c = " "
for i in input():
if i in "heidi" and c[-1] != i:
c += i
if c.split()[-1] == 'heidi':
print("YES")
else:
print("NO")
``` | 0 | |
21 | B | Intersection | PROGRAMMING | 2,000 | [
"implementation",
"math"
] | B. Intersection | 1 | 256 | You are given two set of points. The first set is determined by the equation *A*1*x*<=+<=*B*1*y*<=+<=*C*1<==<=0, and the second one is determined by the equation *A*2*x*<=+<=*B*2*y*<=+<=*C*2<==<=0.
Write the program which finds the number of points in the intersection of two given sets. | The first line of the input contains three integer numbers *A*1,<=*B*1,<=*C*1 separated by space. The second line contains three integer numbers *A*2,<=*B*2,<=*C*2 separated by space. All the numbers are between -100 and 100, inclusive. | Print the number of points in the intersection or -1 if there are infinite number of points. | [
"1 1 0\n2 2 0\n",
"1 1 0\n2 -2 0\n"
] | [
"-1\n",
"1\n"
] | none | 1,000 | [
{
"input": "1 1 0\n2 2 0",
"output": "-1"
},
{
"input": "1 1 0\n2 -2 0",
"output": "1"
},
{
"input": "0 0 0\n0 0 0",
"output": "-1"
},
{
"input": "1 1 1\n1 1 1",
"output": "-1"
},
{
"input": "8 3 -4\n-5 2 7",
"output": "1"
},
{
"input": "-1 -1 0\n0 -1 -1",
"output": "1"
},
{
"input": "-1 -1 0\n1 1 -1",
"output": "0"
},
{
"input": "-1 -1 1\n0 -1 0",
"output": "1"
},
{
"input": "0 0 0\n1 -1 -1",
"output": "-1"
},
{
"input": "0 0 1\n-1 1 -1",
"output": "0"
},
{
"input": "0 1 -1\n-1 1 -1",
"output": "1"
},
{
"input": "1 0 -1\n0 0 -1",
"output": "0"
},
{
"input": "0 1 1\n1 0 0",
"output": "1"
},
{
"input": "1 0 0\n0 0 1",
"output": "0"
},
{
"input": "1 -1 -1\n1 -1 0",
"output": "0"
},
{
"input": "1 0 0\n0 1 1",
"output": "1"
},
{
"input": "1 -1 1\n-1 -1 1",
"output": "1"
},
{
"input": "1 0 0\n0 1 1",
"output": "1"
},
{
"input": "-1 -1 1\n-1 -1 -1",
"output": "0"
},
{
"input": "-1 -1 0\n1 1 -1",
"output": "0"
},
{
"input": "0 0 0\n0 1 -1",
"output": "-1"
},
{
"input": "0 1 1\n0 1 -1",
"output": "0"
},
{
"input": "0 1 0\n1 1 0",
"output": "1"
},
{
"input": "1 0 1\n-1 0 -1",
"output": "-1"
},
{
"input": "1 1 0\n1 0 -1",
"output": "1"
},
{
"input": "0 -1 -1\n-1 0 0",
"output": "1"
},
{
"input": "1 0 0\n1 0 0",
"output": "-1"
},
{
"input": "1 1 1\n-1 -1 0",
"output": "0"
},
{
"input": "-1 -1 -1\n0 -1 1",
"output": "1"
},
{
"input": "0 -1 0\n0 0 1",
"output": "0"
},
{
"input": "0 1 1\n-1 -1 1",
"output": "1"
},
{
"input": "0 -1 0\n0 -1 1",
"output": "0"
},
{
"input": "0 1 1\n0 1 1",
"output": "-1"
},
{
"input": "1 -1 0\n-1 -1 1",
"output": "1"
},
{
"input": "0 1 1\n0 1 -1",
"output": "0"
},
{
"input": "1 0 1\n1 0 0",
"output": "0"
},
{
"input": "1 1 1\n0 0 0",
"output": "-1"
},
{
"input": "1 0 1\n-1 -1 -1",
"output": "1"
},
{
"input": "1 -1 1\n0 0 0",
"output": "-1"
},
{
"input": "0 1 1\n-1 -1 0",
"output": "1"
},
{
"input": "-1 0 1\n1 0 0",
"output": "0"
},
{
"input": "0 1 -1\n0 0 1",
"output": "0"
},
{
"input": "0 -1 0\n1 1 1",
"output": "1"
},
{
"input": "1 0 1\n0 1 1",
"output": "1"
},
{
"input": "0 0 0\n1 1 -1",
"output": "-1"
},
{
"input": "1 -1 1\n1 1 1",
"output": "1"
},
{
"input": "1 0 -1\n-1 0 1",
"output": "-1"
},
{
"input": "1 0 1\n1 -1 1",
"output": "1"
},
{
"input": "1 -1 -1\n-1 -1 -1",
"output": "1"
},
{
"input": "0 -1 1\n0 0 -1",
"output": "0"
},
{
"input": "0 0 -1\n1 -1 -1",
"output": "0"
},
{
"input": "1 1 0\n-1 0 0",
"output": "1"
},
{
"input": "1 0 -1\n0 -1 0",
"output": "1"
},
{
"input": "1 -1 0\n-1 1 0",
"output": "-1"
},
{
"input": "1 -1 1\n1 -1 0",
"output": "0"
},
{
"input": "-1 -1 -1\n-1 1 0",
"output": "1"
},
{
"input": "-1 0 1\n1 -1 1",
"output": "1"
},
{
"input": "1 -1 0\n0 -1 -1",
"output": "1"
},
{
"input": "-1 1 0\n-1 0 -1",
"output": "1"
},
{
"input": "-1 -1 -1\n1 -1 1",
"output": "1"
},
{
"input": "-1 -1 0\n1 1 1",
"output": "0"
},
{
"input": "0 1 -1\n-1 0 0",
"output": "1"
},
{
"input": "0 0 0\n0 0 0",
"output": "-1"
},
{
"input": "0 1 1\n1 0 -1",
"output": "1"
},
{
"input": "0 1 -1\n0 0 0",
"output": "-1"
},
{
"input": "1 -1 0\n-1 1 0",
"output": "-1"
},
{
"input": "0 0 0\n0 1 0",
"output": "-1"
},
{
"input": "0 -1 1\n1 -1 1",
"output": "1"
},
{
"input": "1 0 0\n0 1 0",
"output": "1"
},
{
"input": "-1 1 0\n0 -1 1",
"output": "1"
},
{
"input": "-1 0 -1\n1 1 0",
"output": "1"
},
{
"input": "0 -1 0\n1 1 -1",
"output": "1"
},
{
"input": "-1 -1 1\n-1 0 1",
"output": "1"
},
{
"input": "0 1 0\n1 0 1",
"output": "1"
},
{
"input": "1 0 0\n-1 0 -1",
"output": "0"
},
{
"input": "-1 -1 0\n1 -1 1",
"output": "1"
},
{
"input": "1 1 1\n-1 -1 -1",
"output": "-1"
},
{
"input": "1 -1 0\n-1 1 0",
"output": "-1"
},
{
"input": "-1 -1 1\n-1 1 0",
"output": "1"
},
{
"input": "0 0 1\n1 0 -1",
"output": "0"
},
{
"input": "0 -1 -2\n0 1 0",
"output": "0"
},
{
"input": "0 -1 0\n2 -2 2",
"output": "1"
},
{
"input": "1 -1 2\n-1 0 0",
"output": "1"
},
{
"input": "-2 0 2\n0 0 2",
"output": "0"
},
{
"input": "-1 0 -1\n1 -1 -1",
"output": "1"
},
{
"input": "-1 2 0\n-2 1 -2",
"output": "1"
},
{
"input": "0 2 0\n0 1 2",
"output": "0"
},
{
"input": "2 2 2\n0 -2 0",
"output": "1"
},
{
"input": "-2 0 -2\n2 -2 -2",
"output": "1"
},
{
"input": "2 2 -1\n-2 1 1",
"output": "1"
},
{
"input": "-2 -1 1\n0 -1 0",
"output": "1"
},
{
"input": "-2 1 1\n0 0 -2",
"output": "0"
},
{
"input": "-1 2 -2\n0 2 1",
"output": "1"
},
{
"input": "1 2 -2\n-1 2 0",
"output": "1"
},
{
"input": "0 0 2\n0 -1 -1",
"output": "0"
},
{
"input": "2 1 1\n1 2 1",
"output": "1"
},
{
"input": "-2 -1 2\n1 1 1",
"output": "1"
},
{
"input": "0 -1 -1\n-2 -2 -1",
"output": "1"
},
{
"input": "-1 0 -1\n0 -2 1",
"output": "1"
},
{
"input": "1 1 2\n0 1 0",
"output": "1"
},
{
"input": "-2 1 1\n2 1 -1",
"output": "1"
},
{
"input": "-1 -2 1\n-1 -2 2",
"output": "0"
},
{
"input": "0 -2 1\n-2 2 2",
"output": "1"
},
{
"input": "0 -1 2\n-1 -1 0",
"output": "1"
},
{
"input": "1 -1 -2\n1 2 -2",
"output": "1"
},
{
"input": "-2 -1 0\n-2 2 2",
"output": "1"
},
{
"input": "-1 1 0\n0 -1 0",
"output": "1"
},
{
"input": "-1 -2 2\n-1 0 -2",
"output": "1"
},
{
"input": "0 1 -1\n1 0 -2",
"output": "1"
},
{
"input": "-1 -2 -2\n-2 1 0",
"output": "1"
},
{
"input": "1 -1 2\n0 0 -2",
"output": "0"
},
{
"input": "2 -1 2\n0 -2 1",
"output": "1"
},
{
"input": "1 0 -1\n2 0 1",
"output": "0"
},
{
"input": "-2 -1 0\n-2 0 -1",
"output": "1"
},
{
"input": "-1 1 1\n0 1 1",
"output": "1"
},
{
"input": "1 1 1\n1 1 -2",
"output": "0"
},
{
"input": "1 2 1\n1 -1 1",
"output": "1"
},
{
"input": "-2 -2 0\n0 -2 -1",
"output": "1"
},
{
"input": "-1 -1 0\n-1 -2 -1",
"output": "1"
},
{
"input": "-2 -2 -2\n1 1 -1",
"output": "0"
},
{
"input": "0 0 0\n0 0 1",
"output": "0"
},
{
"input": "0 0 -87\n0 0 0",
"output": "0"
},
{
"input": "0 0 1\n0 0 1",
"output": "0"
},
{
"input": "100 100 100\n-100 100 -100",
"output": "1"
},
{
"input": "12 -32 89\n0 67 -23",
"output": "1"
},
{
"input": "0 0 1\n0 0 2",
"output": "0"
},
{
"input": "0 5 0\n0 0 5",
"output": "0"
},
{
"input": "0 1 1\n0 -1 -1",
"output": "-1"
},
{
"input": "1 1 0\n2 2 1",
"output": "0"
},
{
"input": "0 0 5\n0 0 5",
"output": "0"
},
{
"input": "0 5 0\n0 5 1",
"output": "0"
},
{
"input": "0 1 1\n0 1 2",
"output": "0"
},
{
"input": "0 1 1\n0 2 3",
"output": "0"
},
{
"input": "2 2 -3\n2 2 -2",
"output": "0"
},
{
"input": "3 3 3\n3 3 4",
"output": "0"
},
{
"input": "0 1 2\n0 2 3",
"output": "0"
},
{
"input": "0 0 1\n1 1 1",
"output": "0"
},
{
"input": "5 0 1\n7 0 2",
"output": "0"
},
{
"input": "4 6 1\n2 3 1",
"output": "0"
},
{
"input": "0 0 0\n0 1 2",
"output": "-1"
}
] | 1,627,276,854 | 2,147,483,647 | Python 3 | RUNTIME_ERROR | TESTS | 2 | 61 | 6,963,200 | l1=list(map(int,input().split()))
l2=list(map(int,input().split()))
A1,B1,C1=l1[0],l1[1],l1[2]
A2,B2,C2=l2[0],l2[1],l2[2]
if (A1//A2==B1//B2) and C1==C2:
print(-1)
elif (A1//A2!=B1//B2) and (C1==C2):
print(1) | Title: Intersection
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
You are given two set of points. The first set is determined by the equation *A*1*x*<=+<=*B*1*y*<=+<=*C*1<==<=0, and the second one is determined by the equation *A*2*x*<=+<=*B*2*y*<=+<=*C*2<==<=0.
Write the program which finds the number of points in the intersection of two given sets.
Input Specification:
The first line of the input contains three integer numbers *A*1,<=*B*1,<=*C*1 separated by space. The second line contains three integer numbers *A*2,<=*B*2,<=*C*2 separated by space. All the numbers are between -100 and 100, inclusive.
Output Specification:
Print the number of points in the intersection or -1 if there are infinite number of points.
Demo Input:
['1 1 0\n2 2 0\n', '1 1 0\n2 -2 0\n']
Demo Output:
['-1\n', '1\n']
Note:
none | ```python
l1=list(map(int,input().split()))
l2=list(map(int,input().split()))
A1,B1,C1=l1[0],l1[1],l1[2]
A2,B2,C2=l2[0],l2[1],l2[2]
if (A1//A2==B1//B2) and C1==C2:
print(-1)
elif (A1//A2!=B1//B2) and (C1==C2):
print(1)
``` | -1 |
99 | A | Help Far Away Kingdom | PROGRAMMING | 800 | [
"strings"
] | A. Help Far Away Kingdom | 2 | 256 | In a far away kingdom lived the King, the Prince, the Shoemaker, the Dressmaker and many other citizens. They lived happily until great trouble came into the Kingdom. The ACMers settled there.
Most damage those strange creatures inflicted upon the kingdom was that they loved high precision numbers. As a result, the Kingdom healers had already had three appointments with the merchants who were asked to sell, say, exactly 0.273549107 beer barrels. To deal with the problem somehow, the King issued an order obliging rounding up all numbers to the closest integer to simplify calculations. Specifically, the order went like this:
- If a number's integer part does not end with digit 9 and its fractional part is strictly less than 0.5, then the rounded up number coincides with the number’s integer part. - If a number's integer part does not end with digit 9 and its fractional part is not less than 0.5, the rounded up number is obtained if we add 1 to the last digit of the number’s integer part.- If the number’s integer part ends with digit 9, to round up the numbers one should go to Vasilisa the Wise. In the whole Kingdom she is the only one who can perform the tricky operation of carrying into the next position.
Merchants found the algorithm very sophisticated and they asked you (the ACMers) to help them. Can you write a program that would perform the rounding according to the King’s order? | The first line contains a single number to round up — the integer part (a non-empty set of decimal digits that do not start with 0 — with the exception of a case when the set consists of a single digit — in this case 0 can go first), then follows character «.» (a dot), and then follows the fractional part (any non-empty set of decimal digits). The number's length does not exceed 1000 characters, including the dot. There are no other characters in the input data. | If the last number of the integer part is not equal to 9, print the rounded-up number without leading zeroes. Otherwise, print the message "GOTO Vasilisa." (without the quotes). | [
"0.0\n",
"1.49\n",
"1.50\n",
"2.71828182845904523536\n",
"3.14159265358979323846\n",
"12345678901234567890.1\n",
"123456789123456789.999\n"
] | [
"0",
"1",
"2",
"3",
"3",
"12345678901234567890",
"GOTO Vasilisa."
] | none | 500 | [
{
"input": "0.0",
"output": "0"
},
{
"input": "1.49",
"output": "1"
},
{
"input": "1.50",
"output": "2"
},
{
"input": "2.71828182845904523536",
"output": "3"
},
{
"input": "3.14159265358979323846",
"output": "3"
},
{
"input": "12345678901234567890.1",
"output": "12345678901234567890"
},
{
"input": "123456789123456789.999",
"output": "GOTO Vasilisa."
},
{
"input": "12345678901234567890.9",
"output": "12345678901234567891"
},
{
"input": "123456789123456788.999",
"output": "123456789123456789"
},
{
"input": "9.000",
"output": "GOTO Vasilisa."
},
{
"input": "0.1",
"output": "0"
},
{
"input": "0.2",
"output": "0"
},
{
"input": "0.3",
"output": "0"
},
{
"input": "0.4",
"output": "0"
},
{
"input": "0.5",
"output": "1"
},
{
"input": "0.6",
"output": "1"
},
{
"input": "0.7",
"output": "1"
},
{
"input": "0.8",
"output": "1"
},
{
"input": "0.9",
"output": "1"
},
{
"input": "1.0",
"output": "1"
},
{
"input": "1.1",
"output": "1"
},
{
"input": "1.2",
"output": "1"
},
{
"input": "1.3",
"output": "1"
},
{
"input": "1.4",
"output": "1"
},
{
"input": "1.5",
"output": "2"
},
{
"input": "1.6",
"output": "2"
},
{
"input": "1.7",
"output": "2"
},
{
"input": "1.8",
"output": "2"
},
{
"input": "1.9",
"output": "2"
},
{
"input": "2.0",
"output": "2"
},
{
"input": "2.1",
"output": "2"
},
{
"input": "2.2",
"output": "2"
},
{
"input": "2.3",
"output": "2"
},
{
"input": "2.4",
"output": "2"
},
{
"input": "2.5",
"output": "3"
},
{
"input": "2.6",
"output": "3"
},
{
"input": "2.7",
"output": "3"
},
{
"input": "2.8",
"output": "3"
},
{
"input": "2.9",
"output": "3"
},
{
"input": "3.0",
"output": "3"
},
{
"input": "3.1",
"output": "3"
},
{
"input": "3.2",
"output": "3"
},
{
"input": "3.3",
"output": "3"
},
{
"input": "3.4",
"output": "3"
},
{
"input": "3.5",
"output": "4"
},
{
"input": "3.6",
"output": "4"
},
{
"input": "3.7",
"output": "4"
},
{
"input": "3.8",
"output": "4"
},
{
"input": "3.9",
"output": "4"
},
{
"input": "4.0",
"output": "4"
},
{
"input": "4.1",
"output": "4"
},
{
"input": "4.2",
"output": "4"
},
{
"input": "4.3",
"output": "4"
},
{
"input": "4.4",
"output": "4"
},
{
"input": "4.5",
"output": "5"
},
{
"input": "4.6",
"output": "5"
},
{
"input": "4.7",
"output": "5"
},
{
"input": "4.8",
"output": "5"
},
{
"input": "4.9",
"output": "5"
},
{
"input": "5.0",
"output": "5"
},
{
"input": "5.1",
"output": "5"
},
{
"input": "5.2",
"output": "5"
},
{
"input": "5.3",
"output": "5"
},
{
"input": "5.4",
"output": "5"
},
{
"input": "5.5",
"output": "6"
},
{
"input": "5.6",
"output": "6"
},
{
"input": "5.7",
"output": "6"
},
{
"input": "5.8",
"output": "6"
},
{
"input": "5.9",
"output": "6"
},
{
"input": "6.0",
"output": "6"
},
{
"input": "6.1",
"output": "6"
},
{
"input": "6.2",
"output": "6"
},
{
"input": "6.3",
"output": "6"
},
{
"input": "6.4",
"output": "6"
},
{
"input": "6.5",
"output": "7"
},
{
"input": "6.6",
"output": "7"
},
{
"input": "6.7",
"output": "7"
},
{
"input": "6.8",
"output": "7"
},
{
"input": "6.9",
"output": "7"
},
{
"input": "7.0",
"output": "7"
},
{
"input": "7.1",
"output": "7"
},
{
"input": "7.2",
"output": "7"
},
{
"input": "7.3",
"output": "7"
},
{
"input": "7.4",
"output": "7"
},
{
"input": "7.5",
"output": "8"
},
{
"input": "7.6",
"output": "8"
},
{
"input": "7.7",
"output": "8"
},
{
"input": "7.8",
"output": "8"
},
{
"input": "7.9",
"output": "8"
},
{
"input": "8.0",
"output": "8"
},
{
"input": "8.1",
"output": "8"
},
{
"input": "8.2",
"output": "8"
},
{
"input": "8.3",
"output": "8"
},
{
"input": "8.4",
"output": "8"
},
{
"input": "8.5",
"output": "9"
},
{
"input": "8.6",
"output": "9"
},
{
"input": "8.7",
"output": "9"
},
{
"input": "8.8",
"output": "9"
},
{
"input": "8.9",
"output": "9"
},
{
"input": "9.0",
"output": "GOTO Vasilisa."
},
{
"input": "9.1",
"output": "GOTO Vasilisa."
},
{
"input": "9.2",
"output": "GOTO Vasilisa."
},
{
"input": "9.3",
"output": "GOTO Vasilisa."
},
{
"input": "9.4",
"output": "GOTO Vasilisa."
},
{
"input": "9.5",
"output": "GOTO Vasilisa."
},
{
"input": "9.6",
"output": "GOTO Vasilisa."
},
{
"input": "9.7",
"output": "GOTO Vasilisa."
},
{
"input": "9.8",
"output": "GOTO Vasilisa."
},
{
"input": "9.9",
"output": "GOTO Vasilisa."
},
{
"input": "609942239104813108618306232517836377583566292129955473517174437591594761209877970062547641606473593416245554763832875919009472288995880898848455284062760160557686724163817329189799336769669146848904803188614226720978399787805489531837751080926098.1664915772983166314490532653577560222779830866949001942720729759794777105570672781798092416748052690224813237139640723361527601154465287615917169132637313918577673651098507390501962",
"output": "609942239104813108618306232517836377583566292129955473517174437591594761209877970062547641606473593416245554763832875919009472288995880898848455284062760160557686724163817329189799336769669146848904803188614226720978399787805489531837751080926098"
},
{
"input": "7002108534951820589946967018226114921984364117669853212254634761258884835434844673935047882480101006606512119541798298905598015607366335061012709906661245805358900665571472645463994925687210711492820804158354236327017974683658305043146543214454877759341394.20211856263503281388748282682120712214711232598021393495443628276945042110862480888110959179019986486690931930108026302665438087068150666835901617457150158918705186964935221768346957536540345814875615118637945520917367155931078965",
"output": "7002108534951820589946967018226114921984364117669853212254634761258884835434844673935047882480101006606512119541798298905598015607366335061012709906661245805358900665571472645463994925687210711492820804158354236327017974683658305043146543214454877759341394"
},
{
"input": "1950583094879039694852660558765931995628486712128191844305265555887022812284005463780616067.5000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "1950583094879039694852660558765931995628486712128191844305265555887022812284005463780616068"
},
{
"input": "718130341896330596635811874410345440628950330.500000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "718130341896330596635811874410345440628950331"
},
{
"input": "927925904158088313481229162503626281882161630091489367140850985555900173018122871746924067186432044676083646964286435457446768031295712712803570690846298544912543439221596866052681116386179629036945370280722.500000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "927925904158088313481229162503626281882161630091489367140850985555900173018122871746924067186432044676083646964286435457446768031295712712803570690846298544912543439221596866052681116386179629036945370280723"
},
{
"input": "68289614863244584294178637364598054554769889.500000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "GOTO Vasilisa."
},
{
"input": "7536521504744364134984603189602839063535643888645969434165019366202558753840519.4999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999999",
"output": "GOTO Vasilisa."
},
{
"input": "646188694587964249318078225173.5000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "646188694587964249318078225174"
},
{
"input": "7017472758334494297677068672222822550374695787171163207025095950296957261530.50",
"output": "7017472758334494297677068672222822550374695787171163207025095950296957261531"
},
{
"input": "259085737066615534998640212505663524594409165063310128108448186246980628179842202905722595400477937071746695941939306735605849342959111887834258250883469840846714848774368.50000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "259085737066615534998640212505663524594409165063310128108448186246980628179842202905722595400477937071746695941939306735605849342959111887834258250883469840846714848774369"
},
{
"input": "682500858233333594535201113441004740771119672961581796618069185960107115823662126812159957094407454522028503739299.5000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000",
"output": "GOTO Vasilisa."
},
{
"input": "41203422675619090661099806687619.49999999999999999999999999999999999999999999999999999999999999999999999999999999999999999",
"output": "GOTO Vasilisa."
}
] | 1,687,971,644 | 2,147,483,647 | Python 3 | OK | TESTS | 150 | 92 | 0 | x, y = map(str, input().split('.'))
if x[-1] == '9':
print('GOTO Vasilisa.')
else:
if int(y[0]) >= 5:
x = x[:-1] + str(int(x[-1]) + 1)
print(x)
| Title: Help Far Away Kingdom
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
In a far away kingdom lived the King, the Prince, the Shoemaker, the Dressmaker and many other citizens. They lived happily until great trouble came into the Kingdom. The ACMers settled there.
Most damage those strange creatures inflicted upon the kingdom was that they loved high precision numbers. As a result, the Kingdom healers had already had three appointments with the merchants who were asked to sell, say, exactly 0.273549107 beer barrels. To deal with the problem somehow, the King issued an order obliging rounding up all numbers to the closest integer to simplify calculations. Specifically, the order went like this:
- If a number's integer part does not end with digit 9 and its fractional part is strictly less than 0.5, then the rounded up number coincides with the number’s integer part. - If a number's integer part does not end with digit 9 and its fractional part is not less than 0.5, the rounded up number is obtained if we add 1 to the last digit of the number’s integer part.- If the number’s integer part ends with digit 9, to round up the numbers one should go to Vasilisa the Wise. In the whole Kingdom she is the only one who can perform the tricky operation of carrying into the next position.
Merchants found the algorithm very sophisticated and they asked you (the ACMers) to help them. Can you write a program that would perform the rounding according to the King’s order?
Input Specification:
The first line contains a single number to round up — the integer part (a non-empty set of decimal digits that do not start with 0 — with the exception of a case when the set consists of a single digit — in this case 0 can go first), then follows character «.» (a dot), and then follows the fractional part (any non-empty set of decimal digits). The number's length does not exceed 1000 characters, including the dot. There are no other characters in the input data.
Output Specification:
If the last number of the integer part is not equal to 9, print the rounded-up number without leading zeroes. Otherwise, print the message "GOTO Vasilisa." (without the quotes).
Demo Input:
['0.0\n', '1.49\n', '1.50\n', '2.71828182845904523536\n', '3.14159265358979323846\n', '12345678901234567890.1\n', '123456789123456789.999\n']
Demo Output:
['0', '1', '2', '3', '3', '12345678901234567890', 'GOTO Vasilisa.']
Note:
none | ```python
x, y = map(str, input().split('.'))
if x[-1] == '9':
print('GOTO Vasilisa.')
else:
if int(y[0]) >= 5:
x = x[:-1] + str(int(x[-1]) + 1)
print(x)
``` | 3.977 |
734 | A | Anton and Danik | PROGRAMMING | 800 | [
"implementation",
"strings"
] | null | null | Anton likes to play chess, and so does his friend Danik.
Once they have played *n* games in a row. For each game it's known who was the winner — Anton or Danik. None of the games ended with a tie.
Now Anton wonders, who won more games, he or Danik? Help him determine this. | The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of games played.
The second line contains a string *s*, consisting of *n* uppercase English letters 'A' and 'D' — the outcome of each of the games. The *i*-th character of the string is equal to 'A' if the Anton won the *i*-th game and 'D' if Danik won the *i*-th game. | If Anton won more games than Danik, print "Anton" (without quotes) in the only line of the output.
If Danik won more games than Anton, print "Danik" (without quotes) in the only line of the output.
If Anton and Danik won the same number of games, print "Friendship" (without quotes). | [
"6\nADAAAA\n",
"7\nDDDAADA\n",
"6\nDADADA\n"
] | [
"Anton\n",
"Danik\n",
"Friendship\n"
] | In the first sample, Anton won 6 games, while Danik — only 1. Hence, the answer is "Anton".
In the second sample, Anton won 3 games and Danik won 4 games, so the answer is "Danik".
In the third sample, both Anton and Danik won 3 games and the answer is "Friendship". | 500 | [
{
"input": "6\nADAAAA",
"output": "Anton"
},
{
"input": "7\nDDDAADA",
"output": "Danik"
},
{
"input": "6\nDADADA",
"output": "Friendship"
},
{
"input": "10\nDDDDADDADD",
"output": "Danik"
},
{
"input": "40\nAAAAAAAAADDAAAAAAAAAAADADDAAAAAAAAAAADAA",
"output": "Anton"
},
{
"input": "200\nDDDDDDDADDDDDDAADADAADAAADAADADAAADDDADDDDDDADDDAADDDAADADDDDDADDDAAAADAAADDDDDAAADAADDDAAAADDADADDDAADDAADAAADAADAAAADDAADDADAAAADADDDAAAAAADDAADAADAADADDDAAADAAAADADDADAAAAAADADADDDADDDAADDADDDAAAAD",
"output": "Friendship"
},
{
"input": "1\nA",
"output": "Anton"
},
{
"input": "1\nD",
"output": "Danik"
},
{
"input": "2\nDA",
"output": "Friendship"
},
{
"input": "4\nDADA",
"output": "Friendship"
},
{
"input": "4\nDAAD",
"output": "Friendship"
},
{
"input": "3\nADD",
"output": "Danik"
},
{
"input": "3\nDAD",
"output": "Danik"
},
{
"input": "2\nDA",
"output": "Friendship"
},
{
"input": "379\nAADAAAAAADDAAAAAADAADADADDAAAAADADDAADAAAADDDADAAAAAAADAADAAAAAAADAAAAAAAAADAAAAAAADAAAAAAAAAAADDDADAAAAAAAADAADADAAAADAAAAAAAAAAAAAAAAADAAAADDDAADAAAAAAADAAADAAADAADDDADDAAADAAAAAADDDADDDAAADAAAADAAAAAAAAADAAADAAAAAAAAADAAAAAAAAAAAAAAAAAADADAAAAAAAAAAADAAAAADAAAADAAAAAAAAAAAAADADAADAAAAAAAADAADAAAAAAAADAAAAAAAADDDAAAAAADAAADAAAAAADAADAAAAAADAAAADADAADAAAAAADAAAADAADDAADAADAAA",
"output": "Anton"
}
] | 1,693,969,788 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 2 | 31 | 0 | s_len = int(input())
s = input()
a_c,d_c = 0,0
for i in s:
if i == 'A':
a_c += 1
else:
d_c += 1
if(a_c > d_c):
print('Anton')
else:
print('Danik') | Title: Anton and Danik
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Anton likes to play chess, and so does his friend Danik.
Once they have played *n* games in a row. For each game it's known who was the winner — Anton or Danik. None of the games ended with a tie.
Now Anton wonders, who won more games, he or Danik? Help him determine this.
Input Specification:
The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of games played.
The second line contains a string *s*, consisting of *n* uppercase English letters 'A' and 'D' — the outcome of each of the games. The *i*-th character of the string is equal to 'A' if the Anton won the *i*-th game and 'D' if Danik won the *i*-th game.
Output Specification:
If Anton won more games than Danik, print "Anton" (without quotes) in the only line of the output.
If Danik won more games than Anton, print "Danik" (without quotes) in the only line of the output.
If Anton and Danik won the same number of games, print "Friendship" (without quotes).
Demo Input:
['6\nADAAAA\n', '7\nDDDAADA\n', '6\nDADADA\n']
Demo Output:
['Anton\n', 'Danik\n', 'Friendship\n']
Note:
In the first sample, Anton won 6 games, while Danik — only 1. Hence, the answer is "Anton".
In the second sample, Anton won 3 games and Danik won 4 games, so the answer is "Danik".
In the third sample, both Anton and Danik won 3 games and the answer is "Friendship". | ```python
s_len = int(input())
s = input()
a_c,d_c = 0,0
for i in s:
if i == 'A':
a_c += 1
else:
d_c += 1
if(a_c > d_c):
print('Anton')
else:
print('Danik')
``` | 0 | |
706 | B | Interesting drink | PROGRAMMING | 1,100 | [
"binary search",
"dp",
"implementation"
] | null | null | Vasiliy likes to rest after a hard work, so you may often meet him in some bar nearby. As all programmers do, he loves the famous drink "Beecola", which can be bought in *n* different shops in the city. It's known that the price of one bottle in the shop *i* is equal to *x**i* coins.
Vasiliy plans to buy his favorite drink for *q* consecutive days. He knows, that on the *i*-th day he will be able to spent *m**i* coins. Now, for each of the days he want to know in how many different shops he can buy a bottle of "Beecola". | The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of shops in the city that sell Vasiliy's favourite drink.
The second line contains *n* integers *x**i* (1<=≤<=*x**i*<=≤<=100<=000) — prices of the bottles of the drink in the *i*-th shop.
The third line contains a single integer *q* (1<=≤<=*q*<=≤<=100<=000) — the number of days Vasiliy plans to buy the drink.
Then follow *q* lines each containing one integer *m**i* (1<=≤<=*m**i*<=≤<=109) — the number of coins Vasiliy can spent on the *i*-th day. | Print *q* integers. The *i*-th of them should be equal to the number of shops where Vasiliy will be able to buy a bottle of the drink on the *i*-th day. | [
"5\n3 10 8 6 11\n4\n1\n10\n3\n11\n"
] | [
"0\n4\n1\n5\n"
] | On the first day, Vasiliy won't be able to buy a drink in any of the shops.
On the second day, Vasiliy can buy a drink in the shops 1, 2, 3 and 4.
On the third day, Vasiliy can buy a drink only in the shop number 1.
Finally, on the last day Vasiliy can buy a drink in any shop. | 1,000 | [
{
"input": "5\n3 10 8 6 11\n4\n1\n10\n3\n11",
"output": "0\n4\n1\n5"
},
{
"input": "5\n868 987 714 168 123\n10\n424\n192\n795\n873\n117\n914\n735\n158\n631\n471",
"output": "2\n2\n3\n4\n0\n4\n3\n1\n2\n2"
},
{
"input": "3\n435 482 309\n7\n245\n241\n909\n745\n980\n29\n521",
"output": "0\n0\n3\n3\n3\n0\n3"
},
{
"input": "1\n653\n9\n903\n980\n80\n770\n965\n874\n381\n657\n969",
"output": "1\n1\n0\n1\n1\n1\n0\n1\n1"
},
{
"input": "12\n35345 58181 32223 84621 35905 73863 99537 30666 67771 39229 36847 29038\n23\n55052824\n82504840\n35160556\n78141700\n73401989\n86305919\n39430705\n31939373\n23501765\n4406029\n61436920\n14295390\n34275309\n28028753\n85724689\n70158847\n2396455\n66994588\n84024224\n30175981\n65622319\n76517111\n76605341",
"output": "12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12\n12"
},
{
"input": "4\n698 193 1584 76192\n4\n553640\n310518\n274280\n429192",
"output": "4\n4\n4\n4"
},
{
"input": "1\n1\n1\n1000000000",
"output": "1"
},
{
"input": "1\n1\n1\n100005",
"output": "1"
},
{
"input": "3\n1 2 3\n1\n100005",
"output": "3"
},
{
"input": "2\n1 2\n3\n100004\n100005\n100006",
"output": "2\n2\n2"
},
{
"input": "3\n1 1 1\n1\n1",
"output": "3"
},
{
"input": "1\n1\n1\n1",
"output": "1"
},
{
"input": "3\n1 2 3\n1\n100000",
"output": "3"
},
{
"input": "5\n1 1 1 1 10\n2\n1\n10",
"output": "4\n5"
},
{
"input": "5\n3 10 8 6 11\n1\n10000000",
"output": "5"
}
] | 1,689,159,580 | 2,147,483,647 | Python 3 | TIME_LIMIT_EXCEEDED | TESTS | 10 | 2,000 | 12,390,400 | def func(n, shop, s):
f=[]
for m in s:
cnt=sum(1 for item in shop if item <= m)
f.append(cnt)
return f
n=int(input())
shop=list(map(int, input().split()))
s=[int(input()) for i in range(int(input()))]
a=func(n, shop, s)
for cnt in a:
print(cnt)
# Wed Jul 12 2023 13:59:39 GMT+0300 (Moscow Standard Time)
| Title: Interesting drink
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasiliy likes to rest after a hard work, so you may often meet him in some bar nearby. As all programmers do, he loves the famous drink "Beecola", which can be bought in *n* different shops in the city. It's known that the price of one bottle in the shop *i* is equal to *x**i* coins.
Vasiliy plans to buy his favorite drink for *q* consecutive days. He knows, that on the *i*-th day he will be able to spent *m**i* coins. Now, for each of the days he want to know in how many different shops he can buy a bottle of "Beecola".
Input Specification:
The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of shops in the city that sell Vasiliy's favourite drink.
The second line contains *n* integers *x**i* (1<=≤<=*x**i*<=≤<=100<=000) — prices of the bottles of the drink in the *i*-th shop.
The third line contains a single integer *q* (1<=≤<=*q*<=≤<=100<=000) — the number of days Vasiliy plans to buy the drink.
Then follow *q* lines each containing one integer *m**i* (1<=≤<=*m**i*<=≤<=109) — the number of coins Vasiliy can spent on the *i*-th day.
Output Specification:
Print *q* integers. The *i*-th of them should be equal to the number of shops where Vasiliy will be able to buy a bottle of the drink on the *i*-th day.
Demo Input:
['5\n3 10 8 6 11\n4\n1\n10\n3\n11\n']
Demo Output:
['0\n4\n1\n5\n']
Note:
On the first day, Vasiliy won't be able to buy a drink in any of the shops.
On the second day, Vasiliy can buy a drink in the shops 1, 2, 3 and 4.
On the third day, Vasiliy can buy a drink only in the shop number 1.
Finally, on the last day Vasiliy can buy a drink in any shop. | ```python
def func(n, shop, s):
f=[]
for m in s:
cnt=sum(1 for item in shop if item <= m)
f.append(cnt)
return f
n=int(input())
shop=list(map(int, input().split()))
s=[int(input()) for i in range(int(input()))]
a=func(n, shop, s)
for cnt in a:
print(cnt)
# Wed Jul 12 2023 13:59:39 GMT+0300 (Moscow Standard Time)
``` | 0 | |
750 | A | New Year and Hurry | PROGRAMMING | 800 | [
"binary search",
"brute force",
"implementation",
"math"
] | null | null | Limak is going to participate in a contest on the last day of the 2016. The contest will start at 20:00 and will last four hours, exactly until midnight. There will be *n* problems, sorted by difficulty, i.e. problem 1 is the easiest and problem *n* is the hardest. Limak knows it will take him 5·*i* minutes to solve the *i*-th problem.
Limak's friends organize a New Year's Eve party and Limak wants to be there at midnight or earlier. He needs *k* minutes to get there from his house, where he will participate in the contest first.
How many problems can Limak solve if he wants to make it to the party? | The only line of the input contains two integers *n* and *k* (1<=≤<=*n*<=≤<=10, 1<=≤<=*k*<=≤<=240) — the number of the problems in the contest and the number of minutes Limak needs to get to the party from his house. | Print one integer, denoting the maximum possible number of problems Limak can solve so that he could get to the party at midnight or earlier. | [
"3 222\n",
"4 190\n",
"7 1\n"
] | [
"2\n",
"4\n",
"7\n"
] | In the first sample, there are 3 problems and Limak needs 222 minutes to get to the party. The three problems require 5, 10 and 15 minutes respectively. Limak can spend 5 + 10 = 15 minutes to solve first two problems. Then, at 20:15 he can leave his house to get to the party at 23:57 (after 222 minutes). In this scenario Limak would solve 2 problems. He doesn't have enough time to solve 3 problems so the answer is 2.
In the second sample, Limak can solve all 4 problems in 5 + 10 + 15 + 20 = 50 minutes. At 20:50 he will leave the house and go to the party. He will get there exactly at midnight.
In the third sample, Limak needs only 1 minute to get to the party. He has enough time to solve all 7 problems. | 500 | [
{
"input": "3 222",
"output": "2"
},
{
"input": "4 190",
"output": "4"
},
{
"input": "7 1",
"output": "7"
},
{
"input": "10 135",
"output": "6"
},
{
"input": "10 136",
"output": "5"
},
{
"input": "1 1",
"output": "1"
},
{
"input": "1 240",
"output": "0"
},
{
"input": "10 1",
"output": "9"
},
{
"input": "10 240",
"output": "0"
},
{
"input": "9 240",
"output": "0"
},
{
"input": "9 1",
"output": "9"
},
{
"input": "9 235",
"output": "1"
},
{
"input": "9 236",
"output": "0"
},
{
"input": "5 225",
"output": "2"
},
{
"input": "5 226",
"output": "1"
},
{
"input": "4 210",
"output": "3"
},
{
"input": "4 211",
"output": "2"
},
{
"input": "4 191",
"output": "3"
},
{
"input": "10 165",
"output": "5"
},
{
"input": "10 166",
"output": "4"
},
{
"input": "8 100",
"output": "7"
},
{
"input": "8 101",
"output": "6"
},
{
"input": "8 60",
"output": "8"
},
{
"input": "8 61",
"output": "7"
},
{
"input": "10 15",
"output": "9"
},
{
"input": "10 16",
"output": "8"
},
{
"input": "4 100",
"output": "4"
},
{
"input": "4 101",
"output": "4"
},
{
"input": "7 167",
"output": "4"
},
{
"input": "10 164",
"output": "5"
},
{
"input": "9 170",
"output": "4"
},
{
"input": "8 160",
"output": "5"
},
{
"input": "1 100",
"output": "1"
},
{
"input": "8 123",
"output": "6"
},
{
"input": "2 99",
"output": "2"
},
{
"input": "10 88",
"output": "7"
},
{
"input": "1 235",
"output": "1"
},
{
"input": "1 1",
"output": "1"
},
{
"input": "4 240",
"output": "0"
},
{
"input": "1 55",
"output": "1"
},
{
"input": "1 240",
"output": "0"
},
{
"input": "3 240",
"output": "0"
},
{
"input": "10 240",
"output": "0"
},
{
"input": "2 240",
"output": "0"
},
{
"input": "10 1",
"output": "9"
},
{
"input": "9 1",
"output": "9"
},
{
"input": "2 236",
"output": "0"
},
{
"input": "10 2",
"output": "9"
},
{
"input": "3 239",
"output": "0"
},
{
"input": "1 237",
"output": "0"
},
{
"input": "7 8",
"output": "7"
},
{
"input": "10 235",
"output": "1"
}
] | 1,699,077,880 | 2,147,483,647 | PyPy 3 | OK | TESTS | 52 | 93 | 0 | n, k = map(int,input().split())
s_min = 60 * 4 - k
ans = 0
s = 0
for i in range(1, n+1):
s += i*5
if s <= s_min:
ans += 1
else:
break
print(ans)
| Title: New Year and Hurry
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Limak is going to participate in a contest on the last day of the 2016. The contest will start at 20:00 and will last four hours, exactly until midnight. There will be *n* problems, sorted by difficulty, i.e. problem 1 is the easiest and problem *n* is the hardest. Limak knows it will take him 5·*i* minutes to solve the *i*-th problem.
Limak's friends organize a New Year's Eve party and Limak wants to be there at midnight or earlier. He needs *k* minutes to get there from his house, where he will participate in the contest first.
How many problems can Limak solve if he wants to make it to the party?
Input Specification:
The only line of the input contains two integers *n* and *k* (1<=≤<=*n*<=≤<=10, 1<=≤<=*k*<=≤<=240) — the number of the problems in the contest and the number of minutes Limak needs to get to the party from his house.
Output Specification:
Print one integer, denoting the maximum possible number of problems Limak can solve so that he could get to the party at midnight or earlier.
Demo Input:
['3 222\n', '4 190\n', '7 1\n']
Demo Output:
['2\n', '4\n', '7\n']
Note:
In the first sample, there are 3 problems and Limak needs 222 minutes to get to the party. The three problems require 5, 10 and 15 minutes respectively. Limak can spend 5 + 10 = 15 minutes to solve first two problems. Then, at 20:15 he can leave his house to get to the party at 23:57 (after 222 minutes). In this scenario Limak would solve 2 problems. He doesn't have enough time to solve 3 problems so the answer is 2.
In the second sample, Limak can solve all 4 problems in 5 + 10 + 15 + 20 = 50 minutes. At 20:50 he will leave the house and go to the party. He will get there exactly at midnight.
In the third sample, Limak needs only 1 minute to get to the party. He has enough time to solve all 7 problems. | ```python
n, k = map(int,input().split())
s_min = 60 * 4 - k
ans = 0
s = 0
for i in range(1, n+1):
s += i*5
if s <= s_min:
ans += 1
else:
break
print(ans)
``` | 3 | |
785 | A | Anton and Polyhedrons | PROGRAMMING | 800 | [
"implementation",
"strings"
] | null | null | Anton's favourite geometric figures are regular polyhedrons. Note that there are five kinds of regular polyhedrons:
- Tetrahedron. Tetrahedron has 4 triangular faces. - Cube. Cube has 6 square faces. - Octahedron. Octahedron has 8 triangular faces. - Dodecahedron. Dodecahedron has 12 pentagonal faces. - Icosahedron. Icosahedron has 20 triangular faces.
All five kinds of polyhedrons are shown on the picture below:
Anton has a collection of *n* polyhedrons. One day he decided to know, how many faces his polyhedrons have in total. Help Anton and find this number! | The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=200<=000) — the number of polyhedrons in Anton's collection.
Each of the following *n* lines of the input contains a string *s**i* — the name of the *i*-th polyhedron in Anton's collection. The string can look like this:
- "Tetrahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is a tetrahedron. - "Cube" (without quotes), if the *i*-th polyhedron in Anton's collection is a cube. - "Octahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is an octahedron. - "Dodecahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is a dodecahedron. - "Icosahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is an icosahedron. | Output one number — the total number of faces in all the polyhedrons in Anton's collection. | [
"4\nIcosahedron\nCube\nTetrahedron\nDodecahedron\n",
"3\nDodecahedron\nOctahedron\nOctahedron\n"
] | [
"42\n",
"28\n"
] | In the first sample Anton has one icosahedron, one cube, one tetrahedron and one dodecahedron. Icosahedron has 20 faces, cube has 6 faces, tetrahedron has 4 faces and dodecahedron has 12 faces. In total, they have 20 + 6 + 4 + 12 = 42 faces. | 500 | [
{
"input": "4\nIcosahedron\nCube\nTetrahedron\nDodecahedron",
"output": "42"
},
{
"input": "3\nDodecahedron\nOctahedron\nOctahedron",
"output": "28"
},
{
"input": "25\nIcosahedron\nOctahedron\nTetrahedron\nDodecahedron\nCube\nIcosahedron\nOctahedron\nCube\nTetrahedron\nIcosahedron\nIcosahedron\nTetrahedron\nOctahedron\nDodecahedron\nIcosahedron\nOctahedron\nIcosahedron\nTetrahedron\nDodecahedron\nTetrahedron\nOctahedron\nCube\nCube\nDodecahedron\nTetrahedron",
"output": "256"
},
{
"input": "1\nTetrahedron",
"output": "4"
},
{
"input": "1\nCube",
"output": "6"
},
{
"input": "1\nOctahedron",
"output": "8"
},
{
"input": "1\nDodecahedron",
"output": "12"
},
{
"input": "1\nIcosahedron",
"output": "20"
},
{
"input": "28\nOctahedron\nDodecahedron\nOctahedron\nOctahedron\nDodecahedron\nIcosahedron\nIcosahedron\nDodecahedron\nDodecahedron\nDodecahedron\nCube\nDodecahedron\nCube\nTetrahedron\nCube\nCube\nTetrahedron\nDodecahedron\nDodecahedron\nDodecahedron\nIcosahedron\nIcosahedron\nDodecahedron\nIcosahedron\nDodecahedron\nDodecahedron\nIcosahedron\nIcosahedron",
"output": "340"
}
] | 1,682,931,887 | 2,147,483,647 | PyPy 3-64 | COMPILATION_ERROR | TESTS | 0 | 0 | 0 | n=int(input())
ret=0
lst='"Tetrahedron""Cube""Octahedron""Dodecahedron""Icosahedron"'
lst=lst[1:-1].split('""')
dct=dict(zip(lst,[4,6,8,2,20])
for _ in range(n):
s=input()
ret+=dct[s]
print(ret)
| Title: Anton and Polyhedrons
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Anton's favourite geometric figures are regular polyhedrons. Note that there are five kinds of regular polyhedrons:
- Tetrahedron. Tetrahedron has 4 triangular faces. - Cube. Cube has 6 square faces. - Octahedron. Octahedron has 8 triangular faces. - Dodecahedron. Dodecahedron has 12 pentagonal faces. - Icosahedron. Icosahedron has 20 triangular faces.
All five kinds of polyhedrons are shown on the picture below:
Anton has a collection of *n* polyhedrons. One day he decided to know, how many faces his polyhedrons have in total. Help Anton and find this number!
Input Specification:
The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=200<=000) — the number of polyhedrons in Anton's collection.
Each of the following *n* lines of the input contains a string *s**i* — the name of the *i*-th polyhedron in Anton's collection. The string can look like this:
- "Tetrahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is a tetrahedron. - "Cube" (without quotes), if the *i*-th polyhedron in Anton's collection is a cube. - "Octahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is an octahedron. - "Dodecahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is a dodecahedron. - "Icosahedron" (without quotes), if the *i*-th polyhedron in Anton's collection is an icosahedron.
Output Specification:
Output one number — the total number of faces in all the polyhedrons in Anton's collection.
Demo Input:
['4\nIcosahedron\nCube\nTetrahedron\nDodecahedron\n', '3\nDodecahedron\nOctahedron\nOctahedron\n']
Demo Output:
['42\n', '28\n']
Note:
In the first sample Anton has one icosahedron, one cube, one tetrahedron and one dodecahedron. Icosahedron has 20 faces, cube has 6 faces, tetrahedron has 4 faces and dodecahedron has 12 faces. In total, they have 20 + 6 + 4 + 12 = 42 faces. | ```python
n=int(input())
ret=0
lst='"Tetrahedron""Cube""Octahedron""Dodecahedron""Icosahedron"'
lst=lst[1:-1].split('""')
dct=dict(zip(lst,[4,6,8,2,20])
for _ in range(n):
s=input()
ret+=dct[s]
print(ret)
``` | -1 | |
143 | A | Help Vasilisa the Wise 2 | PROGRAMMING | 1,000 | [
"brute force",
"math"
] | null | null | Vasilisa the Wise from the Kingdom of Far Far Away got a magic box with a secret as a present from her friend Hellawisa the Wise from the Kingdom of A Little Closer. However, Vasilisa the Wise does not know what the box's secret is, since she cannot open it again. She hopes that you will help her one more time with that.
The box's lock looks as follows: it contains 4 identical deepenings for gems as a 2<=×<=2 square, and some integer numbers are written at the lock's edge near the deepenings. The example of a lock is given on the picture below.
The box is accompanied with 9 gems. Their shapes match the deepenings' shapes and each gem contains one number from 1 to 9 (each number is written on exactly one gem). The box will only open after it is decorated with gems correctly: that is, each deepening in the lock should be filled with exactly one gem. Also, the sums of numbers in the square's rows, columns and two diagonals of the square should match the numbers written at the lock's edge. For example, the above lock will open if we fill the deepenings with gems with numbers as is shown on the picture below.
Now Vasilisa the Wise wants to define, given the numbers on the box's lock, which gems she should put in the deepenings to open the box. Help Vasilisa to solve this challenging task. | The input contains numbers written on the edges of the lock of the box. The first line contains space-separated integers *r*1 and *r*2 that define the required sums of numbers in the rows of the square. The second line contains space-separated integers *c*1 and *c*2 that define the required sums of numbers in the columns of the square. The third line contains space-separated integers *d*1 and *d*2 that define the required sums of numbers on the main and on the side diagonals of the square (1<=≤<=*r*1,<=*r*2,<=*c*1,<=*c*2,<=*d*1,<=*d*2<=≤<=20). Correspondence between the above 6 variables and places where they are written is shown on the picture below. For more clarifications please look at the second sample test that demonstrates the example given in the problem statement. | Print the scheme of decorating the box with stones: two lines containing two space-separated integers from 1 to 9. The numbers should be pairwise different. If there is no solution for the given lock, then print the single number "-1" (without the quotes).
If there are several solutions, output any. | [
"3 7\n4 6\n5 5\n",
"11 10\n13 8\n5 16\n",
"1 2\n3 4\n5 6\n",
"10 10\n10 10\n10 10\n"
] | [
"1 2\n3 4\n",
"4 7\n9 1\n",
"-1\n",
"-1\n"
] | Pay attention to the last test from the statement: it is impossible to open the box because for that Vasilisa the Wise would need 4 identical gems containing number "5". However, Vasilisa only has one gem with each number from 1 to 9. | 500 | [
{
"input": "3 7\n4 6\n5 5",
"output": "1 2\n3 4"
},
{
"input": "11 10\n13 8\n5 16",
"output": "4 7\n9 1"
},
{
"input": "1 2\n3 4\n5 6",
"output": "-1"
},
{
"input": "10 10\n10 10\n10 10",
"output": "-1"
},
{
"input": "5 13\n8 10\n11 7",
"output": "3 2\n5 8"
},
{
"input": "12 17\n10 19\n13 16",
"output": "-1"
},
{
"input": "11 11\n17 5\n12 10",
"output": "9 2\n8 3"
},
{
"input": "12 11\n11 12\n16 7",
"output": "-1"
},
{
"input": "5 9\n7 7\n8 6",
"output": "3 2\n4 5"
},
{
"input": "10 7\n4 13\n11 6",
"output": "-1"
},
{
"input": "18 10\n16 12\n12 16",
"output": "-1"
},
{
"input": "13 6\n10 9\n6 13",
"output": "-1"
},
{
"input": "14 16\n16 14\n18 12",
"output": "-1"
},
{
"input": "16 10\n16 10\n12 14",
"output": "-1"
},
{
"input": "11 9\n12 8\n11 9",
"output": "-1"
},
{
"input": "5 14\n10 9\n10 9",
"output": "-1"
},
{
"input": "2 4\n1 5\n3 3",
"output": "-1"
},
{
"input": "17 16\n14 19\n18 15",
"output": "-1"
},
{
"input": "12 12\n14 10\n16 8",
"output": "9 3\n5 7"
},
{
"input": "15 11\n16 10\n9 17",
"output": "7 8\n9 2"
},
{
"input": "8 10\n9 9\n13 5",
"output": "6 2\n3 7"
},
{
"input": "13 7\n10 10\n5 15",
"output": "4 9\n6 1"
},
{
"input": "14 11\n9 16\n16 9",
"output": "-1"
},
{
"input": "12 8\n14 6\n8 12",
"output": "-1"
},
{
"input": "10 6\n6 10\n4 12",
"output": "-1"
},
{
"input": "10 8\n10 8\n4 14",
"output": "-1"
},
{
"input": "14 13\n9 18\n14 13",
"output": "-1"
},
{
"input": "9 14\n8 15\n8 15",
"output": "-1"
},
{
"input": "3 8\n2 9\n6 5",
"output": "-1"
},
{
"input": "14 17\n18 13\n15 16",
"output": "-1"
},
{
"input": "16 14\n15 15\n17 13",
"output": "9 7\n6 8"
},
{
"input": "14 11\n16 9\n13 12",
"output": "9 5\n7 4"
},
{
"input": "13 10\n11 12\n7 16",
"output": "4 9\n7 3"
},
{
"input": "14 8\n11 11\n13 9",
"output": "8 6\n3 5"
},
{
"input": "12 11\n13 10\n10 13",
"output": "-1"
},
{
"input": "6 5\n2 9\n5 6",
"output": "-1"
},
{
"input": "7 8\n8 7\n12 3",
"output": "-1"
},
{
"input": "7 11\n7 11\n6 12",
"output": "-1"
},
{
"input": "8 5\n11 2\n8 5",
"output": "-1"
},
{
"input": "10 16\n14 12\n14 12",
"output": "-1"
},
{
"input": "7 9\n4 12\n5 11",
"output": "-1"
},
{
"input": "11 13\n19 5\n12 12",
"output": "-1"
},
{
"input": "8 12\n5 15\n11 9",
"output": "2 6\n3 9"
},
{
"input": "16 5\n13 8\n10 11",
"output": "9 7\n4 1"
},
{
"input": "3 14\n8 9\n10 7",
"output": "2 1\n6 8"
},
{
"input": "12 14\n11 15\n9 17",
"output": "3 9\n8 6"
},
{
"input": "13 7\n9 11\n14 6",
"output": "8 5\n1 6"
},
{
"input": "13 8\n15 6\n11 10",
"output": "9 4\n6 2"
},
{
"input": "9 6\n5 10\n3 12",
"output": "1 8\n4 2"
},
{
"input": "12 7\n5 14\n8 11",
"output": "3 9\n2 5"
},
{
"input": "9 12\n3 17\n10 10",
"output": "-1"
},
{
"input": "3 8\n4 6\n5 5",
"output": "-1"
}
] | 1,642,641,618 | 2,147,483,647 | Python 3 | OK | TESTS | 52 | 122 | 0 | from itertools import permutations
if __name__ == '__main__':
r1, r2 = [int(i) for i in input().split(' ')]
c1, c2 = [int(i) for i in input().split(' ')]
d1, d2 = [int(i) for i in input().split(' ')]
perm = permutations(list(range(1, 10)), 4)
for i in perm:
A, B, C, D = i
if r1 == A + B and r2 == C + D and c1 == A + C and c2 == B + D and d1 == A + D and d2 == B + C:
print(A, B)
print(C, D)
exit()
print(-1)
| Title: Help Vasilisa the Wise 2
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasilisa the Wise from the Kingdom of Far Far Away got a magic box with a secret as a present from her friend Hellawisa the Wise from the Kingdom of A Little Closer. However, Vasilisa the Wise does not know what the box's secret is, since she cannot open it again. She hopes that you will help her one more time with that.
The box's lock looks as follows: it contains 4 identical deepenings for gems as a 2<=×<=2 square, and some integer numbers are written at the lock's edge near the deepenings. The example of a lock is given on the picture below.
The box is accompanied with 9 gems. Their shapes match the deepenings' shapes and each gem contains one number from 1 to 9 (each number is written on exactly one gem). The box will only open after it is decorated with gems correctly: that is, each deepening in the lock should be filled with exactly one gem. Also, the sums of numbers in the square's rows, columns and two diagonals of the square should match the numbers written at the lock's edge. For example, the above lock will open if we fill the deepenings with gems with numbers as is shown on the picture below.
Now Vasilisa the Wise wants to define, given the numbers on the box's lock, which gems she should put in the deepenings to open the box. Help Vasilisa to solve this challenging task.
Input Specification:
The input contains numbers written on the edges of the lock of the box. The first line contains space-separated integers *r*1 and *r*2 that define the required sums of numbers in the rows of the square. The second line contains space-separated integers *c*1 and *c*2 that define the required sums of numbers in the columns of the square. The third line contains space-separated integers *d*1 and *d*2 that define the required sums of numbers on the main and on the side diagonals of the square (1<=≤<=*r*1,<=*r*2,<=*c*1,<=*c*2,<=*d*1,<=*d*2<=≤<=20). Correspondence between the above 6 variables and places where they are written is shown on the picture below. For more clarifications please look at the second sample test that demonstrates the example given in the problem statement.
Output Specification:
Print the scheme of decorating the box with stones: two lines containing two space-separated integers from 1 to 9. The numbers should be pairwise different. If there is no solution for the given lock, then print the single number "-1" (without the quotes).
If there are several solutions, output any.
Demo Input:
['3 7\n4 6\n5 5\n', '11 10\n13 8\n5 16\n', '1 2\n3 4\n5 6\n', '10 10\n10 10\n10 10\n']
Demo Output:
['1 2\n3 4\n', '4 7\n9 1\n', '-1\n', '-1\n']
Note:
Pay attention to the last test from the statement: it is impossible to open the box because for that Vasilisa the Wise would need 4 identical gems containing number "5". However, Vasilisa only has one gem with each number from 1 to 9. | ```python
from itertools import permutations
if __name__ == '__main__':
r1, r2 = [int(i) for i in input().split(' ')]
c1, c2 = [int(i) for i in input().split(' ')]
d1, d2 = [int(i) for i in input().split(' ')]
perm = permutations(list(range(1, 10)), 4)
for i in perm:
A, B, C, D = i
if r1 == A + B and r2 == C + D and c1 == A + C and c2 == B + D and d1 == A + D and d2 == B + C:
print(A, B)
print(C, D)
exit()
print(-1)
``` | 3 | |
734 | A | Anton and Danik | PROGRAMMING | 800 | [
"implementation",
"strings"
] | null | null | Anton likes to play chess, and so does his friend Danik.
Once they have played *n* games in a row. For each game it's known who was the winner — Anton or Danik. None of the games ended with a tie.
Now Anton wonders, who won more games, he or Danik? Help him determine this. | The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of games played.
The second line contains a string *s*, consisting of *n* uppercase English letters 'A' and 'D' — the outcome of each of the games. The *i*-th character of the string is equal to 'A' if the Anton won the *i*-th game and 'D' if Danik won the *i*-th game. | If Anton won more games than Danik, print "Anton" (without quotes) in the only line of the output.
If Danik won more games than Anton, print "Danik" (without quotes) in the only line of the output.
If Anton and Danik won the same number of games, print "Friendship" (without quotes). | [
"6\nADAAAA\n",
"7\nDDDAADA\n",
"6\nDADADA\n"
] | [
"Anton\n",
"Danik\n",
"Friendship\n"
] | In the first sample, Anton won 6 games, while Danik — only 1. Hence, the answer is "Anton".
In the second sample, Anton won 3 games and Danik won 4 games, so the answer is "Danik".
In the third sample, both Anton and Danik won 3 games and the answer is "Friendship". | 500 | [
{
"input": "6\nADAAAA",
"output": "Anton"
},
{
"input": "7\nDDDAADA",
"output": "Danik"
},
{
"input": "6\nDADADA",
"output": "Friendship"
},
{
"input": "10\nDDDDADDADD",
"output": "Danik"
},
{
"input": "40\nAAAAAAAAADDAAAAAAAAAAADADDAAAAAAAAAAADAA",
"output": "Anton"
},
{
"input": "200\nDDDDDDDADDDDDDAADADAADAAADAADADAAADDDADDDDDDADDDAADDDAADADDDDDADDDAAAADAAADDDDDAAADAADDDAAAADDADADDDAADDAADAAADAADAAAADDAADDADAAAADADDDAAAAAADDAADAADAADADDDAAADAAAADADDADAAAAAADADADDDADDDAADDADDDAAAAD",
"output": "Friendship"
},
{
"input": "1\nA",
"output": "Anton"
},
{
"input": "1\nD",
"output": "Danik"
},
{
"input": "2\nDA",
"output": "Friendship"
},
{
"input": "4\nDADA",
"output": "Friendship"
},
{
"input": "4\nDAAD",
"output": "Friendship"
},
{
"input": "3\nADD",
"output": "Danik"
},
{
"input": "3\nDAD",
"output": "Danik"
},
{
"input": "2\nDA",
"output": "Friendship"
},
{
"input": "379\nAADAAAAAADDAAAAAADAADADADDAAAAADADDAADAAAADDDADAAAAAAADAADAAAAAAADAAAAAAAAADAAAAAAADAAAAAAAAAAADDDADAAAAAAAADAADADAAAADAAAAAAAAAAAAAAAAADAAAADDDAADAAAAAAADAAADAAADAADDDADDAAADAAAAAADDDADDDAAADAAAADAAAAAAAAADAAADAAAAAAAAADAAAAAAAAAAAAAAAAAADADAAAAAAAAAAADAAAAADAAAADAAAAAAAAAAAAADADAADAAAAAAAADAADAAAAAAAADAAAAAAAADDDAAAAAADAAADAAAAAADAADAAAAAADAAAADADAADAAAAAADAAAADAADDAADAADAAA",
"output": "Anton"
}
] | 1,693,930,357 | 2,147,483,647 | Python 3 | OK | TESTS | 25 | 62 | 102,400 | n = int(input())
games = input()
anton = 0
danik = 0
for i in range(len(games)):
if games[i] == "A":
anton += 1
else:
danik += 1
if anton > danik:
print("Anton")
elif anton < danik:
print("Danik")
else:
print("Friendship") | Title: Anton and Danik
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Anton likes to play chess, and so does his friend Danik.
Once they have played *n* games in a row. For each game it's known who was the winner — Anton or Danik. None of the games ended with a tie.
Now Anton wonders, who won more games, he or Danik? Help him determine this.
Input Specification:
The first line of the input contains a single integer *n* (1<=≤<=*n*<=≤<=100<=000) — the number of games played.
The second line contains a string *s*, consisting of *n* uppercase English letters 'A' and 'D' — the outcome of each of the games. The *i*-th character of the string is equal to 'A' if the Anton won the *i*-th game and 'D' if Danik won the *i*-th game.
Output Specification:
If Anton won more games than Danik, print "Anton" (without quotes) in the only line of the output.
If Danik won more games than Anton, print "Danik" (without quotes) in the only line of the output.
If Anton and Danik won the same number of games, print "Friendship" (without quotes).
Demo Input:
['6\nADAAAA\n', '7\nDDDAADA\n', '6\nDADADA\n']
Demo Output:
['Anton\n', 'Danik\n', 'Friendship\n']
Note:
In the first sample, Anton won 6 games, while Danik — only 1. Hence, the answer is "Anton".
In the second sample, Anton won 3 games and Danik won 4 games, so the answer is "Danik".
In the third sample, both Anton and Danik won 3 games and the answer is "Friendship". | ```python
n = int(input())
games = input()
anton = 0
danik = 0
for i in range(len(games)):
if games[i] == "A":
anton += 1
else:
danik += 1
if anton > danik:
print("Anton")
elif anton < danik:
print("Danik")
else:
print("Friendship")
``` | 3 | |
501 | B | Misha and Changing Handles | PROGRAMMING | 1,100 | [
"data structures",
"dsu",
"strings"
] | null | null | Misha hacked the Codeforces site. Then he decided to let all the users change their handles. A user can now change his handle any number of times. But each new handle must not be equal to any handle that is already used or that was used at some point.
Misha has a list of handle change requests. After completing the requests he wants to understand the relation between the original and the new handles of the users. Help him to do that. | The first line contains integer *q* (1<=≤<=*q*<=≤<=1000), the number of handle change requests.
Next *q* lines contain the descriptions of the requests, one per line.
Each query consists of two non-empty strings *old* and *new*, separated by a space. The strings consist of lowercase and uppercase Latin letters and digits. Strings *old* and *new* are distinct. The lengths of the strings do not exceed 20.
The requests are given chronologically. In other words, by the moment of a query there is a single person with handle *old*, and handle *new* is not used and has not been used by anyone. | In the first line output the integer *n* — the number of users that changed their handles at least once.
In the next *n* lines print the mapping between the old and the new handles of the users. Each of them must contain two strings, *old* and *new*, separated by a space, meaning that before the user had handle *old*, and after all the requests are completed, his handle is *new*. You may output lines in any order.
Each user who changes the handle must occur exactly once in this description. | [
"5\nMisha ILoveCodeforces\nVasya Petrov\nPetrov VasyaPetrov123\nILoveCodeforces MikeMirzayanov\nPetya Ivanov\n"
] | [
"3\nPetya Ivanov\nMisha MikeMirzayanov\nVasya VasyaPetrov123\n"
] | none | 500 | [
{
"input": "5\nMisha ILoveCodeforces\nVasya Petrov\nPetrov VasyaPetrov123\nILoveCodeforces MikeMirzayanov\nPetya Ivanov",
"output": "3\nPetya Ivanov\nMisha MikeMirzayanov\nVasya VasyaPetrov123"
},
{
"input": "1\nMisha Vasya",
"output": "1\nMisha Vasya"
},
{
"input": "10\na b\nb c\nc d\nd e\ne f\nf g\ng h\nh i\ni j\nj k",
"output": "1\na k"
},
{
"input": "5\n123abc abc123\nabc123 a1b2c3\na1b2c3 1A2B3C\n1 2\n2 Misha",
"output": "2\n123abc 1A2B3C\n1 Misha"
},
{
"input": "8\nM F\nS D\n1 2\nF G\n2 R\nD Q\nQ W\nW e",
"output": "3\nM G\n1 R\nS e"
},
{
"input": "17\nn5WhQ VCczxtxKwFio5U\nVCczxtxKwFio5U 1WMVGA17cd1LRcp4r\n1WMVGA17cd1LRcp4r SJl\nSJl D8bPUoIft5v1\nNAvvUgunbPZNCL9ZY2 jnLkarKYsotz\nD8bPUoIft5v1 DnDkHi7\njnLkarKYsotz GfjX109HSQ81gFEBJc\nGfjX109HSQ81gFEBJc kBJ0zrH78mveJ\nkBJ0zrH78mveJ 9DrAypYW\nDnDkHi7 3Wkho2PglMDaFQw\n3Wkho2PglMDaFQw pOqW\n9DrAypYW G3y0cXXGsWAh\npOqW yr1Ec\nG3y0cXXGsWAh HrmWWg5u4Hsy\nyr1Ec GkFeivXjQ01\nGkFeivXjQ01 mSsWgbCCZcotV4goiA\nHrmWWg5u4Hsy zkCmEV",
"output": "2\nn5WhQ mSsWgbCCZcotV4goiA\nNAvvUgunbPZNCL9ZY2 zkCmEV"
},
{
"input": "10\nH1nauWCJOImtVqXk gWPMQ9DHv5CtkYp9lwm9\nSEj 2knOMLyzr\n0v69ijnAc S7d7zGTjmlku01Gv\n2knOMLyzr otGmEd\nacwr3TfMV7oCIp RUSVFa9TIWlLsd7SB\nS7d7zGTjmlku01Gv Gd6ZufVmQnBpi\nS1 WOJLpk\nWOJLpk Gu\nRUSVFa9TIWlLsd7SB RFawatGnbVB\notGmEd OTB1zKiOI",
"output": "5\n0v69ijnAc Gd6ZufVmQnBpi\nS1 Gu\nSEj OTB1zKiOI\nacwr3TfMV7oCIp RFawatGnbVB\nH1nauWCJOImtVqXk gWPMQ9DHv5CtkYp9lwm9"
},
{
"input": "14\nTPdoztSZROpjZe z6F8bYFvnER4V5SP0n\n8Aa3PQY3hzHZTPEUz fhrZZPJ3iUS\nm9p888KaZAoQaO KNmdRSAlUVn8zXOM0\nAO s1VGWTCbHzM\ni 4F\nfhrZZPJ3iUS j0OVZQF6MvNcKN9xDZFJ\nDnlkXtaKNlYEI2ApBuwu DMA9i8ScKRxwhe72a3\nj0OVZQF6MvNcKN9xDZFJ DzjmeNqN0H4Teq0Awr\n4F wJcdxt1kwqfDeJ\nqxXlsa5t RHCL1K6aUyns\nr6WYbDaXt hEHw\nJ0Usg DKdKMFJ6tK8XA\nz6F8bYFvnER4V5SP0n 0alJ\nMijh2O6 qic8kXWuR6",
"output": "10\nTPdoztSZROpjZe 0alJ\nJ0Usg DKdKMFJ6tK8XA\nDnlkXtaKNlYEI2ApBuwu DMA9i8ScKRxwhe72a3\n8Aa3PQY3hzHZTPEUz DzjmeNqN0H4Teq0Awr\nm9p888KaZAoQaO KNmdRSAlUVn8zXOM0\nqxXlsa5t RHCL1K6aUyns\nr6WYbDaXt hEHw\nMijh2O6 qic8kXWuR6\nAO s1VGWTCbHzM\ni wJcdxt1kwqfDeJ"
},
{
"input": "14\nHAXRxayyf1Dj1F0mT hjR4A8IQMb0nyBtqG\nWNuMJa5Jg05qkqZOrL noNkWXrSidHGwxgbQ\nmOitVy6W52s0FENMz6 oLUkLNfojssvLvb1t\nhjR4A8IQMb0nyBtqG oA7uBFu4Oo\noA7uBFu4Oo M450\nM450 LXEzO4\noLUkLNfojssvLvb1t YG5\nnoNkWXrSidHGwxgbQ L\nL YBWzu4W\nYBWzu4W ML\nML scVZE9m8JnH\nLXEzO4 Ne0oBPY0Iy\nscVZE9m8JnH GXhznv\nYG5 UY08abilYF1LaXj49hQ",
"output": "3\nWNuMJa5Jg05qkqZOrL GXhznv\nHAXRxayyf1Dj1F0mT Ne0oBPY0Iy\nmOitVy6W52s0FENMz6 UY08abilYF1LaXj49hQ"
}
] | 1,594,393,798 | 2,147,483,647 | Python 3 | OK | TESTS | 49 | 109 | 6,963,200 | # inputList = [
# ['Misha', 'ILoveCodeforces'],['Vasya','Petrov'],['Petrov','VasyaPetrov123'],['ILoveCodeforces','MikeMirzayanov'],['Petya','Ivanov']
# ]
inputList = []
n = int(input())
for i in range(n):
tempList = list(input().split())
inputList.append(tempList)
oldNames = []
newNames = []
for tempList in inputList:
oldName, newName = tempList[0],tempList[1]
if oldName not in newNames:
oldNames.append(oldName)
newNames.append(newName)
# print('adike')
# print(oldName,newName)
# print('oldNames:',oldNames)
# print('newNames:',newNames)
# print('\n')
else:
idx = newNames.index(oldName)
newNames[idx] = newName
# print('ei khane')
# print(oldName,newName)
# print('oldNames:',oldNames)
# print('newNames:',newNames)
# print('\n')
print(len(oldNames))
for oldName,newName in zip(oldNames,newNames):
print(oldName,newName) | Title: Misha and Changing Handles
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Misha hacked the Codeforces site. Then he decided to let all the users change their handles. A user can now change his handle any number of times. But each new handle must not be equal to any handle that is already used or that was used at some point.
Misha has a list of handle change requests. After completing the requests he wants to understand the relation between the original and the new handles of the users. Help him to do that.
Input Specification:
The first line contains integer *q* (1<=≤<=*q*<=≤<=1000), the number of handle change requests.
Next *q* lines contain the descriptions of the requests, one per line.
Each query consists of two non-empty strings *old* and *new*, separated by a space. The strings consist of lowercase and uppercase Latin letters and digits. Strings *old* and *new* are distinct. The lengths of the strings do not exceed 20.
The requests are given chronologically. In other words, by the moment of a query there is a single person with handle *old*, and handle *new* is not used and has not been used by anyone.
Output Specification:
In the first line output the integer *n* — the number of users that changed their handles at least once.
In the next *n* lines print the mapping between the old and the new handles of the users. Each of them must contain two strings, *old* and *new*, separated by a space, meaning that before the user had handle *old*, and after all the requests are completed, his handle is *new*. You may output lines in any order.
Each user who changes the handle must occur exactly once in this description.
Demo Input:
['5\nMisha ILoveCodeforces\nVasya Petrov\nPetrov VasyaPetrov123\nILoveCodeforces MikeMirzayanov\nPetya Ivanov\n']
Demo Output:
['3\nPetya Ivanov\nMisha MikeMirzayanov\nVasya VasyaPetrov123\n']
Note:
none | ```python
# inputList = [
# ['Misha', 'ILoveCodeforces'],['Vasya','Petrov'],['Petrov','VasyaPetrov123'],['ILoveCodeforces','MikeMirzayanov'],['Petya','Ivanov']
# ]
inputList = []
n = int(input())
for i in range(n):
tempList = list(input().split())
inputList.append(tempList)
oldNames = []
newNames = []
for tempList in inputList:
oldName, newName = tempList[0],tempList[1]
if oldName not in newNames:
oldNames.append(oldName)
newNames.append(newName)
# print('adike')
# print(oldName,newName)
# print('oldNames:',oldNames)
# print('newNames:',newNames)
# print('\n')
else:
idx = newNames.index(oldName)
newNames[idx] = newName
# print('ei khane')
# print(oldName,newName)
# print('oldNames:',oldNames)
# print('newNames:',newNames)
# print('\n')
print(len(oldNames))
for oldName,newName in zip(oldNames,newNames):
print(oldName,newName)
``` | 3 | |
933 | A | A Twisty Movement | PROGRAMMING | 1,800 | [
"dp"
] | null | null | A dragon symbolizes wisdom, power and wealth. On Lunar New Year's Day, people model a dragon with bamboo strips and clothes, raise them with rods, and hold the rods high and low to resemble a flying dragon.
A performer holding the rod low is represented by a 1, while one holding it high is represented by a 2. Thus, the line of performers can be represented by a sequence *a*1,<=*a*2,<=...,<=*a**n*.
Little Tommy is among them. He would like to choose an interval [*l*,<=*r*] (1<=≤<=*l*<=≤<=*r*<=≤<=*n*), then reverse *a**l*,<=*a**l*<=+<=1,<=...,<=*a**r* so that the length of the longest non-decreasing subsequence of the new sequence is maximum.
A non-decreasing subsequence is a sequence of indices *p*1,<=*p*2,<=...,<=*p**k*, such that *p*1<=<<=*p*2<=<<=...<=<<=*p**k* and *a**p*1<=≤<=*a**p*2<=≤<=...<=≤<=*a**p**k*. The length of the subsequence is *k*. | The first line contains an integer *n* (1<=≤<=*n*<=≤<=2000), denoting the length of the original sequence.
The second line contains *n* space-separated integers, describing the original sequence *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=2,<=*i*<==<=1,<=2,<=...,<=*n*). | Print a single integer, which means the maximum possible length of the longest non-decreasing subsequence of the new sequence. | [
"4\n1 2 1 2\n",
"10\n1 1 2 2 2 1 1 2 2 1\n"
] | [
"4\n",
"9\n"
] | In the first example, after reversing [2, 3], the array will become [1, 1, 2, 2], where the length of the longest non-decreasing subsequence is 4.
In the second example, after reversing [3, 7], the array will become [1, 1, 1, 1, 2, 2, 2, 2, 2, 1], where the length of the longest non-decreasing subsequence is 9. | 500 | [
{
"input": "4\n1 2 1 2",
"output": "4"
},
{
"input": "10\n1 1 2 2 2 1 1 2 2 1",
"output": "9"
},
{
"input": "200\n2 1 1 2 1 2 2 2 2 2 1 2 2 1 1 2 2 1 1 1 2 1 1 2 2 2 2 2 1 1 2 1 2 1 1 2 1 1 1 1 2 1 2 2 1 2 1 1 1 2 1 1 1 2 2 2 1 1 1 1 2 2 2 1 2 2 2 1 2 2 2 1 2 1 2 1 2 1 1 1 1 2 2 2 1 1 2 1 2 1 2 1 2 2 1 1 1 2 2 2 2 1 2 2 2 1 1 1 1 2 1 1 1 2 2 1 2 1 2 2 2 1 2 1 2 1 2 1 2 2 2 1 2 2 2 1 1 1 1 2 1 2 1 1 1 2 1 2 2 2 1 2 1 1 1 1 1 1 2 1 1 2 2 2 1 2 1 1 1 1 2 2 1 2 1 2 1 2 1 2 1 2 2 1 1 1 1 2 2 1 1 2 2 1 2 2 1 2 2 2",
"output": "116"
},
{
"input": "200\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "200"
},
{
"input": "1\n2",
"output": "1"
},
{
"input": "2\n1 2",
"output": "2"
},
{
"input": "2\n2 1",
"output": "2"
},
{
"input": "3\n2 1 2",
"output": "3"
},
{
"input": "3\n1 2 1",
"output": "3"
},
{
"input": "100\n1 1 2 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 2 1 2 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 2 1 1 1 1 1 1 2 1 1 1 1 1 1 2 1 2 2 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 2 1 2 1 1 1 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2",
"output": "89"
},
{
"input": "100\n1 2 1 2 2 2 1 1 2 2 2 1 2 2 2 1 1 1 1 2 2 2 1 1 1 1 1 2 1 1 2 2 2 2 1 1 2 2 2 1 2 1 2 1 2 1 2 2 1 2 2 1 2 1 2 2 1 2 1 1 2 2 1 2 2 1 1 1 1 2 2 1 2 2 1 1 1 1 1 1 1 2 2 2 1 1 2 2 1 2 2 1 1 1 2 2 1 1 1 1",
"output": "60"
},
{
"input": "100\n1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 2 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 2 1 1 1 1 1 1 2 1 2 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 2 2 1 1 1 1 1 1 2 2",
"output": "91"
},
{
"input": "100\n2 2 2 2 1 2 1 1 1 1 2 1 1 1 2 1 1 1 1 2 2 1 1 1 1 2 1 1 1 2 1 2 1 2 2 2 2 2 1 1 1 1 2 1 1 2 1 1 2 2 1 1 1 1 2 1 1 2 2 2 2 1 1 1 2 1 1 1 2 2 1 1 2 1 2 2 2 1 1 2 2 1 1 2 2 1 1 1 2 2 1 1 2 2 2 1 1 1 2 2",
"output": "63"
},
{
"input": "200\n1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 1 2 2 2 2 1 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2 2 1 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2",
"output": "187"
},
{
"input": "200\n1 2 1 1 1 1 1 1 2 1 1 1 2 1 1 1 1 1 1 2 2 1 1 1 1 1 2 1 1 1 1 2 1 2 1 1 1 2 1 2 1 1 2 2 2 2 2 1 2 1 1 2 2 2 2 1 2 2 1 1 2 2 1 2 1 1 1 2 2 1 2 2 1 2 2 2 2 2 1 1 1 2 2 2 1 1 2 2 1 2 1 2 2 1 2 2 1 2 1 2 2 1 1 1 1 1 2 1 1 1 1 2 1 1 2 1 1 1 2 2 2 1 1 2 1 1 2 1 2 1 1 1 2 1 2 1 2 2 1 1 1 1 2 1 1 2 1 2 1 1 2 2 1 1 1 2 1 1 1 2 1 2 1 2 1 1 1 1 2 2 2 1 2 1 2 2 1 2 1 1 2 1 1 2 1 2 1 2 1 1 2 1 1 2 2 1 2 1 1 2",
"output": "131"
},
{
"input": "200\n1 2 2 1 2 1 1 1 1 1 2 1 2 2 2 2 2 1 2 1 1 2 2 2 1 2 1 1 2 2 1 1 1 2 2 1 2 1 2 2 1 1 1 2 1 1 1 1 1 1 2 2 2 1 2 1 1 2 2 1 2 1 1 1 2 2 1 2 2 2 2 1 1 2 2 2 2 2 1 2 1 2 2 1 2 2 2 2 2 1 2 1 1 1 2 1 1 2 2 2 1 2 1 1 1 1 1 1 2 2 2 1 2 2 1 1 1 2 2 2 1 1 2 2 2 1 2 1 1 2 1 2 2 1 1 1 2 2 1 1 1 1 1 2 2 2 2 2 1 1 1 1 1 2 1 2 2 1 1 1 2 2 2 1 2 2 1 2 2 2 2 1 2 1 1 1 2 1 1 2 1 1 1 1 2 1 2 1 1 1 2 2 2 2 1 1 2 2 2 2",
"output": "118"
},
{
"input": "20\n1 2 2 2 2 2 2 2 1 1 1 2 2 2 1 2 1 1 2 1",
"output": "16"
},
{
"input": "200\n2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 1 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1",
"output": "191"
},
{
"input": "10\n2 2 2 2 2 2 2 2 2 1",
"output": "10"
},
{
"input": "6\n2 2 2 1 1 1",
"output": "6"
}
] | 1,541,757,993 | 2,147,483,647 | Python 3 | COMPILATION_ERROR | TESTS | 0 | 0 | 0 | #In the Name of God
n = int(input())
X = list ( map ( int , input().split() ) )
DP = [ 0 , 0 , 0 , 0 ]
for i in range ( len ( X ) ) :
x = input ()
if ( x == 1 ) :
DP[0] += 1
DP[2] += 1
if ( x == 2 ) :
DP[1] += 1
DP[3] += 1
for j in range ( 1 , 4 ) :
DP[j] = max ( DP[j] , DP[j-1] )
n -= 1
print DP[3]
| Title: A Twisty Movement
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
A dragon symbolizes wisdom, power and wealth. On Lunar New Year's Day, people model a dragon with bamboo strips and clothes, raise them with rods, and hold the rods high and low to resemble a flying dragon.
A performer holding the rod low is represented by a 1, while one holding it high is represented by a 2. Thus, the line of performers can be represented by a sequence *a*1,<=*a*2,<=...,<=*a**n*.
Little Tommy is among them. He would like to choose an interval [*l*,<=*r*] (1<=≤<=*l*<=≤<=*r*<=≤<=*n*), then reverse *a**l*,<=*a**l*<=+<=1,<=...,<=*a**r* so that the length of the longest non-decreasing subsequence of the new sequence is maximum.
A non-decreasing subsequence is a sequence of indices *p*1,<=*p*2,<=...,<=*p**k*, such that *p*1<=<<=*p*2<=<<=...<=<<=*p**k* and *a**p*1<=≤<=*a**p*2<=≤<=...<=≤<=*a**p**k*. The length of the subsequence is *k*.
Input Specification:
The first line contains an integer *n* (1<=≤<=*n*<=≤<=2000), denoting the length of the original sequence.
The second line contains *n* space-separated integers, describing the original sequence *a*1,<=*a*2,<=...,<=*a**n* (1<=≤<=*a**i*<=≤<=2,<=*i*<==<=1,<=2,<=...,<=*n*).
Output Specification:
Print a single integer, which means the maximum possible length of the longest non-decreasing subsequence of the new sequence.
Demo Input:
['4\n1 2 1 2\n', '10\n1 1 2 2 2 1 1 2 2 1\n']
Demo Output:
['4\n', '9\n']
Note:
In the first example, after reversing [2, 3], the array will become [1, 1, 2, 2], where the length of the longest non-decreasing subsequence is 4.
In the second example, after reversing [3, 7], the array will become [1, 1, 1, 1, 2, 2, 2, 2, 2, 1], where the length of the longest non-decreasing subsequence is 9. | ```python
#In the Name of God
n = int(input())
X = list ( map ( int , input().split() ) )
DP = [ 0 , 0 , 0 , 0 ]
for i in range ( len ( X ) ) :
x = input ()
if ( x == 1 ) :
DP[0] += 1
DP[2] += 1
if ( x == 2 ) :
DP[1] += 1
DP[3] += 1
for j in range ( 1 , 4 ) :
DP[j] = max ( DP[j] , DP[j-1] )
n -= 1
print DP[3]
``` | -1 | |
742 | A | Arpa’s hard exam and Mehrdad’s naive cheat | PROGRAMMING | 1,000 | [
"implementation",
"math",
"number theory"
] | null | null | There exists an island called Arpa’s land, some beautiful girls live there, as ugly ones do.
Mehrdad wants to become minister of Arpa’s land. Arpa has prepared an exam. Exam has only one question, given *n*, print the last digit of 1378*n*.
Mehrdad has become quite confused and wants you to help him. Please help, although it's a naive cheat. | The single line of input contains one integer *n* (0<=<=≤<=<=*n*<=<=≤<=<=109). | Print single integer — the last digit of 1378*n*. | [
"1\n",
"2\n"
] | [
"8",
"4"
] | In the first example, last digit of 1378<sup class="upper-index">1</sup> = 1378 is 8.
In the second example, last digit of 1378<sup class="upper-index">2</sup> = 1378·1378 = 1898884 is 4. | 500 | [
{
"input": "1",
"output": "8"
},
{
"input": "2",
"output": "4"
},
{
"input": "1000",
"output": "6"
},
{
"input": "3",
"output": "2"
},
{
"input": "4",
"output": "6"
},
{
"input": "1000000000",
"output": "6"
},
{
"input": "5",
"output": "8"
},
{
"input": "6",
"output": "4"
},
{
"input": "999999999",
"output": "2"
},
{
"input": "1378",
"output": "4"
},
{
"input": "13781378",
"output": "4"
},
{
"input": "51202278",
"output": "4"
},
{
"input": "999999998",
"output": "4"
},
{
"input": "999999997",
"output": "8"
},
{
"input": "12193721",
"output": "8"
},
{
"input": "0",
"output": "1"
},
{
"input": "989898989",
"output": "8"
},
{
"input": "7",
"output": "2"
},
{
"input": "8",
"output": "6"
},
{
"input": "9",
"output": "8"
},
{
"input": "10",
"output": "4"
},
{
"input": "11",
"output": "2"
},
{
"input": "12",
"output": "6"
},
{
"input": "13",
"output": "8"
},
{
"input": "14",
"output": "4"
},
{
"input": "15",
"output": "2"
},
{
"input": "16",
"output": "6"
},
{
"input": "999999996",
"output": "6"
},
{
"input": "999999995",
"output": "2"
},
{
"input": "999999994",
"output": "4"
}
] | 1,648,329,634 | 2,147,483,647 | Python 3 | OK | TESTS | 30 | 46 | 0 | n = int(input())
if n == 0:
print(1)
elif n > 0:
units = [8, 4, 2, 6]
n = (n - 1) % 4
print(units[n])
| Title: Arpa’s hard exam and Mehrdad’s naive cheat
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
There exists an island called Arpa’s land, some beautiful girls live there, as ugly ones do.
Mehrdad wants to become minister of Arpa’s land. Arpa has prepared an exam. Exam has only one question, given *n*, print the last digit of 1378*n*.
Mehrdad has become quite confused and wants you to help him. Please help, although it's a naive cheat.
Input Specification:
The single line of input contains one integer *n* (0<=<=≤<=<=*n*<=<=≤<=<=109).
Output Specification:
Print single integer — the last digit of 1378*n*.
Demo Input:
['1\n', '2\n']
Demo Output:
['8', '4']
Note:
In the first example, last digit of 1378<sup class="upper-index">1</sup> = 1378 is 8.
In the second example, last digit of 1378<sup class="upper-index">2</sup> = 1378·1378 = 1898884 is 4. | ```python
n = int(input())
if n == 0:
print(1)
elif n > 0:
units = [8, 4, 2, 6]
n = (n - 1) % 4
print(units[n])
``` | 3 | |
727 | A | Transformation: from A to B | PROGRAMMING | 1,000 | [
"brute force",
"dfs and similar",
"math"
] | null | null | Vasily has a number *a*, which he wants to turn into a number *b*. For this purpose, he can do two types of operations:
- multiply the current number by 2 (that is, replace the number *x* by 2·*x*); - append the digit 1 to the right of current number (that is, replace the number *x* by 10·*x*<=+<=1).
You need to help Vasily to transform the number *a* into the number *b* using only the operations described above, or find that it is impossible.
Note that in this task you are not required to minimize the number of operations. It suffices to find any way to transform *a* into *b*. | The first line contains two positive integers *a* and *b* (1<=≤<=*a*<=<<=*b*<=≤<=109) — the number which Vasily has and the number he wants to have. | If there is no way to get *b* from *a*, print "NO" (without quotes).
Otherwise print three lines. On the first line print "YES" (without quotes). The second line should contain single integer *k* — the length of the transformation sequence. On the third line print the sequence of transformations *x*1,<=*x*2,<=...,<=*x**k*, where:
- *x*1 should be equal to *a*, - *x**k* should be equal to *b*, - *x**i* should be obtained from *x**i*<=-<=1 using any of two described operations (1<=<<=*i*<=≤<=*k*).
If there are multiple answers, print any of them. | [
"2 162\n",
"4 42\n",
"100 40021\n"
] | [
"YES\n5\n2 4 8 81 162 \n",
"NO\n",
"YES\n5\n100 200 2001 4002 40021 \n"
] | none | 1,000 | [
{
"input": "2 162",
"output": "YES\n5\n2 4 8 81 162 "
},
{
"input": "4 42",
"output": "NO"
},
{
"input": "100 40021",
"output": "YES\n5\n100 200 2001 4002 40021 "
},
{
"input": "1 111111111",
"output": "YES\n9\n1 11 111 1111 11111 111111 1111111 11111111 111111111 "
},
{
"input": "1 1000000000",
"output": "NO"
},
{
"input": "999999999 1000000000",
"output": "NO"
},
{
"input": "1 2",
"output": "YES\n2\n1 2 "
},
{
"input": "1 536870912",
"output": "YES\n30\n1 2 4 8 16 32 64 128 256 512 1024 2048 4096 8192 16384 32768 65536 131072 262144 524288 1048576 2097152 4194304 8388608 16777216 33554432 67108864 134217728 268435456 536870912 "
},
{
"input": "11111 11111111",
"output": "YES\n4\n11111 111111 1111111 11111111 "
},
{
"input": "59139 946224",
"output": "YES\n5\n59139 118278 236556 473112 946224 "
},
{
"input": "9859 19718",
"output": "YES\n2\n9859 19718 "
},
{
"input": "25987 51974222",
"output": "YES\n5\n25987 259871 2598711 25987111 51974222 "
},
{
"input": "9411 188222222",
"output": "YES\n6\n9411 94111 941111 9411111 94111111 188222222 "
},
{
"input": "25539 510782222",
"output": "YES\n6\n25539 255391 2553911 25539111 255391111 510782222 "
},
{
"input": "76259 610072",
"output": "YES\n4\n76259 152518 305036 610072 "
},
{
"input": "92387 184774",
"output": "YES\n2\n92387 184774 "
},
{
"input": "8515 85151111",
"output": "YES\n5\n8515 85151 851511 8515111 85151111 "
},
{
"input": "91939 9193911",
"output": "YES\n3\n91939 919391 9193911 "
},
{
"input": "30518 610361",
"output": "YES\n3\n30518 61036 610361 "
},
{
"input": "46646 373168844",
"output": "YES\n7\n46646 466461 932922 9329221 93292211 186584422 373168844 "
},
{
"input": "30070 300701",
"output": "YES\n2\n30070 300701 "
},
{
"input": "13494 1079528",
"output": "YES\n5\n13494 134941 269882 539764 1079528 "
},
{
"input": "96918 775344422",
"output": "YES\n7\n96918 193836 1938361 3876722 38767221 387672211 775344422 "
},
{
"input": "13046 260921",
"output": "YES\n3\n13046 26092 260921 "
},
{
"input": "29174 5834811",
"output": "YES\n4\n29174 58348 583481 5834811 "
},
{
"input": "79894 319576421",
"output": "YES\n6\n79894 798941 1597882 15978821 31957642 319576421 "
},
{
"input": "96022 1920442",
"output": "YES\n3\n96022 960221 1920442 "
},
{
"input": "79446 6355681",
"output": "YES\n5\n79446 158892 317784 635568 6355681 "
},
{
"input": "5440 27853056",
"output": "YES\n11\n5440 10880 108801 217602 435204 870408 1740816 3481632 6963264 13926528 27853056 "
},
{
"input": "250000000 705032705",
"output": "NO"
},
{
"input": "17 35",
"output": "NO"
},
{
"input": "1 3",
"output": "NO"
},
{
"input": "2 11",
"output": "NO"
}
] | 1,632,952,079 | 2,147,483,647 | PyPy 3 | OK | TESTS | 33 | 93 | 20,172,800 | a,b = map(int,input().split())
lst = []
while b > a:
lst.append(b)
if str(b)[-1] == '1':
b = int(str(b)[:-1])
else:
if b%2 == 0:
b //= 2
else:
print('NO')
exit()
lst.append(a)
if b == a:
print('YES')
print(len(lst))
print(*lst[::-1])
else:
print('NO') | Title: Transformation: from A to B
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasily has a number *a*, which he wants to turn into a number *b*. For this purpose, he can do two types of operations:
- multiply the current number by 2 (that is, replace the number *x* by 2·*x*); - append the digit 1 to the right of current number (that is, replace the number *x* by 10·*x*<=+<=1).
You need to help Vasily to transform the number *a* into the number *b* using only the operations described above, or find that it is impossible.
Note that in this task you are not required to minimize the number of operations. It suffices to find any way to transform *a* into *b*.
Input Specification:
The first line contains two positive integers *a* and *b* (1<=≤<=*a*<=<<=*b*<=≤<=109) — the number which Vasily has and the number he wants to have.
Output Specification:
If there is no way to get *b* from *a*, print "NO" (without quotes).
Otherwise print three lines. On the first line print "YES" (without quotes). The second line should contain single integer *k* — the length of the transformation sequence. On the third line print the sequence of transformations *x*1,<=*x*2,<=...,<=*x**k*, where:
- *x*1 should be equal to *a*, - *x**k* should be equal to *b*, - *x**i* should be obtained from *x**i*<=-<=1 using any of two described operations (1<=<<=*i*<=≤<=*k*).
If there are multiple answers, print any of them.
Demo Input:
['2 162\n', '4 42\n', '100 40021\n']
Demo Output:
['YES\n5\n2 4 8 81 162 \n', 'NO\n', 'YES\n5\n100 200 2001 4002 40021 \n']
Note:
none | ```python
a,b = map(int,input().split())
lst = []
while b > a:
lst.append(b)
if str(b)[-1] == '1':
b = int(str(b)[:-1])
else:
if b%2 == 0:
b //= 2
else:
print('NO')
exit()
lst.append(a)
if b == a:
print('YES')
print(len(lst))
print(*lst[::-1])
else:
print('NO')
``` | 3 | |
579 | A | Raising Bacteria | PROGRAMMING | 1,000 | [
"bitmasks"
] | null | null | You are a lover of bacteria. You want to raise some bacteria in a box.
Initially, the box is empty. Each morning, you can put any number of bacteria into the box. And each night, every bacterium in the box will split into two bacteria. You hope to see exactly *x* bacteria in the box at some moment.
What is the minimum number of bacteria you need to put into the box across those days? | The only line containing one integer *x* (1<=≤<=*x*<=≤<=109). | The only line containing one integer: the answer. | [
"5\n",
"8\n"
] | [
"2\n",
"1\n"
] | For the first sample, we can add one bacterium in the box in the first day morning and at the third morning there will be 4 bacteria in the box. Now we put one more resulting 5 in the box. We added 2 bacteria in the process so the answer is 2.
For the second sample, we can put one in the first morning and in the 4-th morning there will be 8 in the box. So the answer is 1. | 250 | [
{
"input": "5",
"output": "2"
},
{
"input": "8",
"output": "1"
},
{
"input": "536870911",
"output": "29"
},
{
"input": "1",
"output": "1"
},
{
"input": "343000816",
"output": "14"
},
{
"input": "559980448",
"output": "12"
},
{
"input": "697681824",
"output": "14"
},
{
"input": "41313494",
"output": "14"
},
{
"input": "673935585",
"output": "13"
},
{
"input": "117422204",
"output": "19"
},
{
"input": "954746654",
"output": "15"
},
{
"input": "536838144",
"output": "14"
},
{
"input": "1000000000",
"output": "13"
},
{
"input": "2",
"output": "1"
},
{
"input": "3",
"output": "2"
},
{
"input": "4",
"output": "1"
},
{
"input": "6",
"output": "2"
},
{
"input": "7",
"output": "3"
},
{
"input": "9",
"output": "2"
},
{
"input": "10",
"output": "2"
},
{
"input": "999999999",
"output": "21"
},
{
"input": "999999998",
"output": "20"
},
{
"input": "999999997",
"output": "20"
},
{
"input": "999999996",
"output": "19"
},
{
"input": "999999995",
"output": "20"
},
{
"input": "999999994",
"output": "19"
},
{
"input": "999999993",
"output": "19"
},
{
"input": "999999992",
"output": "18"
},
{
"input": "999999991",
"output": "20"
},
{
"input": "999999990",
"output": "19"
},
{
"input": "536870910",
"output": "28"
},
{
"input": "536870912",
"output": "1"
},
{
"input": "536870913",
"output": "2"
},
{
"input": "536870914",
"output": "2"
},
{
"input": "22",
"output": "3"
},
{
"input": "14",
"output": "3"
}
] | 1,692,388,834 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 2 | 218 | 2,867,200 | import math
def is_in_base_two(n: int):
if n == 1:
return False
p = 2
if n == p:
return True
while True:
p *= 2
if p > n:
return False
if p == n:
return True
def find_nearest_power_of_two(n: int):
power = 2
last_power = 2
while n > power:
last_power = power
power *= 2
# print(f"current power {power}")
# print(f"current last_power {last_power}")
if power > n:
return int(math.log(last_power, 2))
if power == n:
return int(math.log(power, 2))
return 1
def find_needed_bact(n:int):
a = n
i = 0
while True:
i += 1
if a == 1: break
if is_in_base_two(a): break
a = a - (find_nearest_power_of_two(a) ** 2)
print(i)
def solve():
pass
def main():
x = int(input())
find_needed_bact(x)
# solve()
# print(find_nearest_power_of_two(12))
# print(is_in_base_two(68))
if __name__ == "__main__":
main()
| Title: Raising Bacteria
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are a lover of bacteria. You want to raise some bacteria in a box.
Initially, the box is empty. Each morning, you can put any number of bacteria into the box. And each night, every bacterium in the box will split into two bacteria. You hope to see exactly *x* bacteria in the box at some moment.
What is the minimum number of bacteria you need to put into the box across those days?
Input Specification:
The only line containing one integer *x* (1<=≤<=*x*<=≤<=109).
Output Specification:
The only line containing one integer: the answer.
Demo Input:
['5\n', '8\n']
Demo Output:
['2\n', '1\n']
Note:
For the first sample, we can add one bacterium in the box in the first day morning and at the third morning there will be 4 bacteria in the box. Now we put one more resulting 5 in the box. We added 2 bacteria in the process so the answer is 2.
For the second sample, we can put one in the first morning and in the 4-th morning there will be 8 in the box. So the answer is 1. | ```python
import math
def is_in_base_two(n: int):
if n == 1:
return False
p = 2
if n == p:
return True
while True:
p *= 2
if p > n:
return False
if p == n:
return True
def find_nearest_power_of_two(n: int):
power = 2
last_power = 2
while n > power:
last_power = power
power *= 2
# print(f"current power {power}")
# print(f"current last_power {last_power}")
if power > n:
return int(math.log(last_power, 2))
if power == n:
return int(math.log(power, 2))
return 1
def find_needed_bact(n:int):
a = n
i = 0
while True:
i += 1
if a == 1: break
if is_in_base_two(a): break
a = a - (find_nearest_power_of_two(a) ** 2)
print(i)
def solve():
pass
def main():
x = int(input())
find_needed_bact(x)
# solve()
# print(find_nearest_power_of_two(12))
# print(is_in_base_two(68))
if __name__ == "__main__":
main()
``` | 0 | |
399 | A | Pages | PROGRAMMING | 0 | [
"implementation"
] | null | null | User ainta is making a web site. This time he is going to make a navigation of the pages. In his site, there are *n* pages numbered by integers from 1 to *n*. Assume that somebody is on the *p*-th page now. The navigation will look like this:
When someone clicks the button "<<" he is redirected to page 1, and when someone clicks the button ">>" he is redirected to page *n*. Of course if someone clicks on a number, he is redirected to the corresponding page.
There are some conditions in the navigation:
- If page 1 is in the navigation, the button "<<" must not be printed. - If page *n* is in the navigation, the button ">>" must not be printed. - If the page number is smaller than 1 or greater than *n*, it must not be printed.
You can see some examples of the navigations. Make a program that prints the navigation. | The first and the only line contains three integers *n*, *p*, *k* (3<=≤<=*n*<=≤<=100; 1<=≤<=*p*<=≤<=*n*; 1<=≤<=*k*<=≤<=*n*) | Print the proper navigation. Follow the format of the output from the test samples. | [
"17 5 2\n",
"6 5 2\n",
"6 1 2\n",
"6 2 2\n",
"9 6 3\n",
"10 6 3\n",
"8 5 4\n"
] | [
"<< 3 4 (5) 6 7 >> ",
"<< 3 4 (5) 6 ",
"(1) 2 3 >> ",
"1 (2) 3 4 >>",
"<< 3 4 5 (6) 7 8 9",
"<< 3 4 5 (6) 7 8 9 >>",
"1 2 3 4 (5) 6 7 8 "
] | none | 500 | [
{
"input": "17 5 2",
"output": "<< 3 4 (5) 6 7 >> "
},
{
"input": "6 5 2",
"output": "<< 3 4 (5) 6 "
},
{
"input": "6 1 2",
"output": "(1) 2 3 >> "
},
{
"input": "6 2 2",
"output": "1 (2) 3 4 >> "
},
{
"input": "9 6 3",
"output": "<< 3 4 5 (6) 7 8 9 "
},
{
"input": "10 6 3",
"output": "<< 3 4 5 (6) 7 8 9 >> "
},
{
"input": "8 5 4",
"output": "1 2 3 4 (5) 6 7 8 "
},
{
"input": "100 10 20",
"output": "1 2 3 4 5 6 7 8 9 (10) 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 >> "
},
{
"input": "100 25 11",
"output": "<< 14 15 16 17 18 19 20 21 22 23 24 (25) 26 27 28 29 30 31 32 33 34 35 36 >> "
},
{
"input": "5 2 1",
"output": "1 (2) 3 >> "
},
{
"input": "5 3 1",
"output": "<< 2 (3) 4 >> "
},
{
"input": "79 35 12",
"output": "<< 23 24 25 26 27 28 29 30 31 32 33 34 (35) 36 37 38 39 40 41 42 43 44 45 46 47 >> "
},
{
"input": "100 99 5",
"output": "<< 94 95 96 97 98 (99) 100 "
},
{
"input": "100 99 15",
"output": "<< 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 (99) 100 "
},
{
"input": "100 100 17",
"output": "<< 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 (100) "
},
{
"input": "100 35 28",
"output": "<< 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 (35) 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 >> "
},
{
"input": "100 46 38",
"output": "<< 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 (46) 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 >> "
},
{
"input": "100 46 48",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 (46) 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 >> "
},
{
"input": "100 10 100",
"output": "1 2 3 4 5 6 7 8 9 (10) 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 "
},
{
"input": "3 1 1",
"output": "(1) 2 >> "
},
{
"input": "3 2 1",
"output": "1 (2) 3 "
},
{
"input": "17 5 3",
"output": "<< 2 3 4 (5) 6 7 8 >> "
},
{
"input": "3 1 3",
"output": "(1) 2 3 "
},
{
"input": "7 5 1",
"output": "<< 4 (5) 6 >> "
},
{
"input": "5 5 5",
"output": "1 2 3 4 (5) "
},
{
"input": "5 3 5",
"output": "1 2 (3) 4 5 "
}
] | 1,572,939,007 | 2,147,483,647 | Python 3 | OK | TESTS | 26 | 124 | 0 |
def range_of_input(n,p,k):
if p-k>1:
print("<< ",end=" ")
for i in range(1,n+1):
if i in range(p-k,p+k+1):
if(i==p):
print("(%d) "%i,end=" ")
else:
print("%d "%i,end=" ")
if p+k<n:
print(">>")
from array import array
arr=array('i',[])
x=[int(x) for x in input().split()]
arr.extend(x)
n=arr[0]
p=arr[1]
k=arr[2]
range_of_input(n,p,k) | Title: Pages
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
User ainta is making a web site. This time he is going to make a navigation of the pages. In his site, there are *n* pages numbered by integers from 1 to *n*. Assume that somebody is on the *p*-th page now. The navigation will look like this:
When someone clicks the button "<<" he is redirected to page 1, and when someone clicks the button ">>" he is redirected to page *n*. Of course if someone clicks on a number, he is redirected to the corresponding page.
There are some conditions in the navigation:
- If page 1 is in the navigation, the button "<<" must not be printed. - If page *n* is in the navigation, the button ">>" must not be printed. - If the page number is smaller than 1 or greater than *n*, it must not be printed.
You can see some examples of the navigations. Make a program that prints the navigation.
Input Specification:
The first and the only line contains three integers *n*, *p*, *k* (3<=≤<=*n*<=≤<=100; 1<=≤<=*p*<=≤<=*n*; 1<=≤<=*k*<=≤<=*n*)
Output Specification:
Print the proper navigation. Follow the format of the output from the test samples.
Demo Input:
['17 5 2\n', '6 5 2\n', '6 1 2\n', '6 2 2\n', '9 6 3\n', '10 6 3\n', '8 5 4\n']
Demo Output:
['<< 3 4 (5) 6 7 >> ', '<< 3 4 (5) 6 ', '(1) 2 3 >> ', '1 (2) 3 4 >>', '<< 3 4 5 (6) 7 8 9', '<< 3 4 5 (6) 7 8 9 >>', '1 2 3 4 (5) 6 7 8 ']
Note:
none | ```python
def range_of_input(n,p,k):
if p-k>1:
print("<< ",end=" ")
for i in range(1,n+1):
if i in range(p-k,p+k+1):
if(i==p):
print("(%d) "%i,end=" ")
else:
print("%d "%i,end=" ")
if p+k<n:
print(">>")
from array import array
arr=array('i',[])
x=[int(x) for x in input().split()]
arr.extend(x)
n=arr[0]
p=arr[1]
k=arr[2]
range_of_input(n,p,k)
``` | 3 | |
858 | A | k-rounding | PROGRAMMING | 1,100 | [
"brute force",
"math",
"number theory"
] | null | null | For a given positive integer *n* denote its *k*-rounding as the minimum positive integer *x*, such that *x* ends with *k* or more zeros in base 10 and is divisible by *n*.
For example, 4-rounding of 375 is 375·80<==<=30000. 30000 is the minimum integer such that it ends with 4 or more zeros and is divisible by 375.
Write a program that will perform the *k*-rounding of *n*. | The only line contains two integers *n* and *k* (1<=≤<=*n*<=≤<=109, 0<=≤<=*k*<=≤<=8). | Print the *k*-rounding of *n*. | [
"375 4\n",
"10000 1\n",
"38101 0\n",
"123456789 8\n"
] | [
"30000\n",
"10000\n",
"38101\n",
"12345678900000000\n"
] | none | 750 | [
{
"input": "375 4",
"output": "30000"
},
{
"input": "10000 1",
"output": "10000"
},
{
"input": "38101 0",
"output": "38101"
},
{
"input": "123456789 8",
"output": "12345678900000000"
},
{
"input": "1 0",
"output": "1"
},
{
"input": "2 0",
"output": "2"
},
{
"input": "100 0",
"output": "100"
},
{
"input": "1000000000 0",
"output": "1000000000"
},
{
"input": "160 2",
"output": "800"
},
{
"input": "3 0",
"output": "3"
},
{
"input": "10 0",
"output": "10"
},
{
"input": "1 1",
"output": "10"
},
{
"input": "2 1",
"output": "10"
},
{
"input": "3 1",
"output": "30"
},
{
"input": "4 1",
"output": "20"
},
{
"input": "5 1",
"output": "10"
},
{
"input": "6 1",
"output": "30"
},
{
"input": "7 1",
"output": "70"
},
{
"input": "8 1",
"output": "40"
},
{
"input": "9 1",
"output": "90"
},
{
"input": "10 1",
"output": "10"
},
{
"input": "11 1",
"output": "110"
},
{
"input": "12 1",
"output": "60"
},
{
"input": "16 2",
"output": "400"
},
{
"input": "2 2",
"output": "100"
},
{
"input": "1 2",
"output": "100"
},
{
"input": "5 2",
"output": "100"
},
{
"input": "15 2",
"output": "300"
},
{
"input": "36 2",
"output": "900"
},
{
"input": "1 8",
"output": "100000000"
},
{
"input": "8 8",
"output": "100000000"
},
{
"input": "96 8",
"output": "300000000"
},
{
"input": "175 8",
"output": "700000000"
},
{
"input": "9999995 8",
"output": "199999900000000"
},
{
"input": "999999999 8",
"output": "99999999900000000"
},
{
"input": "12345678 8",
"output": "617283900000000"
},
{
"input": "78125 8",
"output": "100000000"
},
{
"input": "390625 8",
"output": "100000000"
},
{
"input": "1953125 8",
"output": "500000000"
},
{
"input": "9765625 8",
"output": "2500000000"
},
{
"input": "68359375 8",
"output": "17500000000"
},
{
"input": "268435456 8",
"output": "104857600000000"
},
{
"input": "125829120 8",
"output": "9830400000000"
},
{
"input": "128000 8",
"output": "400000000"
},
{
"input": "300000 8",
"output": "300000000"
},
{
"input": "3711871 8",
"output": "371187100000000"
},
{
"input": "55555 8",
"output": "1111100000000"
},
{
"input": "222222222 8",
"output": "11111111100000000"
},
{
"input": "479001600 8",
"output": "7484400000000"
},
{
"input": "655360001 7",
"output": "6553600010000000"
},
{
"input": "655360001 8",
"output": "65536000100000000"
},
{
"input": "1000000000 1",
"output": "1000000000"
},
{
"input": "1000000000 7",
"output": "1000000000"
},
{
"input": "1000000000 8",
"output": "1000000000"
},
{
"input": "100000000 8",
"output": "100000000"
},
{
"input": "10000000 8",
"output": "100000000"
},
{
"input": "1000000 8",
"output": "100000000"
},
{
"input": "10000009 8",
"output": "1000000900000000"
},
{
"input": "10000005 8",
"output": "200000100000000"
},
{
"input": "10000002 8",
"output": "500000100000000"
},
{
"input": "999999997 8",
"output": "99999999700000000"
},
{
"input": "999999997 7",
"output": "9999999970000000"
},
{
"input": "999999995 8",
"output": "19999999900000000"
},
{
"input": "123 8",
"output": "12300000000"
},
{
"input": "24 2",
"output": "600"
},
{
"input": "16 4",
"output": "10000"
},
{
"input": "123456787 8",
"output": "12345678700000000"
},
{
"input": "100000000 8",
"output": "100000000"
},
{
"input": "7 1",
"output": "70"
},
{
"input": "101 1",
"output": "1010"
},
{
"input": "50 2",
"output": "100"
},
{
"input": "999999818 1",
"output": "4999999090"
},
{
"input": "2 1",
"output": "10"
},
{
"input": "123 1",
"output": "1230"
},
{
"input": "16 1",
"output": "80"
},
{
"input": "1 1",
"output": "10"
},
{
"input": "1000000000 8",
"output": "1000000000"
},
{
"input": "15304 6",
"output": "1913000000"
},
{
"input": "3 8",
"output": "300000000"
},
{
"input": "4 2",
"output": "100"
},
{
"input": "100000 7",
"output": "10000000"
},
{
"input": "5 8",
"output": "100000000"
},
{
"input": "16724 6",
"output": "4181000000"
},
{
"input": "999999999 1",
"output": "9999999990"
},
{
"input": "999999990 8",
"output": "9999999900000000"
},
{
"input": "999999999 8",
"output": "99999999900000000"
},
{
"input": "100000 1",
"output": "100000"
},
{
"input": "8 3",
"output": "1000"
},
{
"input": "16768 6",
"output": "262000000"
},
{
"input": "123456789 1",
"output": "1234567890"
},
{
"input": "2 8",
"output": "100000000"
},
{
"input": "999999937 8",
"output": "99999993700000000"
},
{
"input": "5 1",
"output": "10"
},
{
"input": "2000000 7",
"output": "10000000"
},
{
"input": "1999998 2",
"output": "99999900"
},
{
"input": "125 3",
"output": "1000"
}
] | 1,604,944,597 | 2,147,483,647 | PyPy 3 | OK | TESTS | 96 | 140 | 0 | import sys
LI=lambda:list(map(int, sys.stdin.readline().split()))
MI=lambda:map(int, sys.stdin.readline().split())
SI=lambda:sys.stdin.readline().strip('\n')
II=lambda:int(sys.stdin.readline())
def gcd(a, b):
return b if a==0 else gcd(b%a, a)
n, k=MI()
k=10**k
print(n*k//gcd(n, k))
| Title: k-rounding
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
For a given positive integer *n* denote its *k*-rounding as the minimum positive integer *x*, such that *x* ends with *k* or more zeros in base 10 and is divisible by *n*.
For example, 4-rounding of 375 is 375·80<==<=30000. 30000 is the minimum integer such that it ends with 4 or more zeros and is divisible by 375.
Write a program that will perform the *k*-rounding of *n*.
Input Specification:
The only line contains two integers *n* and *k* (1<=≤<=*n*<=≤<=109, 0<=≤<=*k*<=≤<=8).
Output Specification:
Print the *k*-rounding of *n*.
Demo Input:
['375 4\n', '10000 1\n', '38101 0\n', '123456789 8\n']
Demo Output:
['30000\n', '10000\n', '38101\n', '12345678900000000\n']
Note:
none | ```python
import sys
LI=lambda:list(map(int, sys.stdin.readline().split()))
MI=lambda:map(int, sys.stdin.readline().split())
SI=lambda:sys.stdin.readline().strip('\n')
II=lambda:int(sys.stdin.readline())
def gcd(a, b):
return b if a==0 else gcd(b%a, a)
n, k=MI()
k=10**k
print(n*k//gcd(n, k))
``` | 3 | |
377 | A | Maze | PROGRAMMING | 1,600 | [
"dfs and similar"
] | null | null | Pavel loves grid mazes. A grid maze is an *n*<=×<=*m* rectangle maze where each cell is either empty, or is a wall. You can go from one cell to another only if both cells are empty and have a common side.
Pavel drew a grid maze with all empty cells forming a connected area. That is, you can go from any empty cell to any other one. Pavel doesn't like it when his maze has too little walls. He wants to turn exactly *k* empty cells into walls so that all the remaining cells still formed a connected area. Help him. | The first line contains three integers *n*, *m*, *k* (1<=≤<=*n*,<=*m*<=≤<=500, 0<=≤<=*k*<=<<=*s*), where *n* and *m* are the maze's height and width, correspondingly, *k* is the number of walls Pavel wants to add and letter *s* represents the number of empty cells in the original maze.
Each of the next *n* lines contains *m* characters. They describe the original maze. If a character on a line equals ".", then the corresponding cell is empty and if the character equals "#", then the cell is a wall. | Print *n* lines containing *m* characters each: the new maze that fits Pavel's requirements. Mark the empty cells that you transformed into walls as "X", the other cells must be left without changes (that is, "." and "#").
It is guaranteed that a solution exists. If there are multiple solutions you can output any of them. | [
"3 4 2\n#..#\n..#.\n#...\n",
"5 4 5\n#...\n#.#.\n.#..\n...#\n.#.#\n"
] | [
"#.X#\nX.#.\n#...\n",
"#XXX\n#X#.\nX#..\n...#\n.#.#\n"
] | none | 500 | [
{
"input": "5 4 5\n#...\n#.#.\n.#..\n...#\n.#.#",
"output": "#XXX\n#X#.\nX#..\n...#\n.#.#"
},
{
"input": "3 3 2\n#.#\n...\n#.#",
"output": "#X#\nX..\n#.#"
},
{
"input": "7 7 18\n#.....#\n..#.#..\n.#...#.\n...#...\n.#...#.\n..#.#..\n#.....#",
"output": "#XXXXX#\nXX#X#X.\nX#XXX#.\nXXX#...\nX#...#.\nX.#.#..\n#.....#"
},
{
"input": "1 1 0\n.",
"output": "."
},
{
"input": "2 3 1\n..#\n#..",
"output": "X.#\n#.."
},
{
"input": "2 3 1\n#..\n..#",
"output": "#.X\n..#"
},
{
"input": "3 3 1\n...\n.#.\n..#",
"output": "...\n.#X\n..#"
},
{
"input": "3 3 1\n...\n.#.\n#..",
"output": "...\nX#.\n#.."
},
{
"input": "5 4 4\n#..#\n....\n.##.\n....\n#..#",
"output": "#XX#\nXX..\n.##.\n....\n#..#"
},
{
"input": "5 5 2\n.#..#\n..#.#\n#....\n##.#.\n###..",
"output": "X#..#\nX.#.#\n#....\n##.#.\n###.."
},
{
"input": "4 6 3\n#.....\n#.#.#.\n.#...#\n...#.#",
"output": "#.....\n#X#.#X\nX#...#\n...#.#"
},
{
"input": "7 5 4\n.....\n.#.#.\n#...#\n.#.#.\n.#...\n..#..\n....#",
"output": "X...X\nX#.#X\n#...#\n.#.#.\n.#...\n..#..\n....#"
},
{
"input": "16 14 19\n##############\n..############\n#.############\n#..###########\n....##########\n..############\n.#############\n.#.###########\n....##########\n###..#########\n##...#########\n###....#######\n###.##.......#\n###..###.#..#.\n###....#......\n#...#...##.###",
"output": "##############\nXX############\n#X############\n#XX###########\nXXXX##########\nXX############\nX#############\nX#.###########\nX...##########\n###..#########\n##...#########\n###....#######\n###.##.......#\n###..###.#..#.\n###...X#......\n#X..#XXX##.###"
},
{
"input": "10 17 32\n######.##########\n####.#.##########\n...#....#########\n.........########\n##.......########\n........#########\n#.....###########\n#################\n#################\n#################",
"output": "######X##########\n####X#X##########\nXXX#XXXX#########\nXXXXXXXXX########\n##XXX.XXX########\nXXXX...X#########\n#XX...###########\n#################\n#################\n#################"
},
{
"input": "16 10 38\n##########\n##########\n##########\n..########\n...#######\n...#######\n...#######\n....######\n.....####.\n......###.\n......##..\n.......#..\n.........#\n.........#\n.........#\n.........#",
"output": "##########\n##########\n##########\nXX########\nXXX#######\nXXX#######\nXXX#######\nXXXX######\nXXXXX####.\nXXXXX.###.\nXXXX..##..\nXXX....#..\nXXX......#\nXX.......#\nX........#\n.........#"
},
{
"input": "15 16 19\n########.....###\n########.....###\n############.###\n############.###\n############.###\n############.###\n############.###\n############.###\n############.###\n############.###\n.....#####.#..##\n................\n.#...........###\n###.########.###\n###.########.###",
"output": "########XXXXX###\n########XXXXX###\n############.###\n############.###\n############.###\n############.###\n############.###\n############.###\n############.###\n############.###\nXXXX.#####.#..##\nXXX.............\nX#...........###\n###.########.###\n###X########.###"
},
{
"input": "12 19 42\n.........##########\n...................\n.##.##############.\n..################.\n..#################\n..#################\n..#################\n..#################\n..#################\n..#################\n..##########.######\n.............######",
"output": "XXXXXXXXX##########\nXXXXXXXXXXXXXXXXXXX\nX##X##############X\nXX################X\nXX#################\nXX#################\nXX#################\nX.#################\nX.#################\n..#################\n..##########.######\n.............######"
},
{
"input": "3 5 1\n#...#\n..#..\n..#..",
"output": "#...#\n..#..\nX.#.."
},
{
"input": "4 5 10\n.....\n.....\n..#..\n..#..",
"output": "XXX..\nXXX..\nXX#..\nXX#.."
},
{
"input": "3 5 3\n.....\n..#..\n..#..",
"output": ".....\nX.#..\nXX#.."
},
{
"input": "3 5 1\n#....\n..#..\n..###",
"output": "#....\n..#.X\n..###"
},
{
"input": "4 5 1\n.....\n.##..\n..#..\n..###",
"output": ".....\n.##..\n..#.X\n..###"
},
{
"input": "3 5 2\n..#..\n..#..\n....#",
"output": "X.#..\nX.#..\n....#"
},
{
"input": "10 10 1\n##########\n##......##\n#..#..#..#\n#..####..#\n#######.##\n#######.##\n#..####..#\n#..#..#..#\n##......##\n##########",
"output": "##########\n##......##\n#..#..#..#\n#X.####..#\n#######.##\n#######.##\n#..####..#\n#..#..#..#\n##......##\n##########"
},
{
"input": "10 10 3\n..........\n.########.\n.########.\n.########.\n.########.\n.########.\n.#######..\n.#######..\n.####..###\n.......###",
"output": "..........\n.########.\n.########.\n.########.\n.########.\n.########.\n.#######X.\n.#######XX\n.####..###\n.......###"
},
{
"input": "5 7 10\n..#....\n..#.#..\n.##.#..\n..#.#..\n....#..",
"output": "XX#....\nXX#.#..\nX##.#..\nXX#.#..\nXXX.#.."
},
{
"input": "5 7 10\n..#....\n..#.##.\n.##.##.\n..#.#..\n....#..",
"output": "XX#....\nXX#.##.\nX##.##.\nXX#.#..\nXXX.#.."
},
{
"input": "10 10 1\n##########\n##..##..##\n#...##...#\n#.######.#\n#..####..#\n#..####..#\n#.######.#\n#........#\n##..##..##\n##########",
"output": "##########\n##.X##..##\n#...##...#\n#.######.#\n#..####..#\n#..####..#\n#.######.#\n#........#\n##..##..##\n##########"
},
{
"input": "4 5 1\n.....\n.###.\n..#..\n..#..",
"output": ".....\n.###.\n..#..\n.X#.."
},
{
"input": "2 5 2\n###..\n###..",
"output": "###X.\n###X."
},
{
"input": "2 5 3\n.....\n..#..",
"output": "X....\nXX#.."
},
{
"input": "12 12 3\n############\n#..........#\n#.########.#\n#.########.#\n#.########.#\n#.########.#\n#.########.#\n#.#######..#\n#.#######..#\n#.####..####\n#.......####\n############",
"output": "############\n#..........#\n#.########.#\n#.########.#\n#.########.#\n#.########.#\n#.########.#\n#.#######X.#\n#.#######XX#\n#.####..####\n#.......####\n############"
},
{
"input": "5 5 1\n.....\n.##..\n..###\n..###\n#####",
"output": ".....\n.##.X\n..###\n..###\n#####"
},
{
"input": "4 4 1\n....\n.#..\n..##\n..##",
"output": "....\n.#.X\n..##\n..##"
},
{
"input": "5 5 1\n....#\n.##..\n.##..\n...##\n...##",
"output": "....#\n.##..\n.##.X\n...##\n...##"
},
{
"input": "5 5 1\n.....\n.##..\n..###\n..###\n..###",
"output": ".....\n.##.X\n..###\n..###\n..###"
},
{
"input": "4 5 1\n#....\n#.#..\n..###\n..###",
"output": "#....\n#.#.X\n..###\n..###"
},
{
"input": "4 4 3\n....\n.#..\n..##\n..##",
"output": "...X\n.#XX\n..##\n..##"
},
{
"input": "4 7 6\n.......\n....#..\n.##.#..\n....#..",
"output": "X......\nX...#..\nX##.#..\nXXX.#.."
},
{
"input": "8 8 7\n........\n.##.....\n.#######\n..######\n..######\n..######\n..######\n..######",
"output": ".....XXX\n.##.XXXX\n.#######\n..######\n..######\n..######\n..######\n..######"
}
] | 1,668,265,456 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 1 | 62 | 0 |
import sys
# sys.stdin = open("input01.txt")
def input():
return sys.stdin.readline().strip('\r\n')
def print_arr(arr):
sys.stdout.write("\n".join(map(str, arr)))
def print_matrix(matrix):
strings = []
for arr in matrix:
strings.append("".join(map(str, arr)))
print_arr(strings)
def find_start(matrix, n, m):
row, col = 0, 0
for row in range(n):
for col in range(m):
if matrix[row][col] == '.':
return row, col
return row, col
def adj_nodes(matrix, cell, n, m):
nodes = []
row, col = cell
dirs = ((0, 1), (1, 0), (-1, 0), (0, -1))
for dir in dirs:
next_row = row + dir[0]
next_col = col + dir[1]
if 0 <= next_row < n and 0 <= next_col < m and matrix[next_row][next_col] == '.':
nodes.append((next_row, next_col))
return nodes
def main():
n, m, k = map(int, input().split())
matrix = [list(input()) for _ in range(n)]
row, col = find_start(matrix, n, m)
stack = [(row, col)]
visited = {stack[0]}
while stack:
cell = stack.pop()
backtrack = True
for neighbor in adj_nodes(matrix, cell, n, m):
if neighbor not in visited:
backtrack = False
visited.add(neighbor)
stack.append(neighbor)
if backtrack and k > 0:
matrix[cell[0]][cell[1]] = 'X'
k -= 1
print_matrix(matrix)
if __name__ == '__main__':
main()
| Title: Maze
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Pavel loves grid mazes. A grid maze is an *n*<=×<=*m* rectangle maze where each cell is either empty, or is a wall. You can go from one cell to another only if both cells are empty and have a common side.
Pavel drew a grid maze with all empty cells forming a connected area. That is, you can go from any empty cell to any other one. Pavel doesn't like it when his maze has too little walls. He wants to turn exactly *k* empty cells into walls so that all the remaining cells still formed a connected area. Help him.
Input Specification:
The first line contains three integers *n*, *m*, *k* (1<=≤<=*n*,<=*m*<=≤<=500, 0<=≤<=*k*<=<<=*s*), where *n* and *m* are the maze's height and width, correspondingly, *k* is the number of walls Pavel wants to add and letter *s* represents the number of empty cells in the original maze.
Each of the next *n* lines contains *m* characters. They describe the original maze. If a character on a line equals ".", then the corresponding cell is empty and if the character equals "#", then the cell is a wall.
Output Specification:
Print *n* lines containing *m* characters each: the new maze that fits Pavel's requirements. Mark the empty cells that you transformed into walls as "X", the other cells must be left without changes (that is, "." and "#").
It is guaranteed that a solution exists. If there are multiple solutions you can output any of them.
Demo Input:
['3 4 2\n#..#\n..#.\n#...\n', '5 4 5\n#...\n#.#.\n.#..\n...#\n.#.#\n']
Demo Output:
['#.X#\nX.#.\n#...\n', '#XXX\n#X#.\nX#..\n...#\n.#.#\n']
Note:
none | ```python
import sys
# sys.stdin = open("input01.txt")
def input():
return sys.stdin.readline().strip('\r\n')
def print_arr(arr):
sys.stdout.write("\n".join(map(str, arr)))
def print_matrix(matrix):
strings = []
for arr in matrix:
strings.append("".join(map(str, arr)))
print_arr(strings)
def find_start(matrix, n, m):
row, col = 0, 0
for row in range(n):
for col in range(m):
if matrix[row][col] == '.':
return row, col
return row, col
def adj_nodes(matrix, cell, n, m):
nodes = []
row, col = cell
dirs = ((0, 1), (1, 0), (-1, 0), (0, -1))
for dir in dirs:
next_row = row + dir[0]
next_col = col + dir[1]
if 0 <= next_row < n and 0 <= next_col < m and matrix[next_row][next_col] == '.':
nodes.append((next_row, next_col))
return nodes
def main():
n, m, k = map(int, input().split())
matrix = [list(input()) for _ in range(n)]
row, col = find_start(matrix, n, m)
stack = [(row, col)]
visited = {stack[0]}
while stack:
cell = stack.pop()
backtrack = True
for neighbor in adj_nodes(matrix, cell, n, m):
if neighbor not in visited:
backtrack = False
visited.add(neighbor)
stack.append(neighbor)
if backtrack and k > 0:
matrix[cell[0]][cell[1]] = 'X'
k -= 1
print_matrix(matrix)
if __name__ == '__main__':
main()
``` | 0 | |
25 | B | Phone numbers | PROGRAMMING | 1,100 | [
"implementation"
] | B. Phone numbers | 2 | 256 | Phone number in Berland is a sequence of *n* digits. Often, to make it easier to memorize the number, it is divided into groups of two or three digits. For example, the phone number 1198733 is easier to remember as 11-987-33. Your task is to find for a given phone number any of its divisions into groups of two or three digits. | The first line contains integer *n* (2<=≤<=*n*<=≤<=100) — amount of digits in the phone number. The second line contains *n* digits — the phone number to divide into groups. | Output any of divisions of the given phone number into groups of two or three digits. Separate groups by single character -. If the answer is not unique, output any. | [
"6\n549871\n",
"7\n1198733\n"
] | [
"54-98-71",
"11-987-33\n"
] | none | 0 | [
{
"input": "6\n549871",
"output": "54-98-71"
},
{
"input": "7\n1198733",
"output": "119-87-33"
},
{
"input": "2\n74",
"output": "74"
},
{
"input": "2\n33",
"output": "33"
},
{
"input": "3\n074",
"output": "074"
},
{
"input": "3\n081",
"output": "081"
},
{
"input": "4\n3811",
"output": "38-11"
},
{
"input": "5\n21583",
"output": "215-83"
},
{
"input": "8\n33408349",
"output": "33-40-83-49"
},
{
"input": "9\n988808426",
"output": "988-80-84-26"
},
{
"input": "10\n0180990956",
"output": "01-80-99-09-56"
},
{
"input": "15\n433488906230138",
"output": "433-48-89-06-23-01-38"
},
{
"input": "22\n7135498415686025907059",
"output": "71-35-49-84-15-68-60-25-90-70-59"
},
{
"input": "49\n2429965524999668169991253653390090510755018570235",
"output": "242-99-65-52-49-99-66-81-69-99-12-53-65-33-90-09-05-10-75-50-18-57-02-35"
},
{
"input": "72\n491925337784111770500147619881727525570039735507439360627744863794794290",
"output": "49-19-25-33-77-84-11-17-70-50-01-47-61-98-81-72-75-25-57-00-39-73-55-07-43-93-60-62-77-44-86-37-94-79-42-90"
},
{
"input": "95\n32543414456047900690980198395035321172843693417425457554204776648220562494524275489599199209210",
"output": "325-43-41-44-56-04-79-00-69-09-80-19-83-95-03-53-21-17-28-43-69-34-17-42-54-57-55-42-04-77-66-48-22-05-62-49-45-24-27-54-89-59-91-99-20-92-10"
},
{
"input": "97\n9362344595153688016434451101547661156123505108492010669557671355055642365998461003851354321478898",
"output": "936-23-44-59-51-53-68-80-16-43-44-51-10-15-47-66-11-56-12-35-05-10-84-92-01-06-69-55-76-71-35-50-55-64-23-65-99-84-61-00-38-51-35-43-21-47-88-98"
},
{
"input": "98\n65521815795893886057122984634320900545031770769333931308009346017867969790810907868670369236928568",
"output": "65-52-18-15-79-58-93-88-60-57-12-29-84-63-43-20-90-05-45-03-17-70-76-93-33-93-13-08-00-93-46-01-78-67-96-97-90-81-09-07-86-86-70-36-92-36-92-85-68"
},
{
"input": "99\n455213856470326729480192345541970106407563996625458559297407682539801838244443866898560852503660390",
"output": "455-21-38-56-47-03-26-72-94-80-19-23-45-54-19-70-10-64-07-56-39-96-62-54-58-55-92-97-40-76-82-53-98-01-83-82-44-44-38-66-89-85-60-85-25-03-66-03-90"
},
{
"input": "100\n4004223124942730640235383244438257614581534320356060987241659784249551110165034719443327659510644224",
"output": "40-04-22-31-24-94-27-30-64-02-35-38-32-44-43-82-57-61-45-81-53-43-20-35-60-60-98-72-41-65-97-84-24-95-51-11-01-65-03-47-19-44-33-27-65-95-10-64-42-24"
}
] | 1,583,086,381 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 4 | 218 | 307,200 | b = int(input())
n = input()
if len(n) % 2 == 1 :
out = n[0:3] + '-'
out += '-'.join( [ n[i:i+2] for i in range(3,len(n),2) ] )
else :
out = '-'.join( [ n[i:i+2] for i in range(0,len(n),2) ] )
print(out)
| Title: Phone numbers
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Phone number in Berland is a sequence of *n* digits. Often, to make it easier to memorize the number, it is divided into groups of two or three digits. For example, the phone number 1198733 is easier to remember as 11-987-33. Your task is to find for a given phone number any of its divisions into groups of two or three digits.
Input Specification:
The first line contains integer *n* (2<=≤<=*n*<=≤<=100) — amount of digits in the phone number. The second line contains *n* digits — the phone number to divide into groups.
Output Specification:
Output any of divisions of the given phone number into groups of two or three digits. Separate groups by single character -. If the answer is not unique, output any.
Demo Input:
['6\n549871\n', '7\n1198733\n']
Demo Output:
['54-98-71', '11-987-33\n']
Note:
none | ```python
b = int(input())
n = input()
if len(n) % 2 == 1 :
out = n[0:3] + '-'
out += '-'.join( [ n[i:i+2] for i in range(3,len(n),2) ] )
else :
out = '-'.join( [ n[i:i+2] for i in range(0,len(n),2) ] )
print(out)
``` | 0 |
41 | A | Translation | PROGRAMMING | 800 | [
"implementation",
"strings"
] | A. Translation | 2 | 256 | The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly. | The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols. | If the word *t* is a word *s*, written reversely, print YES, otherwise print NO. | [
"code\nedoc\n",
"abb\naba\n",
"code\ncode\n"
] | [
"YES\n",
"NO\n",
"NO\n"
] | none | 500 | [
{
"input": "code\nedoc",
"output": "YES"
},
{
"input": "abb\naba",
"output": "NO"
},
{
"input": "code\ncode",
"output": "NO"
},
{
"input": "abacaba\nabacaba",
"output": "YES"
},
{
"input": "q\nq",
"output": "YES"
},
{
"input": "asrgdfngfnmfgnhweratgjkk\nasrgdfngfnmfgnhweratgjkk",
"output": "NO"
},
{
"input": "z\na",
"output": "NO"
},
{
"input": "asd\ndsa",
"output": "YES"
},
{
"input": "abcdef\nfecdba",
"output": "NO"
},
{
"input": "ywjjbirapvskozubvxoemscfwl\ngnduubaogtfaiowjizlvjcu",
"output": "NO"
},
{
"input": "mfrmqxtzvgaeuleubcmcxcfqyruwzenguhgrmkuhdgnhgtgkdszwqyd\nmfxufheiperjnhyczclkmzyhcxntdfskzkzdwzzujdinf",
"output": "NO"
},
{
"input": "bnbnemvybqizywlnghlykniaxxxlkhftppbdeqpesrtgkcpoeqowjwhrylpsziiwcldodcoonpimudvrxejjo\ntiynnekmlalogyvrgptbinkoqdwzuiyjlrldxhzjmmp",
"output": "NO"
},
{
"input": "pwlpubwyhzqvcitemnhvvwkmwcaawjvdiwtoxyhbhbxerlypelevasmelpfqwjk\nstruuzebbcenziscuoecywugxncdwzyfozhljjyizpqcgkyonyetarcpwkqhuugsqjuixsxptmbnlfupdcfigacdhhrzb",
"output": "NO"
},
{
"input": "gdvqjoyxnkypfvdxssgrihnwxkeojmnpdeobpecytkbdwujqfjtxsqspxvxpqioyfagzjxupqqzpgnpnpxcuipweunqch\nkkqkiwwasbhezqcfeceyngcyuogrkhqecwsyerdniqiocjehrpkljiljophqhyaiefjpavoom",
"output": "NO"
},
{
"input": "umeszdawsvgkjhlqwzents\nhxqhdungbylhnikwviuh",
"output": "NO"
},
{
"input": "juotpscvyfmgntshcealgbsrwwksgrwnrrbyaqqsxdlzhkbugdyx\nibqvffmfktyipgiopznsqtrtxiijntdbgyy",
"output": "NO"
},
{
"input": "zbwueheveouatecaglziqmudxemhrsozmaujrwlqmppzoumxhamwugedikvkblvmxwuofmpafdprbcftew\nulczwrqhctbtbxrhhodwbcxwimncnexosksujlisgclllxokrsbnozthajnnlilyffmsyko",
"output": "NO"
},
{
"input": "nkgwuugukzcv\nqktnpxedwxpxkrxdvgmfgoxkdfpbzvwsduyiybynbkouonhvmzakeiruhfmvrktghadbfkmwxduoqv",
"output": "NO"
},
{
"input": "incenvizhqpcenhjhehvjvgbsnfixbatrrjstxjzhlmdmxijztphxbrldlqwdfimweepkggzcxsrwelodpnryntepioqpvk\ndhjbjjftlvnxibkklxquwmzhjfvnmwpapdrslioxisbyhhfymyiaqhlgecpxamqnocizwxniubrmpyubvpenoukhcobkdojlybxd",
"output": "NO"
},
{
"input": "w\nw",
"output": "YES"
},
{
"input": "vz\nzv",
"output": "YES"
},
{
"input": "ry\nyr",
"output": "YES"
},
{
"input": "xou\nuox",
"output": "YES"
},
{
"input": "axg\ngax",
"output": "NO"
},
{
"input": "zdsl\nlsdz",
"output": "YES"
},
{
"input": "kudl\nldku",
"output": "NO"
},
{
"input": "zzlzwnqlcl\nlclqnwzlzz",
"output": "YES"
},
{
"input": "vzzgicnzqooejpjzads\nsdazjpjeooqzncigzzv",
"output": "YES"
},
{
"input": "raqhmvmzuwaykjpyxsykr\nxkysrypjkyawuzmvmhqar",
"output": "NO"
},
{
"input": "ngedczubzdcqbxksnxuavdjaqtmdwncjnoaicvmodcqvhfezew\nwezefhvqcdomvciaonjcnwdmtqajdvauxnskxbqcdzbuzcdegn",
"output": "YES"
},
{
"input": "muooqttvrrljcxbroizkymuidvfmhhsjtumksdkcbwwpfqdyvxtrlymofendqvznzlmim\nmimlznzvqdnefomylrtxvydqfpwwbckdskmutjshhmfvdiumykziorbxcjlrrvttqooum",
"output": "YES"
},
{
"input": "vxpqullmcbegsdskddortcvxyqlbvxmmkhevovnezubvpvnrcajpxraeaxizgaowtfkzywvhnbgzsxbhkaipcmoumtikkiyyaivg\ngviayyikkitmuomcpiakhbxszgbnhvwyzkftwoagzixaearxpjacrnvpvbuzenvovehkmmxvblqyxvctroddksdsgebcmlluqpxv",
"output": "YES"
},
{
"input": "mnhaxtaopjzrkqlbroiyipitndczpunwygstmzevgyjdzyanxkdqnvgkikfabwouwkkbzuiuvgvxgpizsvqsbwepktpdrgdkmfdc\ncdfmkdgrdptkpewbsqvszipgxvgvuiuzbkkwuowbafkikgvnqdkxnayzdjygvezmtsgywnupocdntipiyiorblqkrzjpzatxahnm",
"output": "NO"
},
{
"input": "dgxmzbqofstzcdgthbaewbwocowvhqpinehpjatnnbrijcolvsatbblsrxabzrpszoiecpwhfjmwuhqrapvtcgvikuxtzbftydkw\nwkdytfbztxukivgctvparqhuwmjfhwpceiozsprzbaxrslbbqasvlocjirbnntajphenipthvwocowbweabhtgdcztsfoqbzmxgd",
"output": "NO"
},
{
"input": "gxoixiecetohtgjgbqzvlaobkhstejxdklghowtvwunnnvauriohuspsdmpzckprwajyxldoyckgjivjpmbfqtszmtocovxwgeh\nhegwxvocotmzstqfbmpjvijgkcyodlxyjawrpkczpmdspsuhoiruavnnnuwvtwohglkdxjetshkboalvzqbgjgthoteceixioxg",
"output": "YES"
},
{
"input": "sihxuwvmaambplxvjfoskinghzicyfqebjtkysotattkahssumfcgrkheotdxwjckpvapbkaepqrxseyfrwtyaycmrzsrsngkh\nhkgnsrszrmcyaytwrfyesxrqpeakbpavpkcjwxdtoehkrgcfmusshakttatosyktjbeqfycizhgniksofjvxlpbmaamvwuxhis",
"output": "YES"
},
{
"input": "ycnahksbughnonldzrhkysujmylcgcfuludjvjiahtkyzqvkopzqcnwhltbzfugzojqkjjlggmvnultascmygelkiktmfieok\nkoeifmtkiklegkmcsatlunvmggkjjlqjozgufzbtlhwncqzpokvqzykthaijvjdulufcgclymjusyyhrzdlnonhgubskhancy",
"output": "NO"
},
{
"input": "wbqasaehtkfojruzyhrlgwmtyiovmzyfifslvlemhqheyaelzwnthrenjsbmntwaoryzwfbxmscmypvxlfmzpnkkjlvwvmtz\nztmvwvljkknpzmflxvpymcsmxbfwzyroawtnmbsjnerhtnwzleayehqhmelvlsfifyzmvoiytmwglrhyzurjofktheasaqbw",
"output": "YES"
},
{
"input": "imippqurprbhfugngtgifelytadegwrgaefnfhbjjnmzikvjaccotqzemufqieqldgnbmviisgkynzeldlhqxuqphjfmyij\njiymfjhpquxqhldleznykgsiivmbngdlqeiqfumezqtoccajvkizmnjjbhfnfeagrwgedatylefigtgngufhbrpruqppimi",
"output": "YES"
},
{
"input": "bikydffiuisckpvzqlteqfhegsagimodb\nbdomigasgehfqetlqzvpkcsiuiffdykib",
"output": "YES"
}
] | 1,663,834,875 | 2,147,483,647 | Python 3 | OK | TESTS | 40 | 92 | 0 | s=input()
t=input()
ss=[]
tt=[]
for i in range(len(s)):
ss.append(s[i])
for i in range(len(t)):
tt.append(t[-i-1])
if ss==tt:
print('YES')
else:
print('NO') | Title: Translation
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
The translation from the Berland language into the Birland language is not an easy task. Those languages are very similar: a berlandish word differs from a birlandish word with the same meaning a little: it is spelled (and pronounced) reversely. For example, a Berlandish word code corresponds to a Birlandish word edoc. However, it's easy to make a mistake during the «translation». Vasya translated word *s* from Berlandish into Birlandish as *t*. Help him: find out if he translated the word correctly.
Input Specification:
The first line contains word *s*, the second line contains word *t*. The words consist of lowercase Latin letters. The input data do not consist unnecessary spaces. The words are not empty and their lengths do not exceed 100 symbols.
Output Specification:
If the word *t* is a word *s*, written reversely, print YES, otherwise print NO.
Demo Input:
['code\nedoc\n', 'abb\naba\n', 'code\ncode\n']
Demo Output:
['YES\n', 'NO\n', 'NO\n']
Note:
none | ```python
s=input()
t=input()
ss=[]
tt=[]
for i in range(len(s)):
ss.append(s[i])
for i in range(len(t)):
tt.append(t[-i-1])
if ss==tt:
print('YES')
else:
print('NO')
``` | 3.977 |
177 | G1 | Fibonacci Strings | PROGRAMMING | 2,400 | [
"strings"
] | null | null | Fibonacci strings are defined as follows:
- *f*1 = «a» - *f*2 = «b» - *f**n* = *f**n*<=-<=1 *f**n*<=-<=2, *n*<=><=2
Thus, the first five Fibonacci strings are: "a", "b", "ba", "bab", "babba".
You are given a Fibonacci string and *m* strings *s**i*. For each string *s**i*, find the number of times it occurs in the given Fibonacci string as a substring. | The first line contains two space-separated integers *k* and *m* — the number of a Fibonacci string and the number of queries, correspondingly.
Next *m* lines contain strings *s**i* that correspond to the queries. It is guaranteed that strings *s**i* aren't empty and consist only of characters "a" and "b".
The input limitations for getting 30 points are:
- 1<=≤<=*k*<=≤<=3000 - 1<=≤<=*m*<=≤<=3000 - The total length of strings *s**i* doesn't exceed 3000
The input limitations for getting 100 points are:
- 1<=≤<=*k*<=≤<=1018 - 1<=≤<=*m*<=≤<=104 - The total length of strings *s**i* doesn't exceed 105
Please do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier. | For each string *s**i* print the number of times it occurs in the given Fibonacci string as a substring. Since the numbers can be large enough, print them modulo 1000000007 (109<=+<=7). Print the answers for the strings in the order in which they are given in the input. | [
"6 5\na\nb\nab\nba\naba\n"
] | [
"3\n5\n3\n3\n1\n"
] | none | 30 | [
{
"input": "6 5\na\nb\nab\nba\naba",
"output": "3\n5\n3\n3\n1"
},
{
"input": "10 10\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab",
"output": "12\n21\n21\n0\n12\n21\n21\n0\n12\n21"
},
{
"input": "10 10\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb",
"output": "0\n12\n21\n0\n12\n8\n0\n0\n0\n12"
},
{
"input": "1 10\nb\na\nb\na\nb\na\nb\na\nb\na",
"output": "0\n1\n0\n1\n0\n1\n0\n1\n0\n1"
},
{
"input": "2 10\nb\na\nb\na\nb\na\nb\na\nb\na",
"output": "1\n0\n1\n0\n1\n0\n1\n0\n1\n0"
},
{
"input": "3 10\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb",
"output": "0\n0\n0\n0\n0\n0\n0\n0\n0\n0"
},
{
"input": "15 100\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab\nbba\naba\nbaa\naaa\nbbb\nabb\nbab\naab",
"output": "0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0\n144\n88\n0\n0\n0\n144\n232\n0"
},
{
"input": "15 100\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na\nb\na",
"output": "377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233\n377\n233"
},
{
"input": "15 100\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa\nbb\nab\nba\naa",
"output": "144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0\n144\n232\n233\n0"
},
{
"input": "50 100\na\na\nb\na\na\nb\nb\nb\na\na\nb\nb\na\na\na\na\nb\nb\na\nb\nb\nb\na\na\na\na\na\na\nb\nb\na\nb\na\nb\na\nb\na\nb\nb\nb\na\na\nb\na\na\na\nb\na\nb\na\na\na\nb\na\nb\na\na\nb\na\na\nb\na\na\na\na\nb\na\nb\na\nb\nb\na\nb\nb\nb\na\nb\nb\nb\nb\nb\nb\nb\nb\nb\nb\na\na\na\nb\nb\nb\nb\na\na\na\nb\nb\nb\na",
"output": "807526948\n807526948\n778742000\n807526948\n807526948\n778742000\n778742000\n778742000\n807526948\n807526948\n778742000\n778742000\n807526948\n807526948\n807526948\n807526948\n778742000\n778742000\n807526948\n778742000\n778742000\n778742000\n807526948\n807526948\n807526948\n807526948\n807526948\n807526948\n778742000\n778742000\n807526948\n778742000\n807526948\n778742000\n807526948\n778742000\n807526948\n778742000\n778742000\n778742000\n807526948\n807526948\n778742000\n807526948\n807526948\n807526948\n77874..."
},
{
"input": "50 100\nb\naa\na\na\na\nb\na\nb\nbb\na\naa\naa\naa\nba\naa\na\na\naa\na\na\naa\nb\nbb\naa\naa\nbb\nb\nbb\na\naa\naa\naa\na\na\nb\nb\na\naa\nb\naa\nab\nb\nb\na\naa\nbb\nb\nb\na\nb\na\na\nb\na\nbb\nb\nab\nbb\na\naa\naa\nb\nb\na\nbb\nba\naa\nba\nbb\nba\nbb\na\nb\na\nba\na\nab\na\nbb\nab\na\nab\nbb\na\na\nb\na\nba\na\nbb\nb\nab\nab\naa\na\nab\nab\nbb\nab\nab",
"output": "778742000\n0\n807526948\n807526948\n807526948\n778742000\n807526948\n778742000\n971215058\n807526948\n0\n0\n0\n807526948\n0\n807526948\n807526948\n0\n807526948\n807526948\n0\n778742000\n971215058\n0\n0\n971215058\n778742000\n971215058\n807526948\n0\n0\n0\n807526948\n807526948\n778742000\n778742000\n807526948\n0\n778742000\n0\n807526948\n778742000\n778742000\n807526948\n0\n971215058\n778742000\n778742000\n807526948\n778742000\n807526948\n807526948\n778742000\n807526948\n971215058\n778742000\n807526948\n9712..."
},
{
"input": "50 100\nb\naab\nab\naaa\na\naab\naaa\nbb\na\na\nb\naab\nbbb\naa\nbbb\nb\nab\nab\nbbb\nb\nbaa\na\nbab\nbbb\na\naba\nab\na\nba\nb\nbba\naba\nba\nbba\nb\nb\nb\nb\nab\na\nabb\nab\nbb\nbba\nb\nbbb\nbb\nb\naba\naab\nba\nbb\na\na\nbb\nba\nbaa\nba\nba\na\nb\nbb\nb\nbaa\nbab\nbba\nb\nbb\nbbb\nb\naba\nbba\nbba\naaa\nab\na\nbbb\nab\nb\nba\nbab\nb\naab\nbb\naba\nb\na\naa\nbaa\nbbb\naa\naba\nb\nbb\nba\nb\nb\naaa\nab\nba",
"output": "778742000\n0\n807526948\n0\n807526948\n0\n0\n971215058\n807526948\n807526948\n778742000\n0\n0\n0\n0\n778742000\n807526948\n807526948\n0\n778742000\n0\n807526948\n807526948\n0\n807526948\n836311896\n807526948\n807526948\n807526948\n778742000\n971215058\n836311896\n807526948\n971215058\n778742000\n778742000\n778742000\n778742000\n807526948\n807526948\n971215058\n807526948\n971215058\n971215058\n778742000\n0\n971215058\n778742000\n836311896\n0\n807526948\n971215058\n807526948\n807526948\n971215058\n807526948\n..."
},
{
"input": "50 100\nbb\naa\nb\nbaa\nbbba\naa\nba\na\nabba\nbaa\naa\naab\nab\nbabb\naabb\nbaa\nbaaa\nbaa\naab\nbba\nbb\naba\naaba\nbab\naaba\naa\naaaa\nbabb\nbbb\naaba\naaa\nab\nbab\nb\nb\naa\naaab\naa\nbba\nbaa\nbabb\nbaba\nba\naaba\nbba\nba\nab\nabb\nb\nba\nbbb\nba\naaa\nbbb\nbaa\nbb\na\naaa\naaba\nab\nbba\nba\nb\nbbb\naaa\na\na\nb\nb\naba\nbb\nba\na\nb\nbaa\nb\naaaa\na\naaab\nbaba\nba\nbb\nbaba\nab\nbaaa\nbbbb\na\naabb\nab\nb\nb\naaa\nb\nb\nabab\nabb\nb\nb\nbb\nb",
"output": "971215058\n0\n778742000\n0\n0\n0\n807526948\n807526948\n971215058\n0\n0\n0\n807526948\n971215058\n0\n0\n0\n0\n0\n971215058\n971215058\n836311896\n0\n807526948\n0\n0\n0\n971215058\n0\n0\n0\n807526948\n807526948\n778742000\n778742000\n0\n0\n0\n971215058\n0\n971215058\n836311896\n807526948\n0\n971215058\n807526948\n807526948\n971215058\n778742000\n807526948\n0\n807526948\n0\n0\n0\n971215058\n807526948\n0\n0\n807526948\n971215058\n807526948\n778742000\n0\n0\n807526948\n807526948\n778742000\n778742000\n83631189..."
},
{
"input": "1 14\na\nb\naa\nab\nba\nbb\naaa\naab\naba\nabb\nbaa\nbab\nbba\nbbb",
"output": "1\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0"
},
{
"input": "2 14\na\nb\naa\nab\nba\nbb\naaa\naab\naba\nabb\nbaa\nbab\nbba\nbbb",
"output": "0\n1\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0\n0"
},
{
"input": "3 14\na\nb\naa\nab\nba\nbb\naaa\naab\naba\nabb\nbaa\nbab\nbba\nbbb",
"output": "1\n1\n0\n0\n1\n0\n0\n0\n0\n0\n0\n0\n0\n0"
},
{
"input": "4 14\na\nb\naa\nab\nba\nbb\naaa\naab\naba\nabb\nbaa\nbab\nbba\nbbb",
"output": "1\n2\n0\n1\n1\n0\n0\n0\n0\n0\n0\n1\n0\n0"
},
{
"input": "5 14\na\nb\naa\nab\nba\nbb\naaa\naab\naba\nabb\nbaa\nbab\nbba\nbbb",
"output": "2\n3\n0\n1\n2\n1\n0\n0\n0\n1\n0\n1\n1\n0"
}
] | 1,678,887,331 | 9,991 | PyPy 3-64 | WRONG_ANSWER | TESTS1 | 2 | 92 | 0 | k, m = map(int,input().split())
f = [None]*(k+1)
f[1] = "a"
f[2] = "b"
for i in range(3, k+1) :
f[i] = f[i-1] + f[i-2]
s = f[k]
for i in range(m) :
p = input()
print(f[k].count(p)) | Title: Fibonacci Strings
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Fibonacci strings are defined as follows:
- *f*1 = «a» - *f*2 = «b» - *f**n* = *f**n*<=-<=1 *f**n*<=-<=2, *n*<=><=2
Thus, the first five Fibonacci strings are: "a", "b", "ba", "bab", "babba".
You are given a Fibonacci string and *m* strings *s**i*. For each string *s**i*, find the number of times it occurs in the given Fibonacci string as a substring.
Input Specification:
The first line contains two space-separated integers *k* and *m* — the number of a Fibonacci string and the number of queries, correspondingly.
Next *m* lines contain strings *s**i* that correspond to the queries. It is guaranteed that strings *s**i* aren't empty and consist only of characters "a" and "b".
The input limitations for getting 30 points are:
- 1<=≤<=*k*<=≤<=3000 - 1<=≤<=*m*<=≤<=3000 - The total length of strings *s**i* doesn't exceed 3000
The input limitations for getting 100 points are:
- 1<=≤<=*k*<=≤<=1018 - 1<=≤<=*m*<=≤<=104 - The total length of strings *s**i* doesn't exceed 105
Please do not use the %lld specifier to read or write 64-bit integers in С++. It is preferred to use cin, cout streams or the %I64d specifier.
Output Specification:
For each string *s**i* print the number of times it occurs in the given Fibonacci string as a substring. Since the numbers can be large enough, print them modulo 1000000007 (109<=+<=7). Print the answers for the strings in the order in which they are given in the input.
Demo Input:
['6 5\na\nb\nab\nba\naba\n']
Demo Output:
['3\n5\n3\n3\n1\n']
Note:
none | ```python
k, m = map(int,input().split())
f = [None]*(k+1)
f[1] = "a"
f[2] = "b"
for i in range(3, k+1) :
f[i] = f[i-1] + f[i-2]
s = f[k]
for i in range(m) :
p = input()
print(f[k].count(p))
``` | 0 | |
722 | A | Broken Clock | PROGRAMMING | 1,300 | [
"brute force",
"implementation"
] | null | null | You are given a broken clock. You know, that it is supposed to show time in 12- or 24-hours HH:MM format. In 12-hours format hours change from 1 to 12, while in 24-hours it changes from 0 to 23. In both formats minutes change from 0 to 59.
You are given a time in format HH:MM that is currently displayed on the broken clock. Your goal is to change minimum number of digits in order to make clocks display the correct time in the given format.
For example, if 00:99 is displayed, it is enough to replace the second 9 with 3 in order to get 00:39 that is a correct time in 24-hours format. However, to make 00:99 correct in 12-hours format, one has to change at least two digits. Additionally to the first change one can replace the second 0 with 1 and obtain 01:39. | The first line of the input contains one integer 12 or 24, that denote 12-hours or 24-hours format respectively.
The second line contains the time in format HH:MM, that is currently displayed on the clock. First two characters stand for the hours, while next two show the minutes. | The only line of the output should contain the time in format HH:MM that is a correct time in the given format. It should differ from the original in as few positions as possible. If there are many optimal solutions you can print any of them. | [
"24\n17:30\n",
"12\n17:30\n",
"24\n99:99\n"
] | [
"17:30\n",
"07:30\n",
"09:09\n"
] | none | 500 | [
{
"input": "24\n17:30",
"output": "17:30"
},
{
"input": "12\n17:30",
"output": "07:30"
},
{
"input": "24\n99:99",
"output": "09:09"
},
{
"input": "12\n05:54",
"output": "05:54"
},
{
"input": "12\n00:05",
"output": "01:05"
},
{
"input": "24\n23:80",
"output": "23:00"
},
{
"input": "24\n73:16",
"output": "03:16"
},
{
"input": "12\n03:77",
"output": "03:07"
},
{
"input": "12\n47:83",
"output": "07:03"
},
{
"input": "24\n23:88",
"output": "23:08"
},
{
"input": "24\n51:67",
"output": "01:07"
},
{
"input": "12\n10:33",
"output": "10:33"
},
{
"input": "12\n00:01",
"output": "01:01"
},
{
"input": "12\n07:74",
"output": "07:04"
},
{
"input": "12\n00:60",
"output": "01:00"
},
{
"input": "24\n08:32",
"output": "08:32"
},
{
"input": "24\n42:59",
"output": "02:59"
},
{
"input": "24\n19:87",
"output": "19:07"
},
{
"input": "24\n26:98",
"output": "06:08"
},
{
"input": "12\n12:91",
"output": "12:01"
},
{
"input": "12\n11:30",
"output": "11:30"
},
{
"input": "12\n90:32",
"output": "10:32"
},
{
"input": "12\n03:69",
"output": "03:09"
},
{
"input": "12\n33:83",
"output": "03:03"
},
{
"input": "24\n10:45",
"output": "10:45"
},
{
"input": "24\n65:12",
"output": "05:12"
},
{
"input": "24\n22:64",
"output": "22:04"
},
{
"input": "24\n48:91",
"output": "08:01"
},
{
"input": "12\n02:51",
"output": "02:51"
},
{
"input": "12\n40:11",
"output": "10:11"
},
{
"input": "12\n02:86",
"output": "02:06"
},
{
"input": "12\n99:96",
"output": "09:06"
},
{
"input": "24\n19:24",
"output": "19:24"
},
{
"input": "24\n55:49",
"output": "05:49"
},
{
"input": "24\n01:97",
"output": "01:07"
},
{
"input": "24\n39:68",
"output": "09:08"
},
{
"input": "24\n24:00",
"output": "04:00"
},
{
"input": "12\n91:00",
"output": "01:00"
},
{
"input": "24\n00:30",
"output": "00:30"
},
{
"input": "12\n13:20",
"output": "03:20"
},
{
"input": "12\n13:00",
"output": "03:00"
},
{
"input": "12\n42:35",
"output": "02:35"
},
{
"input": "12\n20:00",
"output": "10:00"
},
{
"input": "12\n21:00",
"output": "01:00"
},
{
"input": "24\n10:10",
"output": "10:10"
},
{
"input": "24\n30:40",
"output": "00:40"
},
{
"input": "24\n12:00",
"output": "12:00"
},
{
"input": "12\n10:60",
"output": "10:00"
},
{
"input": "24\n30:00",
"output": "00:00"
},
{
"input": "24\n34:00",
"output": "04:00"
},
{
"input": "12\n22:00",
"output": "02:00"
},
{
"input": "12\n20:20",
"output": "10:20"
}
] | 1,500,379,338 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 14 | 62 | 4,608,000 | n = int(input())
time = input()
numbers = time.split(":")
h, m = numbers[0], numbers[1]
a, b = int(h), int(m)
if n == 12:
if a > 12:
if a % 10 == 0:
h = "1" + h[1]
else:
h = "0" + h[1]
elif a == 0:
h = "10"
else:
if a > 24:
h = "0" + h[1]
if b > 60:
m = "0" + m[1]
print("%s:%s" % (h, m)) | Title: Broken Clock
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given a broken clock. You know, that it is supposed to show time in 12- or 24-hours HH:MM format. In 12-hours format hours change from 1 to 12, while in 24-hours it changes from 0 to 23. In both formats minutes change from 0 to 59.
You are given a time in format HH:MM that is currently displayed on the broken clock. Your goal is to change minimum number of digits in order to make clocks display the correct time in the given format.
For example, if 00:99 is displayed, it is enough to replace the second 9 with 3 in order to get 00:39 that is a correct time in 24-hours format. However, to make 00:99 correct in 12-hours format, one has to change at least two digits. Additionally to the first change one can replace the second 0 with 1 and obtain 01:39.
Input Specification:
The first line of the input contains one integer 12 or 24, that denote 12-hours or 24-hours format respectively.
The second line contains the time in format HH:MM, that is currently displayed on the clock. First two characters stand for the hours, while next two show the minutes.
Output Specification:
The only line of the output should contain the time in format HH:MM that is a correct time in the given format. It should differ from the original in as few positions as possible. If there are many optimal solutions you can print any of them.
Demo Input:
['24\n17:30\n', '12\n17:30\n', '24\n99:99\n']
Demo Output:
['17:30\n', '07:30\n', '09:09\n']
Note:
none | ```python
n = int(input())
time = input()
numbers = time.split(":")
h, m = numbers[0], numbers[1]
a, b = int(h), int(m)
if n == 12:
if a > 12:
if a % 10 == 0:
h = "1" + h[1]
else:
h = "0" + h[1]
elif a == 0:
h = "10"
else:
if a > 24:
h = "0" + h[1]
if b > 60:
m = "0" + m[1]
print("%s:%s" % (h, m))
``` | 0 | |
673 | A | Bear and Game | PROGRAMMING | 800 | [
"implementation"
] | null | null | Bear Limak likes watching sports on TV. He is going to watch a game today. The game lasts 90 minutes and there are no breaks.
Each minute can be either interesting or boring. If 15 consecutive minutes are boring then Limak immediately turns TV off.
You know that there will be *n* interesting minutes *t*1,<=*t*2,<=...,<=*t**n*. Your task is to calculate for how many minutes Limak will watch the game. | The first line of the input contains one integer *n* (1<=≤<=*n*<=≤<=90) — the number of interesting minutes.
The second line contains *n* integers *t*1,<=*t*2,<=...,<=*t**n* (1<=≤<=*t*1<=<<=*t*2<=<<=... *t**n*<=≤<=90), given in the increasing order. | Print the number of minutes Limak will watch the game. | [
"3\n7 20 88\n",
"9\n16 20 30 40 50 60 70 80 90\n",
"9\n15 20 30 40 50 60 70 80 90\n"
] | [
"35\n",
"15\n",
"90\n"
] | In the first sample, minutes 21, 22, ..., 35 are all boring and thus Limak will turn TV off immediately after the 35-th minute. So, he would watch the game for 35 minutes.
In the second sample, the first 15 minutes are boring.
In the third sample, there are no consecutive 15 boring minutes. So, Limak will watch the whole game. | 500 | [
{
"input": "3\n7 20 88",
"output": "35"
},
{
"input": "9\n16 20 30 40 50 60 70 80 90",
"output": "15"
},
{
"input": "9\n15 20 30 40 50 60 70 80 90",
"output": "90"
},
{
"input": "30\n6 11 12 15 22 24 30 31 32 33 34 35 40 42 44 45 47 50 53 54 57 58 63 67 75 77 79 81 83 88",
"output": "90"
},
{
"input": "60\n1 2 4 5 6 7 11 14 16 18 20 21 22 23 24 25 26 33 34 35 36 37 38 39 41 42 43 44 46 47 48 49 52 55 56 57 58 59 60 61 63 64 65 67 68 70 71 72 73 74 75 77 78 80 82 83 84 85 86 88",
"output": "90"
},
{
"input": "90\n1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90",
"output": "90"
},
{
"input": "1\n1",
"output": "16"
},
{
"input": "5\n15 30 45 60 75",
"output": "90"
},
{
"input": "6\n14 29 43 59 70 74",
"output": "58"
},
{
"input": "1\n15",
"output": "30"
},
{
"input": "1\n16",
"output": "15"
},
{
"input": "14\n14 22 27 31 35 44 46 61 62 69 74 79 88 89",
"output": "90"
},
{
"input": "76\n1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90",
"output": "90"
},
{
"input": "1\n90",
"output": "15"
},
{
"input": "6\n13 17 32 47 60 66",
"output": "81"
},
{
"input": "84\n1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84",
"output": "90"
},
{
"input": "9\n6 20 27 28 40 53 59 70 85",
"output": "90"
},
{
"input": "12\n14 22 27 31 35 44 62 69 74 79 88 89",
"output": "59"
},
{
"input": "5\n15 30 45 60 74",
"output": "89"
},
{
"input": "72\n3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89",
"output": "54"
},
{
"input": "8\n1 16 30 31 32 33 34 50",
"output": "49"
},
{
"input": "12\n1 3 6 10 15 21 28 36 45 55 66 78",
"output": "90"
},
{
"input": "25\n1 2 3 4 5 6 7 8 9 10 11 23 36 50 65 81 82 83 84 85 86 87 88 89 90",
"output": "80"
},
{
"input": "8\n5 17 20 35 42 53 67 76",
"output": "90"
},
{
"input": "9\n15 28 39 48 55 60 63 64 74",
"output": "89"
},
{
"input": "10\n15 28 39 48 55 60 63 64 74 82",
"output": "90"
},
{
"input": "2\n1 18",
"output": "16"
},
{
"input": "9\n10 20 30 40 50 60 70 80 84",
"output": "90"
},
{
"input": "2\n16 50",
"output": "15"
},
{
"input": "6\n15 30 45 60 75 84",
"output": "90"
},
{
"input": "8\n15 20 30 40 50 60 73 83",
"output": "90"
},
{
"input": "8\n10 20 30 40 50 60 70 80",
"output": "90"
},
{
"input": "3\n1 20 90",
"output": "16"
},
{
"input": "6\n15 30 45 60 74 89",
"output": "90"
}
] | 1,462,634,183 | 683 | Python 3 | OK | TESTS | 34 | 61 | 4,608,000 | def solve():
n = int(input())
ar = list(map(int, input().split()))
prev = 0
for i in range(n):
if ar[i] - prev > 15:
print(prev + 15)
return
prev = ar[i]
print(min(90, prev + 15))
solve() | Title: Bear and Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Bear Limak likes watching sports on TV. He is going to watch a game today. The game lasts 90 minutes and there are no breaks.
Each minute can be either interesting or boring. If 15 consecutive minutes are boring then Limak immediately turns TV off.
You know that there will be *n* interesting minutes *t*1,<=*t*2,<=...,<=*t**n*. Your task is to calculate for how many minutes Limak will watch the game.
Input Specification:
The first line of the input contains one integer *n* (1<=≤<=*n*<=≤<=90) — the number of interesting minutes.
The second line contains *n* integers *t*1,<=*t*2,<=...,<=*t**n* (1<=≤<=*t*1<=<<=*t*2<=<<=... *t**n*<=≤<=90), given in the increasing order.
Output Specification:
Print the number of minutes Limak will watch the game.
Demo Input:
['3\n7 20 88\n', '9\n16 20 30 40 50 60 70 80 90\n', '9\n15 20 30 40 50 60 70 80 90\n']
Demo Output:
['35\n', '15\n', '90\n']
Note:
In the first sample, minutes 21, 22, ..., 35 are all boring and thus Limak will turn TV off immediately after the 35-th minute. So, he would watch the game for 35 minutes.
In the second sample, the first 15 minutes are boring.
In the third sample, there are no consecutive 15 boring minutes. So, Limak will watch the whole game. | ```python
def solve():
n = int(input())
ar = list(map(int, input().split()))
prev = 0
for i in range(n):
if ar[i] - prev > 15:
print(prev + 15)
return
prev = ar[i]
print(min(90, prev + 15))
solve()
``` | 3 | |
141 | A | Amusing Joke | PROGRAMMING | 800 | [
"implementation",
"sortings",
"strings"
] | null | null | So, the New Year holidays are over. Santa Claus and his colleagues can take a rest and have guests at last. When two "New Year and Christmas Men" meet, thear assistants cut out of cardboard the letters from the guest's name and the host's name in honor of this event. Then the hung the letters above the main entrance. One night, when everyone went to bed, someone took all the letters of our characters' names. Then he may have shuffled the letters and put them in one pile in front of the door.
The next morning it was impossible to find the culprit who had made the disorder. But everybody wondered whether it is possible to restore the names of the host and his guests from the letters lying at the door? That is, we need to verify that there are no extra letters, and that nobody will need to cut more letters.
Help the "New Year and Christmas Men" and their friends to cope with this problem. You are given both inscriptions that hung over the front door the previous night, and a pile of letters that were found at the front door next morning. | The input file consists of three lines: the first line contains the guest's name, the second line contains the name of the residence host and the third line contains letters in a pile that were found at the door in the morning. All lines are not empty and contain only uppercase Latin letters. The length of each line does not exceed 100. | Print "YES" without the quotes, if the letters in the pile could be permuted to make the names of the "New Year and Christmas Men". Otherwise, print "NO" without the quotes. | [
"SANTACLAUS\nDEDMOROZ\nSANTAMOROZDEDCLAUS\n",
"PAPAINOEL\nJOULUPUKKI\nJOULNAPAOILELUPUKKI\n",
"BABBONATALE\nFATHERCHRISTMAS\nBABCHRISTMASBONATALLEFATHER\n"
] | [
"YES\n",
"NO\n",
"NO\n"
] | In the first sample the letters written in the last line can be used to write the names and there won't be any extra letters left.
In the second sample letter "P" is missing from the pile and there's an extra letter "L".
In the third sample there's an extra letter "L". | 500 | [
{
"input": "SANTACLAUS\nDEDMOROZ\nSANTAMOROZDEDCLAUS",
"output": "YES"
},
{
"input": "PAPAINOEL\nJOULUPUKKI\nJOULNAPAOILELUPUKKI",
"output": "NO"
},
{
"input": "BABBONATALE\nFATHERCHRISTMAS\nBABCHRISTMASBONATALLEFATHER",
"output": "NO"
},
{
"input": "B\nA\nAB",
"output": "YES"
},
{
"input": "ONDOL\nJNPB\nONLNJBODP",
"output": "YES"
},
{
"input": "Y\nW\nYW",
"output": "YES"
},
{
"input": "OI\nM\nIMO",
"output": "YES"
},
{
"input": "VFQRWWWACX\nGHZJPOQUSXRAQDGOGMR\nOPAWDOUSGWWCGQXXQAZJRQRGHRMVF",
"output": "YES"
},
{
"input": "JUTCN\nPIGMZOPMEUFADQBW\nNWQGZMAIPUPOMCDUB",
"output": "NO"
},
{
"input": "Z\nO\nZOCNDOLTBZKQLTBOLDEGXRHZGTTPBJBLSJCVSVXISQZCSFDEBXRCSGBGTHWOVIXYHACAGBRYBKBJAEPIQZHVEGLYH",
"output": "NO"
},
{
"input": "IQ\nOQ\nQOQIGGKFNHJSGCGM",
"output": "NO"
},
{
"input": "ROUWANOPNIGTVMIITVMZ\nOQTUPZMTKUGY\nVTVNGZITGPUNPMQOOATUUIYIWMMKZOTR",
"output": "YES"
},
{
"input": "OVQELLOGFIOLEHXMEMBJDIGBPGEYFG\nJNKFPFFIJOFHRIFHXEWYZOPDJBZTJZKBWQTECNHRFSJPJOAPQT\nYAIPFFFEXJJNEJPLREIGODEGQZVMCOBDFKWTMWJSBEBTOFFQOHIQJLHFNXIGOHEZRZLFOKJBJPTPHPGY",
"output": "YES"
},
{
"input": "NBJGVNGUISUXQTBOBKYHQCOOVQWUXWPXBUDLXPKX\nNSFQDFUMQDQWQ\nWXKKVNTDQQFXCUQBIMQGQHSLVGWSBFYBUPOWPBDUUJUXQNOQDNXOX",
"output": "YES"
},
{
"input": "IJHHGKCXWDBRWJUPRDBZJLNTTNWKXLUGJSBWBOAUKWRAQWGFNL\nNJMWRMBCNPHXTDQQNZ\nWDNJRCLILNQRHWBANLTXWMJBPKUPGKJDJZAQWKTZFBRCTXHHBNXRGUQUNBNMWODGSJWW",
"output": "YES"
},
{
"input": "SRROWANGUGZHCIEFYMQVTWVOMDWPUZJFRDUMVFHYNHNTTGNXCJ\nDJYWGLBFCCECXFHOLORDGDCNRHPWXNHXFCXQCEZUHRRNAEKUIX\nWCUJDNYHNHYOPWMHLDCDYRWBVOGHFFUKOZTXJRXJHRGWICCMRNEVNEGQWTZPNFCSHDRFCFQDCXMHTLUGZAXOFNXNVGUEXIACRERU",
"output": "YES"
},
{
"input": "H\nJKFGHMIAHNDBMFXWYQLZRSVNOTEGCQSVUBYUOZBTNKTXPFQDCMKAGFITEUGOYDFIYQIORMFJEOJDNTFVIQEBICSNGKOSNLNXJWC\nBQSVDOGIHCHXSYNYTQFCHNJGYFIXTSOQINZOKSVQJMTKNTGFNXAVTUYEONMBQMGJLEWJOFGEARIOPKFUFCEMUBRBDNIIDFZDCLWK",
"output": "YES"
},
{
"input": "DSWNZRFVXQ\nPVULCZGOOU\nUOLVZXNUPOQRZGWFVDSCANQTCLEIE",
"output": "NO"
},
{
"input": "EUHTSCENIPXLTSBMLFHD\nIZAVSZPDLXOAGESUSE\nLXAELAZ",
"output": "NO"
},
{
"input": "WYSJFEREGELSKRQRXDXCGBODEFZVSI\nPEJKMGFLBFFDWRCRFSHVEFLEBTJCVCHRJTLDTISHPOGFWPLEWNYJLMXWIAOTYOXMV\nHXERTZWLEXTPIOTFRVMEJVYFFJLRPFMXDEBNSGCEOFFCWTKIDDGCFYSJKGLHBORWEPLDRXRSJYBGASSVCMHEEJFLVI",
"output": "NO"
},
{
"input": "EPBMDIUQAAUGLBIETKOKFLMTCVEPETWJRHHYKCKU\nHGMAETVPCFZYNNKDQXVXUALHYLOTCHM\nECGXACVKEYMCEDOTMKAUFHLHOMT",
"output": "NO"
},
{
"input": "NUBKQEJHALANSHEIFUZHYEZKKDRFHQKAJHLAOWTZIMOCWOVVDW\nEFVOBIGAUAUSQGVSNBKNOBDMINODMFSHDL\nKLAMKNTHBFFOHVKWICHBKNDDQNEISODUSDNLUSIOAVWY",
"output": "NO"
},
{
"input": "VXINHOMEQCATZUGAJEIUIZZLPYFGUTVLNBNWCUVMEENUXKBWBGZTMRJJVJDLVSLBABVCEUDDSQFHOYPYQTWVAGTWOLKYISAGHBMC\nZMRGXPZSHOGCSAECAPGVOIGCWEOWWOJXLGYRDMPXBLOKZVRACPYQLEQGFQCVYXAGBEBELUTDAYEAGPFKXRULZCKFHZCHVCWIRGPK\nRCVUXGQVNWFGRUDLLENNDQEJHYYVWMKTLOVIPELKPWCLSQPTAXAYEMGWCBXEVAIZGGDDRBRT",
"output": "NO"
},
{
"input": "PHBDHHWUUTZAHELGSGGOPOQXSXEZIXHZTOKYFBQLBDYWPVCNQSXHEAXRRPVHFJBVBYCJIFOTQTWSUOWXLKMVJJBNLGTVITWTCZZ\nFUPDLNVIHRWTEEEHOOEC\nLOUSUUSZCHJBPEWIILUOXEXRQNCJEGTOBRVZLTTZAHTKVEJSNGHFTAYGY",
"output": "NO"
},
{
"input": "GDSLNIIKTO\nJF\nPDQYFKDTNOLI",
"output": "NO"
},
{
"input": "AHOKHEKKPJLJIIWJRCGY\nORELJCSIX\nZVWPXVFWFSWOXXLIHJKPXIOKRELYE",
"output": "NO"
},
{
"input": "ZWCOJFORBPHXCOVJIDPKVECMHVHCOC\nTEV\nJVGTBFTLFVIEPCCHODOFOMCVZHWXVCPEH",
"output": "NO"
},
{
"input": "AGFIGYWJLVMYZGNQHEHWKJIAWBPUAQFERMCDROFN\nPMJNHMVNRGCYZAVRWNDSMLSZHFNYIUWFPUSKKIGU\nMCDVPPRXGUAYLSDRHRURZASXUWZSIIEZCPXUVEONKNGNWRYGOSFMCKESMVJZHWWUCHWDQMLASLNNMHAU",
"output": "NO"
},
{
"input": "XLOWVFCZSSXCSYQTIIDKHNTKNKEEDFMDZKXSPVLBIDIREDUAIN\nZKIWNDGBISDB\nSLPKLYFYSRNRMOSWYLJJDGFFENPOXYLPZFTQDANKBDNZDIIEWSUTTKYBKVICLG",
"output": "NO"
},
{
"input": "PMUKBTRKFIAYVGBKHZHUSJYSSEPEOEWPOSPJLWLOCTUYZODLTUAFCMVKGQKRRUSOMPAYOTBTFPXYAZXLOADDEJBDLYOTXJCJYTHA\nTWRRAJLCQJTKOKWCGUH\nEWDPNXVCXWCDQCOYKKSOYTFSZTOOPKPRDKFJDETKSRAJRVCPDOBWUGPYRJPUWJYWCBLKOOTUPBESTOFXZHTYLLMCAXDYAEBUTAHM",
"output": "NO"
},
{
"input": "QMIMGQRQDMJDPNFEFXSXQMCHEJKTWCTCVZPUAYICOIRYOWKUSIWXJLHDYWSBOITHTMINXFKBKAWZTXXBJIVYCRWKXNKIYKLDDXL\nV\nFWACCXBVDOJFIUAVYRALBYJKXXWIIFORRUHKHCXLDBZMXIYJWISFEAWTIQFIZSBXMKNOCQKVKRWDNDAMQSTKYLDNYVTUCGOJXJTW",
"output": "NO"
},
{
"input": "XJXPVOOQODELPPWUISSYVVXRJTYBPDHJNENQEVQNVFIXSESKXVYPVVHPMOSX\nLEXOPFPVPSZK\nZVXVPYEYOYXVOISVLXPOVHEQVXPNQJIOPFDTXEUNMPEPPHELNXKKWSVSOXSBPSJDPVJVSRFQ",
"output": "YES"
},
{
"input": "OSKFHGYNQLSRFSAHPXKGPXUHXTRBJNAQRBSSWJVEENLJCDDHFXVCUNPZAIVVO\nFNUOCXAGRRHNDJAHVVLGGEZQHWARYHENBKHP\nUOEFNWVXCUNERLKVTHAGPSHKHDYFPYWZHJKHQLSNFBJHVJANRXCNSDUGVDABGHVAOVHBJZXGRACHRXEGNRPQEAPORQSILNXFS",
"output": "YES"
},
{
"input": "VYXYVVACMLPDHONBUTQFZTRREERBLKUJYKAHZRCTRLRCLOZYWVPBRGDQPFPQIF\nFE\nRNRPEVDRLYUQFYRZBCQLCYZEABKLRXCJLKVZBVFUEYRATOMDRTHFPGOWQVTIFPPH",
"output": "YES"
},
{
"input": "WYXUZQJQNLASEGLHPMSARWMTTQMQLVAZLGHPIZTRVTCXDXBOLNXZPOFCTEHCXBZ\nBLQZRRWP\nGIQZXPLTTMNHQVWPPEAPLOCDMBSTHRCFLCQRRZXLVAOQEGZBRUZJXXZTMAWLZHSLWNQTYXB",
"output": "YES"
},
{
"input": "MKVJTSSTDGKPVVDPYSRJJYEVGKBMSIOKHLZQAEWLRIBINVRDAJIBCEITKDHUCCVY\nPUJJQFHOGZKTAVNUGKQUHMKTNHCCTI\nQVJKUSIGTSVYUMOMLEGHWYKSKQTGATTKBNTKCJKJPCAIRJIRMHKBIZISEGFHVUVQZBDERJCVAKDLNTHUDCHONDCVVJIYPP",
"output": "YES"
},
{
"input": "OKNJOEYVMZXJMLVJHCSPLUCNYGTDASKSGKKCRVIDGEIBEWRVBVRVZZTLMCJLXHJIA\nDJBFVRTARTFZOWN\nAGHNVUNJVCPLWSVYBJKZSVTFGLELZASLWTIXDDJXCZDICTVIJOTMVEYOVRNMJGRKKHRMEBORAKFCZJBR",
"output": "YES"
},
{
"input": "OQZACLPSAGYDWHFXDFYFRRXWGIEJGSXWUONAFWNFXDTGVNDEWNQPHUXUJNZWWLBPYL\nOHBKWRFDRQUAFRCMT\nWIQRYXRJQWWRUWCYXNXALKFZGXFTLOODWRDPGURFUFUQOHPWBASZNVWXNCAGHWEHFYESJNFBMNFDDAPLDGT",
"output": "YES"
},
{
"input": "OVIRQRFQOOWVDEPLCJETWQSINIOPLTLXHSQWUYUJNFBMKDNOSHNJQQCDHZOJVPRYVSV\nMYYDQKOOYPOOUELCRIT\nNZSOTVLJTTVQLFHDQEJONEOUOFOLYVSOIYUDNOSIQVIRMVOERCLMYSHPCQKIDRDOQPCUPQBWWRYYOXJWJQPNKH",
"output": "YES"
},
{
"input": "WGMBZWNMSJXNGDUQUJTCNXDSJJLYRDOPEGPQXYUGBESDLFTJRZDDCAAFGCOCYCQMDBWK\nYOBMOVYTUATTFGJLYUQD\nDYXVTLQCYFJUNJTUXPUYOPCBCLBWNSDUJRJGWDOJDSQAAMUOJWSYERDYDXYTMTOTMQCGQZDCGNFBALGGDFKZMEBG",
"output": "YES"
},
{
"input": "CWLRBPMEZCXAPUUQFXCUHAQTLPBTXUUKWVXKBHKNSSJFEXLZMXGVFHHVTPYAQYTIKXJJE\nMUFOSEUEXEQTOVLGDSCWM\nJUKEQCXOXWEHCGKFPBIGMWVJLXUONFXBYTUAXERYTXKCESKLXAEHVPZMMUFTHLXTTZSDMBJLQPEUWCVUHSQQVUASPF",
"output": "YES"
},
{
"input": "IDQRX\nWETHO\nODPDGBHVUVSSISROHQJTUKPUCLXABIZQQPPBPKOSEWGEHRSRRNBAVLYEMZISMWWGKHVTXKUGUXEFBSWOIWUHRJGMWBMHQLDZHBWA",
"output": "NO"
},
{
"input": "IXFDY\nJRMOU\nDF",
"output": "NO"
},
{
"input": "JPSPZ\nUGCUB\nJMZZZZZZZZ",
"output": "NO"
},
{
"input": "AC\nA\nBBA",
"output": "NO"
},
{
"input": "UIKWWKXLSHTOOZOVGXKYSOJEHAUEEG\nKZXQDWJJWRXFHKJDQHJK\nXMZHTFOGEXAUJXXJUYVJIFOTKLZHDKELJWERHMGAWGKWAQKEKHIDWGGZVYOHKXRPWSJDPESFJUMKQYWBYUTHQYEFZUGKQOBHYDWB",
"output": "NO"
},
{
"input": "PXWRXRPFLR\nPJRWWXIVHODV\nXW",
"output": "NO"
},
{
"input": "CHTAZVHGSHCVIBK\nEQINEBKXEPYJSAZIMLDF\nZCZZZZDZMCZZEZDZZEZZZZQZZBZZZOZZCZE",
"output": "NO"
},
{
"input": "GXPZFSELJJNDAXYRV\nUYBKPMVBSOVOJWMONLTJOJCNQKMTAHEWLHOWIIBH\nHCWNFWJPEJIWOVPTBMVCRJLSISSVNOHCKLBFMIUAIMASQWPXEYXBOXQGFEMYJLBKDCZIMJNHOJEDGGANIVYKQTUOSOVOPWHVJGXH",
"output": "NO"
},
{
"input": "LFGJCJJDUTUP\nOVSBILTIYCJCRHKCIXCETJQJJ\nGIJJTJCLTJJJ",
"output": "NO"
},
{
"input": "GIO\nPRL\nPRL",
"output": "NO"
},
{
"input": "A\nB\nABC",
"output": "NO"
},
{
"input": "KKK\nKKK\nZZZZZ",
"output": "NO"
},
{
"input": "ZMYGQLDBLAPN\nZFJBKWHROVNPSJQUDFTHOCGREUFLYIWYICD\nZMJZZEDAZANKZZZZZZEZZBZDZZZZZZKHZZFZZZDZNZMDZZA",
"output": "NO"
}
] | 1,680,444,281 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 1 | 92 | 0 | l1 = input()
l2 = input()
l3 = input()
if len(l1) + len(l2) == len(l3):
print("YES")
else:
print("NO") | Title: Amusing Joke
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
So, the New Year holidays are over. Santa Claus and his colleagues can take a rest and have guests at last. When two "New Year and Christmas Men" meet, thear assistants cut out of cardboard the letters from the guest's name and the host's name in honor of this event. Then the hung the letters above the main entrance. One night, when everyone went to bed, someone took all the letters of our characters' names. Then he may have shuffled the letters and put them in one pile in front of the door.
The next morning it was impossible to find the culprit who had made the disorder. But everybody wondered whether it is possible to restore the names of the host and his guests from the letters lying at the door? That is, we need to verify that there are no extra letters, and that nobody will need to cut more letters.
Help the "New Year and Christmas Men" and their friends to cope with this problem. You are given both inscriptions that hung over the front door the previous night, and a pile of letters that were found at the front door next morning.
Input Specification:
The input file consists of three lines: the first line contains the guest's name, the second line contains the name of the residence host and the third line contains letters in a pile that were found at the door in the morning. All lines are not empty and contain only uppercase Latin letters. The length of each line does not exceed 100.
Output Specification:
Print "YES" without the quotes, if the letters in the pile could be permuted to make the names of the "New Year and Christmas Men". Otherwise, print "NO" without the quotes.
Demo Input:
['SANTACLAUS\nDEDMOROZ\nSANTAMOROZDEDCLAUS\n', 'PAPAINOEL\nJOULUPUKKI\nJOULNAPAOILELUPUKKI\n', 'BABBONATALE\nFATHERCHRISTMAS\nBABCHRISTMASBONATALLEFATHER\n']
Demo Output:
['YES\n', 'NO\n', 'NO\n']
Note:
In the first sample the letters written in the last line can be used to write the names and there won't be any extra letters left.
In the second sample letter "P" is missing from the pile and there's an extra letter "L".
In the third sample there's an extra letter "L". | ```python
l1 = input()
l2 = input()
l3 = input()
if len(l1) + len(l2) == len(l3):
print("YES")
else:
print("NO")
``` | 0 | |
540 | A | Combination Lock | PROGRAMMING | 800 | [
"implementation"
] | null | null | Scrooge McDuck keeps his most treasured savings in a home safe with a combination lock. Each time he wants to put there the treasures that he's earned fair and square, he has to open the lock.
The combination lock is represented by *n* rotating disks with digits from 0 to 9 written on them. Scrooge McDuck has to turn some disks so that the combination of digits on the disks forms a secret combination. In one move, he can rotate one disk one digit forwards or backwards. In particular, in one move he can go from digit 0 to digit 9 and vice versa. What minimum number of actions does he need for that? | The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of disks on the combination lock.
The second line contains a string of *n* digits — the original state of the disks.
The third line contains a string of *n* digits — Scrooge McDuck's combination that opens the lock. | Print a single integer — the minimum number of moves Scrooge McDuck needs to open the lock. | [
"5\n82195\n64723\n"
] | [
"13\n"
] | In the sample he needs 13 moves:
- 1 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b8967f65a723782358b93eff9ce69f336817cf70.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 2 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/07fa58573ece0d32c4d555e498d2b24d2f70f36a.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 3 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/cc2275d9252aae35a6867c6a5b4ba7596e9a7626.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 4 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b100aea470fcaaab4e9529b234ba0d7875943c10.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 5 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/eb2cbe4324cebca65b85816262a85e473cd65967.png" style="max-width: 100.0%;max-height: 100.0%;"/> | 500 | [
{
"input": "5\n82195\n64723",
"output": "13"
},
{
"input": "12\n102021090898\n010212908089",
"output": "16"
},
{
"input": "1\n8\n1",
"output": "3"
},
{
"input": "2\n83\n57",
"output": "7"
},
{
"input": "10\n0728592530\n1362615763",
"output": "27"
},
{
"input": "100\n4176196363694273682807653052945037727131821799902563705176501742060696655282954944720643131654235909\n3459912084922154505910287499879975659298239371519889866585472674423008837878123067103005344986554746",
"output": "245"
},
{
"input": "1\n8\n1",
"output": "3"
},
{
"input": "2\n83\n57",
"output": "7"
},
{
"input": "3\n607\n684",
"output": "5"
},
{
"input": "4\n0809\n0636",
"output": "8"
},
{
"input": "5\n84284\n08941",
"output": "16"
},
{
"input": "25\n8037856825987124762280548\n9519431339078678836940020",
"output": "72"
},
{
"input": "125\n23269567683904664184142384849516523616863461607751021071772615078579713054027902974007001544768640273491193035874486891541257\n47635110303703399505805044019026243695451609639556649012447370081552870340011971572363458960190590266459684717415349529509024",
"output": "305"
},
{
"input": "5\n84284\n08941",
"output": "16"
},
{
"input": "25\n8037856825987124762285484\n9519431339078678836940202",
"output": "74"
},
{
"input": "125\n23269567689466418414238845152168634610771021717726157879713054270294007001544768647391193035874486891412573389247025830678706\n47635110307339950580504010224954516093956649124473708152870340117152363458960190596659684717415349529090241694059599629136831",
"output": "357"
},
{
"input": "5\n84284\n08941",
"output": "16"
},
{
"input": "25\n8378525987476228048406972\n9194339078883694020217816",
"output": "55"
},
{
"input": "125\n23269576839046618414238484916523616863461607750210717761078579713054027902974007015447686027349193035874486891541257338624472\n47635103037033950580504401926243695451609639556490124437081552870340011971572363489601905026645984717415349529509024169604599",
"output": "274"
},
{
"input": "1\n0\n0",
"output": "0"
},
{
"input": "1\n7\n7",
"output": "0"
},
{
"input": "1\n0\n5",
"output": "5"
},
{
"input": "1\n2\n7",
"output": "5"
},
{
"input": "1\n7\n9",
"output": "2"
},
{
"input": "1\n9\n7",
"output": "2"
},
{
"input": "1\n2\n9",
"output": "3"
},
{
"input": "1\n9\n2",
"output": "3"
},
{
"input": "25\n3164978461316464614169874\n9413979197249127496597357",
"output": "66"
},
{
"input": "4\n9999\n9999",
"output": "0"
},
{
"input": "2\n11\n11",
"output": "0"
}
] | 1,646,535,128 | 2,147,483,647 | PyPy 3 | RUNTIME_ERROR | TESTS | 0 | 77 | 2,048,000 | i = int(input())
for i in range(i):
vis = {}
a = input().split("")
len_a = int(input())
for j in range(len_a):
a[j] = int(a[j])
if vis.get(a[j]) is None:
vis[a[j]] = 0
vis[a[j]] += 1
vis[a[j]] = min(vis[a[j]], 2)
if vis.get(0) is not None:
vis[0] = 1
sum = 0
for j in vis.keys():
sum += vis[j]
print(sum) | Title: Combination Lock
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Scrooge McDuck keeps his most treasured savings in a home safe with a combination lock. Each time he wants to put there the treasures that he's earned fair and square, he has to open the lock.
The combination lock is represented by *n* rotating disks with digits from 0 to 9 written on them. Scrooge McDuck has to turn some disks so that the combination of digits on the disks forms a secret combination. In one move, he can rotate one disk one digit forwards or backwards. In particular, in one move he can go from digit 0 to digit 9 and vice versa. What minimum number of actions does he need for that?
Input Specification:
The first line contains a single integer *n* (1<=≤<=*n*<=≤<=1000) — the number of disks on the combination lock.
The second line contains a string of *n* digits — the original state of the disks.
The third line contains a string of *n* digits — Scrooge McDuck's combination that opens the lock.
Output Specification:
Print a single integer — the minimum number of moves Scrooge McDuck needs to open the lock.
Demo Input:
['5\n82195\n64723\n']
Demo Output:
['13\n']
Note:
In the sample he needs 13 moves:
- 1 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b8967f65a723782358b93eff9ce69f336817cf70.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 2 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/07fa58573ece0d32c4d555e498d2b24d2f70f36a.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 3 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/cc2275d9252aae35a6867c6a5b4ba7596e9a7626.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 4 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/b100aea470fcaaab4e9529b234ba0d7875943c10.png" style="max-width: 100.0%;max-height: 100.0%;"/> - 5 disk: <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/eb2cbe4324cebca65b85816262a85e473cd65967.png" style="max-width: 100.0%;max-height: 100.0%;"/> | ```python
i = int(input())
for i in range(i):
vis = {}
a = input().split("")
len_a = int(input())
for j in range(len_a):
a[j] = int(a[j])
if vis.get(a[j]) is None:
vis[a[j]] = 0
vis[a[j]] += 1
vis[a[j]] = min(vis[a[j]], 2)
if vis.get(0) is not None:
vis[0] = 1
sum = 0
for j in vis.keys():
sum += vis[j]
print(sum)
``` | -1 | |
644 | A | Parliament of Berland | PROGRAMMING | 1,000 | [
"*special",
"constructive algorithms"
] | null | null | There are *n* parliamentarians in Berland. They are numbered with integers from 1 to *n*. It happened that all parliamentarians with odd indices are Democrats and all parliamentarians with even indices are Republicans.
New parliament assembly hall is a rectangle consisting of *a*<=×<=*b* chairs — *a* rows of *b* chairs each. Two chairs are considered neighbouring if they share as side. For example, chair number 5 in row number 2 is neighbouring to chairs number 4 and 6 in this row and chairs with number 5 in rows 1 and 3. Thus, chairs have four neighbours in general, except for the chairs on the border of the hall
We know that if two parliamentarians from one political party (that is two Democrats or two Republicans) seat nearby they spent all time discussing internal party issues.
Write the program that given the number of parliamentarians and the sizes of the hall determine if there is a way to find a seat for any parliamentarian, such that no two members of the same party share neighbouring seats. | The first line of the input contains three integers *n*, *a* and *b* (1<=≤<=*n*<=≤<=10<=000, 1<=≤<=*a*,<=*b*<=≤<=100) — the number of parliamentarians, the number of rows in the assembly hall and the number of seats in each row, respectively. | If there is no way to assigns seats to parliamentarians in a proper way print -1.
Otherwise print the solution in *a* lines, each containing *b* integers. The *j*-th integer of the *i*-th line should be equal to the index of parliamentarian occupying this seat, or 0 if this seat should remain empty. If there are multiple possible solution, you may print any of them. | [
"3 2 2\n",
"8 4 3\n",
"10 2 2\n"
] | [
"0 3\n1 2\n",
"7 8 3\n0 1 4\n6 0 5\n0 2 0\n",
"-1\n"
] | In the first sample there are many other possible solutions. For example,
and
The following assignment
is incorrect, because parliamentarians 1 and 3 are both from Democrats party but will occupy neighbouring seats. | 500 | [
{
"input": "3 2 2",
"output": "1 2 \n0 3 "
},
{
"input": "8 4 3",
"output": "1 2 3 \n4 5 6 \n7 8 0 \n0 0 0 "
},
{
"input": "10 2 2",
"output": "-1"
},
{
"input": "1 1 1",
"output": "1 "
},
{
"input": "8 3 3",
"output": "1 2 3 \n4 5 6 \n7 8 0 "
},
{
"input": "1 1 100",
"output": "1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 "
},
{
"input": "1 100 1",
"output": "1 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 \n0 "
},
{
"input": "12 4 3",
"output": "1 2 3 \n4 5 6 \n7 8 9 \n10 11 12 "
},
{
"input": "64 8 9",
"output": "1 2 3 4 5 6 7 8 9 \n10 11 12 13 14 15 16 17 18 \n19 20 21 22 23 24 25 26 27 \n28 29 30 31 32 33 34 35 36 \n37 38 39 40 41 42 43 44 45 \n46 47 48 49 50 51 52 53 54 \n55 56 57 58 59 60 61 62 63 \n64 0 0 0 0 0 0 0 0 "
},
{
"input": "13 2 6",
"output": "-1"
},
{
"input": "41 6 7",
"output": "1 2 3 4 5 6 7 \n8 9 10 11 12 13 14 \n15 16 17 18 19 20 21 \n22 23 24 25 26 27 28 \n29 30 31 32 33 34 35 \n36 37 38 39 40 41 0 "
},
{
"input": "9999 100 100",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 \n102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "10000 100 100",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 \n102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "2099 70 30",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 \n32 31 34 33 36 35 38 37 40 39 42 41 44 43 46 45 48 47 50 49 52 51 54 53 56 55 58 57 60 59 \n61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 \n92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 \n121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 \n152 151 1..."
},
{
"input": "2098 30 70",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 \n72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 \n141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "10000 1 1",
"output": "-1"
},
{
"input": "1583 49 36",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 \n38 37 40 39 42 41 44 43 46 45 48 47 50 49 52 51 54 53 56 55 58 57 60 59 62 61 64 63 66 65 68 67 70 69 72 71 \n73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 \n110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 \n145 146 147 148 149 150 151 152 153..."
},
{
"input": "4825 77 88",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 \n90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "26 1 33",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 0 0 0 0 0 0 0 "
},
{
"input": "274 25 77",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 \n78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 \n..."
},
{
"input": "694 49 22",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 \n24 23 26 25 28 27 30 29 32 31 34 33 36 35 38 37 40 39 42 41 44 43 \n45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 \n68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 \n89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 \n112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 \n133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152..."
},
{
"input": "3585 77 62",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 \n64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 \n125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "3 1 6",
"output": "1 2 3 0 0 0 "
},
{
"input": "352 25 59",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 \n60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 \n119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "150 53 3",
"output": "1 2 3 \n4 5 6 \n7 8 9 \n10 11 12 \n13 14 15 \n16 17 18 \n19 20 21 \n22 23 24 \n25 26 27 \n28 29 30 \n31 32 33 \n34 35 36 \n37 38 39 \n40 41 42 \n43 44 45 \n46 47 48 \n49 50 51 \n52 53 54 \n55 56 57 \n58 59 60 \n61 62 63 \n64 65 66 \n67 68 69 \n70 71 72 \n73 74 75 \n76 77 78 \n79 80 81 \n82 83 84 \n85 86 87 \n88 89 90 \n91 92 93 \n94 95 96 \n97 98 99 \n100 101 102 \n103 104 105 \n106 107 108 \n109 110 111 \n112 113 114 \n115 116 117 \n118 119 120 \n121 122 123 \n124 125 126 \n127 128 129 \n130 131 132 \n133..."
},
{
"input": "4227 91 80",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 \n82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "378 19 25",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 \n26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 \n51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 \n76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 \n101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 \n126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 \n151 152..."
},
{
"input": "2357 43 65",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 \n66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 \n131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "232 71 9",
"output": "1 2 3 4 5 6 7 8 9 \n10 11 12 13 14 15 16 17 18 \n19 20 21 22 23 24 25 26 27 \n28 29 30 31 32 33 34 35 36 \n37 38 39 40 41 42 43 44 45 \n46 47 48 49 50 51 52 53 54 \n55 56 57 58 59 60 61 62 63 \n64 65 66 67 68 69 70 71 72 \n73 74 75 76 77 78 79 80 81 \n82 83 84 85 86 87 88 89 90 \n91 92 93 94 95 96 97 98 99 \n100 101 102 103 104 105 106 107 108 \n109 110 111 112 113 114 115 116 117 \n118 119 120 121 122 123 124 125 126 \n127 128 129 130 131 132 133 134 135 \n136 137 138 139 140 141 142 143 144 \n145 146 147..."
},
{
"input": "2362 91 62",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 \n64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 \n125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "4601 59 78",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 \n80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "4439 74 60",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 \n62 61 64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 \n121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "3733 89 42",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 \n44 43 46 45 48 47 50 49 52 51 54 53 56 55 58 57 60 59 62 61 64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 \n85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 \n128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 1..."
},
{
"input": "335 12 28",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 \n30 29 32 31 34 33 36 35 38 37 40 39 42 41 44 43 46 45 48 47 50 49 52 51 54 53 56 55 \n57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 \n86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 \n113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 \n142 141 144 143 146 145 148 147 150 149 152 151 1..."
},
{
"input": "440 26 17",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 \n18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 \n35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 \n52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 \n69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 \n86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 \n103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 \n120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 \n137 138 139 140 141 142 143 144 145 146 147 148 149 150 151..."
},
{
"input": "109 37 3",
"output": "1 2 3 \n4 5 6 \n7 8 9 \n10 11 12 \n13 14 15 \n16 17 18 \n19 20 21 \n22 23 24 \n25 26 27 \n28 29 30 \n31 32 33 \n34 35 36 \n37 38 39 \n40 41 42 \n43 44 45 \n46 47 48 \n49 50 51 \n52 53 54 \n55 56 57 \n58 59 60 \n61 62 63 \n64 65 66 \n67 68 69 \n70 71 72 \n73 74 75 \n76 77 78 \n79 80 81 \n82 83 84 \n85 86 87 \n88 89 90 \n91 92 93 \n94 95 96 \n97 98 99 \n100 101 102 \n103 104 105 \n106 107 108 \n109 0 0 "
},
{
"input": "4416 52 85",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 \n86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "5025 75 67",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 \n68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 \n135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "4983 89 56",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 \n58 57 60 59 62 61 64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 \n113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "950 17 56",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 \n58 57 60 59 62 61 64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 \n113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "1637 40 41",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 \n42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 \n83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 \n124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 1..."
},
{
"input": "1142 52 22",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 \n24 23 26 25 28 27 30 29 32 31 34 33 36 35 38 37 40 39 42 41 44 43 \n45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 \n68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 \n89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 \n112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 \n133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152..."
},
{
"input": "907 70 13",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 \n14 15 16 17 18 19 20 21 22 23 24 25 26 \n27 28 29 30 31 32 33 34 35 36 37 38 39 \n40 41 42 43 44 45 46 47 48 49 50 51 52 \n53 54 55 56 57 58 59 60 61 62 63 64 65 \n66 67 68 69 70 71 72 73 74 75 76 77 78 \n79 80 81 82 83 84 85 86 87 88 89 90 91 \n92 93 94 95 96 97 98 99 100 101 102 103 104 \n105 106 107 108 109 110 111 112 113 114 115 116 117 \n118 119 120 121 122 123 124 125 126 127 128 129 130 \n131 132 133 134 135 136 137 138 139 140 141 142 143 \n144 145 146 147 148 149 1..."
},
{
"input": "7279 80 91",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 \n92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "1653 87 19",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 \n20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 \n39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 \n58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 \n77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 \n96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 \n115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 \n134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 1..."
},
{
"input": "15 2 8",
"output": "1 2 3 4 5 6 7 8 \n10 9 12 11 14 13 0 15 "
},
{
"input": "1459 17 86",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 \n88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "3035 40 76",
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},
{
"input": "3095 50 62",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 \n64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 \n125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "3055 65 47",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 \n48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 \n95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 \n142 143 144 145 146 147 148 149 150 151 152 153 1..."
},
{
"input": "2638 80 33",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 \n34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 \n67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 \n100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 \n133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153..."
},
{
"input": "29 3 11",
"output": "1 2 3 4 5 6 7 8 9 10 11 \n12 13 14 15 16 17 18 19 20 21 22 \n23 24 25 26 27 28 29 0 0 0 0 "
},
{
"input": "16 18 1",
"output": "1 \n2 \n3 \n4 \n5 \n6 \n7 \n8 \n9 \n10 \n11 \n12 \n13 \n14 \n15 \n16 \n0 \n0 "
},
{
"input": "2240 27 83",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 \n84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "1264 55 23",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 \n24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 \n47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 \n70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 \n93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 \n116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 \n139 140 141 142 143 144 145 146 147 148 149 150 151 152..."
},
{
"input": "5400 75 72",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 \n74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 \n145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "46 3 16",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 \n18 17 20 19 22 21 24 23 26 25 28 27 30 29 32 31 \n33 34 35 36 37 38 39 40 41 42 43 44 45 46 0 0 "
},
{
"input": "1512 27 56",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 \n58 57 60 59 62 61 64 63 66 65 68 67 70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 \n113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "4206 86 12",
"output": "-1"
},
{
"input": "2358 14 56",
"output": "-1"
},
{
"input": "5420 35 96",
"output": "-1"
},
{
"input": "7758 63 41",
"output": "-1"
},
{
"input": "9806 87 93",
"output": "-1"
},
{
"input": "99 1 97",
"output": "-1"
},
{
"input": "1053 25 42",
"output": "-1"
},
{
"input": "4217 49 86",
"output": "-1"
},
{
"input": "2312 77 30",
"output": "-1"
},
{
"input": "74 1 71",
"output": "-1"
},
{
"input": "1 99 100",
"output": "1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "1 57 99",
"output": "1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \n0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0..."
},
{
"input": "4785 55 87",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 \n88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "4611 53 87",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 \n88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "9801 99 99",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 \n100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "8096 92 88",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 \n90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "5916 68 87",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 \n88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "8928 93 96",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 \n98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "7743 89 87",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 \n88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "3128 46 68",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 \n70 69 72 71 74 73 76 75 78 77 80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 \n137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "3800 40 95",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 \n96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "5368 61 88",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 \n90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "2583 41 63",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 \n64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 \n127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
},
{
"input": "4056 52 78",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 \n80 79 82 81 84 83 86 85 88 87 90 89 92 91 94 93 96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "3822 42 91",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 \n92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154 1..."
},
{
"input": "5358 57 94",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 \n96 95 98 97 100 99 102 101 104 103 106 105 108 107 110 109 112 111 114 113 116 115 118 117 120 119 122 121 124 123 126 125 128 127 130 129 132 131 134 133 136 135 138 137 140 139 142 141 144 143 146 145 148 147 150 149 152 151 154 153 1..."
},
{
"input": "2961 47 63",
"output": "1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 \n64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 80 81 82 83 84 85 86 87 88 89 90 91 92 93 94 95 96 97 98 99 100 101 102 103 104 105 106 107 108 109 110 111 112 113 114 115 116 117 118 119 120 121 122 123 124 125 126 \n127 128 129 130 131 132 133 134 135 136 137 138 139 140 141 142 143 144 145 146 147 148 149 150 151 152 153 154..."
}
] | 1,458,255,962 | 137,162 | Python 3 | OK | TESTS | 85 | 92 | 0 | n, a, b = input().split(' ')
n = int(n)
a = int(a)
b = int(b)
def print_list(li):
res=''
for i in li:
res+=str(i)+' '
print(res[:-1])
def solve():
k=1
if (n>(a*b)):
print('-1')
return
else:
for i in range(0,a):
temp=[]
for j in range(0,b):
if (k <= n):
temp.append(k)
k+=1
else:
temp.append('0')
if ((i%2)==0):
temp=reversed(temp)
print_list(temp)
solve() | Title: Parliament of Berland
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
There are *n* parliamentarians in Berland. They are numbered with integers from 1 to *n*. It happened that all parliamentarians with odd indices are Democrats and all parliamentarians with even indices are Republicans.
New parliament assembly hall is a rectangle consisting of *a*<=×<=*b* chairs — *a* rows of *b* chairs each. Two chairs are considered neighbouring if they share as side. For example, chair number 5 in row number 2 is neighbouring to chairs number 4 and 6 in this row and chairs with number 5 in rows 1 and 3. Thus, chairs have four neighbours in general, except for the chairs on the border of the hall
We know that if two parliamentarians from one political party (that is two Democrats or two Republicans) seat nearby they spent all time discussing internal party issues.
Write the program that given the number of parliamentarians and the sizes of the hall determine if there is a way to find a seat for any parliamentarian, such that no two members of the same party share neighbouring seats.
Input Specification:
The first line of the input contains three integers *n*, *a* and *b* (1<=≤<=*n*<=≤<=10<=000, 1<=≤<=*a*,<=*b*<=≤<=100) — the number of parliamentarians, the number of rows in the assembly hall and the number of seats in each row, respectively.
Output Specification:
If there is no way to assigns seats to parliamentarians in a proper way print -1.
Otherwise print the solution in *a* lines, each containing *b* integers. The *j*-th integer of the *i*-th line should be equal to the index of parliamentarian occupying this seat, or 0 if this seat should remain empty. If there are multiple possible solution, you may print any of them.
Demo Input:
['3 2 2\n', '8 4 3\n', '10 2 2\n']
Demo Output:
['0 3\n1 2\n', '7 8 3\n0 1 4\n6 0 5\n0 2 0\n', '-1\n']
Note:
In the first sample there are many other possible solutions. For example,
and
The following assignment
is incorrect, because parliamentarians 1 and 3 are both from Democrats party but will occupy neighbouring seats. | ```python
n, a, b = input().split(' ')
n = int(n)
a = int(a)
b = int(b)
def print_list(li):
res=''
for i in li:
res+=str(i)+' '
print(res[:-1])
def solve():
k=1
if (n>(a*b)):
print('-1')
return
else:
for i in range(0,a):
temp=[]
for j in range(0,b):
if (k <= n):
temp.append(k)
k+=1
else:
temp.append('0')
if ((i%2)==0):
temp=reversed(temp)
print_list(temp)
solve()
``` | 3 | |
122 | A | Lucky Division | PROGRAMMING | 1,000 | [
"brute force",
"number theory"
] | null | null | Petya loves lucky numbers. Everybody knows that lucky numbers are positive integers whose decimal representation contains only the lucky digits 4 and 7. For example, numbers 47, 744, 4 are lucky and 5, 17, 467 are not.
Petya calls a number almost lucky if it could be evenly divided by some lucky number. Help him find out if the given number *n* is almost lucky. | The single line contains an integer *n* (1<=≤<=*n*<=≤<=1000) — the number that needs to be checked. | In the only line print "YES" (without the quotes), if number *n* is almost lucky. Otherwise, print "NO" (without the quotes). | [
"47\n",
"16\n",
"78\n"
] | [
"YES\n",
"YES\n",
"NO\n"
] | Note that all lucky numbers are almost lucky as any number is evenly divisible by itself.
In the first sample 47 is a lucky number. In the second sample 16 is divisible by 4. | 500 | [
{
"input": "47",
"output": "YES"
},
{
"input": "16",
"output": "YES"
},
{
"input": "78",
"output": "NO"
},
{
"input": "48",
"output": "YES"
},
{
"input": "100",
"output": "YES"
},
{
"input": "107",
"output": "NO"
},
{
"input": "77",
"output": "YES"
},
{
"input": "477",
"output": "YES"
},
{
"input": "480",
"output": "YES"
},
{
"input": "1",
"output": "NO"
},
{
"input": "3",
"output": "NO"
},
{
"input": "4",
"output": "YES"
},
{
"input": "49",
"output": "YES"
},
{
"input": "56",
"output": "YES"
},
{
"input": "124",
"output": "YES"
},
{
"input": "1000",
"output": "YES"
},
{
"input": "999",
"output": "NO"
},
{
"input": "298",
"output": "NO"
},
{
"input": "274",
"output": "NO"
},
{
"input": "998",
"output": "NO"
},
{
"input": "42",
"output": "YES"
},
{
"input": "788",
"output": "YES"
},
{
"input": "70",
"output": "YES"
},
{
"input": "444",
"output": "YES"
},
{
"input": "777",
"output": "YES"
},
{
"input": "799",
"output": "YES"
},
{
"input": "25",
"output": "NO"
},
{
"input": "882",
"output": "YES"
},
{
"input": "88",
"output": "YES"
},
{
"input": "11",
"output": "NO"
},
{
"input": "2",
"output": "NO"
},
{
"input": "7",
"output": "YES"
},
{
"input": "8",
"output": "YES"
},
{
"input": "94",
"output": "YES"
},
{
"input": "477",
"output": "YES"
},
{
"input": "141",
"output": "YES"
}
] | 1,691,815,660 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 7 | 92 | 0 | a = int(input())
divide = [4, 7, 47, 74, 447, 474, 747, 774]
def solve():
ans = "NO"
for i in divide:
if a % i == 0:
ans = "YES"
print(ans)
solve() | Title: Lucky Division
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Petya loves lucky numbers. Everybody knows that lucky numbers are positive integers whose decimal representation contains only the lucky digits 4 and 7. For example, numbers 47, 744, 4 are lucky and 5, 17, 467 are not.
Petya calls a number almost lucky if it could be evenly divided by some lucky number. Help him find out if the given number *n* is almost lucky.
Input Specification:
The single line contains an integer *n* (1<=≤<=*n*<=≤<=1000) — the number that needs to be checked.
Output Specification:
In the only line print "YES" (without the quotes), if number *n* is almost lucky. Otherwise, print "NO" (without the quotes).
Demo Input:
['47\n', '16\n', '78\n']
Demo Output:
['YES\n', 'YES\n', 'NO\n']
Note:
Note that all lucky numbers are almost lucky as any number is evenly divisible by itself.
In the first sample 47 is a lucky number. In the second sample 16 is divisible by 4. | ```python
a = int(input())
divide = [4, 7, 47, 74, 447, 474, 747, 774]
def solve():
ans = "NO"
for i in divide:
if a % i == 0:
ans = "YES"
print(ans)
solve()
``` | 0 | |
165 | A | Supercentral Point | PROGRAMMING | 1,000 | [
"implementation"
] | null | null | One day Vasya painted a Cartesian coordinate system on a piece of paper and marked some set of points (*x*1,<=*y*1),<=(*x*2,<=*y*2),<=...,<=(*x**n*,<=*y**n*). Let's define neighbors for some fixed point from the given set (*x*,<=*y*):
- point (*x*',<=*y*') is (*x*,<=*y*)'s right neighbor, if *x*'<=><=*x* and *y*'<==<=*y* - point (*x*',<=*y*') is (*x*,<=*y*)'s left neighbor, if *x*'<=<<=*x* and *y*'<==<=*y* - point (*x*',<=*y*') is (*x*,<=*y*)'s lower neighbor, if *x*'<==<=*x* and *y*'<=<<=*y* - point (*x*',<=*y*') is (*x*,<=*y*)'s upper neighbor, if *x*'<==<=*x* and *y*'<=><=*y*
We'll consider point (*x*,<=*y*) from the given set supercentral, if it has at least one upper, at least one lower, at least one left and at least one right neighbor among this set's points.
Vasya marked quite many points on the paper. Analyzing the picture manually is rather a challenge, so Vasya asked you to help him. Your task is to find the number of supercentral points in the given set. | The first input line contains the only integer *n* (1<=≤<=*n*<=≤<=200) — the number of points in the given set. Next *n* lines contain the coordinates of the points written as "*x* *y*" (without the quotes) (|*x*|,<=|*y*|<=≤<=1000), all coordinates are integers. The numbers in the line are separated by exactly one space. It is guaranteed that all points are different. | Print the only number — the number of supercentral points of the given set. | [
"8\n1 1\n4 2\n3 1\n1 2\n0 2\n0 1\n1 0\n1 3\n",
"5\n0 0\n0 1\n1 0\n0 -1\n-1 0\n"
] | [
"2\n",
"1\n"
] | In the first sample the supercentral points are only points (1, 1) and (1, 2).
In the second sample there is one supercental point — point (0, 0). | 500 | [
{
"input": "8\n1 1\n4 2\n3 1\n1 2\n0 2\n0 1\n1 0\n1 3",
"output": "2"
},
{
"input": "5\n0 0\n0 1\n1 0\n0 -1\n-1 0",
"output": "1"
},
{
"input": "9\n-565 -752\n-184 723\n-184 -752\n-184 1\n950 723\n-565 723\n950 -752\n950 1\n-565 1",
"output": "1"
},
{
"input": "25\n-651 897\n916 897\n-651 -808\n-748 301\n-734 414\n-651 -973\n-734 897\n916 -550\n-758 414\n916 180\n-758 -808\n-758 -973\n125 -550\n125 -973\n125 301\n916 414\n-748 -808\n-651 301\n-734 301\n-307 897\n-651 -550\n-651 414\n125 -808\n-748 -550\n916 -808",
"output": "7"
},
{
"input": "1\n487 550",
"output": "0"
},
{
"input": "10\n990 -396\n990 736\n990 646\n990 -102\n990 -570\n990 155\n990 528\n990 489\n990 268\n990 676",
"output": "0"
},
{
"input": "30\n507 836\n525 836\n-779 196\n507 -814\n525 -814\n525 42\n525 196\n525 -136\n-779 311\n507 -360\n525 300\n507 578\n507 311\n-779 836\n507 300\n525 -360\n525 311\n-779 -360\n-779 578\n-779 300\n507 42\n525 578\n-779 379\n507 196\n525 379\n507 379\n-779 -814\n-779 42\n-779 -136\n507 -136",
"output": "8"
},
{
"input": "25\n890 -756\n890 -188\n-37 -756\n-37 853\n523 998\n-261 853\n-351 853\n-351 -188\n523 -756\n-261 -188\n-37 998\n523 -212\n-351 998\n-37 -188\n-351 -756\n-37 -212\n890 998\n890 -212\n523 853\n-351 -212\n-261 -212\n-261 998\n-261 -756\n890 853\n523 -188",
"output": "9"
},
{
"input": "21\n-813 -11\n486 254\n685 254\n-708 254\n-55 -11\n-671 -191\n486 -11\n-671 -11\n685 -11\n685 -191\n486 -191\n-55 254\n-708 -11\n-813 254\n-708 -191\n41 -11\n-671 254\n-813 -191\n41 254\n-55 -191\n41 -191",
"output": "5"
},
{
"input": "4\n1 0\n2 0\n1 1\n1 -1",
"output": "0"
}
] | 1,605,161,941 | 2,147,483,647 | Python 3 | COMPILATION_ERROR | TESTS | 0 | 0 | 0 | n=int(input())
x,y=[0]*n,[0]*n
for i in range(n):
a,b=map(int,input().split())
x[i]=a
y[i]=b
ans=0
for j in range(n):
c,d=x[j],y[j]
l,r,u,d=0,0,0,0
for k in range(n):
if c==x[k]:
if d>y[k]:
u+=1
elif d<y[k]:
d+=1
if d==y[k]:
if c>x[k]:
r+=1
elifc<x[k]:
l+=1
if l>0 and r>0 and u>0 and d>0:
ans+=1
print(ans)
| Title: Supercentral Point
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
One day Vasya painted a Cartesian coordinate system on a piece of paper and marked some set of points (*x*1,<=*y*1),<=(*x*2,<=*y*2),<=...,<=(*x**n*,<=*y**n*). Let's define neighbors for some fixed point from the given set (*x*,<=*y*):
- point (*x*',<=*y*') is (*x*,<=*y*)'s right neighbor, if *x*'<=><=*x* and *y*'<==<=*y* - point (*x*',<=*y*') is (*x*,<=*y*)'s left neighbor, if *x*'<=<<=*x* and *y*'<==<=*y* - point (*x*',<=*y*') is (*x*,<=*y*)'s lower neighbor, if *x*'<==<=*x* and *y*'<=<<=*y* - point (*x*',<=*y*') is (*x*,<=*y*)'s upper neighbor, if *x*'<==<=*x* and *y*'<=><=*y*
We'll consider point (*x*,<=*y*) from the given set supercentral, if it has at least one upper, at least one lower, at least one left and at least one right neighbor among this set's points.
Vasya marked quite many points on the paper. Analyzing the picture manually is rather a challenge, so Vasya asked you to help him. Your task is to find the number of supercentral points in the given set.
Input Specification:
The first input line contains the only integer *n* (1<=≤<=*n*<=≤<=200) — the number of points in the given set. Next *n* lines contain the coordinates of the points written as "*x* *y*" (without the quotes) (|*x*|,<=|*y*|<=≤<=1000), all coordinates are integers. The numbers in the line are separated by exactly one space. It is guaranteed that all points are different.
Output Specification:
Print the only number — the number of supercentral points of the given set.
Demo Input:
['8\n1 1\n4 2\n3 1\n1 2\n0 2\n0 1\n1 0\n1 3\n', '5\n0 0\n0 1\n1 0\n0 -1\n-1 0\n']
Demo Output:
['2\n', '1\n']
Note:
In the first sample the supercentral points are only points (1, 1) and (1, 2).
In the second sample there is one supercental point — point (0, 0). | ```python
n=int(input())
x,y=[0]*n,[0]*n
for i in range(n):
a,b=map(int,input().split())
x[i]=a
y[i]=b
ans=0
for j in range(n):
c,d=x[j],y[j]
l,r,u,d=0,0,0,0
for k in range(n):
if c==x[k]:
if d>y[k]:
u+=1
elif d<y[k]:
d+=1
if d==y[k]:
if c>x[k]:
r+=1
elifc<x[k]:
l+=1
if l>0 and r>0 and u>0 and d>0:
ans+=1
print(ans)
``` | -1 | |
108 | B | Datatypes | PROGRAMMING | 1,400 | [
"math",
"sortings"
] | B. Datatypes | 2 | 256 | Tattah's youngest brother, Tuftuf, is new to programming.
Since his older brother is such a good programmer, his biggest dream is to outshine him. Tuftuf is a student at the German University in Cairo (GUC) where he learns to write programs in Gava.
Today, Tuftuf was introduced to Gava's unsigned integer datatypes. Gava has *n* unsigned integer datatypes of sizes (in bits) *a*1,<=*a*2,<=... *a**n*. The *i*-th datatype have size *a**i* bits, so it can represent every integer between 0 and 2*a**i*<=-<=1 inclusive.
Tuftuf is thinking of learning a better programming language. If there exists an integer *x*, such that *x* fits in some type *i* (in *a**i* bits) and *x*·*x* does not fit in some other type *j* (in *a**j* bits) where *a**i*<=<<=*a**j*, then Tuftuf will stop using Gava.
Your task is to determine Tuftuf's destiny. | The first line contains integer *n* (2<=≤<=*n*<=≤<=105) — the number of Gava's unsigned integer datatypes' sizes. The second line contains a single-space-separated list of *n* integers (1<=≤<=*a**i*<=≤<=109) — sizes of datatypes in bits. Some datatypes may have equal sizes. | Print "YES" if Tuftuf will stop using Gava, and "NO" otherwise. | [
"3\n64 16 32\n",
"4\n4 2 1 3\n"
] | [
"NO\n",
"YES\n"
] | In the second example, *x* = 7 (111<sub class="lower-index">2</sub>) fits in 3 bits, but *x*<sup class="upper-index">2</sup> = 49 (110001<sub class="lower-index">2</sub>) does not fit in 4 bits. | 1,000 | [
{
"input": "3\n64 16 32",
"output": "NO"
},
{
"input": "4\n4 2 1 3",
"output": "YES"
},
{
"input": "5\n1 5 3 3 2",
"output": "YES"
},
{
"input": "52\n474 24 24 954 9 234 474 114 24 114 234 24 114 114 234 9 9 24 9 54 234 54 9 954 474 9 54 54 54 234 9 114 24 54 114 954 954 474 24 54 54 234 234 474 474 24 114 9 954 954 954 474",
"output": "NO"
},
{
"input": "56\n43 641 626 984 107 521 266 835 707 220 402 406 558 199 988 685 843 808 182 73 553 17 765 979 116 178 489 271 532 889 26 263 654 680 240 392 980 267 264 46 888 444 874 519 735 301 743 526 376 793 40 110 811 184 82 96",
"output": "YES"
},
{
"input": "9\n20 44 92 8 20 380 8 188 764",
"output": "NO"
},
{
"input": "97\n250 58 26 506 58 122 506 506 250 506 26 58 26 58 10 26 58 58 2 506 506 10 10 2 26 26 122 58 506 10 506 58 250 2 26 122 122 10 250 58 2 58 58 122 10 506 26 122 26 2 2 2 250 506 2 506 10 2 26 122 250 2 250 122 10 250 10 26 58 122 58 2 2 10 250 250 26 250 10 250 506 122 122 122 506 26 58 10 122 10 250 10 2 2 26 250 122",
"output": "NO"
},
{
"input": "85\n436 23 384 417 11 227 713 910 217 177 227 161 851 396 556 948 700 819 920 451 877 249 332 189 606 986 627 468 877 682 497 579 189 443 252 795 147 642 643 569 250 863 615 560 142 752 918 167 677 49 750 871 282 721 102 884 179 980 392 509 178 977 51 241 912 599 142 975 453 353 350 130 837 955 688 7 588 239 194 277 50 865 227 848 538",
"output": "YES"
},
{
"input": "43\n906 652 445 325 991 682 173 290 731 528 432 615 698 132 874 38 643 301 223 442 722 529 150 659 593 22 679 178 410 978 201 559 115 533 586 790 703 596 492 591 781 761 384",
"output": "YES"
},
{
"input": "8\n421 250 398 257 512 329 25 972",
"output": "YES"
},
{
"input": "2\n1000000000 999999999",
"output": "YES"
},
{
"input": "220\n10 6 6 2 8 6 6 5 6 2 10 3 9 10 10 2 3 5 2 2 4 7 6 6 7 5 6 2 10 10 1 1 2 2 3 2 4 4 8 1 1 2 1 10 9 2 1 4 2 1 7 4 8 4 2 9 7 7 6 6 8 3 1 9 10 6 3 5 9 5 1 1 8 3 10 8 10 3 7 9 2 4 8 2 8 4 10 5 7 10 6 8 3 5 7 9 4 2 6 2 2 7 7 2 10 1 1 8 7 4 8 8 9 1 1 9 5 5 5 3 5 5 3 2 6 4 7 9 10 9 3 1 10 1 7 8 8 7 6 5 1 5 6 2 1 9 9 10 8 4 9 5 4 8 10 4 9 2 3 7 10 3 3 9 10 5 7 7 6 7 3 1 5 7 10 6 3 5 4 7 8 6 10 10 10 8 3 5 1 1 1 10 2 3 5 5 2 5 8 4 7 3 1 10 1 10 9 2 10 3 4 9 1 5 9 8 2 7 7 2",
"output": "YES"
},
{
"input": "7\n1 2 3 4 8 16 32",
"output": "YES"
},
{
"input": "2\n1 1",
"output": "NO"
},
{
"input": "2\n1 2",
"output": "NO"
},
{
"input": "3\n1 2 2",
"output": "NO"
},
{
"input": "3\n1 1 2",
"output": "NO"
}
] | 1,660,285,526 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 3 | 124 | 0 | import sys
input = sys.stdin.readline
n = int(input())
w = sorted(map(int, input().split()))
for i in range(1, n):
if w[i] >= w[i-1]*2:
continue
else:
print('YES')
exit(0)
print('NO') | Title: Datatypes
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Tattah's youngest brother, Tuftuf, is new to programming.
Since his older brother is such a good programmer, his biggest dream is to outshine him. Tuftuf is a student at the German University in Cairo (GUC) where he learns to write programs in Gava.
Today, Tuftuf was introduced to Gava's unsigned integer datatypes. Gava has *n* unsigned integer datatypes of sizes (in bits) *a*1,<=*a*2,<=... *a**n*. The *i*-th datatype have size *a**i* bits, so it can represent every integer between 0 and 2*a**i*<=-<=1 inclusive.
Tuftuf is thinking of learning a better programming language. If there exists an integer *x*, such that *x* fits in some type *i* (in *a**i* bits) and *x*·*x* does not fit in some other type *j* (in *a**j* bits) where *a**i*<=<<=*a**j*, then Tuftuf will stop using Gava.
Your task is to determine Tuftuf's destiny.
Input Specification:
The first line contains integer *n* (2<=≤<=*n*<=≤<=105) — the number of Gava's unsigned integer datatypes' sizes. The second line contains a single-space-separated list of *n* integers (1<=≤<=*a**i*<=≤<=109) — sizes of datatypes in bits. Some datatypes may have equal sizes.
Output Specification:
Print "YES" if Tuftuf will stop using Gava, and "NO" otherwise.
Demo Input:
['3\n64 16 32\n', '4\n4 2 1 3\n']
Demo Output:
['NO\n', 'YES\n']
Note:
In the second example, *x* = 7 (111<sub class="lower-index">2</sub>) fits in 3 bits, but *x*<sup class="upper-index">2</sup> = 49 (110001<sub class="lower-index">2</sub>) does not fit in 4 bits. | ```python
import sys
input = sys.stdin.readline
n = int(input())
w = sorted(map(int, input().split()))
for i in range(1, n):
if w[i] >= w[i-1]*2:
continue
else:
print('YES')
exit(0)
print('NO')
``` | 0 |
82 | A | Double Cola | PROGRAMMING | 1,100 | [
"implementation",
"math"
] | A. Double Cola | 1 | 256 | Sheldon, Leonard, Penny, Rajesh and Howard are in the queue for a "Double Cola" drink vending machine; there are no other people in the queue. The first one in the queue (Sheldon) buys a can, drinks it and doubles! The resulting two Sheldons go to the end of the queue. Then the next in the queue (Leonard) buys a can, drinks it and gets to the end of the queue as two Leonards, and so on. This process continues ad infinitum.
For example, Penny drinks the third can of cola and the queue will look like this: Rajesh, Howard, Sheldon, Sheldon, Leonard, Leonard, Penny, Penny.
Write a program that will print the name of a man who will drink the *n*-th can.
Note that in the very beginning the queue looks like that: Sheldon, Leonard, Penny, Rajesh, Howard. The first person is Sheldon. | The input data consist of a single integer *n* (1<=≤<=*n*<=≤<=109).
It is guaranteed that the pretests check the spelling of all the five names, that is, that they contain all the five possible answers. | Print the single line — the name of the person who drinks the *n*-th can of cola. The cans are numbered starting from 1. Please note that you should spell the names like this: "Sheldon", "Leonard", "Penny", "Rajesh", "Howard" (without the quotes). In that order precisely the friends are in the queue initially. | [
"1\n",
"6\n",
"1802\n"
] | [
"Sheldon\n",
"Sheldon\n",
"Penny\n"
] | none | 500 | [
{
"input": "1",
"output": "Sheldon"
},
{
"input": "6",
"output": "Sheldon"
},
{
"input": "1802",
"output": "Penny"
},
{
"input": "1",
"output": "Sheldon"
},
{
"input": "2",
"output": "Leonard"
},
{
"input": "3",
"output": "Penny"
},
{
"input": "4",
"output": "Rajesh"
},
{
"input": "5",
"output": "Howard"
},
{
"input": "10",
"output": "Penny"
},
{
"input": "534",
"output": "Rajesh"
},
{
"input": "5033",
"output": "Howard"
},
{
"input": "10010",
"output": "Howard"
},
{
"input": "500000000",
"output": "Penny"
},
{
"input": "63",
"output": "Rajesh"
},
{
"input": "841",
"output": "Leonard"
},
{
"input": "3667",
"output": "Penny"
},
{
"input": "38614",
"output": "Howard"
},
{
"input": "282798",
"output": "Rajesh"
},
{
"input": "9266286",
"output": "Rajesh"
},
{
"input": "27385966",
"output": "Leonard"
},
{
"input": "121580142",
"output": "Penny"
},
{
"input": "5",
"output": "Howard"
},
{
"input": "300",
"output": "Howard"
},
{
"input": "1745",
"output": "Leonard"
},
{
"input": "8302",
"output": "Rajesh"
},
{
"input": "184518",
"output": "Sheldon"
},
{
"input": "1154414",
"output": "Rajesh"
},
{
"input": "28643950",
"output": "Leonard"
},
{
"input": "159222638",
"output": "Howard"
},
{
"input": "24",
"output": "Penny"
},
{
"input": "505",
"output": "Penny"
},
{
"input": "4425",
"output": "Rajesh"
},
{
"input": "12079",
"output": "Sheldon"
},
{
"input": "469726",
"output": "Penny"
},
{
"input": "3961838",
"output": "Penny"
},
{
"input": "57710446",
"output": "Leonard"
},
{
"input": "80719470",
"output": "Howard"
},
{
"input": "1000000000",
"output": "Penny"
},
{
"input": "999999999",
"output": "Penny"
},
{
"input": "999999998",
"output": "Penny"
},
{
"input": "5",
"output": "Howard"
}
] | 1,632,939,869 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 0 | 46 | 7,065,600 | import sys, math, itertools
input = sys.stdin.readline
def inp():
return(int(input()))
def inlt():
return(list(map(int,input().split())))
def insr():
s = input()
return(list(s[:len(s) - 1]))
def invr():
return(map(int,input().split()))
################################################
boys = ["S", "L", "P", "R", "H"]
nextBoys = []#["S", "L", "P", "R", "H"]
numberOfQueue = 0
amountOfPeople = 0
n = int(input())
while amountOfPeople < n:
numberOfQueue += 1
amountOfPeople += 5*numberOfQueue
print(amountOfPeople, numberOfQueue)
for z in range(1, numberOfQueue+1):
nextBoys += [ele for ele in boys for h in range(z)]
print(nextBoys)
print(nextBoys[n-1]) | Title: Double Cola
Time Limit: 1 seconds
Memory Limit: 256 megabytes
Problem Description:
Sheldon, Leonard, Penny, Rajesh and Howard are in the queue for a "Double Cola" drink vending machine; there are no other people in the queue. The first one in the queue (Sheldon) buys a can, drinks it and doubles! The resulting two Sheldons go to the end of the queue. Then the next in the queue (Leonard) buys a can, drinks it and gets to the end of the queue as two Leonards, and so on. This process continues ad infinitum.
For example, Penny drinks the third can of cola and the queue will look like this: Rajesh, Howard, Sheldon, Sheldon, Leonard, Leonard, Penny, Penny.
Write a program that will print the name of a man who will drink the *n*-th can.
Note that in the very beginning the queue looks like that: Sheldon, Leonard, Penny, Rajesh, Howard. The first person is Sheldon.
Input Specification:
The input data consist of a single integer *n* (1<=≤<=*n*<=≤<=109).
It is guaranteed that the pretests check the spelling of all the five names, that is, that they contain all the five possible answers.
Output Specification:
Print the single line — the name of the person who drinks the *n*-th can of cola. The cans are numbered starting from 1. Please note that you should spell the names like this: "Sheldon", "Leonard", "Penny", "Rajesh", "Howard" (without the quotes). In that order precisely the friends are in the queue initially.
Demo Input:
['1\n', '6\n', '1802\n']
Demo Output:
['Sheldon\n', 'Sheldon\n', 'Penny\n']
Note:
none | ```python
import sys, math, itertools
input = sys.stdin.readline
def inp():
return(int(input()))
def inlt():
return(list(map(int,input().split())))
def insr():
s = input()
return(list(s[:len(s) - 1]))
def invr():
return(map(int,input().split()))
################################################
boys = ["S", "L", "P", "R", "H"]
nextBoys = []#["S", "L", "P", "R", "H"]
numberOfQueue = 0
amountOfPeople = 0
n = int(input())
while amountOfPeople < n:
numberOfQueue += 1
amountOfPeople += 5*numberOfQueue
print(amountOfPeople, numberOfQueue)
for z in range(1, numberOfQueue+1):
nextBoys += [ele for ele in boys for h in range(z)]
print(nextBoys)
print(nextBoys[n-1])
``` | 0 |
152 | A | Marks | PROGRAMMING | 900 | [
"implementation"
] | null | null | Vasya, or Mr. Vasily Petrov is a dean of a department in a local university. After the winter exams he got his hands on a group's gradebook.
Overall the group has *n* students. They received marks for *m* subjects. Each student got a mark from 1 to 9 (inclusive) for each subject.
Let's consider a student the best at some subject, if there is no student who got a higher mark for this subject. Let's consider a student successful, if there exists a subject he is the best at.
Your task is to find the number of successful students in the group. | The first input line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=100) — the number of students and the number of subjects, correspondingly. Next *n* lines each containing *m* characters describe the gradebook. Each character in the gradebook is a number from 1 to 9. Note that the marks in a rows are not sepatated by spaces. | Print the single number — the number of successful students in the given group. | [
"3 3\n223\n232\n112\n",
"3 5\n91728\n11828\n11111\n"
] | [
"2\n",
"3\n"
] | In the first sample test the student number 1 is the best at subjects 1 and 3, student 2 is the best at subjects 1 and 2, but student 3 isn't the best at any subject.
In the second sample test each student is the best at at least one subject. | 500 | [
{
"input": "3 3\n223\n232\n112",
"output": "2"
},
{
"input": "3 5\n91728\n11828\n11111",
"output": "3"
},
{
"input": "2 2\n48\n27",
"output": "1"
},
{
"input": "2 1\n4\n6",
"output": "1"
},
{
"input": "1 2\n57",
"output": "1"
},
{
"input": "1 1\n5",
"output": "1"
},
{
"input": "3 4\n2553\n6856\n5133",
"output": "2"
},
{
"input": "8 7\n6264676\n7854895\n3244128\n2465944\n8958761\n1378945\n3859353\n6615285",
"output": "6"
},
{
"input": "9 8\n61531121\n43529859\n18841327\n88683622\n98995641\n62741632\n57441743\n49396792\n63381994",
"output": "4"
},
{
"input": "10 20\n26855662887514171367\n48525577498621511535\n47683778377545341138\n47331616748732562762\n44876938191354974293\n24577238399664382695\n42724955594463126746\n79187344479926159359\n48349683283914388185\n82157191115518781898",
"output": "9"
},
{
"input": "20 15\n471187383859588\n652657222494199\n245695867594992\n726154672861295\n614617827782772\n862889444974692\n373977167653235\n645434268565473\n785993468314573\n722176861496755\n518276853323939\n723712762593348\n728935312568886\n373898548522463\n769777587165681\n247592995114377\n182375946483965\n497496542536127\n988239919677856\n859844339819143",
"output": "18"
},
{
"input": "13 9\n514562255\n322655246\n135162979\n733845982\n473117129\n513967187\n965649829\n799122777\n661249521\n298618978\n659352422\n747778378\n723261619",
"output": "11"
},
{
"input": "75 1\n2\n3\n8\n3\n2\n1\n3\n1\n5\n1\n5\n4\n8\n8\n4\n2\n5\n1\n7\n6\n3\n2\n2\n3\n5\n5\n2\n4\n7\n7\n9\n2\n9\n5\n1\n4\n9\n5\n2\n4\n6\n6\n3\n3\n9\n3\n3\n2\n3\n4\n2\n6\n9\n1\n1\n1\n1\n7\n2\n3\n2\n9\n7\n4\n9\n1\n7\n5\n6\n8\n3\n4\n3\n4\n6",
"output": "7"
},
{
"input": "92 3\n418\n665\n861\n766\n529\n416\n476\n676\n561\n995\n415\n185\n291\n176\n776\n631\n556\n488\n118\n188\n437\n496\n466\n131\n914\n118\n766\n365\n113\n897\n386\n639\n276\n946\n759\n169\n494\n837\n338\n351\n783\n311\n261\n862\n598\n132\n246\n982\n575\n364\n615\n347\n374\n368\n523\n132\n774\n161\n552\n492\n598\n474\n639\n681\n635\n342\n516\n483\n141\n197\n571\n336\n175\n596\n481\n327\n841\n133\n142\n146\n246\n396\n287\n582\n556\n996\n479\n814\n497\n363\n963\n162",
"output": "23"
},
{
"input": "100 1\n1\n6\n9\n1\n1\n5\n5\n4\n6\n9\n6\n1\n7\n8\n7\n3\n8\n8\n7\n6\n2\n1\n5\n8\n7\n3\n5\n4\n9\n7\n1\n2\n4\n1\n6\n5\n1\n3\n9\n4\n5\n8\n1\n2\n1\n9\n7\n3\n7\n1\n2\n2\n2\n2\n3\n9\n7\n2\n4\n7\n1\n6\n8\n1\n5\n6\n1\n1\n2\n9\n7\n4\n9\n1\n9\n4\n1\n3\n5\n2\n4\n4\n6\n5\n1\n4\n5\n8\n4\n7\n6\n5\n6\n9\n5\n8\n1\n5\n1\n6",
"output": "10"
},
{
"input": "100 2\n71\n87\n99\n47\n22\n87\n49\n73\n21\n12\n77\n43\n18\n41\n78\n62\n61\n16\n64\n89\n81\n54\n53\n92\n93\n94\n68\n93\n15\n68\n42\n93\n28\n19\n86\n16\n97\n17\n11\n43\n72\n76\n54\n95\n58\n53\n48\n45\n85\n85\n74\n21\n44\n51\n89\n75\n76\n17\n38\n62\n81\n22\n66\n59\n89\n85\n91\n87\n12\n97\n52\n87\n43\n89\n51\n58\n57\n98\n78\n68\n82\n41\n87\n29\n75\n72\n48\n14\n35\n71\n74\n91\n66\n67\n42\n98\n52\n54\n22\n41",
"output": "21"
},
{
"input": "5 20\n11111111111111111111\n11111111111111111111\n11111111111111111111\n99999999999999999999\n11111111111111111119",
"output": "2"
},
{
"input": "3 3\n111\n111\n999",
"output": "1"
},
{
"input": "3 3\n119\n181\n711",
"output": "3"
},
{
"input": "15 5\n91728\n11828\n11111\n91728\n11828\n11111\n91728\n11828\n11111\n91728\n11828\n11111\n91728\n11828\n11111",
"output": "15"
},
{
"input": "2 20\n22222222222222222222\n11111111111111111111",
"output": "1"
},
{
"input": "3 3\n233\n222\n111",
"output": "2"
},
{
"input": "4 15\n222222222222222\n111111111111119\n111111111111119\n111111111111111",
"output": "3"
},
{
"input": "4 1\n1\n9\n9\n9",
"output": "3"
},
{
"input": "3 3\n123\n321\n132",
"output": "3"
},
{
"input": "3 3\n113\n332\n322",
"output": "3"
},
{
"input": "2 100\n2222222222222222222222222222222222222222222222222222222222222222222222221222222222222222222222222222\n1111111111111111111111111111111111111111111111111111111111111111111111119111111111111111111111111111",
"output": "2"
},
{
"input": "3 3\n321\n231\n123",
"output": "3"
},
{
"input": "2 100\n1111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111\n2222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222",
"output": "1"
},
{
"input": "3 3\n221\n111\n111",
"output": "3"
}
] | 1,669,812,815 | 2,147,483,647 | Python 3 | OK | TESTS | 44 | 61 | 0 | a,b=map(int,input().split())
massive=[]
ix=[]
for i in range(a):
s=list(input())
massive.append(s)
for i in range(b):
massive1=[]
for j in range(a):
massive1.append(int(massive[j][i]))
cn=massive1.count(max(massive1))
if cn>1:
for i in range(len(massive1)):
if massive1[i]==max(massive1):
ix.append(i+1)
else:
mx=massive1.index(max(massive1))+1
ix.append(mx)
print(len(set(ix)))
| Title: Marks
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasya, or Mr. Vasily Petrov is a dean of a department in a local university. After the winter exams he got his hands on a group's gradebook.
Overall the group has *n* students. They received marks for *m* subjects. Each student got a mark from 1 to 9 (inclusive) for each subject.
Let's consider a student the best at some subject, if there is no student who got a higher mark for this subject. Let's consider a student successful, if there exists a subject he is the best at.
Your task is to find the number of successful students in the group.
Input Specification:
The first input line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=100) — the number of students and the number of subjects, correspondingly. Next *n* lines each containing *m* characters describe the gradebook. Each character in the gradebook is a number from 1 to 9. Note that the marks in a rows are not sepatated by spaces.
Output Specification:
Print the single number — the number of successful students in the given group.
Demo Input:
['3 3\n223\n232\n112\n', '3 5\n91728\n11828\n11111\n']
Demo Output:
['2\n', '3\n']
Note:
In the first sample test the student number 1 is the best at subjects 1 and 3, student 2 is the best at subjects 1 and 2, but student 3 isn't the best at any subject.
In the second sample test each student is the best at at least one subject. | ```python
a,b=map(int,input().split())
massive=[]
ix=[]
for i in range(a):
s=list(input())
massive.append(s)
for i in range(b):
massive1=[]
for j in range(a):
massive1.append(int(massive[j][i]))
cn=massive1.count(max(massive1))
if cn>1:
for i in range(len(massive1)):
if massive1[i]==max(massive1):
ix.append(i+1)
else:
mx=massive1.index(max(massive1))+1
ix.append(mx)
print(len(set(ix)))
``` | 3 | |
387 | A | George and Sleep | PROGRAMMING | 900 | [
"implementation"
] | null | null | George woke up and saw the current time *s* on the digital clock. Besides, George knows that he has slept for time *t*.
Help George! Write a program that will, given time *s* and *t*, determine the time *p* when George went to bed. Note that George could have gone to bed yesterday relatively to the current time (see the second test sample). | The first line contains current time *s* as a string in the format "hh:mm". The second line contains time *t* in the format "hh:mm" — the duration of George's sleep. It is guaranteed that the input contains the correct time in the 24-hour format, that is, 00<=≤<=*hh*<=≤<=23, 00<=≤<=*mm*<=≤<=59. | In the single line print time *p* — the time George went to bed in the format similar to the format of the time in the input. | [
"05:50\n05:44\n",
"00:00\n01:00\n",
"00:01\n00:00\n"
] | [
"00:06\n",
"23:00\n",
"00:01\n"
] | In the first sample George went to bed at "00:06". Note that you should print the time only in the format "00:06". That's why answers "0:06", "00:6" and others will be considered incorrect.
In the second sample, George went to bed yesterday.
In the third sample, George didn't do to bed at all. | 500 | [
{
"input": "05:50\n05:44",
"output": "00:06"
},
{
"input": "00:00\n01:00",
"output": "23:00"
},
{
"input": "00:01\n00:00",
"output": "00:01"
},
{
"input": "23:59\n23:59",
"output": "00:00"
},
{
"input": "23:44\n23:55",
"output": "23:49"
},
{
"input": "00:00\n13:12",
"output": "10:48"
},
{
"input": "12:00\n23:59",
"output": "12:01"
},
{
"input": "12:44\n12:44",
"output": "00:00"
},
{
"input": "05:55\n07:12",
"output": "22:43"
},
{
"input": "07:12\n05:55",
"output": "01:17"
},
{
"input": "22:22\n22:22",
"output": "00:00"
},
{
"input": "22:22\n22:23",
"output": "23:59"
},
{
"input": "23:24\n23:23",
"output": "00:01"
},
{
"input": "00:00\n00:00",
"output": "00:00"
},
{
"input": "23:30\n00:00",
"output": "23:30"
},
{
"input": "01:00\n00:00",
"output": "01:00"
},
{
"input": "05:44\n06:00",
"output": "23:44"
},
{
"input": "00:00\n23:59",
"output": "00:01"
},
{
"input": "21:00\n01:00",
"output": "20:00"
},
{
"input": "21:21\n12:21",
"output": "09:00"
},
{
"input": "12:21\n21:12",
"output": "15:09"
},
{
"input": "12:33\n23:33",
"output": "13:00"
},
{
"input": "07:55\n05:53",
"output": "02:02"
},
{
"input": "19:30\n02:00",
"output": "17:30"
},
{
"input": "21:30\n02:00",
"output": "19:30"
},
{
"input": "19:30\n09:30",
"output": "10:00"
},
{
"input": "13:08\n00:42",
"output": "12:26"
},
{
"input": "13:04\n09:58",
"output": "03:06"
},
{
"input": "21:21\n23:06",
"output": "22:15"
},
{
"input": "20:53\n10:23",
"output": "10:30"
},
{
"input": "12:59\n00:45",
"output": "12:14"
},
{
"input": "12:39\n22:21",
"output": "14:18"
},
{
"input": "21:10\n13:50",
"output": "07:20"
},
{
"input": "03:38\n23:46",
"output": "03:52"
},
{
"input": "03:48\n00:41",
"output": "03:07"
},
{
"input": "07:43\n12:27",
"output": "19:16"
},
{
"input": "03:23\n08:52",
"output": "18:31"
},
{
"input": "16:04\n10:28",
"output": "05:36"
},
{
"input": "12:53\n08:37",
"output": "04:16"
},
{
"input": "13:43\n17:23",
"output": "20:20"
},
{
"input": "00:00\n00:01",
"output": "23:59"
},
{
"input": "10:10\n01:01",
"output": "09:09"
},
{
"input": "10:05\n00:00",
"output": "10:05"
},
{
"input": "09:09\n00:00",
"output": "09:09"
},
{
"input": "09:10\n00:01",
"output": "09:09"
},
{
"input": "23:24\n00:28",
"output": "22:56"
},
{
"input": "10:00\n01:00",
"output": "09:00"
}
] | 1,624,458,722 | 2,147,483,647 | Python 3 | OK | TESTS | 47 | 62 | 0 | s1=input()
s2=input()
ans1=int(s1[:2])-int(s2[:2])
ans2=int(s1[3:])-int(s2[3:])
if ans2>=0:
k2="0"+str(ans2)
if ans1>=0:
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
else:
ans1+=24
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
else:
ans2+=60
ans1-=1
k2="0"+str(ans2)
if ans1>=0:
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
else:
ans1+=24
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
| Title: George and Sleep
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
George woke up and saw the current time *s* on the digital clock. Besides, George knows that he has slept for time *t*.
Help George! Write a program that will, given time *s* and *t*, determine the time *p* when George went to bed. Note that George could have gone to bed yesterday relatively to the current time (see the second test sample).
Input Specification:
The first line contains current time *s* as a string in the format "hh:mm". The second line contains time *t* in the format "hh:mm" — the duration of George's sleep. It is guaranteed that the input contains the correct time in the 24-hour format, that is, 00<=≤<=*hh*<=≤<=23, 00<=≤<=*mm*<=≤<=59.
Output Specification:
In the single line print time *p* — the time George went to bed in the format similar to the format of the time in the input.
Demo Input:
['05:50\n05:44\n', '00:00\n01:00\n', '00:01\n00:00\n']
Demo Output:
['00:06\n', '23:00\n', '00:01\n']
Note:
In the first sample George went to bed at "00:06". Note that you should print the time only in the format "00:06". That's why answers "0:06", "00:6" and others will be considered incorrect.
In the second sample, George went to bed yesterday.
In the third sample, George didn't do to bed at all. | ```python
s1=input()
s2=input()
ans1=int(s1[:2])-int(s2[:2])
ans2=int(s1[3:])-int(s2[3:])
if ans2>=0:
k2="0"+str(ans2)
if ans1>=0:
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
else:
ans1+=24
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
else:
ans2+=60
ans1-=1
k2="0"+str(ans2)
if ans1>=0:
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
else:
ans1+=24
k1="0"+str(ans1)
print(k1[-2:]+":"+k2[-2:])
``` | 3 | |
441 | C | Valera and Tubes | PROGRAMMING | 1,500 | [
"constructive algorithms",
"dfs and similar",
"implementation"
] | null | null | Valera has got a rectangle table consisting of *n* rows and *m* columns. Valera numbered the table rows starting from one, from top to bottom and the columns – starting from one, from left to right. We will represent cell that is on the intersection of row *x* and column *y* by a pair of integers (*x*,<=*y*).
Valera wants to place exactly *k* tubes on his rectangle table. A tube is such sequence of table cells (*x*1,<=*y*1), (*x*2,<=*y*2), ..., (*x**r*,<=*y**r*), that:
- *r*<=≥<=2; - for any integer *i* (1<=≤<=*i*<=≤<=*r*<=-<=1) the following equation |*x**i*<=-<=*x**i*<=+<=1|<=+<=|*y**i*<=-<=*y**i*<=+<=1|<==<=1 holds; - each table cell, which belongs to the tube, must occur exactly once in the sequence.
Valera thinks that the tubes are arranged in a fancy manner if the following conditions are fulfilled:
- no pair of tubes has common cells; - each cell of the table belongs to some tube.
Help Valera to arrange *k* tubes on his rectangle table in a fancy manner. | The first line contains three space-separated integers *n*,<=*m*,<=*k* (2<=≤<=*n*,<=*m*<=≤<=300; 2<=≤<=2*k*<=≤<=*n*·*m*) — the number of rows, the number of columns and the number of tubes, correspondingly. | Print *k* lines. In the *i*-th line print the description of the *i*-th tube: first print integer *r**i* (the number of tube cells), then print 2*r**i* integers *x**i*1,<=*y**i*1,<=*x**i*2,<=*y**i*2,<=...,<=*x**ir**i*,<=*y**ir**i* (the sequence of table cells).
If there are multiple solutions, you can print any of them. It is guaranteed that at least one solution exists. | [
"3 3 3\n",
"2 3 1\n"
] | [
"3 1 1 1 2 1 3\n3 2 1 2 2 2 3\n3 3 1 3 2 3 3\n",
"6 1 1 1 2 1 3 2 3 2 2 2 1\n"
] | Picture for the first sample:
Picture for the second sample: | 1,500 | [
{
"input": "3 3 3",
"output": "3 1 1 1 2 1 3\n3 2 1 2 2 2 3\n3 3 1 3 2 3 3"
},
{
"input": "2 3 1",
"output": "6 1 1 1 2 1 3 2 3 2 2 2 1"
},
{
"input": "2 3 1",
"output": "6 1 1 1 2 1 3 2 3 2 2 2 1"
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{
"input": "300 300 2",
"output": "2 1 1 1 2\n89998 1 3 1 4 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99 1 100 1 101 1 10..."
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{
"input": "300 300 150",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "300 299 299",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "300 300 45000",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "300 299 44850",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "2 2 2",
"output": "2 1 1 1 2\n2 2 2 2 1"
},
{
"input": "2 3 3",
"output": "2 1 1 1 2\n2 1 3 2 3\n2 2 2 2 1"
},
{
"input": "3 3 4",
"output": "2 1 1 1 2\n2 1 3 2 3\n2 2 2 2 1\n3 3 1 3 2 3 3"
},
{
"input": "5 5 12",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 2 5\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 3 5 4 5\n2 4 4 4 3\n2 4 2 4 1\n2 5 1 5 2\n3 5 3 5 4 5 5"
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{
"input": "7 5 17",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 2 5\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 3 5 4 5\n2 4 4 4 3\n2 4 2 4 1\n2 5 1 5 2\n2 5 3 5 4\n2 5 5 6 5\n2 6 4 6 3\n2 6 2 6 1\n2 7 1 7 2\n3 7 3 7 4 7 5"
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{
"input": "135 91 4352",
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{
"input": "32 27 153",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 2 27\n2 2 26 2 25\n2 2 24 2 23\n2 2 22 2 21\n2 2 20 2 19\n2 2 18 2 17\n2 2 16 2 15\n2 2 14 2 13\n2 2 12 2 11\n2 2 10 2 9\n2 2 8 2 7\n2 2 6 2 5\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 3 5 3 6\n2 3 7 3 8\n2 3 9 3 10\n2 3 11 3 12\n2 3 13 3 14\n2 3 15 3 16\n2 3 17 3 18\n2 3 19 3 20\n2 3 21 3 22\n2 3 23 3 24\n2 3 25 3 26\n2 3 27 4 27\n2 4 2..."
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{
"input": "74 83 2667",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "296 218 5275",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "89 82 2330",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "15 68 212",
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{
"input": "95 4 177",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 2 4 2 3\n2 2 2 2 1\n2 3 1 3 2\n2 3 3 3 4\n2 4 4 4 3\n2 4 2 4 1\n2 5 1 5 2\n2 5 3 5 4\n2 6 4 6 3\n2 6 2 6 1\n2 7 1 7 2\n2 7 3 7 4\n2 8 4 8 3\n2 8 2 8 1\n2 9 1 9 2\n2 9 3 9 4\n2 10 4 10 3\n2 10 2 10 1\n2 11 1 11 2\n2 11 3 11 4\n2 12 4 12 3\n2 12 2 12 1\n2 13 1 13 2\n2 13 3 13 4\n2 14 4 14 3\n2 14 2 14 1\n2 15 1 15 2\n2 15 3 15 4\n2 16 4 16 3\n2 16 2 16 1\n2 17 1 17 2\n2 17 3 17 4\n2 18 4 18 3\n2 18 2 18 1\n2 19 1 19 2\n2 19 3 19 4\n2 20 4 20 3\n2 20 2 20 1\n2 21 1 21 2\n2 21 3 21 4\n2..."
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{
"input": "60 136 8",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n8146 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99..."
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{
"input": "91 183 7827",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "2 15 3",
"output": "2 1 1 1 2\n2 1 3 1 4\n26 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 2 15 2 14 2 13 2 12 2 11 2 10 2 9 2 8 2 7 2 6 2 5 2 4 2 3 2 2 2 1"
},
{
"input": "139 275 10770",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "114 298 7143",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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{
"input": "260 182 9496",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
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"input": "42 297 3703",
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"input": "236 156 9535",
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"input": "201 226 1495",
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"input": "299 299 100",
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"input": "299 298 100",
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"input": "298 299 100",
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"input": "299 299 2",
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"input": "298 299 1",
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{
"input": "299 298 11",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n89082 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97..."
},
{
"input": "298 300 12",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n89378 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1..."
},
{
"input": "298 2 1",
"output": "596 1 1 1 2 2 2 2 1 3 1 3 2 4 2 4 1 5 1 5 2 6 2 6 1 7 1 7 2 8 2 8 1 9 1 9 2 10 2 10 1 11 1 11 2 12 2 12 1 13 1 13 2 14 2 14 1 15 1 15 2 16 2 16 1 17 1 17 2 18 2 18 1 19 1 19 2 20 2 20 1 21 1 21 2 22 2 22 1 23 1 23 2 24 2 24 1 25 1 25 2 26 2 26 1 27 1 27 2 28 2 28 1 29 1 29 2 30 2 30 1 31 1 31 2 32 2 32 1 33 1 33 2 34 2 34 1 35 1 35 2 36 2 36 1 37 1 37 2 38 2 38 1 39 1 39 2 40 2 40 1 41 1 41 2 42 2 42 1 43 1 43 2 44 2 44 1 45 1 45 2 46 2 46 1 47 1 47 2 48 2 48 1 49 1 49 2 50 2 50 1 51 1 51 2 52 2 52 1 53 1 ..."
},
{
"input": "2 298 1",
"output": "596 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 1 9 1 10 1 11 1 12 1 13 1 14 1 15 1 16 1 17 1 18 1 19 1 20 1 21 1 22 1 23 1 24 1 25 1 26 1 27 1 28 1 29 1 30 1 31 1 32 1 33 1 34 1 35 1 36 1 37 1 38 1 39 1 40 1 41 1 42 1 43 1 44 1 45 1 46 1 47 1 48 1 49 1 50 1 51 1 52 1 53 1 54 1 55 1 56 1 57 1 58 1 59 1 60 1 61 1 62 1 63 1 64 1 65 1 66 1 67 1 68 1 69 1 70 1 71 1 72 1 73 1 74 1 75 1 76 1 77 1 78 1 79 1 80 1 81 1 82 1 83 1 84 1 85 1 86 1 87 1 88 1 89 1 90 1 91 1 92 1 93 1 94 1 95 1 96 1 97 1 98 1 99 1 100 1 101 1 102 1 1..."
},
{
"input": "300 300 500",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "300 300 501",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "300 300 44999",
"output": "2 1 1 1 2\n2 1 3 1 4\n2 1 5 1 6\n2 1 7 1 8\n2 1 9 1 10\n2 1 11 1 12\n2 1 13 1 14\n2 1 15 1 16\n2 1 17 1 18\n2 1 19 1 20\n2 1 21 1 22\n2 1 23 1 24\n2 1 25 1 26\n2 1 27 1 28\n2 1 29 1 30\n2 1 31 1 32\n2 1 33 1 34\n2 1 35 1 36\n2 1 37 1 38\n2 1 39 1 40\n2 1 41 1 42\n2 1 43 1 44\n2 1 45 1 46\n2 1 47 1 48\n2 1 49 1 50\n2 1 51 1 52\n2 1 53 1 54\n2 1 55 1 56\n2 1 57 1 58\n2 1 59 1 60\n2 1 61 1 62\n2 1 63 1 64\n2 1 65 1 66\n2 1 67 1 68\n2 1 69 1 70\n2 1 71 1 72\n2 1 73 1 74\n2 1 75 1 76\n2 1 77 1 78\n2 1 79 1 80\n..."
},
{
"input": "5 5 3",
"output": "2 1 1 1 2\n2 1 3 1 4\n21 1 5 2 5 2 4 2 3 2 2 2 1 3 1 3 2 3 3 3 4 3 5 4 5 4 4 4 3 4 2 4 1 5 1 5 2 5 3 5 4 5 5"
},
{
"input": "2 4 3",
"output": "2 1 1 1 2\n2 1 3 1 4\n4 2 4 2 3 2 2 2 1"
}
] | 1,681,065,070 | 2,147,483,647 | PyPy 3-64 | OK | TESTS | 44 | 186 | 20,172,800 | import sys
input = lambda: sys.stdin.readline().rstrip()
N,M,K = map(int, input().split())
t = (N*M)//K
ans = [[]]
dr = 0
for i in range(N):
if dr==0:
for j in range(M):
ans[-1].append((i+1,j+1))
if len(ans)<K and len(ans[-1])==t:
ans.append([])
else:
for j in range(M-1,-1,-1):
ans[-1].append((i+1,j+1))
if len(ans)<K and len(ans[-1])==t:
ans.append([])
dr = (dr+1)%2
for a in ans:
tmp = []
for t1,t2 in a:
tmp.append(t1)
tmp.append(t2)
print(len(a), *tmp)
| Title: Valera and Tubes
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Valera has got a rectangle table consisting of *n* rows and *m* columns. Valera numbered the table rows starting from one, from top to bottom and the columns – starting from one, from left to right. We will represent cell that is on the intersection of row *x* and column *y* by a pair of integers (*x*,<=*y*).
Valera wants to place exactly *k* tubes on his rectangle table. A tube is such sequence of table cells (*x*1,<=*y*1), (*x*2,<=*y*2), ..., (*x**r*,<=*y**r*), that:
- *r*<=≥<=2; - for any integer *i* (1<=≤<=*i*<=≤<=*r*<=-<=1) the following equation |*x**i*<=-<=*x**i*<=+<=1|<=+<=|*y**i*<=-<=*y**i*<=+<=1|<==<=1 holds; - each table cell, which belongs to the tube, must occur exactly once in the sequence.
Valera thinks that the tubes are arranged in a fancy manner if the following conditions are fulfilled:
- no pair of tubes has common cells; - each cell of the table belongs to some tube.
Help Valera to arrange *k* tubes on his rectangle table in a fancy manner.
Input Specification:
The first line contains three space-separated integers *n*,<=*m*,<=*k* (2<=≤<=*n*,<=*m*<=≤<=300; 2<=≤<=2*k*<=≤<=*n*·*m*) — the number of rows, the number of columns and the number of tubes, correspondingly.
Output Specification:
Print *k* lines. In the *i*-th line print the description of the *i*-th tube: first print integer *r**i* (the number of tube cells), then print 2*r**i* integers *x**i*1,<=*y**i*1,<=*x**i*2,<=*y**i*2,<=...,<=*x**ir**i*,<=*y**ir**i* (the sequence of table cells).
If there are multiple solutions, you can print any of them. It is guaranteed that at least one solution exists.
Demo Input:
['3 3 3\n', '2 3 1\n']
Demo Output:
['3 1 1 1 2 1 3\n3 2 1 2 2 2 3\n3 3 1 3 2 3 3\n', '6 1 1 1 2 1 3 2 3 2 2 2 1\n']
Note:
Picture for the first sample:
Picture for the second sample: | ```python
import sys
input = lambda: sys.stdin.readline().rstrip()
N,M,K = map(int, input().split())
t = (N*M)//K
ans = [[]]
dr = 0
for i in range(N):
if dr==0:
for j in range(M):
ans[-1].append((i+1,j+1))
if len(ans)<K and len(ans[-1])==t:
ans.append([])
else:
for j in range(M-1,-1,-1):
ans[-1].append((i+1,j+1))
if len(ans)<K and len(ans[-1])==t:
ans.append([])
dr = (dr+1)%2
for a in ans:
tmp = []
for t1,t2 in a:
tmp.append(t1)
tmp.append(t2)
print(len(a), *tmp)
``` | 3 | |
152 | A | Marks | PROGRAMMING | 900 | [
"implementation"
] | null | null | Vasya, or Mr. Vasily Petrov is a dean of a department in a local university. After the winter exams he got his hands on a group's gradebook.
Overall the group has *n* students. They received marks for *m* subjects. Each student got a mark from 1 to 9 (inclusive) for each subject.
Let's consider a student the best at some subject, if there is no student who got a higher mark for this subject. Let's consider a student successful, if there exists a subject he is the best at.
Your task is to find the number of successful students in the group. | The first input line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=100) — the number of students and the number of subjects, correspondingly. Next *n* lines each containing *m* characters describe the gradebook. Each character in the gradebook is a number from 1 to 9. Note that the marks in a rows are not sepatated by spaces. | Print the single number — the number of successful students in the given group. | [
"3 3\n223\n232\n112\n",
"3 5\n91728\n11828\n11111\n"
] | [
"2\n",
"3\n"
] | In the first sample test the student number 1 is the best at subjects 1 and 3, student 2 is the best at subjects 1 and 2, but student 3 isn't the best at any subject.
In the second sample test each student is the best at at least one subject. | 500 | [
{
"input": "3 3\n223\n232\n112",
"output": "2"
},
{
"input": "3 5\n91728\n11828\n11111",
"output": "3"
},
{
"input": "2 2\n48\n27",
"output": "1"
},
{
"input": "2 1\n4\n6",
"output": "1"
},
{
"input": "1 2\n57",
"output": "1"
},
{
"input": "1 1\n5",
"output": "1"
},
{
"input": "3 4\n2553\n6856\n5133",
"output": "2"
},
{
"input": "8 7\n6264676\n7854895\n3244128\n2465944\n8958761\n1378945\n3859353\n6615285",
"output": "6"
},
{
"input": "9 8\n61531121\n43529859\n18841327\n88683622\n98995641\n62741632\n57441743\n49396792\n63381994",
"output": "4"
},
{
"input": "10 20\n26855662887514171367\n48525577498621511535\n47683778377545341138\n47331616748732562762\n44876938191354974293\n24577238399664382695\n42724955594463126746\n79187344479926159359\n48349683283914388185\n82157191115518781898",
"output": "9"
},
{
"input": "20 15\n471187383859588\n652657222494199\n245695867594992\n726154672861295\n614617827782772\n862889444974692\n373977167653235\n645434268565473\n785993468314573\n722176861496755\n518276853323939\n723712762593348\n728935312568886\n373898548522463\n769777587165681\n247592995114377\n182375946483965\n497496542536127\n988239919677856\n859844339819143",
"output": "18"
},
{
"input": "13 9\n514562255\n322655246\n135162979\n733845982\n473117129\n513967187\n965649829\n799122777\n661249521\n298618978\n659352422\n747778378\n723261619",
"output": "11"
},
{
"input": "75 1\n2\n3\n8\n3\n2\n1\n3\n1\n5\n1\n5\n4\n8\n8\n4\n2\n5\n1\n7\n6\n3\n2\n2\n3\n5\n5\n2\n4\n7\n7\n9\n2\n9\n5\n1\n4\n9\n5\n2\n4\n6\n6\n3\n3\n9\n3\n3\n2\n3\n4\n2\n6\n9\n1\n1\n1\n1\n7\n2\n3\n2\n9\n7\n4\n9\n1\n7\n5\n6\n8\n3\n4\n3\n4\n6",
"output": "7"
},
{
"input": "92 3\n418\n665\n861\n766\n529\n416\n476\n676\n561\n995\n415\n185\n291\n176\n776\n631\n556\n488\n118\n188\n437\n496\n466\n131\n914\n118\n766\n365\n113\n897\n386\n639\n276\n946\n759\n169\n494\n837\n338\n351\n783\n311\n261\n862\n598\n132\n246\n982\n575\n364\n615\n347\n374\n368\n523\n132\n774\n161\n552\n492\n598\n474\n639\n681\n635\n342\n516\n483\n141\n197\n571\n336\n175\n596\n481\n327\n841\n133\n142\n146\n246\n396\n287\n582\n556\n996\n479\n814\n497\n363\n963\n162",
"output": "23"
},
{
"input": "100 1\n1\n6\n9\n1\n1\n5\n5\n4\n6\n9\n6\n1\n7\n8\n7\n3\n8\n8\n7\n6\n2\n1\n5\n8\n7\n3\n5\n4\n9\n7\n1\n2\n4\n1\n6\n5\n1\n3\n9\n4\n5\n8\n1\n2\n1\n9\n7\n3\n7\n1\n2\n2\n2\n2\n3\n9\n7\n2\n4\n7\n1\n6\n8\n1\n5\n6\n1\n1\n2\n9\n7\n4\n9\n1\n9\n4\n1\n3\n5\n2\n4\n4\n6\n5\n1\n4\n5\n8\n4\n7\n6\n5\n6\n9\n5\n8\n1\n5\n1\n6",
"output": "10"
},
{
"input": "100 2\n71\n87\n99\n47\n22\n87\n49\n73\n21\n12\n77\n43\n18\n41\n78\n62\n61\n16\n64\n89\n81\n54\n53\n92\n93\n94\n68\n93\n15\n68\n42\n93\n28\n19\n86\n16\n97\n17\n11\n43\n72\n76\n54\n95\n58\n53\n48\n45\n85\n85\n74\n21\n44\n51\n89\n75\n76\n17\n38\n62\n81\n22\n66\n59\n89\n85\n91\n87\n12\n97\n52\n87\n43\n89\n51\n58\n57\n98\n78\n68\n82\n41\n87\n29\n75\n72\n48\n14\n35\n71\n74\n91\n66\n67\n42\n98\n52\n54\n22\n41",
"output": "21"
},
{
"input": "5 20\n11111111111111111111\n11111111111111111111\n11111111111111111111\n99999999999999999999\n11111111111111111119",
"output": "2"
},
{
"input": "3 3\n111\n111\n999",
"output": "1"
},
{
"input": "3 3\n119\n181\n711",
"output": "3"
},
{
"input": "15 5\n91728\n11828\n11111\n91728\n11828\n11111\n91728\n11828\n11111\n91728\n11828\n11111\n91728\n11828\n11111",
"output": "15"
},
{
"input": "2 20\n22222222222222222222\n11111111111111111111",
"output": "1"
},
{
"input": "3 3\n233\n222\n111",
"output": "2"
},
{
"input": "4 15\n222222222222222\n111111111111119\n111111111111119\n111111111111111",
"output": "3"
},
{
"input": "4 1\n1\n9\n9\n9",
"output": "3"
},
{
"input": "3 3\n123\n321\n132",
"output": "3"
},
{
"input": "3 3\n113\n332\n322",
"output": "3"
},
{
"input": "2 100\n2222222222222222222222222222222222222222222222222222222222222222222222221222222222222222222222222222\n1111111111111111111111111111111111111111111111111111111111111111111111119111111111111111111111111111",
"output": "2"
},
{
"input": "3 3\n321\n231\n123",
"output": "3"
},
{
"input": "2 100\n1111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111\n2222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222222",
"output": "1"
},
{
"input": "3 3\n221\n111\n111",
"output": "3"
}
] | 1,674,138,124 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 1 | 46 | 0 | def successful_students(rows, cols, marks):
res_dict = dict()
for i in range(rows):
res_dict[i] = False
greatest = list()
for c in range(cols):
greater = marks[0][c]
for r in range(rows):
if marks[r][c] > greater:
greater = marks[r][c]
greatest.append(greater)
# print(greatest)
for i in range(rows):
for j in range(cols):
if marks[i][j] >= greatest[i]:
res_dict[i] = True
count = 0
for i in range(len(res_dict)):
if res_dict[i] == True:
count += 1
return count
if __name__ == "__main__":
students, subjects = map(int, input().split())
marks = []
for i in range(students):
row = [int(x) for x in input()]
marks.append(row)
print(successful_students(students, subjects, marks))
| Title: Marks
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Vasya, or Mr. Vasily Petrov is a dean of a department in a local university. After the winter exams he got his hands on a group's gradebook.
Overall the group has *n* students. They received marks for *m* subjects. Each student got a mark from 1 to 9 (inclusive) for each subject.
Let's consider a student the best at some subject, if there is no student who got a higher mark for this subject. Let's consider a student successful, if there exists a subject he is the best at.
Your task is to find the number of successful students in the group.
Input Specification:
The first input line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=100) — the number of students and the number of subjects, correspondingly. Next *n* lines each containing *m* characters describe the gradebook. Each character in the gradebook is a number from 1 to 9. Note that the marks in a rows are not sepatated by spaces.
Output Specification:
Print the single number — the number of successful students in the given group.
Demo Input:
['3 3\n223\n232\n112\n', '3 5\n91728\n11828\n11111\n']
Demo Output:
['2\n', '3\n']
Note:
In the first sample test the student number 1 is the best at subjects 1 and 3, student 2 is the best at subjects 1 and 2, but student 3 isn't the best at any subject.
In the second sample test each student is the best at at least one subject. | ```python
def successful_students(rows, cols, marks):
res_dict = dict()
for i in range(rows):
res_dict[i] = False
greatest = list()
for c in range(cols):
greater = marks[0][c]
for r in range(rows):
if marks[r][c] > greater:
greater = marks[r][c]
greatest.append(greater)
# print(greatest)
for i in range(rows):
for j in range(cols):
if marks[i][j] >= greatest[i]:
res_dict[i] = True
count = 0
for i in range(len(res_dict)):
if res_dict[i] == True:
count += 1
return count
if __name__ == "__main__":
students, subjects = map(int, input().split())
marks = []
for i in range(students):
row = [int(x) for x in input()]
marks.append(row)
print(successful_students(students, subjects, marks))
``` | 0 | |
368 | B | Sereja and Suffixes | PROGRAMMING | 1,100 | [
"data structures",
"dp"
] | null | null | Sereja has an array *a*, consisting of *n* integers *a*1, *a*2, ..., *a**n*. The boy cannot sit and do nothing, he decided to study an array. Sereja took a piece of paper and wrote out *m* integers *l*1,<=*l*2,<=...,<=*l**m* (1<=≤<=*l**i*<=≤<=*n*). For each number *l**i* he wants to know how many distinct numbers are staying on the positions *l**i*, *l**i*<=+<=1, ..., *n*. Formally, he want to find the number of distinct numbers among *a**l**i*,<=*a**l**i*<=+<=1,<=...,<=*a**n*.?
Sereja wrote out the necessary array elements but the array was so large and the boy was so pressed for time. Help him, find the answer for the described question for each *l**i*. | The first line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=105). The second line contains *n* integers *a*1, *a*2, ..., *a**n* (1<=≤<=*a**i*<=≤<=105) — the array elements.
Next *m* lines contain integers *l*1,<=*l*2,<=...,<=*l**m*. The *i*-th line contains integer *l**i* (1<=≤<=*l**i*<=≤<=*n*). | Print *m* lines — on the *i*-th line print the answer to the number *l**i*. | [
"10 10\n1 2 3 4 1 2 3 4 100000 99999\n1\n2\n3\n4\n5\n6\n7\n8\n9\n10\n"
] | [
"6\n6\n6\n6\n6\n5\n4\n3\n2\n1\n"
] | none | 1,000 | [
{
"input": "10 10\n1 2 3 4 1 2 3 4 100000 99999\n1\n2\n3\n4\n5\n6\n7\n8\n9\n10",
"output": "6\n6\n6\n6\n6\n5\n4\n3\n2\n1"
},
{
"input": "8 3\n8 6 4 3 4 2 4 8\n6\n4\n2",
"output": "3\n4\n5"
},
{
"input": "7 10\n1 3 8 6 2 2 7\n4\n2\n6\n3\n4\n4\n6\n2\n7\n4",
"output": "3\n5\n2\n4\n3\n3\n2\n5\n1\n3"
},
{
"input": "10 2\n2 6 5 7 2 2 3 2 4 8\n1\n2",
"output": "7\n7"
},
{
"input": "7 1\n68346 10956 76708 23018 84063 34833 80407\n1",
"output": "7"
},
{
"input": "2 2\n8 4\n1\n1",
"output": "2\n2"
},
{
"input": "1 5\n5\n1\n1\n1\n1\n1",
"output": "1\n1\n1\n1\n1"
},
{
"input": "4 7\n3 1 4 2\n4\n1\n2\n3\n2\n4\n4",
"output": "1\n4\n3\n2\n3\n1\n1"
},
{
"input": "4 3\n9 1 7 1\n1\n4\n2",
"output": "3\n1\n2"
},
{
"input": "8 3\n9280 6676 2720 6172 8329 10413 3975 1394\n5\n6\n7",
"output": "4\n3\n2"
},
{
"input": "1 1\n1\n1",
"output": "1"
}
] | 1,698,237,491 | 2,147,483,647 | Python 3 | TIME_LIMIT_EXCEEDED | TESTS | 10 | 1,000 | 10,035,200 | n,m=input().split()
lst=input().split()
for i in range(int(m)):
k=int(input())
queue=lst[k-1:]
print(len(set(queue)))
| Title: Sereja and Suffixes
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Sereja has an array *a*, consisting of *n* integers *a*1, *a*2, ..., *a**n*. The boy cannot sit and do nothing, he decided to study an array. Sereja took a piece of paper and wrote out *m* integers *l*1,<=*l*2,<=...,<=*l**m* (1<=≤<=*l**i*<=≤<=*n*). For each number *l**i* he wants to know how many distinct numbers are staying on the positions *l**i*, *l**i*<=+<=1, ..., *n*. Formally, he want to find the number of distinct numbers among *a**l**i*,<=*a**l**i*<=+<=1,<=...,<=*a**n*.?
Sereja wrote out the necessary array elements but the array was so large and the boy was so pressed for time. Help him, find the answer for the described question for each *l**i*.
Input Specification:
The first line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=105). The second line contains *n* integers *a*1, *a*2, ..., *a**n* (1<=≤<=*a**i*<=≤<=105) — the array elements.
Next *m* lines contain integers *l*1,<=*l*2,<=...,<=*l**m*. The *i*-th line contains integer *l**i* (1<=≤<=*l**i*<=≤<=*n*).
Output Specification:
Print *m* lines — on the *i*-th line print the answer to the number *l**i*.
Demo Input:
['10 10\n1 2 3 4 1 2 3 4 100000 99999\n1\n2\n3\n4\n5\n6\n7\n8\n9\n10\n']
Demo Output:
['6\n6\n6\n6\n6\n5\n4\n3\n2\n1\n']
Note:
none | ```python
n,m=input().split()
lst=input().split()
for i in range(int(m)):
k=int(input())
queue=lst[k-1:]
print(len(set(queue)))
``` | 0 | |
177 | B2 | Rectangular Game | PROGRAMMING | 1,200 | [
"number theory"
] | null | null | The Smart Beaver from ABBYY decided to have a day off. But doing nothing the whole day turned out to be too boring, and he decided to play a game with pebbles. Initially, the Beaver has *n* pebbles. He arranges them in *a* equal rows, each row has *b* pebbles (*a*<=><=1). Note that the Beaver must use all the pebbles he has, i. e. *n*<==<=*a*·*b*.
Once the Smart Beaver has arranged the pebbles, he takes back any of the resulting rows (that is, *b* pebbles) and discards all other pebbles. Then he arranges all his pebbles again (possibly choosing other values of *a* and *b*) and takes back one row, and so on. The game continues until at some point the Beaver ends up with exactly one pebble.
The game process can be represented as a finite sequence of integers *c*1,<=...,<=*c**k*, where:
- *c*1<==<=*n* - *c**i*<=+<=1 is the number of pebbles that the Beaver ends up with after the *i*-th move, that is, the number of pebbles in a row after some arrangement of *c**i* pebbles (1<=≤<=*i*<=<<=*k*). Note that *c**i*<=><=*c**i*<=+<=1. - *c**k*<==<=1
The result of the game is the sum of numbers *c**i*. You are given *n*. Find the maximum possible result of the game. | The single line of the input contains a single integer *n* — the initial number of pebbles the Smart Beaver has.
The input limitations for getting 30 points are:
- 2<=≤<=*n*<=≤<=50
The input limitations for getting 100 points are:
- 2<=≤<=*n*<=≤<=109 | Print a single number — the maximum possible result of the game. | [
"10\n",
"8\n"
] | [
"16\n",
"15\n"
] | Consider the first example (*c*<sub class="lower-index">1</sub> = 10). The possible options for the game development are:
- Arrange the pebbles in 10 rows, one pebble per row. Then *c*<sub class="lower-index">2</sub> = 1, and the game ends after the first move with the result of 11. - Arrange the pebbles in 5 rows, two pebbles per row. Then *c*<sub class="lower-index">2</sub> = 2, and the game continues. During the second move we have two pebbles which can be arranged in a unique way (remember that you are not allowed to put all the pebbles in the same row!) — 2 rows, one pebble per row. *c*<sub class="lower-index">3</sub> = 1, and the game ends with the result of 13. - Finally, arrange the pebbles in two rows, five pebbles per row. The same logic leads us to *c*<sub class="lower-index">2</sub> = 5, *c*<sub class="lower-index">3</sub> = 1, and the game ends with the result of 16 — the maximum possible result. | 70 | [
{
"input": "10",
"output": "16"
},
{
"input": "8",
"output": "15"
},
{
"input": "4",
"output": "7"
},
{
"input": "36",
"output": "67"
},
{
"input": "32",
"output": "63"
},
{
"input": "46",
"output": "70"
},
{
"input": "6",
"output": "10"
},
{
"input": "13",
"output": "14"
},
{
"input": "9",
"output": "13"
},
{
"input": "18",
"output": "31"
},
{
"input": "20",
"output": "36"
},
{
"input": "37",
"output": "38"
},
{
"input": "42",
"output": "71"
},
{
"input": "50",
"output": "81"
},
{
"input": "48",
"output": "94"
},
{
"input": "33",
"output": "45"
},
{
"input": "49",
"output": "57"
},
{
"input": "34",
"output": "52"
},
{
"input": "35",
"output": "43"
},
{
"input": "37",
"output": "38"
},
{
"input": "39",
"output": "53"
},
{
"input": "42",
"output": "71"
},
{
"input": "14",
"output": "22"
},
{
"input": "2",
"output": "3"
},
{
"input": "3",
"output": "4"
},
{
"input": "5",
"output": "6"
},
{
"input": "1000",
"output": "1906"
},
{
"input": "111111111",
"output": "160827495"
},
{
"input": "134534550",
"output": "229605633"
},
{
"input": "999002449",
"output": "999034057"
},
{
"input": "1011",
"output": "1349"
},
{
"input": "13458",
"output": "22431"
},
{
"input": "1000000000",
"output": "1998535156"
},
{
"input": "999999999",
"output": "1494160827"
},
{
"input": "536870912",
"output": "1073741823"
},
{
"input": "456345677",
"output": "456345678"
},
{
"input": "873453946",
"output": "1310217629"
},
{
"input": "999999948",
"output": "1833697140"
},
{
"input": "999997440",
"output": "1999958573"
},
{
"input": "999999488",
"output": "1999537224"
},
{
"input": "999999937",
"output": "999999938"
},
{
"input": "999996270",
"output": "1705144136"
},
{
"input": "223092870",
"output": "380424693"
},
{
"input": "999068070",
"output": "1703641013"
},
{
"input": "222953472",
"output": "445906091"
},
{
"input": "999161856",
"output": "1998319610"
},
{
"input": "998244352",
"output": "1996488603"
},
{
"input": "999751680",
"output": "1999495564"
},
{
"input": "999989760",
"output": "1998828039"
},
{
"input": "999567360",
"output": "1999005091"
},
{
"input": "999936000",
"output": "1999743134"
},
{
"input": "999999000",
"output": "1936337207"
},
{
"input": "999567360",
"output": "1999005091"
},
{
"input": "997785600",
"output": "1995562298"
}
] | 1,620,221,088 | 2,147,483,647 | PyPy 3 | OK | TESTS2 | 54 | 342 | 5,939,200 |
def STR(): return list(input())
def INT(): return int(input())
def MAP(): return map(int, input().split())
def MAP2():return map(float,input().split())
def LIST(): return list(map(int, input().split()))
def STRING(): return input()
import string
import sys
import datetime
from heapq import heappop , heappush
from bisect import *
from collections import deque , Counter , defaultdict
from math import *
from itertools import permutations , accumulate
dx = [-1 , 1 , 0 , 0 ]
dy = [0 , 0 , 1 , - 1]
#visited = [[False for i in range(m)] for j in range(n)]
# primes = [2,11,101,1009,10007,100003,1000003,10000019,102345689]
#months = [31 , 28 , 31 , 30 , 31 , 30 , 31 , 31 , 30 , 31, 30 , 31]
#sys.stdin = open(r'input.txt' , 'r')
#sys.stdout = open(r'output.txt' , 'w')
#for tt in range(INT()):
#arr.sort(key=lambda x: (-d[x], x)) Sort with Freq
#Code
def solve(n):
d = [n]
i = 2
while i * i <= n :
if n % i == 0 :
if n // i == i :
d.append(i)
else:
d.append(i)
d.append(n // i )
i +=1
return d
n = INT()
m = n
sm = 0
while True :
k1 = solve(n)
k2 = min(k1)
k3 = n // k2
sm += k3
n//= k2
if n == 1 :
break
print(sm + m )
| Title: Rectangular Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The Smart Beaver from ABBYY decided to have a day off. But doing nothing the whole day turned out to be too boring, and he decided to play a game with pebbles. Initially, the Beaver has *n* pebbles. He arranges them in *a* equal rows, each row has *b* pebbles (*a*<=><=1). Note that the Beaver must use all the pebbles he has, i. e. *n*<==<=*a*·*b*.
Once the Smart Beaver has arranged the pebbles, he takes back any of the resulting rows (that is, *b* pebbles) and discards all other pebbles. Then he arranges all his pebbles again (possibly choosing other values of *a* and *b*) and takes back one row, and so on. The game continues until at some point the Beaver ends up with exactly one pebble.
The game process can be represented as a finite sequence of integers *c*1,<=...,<=*c**k*, where:
- *c*1<==<=*n* - *c**i*<=+<=1 is the number of pebbles that the Beaver ends up with after the *i*-th move, that is, the number of pebbles in a row after some arrangement of *c**i* pebbles (1<=≤<=*i*<=<<=*k*). Note that *c**i*<=><=*c**i*<=+<=1. - *c**k*<==<=1
The result of the game is the sum of numbers *c**i*. You are given *n*. Find the maximum possible result of the game.
Input Specification:
The single line of the input contains a single integer *n* — the initial number of pebbles the Smart Beaver has.
The input limitations for getting 30 points are:
- 2<=≤<=*n*<=≤<=50
The input limitations for getting 100 points are:
- 2<=≤<=*n*<=≤<=109
Output Specification:
Print a single number — the maximum possible result of the game.
Demo Input:
['10\n', '8\n']
Demo Output:
['16\n', '15\n']
Note:
Consider the first example (*c*<sub class="lower-index">1</sub> = 10). The possible options for the game development are:
- Arrange the pebbles in 10 rows, one pebble per row. Then *c*<sub class="lower-index">2</sub> = 1, and the game ends after the first move with the result of 11. - Arrange the pebbles in 5 rows, two pebbles per row. Then *c*<sub class="lower-index">2</sub> = 2, and the game continues. During the second move we have two pebbles which can be arranged in a unique way (remember that you are not allowed to put all the pebbles in the same row!) — 2 rows, one pebble per row. *c*<sub class="lower-index">3</sub> = 1, and the game ends with the result of 13. - Finally, arrange the pebbles in two rows, five pebbles per row. The same logic leads us to *c*<sub class="lower-index">2</sub> = 5, *c*<sub class="lower-index">3</sub> = 1, and the game ends with the result of 16 — the maximum possible result. | ```python
def STR(): return list(input())
def INT(): return int(input())
def MAP(): return map(int, input().split())
def MAP2():return map(float,input().split())
def LIST(): return list(map(int, input().split()))
def STRING(): return input()
import string
import sys
import datetime
from heapq import heappop , heappush
from bisect import *
from collections import deque , Counter , defaultdict
from math import *
from itertools import permutations , accumulate
dx = [-1 , 1 , 0 , 0 ]
dy = [0 , 0 , 1 , - 1]
#visited = [[False for i in range(m)] for j in range(n)]
# primes = [2,11,101,1009,10007,100003,1000003,10000019,102345689]
#months = [31 , 28 , 31 , 30 , 31 , 30 , 31 , 31 , 30 , 31, 30 , 31]
#sys.stdin = open(r'input.txt' , 'r')
#sys.stdout = open(r'output.txt' , 'w')
#for tt in range(INT()):
#arr.sort(key=lambda x: (-d[x], x)) Sort with Freq
#Code
def solve(n):
d = [n]
i = 2
while i * i <= n :
if n % i == 0 :
if n // i == i :
d.append(i)
else:
d.append(i)
d.append(n // i )
i +=1
return d
n = INT()
m = n
sm = 0
while True :
k1 = solve(n)
k2 = min(k1)
k3 = n // k2
sm += k3
n//= k2
if n == 1 :
break
print(sm + m )
``` | 3 | |
33 | A | What is for dinner? | PROGRAMMING | 1,200 | [
"greedy",
"implementation"
] | A. What is for dinner? | 2 | 256 | In one little known, but very beautiful country called Waterland, lives a lovely shark Valerie. Like all the sharks, she has several rows of teeth, and feeds on crucians. One of Valerie's distinguishing features is that while eating one crucian she uses only one row of her teeth, the rest of the teeth are "relaxing".
For a long time our heroine had been searching the sea for crucians, but a great misfortune happened. Her teeth started to ache, and she had to see the local dentist, lobster Ashot. As a professional, Ashot quickly relieved Valerie from her toothache. Moreover, he managed to determine the cause of Valerie's developing caries (for what he was later nicknamed Cap).
It turned that Valerie eats too many crucians. To help Valerie avoid further reoccurrence of toothache, Ashot found for each Valerie's tooth its residual viability. Residual viability of a tooth is a value equal to the amount of crucians that Valerie can eat with this tooth. Every time Valerie eats a crucian, viability of all the teeth used for it will decrease by one. When the viability of at least one tooth becomes negative, the shark will have to see the dentist again.
Unhappy, Valerie came back home, where a portion of crucians was waiting for her. For sure, the shark couldn't say no to her favourite meal, but she had no desire to go back to the dentist. That's why she decided to eat the maximum amount of crucians from the portion but so that the viability of no tooth becomes negative.
As Valerie is not good at mathematics, she asked you to help her to find out the total amount of crucians that she can consume for dinner.
We should remind you that while eating one crucian Valerie uses exactly one row of teeth and the viability of each tooth from this row decreases by one. | The first line contains three integers *n*, *m*, *k* (1<=≤<=*m*<=≤<=*n*<=≤<=1000,<=0<=≤<=*k*<=≤<=106) — total amount of Valerie's teeth, amount of tooth rows and amount of crucians in Valerie's portion for dinner. Then follow *n* lines, each containing two integers: *r* (1<=≤<=*r*<=≤<=*m*) — index of the row, where belongs the corresponding tooth, and *c* (0<=≤<=*c*<=≤<=106) — its residual viability.
It's guaranteed that each tooth row has positive amount of teeth. | In the first line output the maximum amount of crucians that Valerie can consume for dinner. | [
"4 3 18\n2 3\n1 2\n3 6\n2 3\n",
"2 2 13\n1 13\n2 12\n"
] | [
"11\n",
"13\n"
] | none | 500 | [
{
"input": "4 3 18\n2 3\n1 2\n3 6\n2 3",
"output": "11"
},
{
"input": "2 2 13\n1 13\n2 12",
"output": "13"
},
{
"input": "5 4 8\n4 6\n4 5\n1 3\n2 0\n3 3",
"output": "8"
},
{
"input": "1 1 0\n1 3",
"output": "0"
},
{
"input": "7 1 30\n1 8\n1 15\n1 5\n1 17\n1 9\n1 16\n1 16",
"output": "5"
},
{
"input": "4 2 8\n1 9\n1 10\n1 4\n2 6",
"output": "8"
},
{
"input": "10 4 14\n2 6\n1 5\n2 8\n2 6\n2 5\n4 1\n4 0\n2 4\n3 4\n1 0",
"output": "8"
},
{
"input": "54 22 1009\n15 7\n17 7\n11 9\n5 11\n12 9\n13 8\n13 12\n22 11\n20 9\n20 7\n16 11\n19 12\n3 12\n15 9\n1 12\n2 10\n16 10\n16 10\n14 10\n9 11\n9 9\n14 8\n10 10\n16 12\n1 8\n3 8\n21 11\n18 12\n2 6\n9 11\n11 7\n15 9\n20 11\n6 8\n8 8\n19 11\n15 7\n9 9\n22 7\n12 9\n17 9\n17 11\n12 7\n15 9\n5 11\n11 6\n18 8\n7 10\n4 10\n13 12\n4 8\n20 6\n15 12\n9 7",
"output": "180"
},
{
"input": "1 1 1000000\n1 1000000",
"output": "1000000"
},
{
"input": "4 3 181818\n3 1299\n1 1694\n3 1164\n2 1278",
"output": "4136"
},
{
"input": "50 50 0\n33 0\n26 0\n30 0\n41 0\n38 0\n36 0\n16 0\n7 0\n23 0\n5 0\n39 0\n29 0\n40 0\n47 0\n24 0\n43 0\n14 0\n10 0\n20 0\n3 0\n6 0\n34 0\n13 0\n18 0\n21 0\n9 0\n8 0\n22 0\n25 0\n4 0\n11 0\n17 0\n32 0\n44 0\n49 0\n50 0\n27 0\n28 0\n45 0\n12 0\n35 0\n15 0\n42 0\n31 0\n2 0\n1 0\n48 0\n19 0\n37 0\n46 0",
"output": "0"
},
{
"input": "19 12 199\n7 1\n8 6\n6 14\n1 7\n4 1\n6 6\n3 4\n1 5\n9 2\n5 3\n11 3\n9 4\n1 12\n4 7\n7 3\n12 14\n2 1\n10 8\n6 12",
"output": "54"
}
] | 1,454,257,943 | 2,147,483,647 | Python 3 | OK | TESTS | 31 | 154 | 102,400 | n, m, k = [int(i) for i in input().split()]
teeth = dict()
count = 0
for i in range(n):
x, y = [int(i) for i in input().split()]
if x in teeth:
y = min(teeth[x],y)
teeth[x] = y
else:
teeth[x] = y
for key in teeth:
count += teeth[key]
print(min(count, k))
| Title: What is for dinner?
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
In one little known, but very beautiful country called Waterland, lives a lovely shark Valerie. Like all the sharks, she has several rows of teeth, and feeds on crucians. One of Valerie's distinguishing features is that while eating one crucian she uses only one row of her teeth, the rest of the teeth are "relaxing".
For a long time our heroine had been searching the sea for crucians, but a great misfortune happened. Her teeth started to ache, and she had to see the local dentist, lobster Ashot. As a professional, Ashot quickly relieved Valerie from her toothache. Moreover, he managed to determine the cause of Valerie's developing caries (for what he was later nicknamed Cap).
It turned that Valerie eats too many crucians. To help Valerie avoid further reoccurrence of toothache, Ashot found for each Valerie's tooth its residual viability. Residual viability of a tooth is a value equal to the amount of crucians that Valerie can eat with this tooth. Every time Valerie eats a crucian, viability of all the teeth used for it will decrease by one. When the viability of at least one tooth becomes negative, the shark will have to see the dentist again.
Unhappy, Valerie came back home, where a portion of crucians was waiting for her. For sure, the shark couldn't say no to her favourite meal, but she had no desire to go back to the dentist. That's why she decided to eat the maximum amount of crucians from the portion but so that the viability of no tooth becomes negative.
As Valerie is not good at mathematics, she asked you to help her to find out the total amount of crucians that she can consume for dinner.
We should remind you that while eating one crucian Valerie uses exactly one row of teeth and the viability of each tooth from this row decreases by one.
Input Specification:
The first line contains three integers *n*, *m*, *k* (1<=≤<=*m*<=≤<=*n*<=≤<=1000,<=0<=≤<=*k*<=≤<=106) — total amount of Valerie's teeth, amount of tooth rows and amount of crucians in Valerie's portion for dinner. Then follow *n* lines, each containing two integers: *r* (1<=≤<=*r*<=≤<=*m*) — index of the row, where belongs the corresponding tooth, and *c* (0<=≤<=*c*<=≤<=106) — its residual viability.
It's guaranteed that each tooth row has positive amount of teeth.
Output Specification:
In the first line output the maximum amount of crucians that Valerie can consume for dinner.
Demo Input:
['4 3 18\n2 3\n1 2\n3 6\n2 3\n', '2 2 13\n1 13\n2 12\n']
Demo Output:
['11\n', '13\n']
Note:
none | ```python
n, m, k = [int(i) for i in input().split()]
teeth = dict()
count = 0
for i in range(n):
x, y = [int(i) for i in input().split()]
if x in teeth:
y = min(teeth[x],y)
teeth[x] = y
else:
teeth[x] = y
for key in teeth:
count += teeth[key]
print(min(count, k))
``` | 3.961309 |
25 | A | IQ test | PROGRAMMING | 1,300 | [
"brute force"
] | A. IQ test | 2 | 256 | Bob is preparing to pass IQ test. The most frequent task in this test is to find out which one of the given *n* numbers differs from the others. Bob observed that one number usually differs from the others in evenness. Help Bob — to check his answers, he needs a program that among the given *n* numbers finds one that is different in evenness. | The first line contains integer *n* (3<=≤<=*n*<=≤<=100) — amount of numbers in the task. The second line contains *n* space-separated natural numbers, not exceeding 100. It is guaranteed, that exactly one of these numbers differs from the others in evenness. | Output index of number that differs from the others in evenness. Numbers are numbered from 1 in the input order. | [
"5\n2 4 7 8 10\n",
"4\n1 2 1 1\n"
] | [
"3\n",
"2\n"
] | none | 0 | [
{
"input": "5\n2 4 7 8 10",
"output": "3"
},
{
"input": "4\n1 2 1 1",
"output": "2"
},
{
"input": "3\n1 2 2",
"output": "1"
},
{
"input": "3\n100 99 100",
"output": "2"
},
{
"input": "3\n5 3 2",
"output": "3"
},
{
"input": "4\n43 28 1 91",
"output": "2"
},
{
"input": "4\n75 13 94 77",
"output": "3"
},
{
"input": "4\n97 8 27 3",
"output": "2"
},
{
"input": "10\n95 51 12 91 85 3 1 31 25 7",
"output": "3"
},
{
"input": "20\n88 96 66 51 14 88 2 92 18 72 18 88 20 30 4 82 90 100 24 46",
"output": "4"
},
{
"input": "30\n20 94 56 50 10 98 52 32 14 22 24 60 4 8 98 46 34 68 82 82 98 90 50 20 78 49 52 94 64 36",
"output": "26"
},
{
"input": "50\n79 27 77 57 37 45 27 49 65 33 57 21 71 19 75 85 65 61 23 97 85 9 23 1 9 3 99 77 77 21 79 69 15 37 15 7 93 81 13 89 91 31 45 93 15 97 55 80 85 83",
"output": "48"
},
{
"input": "60\n46 11 73 65 3 69 3 53 43 53 97 47 55 93 31 75 35 3 9 73 23 31 3 81 91 79 61 21 15 11 11 11 81 7 83 75 39 87 83 59 89 55 93 27 49 67 67 29 1 93 11 17 9 19 35 21 63 31 31 25",
"output": "1"
},
{
"input": "70\n28 42 42 92 64 54 22 38 38 78 62 38 4 38 14 66 4 92 66 58 94 26 4 44 41 88 48 82 44 26 74 44 48 4 16 92 34 38 26 64 94 4 30 78 50 54 12 90 8 16 80 98 28 100 74 50 36 42 92 18 76 98 8 22 2 50 58 50 64 46",
"output": "25"
},
{
"input": "100\n43 35 79 53 13 91 91 45 65 83 57 9 42 39 85 45 71 51 61 59 31 13 63 39 25 21 79 39 91 67 21 61 97 75 93 83 29 79 59 97 11 37 63 51 39 55 91 23 21 17 47 23 35 75 49 5 69 99 5 7 41 17 25 89 15 79 21 63 53 81 43 91 59 91 69 99 85 15 91 51 49 37 65 7 89 81 21 93 61 63 97 93 45 17 13 69 57 25 75 73",
"output": "13"
},
{
"input": "100\n50 24 68 60 70 30 52 22 18 74 68 98 20 82 4 46 26 68 100 78 84 58 74 98 38 88 68 86 64 80 82 100 20 22 98 98 52 6 94 10 48 68 2 18 38 22 22 82 44 20 66 72 36 58 64 6 36 60 4 96 76 64 12 90 10 58 64 60 74 28 90 26 24 60 40 58 2 16 76 48 58 36 82 60 24 44 4 78 28 38 8 12 40 16 38 6 66 24 31 76",
"output": "99"
},
{
"input": "100\n47 48 94 48 14 18 94 36 96 22 12 30 94 20 48 98 40 58 2 94 8 36 98 18 98 68 2 60 76 38 18 100 8 72 100 68 2 86 92 72 58 16 48 14 6 58 72 76 6 88 80 66 20 28 74 62 86 68 90 86 2 56 34 38 56 90 4 8 76 44 32 86 12 98 38 34 54 92 70 94 10 24 82 66 90 58 62 2 32 58 100 22 58 72 2 22 68 72 42 14",
"output": "1"
},
{
"input": "99\n38 20 68 60 84 16 28 88 60 48 80 28 4 92 70 60 46 46 20 34 12 100 76 2 40 10 8 86 6 80 50 66 12 34 14 28 26 70 46 64 34 96 10 90 98 96 56 88 50 74 70 94 2 94 24 66 68 46 22 30 6 10 64 32 88 14 98 100 64 58 50 18 50 50 8 38 8 16 54 2 60 54 62 84 92 98 4 72 66 26 14 88 99 16 10 6 88 56 22",
"output": "93"
},
{
"input": "99\n50 83 43 89 53 47 69 1 5 37 63 87 95 15 55 95 75 89 33 53 89 75 93 75 11 85 49 29 11 97 49 67 87 11 25 37 97 73 67 49 87 43 53 97 43 29 53 33 45 91 37 73 39 49 59 5 21 43 87 35 5 63 89 57 63 47 29 99 19 85 13 13 3 13 43 19 5 9 61 51 51 57 15 89 13 97 41 13 99 79 13 27 97 95 73 33 99 27 23",
"output": "1"
},
{
"input": "98\n61 56 44 30 58 14 20 24 88 28 46 56 96 52 58 42 94 50 46 30 46 80 72 88 68 16 6 60 26 90 10 98 76 20 56 40 30 16 96 20 88 32 62 30 74 58 36 76 60 4 24 36 42 54 24 92 28 14 2 74 86 90 14 52 34 82 40 76 8 64 2 56 10 8 78 16 70 86 70 42 70 74 22 18 76 98 88 28 62 70 36 72 20 68 34 48 80 98",
"output": "1"
},
{
"input": "98\n66 26 46 42 78 32 76 42 26 82 8 12 4 10 24 26 64 44 100 46 94 64 30 18 88 28 8 66 30 82 82 28 74 52 62 80 80 60 94 86 64 32 44 88 92 20 12 74 94 28 34 58 4 22 16 10 94 76 82 58 40 66 22 6 30 32 92 54 16 76 74 98 18 48 48 30 92 2 16 42 84 74 30 60 64 52 50 26 16 86 58 96 79 60 20 62 82 94",
"output": "93"
},
{
"input": "95\n9 31 27 93 17 77 75 9 9 53 89 39 51 99 5 1 11 39 27 49 91 17 27 79 81 71 37 75 35 13 93 4 99 55 85 11 23 57 5 43 5 61 15 35 23 91 3 81 99 85 43 37 39 27 5 67 7 33 75 59 13 71 51 27 15 93 51 63 91 53 43 99 25 47 17 71 81 15 53 31 59 83 41 23 73 25 91 91 13 17 25 13 55 57 29",
"output": "32"
},
{
"input": "100\n91 89 81 45 53 1 41 3 77 93 55 97 55 97 87 27 69 95 73 41 93 21 75 35 53 56 5 51 87 59 91 67 33 3 99 45 83 17 97 47 75 97 7 89 17 99 23 23 81 25 55 97 27 35 69 5 77 35 93 19 55 59 37 21 31 37 49 41 91 53 73 69 7 37 37 39 17 71 7 97 55 17 47 23 15 73 31 39 57 37 9 5 61 41 65 57 77 79 35 47",
"output": "26"
},
{
"input": "99\n38 56 58 98 80 54 26 90 14 16 78 92 52 74 40 30 84 14 44 80 16 90 98 68 26 24 78 72 42 16 84 40 14 44 2 52 50 2 12 96 58 66 8 80 44 52 34 34 72 98 74 4 66 74 56 21 8 38 76 40 10 22 48 32 98 34 12 62 80 68 64 82 22 78 58 74 20 22 48 56 12 38 32 72 6 16 74 24 94 84 26 38 18 24 76 78 98 94 72",
"output": "56"
},
{
"input": "100\n44 40 6 40 56 90 98 8 36 64 76 86 98 76 36 92 6 30 98 70 24 98 96 60 24 82 88 68 86 96 34 42 58 10 40 26 56 10 88 58 70 32 24 28 14 82 52 12 62 36 70 60 52 34 74 30 78 76 10 16 42 94 66 90 70 38 52 12 58 22 98 96 14 68 24 70 4 30 84 98 8 50 14 52 66 34 100 10 28 100 56 48 38 12 38 14 91 80 70 86",
"output": "97"
},
{
"input": "100\n96 62 64 20 90 46 56 90 68 36 30 56 70 28 16 64 94 34 6 32 34 50 94 22 90 32 40 2 72 10 88 38 28 92 20 26 56 80 4 100 100 90 16 74 74 84 8 2 30 20 80 32 16 46 92 56 42 12 96 64 64 42 64 58 50 42 74 28 2 4 36 32 70 50 54 92 70 16 45 76 28 16 18 50 48 2 62 94 4 12 52 52 4 100 70 60 82 62 98 42",
"output": "79"
},
{
"input": "99\n14 26 34 68 90 58 50 36 8 16 18 6 2 74 54 20 36 84 32 50 52 2 26 24 3 64 20 10 54 26 66 44 28 72 4 96 78 90 96 86 68 28 94 4 12 46 100 32 22 36 84 32 44 94 76 94 4 52 12 30 74 4 34 64 58 72 44 16 70 56 54 8 14 74 8 6 58 62 98 54 14 40 80 20 36 72 28 98 20 58 40 52 90 64 22 48 54 70 52",
"output": "25"
},
{
"input": "95\n82 86 30 78 6 46 80 66 74 72 16 24 18 52 52 38 60 36 86 26 62 28 22 46 96 26 94 84 20 46 66 88 76 32 12 86 74 18 34 88 4 48 94 6 58 6 100 82 4 24 88 32 54 98 34 48 6 76 42 88 42 28 100 4 22 2 10 66 82 54 98 20 60 66 38 98 32 47 86 58 6 100 12 46 2 42 8 84 78 28 24 70 34 28 86",
"output": "78"
},
{
"input": "90\n40 50 8 42 76 24 58 42 26 68 20 48 54 12 34 84 14 36 32 88 6 50 96 56 20 92 48 16 40 34 96 46 20 84 30 50 20 98 8 44 96 42 8 76 70 38 84 30 40 88 84 72 2 22 52 58 16 62 100 66 80 40 50 32 14 62 88 72 22 99 76 50 84 82 8 82 98 46 26 40 2 98 18 78 30 72 70 18 34 68",
"output": "70"
},
{
"input": "80\n81 43 87 1 55 43 53 61 27 19 43 13 89 9 33 83 75 55 97 71 91 37 95 5 21 69 81 93 95 69 31 83 55 7 97 7 79 57 8 61 27 85 49 1 15 97 63 79 29 73 41 85 5 41 31 93 67 11 63 59 15 99 91 77 43 69 23 23 81 73 19 1 67 51 1 75 99 67 3 81",
"output": "39"
},
{
"input": "98\n13 83 61 27 35 1 85 95 97 73 95 65 73 45 5 43 27 83 91 19 11 3 85 59 9 39 69 23 45 7 51 85 5 71 5 95 1 51 75 3 43 57 3 11 33 71 21 99 47 41 87 39 71 87 31 85 91 49 83 5 49 85 47 91 55 99 33 23 31 23 23 73 29 77 55 31 25 5 81 49 91 15 15 39 87 5 9 40 69 47 29 33 11 21 49 79 51 83",
"output": "88"
},
{
"input": "3\n100 100 1",
"output": "3"
}
] | 1,665,474,692 | 2,147,483,647 | Python 3 | OK | TESTS | 32 | 62 | 0 | # -*- coding: utf-8 -*-
"""
Created on Tue Oct 11 15:33:18 2022
@author: 86158
"""
n = int(input())
list0 = [int(i) for i in input().split()]
list1 = []
for i in range(n):
list1.append(list0[i]%2)
a = list1.count(0)
if a == 1:
print(list1.index(0)+1)
else:
print(list1.index(1)+1) | Title: IQ test
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Bob is preparing to pass IQ test. The most frequent task in this test is to find out which one of the given *n* numbers differs from the others. Bob observed that one number usually differs from the others in evenness. Help Bob — to check his answers, he needs a program that among the given *n* numbers finds one that is different in evenness.
Input Specification:
The first line contains integer *n* (3<=≤<=*n*<=≤<=100) — amount of numbers in the task. The second line contains *n* space-separated natural numbers, not exceeding 100. It is guaranteed, that exactly one of these numbers differs from the others in evenness.
Output Specification:
Output index of number that differs from the others in evenness. Numbers are numbered from 1 in the input order.
Demo Input:
['5\n2 4 7 8 10\n', '4\n1 2 1 1\n']
Demo Output:
['3\n', '2\n']
Note:
none | ```python
# -*- coding: utf-8 -*-
"""
Created on Tue Oct 11 15:33:18 2022
@author: 86158
"""
n = int(input())
list0 = [int(i) for i in input().split()]
list1 = []
for i in range(n):
list1.append(list0[i]%2)
a = list1.count(0)
if a == 1:
print(list1.index(0)+1)
else:
print(list1.index(1)+1)
``` | 3.9845 |
622 | F | The Sum of the k-th Powers | PROGRAMMING | 2,600 | [
"math"
] | null | null | There are well-known formulas: , , . Also mathematicians found similar formulas for higher degrees.
Find the value of the sum modulo 109<=+<=7 (so you should find the remainder after dividing the answer by the value 109<=+<=7). | The only line contains two integers *n*,<=*k* (1<=≤<=*n*<=≤<=109,<=0<=≤<=*k*<=≤<=106). | Print the only integer *a* — the remainder after dividing the value of the sum by the value 109<=+<=7. | [
"4 1\n",
"4 2\n",
"4 3\n",
"4 0\n"
] | [
"10\n",
"30\n",
"100\n",
"4\n"
] | none | 0 | [
{
"input": "4 1",
"output": "10"
},
{
"input": "4 2",
"output": "30"
},
{
"input": "4 3",
"output": "100"
},
{
"input": "4 0",
"output": "4"
},
{
"input": "10 0",
"output": "10"
},
{
"input": "1 1",
"output": "1"
},
{
"input": "1 0",
"output": "1"
},
{
"input": "1 1000000",
"output": "1"
},
{
"input": "1000000000 0",
"output": "1000000000"
},
{
"input": "100 100",
"output": "568830579"
},
{
"input": "10000 100",
"output": "352711099"
},
{
"input": "100 10000",
"output": "859998022"
},
{
"input": "1000000000 1000000",
"output": "617381606"
},
{
"input": "1000000 1000000",
"output": "997878755"
},
{
"input": "999999 1000000",
"output": "504760730"
},
{
"input": "77674473 447444",
"output": "838207299"
},
{
"input": "333312494 795258",
"output": "393290476"
},
{
"input": "761637147 673329",
"output": "223778667"
},
{
"input": "335185991 514401",
"output": "412595240"
},
{
"input": "203702132 355473",
"output": "229710810"
},
{
"input": "1000000000 999935",
"output": "729344740"
}
] | 1,643,013,291 | 2,147,483,647 | PyPy 3 | TIME_LIMIT_EXCEEDED | TESTS | 12 | 2,000 | 10,752,000 | import sys
input = sys.stdin.readline
n, k = [int(i) for i in input().split()]
N = 10**9 + 7
y = [0]
for i in range(1, k + 2):
y.append((y[-1] + pow(i, k, N)) % N)
if n < k + 2:
print(y[n] % N)
else:
t = 1
for j in range(1, k+2):
t = (t * (n - j)) % N
t2 = 1
for j in range(1, k+2):
t2 = (t2 * (N - j)) % N
t = (t * pow(t2, N-2, N)) % N
ans = 0
for i in range(k + 2):
ans = (ans + t * y[i]) % N
x = ((n - i - 1) * (i + 1)) % N
t = (t * (n - i) * (i - k - 1) * pow(x, N - 2, N)) % N
print(ans % N)
| Title: The Sum of the k-th Powers
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
There are well-known formulas: , , . Also mathematicians found similar formulas for higher degrees.
Find the value of the sum modulo 109<=+<=7 (so you should find the remainder after dividing the answer by the value 109<=+<=7).
Input Specification:
The only line contains two integers *n*,<=*k* (1<=≤<=*n*<=≤<=109,<=0<=≤<=*k*<=≤<=106).
Output Specification:
Print the only integer *a* — the remainder after dividing the value of the sum by the value 109<=+<=7.
Demo Input:
['4 1\n', '4 2\n', '4 3\n', '4 0\n']
Demo Output:
['10\n', '30\n', '100\n', '4\n']
Note:
none | ```python
import sys
input = sys.stdin.readline
n, k = [int(i) for i in input().split()]
N = 10**9 + 7
y = [0]
for i in range(1, k + 2):
y.append((y[-1] + pow(i, k, N)) % N)
if n < k + 2:
print(y[n] % N)
else:
t = 1
for j in range(1, k+2):
t = (t * (n - j)) % N
t2 = 1
for j in range(1, k+2):
t2 = (t2 * (N - j)) % N
t = (t * pow(t2, N-2, N)) % N
ans = 0
for i in range(k + 2):
ans = (ans + t * y[i]) % N
x = ((n - i - 1) * (i + 1)) % N
t = (t * (n - i) * (i - k - 1) * pow(x, N - 2, N)) % N
print(ans % N)
``` | 0 | |
652 | C | Foe Pairs | PROGRAMMING | 1,800 | [
"combinatorics",
"sortings",
"two pointers"
] | null | null | You are given a permutation *p* of length *n*. Also you are given *m* foe pairs (*a**i*,<=*b**i*) (1<=≤<=*a**i*,<=*b**i*<=≤<=*n*,<=*a**i*<=≠<=*b**i*).
Your task is to count the number of different intervals (*x*,<=*y*) (1<=≤<=*x*<=≤<=*y*<=≤<=*n*) that do not contain any foe pairs. So you shouldn't count intervals (*x*,<=*y*) that contain at least one foe pair in it (the positions and order of the values from the foe pair are not important).
Consider some example: *p*<==<=[1,<=3,<=2,<=4] and foe pairs are {(3,<=2),<=(4,<=2)}. The interval (1,<=3) is incorrect because it contains a foe pair (3,<=2). The interval (1,<=4) is also incorrect because it contains two foe pairs (3,<=2) and (4,<=2). But the interval (1,<=2) is correct because it doesn't contain any foe pair. | The first line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=3·105) — the length of the permutation *p* and the number of foe pairs.
The second line contains *n* distinct integers *p**i* (1<=≤<=*p**i*<=≤<=*n*) — the elements of the permutation *p*.
Each of the next *m* lines contains two integers (*a**i*,<=*b**i*) (1<=≤<=*a**i*,<=*b**i*<=≤<=*n*,<=*a**i*<=≠<=*b**i*) — the *i*-th foe pair. Note a foe pair can appear multiple times in the given list. | Print the only integer *c* — the number of different intervals (*x*,<=*y*) that does not contain any foe pairs.
Note that the answer can be too large, so you should use 64-bit integer type to store it. In C++ you can use the long long integer type and in Java you can use long integer type. | [
"4 2\n1 3 2 4\n3 2\n2 4\n",
"9 5\n9 7 2 3 1 4 6 5 8\n1 6\n4 5\n2 7\n7 2\n2 7\n"
] | [
"5\n",
"20\n"
] | In the first example the intervals from the answer are (1, 1), (1, 2), (2, 2), (3, 3) and (4, 4). | 0 | [
{
"input": "4 2\n1 3 2 4\n3 2\n2 4",
"output": "5"
},
{
"input": "9 5\n9 7 2 3 1 4 6 5 8\n1 6\n4 5\n2 7\n7 2\n2 7",
"output": "20"
},
{
"input": "2 1\n1 2\n1 2",
"output": "2"
},
{
"input": "10 3\n4 10 5 1 6 8 9 2 3 7\n10 5\n2 10\n4 1",
"output": "39"
},
{
"input": "50 10\n41 15 17 1 5 31 7 38 30 39 43 35 2 26 20 42 48 25 19 32 50 4 8 10 44 12 9 18 13 36 28 6 27 23 40 24 3 14 29 11 49 47 45 46 34 21 37 16 22 33\n13 48\n24 12\n2 32\n36 7\n19 20\n9 45\n35 47\n10 16\n4 49\n46 2",
"output": "608"
},
{
"input": "100 10\n19 55 91 50 31 23 60 84 38 1 22 51 27 76 28 98 11 44 61 63 15 93 52 3 66 16 53 36 18 62 35 85 78 37 73 64 87 74 46 26 82 69 49 33 83 89 56 67 71 25 39 94 96 17 21 6 47 68 34 42 57 81 13 10 54 2 48 80 20 77 4 5 59 30 90 95 45 75 8 88 24 41 40 14 97 32 7 9 65 70 100 99 72 58 92 29 79 12 86 43\n58 26\n10 52\n26 75\n51 9\n49 33\n55 6\n52 62\n82 53\n90 24\n12 7",
"output": "1589"
},
{
"input": "3 8\n1 2 3\n1 2\n1 2\n1 2\n1 2\n1 2\n1 2\n1 3\n2 3",
"output": "3"
},
{
"input": "3 4\n1 2 3\n1 3\n1 2\n1 3\n2 3",
"output": "3"
}
] | 1,633,946,962 | 2,147,483,647 | Python 3 | OK | TESTS | 24 | 670 | 28,774,400 | from sys import stdin
def main():
n, m = map(int, input().split())
pos, left = [0] * n, [0] * n
for i, a in enumerate(map(int, input().split())):
pos[a - 1] = i
for s in stdin.read().splitlines():
l, r = map(int, s.split())
l, r = pos[l - 1], pos[r - 1]
if l > r:
l, r = r, l
if l >= left[r]:
left[r] = l + 1
ans = l = 0
for i in range(n):
if left[i] > l:
l = left[i]
ans += i - l + 1
print(ans)
main() | Title: Foe Pairs
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
You are given a permutation *p* of length *n*. Also you are given *m* foe pairs (*a**i*,<=*b**i*) (1<=≤<=*a**i*,<=*b**i*<=≤<=*n*,<=*a**i*<=≠<=*b**i*).
Your task is to count the number of different intervals (*x*,<=*y*) (1<=≤<=*x*<=≤<=*y*<=≤<=*n*) that do not contain any foe pairs. So you shouldn't count intervals (*x*,<=*y*) that contain at least one foe pair in it (the positions and order of the values from the foe pair are not important).
Consider some example: *p*<==<=[1,<=3,<=2,<=4] and foe pairs are {(3,<=2),<=(4,<=2)}. The interval (1,<=3) is incorrect because it contains a foe pair (3,<=2). The interval (1,<=4) is also incorrect because it contains two foe pairs (3,<=2) and (4,<=2). But the interval (1,<=2) is correct because it doesn't contain any foe pair.
Input Specification:
The first line contains two integers *n* and *m* (1<=≤<=*n*,<=*m*<=≤<=3·105) — the length of the permutation *p* and the number of foe pairs.
The second line contains *n* distinct integers *p**i* (1<=≤<=*p**i*<=≤<=*n*) — the elements of the permutation *p*.
Each of the next *m* lines contains two integers (*a**i*,<=*b**i*) (1<=≤<=*a**i*,<=*b**i*<=≤<=*n*,<=*a**i*<=≠<=*b**i*) — the *i*-th foe pair. Note a foe pair can appear multiple times in the given list.
Output Specification:
Print the only integer *c* — the number of different intervals (*x*,<=*y*) that does not contain any foe pairs.
Note that the answer can be too large, so you should use 64-bit integer type to store it. In C++ you can use the long long integer type and in Java you can use long integer type.
Demo Input:
['4 2\n1 3 2 4\n3 2\n2 4\n', '9 5\n9 7 2 3 1 4 6 5 8\n1 6\n4 5\n2 7\n7 2\n2 7\n']
Demo Output:
['5\n', '20\n']
Note:
In the first example the intervals from the answer are (1, 1), (1, 2), (2, 2), (3, 3) and (4, 4). | ```python
from sys import stdin
def main():
n, m = map(int, input().split())
pos, left = [0] * n, [0] * n
for i, a in enumerate(map(int, input().split())):
pos[a - 1] = i
for s in stdin.read().splitlines():
l, r = map(int, s.split())
l, r = pos[l - 1], pos[r - 1]
if l > r:
l, r = r, l
if l >= left[r]:
left[r] = l + 1
ans = l = 0
for i in range(n):
if left[i] > l:
l = left[i]
ans += i - l + 1
print(ans)
main()
``` | 3 | |
496 | D | Tennis Game | PROGRAMMING | 1,900 | [
"binary search"
] | null | null | Petya and Gena love playing table tennis. A single match is played according to the following rules: a match consists of multiple sets, each set consists of multiple serves. Each serve is won by one of the players, this player scores one point. As soon as one of the players scores *t* points, he wins the set; then the next set starts and scores of both players are being set to 0. As soon as one of the players wins the total of *s* sets, he wins the match and the match is over. Here *s* and *t* are some positive integer numbers.
To spice it up, Petya and Gena choose new numbers *s* and *t* before every match. Besides, for the sake of history they keep a record of each match: that is, for each serve they write down the winner. Serve winners are recorded in the chronological order. In a record the set is over as soon as one of the players scores *t* points and the match is over as soon as one of the players wins *s* sets.
Petya and Gena have found a record of an old match. Unfortunately, the sequence of serves in the record isn't divided into sets and numbers *s* and *t* for the given match are also lost. The players now wonder what values of *s* and *t* might be. Can you determine all the possible options? | The first line contains a single integer *n* — the length of the sequence of games (1<=≤<=*n*<=≤<=105).
The second line contains *n* space-separated integers *a**i*. If *a**i*<==<=1, then the *i*-th serve was won by Petya, if *a**i*<==<=2, then the *i*-th serve was won by Gena.
It is not guaranteed that at least one option for numbers *s* and *t* corresponds to the given record. | In the first line print a single number *k* — the number of options for numbers *s* and *t*.
In each of the following *k* lines print two integers *s**i* and *t**i* — the option for numbers *s* and *t*. Print the options in the order of increasing *s**i*, and for equal *s**i* — in the order of increasing *t**i*. | [
"5\n1 2 1 2 1\n",
"4\n1 1 1 1\n",
"4\n1 2 1 2\n",
"8\n2 1 2 1 1 1 1 1\n"
] | [
"2\n1 3\n3 1\n",
"3\n1 4\n2 2\n4 1\n",
"0\n",
"3\n1 6\n2 3\n6 1\n"
] | none | 2,250 | [
{
"input": "5\n1 2 1 2 1",
"output": "2\n1 3\n3 1"
},
{
"input": "4\n1 1 1 1",
"output": "3\n1 4\n2 2\n4 1"
},
{
"input": "4\n1 2 1 2",
"output": "0"
},
{
"input": "8\n2 1 2 1 1 1 1 1",
"output": "3\n1 6\n2 3\n6 1"
},
{
"input": "14\n2 1 2 1 1 1 1 2 1 1 2 1 2 1",
"output": "3\n1 9\n3 3\n9 1"
},
{
"input": "10\n1 1 2 2 1 1 2 2 1 1",
"output": "4\n1 6\n2 3\n3 2\n6 1"
},
{
"input": "20\n1 1 2 2 2 2 2 2 2 2 2 2 1 2 2 1 2 2 2 1",
"output": "0"
},
{
"input": "186\n2 1 2 1 1 1 1 1 2 1 1 2 2 2 1 1 2 2 1 1 1 2 1 1 2 2 1 1 1 2 2 1 1 1 1 1 2 1 1 1 2 1 2 1 1 2 1 1 1 2 2 2 2 2 2 2 1 2 1 2 1 1 2 1 2 2 1 1 1 1 1 2 2 1 2 2 1 2 2 1 1 1 2 2 1 1 2 2 1 2 2 1 2 2 2 2 2 1 1 1 1 2 1 1 2 2 2 2 2 2 1 1 1 1 1 2 1 1 2 2 1 2 2 1 1 1 1 1 2 2 1 1 2 2 1 2 2 2 1 2 1 2 1 1 2 1 2 2 2 2 1 2 1 2 2 1 2 1 1 1 1 1 2 1 1 2 2 1 1 1 2 2 2 1 2 2 1 1 2 1 1 1 1 2 1 1",
"output": "8\n1 100\n2 50\n6 11\n8 8\n19 4\n25 3\n40 2\n100 1"
},
{
"input": "82\n1 1 1 2 2 2 2 1 1 1 2 2 2 2 1 1 1 2 2 2 1 1 1 1 2 2 2 1 1 1 1 2 2 2 2 1 1 1 1 2 2 2 1 1 1 2 2 2 2 1 1 1 1 2 2 2 1 1 1 2 2 2 1 1 1 2 2 2 2 1 1 1 2 2 2 1 1 1 1 2 2 2",
"output": "0"
},
{
"input": "83\n1 1 1 1 1 1 2 2 2 2 2 2 1 1 1 1 1 1 2 2 2 2 2 2 2 1 1 1 1 1 1 1 2 2 2 2 2 2 1 1 1 1 1 1 2 2 2 2 2 2 2 1 1 1 1 1 1 1 2 2 2 2 2 2 1 1 1 1 1 1 2 2 2 2 2 2 1 1 1 1 1 1 1",
"output": "5\n1 45\n3 10\n3 15\n4 7\n45 1"
},
{
"input": "1\n1",
"output": "1\n1 1"
},
{
"input": "1\n2",
"output": "1\n1 1"
}
] | 1,594,109,461 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 0 | 77 | 6,963,200 | totalGames = int(input())
points = input().split()
for minSetsToWin in range(1, totalGames+1):
minPointsToWin = 1
while(minPointsToWin * minSetsToWin <= totalGames):
playerOnePoints, playerTwoPoints = 0, 0
playerOneSets, playerTwoSets = 0, 0
for point in points:
if(point == '1'):
playerOnePoints += 1
if(playerOnePoints == minPointsToWin):
playerOneSets += 1
playerOnePoints, playerTwoPoints = 0, 0
else:
playerTwoPoints += 1
if(playerTwoPoints == minPointsToWin):
playerTwoSets += 1
playerOnePoints, playerTwoPoints = 0, 0
if(playerTwoSets > minSetsToWin or playerOneSets > minSetsToWin):
minPointsToWin += 1
continue
elif(playerTwoPoints == 0 and playerOnePoints == 0 and playerOneSets == minSetsToWin or
playerTwoSets == minSetsToWin):
print(minSetsToWin, minPointsToWin)
minPointsToWin += 1 | Title: Tennis Game
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Petya and Gena love playing table tennis. A single match is played according to the following rules: a match consists of multiple sets, each set consists of multiple serves. Each serve is won by one of the players, this player scores one point. As soon as one of the players scores *t* points, he wins the set; then the next set starts and scores of both players are being set to 0. As soon as one of the players wins the total of *s* sets, he wins the match and the match is over. Here *s* and *t* are some positive integer numbers.
To spice it up, Petya and Gena choose new numbers *s* and *t* before every match. Besides, for the sake of history they keep a record of each match: that is, for each serve they write down the winner. Serve winners are recorded in the chronological order. In a record the set is over as soon as one of the players scores *t* points and the match is over as soon as one of the players wins *s* sets.
Petya and Gena have found a record of an old match. Unfortunately, the sequence of serves in the record isn't divided into sets and numbers *s* and *t* for the given match are also lost. The players now wonder what values of *s* and *t* might be. Can you determine all the possible options?
Input Specification:
The first line contains a single integer *n* — the length of the sequence of games (1<=≤<=*n*<=≤<=105).
The second line contains *n* space-separated integers *a**i*. If *a**i*<==<=1, then the *i*-th serve was won by Petya, if *a**i*<==<=2, then the *i*-th serve was won by Gena.
It is not guaranteed that at least one option for numbers *s* and *t* corresponds to the given record.
Output Specification:
In the first line print a single number *k* — the number of options for numbers *s* and *t*.
In each of the following *k* lines print two integers *s**i* and *t**i* — the option for numbers *s* and *t*. Print the options in the order of increasing *s**i*, and for equal *s**i* — in the order of increasing *t**i*.
Demo Input:
['5\n1 2 1 2 1\n', '4\n1 1 1 1\n', '4\n1 2 1 2\n', '8\n2 1 2 1 1 1 1 1\n']
Demo Output:
['2\n1 3\n3 1\n', '3\n1 4\n2 2\n4 1\n', '0\n', '3\n1 6\n2 3\n6 1\n']
Note:
none | ```python
totalGames = int(input())
points = input().split()
for minSetsToWin in range(1, totalGames+1):
minPointsToWin = 1
while(minPointsToWin * minSetsToWin <= totalGames):
playerOnePoints, playerTwoPoints = 0, 0
playerOneSets, playerTwoSets = 0, 0
for point in points:
if(point == '1'):
playerOnePoints += 1
if(playerOnePoints == minPointsToWin):
playerOneSets += 1
playerOnePoints, playerTwoPoints = 0, 0
else:
playerTwoPoints += 1
if(playerTwoPoints == minPointsToWin):
playerTwoSets += 1
playerOnePoints, playerTwoPoints = 0, 0
if(playerTwoSets > minSetsToWin or playerOneSets > minSetsToWin):
minPointsToWin += 1
continue
elif(playerTwoPoints == 0 and playerOnePoints == 0 and playerOneSets == minSetsToWin or
playerTwoSets == minSetsToWin):
print(minSetsToWin, minPointsToWin)
minPointsToWin += 1
``` | 0 | |
61 | A | Ultra-Fast Mathematician | PROGRAMMING | 800 | [
"implementation"
] | A. Ultra-Fast Mathematician | 2 | 256 | Shapur was an extremely gifted student. He was great at everything including Combinatorics, Algebra, Number Theory, Geometry, Calculus, etc. He was not only smart but extraordinarily fast! He could manage to sum 1018 numbers in a single second.
One day in 230 AD Shapur was trying to find out if any one can possibly do calculations faster than him. As a result he made a very great contest and asked every one to come and take part.
In his contest he gave the contestants many different pairs of numbers. Each number is made from digits 0 or 1. The contestants should write a new number corresponding to the given pair of numbers. The rule is simple: The *i*-th digit of the answer is 1 if and only if the *i*-th digit of the two given numbers differ. In the other case the *i*-th digit of the answer is 0.
Shapur made many numbers and first tried his own speed. He saw that he can perform these operations on numbers of length ∞ (length of a number is number of digits in it) in a glance! He always gives correct answers so he expects the contestants to give correct answers, too. He is a good fellow so he won't give anyone very big numbers and he always gives one person numbers of same length.
Now you are going to take part in Shapur's contest. See if you are faster and more accurate. | There are two lines in each input. Each of them contains a single number. It is guaranteed that the numbers are made from 0 and 1 only and that their length is same. The numbers may start with 0. The length of each number doesn't exceed 100. | Write one line — the corresponding answer. Do not omit the leading 0s. | [
"1010100\n0100101\n",
"000\n111\n",
"1110\n1010\n",
"01110\n01100\n"
] | [
"1110001\n",
"111\n",
"0100\n",
"00010\n"
] | none | 500 | [
{
"input": "1010100\n0100101",
"output": "1110001"
},
{
"input": "000\n111",
"output": "111"
},
{
"input": "1110\n1010",
"output": "0100"
},
{
"input": "01110\n01100",
"output": "00010"
},
{
"input": "011101\n000001",
"output": "011100"
},
{
"input": "10\n01",
"output": "11"
},
{
"input": "00111111\n11011101",
"output": "11100010"
},
{
"input": "011001100\n101001010",
"output": "110000110"
},
{
"input": "1100100001\n0110101100",
"output": "1010001101"
},
{
"input": "00011101010\n10010100101",
"output": "10001001111"
},
{
"input": "100000101101\n111010100011",
"output": "011010001110"
},
{
"input": "1000001111010\n1101100110001",
"output": "0101101001011"
},
{
"input": "01011111010111\n10001110111010",
"output": "11010001101101"
},
{
"input": "110010000111100\n001100101011010",
"output": "111110101100110"
},
{
"input": "0010010111110000\n0000000011010110",
"output": "0010010100100110"
},
{
"input": "00111110111110000\n01111100001100000",
"output": "01000010110010000"
},
{
"input": "101010101111010001\n001001111101111101",
"output": "100011010010101100"
},
{
"input": "0110010101111100000\n0011000101000000110",
"output": "0101010000111100110"
},
{
"input": "11110100011101010111\n00001000011011000000",
"output": "11111100000110010111"
},
{
"input": "101010101111101101001\n111010010010000011111",
"output": "010000111101101110110"
},
{
"input": "0000111111100011000010\n1110110110110000001010",
"output": "1110001001010011001000"
},
{
"input": "10010010101000110111000\n00101110100110111000111",
"output": "10111100001110001111111"
},
{
"input": "010010010010111100000111\n100100111111100011001110",
"output": "110110101101011111001001"
},
{
"input": "0101110100100111011010010\n0101100011010111001010001",
"output": "0000010111110000010000011"
},
{
"input": "10010010100011110111111011\n10000110101100000001000100",
"output": "00010100001111110110111111"
},
{
"input": "000001111000000100001000000\n011100111101111001110110001",
"output": "011101000101111101111110001"
},
{
"input": "0011110010001001011001011100\n0000101101000011101011001010",
"output": "0011011111001010110010010110"
},
{
"input": "11111000000000010011001101111\n11101110011001010100010000000",
"output": "00010110011001000111011101111"
},
{
"input": "011001110000110100001100101100\n001010000011110000001000101001",
"output": "010011110011000100000100000101"
},
{
"input": "1011111010001100011010110101111\n1011001110010000000101100010101",
"output": "0000110100011100011111010111010"
},
{
"input": "10111000100001000001010110000001\n10111000001100101011011001011000",
"output": "00000000101101101010001111011001"
},
{
"input": "000001010000100001000000011011100\n111111111001010100100001100000111",
"output": "111110101001110101100001111011011"
},
{
"input": "1101000000000010011011101100000110\n1110000001100010011010000011011110",
"output": "0011000001100000000001101111011000"
},
{
"input": "01011011000010100001100100011110001\n01011010111000001010010100001110000",
"output": "00000001111010101011110000010000001"
},
{
"input": "000011111000011001000110111100000100\n011011000110000111101011100111000111",
"output": "011000111110011110101101011011000011"
},
{
"input": "1001000010101110001000000011111110010\n0010001011010111000011101001010110000",
"output": "1011001001111001001011101010101000010"
},
{
"input": "00011101011001100101111111000000010101\n10010011011011001011111000000011101011",
"output": "10001110000010101110000111000011111110"
},
{
"input": "111011100110001001101111110010111001010\n111111101101111001110010000101101000100",
"output": "000100001011110000011101110111010001110"
},
{
"input": "1111001001101000001000000010010101001010\n0010111100111110001011000010111110111001",
"output": "1101110101010110000011000000101011110011"
},
{
"input": "00100101111000000101011111110010100011010\n11101110001010010101001000111110101010100",
"output": "11001011110010010000010111001100001001110"
},
{
"input": "101011001110110100101001000111010101101111\n100111100110101011010100111100111111010110",
"output": "001100101000011111111101111011101010111001"
},
{
"input": "1111100001100101000111101001001010011100001\n1000110011000011110010001011001110001000001",
"output": "0111010010100110110101100010000100010100000"
},
{
"input": "01100111011111010101000001101110000001110101\n10011001011111110000000101011001001101101100",
"output": "11111110000000100101000100110111001100011001"
},
{
"input": "110010100111000100100101100000011100000011001\n011001111011100110000110111001110110100111011",
"output": "101011011100100010100011011001101010100100010"
},
{
"input": "0001100111111011010110100100111000000111000110\n1100101011000000000001010010010111001100110001",
"output": "1101001100111011010111110110101111001011110111"
},
{
"input": "00000101110110110001110010100001110100000100000\n10010000110011110001101000111111101010011010001",
"output": "10010101000101000000011010011110011110011110001"
},
{
"input": "110000100101011100100011001111110011111110010001\n101011111001011100110110111101110011010110101100",
"output": "011011011100000000010101110010000000101000111101"
},
{
"input": "0101111101011111010101011101000011101100000000111\n0000101010110110001110101011011110111001010100100",
"output": "0101010111101001011011110110011101010101010100011"
},
{
"input": "11000100010101110011101000011111001010110111111100\n00001111000111001011111110000010101110111001000011",
"output": "11001011010010111000010110011101100100001110111111"
},
{
"input": "101000001101111101101111111000001110110010101101010\n010011100111100001100000010001100101000000111011011",
"output": "111011101010011100001111101001101011110010010110001"
},
{
"input": "0011111110010001010100010110111000110011001101010100\n0111000000100010101010000100101000000100101000111001",
"output": "0100111110110011111110010010010000110111100101101101"
},
{
"input": "11101010000110000011011010000001111101000111011111100\n10110011110001010100010110010010101001010111100100100",
"output": "01011001110111010111001100010011010100010000111011000"
},
{
"input": "011000100001000001101000010110100110011110100111111011\n111011001000001001110011001111011110111110110011011111",
"output": "100011101001001000011011011001111000100000010100100100"
},
{
"input": "0111010110010100000110111011010110100000000111110110000\n1011100100010001101100000100111111101001110010000100110",
"output": "1100110010000101101010111111101001001001110101110010110"
},
{
"input": "10101000100111000111010001011011011011110100110101100011\n11101111000000001100100011111000100100000110011001101110",
"output": "01000111100111001011110010100011111111110010101100001101"
},
{
"input": "000000111001010001000000110001001011100010011101010011011\n110001101000010010000101000100001111101001100100001010010",
"output": "110001010001000011000101110101000100001011111001011001001"
},
{
"input": "0101011100111010000111110010101101111111000000111100011100\n1011111110000010101110111001000011100000100111111111000111",
"output": "1110100010111000101001001011101110011111100111000011011011"
},
{
"input": "11001000001100100111100111100100101011000101001111001001101\n10111110100010000011010100110100100011101001100000001110110",
"output": "01110110101110100100110011010000001000101100101111000111011"
},
{
"input": "010111011011101000000110000110100110001110100001110110111011\n101011110011101011101101011111010100100001100111100100111011",
"output": "111100101000000011101011011001110010101111000110010010000000"
},
{
"input": "1001011110110110000100011001010110000100011010010111010101110\n1101111100001000010111110011010101111010010100000001000010111",
"output": "0100100010111110010011101010000011111110001110010110010111001"
},
{
"input": "10000010101111100111110101111000010100110111101101111111111010\n10110110101100101010011001011010100110111011101100011001100111",
"output": "00110100000011001101101100100010110010001100000001100110011101"
},
{
"input": "011111010011111000001010101001101001000010100010111110010100001\n011111001011000011111001000001111001010110001010111101000010011",
"output": "000000011000111011110011101000010000010100101000000011010110010"
},
{
"input": "1111000000110001011101000100100100001111011100001111001100011111\n1101100110000101100001100000001001011011111011010101000101001010",
"output": "0010100110110100111100100100101101010100100111011010001001010101"
},
{
"input": "01100000101010010011001110100110110010000110010011011001100100011\n10110110010110111100100111000111000110010000000101101110000010111",
"output": "11010110111100101111101001100001110100010110010110110111100110100"
},
{
"input": "001111111010000100001100001010011001111110011110010111110001100111\n110000101001011000100010101100100110000111100000001101001110010111",
"output": "111111010011011100101110100110111111111001111110011010111111110000"
},
{
"input": "1011101011101101011110101101011101011000010011100101010101000100110\n0001000001001111010111100100111101100000000001110001000110000000110",
"output": "1010101010100010001001001001100000111000010010010100010011000100000"
},
{
"input": "01000001011001010011011100010000100100110101111011011011110000001110\n01011110000110011011000000000011000111100001010000000011111001110000",
"output": "00011111011111001000011100010011100011010100101011011000001001111110"
},
{
"input": "110101010100110101000001111110110100010010000100111110010100110011100\n111010010111111011100110101011001011001110110111110100000110110100111",
"output": "001111000011001110100111010101111111011100110011001010010010000111011"
},
{
"input": "1001101011000001011111100110010010000011010001001111011100010100110001\n1111100111110101001111010001010000011001001001010110001111000000100101",
"output": "0110001100110100010000110111000010011010011000011001010011010100010100"
},
{
"input": "00000111110010110001110110001010010101000111011001111111100110011110010\n00010111110100000100110101000010010001100001100011100000001100010100010",
"output": "00010000000110110101000011001000000100100110111010011111101010001010000"
},
{
"input": "100101011100101101000011010001011001101110101110001100010001010111001110\n100001111100101011011111110000001111000111001011111110000010101110111001",
"output": "000100100000000110011100100001010110101001100101110010010011111001110111"
},
{
"input": "1101100001000111001101001011101000111000011110000001001101101001111011010\n0101011101010100011011010110101000010010110010011110101100000110110001000",
"output": "1000111100010011010110011101000000101010101100011111100001101111001010010"
},
{
"input": "01101101010011110101100001110101111011100010000010001101111000011110111111\n00101111001101001100111010000101110000100101101111100111101110010100011011",
"output": "01000010011110111001011011110000001011000111101101101010010110001010100100"
},
{
"input": "101100101100011001101111110110110010100110110010100001110010110011001101011\n000001011010101011110011111101001110000111000010001101000010010000010001101",
"output": "101101110110110010011100001011111100100001110000101100110000100011011100110"
},
{
"input": "0010001011001010001100000010010011110110011000100000000100110000101111001110\n1100110100111000110100001110111001011101001100001010100001010011100110110001",
"output": "1110111111110010111000001100101010101011010100101010100101100011001001111111"
},
{
"input": "00101101010000000101011001101011001100010001100000101011101110000001111001000\n10010110010111000000101101000011101011001010000011011101101011010000000011111",
"output": "10111011000111000101110100101000100111011011100011110110000101010001111010111"
},
{
"input": "111100000100100000101001100001001111001010001000001000000111010000010101101011\n001000100010100101111011111011010110101100001111011000010011011011100010010110",
"output": "110100100110000101010010011010011001100110000111010000010100001011110111111101"
},
{
"input": "0110001101100100001111110101101000100101010010101010011001101001001101110000000\n0111011000000010010111011110010000000001000110001000011001101000000001110100111",
"output": "0001010101100110011000101011111000100100010100100010000000000001001100000100111"
},
{
"input": "10001111111001000101001011110101111010100001011010101100111001010001010010001000\n10000111010010011110111000111010101100000011110001101111001000111010100000000001",
"output": "00001000101011011011110011001111010110100010101011000011110001101011110010001001"
},
{
"input": "100110001110110000100101001110000011110110000110000000100011110100110110011001101\n110001110101110000000100101001101011111100100100001001000110000001111100011110110",
"output": "010111111011000000100001100111101000001010100010001001100101110101001010000111011"
},
{
"input": "0000010100100000010110111100011111111010011101000000100000011001001101101100111010\n0100111110011101010110101011110110010111001111000110101100101110111100101000111111",
"output": "0100101010111101000000010111101001101101010010000110001100110111110001000100000101"
},
{
"input": "11000111001010100001110000001001011010010010110000001110100101000001010101100110111\n11001100100100100001101010110100000111100011101110011010110100001001000011011011010",
"output": "00001011101110000000011010111101011101110001011110010100010001001000010110111101101"
},
{
"input": "010110100010001000100010101001101010011010111110100001000100101000111011100010100001\n110000011111101101010011111000101010111010100001001100001001100101000000111000000000",
"output": "100110111101100101110001010001000000100000011111101101001101001101111011011010100001"
},
{
"input": "0000011110101110010101110110110101100001011001101010101001000010000010000000101001101\n1100111111011100000110000111101110011111100111110001011001000010011111100001001100011",
"output": "1100100001110010010011110001011011111110111110011011110000000000011101100001100101110"
},
{
"input": "10100000101101110001100010010010100101100011010010101000110011100000101010110010000000\n10001110011011010010111011011101101111000111110000111000011010010101001100000001010011",
"output": "00101110110110100011011001001111001010100100100010010000101001110101100110110011010011"
},
{
"input": "001110000011111101101010011111000101010111010100001001100001001100101000000111000000000\n111010000000000000101001110011001000111011001100101010011001000011101001001011110000011",
"output": "110100000011111101000011101100001101101100011000100011111000001111000001001100110000011"
},
{
"input": "1110111100111011010101011011001110001010010010110011110010011111000010011111010101100001\n1001010101011001001010100010101100000110111101011000100010101111111010111100001110010010",
"output": "0111101001100010011111111001100010001100101111101011010000110000111000100011011011110011"
},
{
"input": "11100010001100010011001100001100010011010001101110011110100101110010101101011101000111111\n01110000000110111010110100001010000101011110100101010011000110101110101101110111011110001",
"output": "10010010001010101001111000000110010110001111001011001101100011011100000000101010011001110"
},
{
"input": "001101011001100101101100110000111000101011001001100100000100101000100000110100010111111101\n101001111110000010111101111110001001111001111101111010000110111000100100110010010001011111",
"output": "100100100111100111010001001110110001010010110100011110000010010000000100000110000110100010"
},
{
"input": "1010110110010101000110010010110101011101010100011001101011000110000000100011100100011000000\n0011011111100010001111101101000111001011101110100000110111100100101111010110101111011100011",
"output": "1001101001110111001001111111110010010110111010111001011100100010101111110101001011000100011"
},
{
"input": "10010010000111010111011111110010100101100000001100011100111011100010000010010001011100001100\n00111010100010110010000100010111010001111110100100100011101000101111111111001101101100100100",
"output": "10101000100101100101011011100101110100011110101000111111010011001101111101011100110000101000"
},
{
"input": "010101110001010101100000010111010000000111110011001101100011001000000011001111110000000010100\n010010111011100101010101111110110000000111000100001101101001001000001100101110001010000100001",
"output": "000111001010110000110101101001100000000000110111000000001010000000001111100001111010000110101"
},
{
"input": "1100111110011001000111101001001011000110011010111111100010111111001100111111011101100111101011\n1100000011001000110100110111000001011001010111101000010010100011000001100100111101101000010110",
"output": "0000111101010001110011011110001010011111001101010111110000011100001101011011100000001111111101"
},
{
"input": "00011000100100110111100101100100000000010011110111110010101110110011100001010111010011110100101\n00011011111011111011100101100111100101001110010111000010000111000100100100000001110101111011011",
"output": "00000011011111001100000000000011100101011101100000110000101001110111000101010110100110001111110"
},
{
"input": "000101011001001100000111100010110101111011110101111101000110001101011010111110110011100100000001\n011000101010011111011000111000100000000011011000000001111110001000001111101010110000011100001111",
"output": "011101110011010011011111011010010101111000101101111100111000000101010101010100000011111000001110"
},
{
"input": "1000101001011010000100100100010010011101011001110101111011101111111110010101001101010001010101001\n0110110010011100011111011111110111000000010001110100001010111110101011010011111011111110000110000",
"output": "1110011011000110011011111011100101011101001000000001110001010001010101000110110110101111010011001"
},
{
"input": "01111010010101100111110111111011011010100001011101010000111100101101101110111011001100101011100111\n00001100110110100001111011000010001001001100000010111101000001111011100000010111010010000011000010",
"output": "01110110100011000110001100111001010011101101011111101101111101010110001110101100011110101000100101"
},
{
"input": "111101011101111000001011001101111010110111001101110100100011111011011101001101010101011010111000110\n101111100101101101001100110011000001111010011101110111110110101110011011110011111100001001110101101",
"output": "010010111000010101000111111110111011001101010000000011010101010101000110111110101001010011001101011"
},
{
"input": "1010000011010110011101001101110001110010000111011101110010110110111111001001110100101100010101010001\n0111101000111100101100000101111010100100001000011101010100110011100011010011010101000100101011100011",
"output": "1101101011101010110001001000001011010110001111000000100110000101011100011010100001101000111110110010"
},
{
"input": "0000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001\n1111111010111111101011111110101111111010111111101011111110101111111010111111101011111110101111111010",
"output": "1111111010111111101011111110101111111010111111101011111110101111111010111111101011111110101111111011"
},
{
"input": "0\n0",
"output": "0"
},
{
"input": "0\n1",
"output": "1"
}
] | 1,632,901,657 | 2,147,483,647 | Python 3 | OK | TESTS | 102 | 77 | 6,758,400 | a , b = input(), input()
bin_a, bin_b = int(a, 2), int(b, 2)
print(format(bin_a ^ bin_b, '0{}b'.format(len(a)))) | Title: Ultra-Fast Mathematician
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Shapur was an extremely gifted student. He was great at everything including Combinatorics, Algebra, Number Theory, Geometry, Calculus, etc. He was not only smart but extraordinarily fast! He could manage to sum 1018 numbers in a single second.
One day in 230 AD Shapur was trying to find out if any one can possibly do calculations faster than him. As a result he made a very great contest and asked every one to come and take part.
In his contest he gave the contestants many different pairs of numbers. Each number is made from digits 0 or 1. The contestants should write a new number corresponding to the given pair of numbers. The rule is simple: The *i*-th digit of the answer is 1 if and only if the *i*-th digit of the two given numbers differ. In the other case the *i*-th digit of the answer is 0.
Shapur made many numbers and first tried his own speed. He saw that he can perform these operations on numbers of length ∞ (length of a number is number of digits in it) in a glance! He always gives correct answers so he expects the contestants to give correct answers, too. He is a good fellow so he won't give anyone very big numbers and he always gives one person numbers of same length.
Now you are going to take part in Shapur's contest. See if you are faster and more accurate.
Input Specification:
There are two lines in each input. Each of them contains a single number. It is guaranteed that the numbers are made from 0 and 1 only and that their length is same. The numbers may start with 0. The length of each number doesn't exceed 100.
Output Specification:
Write one line — the corresponding answer. Do not omit the leading 0s.
Demo Input:
['1010100\n0100101\n', '000\n111\n', '1110\n1010\n', '01110\n01100\n']
Demo Output:
['1110001\n', '111\n', '0100\n', '00010\n']
Note:
none | ```python
a , b = input(), input()
bin_a, bin_b = int(a, 2), int(b, 2)
print(format(bin_a ^ bin_b, '0{}b'.format(len(a))))
``` | 3.968161 |
50 | A | Domino piling | PROGRAMMING | 800 | [
"greedy",
"math"
] | A. Domino piling | 2 | 256 | You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions. | In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16). | Output one number — the maximal number of dominoes, which can be placed. | [
"2 4\n",
"3 3\n"
] | [
"4\n",
"4\n"
] | none | 500 | [
{
"input": "2 4",
"output": "4"
},
{
"input": "3 3",
"output": "4"
},
{
"input": "1 5",
"output": "2"
},
{
"input": "1 6",
"output": "3"
},
{
"input": "1 15",
"output": "7"
},
{
"input": "1 16",
"output": "8"
},
{
"input": "2 5",
"output": "5"
},
{
"input": "2 6",
"output": "6"
},
{
"input": "2 7",
"output": "7"
},
{
"input": "2 14",
"output": "14"
},
{
"input": "2 15",
"output": "15"
},
{
"input": "1 4",
"output": "2"
},
{
"input": "2 16",
"output": "16"
},
{
"input": "3 5",
"output": "7"
},
{
"input": "3 6",
"output": "9"
},
{
"input": "3 10",
"output": "15"
},
{
"input": "3 14",
"output": "21"
},
{
"input": "3 15",
"output": "22"
},
{
"input": "3 16",
"output": "24"
},
{
"input": "5 7",
"output": "17"
},
{
"input": "16 16",
"output": "128"
},
{
"input": "15 16",
"output": "120"
},
{
"input": "2 3",
"output": "3"
},
{
"input": "15 15",
"output": "112"
},
{
"input": "14 16",
"output": "112"
},
{
"input": "11 13",
"output": "71"
},
{
"input": "5 16",
"output": "40"
},
{
"input": "8 15",
"output": "60"
},
{
"input": "2 2",
"output": "2"
},
{
"input": "3 4",
"output": "6"
},
{
"input": "4 4",
"output": "8"
},
{
"input": "1 1",
"output": "0"
},
{
"input": "1 2",
"output": "1"
},
{
"input": "1 3",
"output": "1"
},
{
"input": "14 15",
"output": "105"
}
] | 1,686,926,189 | 2,147,483,647 | Python 3 | OK | TESTS | 35 | 92 | 0 | a,b=map(int,input().split())
t=a*b
r=t%2
print((t-r)//2)
| Title: Domino piling
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
You are given a rectangular board of *M*<=×<=*N* squares. Also you are given an unlimited number of standard domino pieces of 2<=×<=1 squares. You are allowed to rotate the pieces. You are asked to place as many dominoes as possible on the board so as to meet the following conditions:
1. Each domino completely covers two squares.
2. No two dominoes overlap.
3. Each domino lies entirely inside the board. It is allowed to touch the edges of the board.
Find the maximum number of dominoes, which can be placed under these restrictions.
Input Specification:
In a single line you are given two integers *M* and *N* — board sizes in squares (1<=≤<=*M*<=≤<=*N*<=≤<=16).
Output Specification:
Output one number — the maximal number of dominoes, which can be placed.
Demo Input:
['2 4\n', '3 3\n']
Demo Output:
['4\n', '4\n']
Note:
none | ```python
a,b=map(int,input().split())
t=a*b
r=t%2
print((t-r)//2)
``` | 3.977 |
0 | none | none | none | 0 | [
"none"
] | null | null | Dreamoon loves summing up something for no reason. One day he obtains two integers *a* and *b* occasionally. He wants to calculate the sum of all nice integers. Positive integer *x* is called nice if and , where *k* is some integer number in range [1,<=*a*].
By we denote the quotient of integer division of *x* and *y*. By we denote the remainder of integer division of *x* and *y*. You can read more about these operations here: http://goo.gl/AcsXhT.
The answer may be large, so please print its remainder modulo 1<=000<=000<=007 (109<=+<=7). Can you compute it faster than Dreamoon? | The single line of the input contains two integers *a*, *b* (1<=≤<=*a*,<=*b*<=≤<=107). | Print a single integer representing the answer modulo 1<=000<=000<=007 (109<=+<=7). | [
"1 1\n",
"2 2\n"
] | [
"0\n",
"8\n"
] | For the first sample, there are no nice integers because <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/03b1dc6bae5180f8a2d8eb85789e8b393e585970.png" style="max-width: 100.0%;max-height: 100.0%;"/> is always zero.
For the second sample, the set of nice integers is {3, 5}. | 0 | [
{
"input": "1 1",
"output": "0"
},
{
"input": "2 2",
"output": "8"
},
{
"input": "4 1",
"output": "0"
},
{
"input": "4 2",
"output": "24"
},
{
"input": "4 3",
"output": "102"
},
{
"input": "4 4",
"output": "264"
},
{
"input": "3 4",
"output": "162"
},
{
"input": "2 4",
"output": "84"
},
{
"input": "1 4",
"output": "30"
},
{
"input": "1000 1000",
"output": "247750000"
},
{
"input": "10000000 10000000",
"output": "425362313"
},
{
"input": "10000000 9999999",
"output": "930564389"
},
{
"input": "2 10000000",
"output": "990423507"
},
{
"input": "10000000 2",
"output": "19300000"
},
{
"input": "9999999 2",
"output": "999300006"
},
{
"input": "9999999 9999999",
"output": "957764103"
},
{
"input": "10000000 10000",
"output": "723127969"
},
{
"input": "10000 10000000",
"output": "372369289"
},
{
"input": "2 9999999",
"output": "48573499"
},
{
"input": "123456 123456",
"output": "417111819"
},
{
"input": "6407688 3000816",
"output": "895399645"
},
{
"input": "9956532 1084240",
"output": "554368769"
},
{
"input": "3505377 9167664",
"output": "80435138"
},
{
"input": "7054221 7251088",
"output": "7849970"
},
{
"input": "346169 367216",
"output": "358144298"
},
{
"input": "3895014 8450640",
"output": "627604019"
},
{
"input": "861392 6200826",
"output": "180835815"
},
{
"input": "4410236 9316955",
"output": "602743722"
},
{
"input": "2926377 2367675",
"output": "395740917"
},
{
"input": "1507925 5483803",
"output": "727607740"
},
{
"input": "9832578 8599931",
"output": "428281878"
},
{
"input": "8348718 6683355",
"output": "275994807"
},
{
"input": "1897562 4766779",
"output": "148050609"
},
{
"input": "413703 2850203",
"output": "76966774"
},
{
"input": "8995251 5966331",
"output": "451718548"
},
{
"input": "7319903 9017051",
"output": "975259203"
},
{
"input": "9253578 1799941",
"output": "868664771"
},
{
"input": "7835126 9883365",
"output": "119844544"
},
{
"input": "6351267 7966789",
"output": "683811063"
},
{
"input": "9900111 1082917",
"output": "539539383"
},
{
"input": "1 10000000",
"output": "995024507"
},
{
"input": "123456 234567",
"output": "93010021"
},
{
"input": "888888 888888",
"output": "456888843"
},
{
"input": "1001 1500126",
"output": "45074025"
},
{
"input": "9243243 432434",
"output": "203891513"
},
{
"input": "3 10000000",
"output": "986197007"
},
{
"input": "4108931 211273",
"output": "142398939"
},
{
"input": "999999 92321",
"output": "286549418"
},
{
"input": "999999 999999",
"output": "691690639"
},
{
"input": "191919 123123",
"output": "358196438"
},
{
"input": "999999 1000000",
"output": "725921292"
},
{
"input": "31623 10000000",
"output": "382702377"
},
{
"input": "1000023 1000043",
"output": "175442768"
},
{
"input": "666666 666666",
"output": "869302791"
},
{
"input": "7672285 753250",
"output": "461773059"
},
{
"input": "1000000 1000000",
"output": "249917764"
},
{
"input": "6340794 6874449",
"output": "930977735"
},
{
"input": "9998486 9998486",
"output": "988877388"
},
{
"input": "9999997 9999998",
"output": "946983076"
}
] | 1,413,434,004 | 2,147,483,647 | Python 3 | WRONG_ANSWER | TESTS | 0 | 15 | 0 | n, m = (int(x) for x in input().split())
val = (n + 1) // 2 // -m * -m
print(val if val <= n else -1) | Title: none
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Dreamoon loves summing up something for no reason. One day he obtains two integers *a* and *b* occasionally. He wants to calculate the sum of all nice integers. Positive integer *x* is called nice if and , where *k* is some integer number in range [1,<=*a*].
By we denote the quotient of integer division of *x* and *y*. By we denote the remainder of integer division of *x* and *y*. You can read more about these operations here: http://goo.gl/AcsXhT.
The answer may be large, so please print its remainder modulo 1<=000<=000<=007 (109<=+<=7). Can you compute it faster than Dreamoon?
Input Specification:
The single line of the input contains two integers *a*, *b* (1<=≤<=*a*,<=*b*<=≤<=107).
Output Specification:
Print a single integer representing the answer modulo 1<=000<=000<=007 (109<=+<=7).
Demo Input:
['1 1\n', '2 2\n']
Demo Output:
['0\n', '8\n']
Note:
For the first sample, there are no nice integers because <img align="middle" class="tex-formula" src="https://espresso.codeforces.com/03b1dc6bae5180f8a2d8eb85789e8b393e585970.png" style="max-width: 100.0%;max-height: 100.0%;"/> is always zero.
For the second sample, the set of nice integers is {3, 5}. | ```python
n, m = (int(x) for x in input().split())
val = (n + 1) // 2 // -m * -m
print(val if val <= n else -1)
``` | 0 | |
349 | A | Cinema Line | PROGRAMMING | 1,100 | [
"greedy",
"implementation"
] | null | null | The new "Die Hard" movie has just been released! There are *n* people at the cinema box office standing in a huge line. Each of them has a single 100, 50 or 25 ruble bill. A "Die Hard" ticket costs 25 rubles. Can the booking clerk sell a ticket to each person and give the change if he initially has no money and sells the tickets strictly in the order people follow in the line? | The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of people in the line. The next line contains *n* integers, each of them equals 25, 50 or 100 — the values of the bills the people have. The numbers are given in the order from the beginning of the line (at the box office) to the end of the line. | Print "YES" (without the quotes) if the booking clerk can sell a ticket to each person and give the change. Otherwise print "NO". | [
"4\n25 25 50 50\n",
"2\n25 100\n",
"4\n50 50 25 25\n"
] | [
"YES\n",
"NO\n",
"NO\n"
] | none | 500 | [
{
"input": "4\n25 25 50 50",
"output": "YES"
},
{
"input": "2\n25 100",
"output": "NO"
},
{
"input": "4\n50 50 25 25",
"output": "NO"
},
{
"input": "3\n25 50 100",
"output": "NO"
},
{
"input": "10\n25 25 25 25 25 25 25 25 25 25",
"output": "YES"
},
{
"input": "10\n50 50 50 50 50 50 50 50 50 50",
"output": "NO"
},
{
"input": "10\n100 100 100 100 100 100 100 100 100 100",
"output": "NO"
},
{
"input": "7\n25 25 25 25 50 100 50",
"output": "YES"
},
{
"input": "2\n25 25",
"output": "YES"
},
{
"input": "3\n50 100 100",
"output": "NO"
},
{
"input": "3\n25 50 50",
"output": "NO"
},
{
"input": "2\n50 25",
"output": "NO"
},
{
"input": "14\n25 25 25 25 25 25 25 50 50 50 100 100 100 100",
"output": "NO"
},
{
"input": "5\n25 25 25 100 100",
"output": "NO"
},
{
"input": "7\n25 50 25 50 25 50 100",
"output": "NO"
},
{
"input": "5\n25 50 25 50 100",
"output": "NO"
},
{
"input": "5\n25 25 50 50 50",
"output": "NO"
},
{
"input": "5\n25 25 50 100 50",
"output": "NO"
},
{
"input": "5\n25 25 50 50 100",
"output": "NO"
},
{
"input": "1\n50",
"output": "NO"
}
] | 1,606,852,369 | 2,147,483,647 | PyPy 3 | WRONG_ANSWER | TESTS | 8 | 342 | 6,656,000 | input()
h25 = 0
h50 = 0
yes = True
for x in input().split():
x = int(x)
if x==25:
h25 += 1
elif x==50:
if h25 > 0:
h25 -= 1
h50 += 1
else:
yes = False
else:
if h25 >= 2 and h50 > 0:
h25 -= 2
h50 -= 1
continue
if h25 >= 3:
h25 -= 3
continue
yes = False
print("YES" if yes else "NO") | Title: Cinema Line
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
The new "Die Hard" movie has just been released! There are *n* people at the cinema box office standing in a huge line. Each of them has a single 100, 50 or 25 ruble bill. A "Die Hard" ticket costs 25 rubles. Can the booking clerk sell a ticket to each person and give the change if he initially has no money and sells the tickets strictly in the order people follow in the line?
Input Specification:
The first line contains integer *n* (1<=≤<=*n*<=≤<=105) — the number of people in the line. The next line contains *n* integers, each of them equals 25, 50 or 100 — the values of the bills the people have. The numbers are given in the order from the beginning of the line (at the box office) to the end of the line.
Output Specification:
Print "YES" (without the quotes) if the booking clerk can sell a ticket to each person and give the change. Otherwise print "NO".
Demo Input:
['4\n25 25 50 50\n', '2\n25 100\n', '4\n50 50 25 25\n']
Demo Output:
['YES\n', 'NO\n', 'NO\n']
Note:
none | ```python
input()
h25 = 0
h50 = 0
yes = True
for x in input().split():
x = int(x)
if x==25:
h25 += 1
elif x==50:
if h25 > 0:
h25 -= 1
h50 += 1
else:
yes = False
else:
if h25 >= 2 and h50 > 0:
h25 -= 2
h50 -= 1
continue
if h25 >= 3:
h25 -= 3
continue
yes = False
print("YES" if yes else "NO")
``` | 0 | |
916 | A | Jamie and Alarm Snooze | PROGRAMMING | 900 | [
"brute force",
"implementation",
"math"
] | null | null | Jamie loves sleeping. One day, he decides that he needs to wake up at exactly *hh*:<=*mm*. However, he hates waking up, so he wants to make waking up less painful by setting the alarm at a lucky time. He will then press the snooze button every *x* minutes until *hh*:<=*mm* is reached, and only then he will wake up. He wants to know what is the smallest number of times he needs to press the snooze button.
A time is considered lucky if it contains a digit '7'. For example, 13:<=07 and 17:<=27 are lucky, while 00:<=48 and 21:<=34 are not lucky.
Note that it is not necessary that the time set for the alarm and the wake-up time are on the same day. It is guaranteed that there is a lucky time Jamie can set so that he can wake at *hh*:<=*mm*.
Formally, find the smallest possible non-negative integer *y* such that the time representation of the time *x*·*y* minutes before *hh*:<=*mm* contains the digit '7'.
Jamie uses 24-hours clock, so after 23:<=59 comes 00:<=00. | The first line contains a single integer *x* (1<=≤<=*x*<=≤<=60).
The second line contains two two-digit integers, *hh* and *mm* (00<=≤<=*hh*<=≤<=23,<=00<=≤<=*mm*<=≤<=59). | Print the minimum number of times he needs to press the button. | [
"3\n11 23\n",
"5\n01 07\n"
] | [
"2\n",
"0\n"
] | In the first sample, Jamie needs to wake up at 11:23. So, he can set his alarm at 11:17. He would press the snooze button when the alarm rings at 11:17 and at 11:20.
In the second sample, Jamie can set his alarm at exactly at 01:07 which is lucky. | 500 | [
{
"input": "3\n11 23",
"output": "2"
},
{
"input": "5\n01 07",
"output": "0"
},
{
"input": "34\n09 24",
"output": "3"
},
{
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] | 1,516,374,638 | 2,138 | Python 3 | WRONG_ANSWER | TESTS | 8 | 61 | 5,632,000 | getInputList = lambda : list(input().split())
getInputIntList = lambda : list(map(int,input().split()))
#for t in range(int(input())):
x = getInputIntList()
h , m = getInputIntList()
arr_min = [7,17,27,37,47,57]
arr_hour = [7,17]
valid = []
for i in range(24):
for j in arr_min:
valid.append(i*60+j)
for i in range(60):
for j in arr_hour:
valid.append(j*60+i)
valid.sort(reverse = True)
ti = 60*h + m
for i in valid:
if i <= ti and (ti - i) % x[0] == 0:
print(int((ti - i) / x[0]))
break
| Title: Jamie and Alarm Snooze
Time Limit: None seconds
Memory Limit: None megabytes
Problem Description:
Jamie loves sleeping. One day, he decides that he needs to wake up at exactly *hh*:<=*mm*. However, he hates waking up, so he wants to make waking up less painful by setting the alarm at a lucky time. He will then press the snooze button every *x* minutes until *hh*:<=*mm* is reached, and only then he will wake up. He wants to know what is the smallest number of times he needs to press the snooze button.
A time is considered lucky if it contains a digit '7'. For example, 13:<=07 and 17:<=27 are lucky, while 00:<=48 and 21:<=34 are not lucky.
Note that it is not necessary that the time set for the alarm and the wake-up time are on the same day. It is guaranteed that there is a lucky time Jamie can set so that he can wake at *hh*:<=*mm*.
Formally, find the smallest possible non-negative integer *y* such that the time representation of the time *x*·*y* minutes before *hh*:<=*mm* contains the digit '7'.
Jamie uses 24-hours clock, so after 23:<=59 comes 00:<=00.
Input Specification:
The first line contains a single integer *x* (1<=≤<=*x*<=≤<=60).
The second line contains two two-digit integers, *hh* and *mm* (00<=≤<=*hh*<=≤<=23,<=00<=≤<=*mm*<=≤<=59).
Output Specification:
Print the minimum number of times he needs to press the button.
Demo Input:
['3\n11 23\n', '5\n01 07\n']
Demo Output:
['2\n', '0\n']
Note:
In the first sample, Jamie needs to wake up at 11:23. So, he can set his alarm at 11:17. He would press the snooze button when the alarm rings at 11:17 and at 11:20.
In the second sample, Jamie can set his alarm at exactly at 01:07 which is lucky. | ```python
getInputList = lambda : list(input().split())
getInputIntList = lambda : list(map(int,input().split()))
#for t in range(int(input())):
x = getInputIntList()
h , m = getInputIntList()
arr_min = [7,17,27,37,47,57]
arr_hour = [7,17]
valid = []
for i in range(24):
for j in arr_min:
valid.append(i*60+j)
for i in range(60):
for j in arr_hour:
valid.append(j*60+i)
valid.sort(reverse = True)
ti = 60*h + m
for i in valid:
if i <= ti and (ti - i) % x[0] == 0:
print(int((ti - i) / x[0]))
break
``` | 0 | |
112 | A | Petya and Strings | PROGRAMMING | 800 | [
"implementation",
"strings"
] | A. Petya and Strings | 2 | 256 | Little Petya loves presents. His mum bought him two strings of the same size for his birthday. The strings consist of uppercase and lowercase Latin letters. Now Petya wants to compare those two strings lexicographically. The letters' case does not matter, that is an uppercase letter is considered equivalent to the corresponding lowercase letter. Help Petya perform the comparison. | Each of the first two lines contains a bought string. The strings' lengths range from 1 to 100 inclusive. It is guaranteed that the strings are of the same length and also consist of uppercase and lowercase Latin letters. | If the first string is less than the second one, print "-1". If the second string is less than the first one, print "1". If the strings are equal, print "0". Note that the letters' case is not taken into consideration when the strings are compared. | [
"aaaa\naaaA\n",
"abs\nAbz\n",
"abcdefg\nAbCdEfF\n"
] | [
"0\n",
"-1\n",
"1\n"
] | If you want more formal information about the lexicographical order (also known as the "dictionary order" or "alphabetical order"), you can visit the following site:
- http://en.wikipedia.org/wiki/Lexicographical_order | 500 | [
{
"input": "aaaa\naaaA",
"output": "0"
},
{
"input": "abs\nAbz",
"output": "-1"
},
{
"input": "abcdefg\nAbCdEfF",
"output": "1"
},
{
"input": "asadasdasd\nasdwasdawd",
"output": "-1"
},
{
"input": "aslkjlkasdd\nasdlkjdajwi",
"output": "1"
},
{
"input": "aaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaa\naaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaaa",
"output": "0"
},
{
"input": "aAaaaAAaAaaAzZsssSsdDfeEaeqZlpP\nAaaaAaaAaaAaZzSSSSsDdFeeAeQZLpp",
"output": "0"
},
{
"input": "bwuEhEveouaTECagLZiqmUdxEmhRSOzMauJRWLQMppZOumxhAmwuGeDIkvkBLvMXwUoFmpAfDprBcFtEwOULcZWRQhcTbTbX\nHhoDWbcxwiMnCNexOsKsujLiSGcLllXOkRSbnOzThAjnnliLYFFmsYkOfpTxRNEfBsoUHfoLTiqAINRPxWRqrTJhgfkKcDOH",
"output": "-1"
},
{
"input": "kGWUuguKzcvxqKTNpxeDWXpXkrXDvGMFGoXKDfPBZvWSDUyIYBynbKOUonHvmZaKeirUhfmVRKtGhAdBfKMWXDUoqvbfpfHYcg\ncvOULleuIIiYVVxcLZmHVpNGXuEpzcWZZWyMOwIwbpkKPwCfkVbKkUuosvxYCKjqfVmHfJKbdrsAcatPYgrCABaFcoBuOmMfFt",
"output": "1"
},
{
"input": "nCeNVIzHqPceNhjHeHvJvgBsNFiXBATRrjSTXJzhLMDMxiJztphxBRlDlqwDFImWeEPkggZCXSRwelOdpNrYnTepiOqpvkr\nHJbjJFtlvNxIbkKlxQUwmZHJFVNMwPAPDRslIoXISBYHHfymyIaQHLgECPxAmqnOCizwXnIUBRmpYUBVPenoUKhCobKdOjL",
"output": "1"
},
{
"input": "ttXjenUAlfixytHEOrPkgXmkKTSGYuyVXGIHYmWWYGlBYpHkujueqBSgjLguSgiMGJWATIGEUjjAjKXdMiVbHozZUmqQtFrT\nJziDBFBDmDJCcGqFsQwDFBYdOidLxxhBCtScznnDgnsiStlWFnEXQrJxqTXKPxZyIGfLIToETKWZBPUIBmLeImrlSBWCkTNo",
"output": "1"
},
{
"input": "AjQhPqSVhwQQjcgCycjKorWBgFCRuQBwgdVuAPSMJAvTyxGVuFHjfJzkKfsmfhFbKqFrFIohSZBbpjgEHebezmVlGLTPSCTMf\nXhxWuSnMmKFrCUOwkTUmvKAfbTbHWzzOTzxJatLLCdlGnHVaBUnxDlsqpvjLHMThOPAFBggVKDyKBrZAmjnjrhHlrnSkyzBja",
"output": "-1"
},
{
"input": "HCIgYtnqcMyjVngziNflxKHtdTmcRJhzMAjFAsNdWXFJYEhiTzsQUtFNkAbdrFBRmvLirkuirqTDvIpEfyiIqkrwsjvpPWTEdI\nErqiiWKsmIjyZuzgTlTqxYZwlrpvRyaVhRTOYUqtPMVGGtWOkDCOOQRKrkkRzPftyQCkYkzKkzTPqqXmeZhvvEEiEhkdOmoMvy",
"output": "1"
},
{
"input": "mtBeJYILXcECGyEVSyzLFdQJbiVnnfkbsYYsdUJSIRmyzLfTTtFwIBmRLVnwcewIqcuydkcLpflHAFyDaToLiFMgeHvQorTVbI\nClLvyejznjbRfCDcrCzkLvqQaGzTjwmWONBdCctJAPJBcQrcYvHaSLQgPIJbmkFBhFzuQLBiRzAdNHulCjIAkBvZxxlkdzUWLR",
"output": "1"
},
{
"input": "tjucSbGESVmVridTBjTmpVBCwwdWKBPeBvmgdxgIVLwQxveETnSdxkTVJpXoperWSgdpPMKNmwDiGeHfxnuqaDissgXPlMuNZIr\nHfjOOJhomqNIKHvqSgfySjlsWJQBuWYwhLQhlZYlpZwboMpoLoluGsBmhhlYgeIouwdkPfiaAIrkYRlxtiFazOPOllPsNZHcIZd",
"output": "1"
},
{
"input": "AanbDfbZNlUodtBQlvPMyomStKNhgvSGhSbTdabxGFGGXCdpsJDimsAykKjfBDPMulkhBMsqLmVKLDoesHZsRAEEdEzqigueXInY\ncwfyjoppiJNrjrOLNZkqcGimrpTsiyFBVgMWEPXsMrxLJDDbtYzerXiFGuLBcQYitLdqhGHBpdjRnkUegmnwhGHAKXGyFtscWDSI",
"output": "-1"
},
{
"input": "HRfxniwuJCaHOcaOVgjOGHXKrwxrDQxJpppeGDXnTAowyKbCsCQPbchCKeTWOcKbySSYnoaTJDnmRcyGPbfXJyZoPcARHBu\nxkLXvwkvGIWSQaFTznLOctUXNuzzBBOlqvzmVfTSejekTAlwidRrsxkbZTsGGeEWxCXHzqWVuLGoCyrGjKkQoHqduXwYQKC",
"output": "-1"
},
{
"input": "OjYwwNuPESIazoyLFREpObIaMKhCaKAMWMfRGgucEuyNYRantwdwQkmflzfqbcFRaXBnZoIUGsFqXZHGKwlaBUXABBcQEWWPvkjW\nRxLqGcTTpBwHrHltCOllnTpRKLDofBUqqHxnOtVWPgvGaeHIevgUSOeeDOJubfqonFpVNGVbHFcAhjnyFvrrqnRgKhkYqQZmRfUl",
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},
{
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"output": "-1"
},
{
"input": "cymCPGqdXKUdADEWDdUaLEEMHiXHsdAZuDnJDMUvxvrLRBrPSDpXPAgMRoGplLtniFRTomDTAHXWAdgUveTxaqKVSvnOyhOwiRN\nuhmyEWzapiRNPFDisvHTbenXMfeZaHqOFlKjrfQjUBwdFktNpeiRoDWuBftZLcCZZAVfioOihZVNqiNCNDIsUdIhvbcaxpTRWoV",
"output": "-1"
},
{
"input": "sSvpcITJAwghVfJaLKBmyjOkhltTGjYJVLWCYMFUomiJaKQYhXTajvZVHIMHbyckYROGQZzjWyWCcnmDmrkvTKfHSSzCIhsXgEZa\nvhCXkCwAmErGVBPBAnkSYEYvseFKbWSktoqaHYXUmYkHfOkRwuEyBRoGoBrOXBKVxXycjZGStuvDarnXMbZLWrbjrisDoJBdSvWJ",
"output": "-1"
},
{
"input": "hJDANKUNBisOOINDsTixJmYgHNogtpwswwcvVMptfGwIjvqgwTYFcqTdyAqaqlnhOCMtsnWXQqtjFwQlEcBtMFAtSqnqthVb\nrNquIcjNWESjpPVWmzUJFrelpUZeGDmSvCurCqVmKHKVAAPkaHksniOlzjiKYIJtvbuQWZRufMebpTFPqyxIWWjfPaWYiNlK",
"output": "-1"
},
{
"input": "ycLoapxsfsDTHMSfAAPIUpiEhQKUIXUcXEiopMBuuZLHtfPpLmCHwNMNQUwsEXxCEmKHTBSnKhtQhGWUvppUFZUgSpbeChX\ndCZhgVXofkGousCzObxZSJwXcHIaqUDSCPKzXntcVmPxtNcXmVcjsetZYxedmgQzXTZHMvzjoaXCMKsncGciSDqQWIIRlys",
"output": "1"
},
{
"input": "nvUbnrywIePXcoukIhwTfUVcHUEgXcsMyNQhmMlTltZiCooyZiIKRIGVHMCnTKgzXXIuvoNDEZswKoACOBGSyVNqTNQqMhAG\nplxuGSsyyJjdvpddrSebOARSAYcZKEaKjqbCwvjhNykuaECoQVHTVFMKXwvrQXRaqXsHsBaGVhCxGRxNyGUbMlxOarMZNXxy",
"output": "-1"
},
{
"input": "EncmXtAblQzcVRzMQqdDqXfAhXbtJKQwZVWyHoWUckohnZqfoCmNJDzexFgFJYrwNHGgzCJTzQQFnxGlhmvQTpicTkEeVICKac\nNIUNZoMLFMyAjVgQLITELJSodIXcGSDWfhFypRoGYuogJpnqGTotWxVqpvBHjFOWcDRDtARsaHarHaOkeNWEHGTaGOFCOFEwvK",
"output": "-1"
},
{
"input": "UG\nak",
"output": "1"
},
{
"input": "JZR\nVae",
"output": "-1"
},
{
"input": "a\nZ",
"output": "-1"
},
{
"input": "rk\nkv",
"output": "1"
},
{
"input": "RvuT\nbJzE",
"output": "1"
},
{
"input": "PPS\nydq",
"output": "-1"
},
{
"input": "q\nq",
"output": "0"
},
{
"input": "peOw\nIgSJ",
"output": "1"
},
{
"input": "PyK\noKN",
"output": "1"
},
{
"input": "O\ni",
"output": "1"
},
{
"input": "NmGY\npDlP",
"output": "-1"
},
{
"input": "nG\nZf",
"output": "-1"
},
{
"input": "m\na",
"output": "1"
},
{
"input": "MWyB\nWZEV",
"output": "-1"
},
{
"input": "Gre\nfxc",
"output": "1"
},
{
"input": "Ooq\nwap",
"output": "-1"
},
{
"input": "XId\nlbB",
"output": "1"
},
{
"input": "lfFpECEqUMEOJhipvkZjDPcpDNJedOVXiSMgBvBZbtfzIKekcvpWPCazKAhJyHircRtgcBIJwwstpHaLAgxFOngAWUZRgCef\nLfFPEcequmeojHIpVkzjDPcpdNJEDOVXiSmGBVBZBtfZikEKcvPwpCAzKAHJyHIrCRTgCbIJWwSTphALagXfOnGAwUzRGcEF",
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},
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},
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"output": "0"
},
{
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{
"input": "SajcCGMepaLjZIWLRBGFcrZRCRvvoCsIyKsQerbrwsIamxxpRmQSZSalasJLVFbCHCuXJlubciQAvLxXYBazLsMKLHLdDQ\nsaJcCgmEpaLJziWlrBgFcRzrCrVVOcSIykSQerBrwSIamxxPrMqSzSalASjLVFbChCUxjLUbCIQAVlxxybAZLsmkLhLDdQ",
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{
"input": "kigPrWNTOUNDBskAfefjhHYZNYdnfZWuXWzHiBxFQryBbAkPtenFwWvCSTYGpzOntUNzNUhxRWjKmicTwLwJAnbAxj\nkigpRWntOUNdBsKaFEFjhhYZnYDNfzWuXwZhibxFQRybbakPteNfwwvcStyGPzoNTunznuHXrWjKMIctWLWJANBAxJ",
"output": "0"
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{
"input": "nTomZZuTTRTAAPoUsySVFGElrpQRNLjqvFmcYytiheQnjUhPLnqNBiYtQkljbcvmjuNAVKbvQOWpqqFlQhAhULIhquoCnjUI\nntOmzZuttrtAAPOUSySVFgeLRPQrNLjQvfmCyYTiHEQnjuHPlNQNbIYtqKLJBCVmjunavkbvQOWPQQFlqHaHULIHQuOcnJUi",
"output": "0"
},
{
"input": "abac\nadaa",
"output": "-1"
},
{
"input": "Bbc\nabc",
"output": "1"
},
{
"input": "aaaba\naaaab",
"output": "1"
}
] | 1,698,587,260 | 2,147,483,647 | PyPy 3-64 | WRONG_ANSWER | TESTS | 2 | 92 | 0 | a = input().lower()
b = input().lower()
a1 = 0
b1 = 0
for i in a:
i = ord(i)
a1 += i
for j in b:
j = ord(j)
b1 += i
if a1<b1:
print(-1)
elif a1>b1:
print(1)
else:
print(0) | Title: Petya and Strings
Time Limit: 2 seconds
Memory Limit: 256 megabytes
Problem Description:
Little Petya loves presents. His mum bought him two strings of the same size for his birthday. The strings consist of uppercase and lowercase Latin letters. Now Petya wants to compare those two strings lexicographically. The letters' case does not matter, that is an uppercase letter is considered equivalent to the corresponding lowercase letter. Help Petya perform the comparison.
Input Specification:
Each of the first two lines contains a bought string. The strings' lengths range from 1 to 100 inclusive. It is guaranteed that the strings are of the same length and also consist of uppercase and lowercase Latin letters.
Output Specification:
If the first string is less than the second one, print "-1". If the second string is less than the first one, print "1". If the strings are equal, print "0". Note that the letters' case is not taken into consideration when the strings are compared.
Demo Input:
['aaaa\naaaA\n', 'abs\nAbz\n', 'abcdefg\nAbCdEfF\n']
Demo Output:
['0\n', '-1\n', '1\n']
Note:
If you want more formal information about the lexicographical order (also known as the "dictionary order" or "alphabetical order"), you can visit the following site:
- http://en.wikipedia.org/wiki/Lexicographical_order | ```python
a = input().lower()
b = input().lower()
a1 = 0
b1 = 0
for i in a:
i = ord(i)
a1 += i
for j in b:
j = ord(j)
b1 += i
if a1<b1:
print(-1)
elif a1>b1:
print(1)
else:
print(0)
``` | 0 |
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