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| | #include "agg_trans_affine.h" |
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|
| | namespace agg |
| | { |
| |
|
| | |
| | const trans_affine& trans_affine::parl_to_parl(const double* src, |
| | const double* dst) |
| | { |
| | sx = src[2] - src[0]; |
| | shy = src[3] - src[1]; |
| | shx = src[4] - src[0]; |
| | sy = src[5] - src[1]; |
| | tx = src[0]; |
| | ty = src[1]; |
| | invert(); |
| | multiply(trans_affine(dst[2] - dst[0], dst[3] - dst[1], |
| | dst[4] - dst[0], dst[5] - dst[1], |
| | dst[0], dst[1])); |
| | return *this; |
| | } |
| |
|
| | |
| | const trans_affine& trans_affine::rect_to_parl(double x1, double y1, |
| | double x2, double y2, |
| | const double* parl) |
| | { |
| | double src[6]; |
| | src[0] = x1; src[1] = y1; |
| | src[2] = x2; src[3] = y1; |
| | src[4] = x2; src[5] = y2; |
| | parl_to_parl(src, parl); |
| | return *this; |
| | } |
| |
|
| | |
| | const trans_affine& trans_affine::parl_to_rect(const double* parl, |
| | double x1, double y1, |
| | double x2, double y2) |
| | { |
| | double dst[6]; |
| | dst[0] = x1; dst[1] = y1; |
| | dst[2] = x2; dst[3] = y1; |
| | dst[4] = x2; dst[5] = y2; |
| | parl_to_parl(parl, dst); |
| | return *this; |
| | } |
| |
|
| | |
| | const trans_affine& trans_affine::multiply(const trans_affine& m) |
| | { |
| | double t0 = sx * m.sx + shy * m.shx; |
| | double t2 = shx * m.sx + sy * m.shx; |
| | double t4 = tx * m.sx + ty * m.shx + m.tx; |
| | shy = sx * m.shy + shy * m.sy; |
| | sy = shx * m.shy + sy * m.sy; |
| | ty = tx * m.shy + ty * m.sy + m.ty; |
| | sx = t0; |
| | shx = t2; |
| | tx = t4; |
| | return *this; |
| | } |
| |
|
| |
|
| | |
| | const trans_affine& trans_affine::invert() |
| | { |
| | double d = determinant_reciprocal(); |
| |
|
| | double t0 = sy * d; |
| | sy = sx * d; |
| | shy = -shy * d; |
| | shx = -shx * d; |
| |
|
| | double t4 = -tx * t0 - ty * shx; |
| | ty = -tx * shy - ty * sy; |
| |
|
| | sx = t0; |
| | tx = t4; |
| | return *this; |
| | } |
| |
|
| |
|
| | |
| | const trans_affine& trans_affine::flip_x() |
| | { |
| | sx = -sx; |
| | shy = -shy; |
| | tx = -tx; |
| | return *this; |
| | } |
| |
|
| | |
| | const trans_affine& trans_affine::flip_y() |
| | { |
| | shx = -shx; |
| | sy = -sy; |
| | ty = -ty; |
| | return *this; |
| | } |
| |
|
| | |
| | const trans_affine& trans_affine::reset() |
| | { |
| | sx = sy = 1.0; |
| | shy = shx = tx = ty = 0.0; |
| | return *this; |
| | } |
| |
|
| | |
| | bool trans_affine::is_identity(double epsilon) const |
| | { |
| | return is_equal_eps(sx, 1.0, epsilon) && |
| | is_equal_eps(shy, 0.0, epsilon) && |
| | is_equal_eps(shx, 0.0, epsilon) && |
| | is_equal_eps(sy, 1.0, epsilon) && |
| | is_equal_eps(tx, 0.0, epsilon) && |
| | is_equal_eps(ty, 0.0, epsilon); |
| | } |
| |
|
| | |
| | bool trans_affine::is_valid(double epsilon) const |
| | { |
| | return fabs(sx) > epsilon && fabs(sy) > epsilon; |
| | } |
| |
|
| | |
| | bool trans_affine::is_equal(const trans_affine& m, double epsilon) const |
| | { |
| | return is_equal_eps(sx, m.sx, epsilon) && |
| | is_equal_eps(shy, m.shy, epsilon) && |
| | is_equal_eps(shx, m.shx, epsilon) && |
| | is_equal_eps(sy, m.sy, epsilon) && |
| | is_equal_eps(tx, m.tx, epsilon) && |
| | is_equal_eps(ty, m.ty, epsilon); |
| | } |
| |
|
| | |
| | double trans_affine::rotation() const |
| | { |
| | double x1 = 0.0; |
| | double y1 = 0.0; |
| | double x2 = 1.0; |
| | double y2 = 0.0; |
| | transform(&x1, &y1); |
| | transform(&x2, &y2); |
| | return atan2(y2-y1, x2-x1); |
| | } |
| |
|
| | |
| | void trans_affine::translation(double* dx, double* dy) const |
| | { |
| | *dx = tx; |
| | *dy = ty; |
| | } |
| |
|
| | |
| | void trans_affine::scaling(double* x, double* y) const |
| | { |
| | double x1 = 0.0; |
| | double y1 = 0.0; |
| | double x2 = 1.0; |
| | double y2 = 1.0; |
| | trans_affine t(*this); |
| | t *= trans_affine_rotation(-rotation()); |
| | t.transform(&x1, &y1); |
| | t.transform(&x2, &y2); |
| | *x = x2 - x1; |
| | *y = y2 - y1; |
| | } |
| |
|
| |
|
| | } |
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