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skia2/include/core/SkMatrix.h
Cary Clark 7651c1611e refresh generated includes 
the newest ones (SkBlendMode.h, SkPicture.h, SkRRect.h)
need additional editing; enough has changed that it is
time to refresh anyway.

TBR=reed@google.com

Docs-Preview: https://skia.org/?cl=141043
Bug: skia:6818
Change-Id: Ic123b02f57005a087f8655cafa1a2537529beca5
Reviewed-on: https://skia-review.googlesource.com/141043
Commit-Queue: Cary Clark <caryclark@skia.org>
Reviewed-by: Cary Clark <caryclark@skia.org>
2018-07-13 14:23:24 +00:00

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/*
* Copyright 2006 The Android Open Source Project
*
* Use of this source code is governed by a BSD-style license that can be
* found in the LICENSE file.
*/
/* Generated by tools/bookmaker from include/core/SkMatrix.h and docs/SkMatrix_Reference.bmh
on 2018-07-13 08:15:11. Additional documentation and examples can be found at:
https://skia.org/user/api/SkMatrix_Reference
You may edit either file directly. Structural changes to public interfaces require
editing both files. After editing docs/SkMatrix_Reference.bmh, run:
bookmaker -b docs -i include/core/SkMatrix.h -p
to create an updated version of this file.
*/
#ifndef SkMatrix_DEFINED
#define SkMatrix_DEFINED
#include "../private/SkMacros.h"
#include "../private/SkTo.h"
#include "SkRect.h"
struct SkRSXform;
struct SkPoint3;
class SkString;
/** \class SkMatrix
SkMatrix holds a 3x3 matrix for transforming coordinates. This allows mapping
SkPoint and vectors with translation, scaling, skewing, rotation, and
perspective.
SkMatrix elements are in row major order. SkMatrix does not have a constructor,
so it must be explicitly initialized. setIdentity() initializes SkMatrix
so it has no effect. setTranslate(), setScale(), setSkew(), setRotate(), set9 and setAll()
initializes all SkMatrix elements with the corresponding mapping.
SkMatrix includes a hidden variable that classifies the type of matrix to
improve performance. SkMatrix is not thread safe unless getType() is called first.
*/
SK_BEGIN_REQUIRE_DENSE
class SK_API SkMatrix {
public:
/** Sets SkMatrix to scale by (sx, sy). Returned matrix is:
| sx 0 0 |
| 0 sy 0 |
| 0 0 1 |
@param sx horizontal scale factor
@param sy vertical scale factor
@return SkMatrix with scale
*/
static SkMatrix SK_WARN_UNUSED_RESULT MakeScale(SkScalar sx, SkScalar sy) {
SkMatrix m;
m.setScale(sx, sy);
return m;
}
/** Sets SkMatrix to scale by (scale, scale). Returned matrix is:
| scale 0 0 |
| 0 scale 0 |
| 0 0 1 |
@param scale horizontal and vertical scale factor
@return SkMatrix with scale
*/
static SkMatrix SK_WARN_UNUSED_RESULT MakeScale(SkScalar scale) {
SkMatrix m;
m.setScale(scale, scale);
return m;
}
/** Sets SkMatrix to translate by (dx, dy). Returned matrix is:
| 1 0 dx |
| 0 1 dy |
| 0 0 1 |
@param dx horizontal translation
@param dy vertical translation
@return SkMatrix with translation
*/
static SkMatrix SK_WARN_UNUSED_RESULT MakeTrans(SkScalar dx, SkScalar dy) {
SkMatrix m;
m.setTranslate(dx, dy);
return m;
}
/** Sets SkMatrix to:
| scaleX skewX transX |
| skewY scaleY transY |
| pers0 pers1 pers2 |
@param scaleX horizontal scale factor
@param skewX horizontal skew factor
@param transX horizontal translation
@param skewY vertical skew factor
@param scaleY vertical scale factor
@param transY vertical translation
@param pers0 input x-axis perspective factor
@param pers1 input y-axis perspective factor
@param pers2 perspective scale factor
@return SkMatrix constructed from parameters
*/
static SkMatrix SK_WARN_UNUSED_RESULT MakeAll(SkScalar scaleX, SkScalar skewX, SkScalar transX,
SkScalar skewY, SkScalar scaleY, SkScalar transY,
SkScalar pers0, SkScalar pers1, SkScalar pers2) {
SkMatrix m;
m.setAll(scaleX, skewX, transX, skewY, scaleY, transY, pers0, pers1, pers2);
return m;
}
/** \enum SkMatrix::TypeMask
Enum of bit fields for mask returned by getType().
Used to identify the complexity of SkMatrix, to optimize performance.
*/
enum TypeMask {
kIdentity_Mask = 0, //!< identity SkMatrix; all bits clear
kTranslate_Mask = 0x01, //!< translation SkMatrix
kScale_Mask = 0x02, //!< scale SkMatrix
kAffine_Mask = 0x04, //!< skew or rotate SkMatrix
kPerspective_Mask = 0x08, //!< perspective SkMatrix
};
/** Returns a bit field describing the transformations the matrix may
perform. The bit field is computed conservatively, so it may include
false positives. For example, when kPerspective_Mask is set, all
other bits are set.
@return kIdentity_Mask, or combinations of: kTranslate_Mask, kScale_Mask,
kAffine_Mask, kPerspective_Mask
*/
TypeMask getType() const {
if (fTypeMask & kUnknown_Mask) {
fTypeMask = this->computeTypeMask();
}
// only return the public masks
return (TypeMask)(fTypeMask & 0xF);
}
/** Returns true if SkMatrix is identity. Identity matrix is:
| 1 0 0 |
| 0 1 0 |
| 0 0 1 |
@return true if SkMatrix has no effect
*/
bool isIdentity() const {
return this->getType() == 0;
}
/** Returns true if SkMatrix at most scales and translates. SkMatrix may be identity,
contain only scale elements, only translate elements, or both. SkMatrix form is:
| scale-x 0 translate-x |
| 0 scale-y translate-y |
| 0 0 1 |
@return true if SkMatrix is identity; or scales, translates, or both
*/
bool isScaleTranslate() const {
return !(this->getType() & ~(kScale_Mask | kTranslate_Mask));
}
/** Returns true if SkMatrix is identity, or translates. SkMatrix form is:
| 1 0 translate-x |
| 0 1 translate-y |
| 0 0 1 |
@return true if SkMatrix is identity, or translates
*/
bool isTranslate() const { return !(this->getType() & ~(kTranslate_Mask)); }
/** Returns true SkMatrix maps SkRect to another SkRect. If true, SkMatrix is identity,
or scales, or rotates a multiple of 90 degrees, or mirrors on axes. In all
cases, SkMatrix may also have translation. SkMatrix form is either:
| scale-x 0 translate-x |
| 0 scale-y translate-y |
| 0 0 1 |
or
| 0 rotate-x translate-x |
| rotate-y 0 translate-y |
| 0 0 1 |
for non-zero values of scale-x, scale-y, rotate-x, and rotate-y.
Also called preservesAxisAlignment(); use the one that provides better inline
documentation.
@return true if SkMatrix maps one SkRect into another
*/
bool rectStaysRect() const {
if (fTypeMask & kUnknown_Mask) {
fTypeMask = this->computeTypeMask();
}
return (fTypeMask & kRectStaysRect_Mask) != 0;
}
/** Returns true SkMatrix maps SkRect to another SkRect. If true, SkMatrix is identity,
or scales, or rotates a multiple of 90 degrees, or mirrors on axes. In all
cases, SkMatrix may also have translation. SkMatrix form is either:
| scale-x 0 translate-x |
| 0 scale-y translate-y |
| 0 0 1 |
or
| 0 rotate-x translate-x |
| rotate-y 0 translate-y |
| 0 0 1 |
for non-zero values of scale-x, scale-y, rotate-x, and rotate-y.
Also called rectStaysRect(); use the one that provides better inline
documentation.
@return true if SkMatrix maps one SkRect into another
*/
bool preservesAxisAlignment() const { return this->rectStaysRect(); }
/** Returns true if the matrix contains perspective elements. SkMatrix form is:
| -- -- -- |
| -- -- -- |
| perspective-x perspective-y perspective-scale |
where perspective-x or perspective-y is non-zero, or perspective-scale is
not one. All other elements may have any value.
@return true if SkMatrix is in most general form
*/
bool hasPerspective() const {
return SkToBool(this->getPerspectiveTypeMaskOnly() &
kPerspective_Mask);
}
/** Returns true if SkMatrix contains only translation, rotation, reflection, and
uniform scale.
Returns false if SkMatrix contains different scales, skewing, perspective, or
degenerate forms that collapse to a line or point.
Describes that the SkMatrix makes rendering with and without the matrix are
visually alike; a transformed circle remains a circle. Mathematically, this is
referred to as similarity of a Euclidean space, or a similarity transformation.
Preserves right angles, keeping the arms of the angle equal lengths.
@param tol to be deprecated
@return true if SkMatrix only rotates, uniformly scales, translates
*/
bool isSimilarity(SkScalar tol = SK_ScalarNearlyZero) const;
/** Returns true if SkMatrix contains only translation, rotation, reflection, and
scale. Scale may differ along rotated axes.
Returns false if SkMatrix skewing, perspective, or degenerate forms that collapse
to a line or point.
Preserves right angles, but not requiring that the arms of the angle
retain equal lengths.
@param tol to be deprecated
@return true if SkMatrix only rotates, scales, translates
*/
bool preservesRightAngles(SkScalar tol = SK_ScalarNearlyZero) const;
/** SkMatrix organizes its values in row order. These members correspond to
each value in SkMatrix.
*/
static constexpr int kMScaleX = 0; //!< horizontal scale factor
static constexpr int kMSkewX = 1; //!< horizontal skew factor
static constexpr int kMTransX = 2; //!< horizontal translation
static constexpr int kMSkewY = 3; //!< vertical skew factor
static constexpr int kMScaleY = 4; //!< vertical scale factor
static constexpr int kMTransY = 5; //!< vertical translation
static constexpr int kMPersp0 = 6; //!< input x perspective factor
static constexpr int kMPersp1 = 7; //!< input y perspective factor
static constexpr int kMPersp2 = 8; //!< perspective bias
/** Affine arrays are in column major order to match the matrix used by
PDF and XPS.
*/
static constexpr int kAScaleX = 0; //!< horizontal scale factor
static constexpr int kASkewY = 1; //!< vertical skew factor
static constexpr int kASkewX = 2; //!< horizontal skew factor
static constexpr int kAScaleY = 3; //!< vertical scale factor
static constexpr int kATransX = 4; //!< horizontal translation
static constexpr int kATransY = 5; //!< vertical translation
/** Returns one matrix value. Asserts if index is out of range and SK_DEBUG is
defined.
@param index one of: kMScaleX, kMSkewX, kMTransX, kMSkewY, kMScaleY, kMTransY,
kMPersp0, kMPersp1, kMPersp2
@return value corresponding to index
*/
SkScalar operator[](int index) const {
SkASSERT((unsigned)index < 9);
return fMat[index];
}
/** Returns one matrix value. Asserts if index is out of range and SK_DEBUG is
defined.
@param index one of: kMScaleX, kMSkewX, kMTransX, kMSkewY, kMScaleY, kMTransY,
kMPersp0, kMPersp1, kMPersp2
@return value corresponding to index
*/
SkScalar get(int index) const {
SkASSERT((unsigned)index < 9);
return fMat[index];
}
/** Returns scale factor multiplied by x-axis input, contributing to x-axis output.
With mapPoints(), scales SkPoint along the x-axis.
@return horizontal scale factor
*/
SkScalar getScaleX() const { return fMat[kMScaleX]; }
/** Returns scale factor multiplied by y-axis input, contributing to y-axis output.
With mapPoints(), scales SkPoint along the y-axis.
@return vertical scale factor
*/
SkScalar getScaleY() const { return fMat[kMScaleY]; }
/** Returns scale factor multiplied by x-axis input, contributing to y-axis output.
With mapPoints(), skews SkPoint along the y-axis.
Skewing both axes can rotate SkPoint.
@return vertical skew factor
*/
SkScalar getSkewY() const { return fMat[kMSkewY]; }
/** Returns scale factor multiplied by y-axis input, contributing to x-axis output.
With mapPoints(), skews SkPoint along the x-axis.
Skewing both axes can rotate SkPoint.
@return horizontal scale factor
*/
SkScalar getSkewX() const { return fMat[kMSkewX]; }
/** Returns translation contributing to x-axis output.
With mapPoints(), moves SkPoint along the x-axis.
@return horizontal translation factor
*/
SkScalar getTranslateX() const { return fMat[kMTransX]; }
/** Returns translation contributing to y-axis output.
With mapPoints(), moves SkPoint along the y-axis.
@return vertical translation factor
*/
SkScalar getTranslateY() const { return fMat[kMTransY]; }
/** Returns factor scaling input x-axis relative to input y-axis.
@return input x-axis perspective factor
*/
SkScalar getPerspX() const { return fMat[kMPersp0]; }
/** Returns factor scaling input y-axis relative to input x-axis.
@return input y-axis perspective factor
*/
SkScalar getPerspY() const { return fMat[kMPersp1]; }
/** Returns writable SkMatrix value. Asserts if index is out of range and SK_DEBUG is
defined. Clears internal cache anticipating that caller will change SkMatrix value.
Next call to read SkMatrix state may recompute cache; subsequent writes to SkMatrix
value must be followed by dirtyMatrixTypeCache().
@param index one of: kMScaleX, kMSkewX, kMTransX, kMSkewY, kMScaleY, kMTransY,
kMPersp0, kMPersp1, kMPersp2
@return writable value corresponding to index
*/
SkScalar& operator[](int index) {
SkASSERT((unsigned)index < 9);
this->setTypeMask(kUnknown_Mask);
return fMat[index];
}
/** Sets SkMatrix value. Asserts if index is out of range and SK_DEBUG is
defined. Safer than operator[]; internal cache is always maintained.
@param index one of: kMScaleX, kMSkewX, kMTransX, kMSkewY, kMScaleY, kMTransY,
kMPersp0, kMPersp1, kMPersp2
@param value scalar to store in SkMatrix
*/
void set(int index, SkScalar value) {
SkASSERT((unsigned)index < 9);
fMat[index] = value;
this->setTypeMask(kUnknown_Mask);
}
/** Sets horizontal scale factor.
@param v horizontal scale factor to store
*/
void setScaleX(SkScalar v) { this->set(kMScaleX, v); }
/** Sets vertical scale factor.
@param v vertical scale factor to store
*/
void setScaleY(SkScalar v) { this->set(kMScaleY, v); }
/** Sets vertical skew factor.
@param v vertical skew factor to store
*/
void setSkewY(SkScalar v) { this->set(kMSkewY, v); }
/** Sets horizontal skew factor.
@param v horizontal skew factor to store
*/
void setSkewX(SkScalar v) { this->set(kMSkewX, v); }
/** Sets horizontal translation.
@param v horizontal translation to store
*/
void setTranslateX(SkScalar v) { this->set(kMTransX, v); }
/** Sets vertical translation.
@param v vertical translation to store
*/
void setTranslateY(SkScalar v) { this->set(kMTransY, v); }
/** Sets input x-axis perspective factor, which causes mapXY() to vary input x-axis values
inversely proportional to input y-axis values.
@param v perspective factor
*/
void setPerspX(SkScalar v) { this->set(kMPersp0, v); }
/** Sets input y-axis perspective factor, which causes mapXY() to vary input y-axis values
inversely proportional to input x-axis values.
@param v perspective factor
*/
void setPerspY(SkScalar v) { this->set(kMPersp1, v); }
/** Sets all values from parameters. Sets matrix to:
| scaleX skewX transX |
| skewY scaleY transY |
| persp0 persp1 persp2 |
@param scaleX horizontal scale factor to store
@param skewX horizontal skew factor to store
@param transX horizontal translation to store
@param skewY vertical skew factor to store
@param scaleY vertical scale factor to store
@param transY vertical translation to store
@param persp0 input x-axis values perspective factor to store
@param persp1 input y-axis values perspective factor to store
@param persp2 perspective scale factor to store
*/
void setAll(SkScalar scaleX, SkScalar skewX, SkScalar transX,
SkScalar skewY, SkScalar scaleY, SkScalar transY,
SkScalar persp0, SkScalar persp1, SkScalar persp2) {
fMat[kMScaleX] = scaleX;
fMat[kMSkewX] = skewX;
fMat[kMTransX] = transX;
fMat[kMSkewY] = skewY;
fMat[kMScaleY] = scaleY;
fMat[kMTransY] = transY;
fMat[kMPersp0] = persp0;
fMat[kMPersp1] = persp1;
fMat[kMPersp2] = persp2;
this->setTypeMask(kUnknown_Mask);
}
/** Copies nine scalar values contained by SkMatrix into buffer, in member value
ascending order: kMScaleX, kMSkewX, kMTransX, kMSkewY, kMScaleY, kMTransY,
kMPersp0, kMPersp1, kMPersp2.
@param buffer storage for nine scalar values
*/
void get9(SkScalar buffer[9]) const {
memcpy(buffer, fMat, 9 * sizeof(SkScalar));
}
/** Sets SkMatrix to nine scalar values in buffer, in member value ascending order:
kMScaleX, kMSkewX, kMTransX, kMSkewY, kMScaleY, kMTransY, kMPersp0, kMPersp1,
kMPersp2.
Sets matrix to:
| buffer[0] buffer[1] buffer[2] |
| buffer[3] buffer[4] buffer[5] |
| buffer[6] buffer[7] buffer[8] |
In the future, set9 followed by get9 may not return the same values. Since SkMatrix
maps non-homogeneous coordinates, scaling all nine values produces an equivalent
transformation, possibly improving precision.
@param buffer nine scalar values
*/
void set9(const SkScalar buffer[9]);
/** Sets SkMatrix to identity; which has no effect on mapped SkPoint. Sets SkMatrix to:
| 1 0 0 |
| 0 1 0 |
| 0 0 1 |
Also called setIdentity(); use the one that provides better inline
documentation.
*/
void reset();
/** Sets SkMatrix to identity; which has no effect on mapped SkPoint. Sets SkMatrix to:
| 1 0 0 |
| 0 1 0 |
| 0 0 1 |
Also called reset(); use the one that provides better inline
documentation.
*/
void setIdentity() { this->reset(); }
/** Sets SkMatrix to translate by (dx, dy).
@param dx horizontal translation
@param dy vertical translation
*/
void setTranslate(SkScalar dx, SkScalar dy);
/** Sets SkMatrix to translate by (v.fX, v.fY).
@param v vector containing horizontal and vertical translation
*/
void setTranslate(const SkVector& v) { this->setTranslate(v.fX, v.fY); }
/** Sets SkMatrix to scale by sx and sy, about a pivot point at (px, py).
The pivot point is unchanged when mapped with SkMatrix.
@param sx horizontal scale factor
@param sy vertical scale factor
@param px pivot x
@param py pivot y
*/
void setScale(SkScalar sx, SkScalar sy, SkScalar px, SkScalar py);
/** Sets SkMatrix to scale by sx and sy about at pivot point at (0, 0).
@param sx horizontal scale factor
@param sy vertical scale factor
*/
void setScale(SkScalar sx, SkScalar sy);
/** Sets SkMatrix to rotate by degrees about a pivot point at (px, py).
The pivot point is unchanged when mapped with SkMatrix.
Positive degrees rotates clockwise.
@param degrees angle of axes relative to upright axes
@param px pivot x
@param py pivot y
*/
void setRotate(SkScalar degrees, SkScalar px, SkScalar py);
/** Sets SkMatrix to rotate by degrees about a pivot point at (0, 0).
Positive degrees rotates clockwise.
@param degrees angle of axes relative to upright axes
*/
void setRotate(SkScalar degrees);
/** Sets SkMatrix to rotate by sinValue and cosValue, about a pivot point at (px, py).
The pivot point is unchanged when mapped with SkMatrix.
Vector (sinValue, cosValue) describes the angle of rotation relative to (0, 1).
Vector length specifies scale.
@param sinValue rotation vector x-axis component
@param cosValue rotation vector y-axis component
@param px pivot x-axis
@param py pivot y-axis
*/
void setSinCos(SkScalar sinValue, SkScalar cosValue,
SkScalar px, SkScalar py);
/** Sets SkMatrix to rotate by sinValue and cosValue, about a pivot point at (0, 0).
Vector (sinValue, cosValue) describes the angle of rotation relative to (0, 1).
Vector length specifies scale.
@param sinValue rotation vector x-axis component
@param cosValue rotation vector y-axis component
*/
void setSinCos(SkScalar sinValue, SkScalar cosValue);
/** Sets SkMatrix to rotate, scale, and translate using a compressed matrix form.
Vector (rsxForm.fSSin, rsxForm.fSCos) describes the angle of rotation relative
to (0, 1). Vector length specifies scale. Mapped point is rotated and scaled
by vector, then translated by (rsxForm.fTx, rsxForm.fTy).
@param rsxForm compressed SkRSXform matrix
@return reference to SkMatrix
*/
SkMatrix& setRSXform(const SkRSXform& rsxForm);
/** Sets SkMatrix to skew by kx and ky, about a pivot point at (px, py).
The pivot point is unchanged when mapped with SkMatrix.
@param kx horizontal skew factor
@param ky vertical skew factor
@param px pivot x
@param py pivot y
*/
void setSkew(SkScalar kx, SkScalar ky, SkScalar px, SkScalar py);
/** Sets SkMatrix to skew by kx and ky, about a pivot point at (0, 0).
@param kx horizontal skew factor
@param ky vertical skew factor
*/
void setSkew(SkScalar kx, SkScalar ky);
/** Sets SkMatrix to SkMatrix a multiplied by SkMatrix b. Either a or b may be this.
Given:
| A B C | | J K L |
a = | D E F |, b = | M N O |
| G H I | | P Q R |
sets SkMatrix to:
| A B C | | J K L | | AJ+BM+CP AK+BN+CQ AL+BO+CR |
a * b = | D E F | * | M N O | = | DJ+EM+FP DK+EN+FQ DL+EO+FR |
| G H I | | P Q R | | GJ+HM+IP GK+HN+IQ GL+HO+IR |
@param a SkMatrix on left side of multiply expression
@param b SkMatrix on right side of multiply expression
*/
void setConcat(const SkMatrix& a, const SkMatrix& b);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix constructed from translation (dx, dy).
This can be thought of as moving the point to be mapped before applying SkMatrix.
Given:
| A B C | | 1 0 dx |
Matrix = | D E F |, T(dx, dy) = | 0 1 dy |
| G H I | | 0 0 1 |
sets SkMatrix to:
| A B C | | 1 0 dx | | A B A*dx+B*dy+C |
Matrix * T(dx, dy) = | D E F | | 0 1 dy | = | D E D*dx+E*dy+F |
| G H I | | 0 0 1 | | G H G*dx+H*dy+I |
@param dx x-axis translation before applying SkMatrix
@param dy y-axis translation before applying SkMatrix
*/
void preTranslate(SkScalar dx, SkScalar dy);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix constructed from scaling by (sx, sy)
about pivot point (px, py).
This can be thought of as scaling about a pivot point before applying SkMatrix.
Given:
| A B C | | sx 0 dx |
Matrix = | D E F |, S(sx, sy, px, py) = | 0 sy dy |
| G H I | | 0 0 1 |
where
dx = px - sx * px
dy = py - sy * py
sets SkMatrix to:
| A B C | | sx 0 dx | | A*sx B*sy A*dx+B*dy+C |
Matrix * S(sx, sy, px, py) = | D E F | | 0 sy dy | = | D*sx E*sy D*dx+E*dy+F |
| G H I | | 0 0 1 | | G*sx H*sy G*dx+H*dy+I |
@param sx horizontal scale factor
@param sy vertical scale factor
@param px pivot x
@param py pivot y
*/
void preScale(SkScalar sx, SkScalar sy, SkScalar px, SkScalar py);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix constructed from scaling by (sx, sy)
about pivot point (0, 0).
This can be thought of as scaling about the origin before applying SkMatrix.
Given:
| A B C | | sx 0 0 |
Matrix = | D E F |, S(sx, sy) = | 0 sy 0 |
| G H I | | 0 0 1 |
sets SkMatrix to:
| A B C | | sx 0 0 | | A*sx B*sy C |
Matrix * S(sx, sy) = | D E F | | 0 sy 0 | = | D*sx E*sy F |
| G H I | | 0 0 1 | | G*sx H*sy I |
@param sx horizontal scale factor
@param sy vertical scale factor
*/
void preScale(SkScalar sx, SkScalar sy);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix constructed from rotating by degrees
about pivot point (px, py).
This can be thought of as rotating about a pivot point before applying SkMatrix.
Positive degrees rotates clockwise.
Given:
| A B C | | c -s dx |
Matrix = | D E F |, R(degrees, px, py) = | s c dy |
| G H I | | 0 0 1 |
where
c = cos(degrees)
s = sin(degrees)
dx = s * py + (1 - c) * px
dy = -s * px + (1 - c) * py
sets SkMatrix to:
| A B C | | c -s dx | | Ac+Bs -As+Bc A*dx+B*dy+C |
Matrix * R(degrees, px, py) = | D E F | | s c dy | = | Dc+Es -Ds+Ec D*dx+E*dy+F |
| G H I | | 0 0 1 | | Gc+Hs -Gs+Hc G*dx+H*dy+I |
@param degrees angle of axes relative to upright axes
@param px pivot x
@param py pivot y
*/
void preRotate(SkScalar degrees, SkScalar px, SkScalar py);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix constructed from rotating by degrees
about pivot point (0, 0).
This can be thought of as rotating about the origin before applying SkMatrix.
Positive degrees rotates clockwise.
Given:
| A B C | | c -s 0 |
Matrix = | D E F |, R(degrees, px, py) = | s c 0 |
| G H I | | 0 0 1 |
where
c = cos(degrees)
s = sin(degrees)
sets SkMatrix to:
| A B C | | c -s 0 | | Ac+Bs -As+Bc C |
Matrix * R(degrees, px, py) = | D E F | | s c 0 | = | Dc+Es -Ds+Ec F |
| G H I | | 0 0 1 | | Gc+Hs -Gs+Hc I |
@param degrees angle of axes relative to upright axes
*/
void preRotate(SkScalar degrees);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix constructed from skewing by (kx, ky)
about pivot point (px, py).
This can be thought of as skewing about a pivot point before applying SkMatrix.
Given:
| A B C | | 1 kx dx |
Matrix = | D E F |, K(kx, ky, px, py) = | ky 1 dy |
| G H I | | 0 0 1 |
where
dx = -kx * py
dy = -ky * px
sets SkMatrix to:
| A B C | | 1 kx dx | | A+B*ky A*kx+B A*dx+B*dy+C |
Matrix * K(kx, ky, px, py) = | D E F | | ky 1 dy | = | D+E*ky D*kx+E D*dx+E*dy+F |
| G H I | | 0 0 1 | | G+H*ky G*kx+H G*dx+H*dy+I |
@param kx horizontal skew factor
@param ky vertical skew factor
@param px pivot x
@param py pivot y
*/
void preSkew(SkScalar kx, SkScalar ky, SkScalar px, SkScalar py);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix constructed from skewing by (kx, ky)
about pivot point (0, 0).
This can be thought of as skewing about the origin before applying SkMatrix.
Given:
| A B C | | 1 kx 0 |
Matrix = | D E F |, K(kx, ky) = | ky 1 0 |
| G H I | | 0 0 1 |
sets SkMatrix to:
| A B C | | 1 kx 0 | | A+B*ky A*kx+B C |
Matrix * K(kx, ky) = | D E F | | ky 1 0 | = | D+E*ky D*kx+E F |
| G H I | | 0 0 1 | | G+H*ky G*kx+H I |
@param kx horizontal skew factor
@param ky vertical skew factor
*/
void preSkew(SkScalar kx, SkScalar ky);
/** Sets SkMatrix to SkMatrix multiplied by SkMatrix other.
This can be thought of mapping by other before applying SkMatrix.
Given:
| A B C | | J K L |
Matrix = | D E F |, other = | M N O |
| G H I | | P Q R |
sets SkMatrix to:
| A B C | | J K L | | AJ+BM+CP AK+BN+CQ AL+BO+CR |
Matrix * other = | D E F | * | M N O | = | DJ+EM+FP DK+EN+FQ DL+EO+FR |
| G H I | | P Q R | | GJ+HM+IP GK+HN+IQ GL+HO+IR |
@param other SkMatrix on right side of multiply expression
*/
void preConcat(const SkMatrix& other);
/** Sets SkMatrix to SkMatrix constructed from translation (dx, dy) multiplied by SkMatrix.
This can be thought of as moving the point to be mapped after applying SkMatrix.
Given:
| J K L | | 1 0 dx |
Matrix = | M N O |, T(dx, dy) = | 0 1 dy |
| P Q R | | 0 0 1 |
sets SkMatrix to:
| 1 0 dx | | J K L | | J+dx*P K+dx*Q L+dx*R |
T(dx, dy) * Matrix = | 0 1 dy | | M N O | = | M+dy*P N+dy*Q O+dy*R |
| 0 0 1 | | P Q R | | P Q R |
@param dx x-axis translation after applying SkMatrix
@param dy y-axis translation after applying SkMatrix
*/
void postTranslate(SkScalar dx, SkScalar dy);
/** Sets SkMatrix to SkMatrix constructed from scaling by (sx, sy) about pivot point
(px, py), multiplied by SkMatrix.
This can be thought of as scaling about a pivot point after applying SkMatrix.
Given:
| J K L | | sx 0 dx |
Matrix = | M N O |, S(sx, sy, px, py) = | 0 sy dy |
| P Q R | | 0 0 1 |
where
dx = px - sx * px
dy = py - sy * py
sets SkMatrix to:
| sx 0 dx | | J K L | | sx*J+dx*P sx*K+dx*Q sx*L+dx+R |
S(sx, sy, px, py) * Matrix = | 0 sy dy | | M N O | = | sy*M+dy*P sy*N+dy*Q sy*O+dy*R |
| 0 0 1 | | P Q R | | P Q R |
@param sx horizontal scale factor
@param sy vertical scale factor
@param px pivot x
@param py pivot y
*/
void postScale(SkScalar sx, SkScalar sy, SkScalar px, SkScalar py);
/** Sets SkMatrix to SkMatrix constructed from scaling by (sx, sy) about pivot point
(0, 0), multiplied by SkMatrix.
This can be thought of as scaling about the origin after applying SkMatrix.
Given:
| J K L | | sx 0 0 |
Matrix = | M N O |, S(sx, sy) = | 0 sy 0 |
| P Q R | | 0 0 1 |
sets SkMatrix to:
| sx 0 0 | | J K L | | sx*J sx*K sx*L |
S(sx, sy) * Matrix = | 0 sy 0 | | M N O | = | sy*M sy*N sy*O |
| 0 0 1 | | P Q R | | P Q R |
@param sx horizontal scale factor
@param sy vertical scale factor
*/
void postScale(SkScalar sx, SkScalar sy);
/** Sets SkMatrix to SkMatrix constructed from scaling by (1/divx, 1/divy) about pivot point (px, py), multiplied by SkMatrix.
Returns false if either divx or divy is zero.
Given:
| J K L | | sx 0 0 |
Matrix = | M N O |, I(divx, divy) = | 0 sy 0 |
| P Q R | | 0 0 1 |
where
sx = 1 / divx
sy = 1 / divy
sets SkMatrix to:
| sx 0 0 | | J K L | | sx*J sx*K sx*L |
I(divx, divy) * Matrix = | 0 sy 0 | | M N O | = | sy*M sy*N sy*O |
| 0 0 1 | | P Q R | | P Q R |
@param divx integer divisor for inverse scale in x
@param divy integer divisor for inverse scale in y
@return true on successful scale
*/
bool postIDiv(int divx, int divy);
/** Sets SkMatrix to SkMatrix constructed from rotating by degrees about pivot point
(px, py), multiplied by SkMatrix.
This can be thought of as rotating about a pivot point after applying SkMatrix.
Positive degrees rotates clockwise.
Given:
| J K L | | c -s dx |
Matrix = | M N O |, R(degrees, px, py) = | s c dy |
| P Q R | | 0 0 1 |
where
c = cos(degrees)
s = sin(degrees)
dx = s * py + (1 - c) * px
dy = -s * px + (1 - c) * py
sets SkMatrix to:
|c -s dx| |J K L| |cJ-sM+dx*P cK-sN+dx*Q cL-sO+dx+R|
R(degrees, px, py) * Matrix = |s c dy| |M N O| = |sJ+cM+dy*P sK+cN+dy*Q sL+cO+dy*R|
|0 0 1| |P Q R| | P Q R|
@param degrees angle of axes relative to upright axes
@param px pivot x
@param py pivot y
*/
void postRotate(SkScalar degrees, SkScalar px, SkScalar py);
/** Sets SkMatrix to SkMatrix constructed from rotating by degrees about pivot point
(0, 0), multiplied by SkMatrix.
This can be thought of as rotating about the origin after applying SkMatrix.
Positive degrees rotates clockwise.
Given:
| J K L | | c -s 0 |
Matrix = | M N O |, R(degrees, px, py) = | s c 0 |
| P Q R | | 0 0 1 |
where
c = cos(degrees)
s = sin(degrees)
sets SkMatrix to:
| c -s dx | | J K L | | cJ-sM cK-sN cL-sO |
R(degrees, px, py) * Matrix = | s c dy | | M N O | = | sJ+cM sK+cN sL+cO |
| 0 0 1 | | P Q R | | P Q R |
@param degrees angle of axes relative to upright axes
*/
void postRotate(SkScalar degrees);
/** Sets SkMatrix to SkMatrix constructed from skewing by (kx, ky) about pivot point
(px, py), multiplied by SkMatrix.
This can be thought of as skewing about a pivot point after applying SkMatrix.
Given:
| J K L | | 1 kx dx |
Matrix = | M N O |, K(kx, ky, px, py) = | ky 1 dy |
| P Q R | | 0 0 1 |
where
dx = -kx * py
dy = -ky * px
sets SkMatrix to:
| 1 kx dx| |J K L| |J+kx*M+dx*P K+kx*N+dx*Q L+kx*O+dx+R|
K(kx, ky, px, py) * Matrix = |ky 1 dy| |M N O| = |ky*J+M+dy*P ky*K+N+dy*Q ky*L+O+dy*R|
| 0 0 1| |P Q R| | P Q R|
@param kx horizontal skew factor
@param ky vertical skew factor
@param px pivot x
@param py pivot y
*/
void postSkew(SkScalar kx, SkScalar ky, SkScalar px, SkScalar py);
/** Sets SkMatrix to SkMatrix constructed from skewing by (kx, ky) about pivot point
(0, 0), multiplied by SkMatrix.
This can be thought of as skewing about the origin after applying SkMatrix.
Given:
| J K L | | 1 kx 0 |
Matrix = | M N O |, K(kx, ky) = | ky 1 0 |
| P Q R | | 0 0 1 |
sets SkMatrix to:
| 1 kx 0 | | J K L | | J+kx*M K+kx*N L+kx*O |
K(kx, ky) * Matrix = | ky 1 0 | | M N O | = | ky*J+M ky*K+N ky*L+O |
| 0 0 1 | | P Q R | | P Q R |
@param kx horizontal skew factor
@param ky vertical skew factor
*/
void postSkew(SkScalar kx, SkScalar ky);
/** Sets SkMatrix to SkMatrix other multiplied by SkMatrix.
This can be thought of mapping by other after applying SkMatrix.
Given:
| J K L | | A B C |
Matrix = | M N O |, other = | D E F |
| P Q R | | G H I |
sets SkMatrix to:
| A B C | | J K L | | AJ+BM+CP AK+BN+CQ AL+BO+CR |
other * Matrix = | D E F | * | M N O | = | DJ+EM+FP DK+EN+FQ DL+EO+FR |
| G H I | | P Q R | | GJ+HM+IP GK+HN+IQ GL+HO+IR |
@param other SkMatrix on left side of multiply expression
*/
void postConcat(const SkMatrix& other);
/** \enum SkMatrix::ScaleToFit
ScaleToFit describes how SkMatrix is constructed to map one SkRect to another.
ScaleToFit may allow SkMatrix to have unequal horizontal and vertical scaling,
or may restrict SkMatrix to square scaling. If restricted, ScaleToFit specifies
how SkMatrix maps to the side or center of the destination SkRect.
*/
enum ScaleToFit {
kFill_ScaleToFit, //!< scales in x and y to fill destination SkRect
kStart_ScaleToFit, //!< scales and aligns to left and top
kCenter_ScaleToFit, //!< scales and aligns to center
kEnd_ScaleToFit, //!< scales and aligns to right and bottom
};
/** Sets SkMatrix to scale and translate src SkRect to dst SkRect. stf selects whether
mapping completely fills dst or preserves the aspect ratio, and how to align
src within dst. Returns false if src is empty, and sets SkMatrix to identity.
Returns true if dst is empty, and sets SkMatrix to:
| 0 0 0 |
| 0 0 0 |
| 0 0 1 |
@param src SkRect to map from
@param dst SkRect to map to
@param stf one of: kFill_ScaleToFit, kStart_ScaleToFit,
kCenter_ScaleToFit, kEnd_ScaleToFit
@return true if SkMatrix can represent SkRect mapping
*/
bool setRectToRect(const SkRect& src, const SkRect& dst, ScaleToFit stf);
/** Returns SkMatrix set to scale and translate src SkRect to dst SkRect. stf selects
whether mapping completely fills dst or preserves the aspect ratio, and how to
align src within dst. Returns the identity SkMatrix if src is empty. If dst is
empty, returns SkMatrix set to:
| 0 0 0 |
| 0 0 0 |
| 0 0 1 |
@param src SkRect to map from
@param dst SkRect to map to
@param stf one of: kFill_ScaleToFit, kStart_ScaleToFit,
kCenter_ScaleToFit, kEnd_ScaleToFit
@return SkMatrix mapping src to dst
*/
static SkMatrix MakeRectToRect(const SkRect& src, const SkRect& dst, ScaleToFit stf) {
SkMatrix m;
m.setRectToRect(src, dst, stf);
return m;
}
/** Sets SkMatrix to map src to dst. count must be zero or greater, and four or less.
If count is zero, sets SkMatrix to identity and returns true.
If count is one, sets SkMatrix to translate and returns true.
If count is two or more, sets SkMatrix to map SkPoint if possible; returns false
if SkMatrix cannot be constructed. If count is four, SkMatrix may include
perspective.
@param src SkPoint to map from
@param dst SkPoint to map to
@param count number of SkPoint in src and dst
@return true if SkMatrix was constructed successfully
*/
bool setPolyToPoly(const SkPoint src[], const SkPoint dst[], int count);
/** Sets inverse to reciprocal matrix, returning true if SkMatrix can be inverted.
Geometrically, if SkMatrix maps from source to destination, inverse SkMatrix
maps from destination to source. If SkMatrix can not be inverted, inverse is
unchanged.
@param inverse storage for inverted SkMatrix; may be nullptr
@return true if SkMatrix can be inverted
*/
bool SK_WARN_UNUSED_RESULT invert(SkMatrix* inverse) const {
// Allow the trivial case to be inlined.
if (this->isIdentity()) {
if (inverse) {
inverse->reset();
}
return true;
}
return this->invertNonIdentity(inverse);
}
/** Fills affine with identity values in column major order.
Sets affine to:
| 1 0 0 |
| 0 1 0 |
Affine 3x2 matrices in column major order are used by OpenGL and XPS.
@param affine storage for 3x2 affine matrix
*/
static void SetAffineIdentity(SkScalar affine[6]);
/** Fills affine in column major order. Sets affine to:
| scale-x skew-x translate-x |
| skew-y scale-y translate-y |
If SkMatrix contains perspective, returns false and leaves affine unchanged.
@param affine storage for 3x2 affine matrix; may be nullptr
@return true if SkMatrix does not contain perspective
*/
bool SK_WARN_UNUSED_RESULT asAffine(SkScalar affine[6]) const;
/** Sets SkMatrix to affine values, passed in column major order. Given affine,
column, then row, as:
| scale-x skew-x translate-x |
| skew-y scale-y translate-y |
SkMatrix is set, row, then column, to:
| scale-x skew-x translate-x |
| skew-y scale-y translate-y |
| 0 0 1 |
@param affine 3x2 affine matrix
*/
void setAffine(const SkScalar affine[6]);
/** Maps src SkPoint array of length count to dst SkPoint array of equal or greater
length. SkPoint are mapped by multiplying each SkPoint by SkMatrix. Given:
| A B C | | x |
Matrix = | D E F |, pt = | y |
| G H I | | 1 |
where
for (i = 0; i < count; ++i) {
x = src[i].fX
y = src[i].fY
}
each dst SkPoint is computed as:
|A B C| |x| Ax+By+C Dx+Ey+F
Matrix * pt = |D E F| |y| = |Ax+By+C Dx+Ey+F Gx+Hy+I| = ------- , -------
|G H I| |1| Gx+Hy+I Gx+Hy+I
src and dst may point to the same storage.
@param dst storage for mapped SkPoint
@param src SkPoint to transform
@param count number of SkPoint to transform
*/
void mapPoints(SkPoint dst[], const SkPoint src[], int count) const {
SkASSERT((dst && src && count > 0) || 0 == count);
// no partial overlap
SkASSERT(src == dst || &dst[count] <= &src[0] || &src[count] <= &dst[0]);
this->getMapPtsProc()(*this, dst, src, count);
}
/** Maps pts SkPoint array of length count in place. SkPoint are mapped by multiplying
each SkPoint by SkMatrix. Given:
| A B C | | x |
Matrix = | D E F |, pt = | y |
| G H I | | 1 |
where
for (i = 0; i < count; ++i) {
x = pts[i].fX
y = pts[i].fY
}
each resulting pts SkPoint is computed as:
|A B C| |x| Ax+By+C Dx+Ey+F
Matrix * pt = |D E F| |y| = |Ax+By+C Dx+Ey+F Gx+Hy+I| = ------- , -------
|G H I| |1| Gx+Hy+I Gx+Hy+I
@param pts storage for mapped SkPoint
@param count number of SkPoint to transform
*/
void mapPoints(SkPoint pts[], int count) const {
this->mapPoints(pts, pts, count);
}
/** Maps src SkPoint3 array of length count to dst SkPoint3 array, which must of length count or
greater. SkPoint3 array is mapped by multiplying each SkPoint3 by SkMatrix. Given:
| A B C | | x |
Matrix = | D E F |, src = | y |
| G H I | | z |
each resulting dst SkPoint is computed as:
|A B C| |x|
Matrix * src = |D E F| |y| = |Ax+By+Cz Dx+Ey+Fz Gx+Hy+Iz|
|G H I| |z|
@param dst storage for mapped SkPoint3 array
@param src SkPoint3 array to transform
@param count items in SkPoint3 array to transform
*/
void mapHomogeneousPoints(SkPoint3 dst[], const SkPoint3 src[], int count) const;
/** Maps SkPoint (x, y) to result. SkPoint is mapped by multiplying by SkMatrix. Given:
| A B C | | x |
Matrix = | D E F |, pt = | y |
| G H I | | 1 |
result is computed as:
|A B C| |x| Ax+By+C Dx+Ey+F
Matrix * pt = |D E F| |y| = |Ax+By+C Dx+Ey+F Gx+Hy+I| = ------- , -------
|G H I| |1| Gx+Hy+I Gx+Hy+I
@param x x-axis value of SkPoint to map
@param y y-axis value of SkPoint to map
@param result storage for mapped SkPoint
*/
void mapXY(SkScalar x, SkScalar y, SkPoint* result) const {
SkASSERT(result);
this->getMapXYProc()(*this, x, y, result);
}
/** Returns SkPoint (x, y) multiplied by SkMatrix. Given:
| A B C | | x |
Matrix = | D E F |, pt = | y |
| G H I | | 1 |
result is computed as:
|A B C| |x| Ax+By+C Dx+Ey+F
Matrix * pt = |D E F| |y| = |Ax+By+C Dx+Ey+F Gx+Hy+I| = ------- , -------
|G H I| |1| Gx+Hy+I Gx+Hy+I
@param x x-axis value of SkPoint to map
@param y y-axis value of SkPoint to map
@return mapped SkPoint
*/
SkPoint mapXY(SkScalar x, SkScalar y) const {
SkPoint result;
this->getMapXYProc()(*this, x, y, &result);
return result;
}
/** Maps src vector array of length count to vector SkPoint array of equal or greater
length. Vectors are mapped by multiplying each vector by SkMatrix, treating
SkMatrix translation as zero. Given:
| A B 0 | | x |
Matrix = | D E 0 |, src = | y |
| G H I | | 1 |
where
for (i = 0; i < count; ++i) {
x = src[i].fX
y = src[i].fY
}
each dst vector is computed as:
|A B 0| |x| Ax+By Dx+Ey
Matrix * src = |D E 0| |y| = |Ax+By Dx+Ey Gx+Hy+I| = ------- , -------
|G H I| |1| Gx+Hy+I Gx+Hy+I
src and dst may point to the same storage.
@param dst storage for mapped vectors
@param src vectors to transform
@param count number of vectors to transform
*/
void mapVectors(SkVector dst[], const SkVector src[], int count) const;
/** Maps vecs vector array of length count in place, multiplying each vector by
SkMatrix, treating SkMatrix translation as zero. Given:
| A B 0 | | x |
Matrix = | D E 0 |, vec = | y |
| G H I | | 1 |
where
for (i = 0; i < count; ++i) {
x = vecs[i].fX
y = vecs[i].fY
}
each result vector is computed as:
|A B 0| |x| Ax+By Dx+Ey
Matrix * vec = |D E 0| |y| = |Ax+By Dx+Ey Gx+Hy+I| = ------- , -------
|G H I| |1| Gx+Hy+I Gx+Hy+I
@param vecs vectors to transform, and storage for mapped vectors
@param count number of vectors to transform
*/
void mapVectors(SkVector vecs[], int count) const {
this->mapVectors(vecs, vecs, count);
}
/** Maps vector (x, y) to result. Vector is mapped by multiplying by SkMatrix,
treating SkMatrix translation as zero. Given:
| A B 0 | | dx |
Matrix = | D E 0 |, vec = | dy |
| G H I | | 1 |
each result vector is computed as:
|A B 0| |dx| A*dx+B*dy D*dx+E*dy
Matrix * vec = |D E 0| |dy| = |A*dx+B*dy D*dx+E*dy G*dx+H*dy+I| = ----------- , -----------
|G H I| | 1| G*dx+H*dy+I G*dx+*dHy+I
@param dx x-axis value of vector to map
@param dy y-axis value of vector to map
@param result storage for mapped vector
*/
void mapVector(SkScalar dx, SkScalar dy, SkVector* result) const {
SkVector vec = { dx, dy };
this->mapVectors(result, &vec, 1);
}
/** Returns vector (x, y) multiplied by SkMatrix, treating SkMatrix translation as zero.
Given:
| A B 0 | | dx |
Matrix = | D E 0 |, vec = | dy |
| G H I | | 1 |
each result vector is computed as:
|A B 0| |dx| A*dx+B*dy D*dx+E*dy
Matrix * vec = |D E 0| |dy| = |A*dx+B*dy D*dx+E*dy G*dx+H*dy+I| = ----------- , -----------
|G H I| | 1| G*dx+H*dy+I G*dx+*dHy+I
@param dx x-axis value of vector to map
@param dy y-axis value of vector to map
@return mapped vector
*/
SkVector mapVector(SkScalar dx, SkScalar dy) const {
SkVector vec = { dx, dy };
this->mapVectors(&vec, &vec, 1);
return vec;
}
/** Sets dst to bounds of src corners mapped by SkMatrix.
Returns true if mapped corners are dst corners.
Returned value is the same as calling rectStaysRect().
@param dst storage for bounds of mapped SkPoint
@param src SkRect to map
@return true if dst is equivalent to mapped src
*/
bool mapRect(SkRect* dst, const SkRect& src) const;
/** Sets rect to bounds of rect corners mapped by SkMatrix.
Returns true if mapped corners are computed rect corners.
Returned value is the same as calling rectStaysRect().
@param rect rectangle to map, and storage for bounds of mapped corners
@return true if result is equivalent to mapped src
*/
bool mapRect(SkRect* rect) const {
return this->mapRect(rect, *rect);
}
/** Returns bounds of src corners mapped by SkMatrix.
@param src rectangle to map
@return mapped bounds
*/
SkRect mapRect(const SkRect& src) const {
SkRect dst;
(void)this->mapRect(&dst, src);
return dst;
}
/** Maps four corners of rect to dst. SkPoint are mapped by multiplying each
rect corner by SkMatrix. rect corner is processed in this order:
(rect.fLeft, rect.fTop), (rect.fRight, rect.fTop), (rect.fRight, rect.fBottom),
(rect.fLeft, rect.fBottom).
rect may be empty: rect.fLeft may be greater than or equal to rect.fRight;
rect.fTop may be greater than or equal to rect.fBottom.
Given:
| A B C | | x |
Matrix = | D E F |, pt = | y |
| G H I | | 1 |
where pt is initialized from each of (rect.fLeft, rect.fTop),
(rect.fRight, rect.fTop), (rect.fRight, rect.fBottom), (rect.fLeft, rect.fBottom),
each dst SkPoint is computed as:
|A B C| |x| Ax+By+C Dx+Ey+F
Matrix * pt = |D E F| |y| = |Ax+By+C Dx+Ey+F Gx+Hy+I| = ------- , -------
|G H I| |1| Gx+Hy+I Gx+Hy+I
@param dst storage for mapped corner SkPoint
@param rect SkRect to map
*/
void mapRectToQuad(SkPoint dst[4], const SkRect& rect) const {
// This could potentially be faster if we only transformed each x and y of the rect once.
rect.toQuad(dst);
this->mapPoints(dst, 4);
}
/** Sets dst to bounds of src corners mapped by SkMatrix. If matrix contains
elements other than scale or translate: asserts if SK_DEBUG is defined;
otherwise, results are undefined.
@param dst storage for bounds of mapped SkPoint
@param src SkRect to map
*/
void mapRectScaleTranslate(SkRect* dst, const SkRect& src) const;
/** Returns geometric mean radius of ellipse formed by constructing circle of
size radius, and mapping constructed circle with SkMatrix. The result squared is
equal to the major axis length times the minor axis length.
Result is not meaningful if SkMatrix contains perspective elements.
@param radius circle size to map
@return average mapped radius
*/
SkScalar mapRadius(SkScalar radius) const;
/** Returns true if a unit step on x-axis at some y-axis value mapped through SkMatrix
can be represented by a constant vector. Returns true if getType() returns
kIdentity_Mask, or combinations of: kTranslate_Mask, kScale_Mask, and kAffine_Mask.
May return true if getType() returns kPerspective_Mask, but only when SkMatrix
does not include rotation or skewing along the y-axis.
@return true if SkMatrix does not have complex perspective
*/
bool isFixedStepInX() const;
/** Returns vector representing a unit step on x-axis at y mapped through SkMatrix.
If isFixedStepInX() is false, returned value is undefined.
@param y position of line parallel to x-axis
@return vector advance of mapped unit step on x-axis
*/
SkVector fixedStepInX(SkScalar y) const;
/** Returns true if SkMatrix equals m, using an efficient comparison.
Returns false when the sign of zero values is the different; when one
matrix has positive zero value and the other has negative zero value.
Returns true even when both SkMatrix contain NaN.
NaN never equals any value, including itself. To improve performance, NaN values
are treated as bit patterns that are equal if their bit patterns are equal.
@param m SkMatrix to compare
@return true if m and SkMatrix are represented by identical bit patterns
*/
bool cheapEqualTo(const SkMatrix& m) const {
return 0 == memcmp(fMat, m.fMat, sizeof(fMat));
}
/** Compares a and b; returns true if a and b are numerically equal. Returns true
even if sign of zero values are different. Returns false if either SkMatrix
contains NaN, even if the other SkMatrix also contains NaN.
@param a SkMatrix to compare
@param b SkMatrix to compare
@return true if SkMatrix a and SkMatrix b are numerically equal
*/
friend SK_API bool operator==(const SkMatrix& a, const SkMatrix& b);
/** Compares a and b; returns true if a and b are not numerically equal. Returns false
even if sign of zero values are different. Returns true if either SkMatrix
contains NaN, even if the other SkMatrix also contains NaN.
@param a SkMatrix to compare
@param b SkMatrix to compare
@return true if SkMatrix a and SkMatrix b are numerically not equal
*/
friend SK_API bool operator!=(const SkMatrix& a, const SkMatrix& b) {
return !(a == b);
}
/** Writes text representation of SkMatrix to standard output. Floating point values
are written with limited precision; it may not be possible to reconstruct
original SkMatrix from output.
*/
void dump() const;
/** Returns the minimum scaling factor of SkMatrix by decomposing the scaling and
skewing elements.
Returns -1 if scale factor overflows or SkMatrix contains perspective.
@return minimum scale factor
*/
SkScalar getMinScale() const;
/** Returns the maximum scaling factor of SkMatrix by decomposing the scaling and
skewing elements.
Returns -1 if scale factor overflows or SkMatrix contains perspective.
@return maximum scale factor
*/
SkScalar getMaxScale() const;
/** Sets scaleFactors[0] to the minimum scaling factor, and scaleFactors[1] to the
maximum scaling factor. Scaling factors are computed by decomposing
the SkMatrix scaling and skewing elements.
Returns true if scaleFactors are found; otherwise, returns false and sets
scaleFactors to undefined values.
@param scaleFactors storage for minimum and maximum scale factors
@return true if scale factors were computed correctly
*/
bool SK_WARN_UNUSED_RESULT getMinMaxScales(SkScalar scaleFactors[2]) const;
/** Decomposes SkMatrix into scale components and whatever remains. Returns false if
SkMatrix could not be decomposed.
Sets scale to portion of SkMatrix that scale axes. Sets remaining to SkMatrix
with scaling factored out. remaining may be passed as nullptr
to determine if SkMatrix can be decomposed without computing remainder.
Returns true if scale components are found. scale and remaining are
unchanged if SkMatrix contains perspective; scale factors are not finite, or
are nearly zero.
On success
Matrix = scale * Remaining.
@param scale axes scaling factors; may be nullptr
@param remaining SkMatrix without scaling; may be nullptr
@return true if scale can be computed
*/
bool decomposeScale(SkSize* scale, SkMatrix* remaining = nullptr) const;
/** Returns reference to const identity SkMatrix. Returned SkMatrix is set to:
| 1 0 0 |
| 0 1 0 |
| 0 0 1 |
@return const identity SkMatrix
*/
static const SkMatrix& I();
/** Returns reference to a const SkMatrix with invalid values. Returned SkMatrix is set
to:
| SK_ScalarMax SK_ScalarMax SK_ScalarMax |
| SK_ScalarMax SK_ScalarMax SK_ScalarMax |
| SK_ScalarMax SK_ScalarMax SK_ScalarMax |
@return const invalid SkMatrix
*/
static const SkMatrix& InvalidMatrix();
/** Returns SkMatrix a multiplied by SkMatrix b.
Given:
| A B C | | J K L |
a = | D E F |, b = | M N O |
| G H I | | P Q R |
sets SkMatrix to:
| A B C | | J K L | | AJ+BM+CP AK+BN+CQ AL+BO+CR |
a * b = | D E F | * | M N O | = | DJ+EM+FP DK+EN+FQ DL+EO+FR |
| G H I | | P Q R | | GJ+HM+IP GK+HN+IQ GL+HO+IR |
@param a SkMatrix on left side of multiply expression
@param b SkMatrix on right side of multiply expression
@return SkMatrix computed from a times b
*/
static SkMatrix Concat(const SkMatrix& a, const SkMatrix& b) {
SkMatrix result;
result.setConcat(a, b);
return result;
}
/** Sets internal cache to unknown state. Use to force update after repeated
modifications to SkMatrix element reference returned by operator[](int index).
*/
void dirtyMatrixTypeCache() {
this->setTypeMask(kUnknown_Mask);
}
/** Initializes SkMatrix with scale and translate elements.
| sx 0 tx |
| 0 sy ty |
| 0 0 1 |
@param sx horizontal scale factor to store
@param sy vertical scale factor to store
@param tx horizontal translation to store
@param ty vertical translation to store
*/
void setScaleTranslate(SkScalar sx, SkScalar sy, SkScalar tx, SkScalar ty) {
fMat[kMScaleX] = sx;
fMat[kMSkewX] = 0;
fMat[kMTransX] = tx;
fMat[kMSkewY] = 0;
fMat[kMScaleY] = sy;
fMat[kMTransY] = ty;
fMat[kMPersp0] = 0;
fMat[kMPersp1] = 0;
fMat[kMPersp2] = 1;
unsigned mask = 0;
if (sx != 1 || sy != 1) {
mask |= kScale_Mask;
}
if (tx || ty) {
mask |= kTranslate_Mask;
}
this->setTypeMask(mask | kRectStaysRect_Mask);
}
/** Returns true if all elements of the matrix are finite. Returns false if any
element is infinity, or NaN.
@return true if matrix has only finite elements
*/
bool isFinite() const { return SkScalarsAreFinite(fMat, 9); }
private:
/** Set if the matrix will map a rectangle to another rectangle. This
can be true if the matrix is scale-only, or rotates a multiple of
90 degrees.
This bit will be set on identity matrices
*/
static constexpr int kRectStaysRect_Mask = 0x10;
/** Set if the perspective bit is valid even though the rest of
the matrix is Unknown.
*/
static constexpr int kOnlyPerspectiveValid_Mask = 0x40;
static constexpr int kUnknown_Mask = 0x80;
static constexpr int kORableMasks = kTranslate_Mask |
kScale_Mask |
kAffine_Mask |
kPerspective_Mask;
static constexpr int kAllMasks = kTranslate_Mask |
kScale_Mask |
kAffine_Mask |
kPerspective_Mask |
kRectStaysRect_Mask;
SkScalar fMat[9];
mutable uint32_t fTypeMask;
static void ComputeInv(SkScalar dst[9], const SkScalar src[9], double invDet, bool isPersp);
uint8_t computeTypeMask() const;
uint8_t computePerspectiveTypeMask() const;
void setTypeMask(int mask) {
// allow kUnknown or a valid mask
SkASSERT(kUnknown_Mask == mask || (mask & kAllMasks) == mask ||
((kUnknown_Mask | kOnlyPerspectiveValid_Mask) & mask)
== (kUnknown_Mask | kOnlyPerspectiveValid_Mask));
fTypeMask = SkToU8(mask);
}
void orTypeMask(int mask) {
SkASSERT((mask & kORableMasks) == mask);
fTypeMask = SkToU8(fTypeMask | mask);
}
void clearTypeMask(int mask) {
// only allow a valid mask
SkASSERT((mask & kAllMasks) == mask);
fTypeMask = fTypeMask & ~mask;
}
TypeMask getPerspectiveTypeMaskOnly() const {
if ((fTypeMask & kUnknown_Mask) &&
!(fTypeMask & kOnlyPerspectiveValid_Mask)) {
fTypeMask = this->computePerspectiveTypeMask();
}
return (TypeMask)(fTypeMask & 0xF);
}
/** Returns true if we already know that the matrix is identity;
false otherwise.
*/
bool isTriviallyIdentity() const {
if (fTypeMask & kUnknown_Mask) {
return false;
}
return ((fTypeMask & 0xF) == 0);
}
inline void updateTranslateMask() {
if ((fMat[kMTransX] != 0) | (fMat[kMTransY] != 0)) {
fTypeMask |= kTranslate_Mask;
} else {
fTypeMask &= ~kTranslate_Mask;
}
}
typedef void (*MapXYProc)(const SkMatrix& mat, SkScalar x, SkScalar y,
SkPoint* result);
static MapXYProc GetMapXYProc(TypeMask mask) {
SkASSERT((mask & ~kAllMasks) == 0);
return gMapXYProcs[mask & kAllMasks];
}
MapXYProc getMapXYProc() const {
return GetMapXYProc(this->getType());
}
typedef void (*MapPtsProc)(const SkMatrix& mat, SkPoint dst[],
const SkPoint src[], int count);
static MapPtsProc GetMapPtsProc(TypeMask mask) {
SkASSERT((mask & ~kAllMasks) == 0);
return gMapPtsProcs[mask & kAllMasks];
}
MapPtsProc getMapPtsProc() const {
return GetMapPtsProc(this->getType());
}
bool SK_WARN_UNUSED_RESULT invertNonIdentity(SkMatrix* inverse) const;
static bool Poly2Proc(const SkPoint[], SkMatrix*);
static bool Poly3Proc(const SkPoint[], SkMatrix*);
static bool Poly4Proc(const SkPoint[], SkMatrix*);
static void Identity_xy(const SkMatrix&, SkScalar, SkScalar, SkPoint*);
static void Trans_xy(const SkMatrix&, SkScalar, SkScalar, SkPoint*);
static void Scale_xy(const SkMatrix&, SkScalar, SkScalar, SkPoint*);
static void ScaleTrans_xy(const SkMatrix&, SkScalar, SkScalar, SkPoint*);
static void Rot_xy(const SkMatrix&, SkScalar, SkScalar, SkPoint*);
static void RotTrans_xy(const SkMatrix&, SkScalar, SkScalar, SkPoint*);
static void Persp_xy(const SkMatrix&, SkScalar, SkScalar, SkPoint*);
static const MapXYProc gMapXYProcs[];
static void Identity_pts(const SkMatrix&, SkPoint[], const SkPoint[], int);
static void Trans_pts(const SkMatrix&, SkPoint dst[], const SkPoint[], int);
static void Scale_pts(const SkMatrix&, SkPoint dst[], const SkPoint[], int);
static void ScaleTrans_pts(const SkMatrix&, SkPoint dst[], const SkPoint[],
int count);
static void Persp_pts(const SkMatrix&, SkPoint dst[], const SkPoint[], int);
static void Affine_vpts(const SkMatrix&, SkPoint dst[], const SkPoint[], int);
static const MapPtsProc gMapPtsProcs[];
// return the number of bytes written, whether or not buffer is null
size_t writeToMemory(void* buffer) const;
/**
* Reads data from the buffer parameter
*
* @param buffer Memory to read from
* @param length Amount of memory available in the buffer
* @return number of bytes read (must be a multiple of 4) or
* 0 if there was not enough memory available
*/
size_t readFromMemory(const void* buffer, size_t length);
friend class SkPerspIter;
friend class SkMatrixPriv;
friend class SkReader32;
friend class SerializationTest;
};
SK_END_REQUIRE_DENSE
#endif
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