java.awt.geom

Class AffineTransform

Implemented Interfaces:
Cloneable, Serializable

public class AffineTransform
extends Object
implements Cloneable, Serializable

This class represents an affine transformation between two coordinate spaces in 2 dimensions. Such a transform preserves the "straightness" and "parallelness" of lines. The transform is built from a sequence of translations, scales, flips, rotations, and shears.

The transformation can be represented using matrix math on a 3x3 array. Given (x,y), the transformation (x',y') can be found by:

 [ x']   [ m00 m01 m02 ] [ x ]   [ m00*x + m01*y + m02 ]
 [ y'] = [ m10 m11 m12 ] [ y ] = [ m10*x + m11*y + m12 ]
 [ 1 ]   [  0   0   1  ] [ 1 ]   [          1          ]
 
The bottom row of the matrix is constant, so a transform can be uniquely represented (as in toString()) by "[[m00, m01, m02], [m10, m11, m12]]".
Since:
1.2
See Also:
Serialized Form

Field Summary

static int
TYPE_FLIP
The transformation includes a flip about an axis, swapping between right-handed and left-handed coordinate systems.
static int
TYPE_GENERAL_ROTATION
The transformation includes a rotation by an arbitrary angle.
static int
TYPE_GENERAL_SCALE
The transformation includes a general scale - length is scaled in either or both the x and y directions, but by different amounts; without affecting angles.
static int
TYPE_GENERAL_TRANSFORM
The transformation is an arbitrary conversion of coordinates which could not be decomposed into the other TYPEs.
static int
TYPE_IDENTITY
The transformation is the identity (x' = x, y' = y).
static int
TYPE_MASK_ROTATION
This constant checks if either variety of rotation is performed.
static int
TYPE_MASK_SCALE
This constant checks if either variety of scale transform is performed.
static int
TYPE_QUADRANT_ROTATION
The transformation includes a rotation of a multiple of 90 degrees (PI/2 radians).
static int
TYPE_TRANSLATION
The transformation includes a translation - shifting in the x or y direction without changing length or angles.
static int
TYPE_UNIFORM_SCALE
The transformation includes a uniform scale - length is scaled in both the x and y directions by the same amount, without affecting angles.

Constructor Summary

AffineTransform()
Construct a new identity transform:
 [ 1 0 0 ]
 [ 0 1 0 ]
 [ 0 0 1 ]
 
AffineTransform(double m00, double m10, double m01, double m11, double m02, double m12)
Construct a transform with the given matrix entries:
 [ m00 m01 m02 ]
 [ m10 m11 m12 ]
 [  0   0   1  ]
 
AffineTransform(double[] d)
Construct a transform from a sequence of double entries.
AffineTransform(float m00, float m10, float m01, float m11, float m02, float m12)
Construct a transform with the given matrix entries:
 [ m00 m01 m02 ]
 [ m10 m11 m12 ]
 [  0   0   1  ]
 
AffineTransform(float[] f)
Construct a transform from a sequence of float entries.
AffineTransform(AffineTransform tx)
Create a new transform which copies the given one.

Method Summary

Object
clone()
Create a new transform of the same run-time type, with the same transforming properties as this one.
void
concatenate(AffineTransform tx)
Set this transform to the result of performing the original version of this followed by tx.
AffineTransform
createInverse()
Returns a transform, which if concatenated to this one, will result in the identity transform.
Shape
createTransformedShape(Shape src)
Return a new Shape, based on the given one, where the path of the shape has been transformed by this transform.
void
deltaTransform(double[] srcPts, int srcOff, double[] dstPts, int dstOff, int num)
Perform this transformation, less any translation, on an array of points, in (x,y) pairs, storing the results in another (possibly same) array.
Point2D
deltaTransform(Point2D src, Point2D dst)
Perform this transformation, less any translation, on the given source point, and store the result in the destination (creating it if necessary).
boolean
equals(Object obj)
Compares two transforms for equality.
double
getDeterminant()
Return the determinant of this transform matrix.
void
getMatrix(double[] d)
Return the matrix of values used in this transform.
static AffineTransform
getRotateInstance(double theta)
Returns a rotation transform.
static AffineTransform
getRotateInstance(double theta, double x, double y)
Returns a rotation transform about a point.
static AffineTransform
getScaleInstance(double sx, double sy)
Returns a scaling transform:
 [ sx 0  0 ]
 [ 0  sy 0 ]
 [ 0  0  1 ]
 
double
getScaleX()
Returns the X coordinate scaling factor of the matrix.
double
getScaleY()
Returns the Y coordinate scaling factor of the matrix.
static AffineTransform
getShearInstance(double shx, double shy)
Returns a shearing transform (points are shifted in the x direction based on a factor of their y coordinate, and in the y direction as a factor of their x coordinate):
 [  1  shx 0 ]
 [ shy  1  0 ]
 [  0   0  1 ]
 
double
getShearX()
Returns the X coordinate shearing factor of the matrix.
double
getShearY()
Returns the Y coordinate shearing factor of the matrix.
static AffineTransform
getTranslateInstance(double tx, double ty)
Returns a translation transform:
 [ 1 0 tx ]
 [ 0 1 ty ]
 [ 0 0 1  ]
 
double
getTranslateX()
Returns the X coordinate translation factor of the matrix.
double
getTranslateY()
Returns the Y coordinate translation factor of the matrix.
int
getType()
Returns the type of this transform.
int
hashCode()
Return the hashcode for this transformation.
void
inverseTransform(double[] srcPts, int srcOff, double[] dstPts, int dstOff, int num)
Perform the inverse of this transformation on an array of points, in (x,y) pairs, storing the results in another (possibly same) array.
Point2D
inverseTransform(Point2D src, Point2D dst)
Perform the inverse of this transformation on the given source point, and store the result in the destination (creating it if necessary).
boolean
isIdentity()
Tests if this transformation is the identity:
 [ 1 0 0 ]
 [ 0 1 0 ]
 [ 0 0 1 ]
 
void
preConcatenate(AffineTransform tx)
Set this transform to the result of performing tx followed by the original version of this.
void
rotate(double theta)
Concatenate a rotation onto this transform.
void
rotate(double theta, double x, double y)
Concatenate a rotation about a point onto this transform.
void
scale(double sx, double sy)
Concatenate a scale onto this transform.
void
setToIdentity()
Reset this transform to the identity (no transformation):
 [ 1 0 0 ]
 [ 0 1 0 ]
 [ 0 0 1 ]
 
void
setToRotation(double theta)
Set this transform to a rotation.
void
setToRotation(double theta, double x, double y)
Set this transform to a rotation about a point.
void
setToScale(double sx, double sy)
Set this transform to a scale:
 [ sx 0  0 ]
 [ 0  sy 0 ]
 [ 0  0  1 ]
 
void
setToShear(double shx, double shy)
Set this transform to a shear (points are shifted in the x direction based on a factor of their y coordinate, and in the y direction as a factor of their x coordinate):
 [  1  shx 0 ]
 [ shy  1  0 ]
 [  0   0  1 ]
 
void
setToTranslation(double tx, double ty)
Set this transform to a translation:
 [ 1 0 tx ]
 [ 0 1 ty ]
 [ 0 0 1  ]
 
void
setTransform(double m00, double m10, double m01, double m11, double m02, double m12)
Set this transform to the given values:
 [ m00 m01 m02 ]
 [ m10 m11 m12 ]
 [  0   0   1  ]
 
void
setTransform(AffineTransform tx)
Set this transform to a copy of the given one.
void
shear(double shx, double shy)
Concatenate a shearing onto this transform.
String
toString()
Returns a string representation of the transform, in the format: "AffineTransform[[" + m00 + ", " + m01 + ", " + m02 + "], [" + m10 + ", " + m11 + ", " + m12 + "]]".
void
transform(double[] srcPts, int srcOff, double[] dstPts, int dstOff, int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another (possibly same) array.
void
transform(double[] srcPts, int srcOff, float[] dstPts, int dstOff, int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another array.
void
transform(float[] srcPts, int srcOff, double[] dstPts, int dstOff, int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another array.
void
transform(float[] srcPts, int srcOff, float[] dstPts, int dstOff, int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another (possibly same) array.
Point2D
transform(Point2D src, Point2D dst)
Perform this transformation on the given source point, and store the result in the destination (creating it if necessary).
void
transform(Point2D[] src, int srcOff, Point2D[] dst, int dstOff, int num)
Perform this transformation on an array of points, storing the results in another (possibly same) array.
void
translate(double tx, double ty)
Concatenate a translation onto this transform.

Methods inherited from class java.lang.Object

clone, equals, extends Object> getClass, finalize, hashCode, notify, notifyAll, toString, wait, wait, wait

Field Details

TYPE_FLIP

public static final int TYPE_FLIP
The transformation includes a flip about an axis, swapping between right-handed and left-handed coordinate systems. In a right-handed system, the positive x-axis rotates counter-clockwise to the positive y-axis; in a left-handed system it rotates clockwise.
Field Value:
64

TYPE_GENERAL_ROTATION

public static final int TYPE_GENERAL_ROTATION
The transformation includes a rotation by an arbitrary angle. Angles are rotated, but length is preserved. This is mutually exclusive with TYPE_QUADRANT_ROTATION.
Field Value:
16

TYPE_GENERAL_SCALE

public static final int TYPE_GENERAL_SCALE
The transformation includes a general scale - length is scaled in either or both the x and y directions, but by different amounts; without affecting angles. This is mutually exclusive with TYPE_UNIFORM_SCALE.
Field Value:
4

TYPE_GENERAL_TRANSFORM

public static final int TYPE_GENERAL_TRANSFORM
The transformation is an arbitrary conversion of coordinates which could not be decomposed into the other TYPEs.
Field Value:
32

TYPE_IDENTITY

public static final int TYPE_IDENTITY
The transformation is the identity (x' = x, y' = y). All other transforms have either a combination of the appropriate transform flag bits for their type, or the type GENERAL_TRANSFORM.
Field Value:
0

TYPE_MASK_ROTATION

public static final int TYPE_MASK_ROTATION
This constant checks if either variety of rotation is performed.
Field Value:
24

TYPE_MASK_SCALE

public static final int TYPE_MASK_SCALE
This constant checks if either variety of scale transform is performed.
Field Value:
6

TYPE_QUADRANT_ROTATION

public static final int TYPE_QUADRANT_ROTATION
The transformation includes a rotation of a multiple of 90 degrees (PI/2 radians). Angles are rotated, but length is preserved. This is mutually exclusive with TYPE_GENERAL_ROTATION.
Field Value:
8

TYPE_TRANSLATION

public static final int TYPE_TRANSLATION
The transformation includes a translation - shifting in the x or y direction without changing length or angles.
Field Value:
1

TYPE_UNIFORM_SCALE

public static final int TYPE_UNIFORM_SCALE
The transformation includes a uniform scale - length is scaled in both the x and y directions by the same amount, without affecting angles. This is mutually exclusive with TYPE_GENERAL_SCALE.
Field Value:
2

Constructor Details

AffineTransform

public AffineTransform()
Construct a new identity transform:
 [ 1 0 0 ]
 [ 0 1 0 ]
 [ 0 0 1 ]
 

AffineTransform

public AffineTransform(double m00,
                       double m10,
                       double m01,
                       double m11,
                       double m02,
                       double m12)
Construct a transform with the given matrix entries:
 [ m00 m01 m02 ]
 [ m10 m11 m12 ]
 [  0   0   1  ]
 
Parameters:
m00 - the x scaling component
m10 - the y shearing component
m01 - the x shearing component
m11 - the y scaling component
m02 - the x translation component
m12 - the y translation component

AffineTransform

public AffineTransform(double[] d)
Construct a transform from a sequence of double entries. The array must have at least 4 entries, which has a translation factor of 0; or 6 entries, for specifying all parameters:
 [ d[0] d[2] (d[4]) ]
 [ d[1] d[3] (d[5]) ]
 [  0     0    1    ]
 
Parameters:
d - the matrix to copy from, with at least 4 (6) entries
Throws:
NullPointerException - if d is null
ArrayIndexOutOfBoundsException - if d is too small

AffineTransform

public AffineTransform(float m00,
                       float m10,
                       float m01,
                       float m11,
                       float m02,
                       float m12)
Construct a transform with the given matrix entries:
 [ m00 m01 m02 ]
 [ m10 m11 m12 ]
 [  0   0   1  ]
 
Parameters:
m00 - the x scaling component
m10 - the y shearing component
m01 - the x shearing component
m11 - the y scaling component
m02 - the x translation component
m12 - the y translation component

AffineTransform

public AffineTransform(float[] f)
Construct a transform from a sequence of float entries. The array must have at least 4 entries, which has a translation factor of 0; or 6 entries, for specifying all parameters:
 [ f[0] f[2] (f[4]) ]
 [ f[1] f[3] (f[5]) ]
 [  0     0    1    ]
 
Parameters:
f - the matrix to copy from, with at least 4 (6) entries
Throws:
NullPointerException - if f is null
ArrayIndexOutOfBoundsException - if f is too small

AffineTransform

public AffineTransform(AffineTransform tx)
Create a new transform which copies the given one.
Parameters:
tx - the transform to copy
Throws:
NullPointerException - if tx is null

Method Details

clone

public Object clone()
Create a new transform of the same run-time type, with the same transforming properties as this one.
Overrides:
clone in interface Object
Returns:
the clone

concatenate

public void concatenate(AffineTransform tx)
Set this transform to the result of performing the original version of this followed by tx. This is commonly used when chaining transformations from one space to another. In matrix form:
 [ this ] = [ this ] x [ tx ]
 
Parameters:
tx - the transform to concatenate
Throws:
NullPointerException - if tx is null

createInverse

public AffineTransform createInverse()
            throws NoninvertibleTransformException
Returns a transform, which if concatenated to this one, will result in the identity transform. This is useful for undoing transformations, but is only possible if the original transform has an inverse (ie. does not map multiple points to the same line or point). A transform exists only if getDeterminant() has a non-zero value. The inverse is calculated as:

 Let A be the matrix for which we want to find the inverse:

 A = [ m00 m01 m02 ]
     [ m10 m11 m12 ]
     [ 0   0   1   ]


                 1
 inverse (A) =  ---   x  adjoint(A)
                det



             =   1       [  m11  -m01   m01*m12-m02*m11  ]
                ---   x  [ -m10   m00  -m00*m12+m10*m02  ]
                det      [  0     0     m00*m11-m10*m01  ]



             = [  m11/det  -m01/det   m01*m12-m02*m11/det ]
               [ -m10/det   m00/det  -m00*m12+m10*m02/det ]
               [   0           0          1               ]


 
Returns:
a new inverse transform
Throws:
NoninvertibleTransformException - if inversion is not possible

createTransformedShape

public Shape createTransformedShape(Shape src)
Return a new Shape, based on the given one, where the path of the shape has been transformed by this transform. Notice that this uses GeneralPath, which only stores points in float precision.
Parameters:
src - the shape source to transform
Returns:
the shape, transformed by this, null if src is null.

deltaTransform

public void deltaTransform(double[] srcPts,
                           int srcOff,
                           double[] dstPts,
                           int dstOff,
                           int num)
Perform this transformation, less any translation, on an array of points, in (x,y) pairs, storing the results in another (possibly same) array. This will not create a destination array. All sources are copied before the transformation, so that no result will overwrite a point that has not yet been evaluated. The reduced transform is equivalent to:
 [ x' ] = [ m00 m01 ] [ x ] = [ m00 * x + m01 * y ]
 [ y' ]   [ m10 m11 ] [ y ] = [ m10 * x + m11 * y ]
 
Parameters:
srcPts - the array of source points
srcOff - the starting offset into src
dstPts - the array of destination points
dstOff - the starting offset into dst
num - the number of points to transform
Throws:
NullPointerException - if src or dst is null
ArrayIndexOutOfBoundsException - if array bounds are exceeded

deltaTransform

public Point2D deltaTransform(Point2D src,
                              Point2D dst)
Perform this transformation, less any translation, on the given source point, and store the result in the destination (creating it if necessary). It is safe for src and dst to be the same. The reduced transform is equivalent to:
 [ x' ] = [ m00 m01 ] [ x ] = [ m00 * x + m01 * y ]
 [ y' ]   [ m10 m11 ] [ y ] = [ m10 * x + m11 * y ]
 
Parameters:
src - the source point
dst - the destination, or null
Returns:
the delta transformation of src, in dst if it was non-null
Throws:
NullPointerException - if src is null

equals

public boolean equals(Object obj)
Compares two transforms for equality. This returns true if they have the same matrix values.
Overrides:
equals in interface Object
Parameters:
obj - the transform to compare
Returns:
true if it is equal

getDeterminant

public double getDeterminant()
Return the determinant of this transform matrix. If the determinant is non-zero, the transform is invertible; otherwise operations which require an inverse throw a NoninvertibleTransformException. A result very near zero, due to rounding errors, may indicate that inversion results do not carry enough precision to be meaningful.

If this is a uniform scale transformation, the determinant also represents the squared value of the scale. Otherwise, it carries little additional meaning. The determinant is calculated as:

 | m00 m01 m02 |
 | m10 m11 m12 | = m00 * m11 - m01 * m10
 |  0   0   1  |
 
Returns:
the determinant

getMatrix

public void getMatrix(double[] d)
Return the matrix of values used in this transform. If the matrix has fewer than 6 entries, only the scale and shear factors are returned; otherwise the translation factors are copied as well. The resulting values are:
 [ d[0] d[2] (d[4]) ]
 [ d[1] d[3] (d[5]) ]
 [  0     0    1    ]
 
Parameters:
d - the matrix to store the results into; with 4 (6) entries
Throws:
NullPointerException - if d is null
ArrayIndexOutOfBoundsException - if d is too small

getRotateInstance

public static AffineTransform getRotateInstance(double theta)
Returns a rotation transform. A positive angle (in radians) rotates the positive x-axis to the positive y-axis:
 [ cos(theta) -sin(theta) 0 ]
 [ sin(theta)  cos(theta) 0 ]
 [     0           0      1 ]
 
Parameters:
theta - the rotation angle
Returns:
the rotating transform

getRotateInstance

public static AffineTransform getRotateInstance(double theta,
                                                double x,
                                                double y)
Returns a rotation transform about a point. A positive angle (in radians) rotates the positive x-axis to the positive y-axis. This is the same as calling:
 AffineTransform tx = new AffineTransform();
 tx.setToTranslation(x, y);
 tx.rotate(theta);
 tx.translate(-x, -y);
 

The resulting matrix is:

 [ cos(theta) -sin(theta) x-x*cos+y*sin ]
 [ sin(theta)  cos(theta) y-x*sin-y*cos ]
 [     0           0            1       ]
 
Parameters:
theta - the rotation angle
x - the x coordinate of the pivot point
y - the y coordinate of the pivot point
Returns:
the rotating transform

getScaleInstance

public static AffineTransform getScaleInstance(double sx,
                                               double sy)
Returns a scaling transform:
 [ sx 0  0 ]
 [ 0  sy 0 ]
 [ 0  0  1 ]
 
Parameters:
sx - the x scaling factor
sy - the y scaling factor
Returns:
the scaling transform

getScaleX

public double getScaleX()
Returns the X coordinate scaling factor of the matrix.
Returns:
m00

getScaleY

public double getScaleY()
Returns the Y coordinate scaling factor of the matrix.
Returns:
m11

getShearInstance

public static AffineTransform getShearInstance(double shx,
                                               double shy)
Returns a shearing transform (points are shifted in the x direction based on a factor of their y coordinate, and in the y direction as a factor of their x coordinate):
 [  1  shx 0 ]
 [ shy  1  0 ]
 [  0   0  1 ]
 
Parameters:
shx - the x shearing factor
shy - the y shearing factor
Returns:
the shearing transform

getShearX

public double getShearX()
Returns the X coordinate shearing factor of the matrix.
Returns:
m01

getShearY

public double getShearY()
Returns the Y coordinate shearing factor of the matrix.
Returns:
m10

getTranslateInstance

public static AffineTransform getTranslateInstance(double tx,
                                                   double ty)
Returns a translation transform:
 [ 1 0 tx ]
 [ 0 1 ty ]
 [ 0 0 1  ]
 
Parameters:
tx - the x translation distance
ty - the y translation distance
Returns:
the translating transform

getTranslateX

public double getTranslateX()
Returns the X coordinate translation factor of the matrix.
Returns:
m02

getTranslateY

public double getTranslateY()
Returns the Y coordinate translation factor of the matrix.
Returns:
m12

getType

public int getType()
Returns the type of this transform. The result is always valid, although it may not be the simplest interpretation (in other words, there are sequences of transforms which reduce to something simpler, which this does not always detect). The result is either TYPE_GENERAL_TRANSFORM, or a bit-wise combination of TYPE_TRANSLATION, the mutually exclusive TYPE_*_ROTATIONs, and the mutually exclusive TYPE_*_SCALEs.
Returns:
The type.

hashCode

public int hashCode()
Return the hashcode for this transformation. The formula is not documented, but appears to be the same as:
 long l = Double.doubleToLongBits(getScaleX());
 l = l * 31 + Double.doubleToLongBits(getShearX());
 l = l * 31 + Double.doubleToLongBits(getTranslateX());
 l = l * 31 + Double.doubleToLongBits(getShearY());
 l = l * 31 + Double.doubleToLongBits(getScaleY());
 l = l * 31 + Double.doubleToLongBits(getTranslateY());
 return (int) ((l >> 32) ^ l);
 
Overrides:
hashCode in interface Object
Returns:
the hashcode

inverseTransform

public void inverseTransform(double[] srcPts,
                             int srcOff,
                             double[] dstPts,
                             int dstOff,
                             int num)
            throws NoninvertibleTransformException
Perform the inverse of this transformation on an array of points, in (x,y) pairs, storing the results in another (possibly same) array. This will not create a destination array. All sources are copied before the transformation, so that no result will overwrite a point that has not yet been evaluated.
Parameters:
srcPts - the array of source points
srcOff - the starting offset into src
dstPts - the array of destination points
dstOff - the starting offset into dst
num - the number of points to transform
Throws:
NullPointerException - if src or dst is null
ArrayIndexOutOfBoundsException - if array bounds are exceeded
NoninvertibleTransformException - if the inverse does not exist

inverseTransform

public Point2D inverseTransform(Point2D src,
                                Point2D dst)
            throws NoninvertibleTransformException
Perform the inverse of this transformation on the given source point, and store the result in the destination (creating it if necessary). It is safe for src and dst to be the same.
Parameters:
src - the source point
dst - the destination, or null
Returns:
the inverse transformation of src, in dst if it was non-null
Throws:
NullPointerException - if src is null
NoninvertibleTransformException - if the inverse does not exist

isIdentity

public boolean isIdentity()
Tests if this transformation is the identity:
 [ 1 0 0 ]
 [ 0 1 0 ]
 [ 0 0 1 ]
 
Returns:
true if this is the identity transform

preConcatenate

public void preConcatenate(AffineTransform tx)
Set this transform to the result of performing tx followed by the original version of this. This is less common than normal concatenation, but can still be used to chain transformations from one space to another. In matrix form:
 [ this ] = [ tx ] x [ this ]
 
Parameters:
tx - the transform to concatenate
Throws:
NullPointerException - if tx is null

rotate

public void rotate(double theta)
Concatenate a rotation onto this transform. This is equivalent, but more efficient than concatenate(AffineTransform.getRotateInstance(theta)).
Parameters:
theta - the rotation angle

rotate

public void rotate(double theta,
                   double x,
                   double y)
Concatenate a rotation about a point onto this transform. This is equivalent, but more efficient than concatenate(AffineTransform.getRotateInstance(theta, x, y)).
Parameters:
theta - the rotation angle
x - the x coordinate of the pivot point
y - the y coordinate of the pivot point

scale

public void scale(double sx,
                  double sy)
Concatenate a scale onto this transform. This is equivalent, but more efficient than concatenate(AffineTransform.getScaleInstance(sx, sy)).
Parameters:
sx - the x scaling factor
sy - the y scaling factor

setToIdentity

public void setToIdentity()
Reset this transform to the identity (no transformation):
 [ 1 0 0 ]
 [ 0 1 0 ]
 [ 0 0 1 ]
 

setToRotation

public void setToRotation(double theta)
Set this transform to a rotation. A positive angle (in radians) rotates the positive x-axis to the positive y-axis:
 [ cos(theta) -sin(theta) 0 ]
 [ sin(theta)  cos(theta) 0 ]
 [     0           0      1 ]
 
Parameters:
theta - the rotation angle

setToRotation

public void setToRotation(double theta,
                          double x,
                          double y)
Set this transform to a rotation about a point. A positive angle (in radians) rotates the positive x-axis to the positive y-axis. This is the same as calling:
 tx.setToTranslation(x, y);
 tx.rotate(theta);
 tx.translate(-x, -y);
 

The resulting matrix is:

 [ cos(theta) -sin(theta) x-x*cos+y*sin ]
 [ sin(theta)  cos(theta) y-x*sin-y*cos ]
 [     0           0            1       ]
 
Parameters:
theta - the rotation angle
x - the x coordinate of the pivot point
y - the y coordinate of the pivot point

setToScale

public void setToScale(double sx,
                       double sy)
Set this transform to a scale:
 [ sx 0  0 ]
 [ 0  sy 0 ]
 [ 0  0  1 ]
 
Parameters:
sx - the x scaling factor
sy - the y scaling factor

setToShear

public void setToShear(double shx,
                       double shy)
Set this transform to a shear (points are shifted in the x direction based on a factor of their y coordinate, and in the y direction as a factor of their x coordinate):
 [  1  shx 0 ]
 [ shy  1  0 ]
 [  0   0  1 ]
 
Parameters:
shx - the x shearing factor
shy - the y shearing factor

setToTranslation

public void setToTranslation(double tx,
                             double ty)
Set this transform to a translation:
 [ 1 0 tx ]
 [ 0 1 ty ]
 [ 0 0 1  ]
 
Parameters:
tx - the x translation distance
ty - the y translation distance

setTransform

public void setTransform(double m00,
                         double m10,
                         double m01,
                         double m11,
                         double m02,
                         double m12)
Set this transform to the given values:
 [ m00 m01 m02 ]
 [ m10 m11 m12 ]
 [  0   0   1  ]
 
Parameters:
m00 - the x scaling component
m10 - the y shearing component
m01 - the x shearing component
m11 - the y scaling component
m02 - the x translation component
m12 - the y translation component

setTransform

public void setTransform(AffineTransform tx)
Set this transform to a copy of the given one.
Parameters:
tx - the transform to copy
Throws:
NullPointerException - if tx is null

shear

public void shear(double shx,
                  double shy)
Concatenate a shearing onto this transform. This is equivalent, but more efficient than concatenate(AffineTransform.getShearInstance(sx, sy)).
Parameters:
shx - the x shearing factor
shy - the y shearing factor

toString

public String toString()
Returns a string representation of the transform, in the format: "AffineTransform[[" + m00 + ", " + m01 + ", " + m02 + "], [" + m10 + ", " + m11 + ", " + m12 + "]]".
Overrides:
toString in interface Object
Returns:
the string representation

transform

public void transform(double[] srcPts,
                      int srcOff,
                      double[] dstPts,
                      int dstOff,
                      int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another (possibly same) array. This will not create a destination array. All sources are copied before the transformation, so that no result will overwrite a point that has not yet been evaluated.
Parameters:
srcPts - the array of source points
srcOff - the starting offset into src
dstPts - the array of destination points
dstOff - the starting offset into dst
num - the number of points to transform
Throws:
NullPointerException - if src or dst is null
ArrayIndexOutOfBoundsException - if array bounds are exceeded

transform

public void transform(double[] srcPts,
                      int srcOff,
                      float[] dstPts,
                      int dstOff,
                      int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another array. This will not create a destination array.
Parameters:
srcPts - the array of source points
srcOff - the starting offset into src
dstPts - the array of destination points
dstOff - the starting offset into dst
num - the number of points to transform
Throws:
NullPointerException - if src or dst is null
ArrayIndexOutOfBoundsException - if array bounds are exceeded

transform

public void transform(float[] srcPts,
                      int srcOff,
                      double[] dstPts,
                      int dstOff,
                      int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another array. This will not create a destination array.
Parameters:
srcPts - the array of source points
srcOff - the starting offset into src
dstPts - the array of destination points
dstOff - the starting offset into dst
num - the number of points to transform
Throws:
NullPointerException - if src or dst is null
ArrayIndexOutOfBoundsException - if array bounds are exceeded

transform

public void transform(float[] srcPts,
                      int srcOff,
                      float[] dstPts,
                      int dstOff,
                      int num)
Perform this transformation on an array of points, in (x,y) pairs, storing the results in another (possibly same) array. This will not create a destination array. All sources are copied before the transformation, so that no result will overwrite a point that has not yet been evaluated.
Parameters:
srcPts - the array of source points
srcOff - the starting offset into src
dstPts - the array of destination points
dstOff - the starting offset into dst
num - the number of points to transform
Throws:
NullPointerException - if src or dst is null
ArrayIndexOutOfBoundsException - if array bounds are exceeded

transform

public Point2D transform(Point2D src,
                         Point2D dst)
Perform this transformation on the given source point, and store the result in the destination (creating it if necessary). It is safe for src and dst to be the same.
Parameters:
src - the source point
dst - the destination, or null
Returns:
the transformation of src, in dst if it was non-null
Throws:
NullPointerException - if src is null

transform

public void transform(Point2D[] src,
                      int srcOff,
                      Point2D[] dst,
                      int dstOff,
                      int num)
Perform this transformation on an array of points, storing the results in another (possibly same) array. This will not create a destination array, but will create points for the null entries of the destination. The transformation is done sequentially. While having a single source and destination point be the same is safe, you should be aware that duplicate references to the same point in the source, and having the source overlap the destination, may result in your source points changing from a previous transform before it is their turn to be evaluated.
Parameters:
src - the array of source points
srcOff - the starting offset into src
dst - the array of destination points (may have null entries)
dstOff - the starting offset into dst
num - the number of points to transform
Throws:
NullPointerException - if src or dst is null, or src has null entries
ArrayIndexOutOfBoundsException - if array bounds are exceeded
ArrayStoreException - if new points are incompatible with dst

translate

public void translate(double tx,
                      double ty)
Concatenate a translation onto this transform. This is equivalent, but more efficient than concatenate(AffineTransform.getTranslateInstance(tx, ty)).
Parameters:
tx - the x translation distance
ty - the y translation distance

AffineTransform.java -- transform coordinates between two 2-D spaces Copyright (C) 2000, 2001, 2002, 2004 Free Software Foundation This file is part of GNU Classpath. GNU Classpath is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 2, or (at your option) any later version. GNU Classpath is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details. You should have received a copy of the GNU General Public License along with GNU Classpath; see the file COPYING. If not, write to the Free Software Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA. Linking this library statically or dynamically with other modules is making a combined work based on this library. Thus, the terms and conditions of the GNU General Public License cover the whole combination. As a special exception, the copyright holders of this library give you permission to link this library with independent modules to produce an executable, regardless of the license terms of these independent modules, and to copy and distribute the resulting executable under terms of your choice, provided that you also meet, for each linked independent module, the terms and conditions of the license of that module. An independent module is a module which is not derived from or based on this library. If you modify this library, you may extend this exception to your version of the library, but you are not obligated to do so. If you do not wish to do so, delete this exception statement from your version.