| /* 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., 59 Temple Place, Suite 330, Boston, MA |
| 02111-1307 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. */ |
| |
| |
| package java.awt.geom; |
| |
| import java.awt.Shape; |
| import java.io.IOException; |
| import java.io.ObjectInputStream; |
| import java.io.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. |
| * |
| * <p>The transformation can be represented using matrix math on a 3x3 array. |
| * Given (x,y), the transformation (x',y') can be found by: |
| * <pre> |
| * [ 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 ] |
| * </pre> |
| * The bottom row of the matrix is constant, so a transform can be uniquely |
| * represented (as in {@link #toString()}) by |
| * "[[m00, m01, m02], [m10, m11, m12]]". |
| * |
| * @author Tom Tromey (tromey@cygnus.com) |
| * @author Eric Blake (ebb9@email.byu.edu) |
| * @since 1.2 |
| * @status partially updated to 1.4, still has some problems |
| */ |
| public class AffineTransform implements Cloneable, Serializable |
| { |
| /** |
| * Compatible with JDK 1.2+. |
| */ |
| private static final long serialVersionUID = 1330973210523860834L; |
| |
| /** |
| * 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. |
| * |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_FLIP |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| * @see #getType() |
| */ |
| public static final int TYPE_IDENTITY = 0; |
| |
| /** |
| * The transformation includes a translation - shifting in the x or y |
| * direction without changing length or angles. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_FLIP |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| * @see #getType() |
| */ |
| public static final int TYPE_TRANSLATION = 1; |
| |
| /** |
| * 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. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_FLIP |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| * @see #TYPE_MASK_SCALE |
| * @see #getType() |
| */ |
| public static final int TYPE_UNIFORM_SCALE = 2; |
| |
| /** |
| * 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. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_FLIP |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| * @see #TYPE_MASK_SCALE |
| * @see #getType() |
| */ |
| public static final int TYPE_GENERAL_SCALE = 4; |
| |
| /** |
| * This constant checks if either variety of scale transform is performed. |
| * |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| */ |
| public static final int TYPE_MASK_SCALE = 6; |
| |
| /** |
| * 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. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| * @see #getType() |
| */ |
| public static final int TYPE_FLIP = 64; |
| |
| /** |
| * 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. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_FLIP |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| * @see #TYPE_MASK_ROTATION |
| * @see #getType() |
| */ |
| public static final int TYPE_QUADRANT_ROTATION = 8; |
| |
| /** |
| * The transformation includes a rotation by an arbitrary angle. Angles are |
| * rotated, but length is preserved. This is mutually exclusive with |
| * TYPE_QUADRANT_ROTATION. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_FLIP |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| * @see #TYPE_MASK_ROTATION |
| * @see #getType() |
| */ |
| public static final int TYPE_GENERAL_ROTATION = 16; |
| |
| /** |
| * This constant checks if either variety of rotation is performed. |
| * |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| */ |
| public static final int TYPE_MASK_ROTATION = 24; |
| |
| /** |
| * The transformation is an arbitrary conversion of coordinates which |
| * could not be decomposed into the other TYPEs. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_FLIP |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #getType() |
| */ |
| public static final int TYPE_GENERAL_TRANSFORM = 32; |
| |
| /** |
| * The X coordinate scaling element of the transform matrix. |
| * |
| * @serial matrix[0,0] |
| */ |
| private double m00; |
| |
| /** |
| * The Y coordinate shearing element of the transform matrix. |
| * |
| * @serial matrix[1,0] |
| */ |
| private double m10; |
| |
| /** |
| * The X coordinate shearing element of the transform matrix. |
| * |
| * @serial matrix[0,1] |
| */ |
| private double m01; |
| |
| /** |
| * The Y coordinate scaling element of the transform matrix. |
| * |
| * @serial matrix[1,1] |
| */ |
| private double m11; |
| |
| /** |
| * The X coordinate translation element of the transform matrix. |
| * |
| * @serial matrix[0,2] |
| */ |
| private double m02; |
| |
| /** |
| * The Y coordinate translation element of the transform matrix. |
| * |
| * @serial matrix[1,2] |
| */ |
| private double m12; |
| |
| /** The type of this transform. */ |
| private transient int type; |
| |
| /** |
| * Construct a new identity transform: |
| * <pre> |
| * [ 1 0 0 ] |
| * [ 0 1 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| */ |
| public AffineTransform() |
| { |
| m00 = m11 = 1; |
| } |
| |
| /** |
| * Create a new transform which copies the given one. |
| * |
| * @param tx the transform to copy |
| * @throws NullPointerException if tx is null |
| */ |
| public AffineTransform(AffineTransform tx) |
| { |
| setTransform(tx); |
| } |
| |
| /** |
| * Construct a transform with the given matrix entries: |
| * <pre> |
| * [ m00 m01 m02 ] |
| * [ m10 m11 m12 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param m00 the x scaling component |
| * @param m10 the y shearing component |
| * @param m01 the x shearing component |
| * @param m11 the y scaling component |
| * @param m02 the x translation component |
| * @param m12 the y translation component |
| */ |
| public AffineTransform(float m00, float m10, |
| float m01, float m11, |
| float m02, float m12) |
| { |
| this.m00 = m00; |
| this.m10 = m10; |
| this.m01 = m01; |
| this.m11 = m11; |
| this.m02 = m02; |
| this.m12 = m12; |
| updateType(); |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * [ f[0] f[2] (f[4]) ] |
| * [ f[1] f[3] (f[5]) ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param f the matrix to copy from, with at least 4 (6) entries |
| * @throws NullPointerException if f is null |
| * @throws ArrayIndexOutOfBoundsException if f is too small |
| */ |
| public AffineTransform(float[] f) |
| { |
| m00 = f[0]; |
| m10 = f[1]; |
| m01 = f[2]; |
| m11 = f[3]; |
| if (f.length >= 6) |
| { |
| m02 = f[4]; |
| m12 = f[5]; |
| } |
| updateType(); |
| } |
| |
| /** |
| * Construct a transform with the given matrix entries: |
| * <pre> |
| * [ m00 m01 m02 ] |
| * [ m10 m11 m12 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param m00 the x scaling component |
| * @param m10 the y shearing component |
| * @param m01 the x shearing component |
| * @param m11 the y scaling component |
| * @param m02 the x translation component |
| * @param m12 the y translation component |
| */ |
| public AffineTransform(double m00, double m10, double m01, |
| double m11, double m02, double m12) |
| { |
| this.m00 = m00; |
| this.m10 = m10; |
| this.m01 = m01; |
| this.m11 = m11; |
| this.m02 = m02; |
| this.m12 = m12; |
| updateType(); |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * [ d[0] d[2] (d[4]) ] |
| * [ d[1] d[3] (d[5]) ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param d the matrix to copy from, with at least 4 (6) entries |
| * @throws NullPointerException if d is null |
| * @throws ArrayIndexOutOfBoundsException if d is too small |
| */ |
| public AffineTransform(double[] d) |
| { |
| m00 = d[0]; |
| m10 = d[1]; |
| m01 = d[2]; |
| m11 = d[3]; |
| if (d.length >= 6) |
| { |
| m02 = d[4]; |
| m12 = d[5]; |
| } |
| updateType(); |
| } |
| |
| /** |
| * Returns a translation transform: |
| * <pre> |
| * [ 1 0 tx ] |
| * [ 0 1 ty ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param tx the x translation distance |
| * @param ty the y translation distance |
| * @return the translating transform |
| */ |
| public static AffineTransform getTranslateInstance(double tx, double ty) |
| { |
| AffineTransform t = new AffineTransform(); |
| t.setToTranslation(tx, ty); |
| return t; |
| } |
| |
| /** |
| * Returns a rotation transform. A positive angle (in radians) rotates |
| * the positive x-axis to the positive y-axis: |
| * <pre> |
| * [ cos(theta) -sin(theta) 0 ] |
| * [ sin(theta) cos(theta) 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param theta the rotation angle |
| * @return the rotating transform |
| */ |
| public static AffineTransform getRotateInstance(double theta) |
| { |
| AffineTransform t = new AffineTransform(); |
| t.setToRotation(theta); |
| return t; |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * AffineTransform tx = new AffineTransform(); |
| * tx.setToTranslation(x, y); |
| * tx.rotate(theta); |
| * tx.translate(-x, -y); |
| * </pre> |
| * |
| * <p>The resulting matrix is: |
| * <pre> |
| * [ cos(theta) -sin(theta) x-x*cos+y*sin ] |
| * [ sin(theta) cos(theta) y-x*sin-y*cos ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param theta the rotation angle |
| * @param x the x coordinate of the pivot point |
| * @param y the y coordinate of the pivot point |
| * @return the rotating transform |
| */ |
| public static AffineTransform getRotateInstance(double theta, |
| double x, double y) |
| { |
| AffineTransform t = new AffineTransform(); |
| t.setToTranslation(x, y); |
| t.rotate(theta); |
| t.translate(-x, -y); |
| return t; |
| } |
| |
| /** |
| * Returns a scaling transform: |
| * <pre> |
| * [ sx 0 0 ] |
| * [ 0 sy 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param sx the x scaling factor |
| * @param sy the y scaling factor |
| * @return the scaling transform |
| */ |
| public static AffineTransform getScaleInstance(double sx, double sy) |
| { |
| AffineTransform t = new AffineTransform(); |
| t.setToScale(sx, sy); |
| return t; |
| } |
| |
| /** |
| * 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): |
| * <pre> |
| * [ 1 shx 0 ] |
| * [ shy 1 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param shx the x shearing factor |
| * @param shy the y shearing factor |
| * @return the shearing transform |
| */ |
| public static AffineTransform getShearInstance(double shx, double shy) |
| { |
| AffineTransform t = new AffineTransform(); |
| t.setToShear(shx, shy); |
| return t; |
| } |
| |
| /** |
| * 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. |
| * |
| * @return The type. |
| * |
| * @see #TYPE_IDENTITY |
| * @see #TYPE_TRANSLATION |
| * @see #TYPE_UNIFORM_SCALE |
| * @see #TYPE_GENERAL_SCALE |
| * @see #TYPE_QUADRANT_ROTATION |
| * @see #TYPE_GENERAL_ROTATION |
| * @see #TYPE_GENERAL_TRANSFORM |
| */ |
| public int getType() |
| { |
| return type; |
| } |
| |
| /** |
| * 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. |
| * |
| * <p>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: |
| * <pre> |
| * | m00 m01 m02 | |
| * | m10 m11 m12 | = m00 * m11 - m01 * m10 |
| * | 0 0 1 | |
| * </pre> |
| * |
| * @return the determinant |
| * @see #createInverse() |
| */ |
| public double getDeterminant() |
| { |
| return m00 * m11 - m01 * m10; |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * [ d[0] d[2] (d[4]) ] |
| * [ d[1] d[3] (d[5]) ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param d the matrix to store the results into; with 4 (6) entries |
| * @throws NullPointerException if d is null |
| * @throws ArrayIndexOutOfBoundsException if d is too small |
| */ |
| public void getMatrix(double[] d) |
| { |
| d[0] = m00; |
| d[1] = m10; |
| d[2] = m01; |
| d[3] = m11; |
| if (d.length >= 6) |
| { |
| d[4] = m02; |
| d[5] = m12; |
| } |
| } |
| |
| /** |
| * Returns the X coordinate scaling factor of the matrix. |
| * |
| * @return m00 |
| * @see #getMatrix(double[]) |
| */ |
| public double getScaleX() |
| { |
| return m00; |
| } |
| |
| /** |
| * Returns the Y coordinate scaling factor of the matrix. |
| * |
| * @return m11 |
| * @see #getMatrix(double[]) |
| */ |
| public double getScaleY() |
| { |
| return m11; |
| } |
| |
| /** |
| * Returns the X coordinate shearing factor of the matrix. |
| * |
| * @return m01 |
| * @see #getMatrix(double[]) |
| */ |
| public double getShearX() |
| { |
| return m01; |
| } |
| |
| /** |
| * Returns the Y coordinate shearing factor of the matrix. |
| * |
| * @return m10 |
| * @see #getMatrix(double[]) |
| */ |
| public double getShearY() |
| { |
| return m10; |
| } |
| |
| /** |
| * Returns the X coordinate translation factor of the matrix. |
| * |
| * @return m02 |
| * @see #getMatrix(double[]) |
| */ |
| public double getTranslateX() |
| { |
| return m02; |
| } |
| |
| /** |
| * Returns the Y coordinate translation factor of the matrix. |
| * |
| * @return m12 |
| * @see #getMatrix(double[]) |
| */ |
| public double getTranslateY() |
| { |
| return m12; |
| } |
| |
| /** |
| * Concatenate a translation onto this transform. This is equivalent, but |
| * more efficient than |
| * <code>concatenate(AffineTransform.getTranslateInstance(tx, ty))</code>. |
| * |
| * @param tx the x translation distance |
| * @param ty the y translation distance |
| * @see #getTranslateInstance(double, double) |
| * @see #concatenate(AffineTransform) |
| */ |
| public void translate(double tx, double ty) |
| { |
| m02 += tx * m00 + ty * m01; |
| m12 += tx * m10 + ty * m11; |
| updateType(); |
| } |
| |
| /** |
| * Concatenate a rotation onto this transform. This is equivalent, but |
| * more efficient than |
| * <code>concatenate(AffineTransform.getRotateInstance(theta))</code>. |
| * |
| * @param theta the rotation angle |
| * @see #getRotateInstance(double) |
| * @see #concatenate(AffineTransform) |
| */ |
| public void rotate(double theta) |
| { |
| double c = Math.cos(theta); |
| double s = Math.sin(theta); |
| double n00 = m00 * c + m01 * s; |
| double n01 = m00 * -s + m01 * c; |
| double n10 = m10 * c + m11 * s; |
| double n11 = m10 * -s + m11 * c; |
| m00 = n00; |
| m01 = n01; |
| m10 = n10; |
| m11 = n11; |
| updateType(); |
| } |
| |
| /** |
| * Concatenate a rotation about a point onto this transform. This is |
| * equivalent, but more efficient than |
| * <code>concatenate(AffineTransform.getRotateInstance(theta, x, y))</code>. |
| * |
| * @param theta the rotation angle |
| * @param x the x coordinate of the pivot point |
| * @param y the y coordinate of the pivot point |
| * @see #getRotateInstance(double, double, double) |
| * @see #concatenate(AffineTransform) |
| */ |
| public void rotate(double theta, double x, double y) |
| { |
| translate(x, y); |
| rotate(theta); |
| translate(-x, -y); |
| } |
| |
| /** |
| * Concatenate a scale onto this transform. This is equivalent, but more |
| * efficient than |
| * <code>concatenate(AffineTransform.getScaleInstance(sx, sy))</code>. |
| * |
| * @param sx the x scaling factor |
| * @param sy the y scaling factor |
| * @see #getScaleInstance(double, double) |
| * @see #concatenate(AffineTransform) |
| */ |
| public void scale(double sx, double sy) |
| { |
| m00 *= sx; |
| m01 *= sy; |
| m10 *= sx; |
| m11 *= sy; |
| updateType(); |
| } |
| |
| /** |
| * Concatenate a shearing onto this transform. This is equivalent, but more |
| * efficient than |
| * <code>concatenate(AffineTransform.getShearInstance(sx, sy))</code>. |
| * |
| * @param shx the x shearing factor |
| * @param shy the y shearing factor |
| * @see #getShearInstance(double, double) |
| * @see #concatenate(AffineTransform) |
| */ |
| public void shear(double shx, double shy) |
| { |
| double n00 = m00 + (shy * m01); |
| double n01 = m01 + (shx * m00); |
| double n10 = m10 + (shy * m11); |
| double n11 = m11 + (shx * m10); |
| m00 = n00; |
| m01 = n01; |
| m10 = n10; |
| m11 = n11; |
| updateType(); |
| } |
| |
| /** |
| * Reset this transform to the identity (no transformation): |
| * <pre> |
| * [ 1 0 0 ] |
| * [ 0 1 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| */ |
| public void setToIdentity() |
| { |
| m00 = m11 = 1; |
| m01 = m02 = m10 = m12 = 0; |
| type = TYPE_IDENTITY; |
| } |
| |
| /** |
| * Set this transform to a translation: |
| * <pre> |
| * [ 1 0 tx ] |
| * [ 0 1 ty ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param tx the x translation distance |
| * @param ty the y translation distance |
| */ |
| public void setToTranslation(double tx, double ty) |
| { |
| m00 = m11 = 1; |
| m01 = m10 = 0; |
| m02 = tx; |
| m12 = ty; |
| type = (tx == 0 && ty == 0) ? TYPE_UNIFORM_SCALE : TYPE_TRANSLATION; |
| } |
| |
| /** |
| * Set this transform to a rotation. A positive angle (in radians) rotates |
| * the positive x-axis to the positive y-axis: |
| * <pre> |
| * [ cos(theta) -sin(theta) 0 ] |
| * [ sin(theta) cos(theta) 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param theta the rotation angle |
| */ |
| public void setToRotation(double theta) |
| { |
| double c = Math.cos(theta); |
| double s = Math.sin(theta); |
| m00 = c; |
| m01 = -s; |
| m02 = 0; |
| m10 = s; |
| m11 = c; |
| m12 = 0; |
| type = (c == 1 ? TYPE_IDENTITY |
| : c == 0 || c == -1 ? TYPE_QUADRANT_ROTATION |
| : TYPE_GENERAL_ROTATION); |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * tx.setToTranslation(x, y); |
| * tx.rotate(theta); |
| * tx.translate(-x, -y); |
| * </pre> |
| * |
| * <p>The resulting matrix is: |
| * <pre> |
| * [ cos(theta) -sin(theta) x-x*cos+y*sin ] |
| * [ sin(theta) cos(theta) y-x*sin-y*cos ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param theta the rotation angle |
| * @param x the x coordinate of the pivot point |
| * @param y the y coordinate of the pivot point |
| */ |
| public void setToRotation(double theta, double x, double y) |
| { |
| double c = Math.cos(theta); |
| double s = Math.sin(theta); |
| m00 = c; |
| m01 = -s; |
| m02 = x - x * c + y * s; |
| m10 = s; |
| m11 = c; |
| m12 = y - x * s - y * c; |
| updateType(); |
| } |
| |
| /** |
| * Set this transform to a scale: |
| * <pre> |
| * [ sx 0 0 ] |
| * [ 0 sy 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param sx the x scaling factor |
| * @param sy the y scaling factor |
| */ |
| public void setToScale(double sx, double sy) |
| { |
| m00 = sx; |
| m01 = m02 = m10 = m12 = 0; |
| m11 = sy; |
| type = (sx != sy ? TYPE_GENERAL_SCALE |
| : sx == 1 ? TYPE_IDENTITY : TYPE_UNIFORM_SCALE); |
| } |
| |
| /** |
| * 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): |
| * <pre> |
| * [ 1 shx 0 ] |
| * [ shy 1 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param shx the x shearing factor |
| * @param shy the y shearing factor |
| */ |
| public void setToShear(double shx, double shy) |
| { |
| m00 = m11 = 1; |
| m01 = shx; |
| m10 = shy; |
| m02 = m12 = 0; |
| updateType(); |
| } |
| |
| /** |
| * Set this transform to a copy of the given one. |
| * |
| * @param tx the transform to copy |
| * @throws NullPointerException if tx is null |
| */ |
| public void setTransform(AffineTransform tx) |
| { |
| m00 = tx.m00; |
| m01 = tx.m01; |
| m02 = tx.m02; |
| m10 = tx.m10; |
| m11 = tx.m11; |
| m12 = tx.m12; |
| type = tx.type; |
| } |
| |
| /** |
| * Set this transform to the given values: |
| * <pre> |
| * [ m00 m01 m02 ] |
| * [ m10 m11 m12 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @param m00 the x scaling component |
| * @param m10 the y shearing component |
| * @param m01 the x shearing component |
| * @param m11 the y scaling component |
| * @param m02 the x translation component |
| * @param m12 the y translation component |
| */ |
| public void setTransform(double m00, double m10, double m01, |
| double m11, double m02, double m12) |
| { |
| this.m00 = m00; |
| this.m10 = m10; |
| this.m01 = m01; |
| this.m11 = m11; |
| this.m02 = m02; |
| this.m12 = m12; |
| updateType(); |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * [ this ] = [ this ] x [ tx ] |
| * </pre> |
| * |
| * @param tx the transform to concatenate |
| * @throws NullPointerException if tx is null |
| * @see #preConcatenate(AffineTransform) |
| */ |
| public void concatenate(AffineTransform tx) |
| { |
| double n00 = m00 * tx.m00 + m01 * tx.m10; |
| double n01 = m00 * tx.m01 + m01 * tx.m11; |
| double n02 = m00 * tx.m02 + m01 * tx.m12 + m02; |
| double n10 = m10 * tx.m00 + m11 * tx.m10; |
| double n11 = m10 * tx.m01 + m11 * tx.m11; |
| double n12 = m10 * tx.m02 + m11 * tx.m12 + m12; |
| m00 = n00; |
| m01 = n01; |
| m02 = n02; |
| m10 = n10; |
| m11 = n11; |
| m12 = n12; |
| updateType(); |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * [ this ] = [ tx ] x [ this ] |
| * </pre> |
| * |
| * @param tx the transform to concatenate |
| * @throws NullPointerException if tx is null |
| * @see #concatenate(AffineTransform) |
| */ |
| public void preConcatenate(AffineTransform tx) |
| { |
| double n00 = tx.m00 * m00 + tx.m01 * m10; |
| double n01 = tx.m00 * m01 + tx.m01 * m11; |
| double n02 = tx.m00 * m02 + tx.m01 * m12 + tx.m02; |
| double n10 = tx.m10 * m00 + tx.m11 * m10; |
| double n11 = tx.m10 * m01 + tx.m11 * m11; |
| double n12 = tx.m10 * m02 + tx.m11 * m12 + tx.m12; |
| m00 = n00; |
| m01 = n01; |
| m02 = n02; |
| m10 = n10; |
| m11 = n11; |
| m12 = n12; |
| updateType(); |
| } |
| |
| /** |
| * 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: |
| * |
| * <pre> |
| * |
| * 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 ] |
| * |
| * |
| * </pre> |
| * |
| * |
| * |
| * @return a new inverse transform |
| * @throws NoninvertibleTransformException if inversion is not possible |
| * @see #getDeterminant() |
| */ |
| public AffineTransform createInverse() |
| throws NoninvertibleTransformException |
| { |
| double det = getDeterminant(); |
| if (det == 0) |
| throw new NoninvertibleTransformException("can't invert transform"); |
| |
| double im00 = m11 / det; |
| double im10 = -m10 / det; |
| double im01 = -m01 / det; |
| double im11 = m00 / det; |
| double im02 = (m01 * m12 - m02 * m11) / det; |
| double im12 = (-m00 * m12 + m10 * m02) / det; |
| |
| return new AffineTransform (im00, im10, im01, im11, im02, im12); |
| } |
| |
| /** |
| * 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. |
| * |
| * @param src the source point |
| * @param dst the destination, or null |
| * @return the transformation of src, in dst if it was non-null |
| * @throws NullPointerException if src is null |
| */ |
| public Point2D transform(Point2D src, Point2D dst) |
| { |
| if (dst == null) |
| dst = new Point2D.Double(); |
| double x = src.getX(); |
| double y = src.getY(); |
| double nx = m00 * x + m01 * y + m02; |
| double ny = m10 * x + m11 * y + m12; |
| dst.setLocation(nx, ny); |
| return dst; |
| } |
| |
| /** |
| * 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. |
| * |
| * @param src the array of source points |
| * @param srcOff the starting offset into src |
| * @param dst the array of destination points (may have null entries) |
| * @param dstOff the starting offset into dst |
| * @param num the number of points to transform |
| * @throws NullPointerException if src or dst is null, or src has null |
| * entries |
| * @throws ArrayIndexOutOfBoundsException if array bounds are exceeded |
| * @throws ArrayStoreException if new points are incompatible with dst |
| */ |
| public void transform(Point2D[] src, int srcOff, |
| Point2D[] dst, int dstOff, int num) |
| { |
| while (--num >= 0) |
| dst[dstOff] = transform(src[srcOff++], dst[dstOff++]); |
| } |
| |
| /** |
| * 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. |
| * |
| * @param srcPts the array of source points |
| * @param srcOff the starting offset into src |
| * @param dstPts the array of destination points |
| * @param dstOff the starting offset into dst |
| * @param num the number of points to transform |
| * @throws NullPointerException if src or dst is null |
| * @throws ArrayIndexOutOfBoundsException if array bounds are exceeded |
| */ |
| public void transform(float[] srcPts, int srcOff, |
| float[] dstPts, int dstOff, int num) |
| { |
| if (srcPts == dstPts && dstOff > srcOff |
| && num > 1 && srcOff + 2 * num > dstOff) |
| { |
| float[] f = new float[2 * num]; |
| System.arraycopy(srcPts, srcOff, f, 0, 2 * num); |
| srcPts = f; |
| } |
| while (--num >= 0) |
| { |
| float x = srcPts[srcOff++]; |
| float y = srcPts[srcOff++]; |
| dstPts[dstOff++] = (float) (m00 * x + m01 * y + m02); |
| dstPts[dstOff++] = (float) (m10 * x + m11 * y + m12); |
| } |
| } |
| |
| /** |
| * 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. |
| * |
| * @param srcPts the array of source points |
| * @param srcOff the starting offset into src |
| * @param dstPts the array of destination points |
| * @param dstOff the starting offset into dst |
| * @param num the number of points to transform |
| * @throws NullPointerException if src or dst is null |
| * @throws ArrayIndexOutOfBoundsException if array bounds are exceeded |
| */ |
| public void transform(double[] srcPts, int srcOff, |
| double[] dstPts, int dstOff, int num) |
| { |
| if (srcPts == dstPts && dstOff > srcOff |
| && num > 1 && srcOff + 2 * num > dstOff) |
| { |
| double[] d = new double[2 * num]; |
| System.arraycopy(srcPts, srcOff, d, 0, 2 * num); |
| srcPts = d; |
| } |
| while (--num >= 0) |
| { |
| double x = srcPts[srcOff++]; |
| double y = srcPts[srcOff++]; |
| dstPts[dstOff++] = m00 * x + m01 * y + m02; |
| dstPts[dstOff++] = m10 * x + m11 * y + m12; |
| } |
| } |
| |
| /** |
| * 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. |
| * |
| * @param srcPts the array of source points |
| * @param srcOff the starting offset into src |
| * @param dstPts the array of destination points |
| * @param dstOff the starting offset into dst |
| * @param num the number of points to transform |
| * @throws NullPointerException if src or dst is null |
| * @throws ArrayIndexOutOfBoundsException if array bounds are exceeded |
| */ |
| public void transform(float[] srcPts, int srcOff, |
| double[] dstPts, int dstOff, int num) |
| { |
| while (--num >= 0) |
| { |
| float x = srcPts[srcOff++]; |
| float y = srcPts[srcOff++]; |
| dstPts[dstOff++] = m00 * x + m01 * y + m02; |
| dstPts[dstOff++] = m10 * x + m11 * y + m12; |
| } |
| } |
| |
| /** |
| * 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. |
| * |
| * @param srcPts the array of source points |
| * @param srcOff the starting offset into src |
| * @param dstPts the array of destination points |
| * @param dstOff the starting offset into dst |
| * @param num the number of points to transform |
| * @throws NullPointerException if src or dst is null |
| * @throws ArrayIndexOutOfBoundsException if array bounds are exceeded |
| */ |
| public void transform(double[] srcPts, int srcOff, |
| float[] dstPts, int dstOff, int num) |
| { |
| while (--num >= 0) |
| { |
| double x = srcPts[srcOff++]; |
| double y = srcPts[srcOff++]; |
| dstPts[dstOff++] = (float) (m00 * x + m01 * y + m02); |
| dstPts[dstOff++] = (float) (m10 * x + m11 * y + m12); |
| } |
| } |
| |
| /** |
| * 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. |
| * |
| * @param src the source point |
| * @param dst the destination, or null |
| * @return the inverse transformation of src, in dst if it was non-null |
| * @throws NullPointerException if src is null |
| * @throws NoninvertibleTransformException if the inverse does not exist |
| * @see #getDeterminant() |
| */ |
| public Point2D inverseTransform(Point2D src, Point2D dst) |
| throws NoninvertibleTransformException |
| { |
| return createInverse().transform(src, dst); |
| } |
| |
| /** |
| * 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. |
| * |
| * @param srcPts the array of source points |
| * @param srcOff the starting offset into src |
| * @param dstPts the array of destination points |
| * @param dstOff the starting offset into dst |
| * @param num the number of points to transform |
| * @throws NullPointerException if src or dst is null |
| * @throws ArrayIndexOutOfBoundsException if array bounds are exceeded |
| * @throws NoninvertibleTransformException if the inverse does not exist |
| * @see #getDeterminant() |
| */ |
| public void inverseTransform(double[] srcPts, int srcOff, |
| double[] dstPts, int dstOff, int num) |
| throws NoninvertibleTransformException |
| { |
| createInverse().transform(srcPts, srcOff, dstPts, dstOff, num); |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * [ x' ] = [ m00 m01 ] [ x ] = [ m00 * x + m01 * y ] |
| * [ y' ] [ m10 m11 ] [ y ] = [ m10 * x + m11 * y ] |
| * </pre> |
| * |
| * @param src the source point |
| * @param dst the destination, or null |
| * @return the delta transformation of src, in dst if it was non-null |
| * @throws NullPointerException if src is null |
| */ |
| public Point2D deltaTransform(Point2D src, Point2D dst) |
| { |
| if (dst == null) |
| dst = new Point2D.Double(); |
| double x = src.getX(); |
| double y = src.getY(); |
| double nx = m00 * x + m01 * y; |
| double ny = m10 * x + m11 * y; |
| dst.setLocation(nx, ny); |
| return dst; |
| } |
| |
| /** |
| * 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: |
| * <pre> |
| * [ x' ] = [ m00 m01 ] [ x ] = [ m00 * x + m01 * y ] |
| * [ y' ] [ m10 m11 ] [ y ] = [ m10 * x + m11 * y ] |
| * </pre> |
| * |
| * @param srcPts the array of source points |
| * @param srcOff the starting offset into src |
| * @param dstPts the array of destination points |
| * @param dstOff the starting offset into dst |
| * @param num the number of points to transform |
| * @throws NullPointerException if src or dst is null |
| * @throws ArrayIndexOutOfBoundsException if array bounds are exceeded |
| */ |
| public void deltaTransform(double[] srcPts, int srcOff, |
| double[] dstPts, int dstOff, |
| int num) |
| { |
| if (srcPts == dstPts && dstOff > srcOff |
| && num > 1 && srcOff + 2 * num > dstOff) |
| { |
| double[] d = new double[2 * num]; |
| System.arraycopy(srcPts, srcOff, d, 0, 2 * num); |
| srcPts = d; |
| } |
| while (--num >= 0) |
| { |
| double x = srcPts[srcOff++]; |
| double y = srcPts[srcOff++]; |
| dstPts[dstOff++] = m00 * x + m01 * y; |
| dstPts[dstOff++] = m10 * x + m11 * y; |
| } |
| } |
| |
| /** |
| * 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. |
| * |
| * @param src the shape source to transform |
| * @return the shape, transformed by this, <code>null</code> if src is |
| * <code>null</code>. |
| * @see GeneralPath#transform(AffineTransform) |
| */ |
| public Shape createTransformedShape(Shape src) |
| { |
| if(src == null) |
| return null; |
| GeneralPath p = new GeneralPath(src); |
| p.transform(this); |
| return p; |
| } |
| |
| /** |
| * Returns a string representation of the transform, in the format: |
| * <code>"AffineTransform[[" + m00 + ", " + m01 + ", " + m02 + "], [" |
| * + m10 + ", " + m11 + ", " + m12 + "]]"</code>. |
| * |
| * @return the string representation |
| */ |
| public String toString() |
| { |
| return "AffineTransform[[" + m00 + ", " + m01 + ", " + m02 + "], [" |
| + m10 + ", " + m11 + ", " + m12 + "]]"; |
| } |
| |
| /** |
| * Tests if this transformation is the identity: |
| * <pre> |
| * [ 1 0 0 ] |
| * [ 0 1 0 ] |
| * [ 0 0 1 ] |
| * </pre> |
| * |
| * @return true if this is the identity transform |
| */ |
| public boolean isIdentity() |
| { |
| // Rather than rely on type, check explicitly. |
| return (m00 == 1 && m01 == 0 && m02 == 0 |
| && m10 == 0 && m11 == 1 && m12 == 0); |
| } |
| |
| /** |
| * Create a new transform of the same run-time type, with the same |
| * transforming properties as this one. |
| * |
| * @return the clone |
| */ |
| public Object clone() |
| { |
| try |
| { |
| return super.clone(); |
| } |
| catch (CloneNotSupportedException e) |
| { |
| throw (Error) new InternalError().initCause(e); // Impossible |
| } |
| } |
| |
| /** |
| * Return the hashcode for this transformation. The formula is not |
| * documented, but appears to be the same as: |
| * <pre> |
| * long l = Double.doubleToLongBits(getScaleX()); |
| * l = l * 31 + Double.doubleToLongBits(getShearY()); |
| * l = l * 31 + Double.doubleToLongBits(getShearX()); |
| * l = l * 31 + Double.doubleToLongBits(getScaleY()); |
| * l = l * 31 + Double.doubleToLongBits(getTranslateX()); |
| * l = l * 31 + Double.doubleToLongBits(getTranslateY()); |
| * return (int) ((l >> 32) ^ l); |
| * </pre> |
| * |
| * @return the hashcode |
| */ |
| public int hashCode() |
| { |
| long l = Double.doubleToLongBits(m00); |
| l = l * 31 + Double.doubleToLongBits(m10); |
| l = l * 31 + Double.doubleToLongBits(m01); |
| l = l * 31 + Double.doubleToLongBits(m11); |
| l = l * 31 + Double.doubleToLongBits(m02); |
| l = l * 31 + Double.doubleToLongBits(m12); |
| return (int) ((l >> 32) ^ l); |
| } |
| |
| /** |
| * Compares two transforms for equality. This returns true if they have the |
| * same matrix values. |
| * |
| * @param obj the transform to compare |
| * @return true if it is equal |
| */ |
| public boolean equals(Object obj) |
| { |
| if (! (obj instanceof AffineTransform)) |
| return false; |
| AffineTransform t = (AffineTransform) obj; |
| return (m00 == t.m00 && m01 == t.m01 && m02 == t.m02 |
| && m10 == t.m10 && m11 == t.m11 && m12 == t.m12); |
| } |
| |
| /** |
| * Helper to decode the type from the matrix. This is not guaranteed |
| * to find the optimal type, but at least it will be valid. |
| */ |
| private void updateType() |
| { |
| double det = getDeterminant(); |
| if (det == 0) |
| { |
| type = TYPE_GENERAL_TRANSFORM; |
| return; |
| } |
| // Scale (includes rotation by PI) or translation. |
| if (m01 == 0 && m10 == 0) |
| { |
| if (m00 == m11) |
| type = m00 == 1 ? TYPE_IDENTITY : TYPE_UNIFORM_SCALE; |
| else |
| type = TYPE_GENERAL_SCALE; |
| if (m02 != 0 || m12 != 0) |
| type |= TYPE_TRANSLATION; |
| } |
| // Rotation. |
| else if (m00 == m11 && m01 == -m10) |
| { |
| type = m00 == 0 ? TYPE_QUADRANT_ROTATION : TYPE_GENERAL_ROTATION; |
| if (det != 1) |
| type |= TYPE_UNIFORM_SCALE; |
| if (m02 != 0 || m12 != 0) |
| type |= TYPE_TRANSLATION; |
| } |
| else |
| type = TYPE_GENERAL_TRANSFORM; |
| } |
| |
| /** |
| * Reads a transform from an object stream. |
| * |
| * @param s the stream to read from |
| * @throws ClassNotFoundException if there is a problem deserializing |
| * @throws IOException if there is a problem deserializing |
| */ |
| private void readObject(ObjectInputStream s) |
| throws ClassNotFoundException, IOException |
| { |
| s.defaultReadObject(); |
| updateType(); |
| } |
| } // class AffineTransform |
