mirror of
https://github.com/Jozufozu/Flywheel.git
synced 2024-11-14 06:24:12 +01:00
3067 lines
118 KiB
Java
3067 lines
118 KiB
Java
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/*
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* The MIT License
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*
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* Copyright (c) 2015-2021 Richard Greenlees
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*
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* Permission is hereby granted, free of charge, to any person obtaining a copy
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* of this software and associated documentation files (the "Software"), to deal
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* in the Software without restriction, including without limitation the rights
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* to use, copy, modify, merge, publish, distribute, sublicense, and/or sell
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* copies of the Software, and to permit persons to whom the Software is
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* furnished to do so, subject to the following conditions:
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*
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* The above copyright notice and this permission notice shall be included in
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* all copies or substantial portions of the Software.
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*
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* THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR
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* IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
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* FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE
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* AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER
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* LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM,
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* OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN
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* THE SOFTWARE.
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*/
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package com.jozufozu.flywheel.repack.joml;
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import java.io.Externalizable;
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import java.io.IOException;
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import java.io.ObjectInput;
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import java.io.ObjectOutput;
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import java.nio.ByteBuffer;
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import java.nio.FloatBuffer;
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import java.text.DecimalFormat;
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import java.text.NumberFormat;
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/**
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* Quaternion of 4 single-precision floats which can represent rotation and uniform scaling.
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*
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* @author Richard Greenlees
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* @author Kai Burjack
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*/
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public class Quaternionf implements Externalizable, Cloneable, Quaternionfc {
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private static final long serialVersionUID = 1L;
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/**
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* The first component of the vector part.
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*/
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public float x;
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/**
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* The second component of the vector part.
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*/
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public float y;
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/**
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* The third component of the vector part.
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*/
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public float z;
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/**
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* The real/scalar part of the quaternion.
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*/
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public float w;
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/**
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* Create a new {@link Quaternionf} and initialize it with <code>(x=0, y=0, z=0, w=1)</code>,
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* where <code>(x, y, z)</code> is the vector part of the quaternion and <code>w</code> is the real/scalar part.
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*/
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public Quaternionf() {
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this.w = 1.0f;
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}
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/**
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* Create a new {@link Quaternionf} and initialize its components to the given values.
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*
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* @param x
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* the first component of the imaginary part
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* @param y
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* the second component of the imaginary part
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* @param z
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* the third component of the imaginary part
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* @param w
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* the real part
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*/
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public Quaternionf(double x, double y, double z, double w) {
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this.x = (float) x;
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this.y = (float) y;
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this.z = (float) z;
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this.w = (float) w;
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}
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/**
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* Create a new {@link Quaternionf} and initialize its components to the given values.
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*
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* @param x
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* the first component of the imaginary part
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* @param y
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* the second component of the imaginary part
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* @param z
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* the third component of the imaginary part
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* @param w
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* the real part
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*/
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public Quaternionf(float x, float y, float z, float w) {
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this.x = x;
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this.y = y;
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this.z = z;
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this.w = w;
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}
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/**
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* Create a new {@link Quaternionf} and initialize its components to the same values as the given {@link Quaternionfc}.
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*
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* @param source
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* the {@link Quaternionfc} to take the component values from
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*/
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public Quaternionf(Quaternionfc source) {
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set(source);
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}
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/**
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* Create a new {@link Quaternionf} and initialize its components to the same values as the given {@link Quaterniondc}.
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*
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* @param source
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* the {@link Quaterniondc} to take the component values from
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*/
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public Quaternionf(Quaterniondc source) {
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set(source);
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}
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/**
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* Create a new {@link Quaternionf} which represents the rotation of the given {@link AxisAngle4f}.
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*
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* @param axisAngle
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* the {@link AxisAngle4f}
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*/
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public Quaternionf(AxisAngle4f axisAngle) {
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float sin = Math.sin(axisAngle.angle * 0.5f);
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float cos = Math.cosFromSin(sin, axisAngle.angle * 0.5f);
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x = axisAngle.x * sin;
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y = axisAngle.y * sin;
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z = axisAngle.z * sin;
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w = cos;
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}
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/**
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* Create a new {@link Quaterniond} which represents the rotation of the given {@link AxisAngle4d}.
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*
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* @param axisAngle
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* the {@link AxisAngle4d}
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*/
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public Quaternionf(AxisAngle4d axisAngle) {
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double sin = Math.sin(axisAngle.angle * 0.5f);
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double cos = Math.cosFromSin(sin, axisAngle.angle * 0.5f);
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x = (float) (axisAngle.x * sin);
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y = (float) (axisAngle.y * sin);
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z = (float) (axisAngle.z * sin);
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w = (float) cos;
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}
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/**
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* @return the first component of the vector part
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*/
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public float x() {
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return this.x;
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}
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/**
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* @return the second component of the vector part
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*/
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public float y() {
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return this.y;
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}
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/**
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* @return the third component of the vector part
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*/
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public float z() {
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return this.z;
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}
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/**
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* @return the real/scalar part of the quaternion
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*/
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public float w() {
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return this.w;
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}
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/**
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* Normalize this quaternion.
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*
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* @return this
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*/
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public Quaternionf normalize() {
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return normalize(this);
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}
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public Quaternionf normalize(Quaternionf dest) {
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float invNorm = Math.invsqrt(Math.fma(x, x, Math.fma(y, y, Math.fma(z, z, w * w))));
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dest.x = x * invNorm;
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dest.y = y * invNorm;
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dest.z = z * invNorm;
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dest.w = w * invNorm;
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return dest;
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}
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/**
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* Add the quaternion <code>(x, y, z, w)</code> to this quaternion.
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*
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* @param x
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* the x component of the vector part
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* @param y
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* the y component of the vector part
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* @param z
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* the z component of the vector part
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* @param w
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* the real/scalar component
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* @return this
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*/
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public Quaternionf add(float x, float y, float z, float w) {
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return add(x, y, z, w, this);
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}
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public Quaternionf add(float x, float y, float z, float w, Quaternionf dest) {
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dest.x = this.x + x;
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dest.y = this.y + y;
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dest.z = this.z + z;
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dest.w = this.w + w;
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return dest;
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}
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/**
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* Add <code>q2</code> to this quaternion.
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*
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* @param q2
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* the quaternion to add to this
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* @return this
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*/
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public Quaternionf add(Quaternionfc q2) {
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return add(q2, this);
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}
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public Quaternionf add(Quaternionfc q2, Quaternionf dest) {
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dest.x = x + q2.x();
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dest.y = y + q2.y();
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dest.z = z + q2.z();
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dest.w = w + q2.w();
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return dest;
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}
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/**
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* Return the dot of this quaternion and <code>otherQuat</code>.
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*
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* @param otherQuat
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* the other quaternion
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* @return the dot product
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*/
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public float dot(Quaternionf otherQuat) {
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return this.x * otherQuat.x + this.y * otherQuat.y + this.z * otherQuat.z + this.w * otherQuat.w;
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}
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public float angle() {
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return (float) (2.0 * Math.safeAcos(w));
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}
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public Matrix3f get(Matrix3f dest) {
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return dest.set(this);
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}
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public Matrix3d get(Matrix3d dest) {
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return dest.set(this);
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}
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public Matrix4f get(Matrix4f dest) {
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return dest.set(this);
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}
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public Matrix4d get(Matrix4d dest) {
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return dest.set(this);
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}
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public Matrix4x3f get(Matrix4x3f dest) {
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return dest.set(this);
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}
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public Matrix4x3d get(Matrix4x3d dest) {
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return dest.set(this);
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}
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public AxisAngle4f get(AxisAngle4f dest) {
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float x = this.x;
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float y = this.y;
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float z = this.z;
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float w = this.w;
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if (w > 1.0f) {
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float invNorm = Math.invsqrt(Math.fma(x, x, Math.fma(y, y, Math.fma(z, z, w * w))));
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x *= invNorm;
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y *= invNorm;
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z *= invNorm;
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w *= invNorm;
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}
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dest.angle = (float) (2.0f * Math.acos(w));
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float s = Math.sqrt(1.0f - w * w);
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if (s < 0.001f) {
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dest.x = x;
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dest.y = y;
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dest.z = z;
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} else {
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s = 1.0f / s;
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dest.x = x * s;
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dest.y = y * s;
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dest.z = z * s;
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}
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return dest;
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}
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public AxisAngle4d get(AxisAngle4d dest) {
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float x = this.x;
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float y = this.y;
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float z = this.z;
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float w = this.w;
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if (w > 1.0f) {
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float invNorm = Math.invsqrt(Math.fma(x, x, Math.fma(y, y, Math.fma(z, z, w * w))));
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x *= invNorm;
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y *= invNorm;
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z *= invNorm;
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w *= invNorm;
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}
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dest.angle = (float) (2.0f * Math.acos(w));
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float s = Math.sqrt(1.0f - w * w);
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if (s < 0.001f) {
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dest.x = x;
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dest.y = y;
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dest.z = z;
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} else {
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s = 1.0f / s;
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dest.x = x * s;
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dest.y = y * s;
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dest.z = z * s;
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}
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return dest;
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}
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public Quaterniond get(Quaterniond dest) {
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return dest.set(this);
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}
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/**
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* Set the given {@link Quaternionf} to the values of <code>this</code>.
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*
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* @see #set(Quaternionfc)
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*
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* @param dest
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* the {@link Quaternionf} to set
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* @return the passed in destination
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*/
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public Quaternionf get(Quaternionf dest) {
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return dest.set(this);
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}
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public ByteBuffer getAsMatrix3f(ByteBuffer dest) {
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MemUtil.INSTANCE.putMatrix3f(this, dest.position(), dest);
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return dest;
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}
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public FloatBuffer getAsMatrix3f(FloatBuffer dest) {
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MemUtil.INSTANCE.putMatrix3f(this, dest.position(), dest);
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return dest;
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}
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public ByteBuffer getAsMatrix4f(ByteBuffer dest) {
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MemUtil.INSTANCE.putMatrix4f(this, dest.position(), dest);
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return dest;
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}
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public FloatBuffer getAsMatrix4f(FloatBuffer dest) {
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MemUtil.INSTANCE.putMatrix4f(this, dest.position(), dest);
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return dest;
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}
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public ByteBuffer getAsMatrix4x3f(ByteBuffer dest) {
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MemUtil.INSTANCE.putMatrix4x3f(this, dest.position(), dest);
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return dest;
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}
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public FloatBuffer getAsMatrix4x3f(FloatBuffer dest) {
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MemUtil.INSTANCE.putMatrix4x3f(this, dest.position(), dest);
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return dest;
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}
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/**
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* Set this quaternion to the given values.
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*
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* @param x
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* the new value of x
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* @param y
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* the new value of y
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* @param z
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* the new value of z
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* @param w
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* the new value of w
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* @return this
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*/
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public Quaternionf set(float x, float y, float z, float w) {
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this.x = x;
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this.y = y;
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this.z = z;
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this.w = w;
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return this;
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}
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/**
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* Set this quaternion to be a copy of <code>q</code>.
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*
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* @param q
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* the {@link Quaternionfc} to copy
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* @return this
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*/
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public Quaternionf set(Quaternionfc q) {
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this.x = q.x();
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this.y = q.y();
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this.z = q.z();
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this.w = q.w();
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return this;
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}
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/**
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* Set this quaternion to be a copy of <code>q</code>.
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||
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*
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* @param q
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* the {@link Quaterniondc} to copy
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* @return this
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*/
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public Quaternionf set(Quaterniondc q) {
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this.x = (float) q.x();
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this.y = (float) q.y();
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this.z = (float) q.z();
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this.w = (float) q.w();
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return this;
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}
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||
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/**
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||
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* Set this quaternion to a rotation equivalent to the given {@link AxisAngle4f}.
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||
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*
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||
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* @param axisAngle
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||
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* the {@link AxisAngle4f}
|
||
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* @return this
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||
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*/
|
||
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public Quaternionf set(AxisAngle4f axisAngle) {
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||
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return setAngleAxis(axisAngle.angle, axisAngle.x, axisAngle.y, axisAngle.z);
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}
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||
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/**
|
||
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* Set this quaternion to a rotation equivalent to the given {@link AxisAngle4d}.
|
||
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*
|
||
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* @param axisAngle
|
||
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* the {@link AxisAngle4d}
|
||
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* @return this
|
||
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*/
|
||
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public Quaternionf set(AxisAngle4d axisAngle) {
|
||
|
return setAngleAxis(axisAngle.angle, axisAngle.x, axisAngle.y, axisAngle.z);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to a rotation equivalent to the supplied axis and
|
||
|
* angle (in radians).
|
||
|
* <p>
|
||
|
* This method assumes that the given rotation axis <code>(x, y, z)</code> is already normalized
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians
|
||
|
* @param x
|
||
|
* the x-component of the normalized rotation axis
|
||
|
* @param y
|
||
|
* the y-component of the normalized rotation axis
|
||
|
* @param z
|
||
|
* the z-component of the normalized rotation axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setAngleAxis(float angle, float x, float y, float z) {
|
||
|
float s = Math.sin(angle * 0.5f);
|
||
|
this.x = x * s;
|
||
|
this.y = y * s;
|
||
|
this.z = z * s;
|
||
|
this.w = Math.cosFromSin(s, angle * 0.5f);
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to a rotation equivalent to the supplied axis and
|
||
|
* angle (in radians).
|
||
|
* <p>
|
||
|
* This method assumes that the given rotation axis <code>(x, y, z)</code> is already normalized
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians
|
||
|
* @param x
|
||
|
* the x-component of the normalized rotation axis
|
||
|
* @param y
|
||
|
* the y-component of the normalized rotation axis
|
||
|
* @param z
|
||
|
* the z-component of the normalized rotation axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setAngleAxis(double angle, double x, double y, double z) {
|
||
|
double s = Math.sin(angle * 0.5f);
|
||
|
this.x = (float) (x * s);
|
||
|
this.y = (float) (y * s);
|
||
|
this.z = (float) (z * s);
|
||
|
this.w = (float) Math.cosFromSin(s, angle * 0.5f);
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this {@link Quaternionf} to a rotation of the given angle in radians about the supplied
|
||
|
* axis, all of which are specified via the {@link AxisAngle4f}.
|
||
|
*
|
||
|
* @see #rotationAxis(float, float, float, float)
|
||
|
*
|
||
|
* @param axisAngle
|
||
|
* the {@link AxisAngle4f} giving the rotation angle in radians and the axis to rotate about
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationAxis(AxisAngle4f axisAngle) {
|
||
|
return rotationAxis(axisAngle.angle, axisAngle.x, axisAngle.y, axisAngle.z);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to a rotation of the given angle in radians about the supplied axis.
|
||
|
*
|
||
|
* @param angle
|
||
|
* the rotation angle in radians
|
||
|
* @param axisX
|
||
|
* the x-coordinate of the rotation axis
|
||
|
* @param axisY
|
||
|
* the y-coordinate of the rotation axis
|
||
|
* @param axisZ
|
||
|
* the z-coordinate of the rotation axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationAxis(float angle, float axisX, float axisY, float axisZ) {
|
||
|
float hangle = angle / 2.0f;
|
||
|
float sinAngle = Math.sin(hangle);
|
||
|
float invVLength = Math.invsqrt(axisX * axisX + axisY * axisY + axisZ * axisZ);
|
||
|
return set(axisX * invVLength * sinAngle,
|
||
|
axisY * invVLength * sinAngle,
|
||
|
axisZ * invVLength * sinAngle,
|
||
|
Math.cosFromSin(sinAngle, hangle));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to a rotation of the given angle in radians about the supplied axis.
|
||
|
*
|
||
|
* @see #rotationAxis(float, float, float, float)
|
||
|
*
|
||
|
* @param angle
|
||
|
* the rotation angle in radians
|
||
|
* @param axis
|
||
|
* the axis to rotate about
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationAxis(float angle, Vector3fc axis) {
|
||
|
return rotationAxis(angle, axis.x(), axis.y(), axis.z());
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to represent a rotation of the given radians about the x axis.
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the x axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationX(float angle) {
|
||
|
float sin = Math.sin(angle * 0.5f);
|
||
|
float cos = Math.cosFromSin(sin, angle * 0.5f);
|
||
|
return set(sin, 0, 0, cos);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to represent a rotation of the given radians about the y axis.
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the y axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationY(float angle) {
|
||
|
float sin = Math.sin(angle * 0.5f);
|
||
|
float cos = Math.cosFromSin(sin, angle * 0.5f);
|
||
|
return set(0, sin, 0, cos);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to represent a rotation of the given radians about the z axis.
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the z axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationZ(float angle) {
|
||
|
float sin = Math.sin(angle * 0.5f);
|
||
|
float cos = Math.cosFromSin(sin, angle * 0.5f);
|
||
|
return set(0, 0, sin, cos);
|
||
|
}
|
||
|
|
||
|
private void setFromUnnormalized(float m00, float m01, float m02, float m10, float m11, float m12, float m20, float m21, float m22) {
|
||
|
float nm00 = m00, nm01 = m01, nm02 = m02;
|
||
|
float nm10 = m10, nm11 = m11, nm12 = m12;
|
||
|
float nm20 = m20, nm21 = m21, nm22 = m22;
|
||
|
float lenX = Math.invsqrt(m00 * m00 + m01 * m01 + m02 * m02);
|
||
|
float lenY = Math.invsqrt(m10 * m10 + m11 * m11 + m12 * m12);
|
||
|
float lenZ = Math.invsqrt(m20 * m20 + m21 * m21 + m22 * m22);
|
||
|
nm00 *= lenX; nm01 *= lenX; nm02 *= lenX;
|
||
|
nm10 *= lenY; nm11 *= lenY; nm12 *= lenY;
|
||
|
nm20 *= lenZ; nm21 *= lenZ; nm22 *= lenZ;
|
||
|
setFromNormalized(nm00, nm01, nm02, nm10, nm11, nm12, nm20, nm21, nm22);
|
||
|
}
|
||
|
|
||
|
private void setFromNormalized(float m00, float m01, float m02, float m10, float m11, float m12, float m20, float m21, float m22) {
|
||
|
float t;
|
||
|
float tr = m00 + m11 + m22;
|
||
|
if (tr >= 0.0f) {
|
||
|
t = Math.sqrt(tr + 1.0f);
|
||
|
w = t * 0.5f;
|
||
|
t = 0.5f / t;
|
||
|
x = (m12 - m21) * t;
|
||
|
y = (m20 - m02) * t;
|
||
|
z = (m01 - m10) * t;
|
||
|
} else {
|
||
|
if (m00 >= m11 && m00 >= m22) {
|
||
|
t = Math.sqrt(m00 - (m11 + m22) + 1.0f);
|
||
|
x = t * 0.5f;
|
||
|
t = 0.5f / t;
|
||
|
y = (m10 + m01) * t;
|
||
|
z = (m02 + m20) * t;
|
||
|
w = (m12 - m21) * t;
|
||
|
} else if (m11 > m22) {
|
||
|
t = Math.sqrt(m11 - (m22 + m00) + 1.0f);
|
||
|
y = t * 0.5f;
|
||
|
t = 0.5f / t;
|
||
|
z = (m21 + m12) * t;
|
||
|
x = (m10 + m01) * t;
|
||
|
w = (m20 - m02) * t;
|
||
|
} else {
|
||
|
t = Math.sqrt(m22 - (m00 + m11) + 1.0f);
|
||
|
z = t * 0.5f;
|
||
|
t = 0.5f / t;
|
||
|
x = (m02 + m20) * t;
|
||
|
y = (m21 + m12) * t;
|
||
|
w = (m01 - m10) * t;
|
||
|
}
|
||
|
}
|
||
|
}
|
||
|
|
||
|
private void setFromUnnormalized(double m00, double m01, double m02, double m10, double m11, double m12, double m20, double m21, double m22) {
|
||
|
double nm00 = m00, nm01 = m01, nm02 = m02;
|
||
|
double nm10 = m10, nm11 = m11, nm12 = m12;
|
||
|
double nm20 = m20, nm21 = m21, nm22 = m22;
|
||
|
double lenX = Math.invsqrt(m00 * m00 + m01 * m01 + m02 * m02);
|
||
|
double lenY = Math.invsqrt(m10 * m10 + m11 * m11 + m12 * m12);
|
||
|
double lenZ = Math.invsqrt(m20 * m20 + m21 * m21 + m22 * m22);
|
||
|
nm00 *= lenX; nm01 *= lenX; nm02 *= lenX;
|
||
|
nm10 *= lenY; nm11 *= lenY; nm12 *= lenY;
|
||
|
nm20 *= lenZ; nm21 *= lenZ; nm22 *= lenZ;
|
||
|
setFromNormalized(nm00, nm01, nm02, nm10, nm11, nm12, nm20, nm21, nm22);
|
||
|
}
|
||
|
|
||
|
private void setFromNormalized(double m00, double m01, double m02, double m10, double m11, double m12, double m20, double m21, double m22) {
|
||
|
double t;
|
||
|
double tr = m00 + m11 + m22;
|
||
|
if (tr >= 0.0) {
|
||
|
t = Math.sqrt(tr + 1.0);
|
||
|
w = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
x = (float) ((m12 - m21) * t);
|
||
|
y = (float) ((m20 - m02) * t);
|
||
|
z = (float) ((m01 - m10) * t);
|
||
|
} else {
|
||
|
if (m00 >= m11 && m00 >= m22) {
|
||
|
t = Math.sqrt(m00 - (m11 + m22) + 1.0);
|
||
|
x = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
y = (float) ((m10 + m01) * t);
|
||
|
z = (float) ((m02 + m20) * t);
|
||
|
w = (float) ((m12 - m21) * t);
|
||
|
} else if (m11 > m22) {
|
||
|
t = Math.sqrt(m11 - (m22 + m00) + 1.0);
|
||
|
y = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
z = (float) ((m21 + m12) * t);
|
||
|
x = (float) ((m10 + m01) * t);
|
||
|
w = (float) ((m20 - m02) * t);
|
||
|
} else {
|
||
|
t = Math.sqrt(m22 - (m00 + m11) + 1.0);
|
||
|
z = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
x = (float) ((m02 + m20) * t);
|
||
|
y = (float) ((m21 + m12) * t);
|
||
|
w = (float) ((m01 - m10) * t);
|
||
|
}
|
||
|
}
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are no unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromUnnormalized(Matrix4fc mat) {
|
||
|
setFromUnnormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are no unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromUnnormalized(Matrix4x3fc mat) {
|
||
|
setFromUnnormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are no unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromUnnormalized(Matrix4x3dc mat) {
|
||
|
setFromUnnormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromNormalized(Matrix4fc mat) {
|
||
|
setFromNormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromNormalized(Matrix4x3fc mat) {
|
||
|
setFromNormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromNormalized(Matrix4x3dc mat) {
|
||
|
setFromNormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are no unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromUnnormalized(Matrix4dc mat) {
|
||
|
setFromUnnormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromNormalized(Matrix4dc mat) {
|
||
|
setFromNormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are no unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromUnnormalized(Matrix3fc mat) {
|
||
|
setFromUnnormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromNormalized(Matrix3fc mat) {
|
||
|
setFromNormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
* <p>
|
||
|
* This method assumes that the first three columns of the upper left 3x3 submatrix are no unit vectors.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromUnnormalized(Matrix3dc mat) {
|
||
|
setFromUnnormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the rotational component of the given matrix.
|
||
|
*
|
||
|
* @param mat
|
||
|
* the matrix whose rotational component is used to set this quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf setFromNormalized(Matrix3dc mat) {
|
||
|
setFromNormalized(mat.m00(), mat.m01(), mat.m02(), mat.m10(), mat.m11(), mat.m12(), mat.m20(), mat.m21(), mat.m22());
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the supplied axis and
|
||
|
* angle (in radians).
|
||
|
*
|
||
|
* @param axis
|
||
|
* the rotation axis
|
||
|
* @param angle
|
||
|
* the angle in radians
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf fromAxisAngleRad(Vector3fc axis, float angle) {
|
||
|
return fromAxisAngleRad(axis.x(), axis.y(), axis.z(), angle);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the supplied axis and
|
||
|
* angle (in radians).
|
||
|
*
|
||
|
* @param axisX
|
||
|
* the x component of the rotation axis
|
||
|
* @param axisY
|
||
|
* the y component of the rotation axis
|
||
|
* @param axisZ
|
||
|
* the z component of the rotation axis
|
||
|
* @param angle
|
||
|
* the angle in radians
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf fromAxisAngleRad(float axisX, float axisY, float axisZ, float angle) {
|
||
|
float hangle = angle / 2.0f;
|
||
|
float sinAngle = Math.sin(hangle);
|
||
|
float vLength = Math.sqrt(axisX * axisX + axisY * axisY + axisZ * axisZ);
|
||
|
x = axisX / vLength * sinAngle;
|
||
|
y = axisY / vLength * sinAngle;
|
||
|
z = axisZ / vLength * sinAngle;
|
||
|
w = Math.cosFromSin(sinAngle, hangle);
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the supplied axis and
|
||
|
* angle (in degrees).
|
||
|
*
|
||
|
* @param axis
|
||
|
* the rotation axis
|
||
|
* @param angle
|
||
|
* the angle in degrees
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf fromAxisAngleDeg(Vector3fc axis, float angle) {
|
||
|
return fromAxisAngleRad(axis.x(), axis.y(), axis.z(), Math.toRadians(angle));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to be a representation of the supplied axis and
|
||
|
* angle (in degrees).
|
||
|
*
|
||
|
* @param axisX
|
||
|
* the x component of the rotation axis
|
||
|
* @param axisY
|
||
|
* the y component of the rotation axis
|
||
|
* @param axisZ
|
||
|
* the z component of the rotation axis
|
||
|
* @param angle
|
||
|
* the angle in radians
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf fromAxisAngleDeg(float axisX, float axisY, float axisZ, float angle) {
|
||
|
return fromAxisAngleRad(axisX, axisY, axisZ, Math.toRadians(angle));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Multiply this quaternion by <code>q</code>.
|
||
|
* <p>
|
||
|
* If <code>T</code> is <code>this</code> and <code>Q</code> is the given
|
||
|
* quaternion, then the resulting quaternion <code>R</code> is:
|
||
|
* <p>
|
||
|
* <code>R = T * Q</code>
|
||
|
* <p>
|
||
|
* So, this method uses post-multiplication like the matrix classes, resulting in a
|
||
|
* vector to be transformed by <code>Q</code> first, and then by <code>T</code>.
|
||
|
*
|
||
|
* @param q
|
||
|
* the quaternion to multiply <code>this</code> by
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf mul(Quaternionfc q) {
|
||
|
return mul(q, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf mul(Quaternionfc q, Quaternionf dest) {
|
||
|
return dest.set(Math.fma(w, q.x(), Math.fma(x, q.w(), Math.fma(y, q.z(), -z * q.y()))),
|
||
|
Math.fma(w, q.y(), Math.fma(-x, q.z(), Math.fma(y, q.w(), z * q.x()))),
|
||
|
Math.fma(w, q.z(), Math.fma(x, q.y(), Math.fma(-y, q.x(), z * q.w()))),
|
||
|
Math.fma(w, q.w(), Math.fma(-x, q.x(), Math.fma(-y, q.y(), -z * q.z()))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Multiply this quaternion by the quaternion represented via <code>(qx, qy, qz, qw)</code>.
|
||
|
* <p>
|
||
|
* If <code>T</code> is <code>this</code> and <code>Q</code> is the given
|
||
|
* quaternion, then the resulting quaternion <code>R</code> is:
|
||
|
* <p>
|
||
|
* <code>R = T * Q</code>
|
||
|
* <p>
|
||
|
* So, this method uses post-multiplication like the matrix classes, resulting in a
|
||
|
* vector to be transformed by <code>Q</code> first, and then by <code>T</code>.
|
||
|
*
|
||
|
* @param qx
|
||
|
* the x component of the quaternion to multiply <code>this</code> by
|
||
|
* @param qy
|
||
|
* the y component of the quaternion to multiply <code>this</code> by
|
||
|
* @param qz
|
||
|
* the z component of the quaternion to multiply <code>this</code> by
|
||
|
* @param qw
|
||
|
* the w component of the quaternion to multiply <code>this</code> by
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf mul(float qx, float qy, float qz, float qw) {
|
||
|
return mul(qx, qy, qz, qw, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf mul(float qx, float qy, float qz, float qw, Quaternionf dest) {
|
||
|
return dest.set(Math.fma(w, qx, Math.fma(x, qw, Math.fma(y, qz, -z * qy))),
|
||
|
Math.fma(w, qy, Math.fma(-x, qz, Math.fma(y, qw, z * qx))),
|
||
|
Math.fma(w, qz, Math.fma(x, qy, Math.fma(-y, qx, z * qw))),
|
||
|
Math.fma(w, qw, Math.fma(-x, qx, Math.fma(-y, qy, -z * qz))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Pre-multiply this quaternion by <code>q</code>.
|
||
|
* <p>
|
||
|
* If <code>T</code> is <code>this</code> and <code>Q</code> is the given quaternion, then the resulting quaternion <code>R</code> is:
|
||
|
* <p>
|
||
|
* <code>R = Q * T</code>
|
||
|
* <p>
|
||
|
* So, this method uses pre-multiplication, resulting in a vector to be transformed by <code>T</code> first, and then by <code>Q</code>.
|
||
|
*
|
||
|
* @param q
|
||
|
* the quaternion to pre-multiply <code>this</code> by
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf premul(Quaternionfc q) {
|
||
|
return premul(q, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf premul(Quaternionfc q, Quaternionf dest) {
|
||
|
return dest.set(Math.fma(q.w(), x, Math.fma(q.x(), w, Math.fma(q.y(), z, -q.z() * y))),
|
||
|
Math.fma(q.w(), y, Math.fma(-q.x(), z, Math.fma(q.y(), w, q.z() * x))),
|
||
|
Math.fma(q.w(), z, Math.fma(q.x(), y, Math.fma(-q.y(), x, q.z() * w))),
|
||
|
Math.fma(q.w(), w, Math.fma(-q.x(), x, Math.fma(-q.y(), y, -q.z() * z))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Pre-multiply this quaternion by the quaternion represented via <code>(qx, qy, qz, qw)</code>.
|
||
|
* <p>
|
||
|
* If <code>T</code> is <code>this</code> and <code>Q</code> is the given quaternion, then the resulting quaternion <code>R</code> is:
|
||
|
* <p>
|
||
|
* <code>R = Q * T</code>
|
||
|
* <p>
|
||
|
* So, this method uses pre-multiplication, resulting in a vector to be transformed by <code>T</code> first, and then by <code>Q</code>.
|
||
|
*
|
||
|
* @param qx
|
||
|
* the x component of the quaternion to multiply <code>this</code> by
|
||
|
* @param qy
|
||
|
* the y component of the quaternion to multiply <code>this</code> by
|
||
|
* @param qz
|
||
|
* the z component of the quaternion to multiply <code>this</code> by
|
||
|
* @param qw
|
||
|
* the w component of the quaternion to multiply <code>this</code> by
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf premul(float qx, float qy, float qz, float qw) {
|
||
|
return premul(qx, qy, qz, qw, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf premul(float qx, float qy, float qz, float qw, Quaternionf dest) {
|
||
|
return dest.set(Math.fma(qw, x, Math.fma(qx, w, Math.fma(qy, z, -qz * y))),
|
||
|
Math.fma(qw, y, Math.fma(-qx, z, Math.fma(qy, w, qz * x))),
|
||
|
Math.fma(qw, z, Math.fma(qx, y, Math.fma(-qy, x, qz * w))),
|
||
|
Math.fma(qw, w, Math.fma(-qx, x, Math.fma(-qy, y, -qz * z))));
|
||
|
}
|
||
|
|
||
|
public Vector3f transform(Vector3f vec){
|
||
|
return transform(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3f transformInverse(Vector3f vec){
|
||
|
return transformInverse(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3f transformPositiveX(Vector3f dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float zw = z * w;
|
||
|
float xy = x * y;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
dest.x = ww + xx - zz - yy;
|
||
|
dest.y = xy + zw + zw + xy;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4f transformPositiveX(Vector4f dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float zw = z * w;
|
||
|
float xy = x * y;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
dest.x = ww + xx - zz - yy;
|
||
|
dest.y = xy + zw + zw + xy;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3f transformUnitPositiveX(Vector3f dest) {
|
||
|
float xy = x * y, xz = x * z, yy = y * y;
|
||
|
float yw = y * w, zz = z * z, zw = z * w;
|
||
|
dest.x = 1 - yy - zz - yy - zz;
|
||
|
dest.y = xy + zw + xy + zw;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4f transformUnitPositiveX(Vector4f dest) {
|
||
|
float yy = y * y, zz = z * z, xy = x * y;
|
||
|
float xz = x * z, yw = y * w, zw = z * w;
|
||
|
dest.x = 1 - yy - yy - zz - zz;
|
||
|
dest.y = xy + zw + xy + zw;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3f transformPositiveY(Vector3f dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float zw = z * w;
|
||
|
float xy = x * y;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
dest.x = -zw + xy - zw + xy;
|
||
|
dest.y = yy - zz + ww - xx;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4f transformPositiveY(Vector4f dest) {
|
||
|
float ww = w * w, xx = x * x, yy = y * y;
|
||
|
float zz = z * z, zw = z * w, xy = x * y;
|
||
|
float yz = y * z, xw = x * w;
|
||
|
dest.x = -zw + xy - zw + xy;
|
||
|
dest.y = yy - zz + ww - xx;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4f transformUnitPositiveY(Vector4f dest) {
|
||
|
float xx = x * x, zz = z * z, xy = x * y;
|
||
|
float yz = y * z, xw = x * w, zw = z * w;
|
||
|
dest.x = xy - zw + xy - zw;
|
||
|
dest.y = 1 - xx - xx - zz - zz;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3f transformUnitPositiveY(Vector3f dest) {
|
||
|
float xx = x * x, zz = z * z, xy = x * y;
|
||
|
float yz = y * z, xw = x * w, zw = z * w;
|
||
|
dest.x = xy - zw + xy - zw;
|
||
|
dest.y = 1 - xx - xx - zz - zz;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3f transformPositiveZ(Vector3f dest) {
|
||
|
float ww = w * w, xx = x * x, yy = y * y;
|
||
|
float zz = z * z, xz = x * z, yw = y * w;
|
||
|
float yz = y * z, xw = x * w;
|
||
|
dest.x = yw + xz + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = zz - yy - xx + ww;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4f transformPositiveZ(Vector4f dest) {
|
||
|
float ww = w * w, xx = x * x, yy = y * y;
|
||
|
float zz = z * z, xz = x * z, yw = y * w;
|
||
|
float yz = y * z, xw = x * w;
|
||
|
dest.x = yw + xz + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = zz - yy - xx + ww;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4f transformUnitPositiveZ(Vector4f dest) {
|
||
|
float xx = x * x, yy = y * y, xz = x * z;
|
||
|
float yz = y * z, xw = x * w, yw = y * w;
|
||
|
dest.x = xz + yw + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = 1 - xx - xx - yy - yy;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3f transformUnitPositiveZ(Vector3f dest) {
|
||
|
float xx = x * x, yy = y * y, xz = x * z;
|
||
|
float yz = y * z, xw = x * w, yw = y * w;
|
||
|
dest.x = xz + yw + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = 1.0f - xx - xx - yy - yy;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4f transform(Vector4f vec){
|
||
|
return transform(vec, vec);
|
||
|
}
|
||
|
|
||
|
public Vector4f transformInverse(Vector4f vec){
|
||
|
return transformInverse(vec, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3f transform(Vector3fc vec, Vector3f dest) {
|
||
|
return transform(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3f transformInverse(Vector3fc vec, Vector3f dest) {
|
||
|
return transformInverse(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3f transform(float x, float y, float z, Vector3f dest) {
|
||
|
float xx = this.x * this.x, yy = this.y * this.y, zz = this.z * this.z, ww = this.w * this.w;
|
||
|
float xy = this.x * this.y, xz = this.x * this.z, yz = this.y * this.z, xw = this.x * this.w;
|
||
|
float zw = this.z * this.w, yw = this.y * this.w, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy - zw) * k, y, (2 * (xz + yw) * k) * z)),
|
||
|
Math.fma(2 * (xy + zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz - xw) * k) * z)),
|
||
|
Math.fma(2 * (xz - yw) * k, x, Math.fma(2 * (yz + xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector3f transformInverse(float x, float y, float z, Vector3f dest) {
|
||
|
float n = 1.0f / Math.fma(this.x, this.x, Math.fma(this.y, this.y, Math.fma(this.z, this.z, this.w * this.w)));
|
||
|
float qx = this.x * n, qy = this.y * n, qz = this.z * n, qw = this.w * n;
|
||
|
float xx = qx * qx, yy = qy * qy, zz = qz * qz, ww = qw * qw;
|
||
|
float xy = qx * qy, xz = qx * qz, yz = qy * qz, xw = qx * qw;
|
||
|
float zw = qz * qw, yw = qy * qw, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy + zw) * k, y, (2 * (xz - yw) * k) * z)),
|
||
|
Math.fma(2 * (xy - zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz + xw) * k) * z)),
|
||
|
Math.fma(2 * (xz + yw) * k, x, Math.fma(2 * (yz - xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector3f transformUnit(Vector3f vec) {
|
||
|
return transformUnit(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3f transformInverseUnit(Vector3f vec) {
|
||
|
return transformInverseUnit(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3f transformUnit(Vector3fc vec, Vector3f dest) {
|
||
|
return transformUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3f transformInverseUnit(Vector3fc vec, Vector3f dest) {
|
||
|
return transformInverseUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3f transformUnit(float x, float y, float z, Vector3f dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy - zw), y, (2 * (xz + yw)) * z)),
|
||
|
Math.fma(2 * (xy + zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz - xw)) * z)),
|
||
|
Math.fma(2 * (xz - yw), x, Math.fma(2 * (yz + xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector3f transformInverseUnit(float x, float y, float z, Vector3f dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy + zw), y, (2 * (xz - yw)) * z)),
|
||
|
Math.fma(2 * (xy - zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz + xw)) * z)),
|
||
|
Math.fma(2 * (xz + yw), x, Math.fma(2 * (yz - xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4f transform(Vector4fc vec, Vector4f dest) {
|
||
|
return transform(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4f transformInverse(Vector4fc vec, Vector4f dest) {
|
||
|
return transformInverse(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4f transform(float x, float y, float z, Vector4f dest) {
|
||
|
float xx = this.x * this.x, yy = this.y * this.y, zz = this.z * this.z, ww = this.w * this.w;
|
||
|
float xy = this.x * this.y, xz = this.x * this.z, yz = this.y * this.z, xw = this.x * this.w;
|
||
|
float zw = this.z * this.w, yw = this.y * this.w, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy - zw) * k, y, (2 * (xz + yw) * k) * z)),
|
||
|
Math.fma(2 * (xy + zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz - xw) * k) * z)),
|
||
|
Math.fma(2 * (xz - yw) * k, x, Math.fma(2 * (yz + xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4f transformInverse(float x, float y, float z, Vector4f dest) {
|
||
|
float n = 1.0f / Math.fma(this.x, this.x, Math.fma(this.y, this.y, Math.fma(this.z, this.z, this.w * this.w)));
|
||
|
float qx = this.x * n, qy = this.y * n, qz = this.z * n, qw = this.w * n;
|
||
|
float xx = qx * qx, yy = qy * qy, zz = qz * qz, ww = qw * qw;
|
||
|
float xy = qx * qy, xz = qx * qz, yz = qy * qz, xw = qx * qw;
|
||
|
float zw = qz * qw, yw = qy * qw, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy + zw) * k, y, (2 * (xz - yw) * k) * z)),
|
||
|
Math.fma(2 * (xy - zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz + xw) * k) * z)),
|
||
|
Math.fma(2 * (xz + yw) * k, x, Math.fma(2 * (yz - xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector3d transform(Vector3d vec){
|
||
|
return transform(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformInverse(Vector3d vec){
|
||
|
return transformInverse(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector4f transformUnit(Vector4f vec) {
|
||
|
return transformUnit(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector4f transformInverseUnit(Vector4f vec) {
|
||
|
return transformInverseUnit(vec.x, vec.y, vec.z, vec);
|
||
|
}
|
||
|
|
||
|
public Vector4f transformUnit(Vector4fc vec, Vector4f dest) {
|
||
|
return transformUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4f transformInverseUnit(Vector4fc vec, Vector4f dest) {
|
||
|
return transformInverseUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4f transformUnit(float x, float y, float z, Vector4f dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy - zw), y, (2 * (xz + yw)) * z)),
|
||
|
Math.fma(2 * (xy + zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz - xw)) * z)),
|
||
|
Math.fma(2 * (xz - yw), x, Math.fma(2 * (yz + xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4f transformInverseUnit(float x, float y, float z, Vector4f dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy + zw), y, (2 * (xz - yw)) * z)),
|
||
|
Math.fma(2 * (xy - zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz + xw)) * z)),
|
||
|
Math.fma(2 * (xz + yw), x, Math.fma(2 * (yz - xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector3d transformPositiveX(Vector3d dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float zw = z * w;
|
||
|
float xy = x * y;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
dest.x = ww + xx - zz - yy;
|
||
|
dest.y = xy + zw + zw + xy;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4d transformPositiveX(Vector4d dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float zw = z * w;
|
||
|
float xy = x * y;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
dest.x = ww + xx - zz - yy;
|
||
|
dest.y = xy + zw + zw + xy;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3d transformUnitPositiveX(Vector3d dest) {
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float xy = x * y;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
float zw = z * w;
|
||
|
dest.x = 1 - yy - yy - zz - zz;
|
||
|
dest.y = xy + zw + xy + zw;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4d transformUnitPositiveX(Vector4d dest) {
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float xy = x * y;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
float zw = z * w;
|
||
|
dest.x = 1 - yy - yy - zz - zz;
|
||
|
dest.y = xy + zw + xy + zw;
|
||
|
dest.z = xz - yw + xz - yw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3d transformPositiveY(Vector3d dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float zw = z * w;
|
||
|
float xy = x * y;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
dest.x = -zw + xy - zw + xy;
|
||
|
dest.y = yy - zz + ww - xx;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4d transformPositiveY(Vector4d dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float zw = z * w;
|
||
|
float xy = x * y;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
dest.x = -zw + xy - zw + xy;
|
||
|
dest.y = yy - zz + ww - xx;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4d transformUnitPositiveY(Vector4d dest) {
|
||
|
float xx = x * x;
|
||
|
float zz = z * z;
|
||
|
float xy = x * y;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
float zw = z * w;
|
||
|
dest.x = xy - zw + xy - zw;
|
||
|
dest.y = 1 - xx - xx - zz - zz;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3d transformUnitPositiveY(Vector3d dest) {
|
||
|
float xx = x * x;
|
||
|
float zz = z * z;
|
||
|
float xy = x * y;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
float zw = z * w;
|
||
|
dest.x = xy - zw + xy - zw;
|
||
|
dest.y = 1 - xx - xx - zz - zz;
|
||
|
dest.z = yz + yz + xw + xw;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3d transformPositiveZ(Vector3d dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
dest.x = yw + xz + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = zz - yy - xx + ww;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4d transformPositiveZ(Vector4d dest) {
|
||
|
float ww = w * w;
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float zz = z * z;
|
||
|
float xz = x * z;
|
||
|
float yw = y * w;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
dest.x = yw + xz + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = zz - yy - xx + ww;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4d transformUnitPositiveZ(Vector4d dest) {
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float xz = x * z;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
float yw = y * w;
|
||
|
dest.x = xz + yw + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = 1 - xx - xx - yy - yy;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3d transformUnitPositiveZ(Vector3d dest) {
|
||
|
float xx = x * x;
|
||
|
float yy = y * y;
|
||
|
float xz = x * z;
|
||
|
float yz = y * z;
|
||
|
float xw = x * w;
|
||
|
float yw = y * w;
|
||
|
dest.x = xz + yw + xz + yw;
|
||
|
dest.y = yz + yz - xw - xw;
|
||
|
dest.z = 1 - xx - xx - yy - yy;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector4d transform(Vector4d vec){
|
||
|
return transform(vec, vec);
|
||
|
}
|
||
|
|
||
|
public Vector4d transformInverse(Vector4d vec){
|
||
|
return transformInverse(vec, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3d transform(Vector3dc vec, Vector3d dest) {
|
||
|
return transform(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformInverse(Vector3dc vec, Vector3d dest) {
|
||
|
return transformInverse(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transform(float x, float y, float z, Vector3d dest) {
|
||
|
return transform((double) x, (double) y, (double) z, dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformInverse(float x, float y, float z, Vector3d dest) {
|
||
|
return transformInverse((double) x, (double) y, (double) z, dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transform(double x, double y, double z, Vector3d dest) {
|
||
|
float xx = this.x * this.x, yy = this.y * this.y, zz = this.z * this.z, ww = this.w * this.w;
|
||
|
float xy = this.x * this.y, xz = this.x * this.z, yz = this.y * this.z, xw = this.x * this.w;
|
||
|
float zw = this.z * this.w, yw = this.y * this.w, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy - zw) * k, y, (2 * (xz + yw) * k) * z)),
|
||
|
Math.fma(2 * (xy + zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz - xw) * k) * z)),
|
||
|
Math.fma(2 * (xz - yw) * k, x, Math.fma(2 * (yz + xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector3d transformInverse(double x, double y, double z, Vector3d dest) {
|
||
|
float n = 1.0f / Math.fma(this.x, this.x, Math.fma(this.y, this.y, Math.fma(this.z, this.z, this.w * this.w)));
|
||
|
float qx = this.x * n, qy = this.y * n, qz = this.z * n, qw = this.w * n;
|
||
|
float xx = qx * qx, yy = qy * qy, zz = qz * qz, ww = qw * qw;
|
||
|
float xy = qx * qy, xz = qx * qz, yz = qy * qz, xw = qx * qw;
|
||
|
float zw = qz * qw, yw = qy * qw, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy + zw) * k, y, (2 * (xz - yw) * k) * z)),
|
||
|
Math.fma(2 * (xy - zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz + xw) * k) * z)),
|
||
|
Math.fma(2 * (xz + yw) * k, x, Math.fma(2 * (yz - xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4d transform(Vector4dc vec, Vector4d dest) {
|
||
|
return transform(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4d transformInverse(Vector4dc vec, Vector4d dest) {
|
||
|
return transformInverse(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4d transform(double x, double y, double z, Vector4d dest) {
|
||
|
float xx = this.x * this.x, yy = this.y * this.y, zz = this.z * this.z, ww = this.w * this.w;
|
||
|
float xy = this.x * this.y, xz = this.x * this.z, yz = this.y * this.z, xw = this.x * this.w;
|
||
|
float zw = this.z * this.w, yw = this.y * this.w, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy - zw) * k, y, (2 * (xz + yw) * k) * z)),
|
||
|
Math.fma(2 * (xy + zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz - xw) * k) * z)),
|
||
|
Math.fma(2 * (xz - yw) * k, x, Math.fma(2 * (yz + xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4d transformInverse(double x, double y, double z, Vector4d dest) {
|
||
|
float n = 1.0f / Math.fma(this.x, this.x, Math.fma(this.y, this.y, Math.fma(this.z, this.z, this.w * this.w)));
|
||
|
float qx = this.x * n, qy = this.y * n, qz = this.z * n, qw = this.w * n;
|
||
|
float xx = qx * qx, yy = qy * qy, zz = qz * qz, ww = qw * qw;
|
||
|
float xy = qx * qy, xz = qx * qz, yz = qy * qz, xw = qx * qw;
|
||
|
float zw = qz * qw, yw = qy * qw, k = 1 / (xx + yy + zz + ww);
|
||
|
return dest.set(Math.fma((xx - yy - zz + ww) * k, x, Math.fma(2 * (xy + zw) * k, y, (2 * (xz - yw) * k) * z)),
|
||
|
Math.fma(2 * (xy - zw) * k, x, Math.fma((yy - xx - zz + ww) * k, y, (2 * (yz + xw) * k) * z)),
|
||
|
Math.fma(2 * (xz + yw) * k, x, Math.fma(2 * (yz - xw) * k, y, ((zz - xx - yy + ww) * k) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4d transformUnit(Vector4d vec){
|
||
|
return transformUnit(vec, vec);
|
||
|
}
|
||
|
|
||
|
public Vector4d transformInverseUnit(Vector4d vec){
|
||
|
return transformInverseUnit(vec, vec);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformUnit(Vector3dc vec, Vector3d dest) {
|
||
|
return transformUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformInverseUnit(Vector3dc vec, Vector3d dest) {
|
||
|
return transformInverseUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformUnit(float x, float y, float z, Vector3d dest) {
|
||
|
return transformUnit((double) x, (double) y, (double) z, dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformInverseUnit(float x, float y, float z, Vector3d dest) {
|
||
|
return transformInverseUnit((double) x, (double) y, (double) z, dest);
|
||
|
}
|
||
|
|
||
|
public Vector3d transformUnit(double x, double y, double z, Vector3d dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy - zw), y, (2 * (xz + yw)) * z)),
|
||
|
Math.fma(2 * (xy + zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz - xw)) * z)),
|
||
|
Math.fma(2 * (xz - yw), x, Math.fma(2 * (yz + xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector3d transformInverseUnit(double x, double y, double z, Vector3d dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy + zw), y, (2 * (xz - yw)) * z)),
|
||
|
Math.fma(2 * (xy - zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz + xw)) * z)),
|
||
|
Math.fma(2 * (xz + yw), x, Math.fma(2 * (yz - xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4d transformUnit(Vector4dc vec, Vector4d dest) {
|
||
|
return transformUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4d transformInverseUnit(Vector4dc vec, Vector4d dest) {
|
||
|
return transformInverseUnit(vec.x(), vec.y(), vec.z(), dest);
|
||
|
}
|
||
|
|
||
|
public Vector4d transformUnit(double x, double y, double z, Vector4d dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy - zw), y, (2 * (xz + yw)) * z)),
|
||
|
Math.fma(2 * (xy + zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz - xw)) * z)),
|
||
|
Math.fma(2 * (xz - yw), x, Math.fma(2 * (yz + xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Vector4d transformInverseUnit(double x, double y, double z, Vector4d dest) {
|
||
|
float xx = this.x * this.x, xy = this.x * this.y, xz = this.x * this.z;
|
||
|
float xw = this.x * this.w, yy = this.y * this.y, yz = this.y * this.z;
|
||
|
float yw = this.y * this.w, zz = this.z * this.z, zw = this.z * this.w;
|
||
|
return dest.set(Math.fma(Math.fma(-2, yy + zz, 1), x, Math.fma(2 * (xy + zw), y, (2 * (xz - yw)) * z)),
|
||
|
Math.fma(2 * (xy - zw), x, Math.fma(Math.fma(-2, xx + zz, 1), y, (2 * (yz + xw)) * z)),
|
||
|
Math.fma(2 * (xz + yw), x, Math.fma(2 * (yz - xw), y, Math.fma(-2, xx + yy, 1) * z)));
|
||
|
}
|
||
|
|
||
|
public Quaternionf invert(Quaternionf dest) {
|
||
|
float invNorm = 1.0f / Math.fma(x, x, Math.fma(y, y, Math.fma(z, z, w * w)));
|
||
|
dest.x = -x * invNorm;
|
||
|
dest.y = -y * invNorm;
|
||
|
dest.z = -z * invNorm;
|
||
|
dest.w = w * invNorm;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Invert this quaternion and {@link #normalize() normalize} it.
|
||
|
* <p>
|
||
|
* If this quaternion is already normalized, then {@link #conjugate()} should be used instead.
|
||
|
*
|
||
|
* @see #conjugate()
|
||
|
*
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf invert() {
|
||
|
return invert(this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf div(Quaternionfc b, Quaternionf dest) {
|
||
|
float invNorm = 1.0f / Math.fma(b.x(), b.x(), Math.fma(b.y(), b.y(), Math.fma(b.z(), b.z(), b.w() * b.w())));
|
||
|
float x = -b.x() * invNorm;
|
||
|
float y = -b.y() * invNorm;
|
||
|
float z = -b.z() * invNorm;
|
||
|
float w = b.w() * invNorm;
|
||
|
return dest.set(Math.fma(this.w, x, Math.fma(this.x, w, Math.fma(this.y, z, -this.z * y))),
|
||
|
Math.fma(this.w, y, Math.fma(-this.x, z, Math.fma(this.y, w, this.z * x))),
|
||
|
Math.fma(this.w, z, Math.fma(this.x, y, Math.fma(-this.y, x, this.z * w))),
|
||
|
Math.fma(this.w, w, Math.fma(-this.x, x, Math.fma(-this.y, y, -this.z * z))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Divide <code>this</code> quaternion by <code>b</code>.
|
||
|
* <p>
|
||
|
* The division expressed using the inverse is performed in the following way:
|
||
|
* <p>
|
||
|
* <code>this = this * b^-1</code>, where <code>b^-1</code> is the inverse of <code>b</code>.
|
||
|
*
|
||
|
* @param b
|
||
|
* the {@link Quaternionf} to divide this by
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf div(Quaternionfc b) {
|
||
|
return div(b, this);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Conjugate this quaternion.
|
||
|
*
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf conjugate() {
|
||
|
return conjugate(this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf conjugate(Quaternionf dest) {
|
||
|
dest.x = -x;
|
||
|
dest.y = -y;
|
||
|
dest.z = -z;
|
||
|
dest.w = w;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to the identity.
|
||
|
*
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf identity() {
|
||
|
x = 0;
|
||
|
y = 0;
|
||
|
z = 0;
|
||
|
w = 1;
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the cartesian base unit axes,
|
||
|
* called the euler angles using rotation sequence <code>XYZ</code>.
|
||
|
* <p>
|
||
|
* This method is equivalent to calling: <code>rotateX(angleX).rotateY(angleY).rotateZ(angleZ)</code>
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @param angleX
|
||
|
* the angle in radians to rotate about the x axis
|
||
|
* @param angleY
|
||
|
* the angle in radians to rotate about the y axis
|
||
|
* @param angleZ
|
||
|
* the angle in radians to rotate about the z axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateXYZ(float angleX, float angleY, float angleZ) {
|
||
|
return rotateXYZ(angleX, angleY, angleZ, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateXYZ(float angleX, float angleY, float angleZ, Quaternionf dest) {
|
||
|
float sx = Math.sin(angleX * 0.5f);
|
||
|
float cx = Math.cosFromSin(sx, angleX * 0.5f);
|
||
|
float sy = Math.sin(angleY * 0.5f);
|
||
|
float cy = Math.cosFromSin(sy, angleY * 0.5f);
|
||
|
float sz = Math.sin(angleZ * 0.5f);
|
||
|
float cz = Math.cosFromSin(sz, angleZ * 0.5f);
|
||
|
|
||
|
float cycz = cy * cz;
|
||
|
float sysz = sy * sz;
|
||
|
float sycz = sy * cz;
|
||
|
float cysz = cy * sz;
|
||
|
float w = cx*cycz - sx*sysz;
|
||
|
float x = sx*cycz + cx*sysz;
|
||
|
float y = cx*sycz - sx*cysz;
|
||
|
float z = cx*cysz + sx*sycz;
|
||
|
// right-multiply
|
||
|
return dest.set(Math.fma(this.w, x, Math.fma(this.x, w, Math.fma(this.y, z, -this.z * y))),
|
||
|
Math.fma(this.w, y, Math.fma(-this.x, z, Math.fma(this.y, w, this.z * x))),
|
||
|
Math.fma(this.w, z, Math.fma(this.x, y, Math.fma(-this.y, x, this.z * w))),
|
||
|
Math.fma(this.w, w, Math.fma(-this.x, x, Math.fma(-this.y, y, -this.z * z))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the cartesian base unit axes,
|
||
|
* called the euler angles, using the rotation sequence <code>ZYX</code>.
|
||
|
* <p>
|
||
|
* This method is equivalent to calling: <code>rotateZ(angleZ).rotateY(angleY).rotateX(angleX)</code>
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @param angleZ
|
||
|
* the angle in radians to rotate about the z axis
|
||
|
* @param angleY
|
||
|
* the angle in radians to rotate about the y axis
|
||
|
* @param angleX
|
||
|
* the angle in radians to rotate about the x axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateZYX(float angleZ, float angleY, float angleX) {
|
||
|
return rotateZYX(angleZ, angleY, angleX, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateZYX(float angleZ, float angleY, float angleX, Quaternionf dest) {
|
||
|
float sx = Math.sin(angleX * 0.5f);
|
||
|
float cx = Math.cosFromSin(sx, angleX * 0.5f);
|
||
|
float sy = Math.sin(angleY * 0.5f);
|
||
|
float cy = Math.cosFromSin(sy, angleY * 0.5f);
|
||
|
float sz = Math.sin(angleZ * 0.5f);
|
||
|
float cz = Math.cosFromSin(sz, angleZ * 0.5f);
|
||
|
|
||
|
float cycz = cy * cz;
|
||
|
float sysz = sy * sz;
|
||
|
float sycz = sy * cz;
|
||
|
float cysz = cy * sz;
|
||
|
float w = cx*cycz + sx*sysz;
|
||
|
float x = sx*cycz - cx*sysz;
|
||
|
float y = cx*sycz + sx*cysz;
|
||
|
float z = cx*cysz - sx*sycz;
|
||
|
// right-multiply
|
||
|
return dest.set(Math.fma(this.w, x, Math.fma(this.x, w, Math.fma(this.y, z, -this.z * y))),
|
||
|
Math.fma(this.w, y, Math.fma(-this.x, z, Math.fma(this.y, w, this.z * x))),
|
||
|
Math.fma(this.w, z, Math.fma(this.x, y, Math.fma(-this.y, x, this.z * w))),
|
||
|
Math.fma(this.w, w, Math.fma(-this.x, x, Math.fma(-this.y, y, -this.z * z))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the cartesian base unit axes,
|
||
|
* called the euler angles, using the rotation sequence <code>YXZ</code>.
|
||
|
* <p>
|
||
|
* This method is equivalent to calling: <code>rotateY(angleY).rotateX(angleX).rotateZ(angleZ)</code>
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @param angleY
|
||
|
* the angle in radians to rotate about the y axis
|
||
|
* @param angleX
|
||
|
* the angle in radians to rotate about the x axis
|
||
|
* @param angleZ
|
||
|
* the angle in radians to rotate about the z axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateYXZ(float angleY, float angleX, float angleZ) {
|
||
|
return rotateYXZ(angleY, angleX, angleZ, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateYXZ(float angleY, float angleX, float angleZ, Quaternionf dest) {
|
||
|
float sx = Math.sin(angleX * 0.5f);
|
||
|
float cx = Math.cosFromSin(sx, angleX * 0.5f);
|
||
|
float sy = Math.sin(angleY * 0.5f);
|
||
|
float cy = Math.cosFromSin(sy, angleY * 0.5f);
|
||
|
float sz = Math.sin(angleZ * 0.5f);
|
||
|
float cz = Math.cosFromSin(sz, angleZ * 0.5f);
|
||
|
|
||
|
float yx = cy * sx;
|
||
|
float yy = sy * cx;
|
||
|
float yz = sy * sx;
|
||
|
float yw = cy * cx;
|
||
|
float x = yx * cz + yy * sz;
|
||
|
float y = yy * cz - yx * sz;
|
||
|
float z = yw * sz - yz * cz;
|
||
|
float w = yw * cz + yz * sz;
|
||
|
// right-multiply
|
||
|
return dest.set(Math.fma(this.w, x, Math.fma(this.x, w, Math.fma(this.y, z, -this.z * y))),
|
||
|
Math.fma(this.w, y, Math.fma(-this.x, z, Math.fma(this.y, w, this.z * x))),
|
||
|
Math.fma(this.w, z, Math.fma(this.x, y, Math.fma(-this.y, x, this.z * w))),
|
||
|
Math.fma(this.w, w, Math.fma(-this.x, x, Math.fma(-this.y, y, -this.z * z))));
|
||
|
}
|
||
|
|
||
|
public Vector3f getEulerAnglesXYZ(Vector3f eulerAngles) {
|
||
|
eulerAngles.x = Math.atan2(x * w - y * z, 0.5f - x * x - y * y);
|
||
|
eulerAngles.y = Math.safeAsin(2.0f * (x * z + y * w));
|
||
|
eulerAngles.z = Math.atan2(z * w - x * y, 0.5f - y * y - z * z);
|
||
|
return eulerAngles;
|
||
|
}
|
||
|
|
||
|
public Vector3f getEulerAnglesZYX(Vector3f eulerAngles) {
|
||
|
eulerAngles.x = Math.atan2(y * z + w * x, 0.5f - x * x + y * y);
|
||
|
eulerAngles.y = Math.safeAsin(-2.0f * (x * z - w * y));
|
||
|
eulerAngles.z = Math.atan2(x * y + w * z, 0.5f - y * y - z * z);
|
||
|
return eulerAngles;
|
||
|
}
|
||
|
|
||
|
public float lengthSquared() {
|
||
|
return Math.fma(x, x, Math.fma(y, y, Math.fma(z, z, w * w)));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion from the supplied euler angles (in radians) with rotation order XYZ.
|
||
|
* <p>
|
||
|
* This method is equivalent to calling: <code>rotationX(angleX).rotateY(angleY).rotateZ(angleZ)</code>
|
||
|
* <p>
|
||
|
* Reference: <a href="http://gamedev.stackexchange.com/questions/13436/glm-euler-angles-to-quaternion#answer-13446">this stackexchange answer</a>
|
||
|
*
|
||
|
* @param angleX
|
||
|
* the angle in radians to rotate about x
|
||
|
* @param angleY
|
||
|
* the angle in radians to rotate about y
|
||
|
* @param angleZ
|
||
|
* the angle in radians to rotate about z
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationXYZ(float angleX, float angleY, float angleZ) {
|
||
|
float sx = Math.sin(angleX * 0.5f);
|
||
|
float cx = Math.cosFromSin(sx, angleX * 0.5f);
|
||
|
float sy = Math.sin(angleY * 0.5f);
|
||
|
float cy = Math.cosFromSin(sy, angleY * 0.5f);
|
||
|
float sz = Math.sin(angleZ * 0.5f);
|
||
|
float cz = Math.cosFromSin(sz, angleZ * 0.5f);
|
||
|
|
||
|
float cycz = cy * cz;
|
||
|
float sysz = sy * sz;
|
||
|
float sycz = sy * cz;
|
||
|
float cysz = cy * sz;
|
||
|
w = cx*cycz - sx*sysz;
|
||
|
x = sx*cycz + cx*sysz;
|
||
|
y = cx*sycz - sx*cysz;
|
||
|
z = cx*cysz + sx*sycz;
|
||
|
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion from the supplied euler angles (in radians) with rotation order ZYX.
|
||
|
* <p>
|
||
|
* This method is equivalent to calling: <code>rotationZ(angleZ).rotateY(angleY).rotateX(angleX)</code>
|
||
|
* <p>
|
||
|
* Reference: <a href="http://gamedev.stackexchange.com/questions/13436/glm-euler-angles-to-quaternion#answer-13446">this stackexchange answer</a>
|
||
|
*
|
||
|
* @param angleX
|
||
|
* the angle in radians to rotate about x
|
||
|
* @param angleY
|
||
|
* the angle in radians to rotate about y
|
||
|
* @param angleZ
|
||
|
* the angle in radians to rotate about z
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationZYX(float angleZ, float angleY, float angleX) {
|
||
|
float sx = Math.sin(angleX * 0.5f);
|
||
|
float cx = Math.cosFromSin(sx, angleX * 0.5f);
|
||
|
float sy = Math.sin(angleY * 0.5f);
|
||
|
float cy = Math.cosFromSin(sy, angleY * 0.5f);
|
||
|
float sz = Math.sin(angleZ * 0.5f);
|
||
|
float cz = Math.cosFromSin(sz, angleZ * 0.5f);
|
||
|
|
||
|
float cycz = cy * cz;
|
||
|
float sysz = sy * sz;
|
||
|
float sycz = sy * cz;
|
||
|
float cysz = cy * sz;
|
||
|
w = cx*cycz + sx*sysz;
|
||
|
x = sx*cycz - cx*sysz;
|
||
|
y = cx*sycz + sx*cysz;
|
||
|
z = cx*cysz - sx*sycz;
|
||
|
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion from the supplied euler angles (in radians) with rotation order YXZ.
|
||
|
* <p>
|
||
|
* This method is equivalent to calling: <code>rotationY(angleY).rotateX(angleX).rotateZ(angleZ)</code>
|
||
|
* <p>
|
||
|
* Reference: <a href="https://en.wikipedia.org/wiki/Conversion_between_quaternions_and_Euler_angles">https://en.wikipedia.org</a>
|
||
|
*
|
||
|
* @param angleY
|
||
|
* the angle in radians to rotate about y
|
||
|
* @param angleX
|
||
|
* the angle in radians to rotate about x
|
||
|
* @param angleZ
|
||
|
* the angle in radians to rotate about z
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationYXZ(float angleY, float angleX, float angleZ) {
|
||
|
float sx = Math.sin(angleX * 0.5f);
|
||
|
float cx = Math.cosFromSin(sx, angleX * 0.5f);
|
||
|
float sy = Math.sin(angleY * 0.5f);
|
||
|
float cy = Math.cosFromSin(sy, angleY * 0.5f);
|
||
|
float sz = Math.sin(angleZ * 0.5f);
|
||
|
float cz = Math.cosFromSin(sz, angleZ * 0.5f);
|
||
|
|
||
|
float x = cy * sx;
|
||
|
float y = sy * cx;
|
||
|
float z = sy * sx;
|
||
|
float w = cy * cx;
|
||
|
this.x = x * cz + y * sz;
|
||
|
this.y = y * cz - x * sz;
|
||
|
this.z = w * sz - z * cz;
|
||
|
this.w = w * cz + z * sz;
|
||
|
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Interpolate between <code>this</code> {@link #normalize() unit} quaternion and the specified
|
||
|
* <code>target</code> {@link #normalize() unit} quaternion using spherical linear interpolation using the specified interpolation factor <code>alpha</code>.
|
||
|
* <p>
|
||
|
* This method resorts to non-spherical linear interpolation when the absolute dot product of <code>this</code> and <code>target</code> is
|
||
|
* below <code>1E-6f</code>.
|
||
|
*
|
||
|
* @param target
|
||
|
* the target of the interpolation, which should be reached with <code>alpha = 1.0</code>
|
||
|
* @param alpha
|
||
|
* the interpolation factor, within <code>[0..1]</code>
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf slerp(Quaternionfc target, float alpha) {
|
||
|
return slerp(target, alpha, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf slerp(Quaternionfc target, float alpha, Quaternionf dest) {
|
||
|
float cosom = Math.fma(x, target.x(), Math.fma(y, target.y(), Math.fma(z, target.z(), w * target.w())));
|
||
|
float absCosom = Math.abs(cosom);
|
||
|
float scale0, scale1;
|
||
|
if (1.0f - absCosom > 1E-6f) {
|
||
|
float sinSqr = 1.0f - absCosom * absCosom;
|
||
|
float sinom = Math.invsqrt(sinSqr);
|
||
|
float omega = Math.atan2(sinSqr * sinom, absCosom);
|
||
|
scale0 = (float) (Math.sin((1.0 - alpha) * omega) * sinom);
|
||
|
scale1 = (float) (Math.sin(alpha * omega) * sinom);
|
||
|
} else {
|
||
|
scale0 = 1.0f - alpha;
|
||
|
scale1 = alpha;
|
||
|
}
|
||
|
scale1 = cosom >= 0.0f ? scale1 : -scale1;
|
||
|
dest.x = Math.fma(scale0, x, scale1 * target.x());
|
||
|
dest.y = Math.fma(scale0, y, scale1 * target.y());
|
||
|
dest.z = Math.fma(scale0, z, scale1 * target.z());
|
||
|
dest.w = Math.fma(scale0, w, scale1 * target.w());
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Interpolate between all of the quaternions given in <code>qs</code> via spherical linear interpolation using the specified interpolation factors <code>weights</code>,
|
||
|
* and store the result in <code>dest</code>.
|
||
|
* <p>
|
||
|
* This method will interpolate between each two successive quaternions via {@link #slerp(Quaternionfc, float)} using their relative interpolation weights.
|
||
|
* <p>
|
||
|
* This method resorts to non-spherical linear interpolation when the absolute dot product of any two interpolated quaternions is below <code>1E-6f</code>.
|
||
|
* <p>
|
||
|
* Reference: <a href="http://gamedev.stackexchange.com/questions/62354/method-for-interpolation-between-3-quaternions#answer-62356">http://gamedev.stackexchange.com/</a>
|
||
|
*
|
||
|
* @param qs
|
||
|
* the quaternions to interpolate over
|
||
|
* @param weights
|
||
|
* the weights of each individual quaternion in <code>qs</code>
|
||
|
* @param dest
|
||
|
* will hold the result
|
||
|
* @return dest
|
||
|
*/
|
||
|
public static Quaternionfc slerp(Quaternionf[] qs, float[] weights, Quaternionf dest) {
|
||
|
dest.set(qs[0]);
|
||
|
float w = weights[0];
|
||
|
for (int i = 1; i < qs.length; i++) {
|
||
|
float w0 = w;
|
||
|
float w1 = weights[i];
|
||
|
float rw1 = w1 / (w0 + w1);
|
||
|
w += w1;
|
||
|
dest.slerp(qs[i], rw1);
|
||
|
}
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply scaling to this quaternion, which results in any vector transformed by this quaternion to change
|
||
|
* its length by the given <code>factor</code>.
|
||
|
*
|
||
|
* @param factor
|
||
|
* the scaling factor
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf scale(float factor) {
|
||
|
return scale(factor, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf scale(float factor, Quaternionf dest) {
|
||
|
float sqrt = Math.sqrt(factor);
|
||
|
dest.x = sqrt * x;
|
||
|
dest.y = sqrt * y;
|
||
|
dest.z = sqrt * z;
|
||
|
dest.w = sqrt * w;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set this quaternion to represent scaling, which results in a transformed vector to change
|
||
|
* its length by the given <code>factor</code>.
|
||
|
*
|
||
|
* @param factor
|
||
|
* the scaling factor
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf scaling(float factor) {
|
||
|
float sqrt = Math.sqrt(factor);
|
||
|
this.x = 0.0f;
|
||
|
this.y = 0.0f;
|
||
|
this.z = 0.0f;
|
||
|
this.w = sqrt;
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Integrate the rotation given by the angular velocity <code>(vx, vy, vz)</code> around the x, y and z axis, respectively,
|
||
|
* with respect to the given elapsed time delta <code>dt</code> and add the differentiate rotation to the rotation represented by this quaternion.
|
||
|
* <p>
|
||
|
* This method pre-multiplies the rotation given by <code>dt</code> and <code>(vx, vy, vz)</code> by <code>this</code>, so
|
||
|
* the angular velocities are always relative to the local coordinate system of the rotation represented by <code>this</code> quaternion.
|
||
|
* <p>
|
||
|
* This method is equivalent to calling: <code>rotateLocal(dt * vx, dt * vy, dt * vz)</code>
|
||
|
* <p>
|
||
|
* Reference: <a href="http://physicsforgames.blogspot.de/2010/02/quaternions.html">http://physicsforgames.blogspot.de/</a>
|
||
|
*
|
||
|
* @param dt
|
||
|
* the delta time
|
||
|
* @param vx
|
||
|
* the angular velocity around the x axis
|
||
|
* @param vy
|
||
|
* the angular velocity around the y axis
|
||
|
* @param vz
|
||
|
* the angular velocity around the z axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf integrate(float dt, float vx, float vy, float vz) {
|
||
|
return integrate(dt, vx, vy, vz, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf integrate(float dt, float vx, float vy, float vz, Quaternionf dest) {
|
||
|
float thetaX = dt * vx * 0.5f;
|
||
|
float thetaY = dt * vy * 0.5f;
|
||
|
float thetaZ = dt * vz * 0.5f;
|
||
|
float thetaMagSq = thetaX * thetaX + thetaY * thetaY + thetaZ * thetaZ;
|
||
|
float s;
|
||
|
float dqX, dqY, dqZ, dqW;
|
||
|
if (thetaMagSq * thetaMagSq / 24.0f < 1E-8f) {
|
||
|
dqW = 1.0f - thetaMagSq * 0.5f;
|
||
|
s = 1.0f - thetaMagSq / 6.0f;
|
||
|
} else {
|
||
|
float thetaMag = Math.sqrt(thetaMagSq);
|
||
|
float sin = Math.sin(thetaMag);
|
||
|
s = sin / thetaMag;
|
||
|
dqW = Math.cosFromSin(sin, thetaMag);
|
||
|
}
|
||
|
dqX = thetaX * s;
|
||
|
dqY = thetaY * s;
|
||
|
dqZ = thetaZ * s;
|
||
|
/* Pre-multiplication */
|
||
|
return dest.set(Math.fma(dqW, x, Math.fma(dqX, w, Math.fma(dqY, z, -dqZ * y))),
|
||
|
Math.fma(dqW, y, Math.fma(-dqX, z, Math.fma(dqY, w, dqZ * x))),
|
||
|
Math.fma(dqW, z, Math.fma(dqX, y, Math.fma(-dqY, x, dqZ * w))),
|
||
|
Math.fma(dqW, w, Math.fma(-dqX, x, Math.fma(-dqY, y, -dqZ * z))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Compute a linear (non-spherical) interpolation of <code>this</code> and the given quaternion <code>q</code>
|
||
|
* and store the result in <code>this</code>.
|
||
|
*
|
||
|
* @param q
|
||
|
* the other quaternion
|
||
|
* @param factor
|
||
|
* the interpolation factor. It is between 0.0 and 1.0
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf nlerp(Quaternionfc q, float factor) {
|
||
|
return nlerp(q, factor, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf nlerp(Quaternionfc q, float factor, Quaternionf dest) {
|
||
|
float cosom = Math.fma(x, q.x(), Math.fma(y, q.y(), Math.fma(z, q.z(), w * q.w())));
|
||
|
float scale0 = 1.0f - factor;
|
||
|
float scale1 = (cosom >= 0.0f) ? factor : -factor;
|
||
|
dest.x = Math.fma(scale0, x, scale1 * q.x());
|
||
|
dest.y = Math.fma(scale0, y, scale1 * q.y());
|
||
|
dest.z = Math.fma(scale0, z, scale1 * q.z());
|
||
|
dest.w = Math.fma(scale0, w, scale1 * q.w());
|
||
|
float s = Math.invsqrt(Math.fma(dest.x, dest.x, Math.fma(dest.y, dest.y, Math.fma(dest.z, dest.z, dest.w * dest.w))));
|
||
|
dest.x *= s;
|
||
|
dest.y *= s;
|
||
|
dest.z *= s;
|
||
|
dest.w *= s;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Interpolate between all of the quaternions given in <code>qs</code> via non-spherical linear interpolation using the
|
||
|
* specified interpolation factors <code>weights</code>, and store the result in <code>dest</code>.
|
||
|
* <p>
|
||
|
* This method will interpolate between each two successive quaternions via {@link #nlerp(Quaternionfc, float)}
|
||
|
* using their relative interpolation weights.
|
||
|
* <p>
|
||
|
* Reference: <a href="http://gamedev.stackexchange.com/questions/62354/method-for-interpolation-between-3-quaternions#answer-62356">http://gamedev.stackexchange.com/</a>
|
||
|
*
|
||
|
* @param qs
|
||
|
* the quaternions to interpolate over
|
||
|
* @param weights
|
||
|
* the weights of each individual quaternion in <code>qs</code>
|
||
|
* @param dest
|
||
|
* will hold the result
|
||
|
* @return dest
|
||
|
*/
|
||
|
public static Quaternionfc nlerp(Quaternionfc[] qs, float[] weights, Quaternionf dest) {
|
||
|
dest.set(qs[0]);
|
||
|
float w = weights[0];
|
||
|
for (int i = 1; i < qs.length; i++) {
|
||
|
float w0 = w;
|
||
|
float w1 = weights[i];
|
||
|
float rw1 = w1 / (w0 + w1);
|
||
|
w += w1;
|
||
|
dest.nlerp(qs[i], rw1);
|
||
|
}
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Quaternionf nlerpIterative(Quaternionfc q, float alpha, float dotThreshold, Quaternionf dest) {
|
||
|
float q1x = x, q1y = y, q1z = z, q1w = w;
|
||
|
float q2x = q.x(), q2y = q.y(), q2z = q.z(), q2w = q.w();
|
||
|
float dot = Math.fma(q1x, q2x, Math.fma(q1y, q2y, Math.fma(q1z, q2z, q1w * q2w)));
|
||
|
float absDot = Math.abs(dot);
|
||
|
if (1.0f - 1E-6f < absDot) {
|
||
|
return dest.set(this);
|
||
|
}
|
||
|
float alphaN = alpha;
|
||
|
while (absDot < dotThreshold) {
|
||
|
float scale0 = 0.5f;
|
||
|
float scale1 = dot >= 0.0f ? 0.5f : -0.5f;
|
||
|
if (alphaN < 0.5f) {
|
||
|
q2x = Math.fma(scale0, q2x, scale1 * q1x);
|
||
|
q2y = Math.fma(scale0, q2y, scale1 * q1y);
|
||
|
q2z = Math.fma(scale0, q2z, scale1 * q1z);
|
||
|
q2w = Math.fma(scale0, q2w, scale1 * q1w);
|
||
|
float s = Math.invsqrt(Math.fma(q2x, q2x, Math.fma(q2y, q2y, Math.fma(q2z, q2z, q2w * q2w))));
|
||
|
q2x *= s;
|
||
|
q2y *= s;
|
||
|
q2z *= s;
|
||
|
q2w *= s;
|
||
|
alphaN = alphaN + alphaN;
|
||
|
} else {
|
||
|
q1x = Math.fma(scale0, q1x, scale1 * q2x);
|
||
|
q1y = Math.fma(scale0, q1y, scale1 * q2y);
|
||
|
q1z = Math.fma(scale0, q1z, scale1 * q2z);
|
||
|
q1w = Math.fma(scale0, q1w, scale1 * q2w);
|
||
|
float s = Math.invsqrt(Math.fma(q1x, q1x, Math.fma(q1y, q1y, Math.fma(q1z, q1z, q1w * q1w))));
|
||
|
q1x *= s;
|
||
|
q1y *= s;
|
||
|
q1z *= s;
|
||
|
q1w *= s;
|
||
|
alphaN = alphaN + alphaN - 1.0f;
|
||
|
}
|
||
|
dot = Math.fma(q1x, q2x, Math.fma(q1y, q2y, Math.fma(q1z, q2z, q1w * q2w)));
|
||
|
absDot = Math.abs(dot);
|
||
|
}
|
||
|
float scale0 = 1.0f - alphaN;
|
||
|
float scale1 = dot >= 0.0f ? alphaN : -alphaN;
|
||
|
float resX = Math.fma(scale0, q1x, scale1 * q2x);
|
||
|
float resY = Math.fma(scale0, q1y, scale1 * q2y);
|
||
|
float resZ = Math.fma(scale0, q1z, scale1 * q2z);
|
||
|
float resW = Math.fma(scale0, q1w, scale1 * q2w);
|
||
|
float s = Math.invsqrt(Math.fma(resX, resX, Math.fma(resY, resY, Math.fma(resZ, resZ, resW * resW))));
|
||
|
dest.x = resX * s;
|
||
|
dest.y = resY * s;
|
||
|
dest.z = resZ * s;
|
||
|
dest.w = resW * s;
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Compute linear (non-spherical) interpolations of <code>this</code> and the given quaternion <code>q</code>
|
||
|
* iteratively and store the result in <code>this</code>.
|
||
|
* <p>
|
||
|
* This method performs a series of small-step nlerp interpolations to avoid doing a costly spherical linear interpolation, like
|
||
|
* {@link #slerp(Quaternionfc, float, Quaternionf) slerp},
|
||
|
* by subdividing the rotation arc between <code>this</code> and <code>q</code> via non-spherical linear interpolations as long as
|
||
|
* the absolute dot product of <code>this</code> and <code>q</code> is greater than the given <code>dotThreshold</code> parameter.
|
||
|
* <p>
|
||
|
* Thanks to <code>@theagentd</code> at <a href="http://www.java-gaming.org/">http://www.java-gaming.org/</a> for providing the code.
|
||
|
*
|
||
|
* @param q
|
||
|
* the other quaternion
|
||
|
* @param alpha
|
||
|
* the interpolation factor, between 0.0 and 1.0
|
||
|
* @param dotThreshold
|
||
|
* the threshold for the dot product of <code>this</code> and <code>q</code> above which this method performs another iteration
|
||
|
* of a small-step linear interpolation
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf nlerpIterative(Quaternionfc q, float alpha, float dotThreshold) {
|
||
|
return nlerpIterative(q, alpha, dotThreshold, this);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Interpolate between all of the quaternions given in <code>qs</code> via iterative non-spherical linear interpolation using the
|
||
|
* specified interpolation factors <code>weights</code>, and store the result in <code>dest</code>.
|
||
|
* <p>
|
||
|
* This method will interpolate between each two successive quaternions via {@link #nlerpIterative(Quaternionfc, float, float)}
|
||
|
* using their relative interpolation weights.
|
||
|
* <p>
|
||
|
* Reference: <a href="http://gamedev.stackexchange.com/questions/62354/method-for-interpolation-between-3-quaternions#answer-62356">http://gamedev.stackexchange.com/</a>
|
||
|
*
|
||
|
* @param qs
|
||
|
* the quaternions to interpolate over
|
||
|
* @param weights
|
||
|
* the weights of each individual quaternion in <code>qs</code>
|
||
|
* @param dotThreshold
|
||
|
* the threshold for the dot product of each two interpolated quaternions above which {@link #nlerpIterative(Quaternionfc, float, float)} performs another iteration
|
||
|
* of a small-step linear interpolation
|
||
|
* @param dest
|
||
|
* will hold the result
|
||
|
* @return dest
|
||
|
*/
|
||
|
public static Quaternionfc nlerpIterative(Quaternionf[] qs, float[] weights, float dotThreshold, Quaternionf dest) {
|
||
|
dest.set(qs[0]);
|
||
|
float w = weights[0];
|
||
|
for (int i = 1; i < qs.length; i++) {
|
||
|
float w0 = w;
|
||
|
float w1 = weights[i];
|
||
|
float rw1 = w1 / (w0 + w1);
|
||
|
w += w1;
|
||
|
dest.nlerpIterative(qs[i], rw1, dotThreshold);
|
||
|
}
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to this quaternion that maps the given direction to the positive Z axis.
|
||
|
* <p>
|
||
|
* Because there are multiple possibilities for such a rotation, this method will choose the one that ensures the given up direction to remain
|
||
|
* parallel to the plane spanned by the <code>up</code> and <code>dir</code> vectors.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
* <p>
|
||
|
* Reference: <a href="http://answers.unity3d.com/questions/467614/what-is-the-source-code-of-quaternionlookrotation.html">http://answers.unity3d.com</a>
|
||
|
*
|
||
|
* @see #lookAlong(float, float, float, float, float, float, Quaternionf)
|
||
|
*
|
||
|
* @param dir
|
||
|
* the direction to map to the positive Z axis
|
||
|
* @param up
|
||
|
* the vector which will be mapped to a vector parallel to the plane
|
||
|
* spanned by the given <code>dir</code> and <code>up</code>
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf lookAlong(Vector3fc dir, Vector3fc up) {
|
||
|
return lookAlong(dir.x(), dir.y(), dir.z(), up.x(), up.y(), up.z(), this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf lookAlong(Vector3fc dir, Vector3fc up, Quaternionf dest) {
|
||
|
return lookAlong(dir.x(), dir.y(), dir.z(), up.x(), up.y(), up.z(), dest);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to this quaternion that maps the given direction to the positive Z axis.
|
||
|
* <p>
|
||
|
* Because there are multiple possibilities for such a rotation, this method will choose the one that ensures the given up direction to remain
|
||
|
* parallel to the plane spanned by the <code>up</code> and <code>dir</code> vectors.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
* <p>
|
||
|
* Reference: <a href="http://answers.unity3d.com/questions/467614/what-is-the-source-code-of-quaternionlookrotation.html">http://answers.unity3d.com</a>
|
||
|
*
|
||
|
* @see #lookAlong(float, float, float, float, float, float, Quaternionf)
|
||
|
*
|
||
|
* @param dirX
|
||
|
* the x-coordinate of the direction to look along
|
||
|
* @param dirY
|
||
|
* the y-coordinate of the direction to look along
|
||
|
* @param dirZ
|
||
|
* the z-coordinate of the direction to look along
|
||
|
* @param upX
|
||
|
* the x-coordinate of the up vector
|
||
|
* @param upY
|
||
|
* the y-coordinate of the up vector
|
||
|
* @param upZ
|
||
|
* the z-coordinate of the up vector
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf lookAlong(float dirX, float dirY, float dirZ, float upX, float upY, float upZ) {
|
||
|
return lookAlong(dirX, dirY, dirZ, upX, upY, upZ, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf lookAlong(float dirX, float dirY, float dirZ, float upX, float upY, float upZ, Quaternionf dest) {
|
||
|
// Normalize direction
|
||
|
float invDirLength = Math.invsqrt(dirX * dirX + dirY * dirY + dirZ * dirZ);
|
||
|
float dirnX = -dirX * invDirLength;
|
||
|
float dirnY = -dirY * invDirLength;
|
||
|
float dirnZ = -dirZ * invDirLength;
|
||
|
// left = up x dir
|
||
|
float leftX, leftY, leftZ;
|
||
|
leftX = upY * dirnZ - upZ * dirnY;
|
||
|
leftY = upZ * dirnX - upX * dirnZ;
|
||
|
leftZ = upX * dirnY - upY * dirnX;
|
||
|
// normalize left
|
||
|
float invLeftLength = Math.invsqrt(leftX * leftX + leftY * leftY + leftZ * leftZ);
|
||
|
leftX *= invLeftLength;
|
||
|
leftY *= invLeftLength;
|
||
|
leftZ *= invLeftLength;
|
||
|
// up = direction x left
|
||
|
float upnX = dirnY * leftZ - dirnZ * leftY;
|
||
|
float upnY = dirnZ * leftX - dirnX * leftZ;
|
||
|
float upnZ = dirnX * leftY - dirnY * leftX;
|
||
|
|
||
|
/* Convert orthonormal basis vectors to quaternion */
|
||
|
float x, y, z, w;
|
||
|
double t;
|
||
|
double tr = leftX + upnY + dirnZ;
|
||
|
if (tr >= 0.0) {
|
||
|
t = Math.sqrt(tr + 1.0);
|
||
|
w = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
x = (float) ((dirnY - upnZ) * t);
|
||
|
y = (float) ((leftZ - dirnX) * t);
|
||
|
z = (float) ((upnX - leftY) * t);
|
||
|
} else {
|
||
|
if (leftX > upnY && leftX > dirnZ) {
|
||
|
t = Math.sqrt(1.0 + leftX - upnY - dirnZ);
|
||
|
x = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
y = (float) ((leftY + upnX) * t);
|
||
|
z = (float) ((dirnX + leftZ) * t);
|
||
|
w = (float) ((dirnY - upnZ) * t);
|
||
|
} else if (upnY > dirnZ) {
|
||
|
t = Math.sqrt(1.0 + upnY - leftX - dirnZ);
|
||
|
y = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
x = (float) ((leftY + upnX) * t);
|
||
|
z = (float) ((upnZ + dirnY) * t);
|
||
|
w = (float) ((leftZ - dirnX) * t);
|
||
|
} else {
|
||
|
t = Math.sqrt(1.0 + dirnZ - leftX - upnY);
|
||
|
z = (float) (t * 0.5);
|
||
|
t = 0.5 / t;
|
||
|
x = (float) ((dirnX + leftZ) * t);
|
||
|
y = (float) ((upnZ + dirnY) * t);
|
||
|
w = (float) ((upnX - leftY) * t);
|
||
|
}
|
||
|
}
|
||
|
/* Multiply */
|
||
|
return dest.set(Math.fma(this.w, x, Math.fma(this.x, w, Math.fma(this.y, z, -this.z * y))),
|
||
|
Math.fma(this.w, y, Math.fma(-this.x, z, Math.fma(this.y, w, this.z * x))),
|
||
|
Math.fma(this.w, z, Math.fma(this.x, y, Math.fma(-this.y, x, this.z * w))),
|
||
|
Math.fma(this.w, w, Math.fma(-this.x, x, Math.fma(-this.y, y, -this.z * z))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set <code>this</code> quaternion to a rotation that rotates the <code>fromDir</code> vector to point along <code>toDir</code>.
|
||
|
* <p>
|
||
|
* Since there can be multiple possible rotations, this method chooses the one with the shortest arc.
|
||
|
* <p>
|
||
|
* Reference: <a href="http://stackoverflow.com/questions/1171849/finding-quaternion-representing-the-rotation-from-one-vector-to-another#answer-1171995">stackoverflow.com</a>
|
||
|
*
|
||
|
* @param fromDirX
|
||
|
* the x-coordinate of the direction to rotate into the destination direction
|
||
|
* @param fromDirY
|
||
|
* the y-coordinate of the direction to rotate into the destination direction
|
||
|
* @param fromDirZ
|
||
|
* the z-coordinate of the direction to rotate into the destination direction
|
||
|
* @param toDirX
|
||
|
* the x-coordinate of the direction to rotate to
|
||
|
* @param toDirY
|
||
|
* the y-coordinate of the direction to rotate to
|
||
|
* @param toDirZ
|
||
|
* the z-coordinate of the direction to rotate to
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationTo(float fromDirX, float fromDirY, float fromDirZ, float toDirX, float toDirY, float toDirZ) {
|
||
|
float fn = Math.invsqrt(Math.fma(fromDirX, fromDirX, Math.fma(fromDirY, fromDirY, fromDirZ * fromDirZ)));
|
||
|
float tn = Math.invsqrt(Math.fma(toDirX, toDirX, Math.fma(toDirY, toDirY, toDirZ * toDirZ)));
|
||
|
float fx = fromDirX * fn, fy = fromDirY * fn, fz = fromDirZ * fn;
|
||
|
float tx = toDirX * tn, ty = toDirY * tn, tz = toDirZ * tn;
|
||
|
float dot = fx * tx + fy * ty + fz * tz;
|
||
|
float x, y, z, w;
|
||
|
if (dot < -1.0f + 1E-6f) {
|
||
|
x = fy;
|
||
|
y = -fx;
|
||
|
z = 0.0f;
|
||
|
w = 0.0f;
|
||
|
if (x * x + y * y == 0.0f) {
|
||
|
x = 0.0f;
|
||
|
y = fz;
|
||
|
z = -fy;
|
||
|
w = 0.0f;
|
||
|
}
|
||
|
this.x = x;
|
||
|
this.y = y;
|
||
|
this.z = z;
|
||
|
this.w = 0;
|
||
|
} else {
|
||
|
float sd2 = Math.sqrt((1.0f + dot) * 2.0f);
|
||
|
float isd2 = 1.0f / sd2;
|
||
|
float cx = fy * tz - fz * ty;
|
||
|
float cy = fz * tx - fx * tz;
|
||
|
float cz = fx * ty - fy * tx;
|
||
|
x = cx * isd2;
|
||
|
y = cy * isd2;
|
||
|
z = cz * isd2;
|
||
|
w = sd2 * 0.5f;
|
||
|
float n2 = Math.invsqrt(Math.fma(x, x, Math.fma(y, y, Math.fma(z, z, w * w))));
|
||
|
this.x = x * n2;
|
||
|
this.y = y * n2;
|
||
|
this.z = z * n2;
|
||
|
this.w = w * n2;
|
||
|
}
|
||
|
return this;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Set <code>this</code> quaternion to a rotation that rotates the <code>fromDir</code> vector to point along <code>toDir</code>.
|
||
|
* <p>
|
||
|
* Because there can be multiple possible rotations, this method chooses the one with the shortest arc.
|
||
|
*
|
||
|
* @see #rotationTo(float, float, float, float, float, float)
|
||
|
*
|
||
|
* @param fromDir
|
||
|
* the starting direction
|
||
|
* @param toDir
|
||
|
* the destination direction
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotationTo(Vector3fc fromDir, Vector3fc toDir) {
|
||
|
return rotationTo(fromDir.x(), fromDir.y(), fromDir.z(), toDir.x(), toDir.y(), toDir.z());
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateTo(float fromDirX, float fromDirY, float fromDirZ, float toDirX, float toDirY, float toDirZ, Quaternionf dest) {
|
||
|
float fn = Math.invsqrt(Math.fma(fromDirX, fromDirX, Math.fma(fromDirY, fromDirY, fromDirZ * fromDirZ)));
|
||
|
float tn = Math.invsqrt(Math.fma(toDirX, toDirX, Math.fma(toDirY, toDirY, toDirZ * toDirZ)));
|
||
|
float fx = fromDirX * fn, fy = fromDirY * fn, fz = fromDirZ * fn;
|
||
|
float tx = toDirX * tn, ty = toDirY * tn, tz = toDirZ * tn;
|
||
|
float dot = fx * tx + fy * ty + fz * tz;
|
||
|
float x, y, z, w;
|
||
|
if (dot < -1.0f + 1E-6f) {
|
||
|
x = fy;
|
||
|
y = -fx;
|
||
|
z = 0.0f;
|
||
|
w = 0.0f;
|
||
|
if (x * x + y * y == 0.0f) {
|
||
|
x = 0.0f;
|
||
|
y = fz;
|
||
|
z = -fy;
|
||
|
w = 0.0f;
|
||
|
}
|
||
|
} else {
|
||
|
float sd2 = Math.sqrt((1.0f + dot) * 2.0f);
|
||
|
float isd2 = 1.0f / sd2;
|
||
|
float cx = fy * tz - fz * ty;
|
||
|
float cy = fz * tx - fx * tz;
|
||
|
float cz = fx * ty - fy * tx;
|
||
|
x = cx * isd2;
|
||
|
y = cy * isd2;
|
||
|
z = cz * isd2;
|
||
|
w = sd2 * 0.5f;
|
||
|
float n2 = Math.invsqrt(Math.fma(x, x, Math.fma(y, y, Math.fma(z, z, w * w))));
|
||
|
x *= n2;
|
||
|
y *= n2;
|
||
|
z *= n2;
|
||
|
w *= n2;
|
||
|
}
|
||
|
/* Multiply */
|
||
|
return dest.set(Math.fma(this.w, x, Math.fma(this.x, w, Math.fma(this.y, z, -this.z * y))),
|
||
|
Math.fma(this.w, y, Math.fma(-this.x, z, Math.fma(this.y, w, this.z * x))),
|
||
|
Math.fma(this.w, z, Math.fma(this.x, y, Math.fma(-this.y, x, this.z * w))),
|
||
|
Math.fma(this.w, w, Math.fma(-this.x, x, Math.fma(-this.y, y, -this.z * z))));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> that rotates the <code>fromDir</code> vector to point along <code>toDir</code>.
|
||
|
* <p>
|
||
|
* Since there can be multiple possible rotations, this method chooses the one with the shortest arc.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @see #rotateTo(float, float, float, float, float, float, Quaternionf)
|
||
|
*
|
||
|
* @param fromDirX
|
||
|
* the x-coordinate of the direction to rotate into the destination direction
|
||
|
* @param fromDirY
|
||
|
* the y-coordinate of the direction to rotate into the destination direction
|
||
|
* @param fromDirZ
|
||
|
* the z-coordinate of the direction to rotate into the destination direction
|
||
|
* @param toDirX
|
||
|
* the x-coordinate of the direction to rotate to
|
||
|
* @param toDirY
|
||
|
* the y-coordinate of the direction to rotate to
|
||
|
* @param toDirZ
|
||
|
* the z-coordinate of the direction to rotate to
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateTo(float fromDirX, float fromDirY, float fromDirZ, float toDirX, float toDirY, float toDirZ) {
|
||
|
return rotateTo(fromDirX, fromDirY, fromDirZ, toDirX, toDirY, toDirZ, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateTo(Vector3fc fromDir, Vector3fc toDir, Quaternionf dest) {
|
||
|
return rotateTo(fromDir.x(), fromDir.y(), fromDir.z(), toDir.x(), toDir.y(), toDir.z(), dest);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> that rotates the <code>fromDir</code> vector to point along <code>toDir</code>.
|
||
|
* <p>
|
||
|
* Because there can be multiple possible rotations, this method chooses the one with the shortest arc.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @see #rotateTo(float, float, float, float, float, float, Quaternionf)
|
||
|
*
|
||
|
* @param fromDir
|
||
|
* the starting direction
|
||
|
* @param toDir
|
||
|
* the destination direction
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateTo(Vector3fc fromDir, Vector3fc toDir) {
|
||
|
return rotateTo(fromDir.x(), fromDir.y(), fromDir.z(), toDir.x(), toDir.y(), toDir.z(), this);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the x axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the x axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateX(float angle) {
|
||
|
return rotateX(angle, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateX(float angle, Quaternionf dest) {
|
||
|
float sin = Math.sin(angle * 0.5f);
|
||
|
float cos = Math.cosFromSin(sin, angle * 0.5f);
|
||
|
return dest.set(w * sin + x * cos,
|
||
|
y * cos + z * sin,
|
||
|
z * cos - y * sin,
|
||
|
w * cos - x * sin);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the y axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the y axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateY(float angle) {
|
||
|
return rotateY(angle, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateY(float angle, Quaternionf dest) {
|
||
|
float sin = Math.sin(angle * 0.5f);
|
||
|
float cos = Math.cosFromSin(sin, angle * 0.5f);
|
||
|
return dest.set(x * cos - z * sin,
|
||
|
w * sin + y * cos,
|
||
|
x * sin + z * cos,
|
||
|
w * cos - y * sin);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the z axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the z axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateZ(float angle) {
|
||
|
return rotateZ(angle, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateZ(float angle, Quaternionf dest) {
|
||
|
float sin = Math.sin(angle * 0.5f);
|
||
|
float cos = Math.cosFromSin(sin, angle * 0.5f);
|
||
|
return dest.set(x * cos + y * sin,
|
||
|
y * cos - x * sin,
|
||
|
w * sin + z * cos,
|
||
|
w * cos - z * sin);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the local x axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>R * Q</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>R * Q * v</code>, the
|
||
|
* rotation represented by <code>this</code> will be applied first!
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the local x axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateLocalX(float angle) {
|
||
|
return rotateLocalX(angle, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateLocalX(float angle, Quaternionf dest) {
|
||
|
float hangle = angle * 0.5f;
|
||
|
float s = Math.sin(hangle);
|
||
|
float c = Math.cosFromSin(s, hangle);
|
||
|
dest.set(c * x + s * w,
|
||
|
c * y - s * z,
|
||
|
c * z + s * y,
|
||
|
c * w - s * x);
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the local y axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>R * Q</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>R * Q * v</code>, the
|
||
|
* rotation represented by <code>this</code> will be applied first!
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the local y axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateLocalY(float angle) {
|
||
|
return rotateLocalY(angle, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateLocalY(float angle, Quaternionf dest) {
|
||
|
float hangle = angle * 0.5f;
|
||
|
float s = Math.sin(hangle);
|
||
|
float c = Math.cosFromSin(s, hangle);
|
||
|
dest.set(c * x + s * z,
|
||
|
c * y + s * w,
|
||
|
c * z - s * x,
|
||
|
c * w - s * y);
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the local z axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>R * Q</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>R * Q * v</code>, the
|
||
|
* rotation represented by <code>this</code> will be applied first!
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the local z axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateLocalZ(float angle) {
|
||
|
return rotateLocalZ(angle, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateLocalZ(float angle, Quaternionf dest) {
|
||
|
float hangle = angle * 0.5f;
|
||
|
float s = Math.sin(hangle);
|
||
|
float c = Math.cosFromSin(s, hangle);
|
||
|
dest.set(c * x - s * y,
|
||
|
c * y + s * x,
|
||
|
c * z + s * w,
|
||
|
c * w - s * z);
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateAxis(float angle, float axisX, float axisY, float axisZ, Quaternionf dest) {
|
||
|
float hangle = angle / 2.0f;
|
||
|
float sinAngle = Math.sin(hangle);
|
||
|
float invVLength = Math.invsqrt(Math.fma(axisX, axisX, Math.fma(axisY, axisY, axisZ * axisZ)));
|
||
|
float rx = axisX * invVLength * sinAngle;
|
||
|
float ry = axisY * invVLength * sinAngle;
|
||
|
float rz = axisZ * invVLength * sinAngle;
|
||
|
float rw = Math.cosFromSin(sinAngle, hangle);
|
||
|
return dest.set(Math.fma(this.w, rx, Math.fma(this.x, rw, Math.fma(this.y, rz, -this.z * ry))),
|
||
|
Math.fma(this.w, ry, Math.fma(-this.x, rz, Math.fma(this.y, rw, this.z * rx))),
|
||
|
Math.fma(this.w, rz, Math.fma(this.x, ry, Math.fma(-this.y, rx, this.z * rw))),
|
||
|
Math.fma(this.w, rw, Math.fma(-this.x, rx, Math.fma(-this.y, ry, -this.z * rz))));
|
||
|
}
|
||
|
|
||
|
public Quaternionf rotateAxis(float angle, Vector3fc axis, Quaternionf dest) {
|
||
|
return rotateAxis(angle, axis.x(), axis.y(), axis.z(), dest);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the specified axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @see #rotateAxis(float, float, float, float, Quaternionf)
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the specified axis
|
||
|
* @param axis
|
||
|
* the rotation axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateAxis(float angle, Vector3fc axis) {
|
||
|
return rotateAxis(angle, axis.x(), axis.y(), axis.z(), this);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Apply a rotation to <code>this</code> quaternion rotating the given radians about the specified axis.
|
||
|
* <p>
|
||
|
* If <code>Q</code> is <code>this</code> quaternion and <code>R</code> the quaternion representing the
|
||
|
* specified rotation, then the new quaternion will be <code>Q * R</code>. So when transforming a
|
||
|
* vector <code>v</code> with the new quaternion by using <code>Q * R * v</code>, the
|
||
|
* rotation added by this method will be applied first!
|
||
|
*
|
||
|
* @see #rotateAxis(float, float, float, float, Quaternionf)
|
||
|
*
|
||
|
* @param angle
|
||
|
* the angle in radians to rotate about the specified axis
|
||
|
* @param axisX
|
||
|
* the x coordinate of the rotation axis
|
||
|
* @param axisY
|
||
|
* the y coordinate of the rotation axis
|
||
|
* @param axisZ
|
||
|
* the z coordinate of the rotation axis
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf rotateAxis(float angle, float axisX, float axisY, float axisZ) {
|
||
|
return rotateAxis(angle, axisX, axisY, axisZ, this);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Return a string representation of this quaternion.
|
||
|
* <p>
|
||
|
* This method creates a new {@link DecimalFormat} on every invocation with the format string "<code>0.000E0;-</code>".
|
||
|
*
|
||
|
* @return the string representation
|
||
|
*/
|
||
|
public String toString() {
|
||
|
return Runtime.formatNumbers(toString(Options.NUMBER_FORMAT));
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Return a string representation of this quaternion by formatting the components with the given {@link NumberFormat}.
|
||
|
*
|
||
|
* @param formatter
|
||
|
* the {@link NumberFormat} used to format the quaternion components with
|
||
|
* @return the string representation
|
||
|
*/
|
||
|
public String toString(NumberFormat formatter) {
|
||
|
return "(" + Runtime.format(x, formatter) + " " + Runtime.format(y, formatter) + " " + Runtime.format(z, formatter) + " " + Runtime.format(w, formatter) + ")";
|
||
|
}
|
||
|
|
||
|
public void writeExternal(ObjectOutput out) throws IOException {
|
||
|
out.writeFloat(x);
|
||
|
out.writeFloat(y);
|
||
|
out.writeFloat(z);
|
||
|
out.writeFloat(w);
|
||
|
}
|
||
|
|
||
|
public void readExternal(ObjectInput in) throws IOException,
|
||
|
ClassNotFoundException {
|
||
|
x = in.readFloat();
|
||
|
y = in.readFloat();
|
||
|
z = in.readFloat();
|
||
|
w = in.readFloat();
|
||
|
}
|
||
|
|
||
|
public int hashCode() {
|
||
|
final int prime = 31;
|
||
|
int result = 1;
|
||
|
result = prime * result + Float.floatToIntBits(w);
|
||
|
result = prime * result + Float.floatToIntBits(x);
|
||
|
result = prime * result + Float.floatToIntBits(y);
|
||
|
result = prime * result + Float.floatToIntBits(z);
|
||
|
return result;
|
||
|
}
|
||
|
|
||
|
public boolean equals(Object obj) {
|
||
|
if (this == obj)
|
||
|
return true;
|
||
|
if (obj == null)
|
||
|
return false;
|
||
|
if (getClass() != obj.getClass())
|
||
|
return false;
|
||
|
Quaternionf other = (Quaternionf) obj;
|
||
|
if (Float.floatToIntBits(w) != Float.floatToIntBits(other.w))
|
||
|
return false;
|
||
|
if (Float.floatToIntBits(x) != Float.floatToIntBits(other.x))
|
||
|
return false;
|
||
|
if (Float.floatToIntBits(y) != Float.floatToIntBits(other.y))
|
||
|
return false;
|
||
|
if (Float.floatToIntBits(z) != Float.floatToIntBits(other.z))
|
||
|
return false;
|
||
|
return true;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Compute the difference between <code>this</code> and the <code>other</code> quaternion
|
||
|
* and store the result in <code>this</code>.
|
||
|
* <p>
|
||
|
* The difference is the rotation that has to be applied to get from
|
||
|
* <code>this</code> rotation to <code>other</code>. If <code>T</code> is <code>this</code>, <code>Q</code>
|
||
|
* is <code>other</code> and <code>D</code> is the computed difference, then the following equation holds:
|
||
|
* <p>
|
||
|
* <code>T * D = Q</code>
|
||
|
* <p>
|
||
|
* It is defined as: <code>D = T^-1 * Q</code>, where <code>T^-1</code> denotes the {@link #invert() inverse} of <code>T</code>.
|
||
|
*
|
||
|
* @param other
|
||
|
* the other quaternion
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf difference(Quaternionf other) {
|
||
|
return difference(other, this);
|
||
|
}
|
||
|
|
||
|
public Quaternionf difference(Quaternionfc other, Quaternionf dest) {
|
||
|
float invNorm = 1.0f / lengthSquared();
|
||
|
float x = -this.x * invNorm;
|
||
|
float y = -this.y * invNorm;
|
||
|
float z = -this.z * invNorm;
|
||
|
float w = this.w * invNorm;
|
||
|
dest.set(Math.fma(w, other.x(), Math.fma(x, other.w(), Math.fma(y, other.z(), -z * other.y()))),
|
||
|
Math.fma(w, other.y(), Math.fma(-x, other.z(), Math.fma(y, other.w(), z * other.x()))),
|
||
|
Math.fma(w, other.z(), Math.fma(x, other.y(), Math.fma(-y, other.x(), z * other.w()))),
|
||
|
Math.fma(w, other.w(), Math.fma(-x, other.x(), Math.fma(-y, other.y(), -z * other.z()))));
|
||
|
return dest;
|
||
|
}
|
||
|
|
||
|
public Vector3f positiveX(Vector3f dir) {
|
||
|
float invNorm = 1.0f / lengthSquared();
|
||
|
float nx = -x * invNorm;
|
||
|
float ny = -y * invNorm;
|
||
|
float nz = -z * invNorm;
|
||
|
float nw = w * invNorm;
|
||
|
float dy = ny + ny;
|
||
|
float dz = nz + nz;
|
||
|
dir.x = -ny * dy - nz * dz + 1.0f;
|
||
|
dir.y = nx * dy + nw * dz;
|
||
|
dir.z = nx * dz - nw * dy;
|
||
|
return dir;
|
||
|
}
|
||
|
|
||
|
public Vector3f normalizedPositiveX(Vector3f dir) {
|
||
|
float dy = y + y;
|
||
|
float dz = z + z;
|
||
|
dir.x = -y * dy - z * dz + 1.0f;
|
||
|
dir.y = x * dy - w * dz;
|
||
|
dir.z = x * dz + w * dy;
|
||
|
return dir;
|
||
|
}
|
||
|
|
||
|
public Vector3f positiveY(Vector3f dir) {
|
||
|
float invNorm = 1.0f / lengthSquared();
|
||
|
float nx = -x * invNorm;
|
||
|
float ny = -y * invNorm;
|
||
|
float nz = -z * invNorm;
|
||
|
float nw = w * invNorm;
|
||
|
float dx = nx + nx;
|
||
|
float dy = ny + ny;
|
||
|
float dz = nz + nz;
|
||
|
dir.x = nx * dy - nw * dz;
|
||
|
dir.y = -nx * dx - nz * dz + 1.0f;
|
||
|
dir.z = ny * dz + nw * dx;
|
||
|
return dir;
|
||
|
}
|
||
|
|
||
|
public Vector3f normalizedPositiveY(Vector3f dir) {
|
||
|
float dx = x + x;
|
||
|
float dy = y + y;
|
||
|
float dz = z + z;
|
||
|
dir.x = x * dy + w * dz;
|
||
|
dir.y = -x * dx - z * dz + 1.0f;
|
||
|
dir.z = y * dz - w * dx;
|
||
|
return dir;
|
||
|
}
|
||
|
|
||
|
public Vector3f positiveZ(Vector3f dir) {
|
||
|
float invNorm = 1.0f / lengthSquared();
|
||
|
float nx = -x * invNorm;
|
||
|
float ny = -y * invNorm;
|
||
|
float nz = -z * invNorm;
|
||
|
float nw = w * invNorm;
|
||
|
float dx = nx + nx;
|
||
|
float dy = ny + ny;
|
||
|
float dz = nz + nz;
|
||
|
dir.x = nx * dz + nw * dy;
|
||
|
dir.y = ny * dz - nw * dx;
|
||
|
dir.z = -nx * dx - ny * dy + 1.0f;
|
||
|
return dir;
|
||
|
}
|
||
|
|
||
|
public Vector3f normalizedPositiveZ(Vector3f dir) {
|
||
|
float dx = x + x;
|
||
|
float dy = y + y;
|
||
|
float dz = z + z;
|
||
|
dir.x = x * dz - w * dy;
|
||
|
dir.y = y * dz + w * dx;
|
||
|
dir.z = -x * dx - y * dy + 1.0f;
|
||
|
return dir;
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Conjugate <code>this</code> by the given quaternion <code>q</code> by computing <code>q * this * q^-1</code>.
|
||
|
*
|
||
|
* @param q
|
||
|
* the {@link Quaternionfc} to conjugate <code>this</code> by
|
||
|
* @return this
|
||
|
*/
|
||
|
public Quaternionf conjugateBy(Quaternionfc q) {
|
||
|
return conjugateBy(q, this);
|
||
|
}
|
||
|
|
||
|
/**
|
||
|
* Conjugate <code>this</code> by the given quaternion <code>q</code> by computing <code>q * this * q^-1</code>
|
||
|
* and store the result into <code>dest</code>.
|
||
|
*
|
||
|
* @param q
|
||
|
* the {@link Quaternionfc} to conjugate <code>this</code> by
|
||
|
* @param dest
|
||
|
* will hold the result
|
||
|
* @return dest
|
||
|
*/
|
||
|
public Quaternionf conjugateBy(Quaternionfc q, Quaternionf dest) {
|
||
|
float invNorm = 1.0f / q.lengthSquared();
|
||
|
float qix = -q.x() * invNorm, qiy = -q.y() * invNorm, qiz = -q.z() * invNorm, qiw = q.w() * invNorm;
|
||
|
float qpx = Math.fma(q.w(), x, Math.fma(q.x(), w, Math.fma(q.y(), z, -q.z() * y)));
|
||
|
float qpy = Math.fma(q.w(), y, Math.fma(-q.x(), z, Math.fma(q.y(), w, q.z() * x)));
|
||
|
float qpz = Math.fma(q.w(), z, Math.fma(q.x(), y, Math.fma(-q.y(), x, q.z() * w)));
|
||
|
float qpw = Math.fma(q.w(), w, Math.fma(-q.x(), x, Math.fma(-q.y(), y, -q.z() * z)));
|
||
|
return dest.set(Math.fma(qpw, qix, Math.fma(qpx, qiw, Math.fma(qpy, qiz, -qpz * qiy))),
|
||
|
Math.fma(qpw, qiy, Math.fma(-qpx, qiz, Math.fma(qpy, qiw, qpz * qix))),
|
||
|
Math.fma(qpw, qiz, Math.fma(qpx, qiy, Math.fma(-qpy, qix, qpz * qiw))),
|
||
|
Math.fma(qpw, qiw, Math.fma(-qpx, qix, Math.fma(-qpy, qiy, -qpz * qiz))));
|
||
|
}
|
||
|
|
||
|
public boolean isFinite() {
|
||
|
return Math.isFinite(x) && Math.isFinite(y) && Math.isFinite(z) && Math.isFinite(w);
|
||
|
}
|
||
|
|
||
|
public boolean equals(Quaternionfc q, float delta) {
|
||
|
if (this == q)
|
||
|
return true;
|
||
|
if (q == null)
|
||
|
return false;
|
||
|
if (!(q instanceof Quaternionfc))
|
||
|
return false;
|
||
|
if (!Runtime.equals(x, q.x(), delta))
|
||
|
return false;
|
||
|
if (!Runtime.equals(y, q.y(), delta))
|
||
|
return false;
|
||
|
if (!Runtime.equals(z, q.z(), delta))
|
||
|
return false;
|
||
|
if (!Runtime.equals(w, q.w(), delta))
|
||
|
return false;
|
||
|
return true;
|
||
|
}
|
||
|
|
||
|
public boolean equals(float x, float y, float z, float w) {
|
||
|
if (Float.floatToIntBits(this.x) != Float.floatToIntBits(x))
|
||
|
return false;
|
||
|
if (Float.floatToIntBits(this.y) != Float.floatToIntBits(y))
|
||
|
return false;
|
||
|
if (Float.floatToIntBits(this.z) != Float.floatToIntBits(z))
|
||
|
return false;
|
||
|
if (Float.floatToIntBits(this.w) != Float.floatToIntBits(w))
|
||
|
return false;
|
||
|
return true;
|
||
|
}
|
||
|
|
||
|
public Object clone() throws CloneNotSupportedException {
|
||
|
return super.clone();
|
||
|
}
|
||
|
|
||
|
}
|