mirror of
https://github.com/PixarAnimationStudios/OpenSubdiv
synced 2024-12-12 12:00:11 +00:00
299 lines
9.3 KiB
C++
299 lines
9.3 KiB
C++
//
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// Copyright (C) Pixar. All rights reserved.
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//
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// This license governs use of the accompanying software. If you
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// use the software, you accept this license. If you do not accept
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// the license, do not use the software.
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//
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// 1. Definitions
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// The terms "reproduce," "reproduction," "derivative works," and
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// "distribution" have the same meaning here as under U.S.
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// copyright law. A "contribution" is the original software, or
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// any additions or changes to the software.
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// A "contributor" is any person or entity that distributes its
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// contribution under this license.
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// "Licensed patents" are a contributor's patent claims that read
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// directly on its contribution.
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//
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// 2. Grant of Rights
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// (A) Copyright Grant- Subject to the terms of this license,
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// including the license conditions and limitations in section 3,
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// each contributor grants you a non-exclusive, worldwide,
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// royalty-free copyright license to reproduce its contribution,
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// prepare derivative works of its contribution, and distribute
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// its contribution or any derivative works that you create.
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// (B) Patent Grant- Subject to the terms of this license,
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// including the license conditions and limitations in section 3,
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// each contributor grants you a non-exclusive, worldwide,
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// royalty-free license under its licensed patents to make, have
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// made, use, sell, offer for sale, import, and/or otherwise
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// dispose of its contribution in the software or derivative works
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// of the contribution in the software.
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//
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// 3. Conditions and Limitations
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// (A) No Trademark License- This license does not grant you
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// rights to use any contributor's name, logo, or trademarks.
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// (B) If you bring a patent claim against any contributor over
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// patents that you claim are infringed by the software, your
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// patent license from such contributor to the software ends
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// automatically.
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// (C) If you distribute any portion of the software, you must
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// retain all copyright, patent, trademark, and attribution
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// notices that are present in the software.
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// (D) If you distribute any portion of the software in source
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// code form, you may do so only under this license by including a
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// complete copy of this license with your distribution. If you
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// distribute any portion of the software in compiled or object
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// code form, you may only do so under a license that complies
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// with this license.
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// (E) The software is licensed "as-is." You bear the risk of
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// using it. The contributors give no express warranties,
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// guarantees or conditions. You may have additional consumer
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// rights under your local laws which this license cannot change.
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// To the extent permitted under your local laws, the contributors
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// exclude the implied warranties of merchantability, fitness for
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// a particular purpose and non-infringement.
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//
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#ifndef SIMPLE_MATH_H
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#define SIMPLE_MATH_H
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#include <cmath>
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inline void
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cross(float *n, const float *p0, const float *p1, const float *p2) {
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float a[3] = { p1[0]-p0[0], p1[1]-p0[1], p1[2]-p0[2] };
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float b[3] = { p2[0]-p0[0], p2[1]-p0[1], p2[2]-p0[2] };
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n[0] = a[1]*b[2]-a[2]*b[1];
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n[1] = a[2]*b[0]-a[0]*b[2];
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n[2] = a[0]*b[1]-a[1]*b[0];
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float rn = 1.0f/sqrtf(n[0]*n[0] + n[1]*n[1] + n[2]*n[2]);
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n[0] *= rn;
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n[1] *= rn;
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n[2] *= rn;
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}
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inline void
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normalize(float * p) {
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float dist = sqrtf( p[0]*p[0] + p[1]*p[1] + p[2]*p[2] );
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p[0]/=dist;
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p[1]/=dist;
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p[2]/=dist;
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}
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inline void
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multMatrix(float *d, const float *a, const float *b) {
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for (int i=0; i<4; ++i)
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{
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for (int j=0; j<4; ++j)
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{
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d[i*4 + j] =
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a[i*4 + 0] * b[0*4 + j] +
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a[i*4 + 1] * b[1*4 + j] +
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a[i*4 + 2] * b[2*4 + j] +
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a[i*4 + 3] * b[3*4 + j];
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}
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}
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}
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inline void
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inverseMatrix(float *d, const float *m) {
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d[0] = m[ 5]*m[10]*m[15] - m[ 5]*m[11]*m[14] -
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m[ 9]*m[ 6]*m[15] + m[ 9]*m[ 7]*m[14] +
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m[13]*m[ 6]*m[11] - m[13]*m[ 7]*m[10];
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d[1] = -m[ 1]*m[10]*m[15] + m[ 1]*m[11]*m[14] +
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m[ 9]*m[ 2]*m[15] - m[ 9]*m[ 3]*m[14] -
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m[13]*m[ 2]*m[11] + m[13]*m[ 3]*m[10];
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d[2] = m[ 1]*m[ 6]*m[15] - m[ 1]*m[ 7]*m[14] -
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m[ 5]*m[ 2]*m[15] + m[ 5]*m[ 3]*m[14] +
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m[13]*m[ 2]*m[ 7] - m[13]*m[ 3]*m[ 6];
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d[3] = -m[ 1]*m[ 6]*m[11] + m[ 1]*m[ 7]*m[10] +
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m[ 5]*m[ 2]*m[11] - m[ 5]*m[ 3]*m[10] -
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m[ 9]*m[ 2]*m[ 7] + m[ 9]*m[ 3]*m[ 6];
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d[4] = -m[ 4]*m[10]*m[15] + m[ 4]*m[11]*m[14] +
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m[ 8]*m[ 6]*m[15] - m[ 8]*m[ 7]*m[14] -
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m[12]*m[ 6]*m[11] + m[12]*m[ 7]*m[10];
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d[5] = m[ 0]*m[10]*m[15] - m[ 0]*m[11]*m[14] -
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m[ 8]*m[ 2]*m[15] + m[ 8]*m[ 3]*m[14] +
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m[12]*m[ 2]*m[11] - m[12]*m[ 3]*m[10];
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d[6] = -m[ 0]*m[ 6]*m[15] + m[ 0]*m[ 7]*m[14] +
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m[ 4]*m[ 2]*m[15] - m[ 4]*m[ 3]*m[14] -
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m[12]*m[ 2]*m[ 7] + m[12]*m[ 3]*m[ 6];
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d[7] = m[ 0]*m[ 6]*m[11] - m[ 0]*m[ 7]*m[10] -
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m[ 4]*m[ 2]*m[11] + m[ 4]*m[ 3]*m[10] +
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m[ 8]*m[ 2]*m[ 7] - m[ 8]*m[ 3]*m[ 6];
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d[8] = m[ 4]*m[ 9]*m[15] - m[ 4]*m[11]*m[13] -
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m[ 8]*m[ 5]*m[15] + m[ 8]*m[ 7]*m[13] +
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m[12]*m[ 5]*m[11] - m[12]*m[ 7]*m[ 9];
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d[9] = -m[ 0]*m[ 9]*m[15] + m[ 0]*m[11]*m[13] +
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m[ 8]*m[ 1]*m[15] - m[ 8]*m[ 3]*m[13] -
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m[12]*m[ 1]*m[11] + m[12]*m[ 3]*m[ 9];
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d[10] = m[ 0]*m[ 5]*m[15] - m[ 0]*m[ 7]*m[13] -
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m[ 4]*m[ 1]*m[15] + m[ 4]*m[ 3]*m[13] +
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m[12]*m[ 1]*m[ 7] - m[12]*m[ 3]*m[ 5];
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d[11] = -m[ 0]*m[ 5]*m[11] + m[ 0]*m[ 7]*m[ 9] +
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m[ 4]*m[ 1]*m[11] - m[ 4]*m[ 3]*m[ 9] -
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m[ 8]*m[ 1]*m[ 7] + m[ 8]*m[ 3]*m[ 5];
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d[12] = -m[ 4]*m[ 9]*m[14] + m[ 4]*m[10]*m[13] +
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m[ 8]*m[ 5]*m[14] - m[ 8]*m[ 6]*m[13] -
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m[12]*m[ 5]*m[10] + m[12]*m[ 6]*m[ 9];
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d[13] = m[ 0]*m[ 9]*m[14] - m[ 0]*m[10]*m[13] -
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m[ 8]*m[ 1]*m[14] + m[ 8]*m[ 2]*m[13] +
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m[12]*m[ 1]*m[10] - m[12]*m[ 2]*m[ 9];
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d[14] = -m[ 0]*m[ 5]*m[14] + m[ 0]*m[ 6]*m[13] +
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m[ 4]*m[ 1]*m[14] - m[ 4]*m[ 2]*m[13] -
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m[12]*m[ 1]*m[ 6] + m[12]*m[ 2]*m[ 5];
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d[15] = m[ 0]*m[ 5]*m[10] - m[ 0]*m[ 6]*m[ 9] -
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m[ 4]*m[ 1]*m[10] + m[ 4]*m[ 2]*m[ 9] +
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m[ 8]*m[ 1]*m[ 6] - m[ 8]*m[ 2]*m[ 5];
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float det = m[0] * d[0] + m[1] * d[4] + m[2] * d[8] + m[3] * d[12];
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if (det == 0) return;
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det = 1.0f / det;
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for (int i = 0; i < 16; i++)
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d[i] = d[i] * det;
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}
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inline void
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perspective(float *m, float fovy, float aspect, float znear, float zfar)
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{
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float r = 2 * (float)M_PI * fovy / 360.0F;
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float t = 1.0f / tan(r*0.5f);
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m[0] = t/aspect;
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m[1] = m[2] = m[3] = 0.0;
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m[4] = 0.0;
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m[5] = t;
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m[6] = m[7] = 0.0;
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m[8] = m[9] = 0.0;
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m[10] = (zfar + znear) / (znear - zfar);
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m[11] = -1;
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m[12] = m[13] = 0.0;
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m[14] = (2*zfar*znear)/(znear - zfar);
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m[15] = 0.0;
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}
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inline void
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identity(float *m)
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{
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m[0] = 1; m[1] = 0; m[2] = 0; m[3] = 0;
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m[4] = 0; m[5] = 1; m[6] = 0; m[7] = 0;
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m[8] = 0; m[9] = 0; m[10] = 1; m[11] = 0;
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m[12] = 0; m[13] = 0; m[14] = 0; m[15] = 1;
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}
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inline void
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translate(float *m, float x, float y, float z)
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{
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float t[16];
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identity(t);
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t[12] = x;
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t[13] = y;
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t[14] = z;
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float o[16];
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for(int i = 0; i < 16; i++) o[i] = m[i];
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multMatrix(m, t, o);
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}
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inline void
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ortho(float *m, float left, float top, float right, float bottom)
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{
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identity(m);
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m[0] = 2.0f / (right - left);
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m[5] = 2.0f / (top - bottom);
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m[10] = -1;
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m[12] = -(right+left)/(right-left);
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m[13] = -(top+bottom)/(top-bottom);
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}
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inline void
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rotate(float *m, float angle, float x, float y, float z)
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{
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float r = 2 * (float) M_PI * angle/360.0f;
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float c = cos(r);
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float s = sin(r);
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float t[16];
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t[0] = x*x*(1-c)+c;
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t[1] = y*x*(1-c)+z*s;
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t[2] = x*z*(1-c)-y*s;
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t[3] = 0;
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t[4] = x*y*(1-c)-z*s;
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t[5] = y*y*(1-c)+c;
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t[6] = y*z*(1-c)+x*s;
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t[7] = 0;
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t[8] = x*z*(1-c)+y*s;
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t[9] = y*z*(1-c)-x*s;
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t[10] = z*z*(1-c)+c;
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t[11] = 0;
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t[12] = t[13] = t[14] = 0;
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t[15] = 1;
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float o[16];
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for(int i = 0; i < 16; i++) o[i] = m[i];
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multMatrix(m, t, o);
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}
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inline void
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transpose(float *m)
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{
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std::swap(m[1], m[4]);
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std::swap(m[2], m[8]);
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std::swap(m[3], m[12]);
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std::swap(m[6], m[9]);
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std::swap(m[7], m[13]);
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std::swap(m[11],m[14]);
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}
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inline void
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apply(float *v, const float *m)
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{
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float r[4];
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r[0] = v[0] * m[0] + v[1] * m[4] + v[2] * m[8] + v[3] * m[12];
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r[1] = v[1] * m[1] + v[1] * m[5] + v[2] * m[9] + v[3] * m[13];
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r[2] = v[2] * m[2] + v[1] * m[6] + v[2] * m[10] + v[3] * m[14];
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r[3] = v[3] * m[3] + v[1] * m[7] + v[2] * m[11] + v[3] * m[14];
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v[0] = r[0];
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v[1] = r[1];
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v[2] = r[2];
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v[3] = r[3];
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}
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inline void
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pickMatrix(float *m, float x, float y, float width, float height, const int *viewport)
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{
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float sx, sy;
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float tx, ty;
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sx = viewport[2] / width;
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sy = viewport[3] / height;
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tx = (viewport[2] + 2.0f * (viewport[0] - x)) / width;
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ty = (viewport[3] + 2.0f * (viewport[1] - y)) / height;
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identity(m);
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m[0] = sx;
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m[5] = sy;
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m[12] = tx;
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m[13] = ty;
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}
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#endif // SIMPLE_MATH_H
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