497 lines
20 KiB
C++
497 lines
20 KiB
C++
///////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////
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/**
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* Contains code for 3x3 matrices.
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* \file IceMatrix3x3.h
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* \author Pierre Terdiman
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* \date April, 4, 2000
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*/
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///////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////
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///////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////
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// Include Guard
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#ifndef __ICEMATRIX3X3_H__
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#define __ICEMATRIX3X3_H__
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// Forward declarations
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class Quat;
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#define MATRIX3X3_EPSILON (1.0e-7f)
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class ICEMATHS_API Matrix3x3
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{
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public:
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//! Empty constructor
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inline_ Matrix3x3() {}
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//! Constructor from 9 values
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inline_ Matrix3x3(float m00, float m01, float m02, float m10, float m11, float m12, float m20, float m21, float m22)
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{
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m[0][0] = m00; m[0][1] = m01; m[0][2] = m02;
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m[1][0] = m10; m[1][1] = m11; m[1][2] = m12;
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m[2][0] = m20; m[2][1] = m21; m[2][2] = m22;
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}
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//! Copy constructor
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inline_ Matrix3x3(const Matrix3x3& mat) { CopyMemory(m, &mat.m, 9*sizeof(float)); }
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//! Destructor
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inline_ ~Matrix3x3() {}
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//! Assign values
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inline_ void Set(float m00, float m01, float m02, float m10, float m11, float m12, float m20, float m21, float m22)
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{
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m[0][0] = m00; m[0][1] = m01; m[0][2] = m02;
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m[1][0] = m10; m[1][1] = m11; m[1][2] = m12;
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m[2][0] = m20; m[2][1] = m21; m[2][2] = m22;
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}
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//! Sets the scale from a Point. The point is put on the diagonal.
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inline_ void SetScale(const Point& p) { m[0][0] = p.x; m[1][1] = p.y; m[2][2] = p.z; }
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//! Sets the scale from floats. Values are put on the diagonal.
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inline_ void SetScale(float sx, float sy, float sz) { m[0][0] = sx; m[1][1] = sy; m[2][2] = sz; }
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//! Scales from a Point. Each row is multiplied by a component.
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inline_ void Scale(const Point& p)
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{
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m[0][0] *= p.x; m[0][1] *= p.x; m[0][2] *= p.x;
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m[1][0] *= p.y; m[1][1] *= p.y; m[1][2] *= p.y;
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m[2][0] *= p.z; m[2][1] *= p.z; m[2][2] *= p.z;
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}
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//! Scales from floats. Each row is multiplied by a value.
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inline_ void Scale(float sx, float sy, float sz)
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{
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m[0][0] *= sx; m[0][1] *= sx; m[0][2] *= sx;
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m[1][0] *= sy; m[1][1] *= sy; m[1][2] *= sy;
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m[2][0] *= sz; m[2][1] *= sz; m[2][2] *= sz;
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}
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//! Copy from a Matrix3x3
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inline_ void Copy(const Matrix3x3& source) { CopyMemory(m, source.m, 9*sizeof(float)); }
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// Row-column access
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//! Returns a row.
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inline_ void GetRow(const udword r, Point& p) const { p.x = m[r][0]; p.y = m[r][1]; p.z = m[r][2]; }
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//! Returns a row.
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inline_ const Point& GetRow(const udword r) const { return *(const Point*)&m[r][0]; }
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//! Returns a row.
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inline_ Point& GetRow(const udword r) { return *(Point*)&m[r][0]; }
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//! Sets a row.
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inline_ void SetRow(const udword r, const Point& p) { m[r][0] = p.x; m[r][1] = p.y; m[r][2] = p.z; }
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//! Returns a column.
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inline_ void GetCol(const udword c, Point& p) const { p.x = m[0][c]; p.y = m[1][c]; p.z = m[2][c]; }
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//! Sets a column.
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inline_ void SetCol(const udword c, const Point& p) { m[0][c] = p.x; m[1][c] = p.y; m[2][c] = p.z; }
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//! Computes the trace. The trace is the sum of the 3 diagonal components.
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inline_ float Trace() const { return m[0][0] + m[1][1] + m[2][2]; }
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//! Clears the matrix.
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inline_ void Zero() { ZeroMemory(&m, sizeof(m)); }
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//! Sets the identity matrix.
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inline_ void Identity() { Zero(); m[0][0] = m[1][1] = m[2][2] = 1.0f; }
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//! Checks for identity
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inline_ bool IsIdentity() const
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{
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if(IR(m[0][0])!=IEEE_1_0) return false;
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if(IR(m[0][1])!=0) return false;
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if(IR(m[0][2])!=0) return false;
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if(IR(m[1][0])!=0) return false;
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if(IR(m[1][1])!=IEEE_1_0) return false;
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if(IR(m[1][2])!=0) return false;
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if(IR(m[2][0])!=0) return false;
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if(IR(m[2][1])!=0) return false;
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if(IR(m[2][2])!=IEEE_1_0) return false;
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return true;
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}
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//! Checks matrix validity
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inline_ BOOL IsValid() const
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{
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for(udword j=0;j<3;j++)
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{
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for(udword i=0;i<3;i++)
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{
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if(!IsValidFloat(m[j][i])) return FALSE;
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}
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}
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return TRUE;
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}
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//! Makes a skew-symmetric matrix (a.k.a. Star(*) Matrix)
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//! [ 0.0 -a.z a.y ]
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//! [ a.z 0.0 -a.x ]
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//! [ -a.y a.x 0.0 ]
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//! This is also called a "cross matrix" since for any vectors A and B,
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//! A^B = Skew(A) * B = - B * Skew(A);
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inline_ void SkewSymmetric(const Point& a)
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{
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m[0][0] = 0.0f;
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m[0][1] = -a.z;
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m[0][2] = a.y;
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m[1][0] = a.z;
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m[1][1] = 0.0f;
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m[1][2] = -a.x;
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m[2][0] = -a.y;
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m[2][1] = a.x;
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m[2][2] = 0.0f;
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}
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//! Negates the matrix
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inline_ void Neg()
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{
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m[0][0] = -m[0][0]; m[0][1] = -m[0][1]; m[0][2] = -m[0][2];
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m[1][0] = -m[1][0]; m[1][1] = -m[1][1]; m[1][2] = -m[1][2];
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m[2][0] = -m[2][0]; m[2][1] = -m[2][1]; m[2][2] = -m[2][2];
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}
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//! Neg from another matrix
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inline_ void Neg(const Matrix3x3& mat)
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{
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m[0][0] = -mat.m[0][0]; m[0][1] = -mat.m[0][1]; m[0][2] = -mat.m[0][2];
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m[1][0] = -mat.m[1][0]; m[1][1] = -mat.m[1][1]; m[1][2] = -mat.m[1][2];
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m[2][0] = -mat.m[2][0]; m[2][1] = -mat.m[2][1]; m[2][2] = -mat.m[2][2];
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}
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//! Add another matrix
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inline_ void Add(const Matrix3x3& mat)
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{
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m[0][0] += mat.m[0][0]; m[0][1] += mat.m[0][1]; m[0][2] += mat.m[0][2];
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m[1][0] += mat.m[1][0]; m[1][1] += mat.m[1][1]; m[1][2] += mat.m[1][2];
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m[2][0] += mat.m[2][0]; m[2][1] += mat.m[2][1]; m[2][2] += mat.m[2][2];
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}
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//! Sub another matrix
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inline_ void Sub(const Matrix3x3& mat)
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{
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m[0][0] -= mat.m[0][0]; m[0][1] -= mat.m[0][1]; m[0][2] -= mat.m[0][2];
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m[1][0] -= mat.m[1][0]; m[1][1] -= mat.m[1][1]; m[1][2] -= mat.m[1][2];
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m[2][0] -= mat.m[2][0]; m[2][1] -= mat.m[2][1]; m[2][2] -= mat.m[2][2];
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}
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//! Mac
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inline_ void Mac(const Matrix3x3& a, const Matrix3x3& b, float s)
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{
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m[0][0] = a.m[0][0] + b.m[0][0] * s;
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m[0][1] = a.m[0][1] + b.m[0][1] * s;
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m[0][2] = a.m[0][2] + b.m[0][2] * s;
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m[1][0] = a.m[1][0] + b.m[1][0] * s;
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m[1][1] = a.m[1][1] + b.m[1][1] * s;
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m[1][2] = a.m[1][2] + b.m[1][2] * s;
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m[2][0] = a.m[2][0] + b.m[2][0] * s;
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m[2][1] = a.m[2][1] + b.m[2][1] * s;
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m[2][2] = a.m[2][2] + b.m[2][2] * s;
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}
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//! Mac
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inline_ void Mac(const Matrix3x3& a, float s)
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{
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m[0][0] += a.m[0][0] * s; m[0][1] += a.m[0][1] * s; m[0][2] += a.m[0][2] * s;
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m[1][0] += a.m[1][0] * s; m[1][1] += a.m[1][1] * s; m[1][2] += a.m[1][2] * s;
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m[2][0] += a.m[2][0] * s; m[2][1] += a.m[2][1] * s; m[2][2] += a.m[2][2] * s;
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}
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//! this = A * s
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inline_ void Mult(const Matrix3x3& a, float s)
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{
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m[0][0] = a.m[0][0] * s; m[0][1] = a.m[0][1] * s; m[0][2] = a.m[0][2] * s;
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m[1][0] = a.m[1][0] * s; m[1][1] = a.m[1][1] * s; m[1][2] = a.m[1][2] * s;
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m[2][0] = a.m[2][0] * s; m[2][1] = a.m[2][1] * s; m[2][2] = a.m[2][2] * s;
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}
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inline_ void Add(const Matrix3x3& a, const Matrix3x3& b)
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{
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m[0][0] = a.m[0][0] + b.m[0][0]; m[0][1] = a.m[0][1] + b.m[0][1]; m[0][2] = a.m[0][2] + b.m[0][2];
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m[1][0] = a.m[1][0] + b.m[1][0]; m[1][1] = a.m[1][1] + b.m[1][1]; m[1][2] = a.m[1][2] + b.m[1][2];
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m[2][0] = a.m[2][0] + b.m[2][0]; m[2][1] = a.m[2][1] + b.m[2][1]; m[2][2] = a.m[2][2] + b.m[2][2];
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}
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inline_ void Sub(const Matrix3x3& a, const Matrix3x3& b)
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{
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m[0][0] = a.m[0][0] - b.m[0][0]; m[0][1] = a.m[0][1] - b.m[0][1]; m[0][2] = a.m[0][2] - b.m[0][2];
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m[1][0] = a.m[1][0] - b.m[1][0]; m[1][1] = a.m[1][1] - b.m[1][1]; m[1][2] = a.m[1][2] - b.m[1][2];
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m[2][0] = a.m[2][0] - b.m[2][0]; m[2][1] = a.m[2][1] - b.m[2][1]; m[2][2] = a.m[2][2] - b.m[2][2];
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}
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//! this = a * b
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inline_ void Mult(const Matrix3x3& a, const Matrix3x3& b)
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{
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m[0][0] = a.m[0][0] * b.m[0][0] + a.m[0][1] * b.m[1][0] + a.m[0][2] * b.m[2][0];
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m[0][1] = a.m[0][0] * b.m[0][1] + a.m[0][1] * b.m[1][1] + a.m[0][2] * b.m[2][1];
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m[0][2] = a.m[0][0] * b.m[0][2] + a.m[0][1] * b.m[1][2] + a.m[0][2] * b.m[2][2];
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m[1][0] = a.m[1][0] * b.m[0][0] + a.m[1][1] * b.m[1][0] + a.m[1][2] * b.m[2][0];
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m[1][1] = a.m[1][0] * b.m[0][1] + a.m[1][1] * b.m[1][1] + a.m[1][2] * b.m[2][1];
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m[1][2] = a.m[1][0] * b.m[0][2] + a.m[1][1] * b.m[1][2] + a.m[1][2] * b.m[2][2];
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m[2][0] = a.m[2][0] * b.m[0][0] + a.m[2][1] * b.m[1][0] + a.m[2][2] * b.m[2][0];
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m[2][1] = a.m[2][0] * b.m[0][1] + a.m[2][1] * b.m[1][1] + a.m[2][2] * b.m[2][1];
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m[2][2] = a.m[2][0] * b.m[0][2] + a.m[2][1] * b.m[1][2] + a.m[2][2] * b.m[2][2];
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}
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//! this = transpose(a) * b
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inline_ void MultAtB(const Matrix3x3& a, const Matrix3x3& b)
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{
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m[0][0] = a.m[0][0] * b.m[0][0] + a.m[1][0] * b.m[1][0] + a.m[2][0] * b.m[2][0];
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m[0][1] = a.m[0][0] * b.m[0][1] + a.m[1][0] * b.m[1][1] + a.m[2][0] * b.m[2][1];
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m[0][2] = a.m[0][0] * b.m[0][2] + a.m[1][0] * b.m[1][2] + a.m[2][0] * b.m[2][2];
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m[1][0] = a.m[0][1] * b.m[0][0] + a.m[1][1] * b.m[1][0] + a.m[2][1] * b.m[2][0];
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m[1][1] = a.m[0][1] * b.m[0][1] + a.m[1][1] * b.m[1][1] + a.m[2][1] * b.m[2][1];
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m[1][2] = a.m[0][1] * b.m[0][2] + a.m[1][1] * b.m[1][2] + a.m[2][1] * b.m[2][2];
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m[2][0] = a.m[0][2] * b.m[0][0] + a.m[1][2] * b.m[1][0] + a.m[2][2] * b.m[2][0];
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m[2][1] = a.m[0][2] * b.m[0][1] + a.m[1][2] * b.m[1][1] + a.m[2][2] * b.m[2][1];
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m[2][2] = a.m[0][2] * b.m[0][2] + a.m[1][2] * b.m[1][2] + a.m[2][2] * b.m[2][2];
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}
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//! this = a * transpose(b)
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inline_ void MultABt(const Matrix3x3& a, const Matrix3x3& b)
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{
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m[0][0] = a.m[0][0] * b.m[0][0] + a.m[0][1] * b.m[0][1] + a.m[0][2] * b.m[0][2];
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m[0][1] = a.m[0][0] * b.m[1][0] + a.m[0][1] * b.m[1][1] + a.m[0][2] * b.m[1][2];
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m[0][2] = a.m[0][0] * b.m[2][0] + a.m[0][1] * b.m[2][1] + a.m[0][2] * b.m[2][2];
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m[1][0] = a.m[1][0] * b.m[0][0] + a.m[1][1] * b.m[0][1] + a.m[1][2] * b.m[0][2];
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m[1][1] = a.m[1][0] * b.m[1][0] + a.m[1][1] * b.m[1][1] + a.m[1][2] * b.m[1][2];
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m[1][2] = a.m[1][0] * b.m[2][0] + a.m[1][1] * b.m[2][1] + a.m[1][2] * b.m[2][2];
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m[2][0] = a.m[2][0] * b.m[0][0] + a.m[2][1] * b.m[0][1] + a.m[2][2] * b.m[0][2];
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m[2][1] = a.m[2][0] * b.m[1][0] + a.m[2][1] * b.m[1][1] + a.m[2][2] * b.m[1][2];
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m[2][2] = a.m[2][0] * b.m[2][0] + a.m[2][1] * b.m[2][1] + a.m[2][2] * b.m[2][2];
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}
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//! Makes a rotation matrix mapping vector "from" to vector "to".
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Matrix3x3& FromTo(const Point& from, const Point& to);
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//! Set a rotation matrix around the X axis.
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//! 1 0 0
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//! RX = 0 cx sx
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//! 0 -sx cx
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void RotX(float angle);
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//! Set a rotation matrix around the Y axis.
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//! cy 0 -sy
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//! RY = 0 1 0
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//! sy 0 cy
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void RotY(float angle);
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//! Set a rotation matrix around the Z axis.
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//! cz sz 0
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//! RZ = -sz cz 0
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//! 0 0 1
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void RotZ(float angle);
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//! cy sx.sy -sy.cx
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//! RY.RX 0 cx sx
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//! sy -sx.cy cx.cy
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void RotYX(float y, float x);
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//! Make a rotation matrix about an arbitrary axis
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Matrix3x3& Rot(float angle, const Point& axis);
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//! Transpose the matrix.
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void Transpose()
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{
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IR(m[1][0]) ^= IR(m[0][1]); IR(m[0][1]) ^= IR(m[1][0]); IR(m[1][0]) ^= IR(m[0][1]);
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IR(m[2][0]) ^= IR(m[0][2]); IR(m[0][2]) ^= IR(m[2][0]); IR(m[2][0]) ^= IR(m[0][2]);
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IR(m[2][1]) ^= IR(m[1][2]); IR(m[1][2]) ^= IR(m[2][1]); IR(m[2][1]) ^= IR(m[1][2]);
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}
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//! this = Transpose(a)
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void Transpose(const Matrix3x3& a)
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{
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m[0][0] = a.m[0][0]; m[0][1] = a.m[1][0]; m[0][2] = a.m[2][0];
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m[1][0] = a.m[0][1]; m[1][1] = a.m[1][1]; m[1][2] = a.m[2][1];
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m[2][0] = a.m[0][2]; m[2][1] = a.m[1][2]; m[2][2] = a.m[2][2];
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}
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//! Compute the determinant of the matrix. We use the rule of Sarrus.
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float Determinant() const
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{
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return (m[0][0]*m[1][1]*m[2][2] + m[0][1]*m[1][2]*m[2][0] + m[0][2]*m[1][0]*m[2][1])
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- (m[2][0]*m[1][1]*m[0][2] + m[2][1]*m[1][2]*m[0][0] + m[2][2]*m[1][0]*m[0][1]);
|
|
}
|
|
/*
|
|
//! Compute a cofactor. Used for matrix inversion.
|
|
float CoFactor(ubyte row, ubyte column) const
|
|
{
|
|
static sdword gIndex[3+2] = { 0, 1, 2, 0, 1 };
|
|
return (m[gIndex[row+1]][gIndex[column+1]]*m[gIndex[row+2]][gIndex[column+2]] - m[gIndex[row+2]][gIndex[column+1]]*m[gIndex[row+1]][gIndex[column+2]]);
|
|
}
|
|
*/
|
|
//! Invert the matrix. Determinant must be different from zero, else matrix can't be inverted.
|
|
Matrix3x3& Invert()
|
|
{
|
|
float Det = Determinant(); // Must be !=0
|
|
float OneOverDet = 1.0f / Det;
|
|
|
|
Matrix3x3 Temp;
|
|
Temp.m[0][0] = +(m[1][1] * m[2][2] - m[2][1] * m[1][2]) * OneOverDet;
|
|
Temp.m[1][0] = -(m[1][0] * m[2][2] - m[2][0] * m[1][2]) * OneOverDet;
|
|
Temp.m[2][0] = +(m[1][0] * m[2][1] - m[2][0] * m[1][1]) * OneOverDet;
|
|
Temp.m[0][1] = -(m[0][1] * m[2][2] - m[2][1] * m[0][2]) * OneOverDet;
|
|
Temp.m[1][1] = +(m[0][0] * m[2][2] - m[2][0] * m[0][2]) * OneOverDet;
|
|
Temp.m[2][1] = -(m[0][0] * m[2][1] - m[2][0] * m[0][1]) * OneOverDet;
|
|
Temp.m[0][2] = +(m[0][1] * m[1][2] - m[1][1] * m[0][2]) * OneOverDet;
|
|
Temp.m[1][2] = -(m[0][0] * m[1][2] - m[1][0] * m[0][2]) * OneOverDet;
|
|
Temp.m[2][2] = +(m[0][0] * m[1][1] - m[1][0] * m[0][1]) * OneOverDet;
|
|
|
|
*this = Temp;
|
|
|
|
return *this;
|
|
}
|
|
|
|
Matrix3x3& Normalize();
|
|
|
|
//! this = exp(a)
|
|
Matrix3x3& Exp(const Matrix3x3& a);
|
|
|
|
void FromQuat(const Quat &q);
|
|
void FromQuatL2(const Quat &q, float l2);
|
|
|
|
// Arithmetic operators
|
|
//! Operator for Matrix3x3 Plus = Matrix3x3 + Matrix3x3;
|
|
inline_ Matrix3x3 operator+(const Matrix3x3& mat) const
|
|
{
|
|
return Matrix3x3(
|
|
m[0][0] + mat.m[0][0], m[0][1] + mat.m[0][1], m[0][2] + mat.m[0][2],
|
|
m[1][0] + mat.m[1][0], m[1][1] + mat.m[1][1], m[1][2] + mat.m[1][2],
|
|
m[2][0] + mat.m[2][0], m[2][1] + mat.m[2][1], m[2][2] + mat.m[2][2]);
|
|
}
|
|
|
|
//! Operator for Matrix3x3 Minus = Matrix3x3 - Matrix3x3;
|
|
inline_ Matrix3x3 operator-(const Matrix3x3& mat) const
|
|
{
|
|
return Matrix3x3(
|
|
m[0][0] - mat.m[0][0], m[0][1] - mat.m[0][1], m[0][2] - mat.m[0][2],
|
|
m[1][0] - mat.m[1][0], m[1][1] - mat.m[1][1], m[1][2] - mat.m[1][2],
|
|
m[2][0] - mat.m[2][0], m[2][1] - mat.m[2][1], m[2][2] - mat.m[2][2]);
|
|
}
|
|
|
|
//! Operator for Matrix3x3 Mul = Matrix3x3 * Matrix3x3;
|
|
inline_ Matrix3x3 operator*(const Matrix3x3& mat) const
|
|
{
|
|
return Matrix3x3(
|
|
m[0][0]*mat.m[0][0] + m[0][1]*mat.m[1][0] + m[0][2]*mat.m[2][0],
|
|
m[0][0]*mat.m[0][1] + m[0][1]*mat.m[1][1] + m[0][2]*mat.m[2][1],
|
|
m[0][0]*mat.m[0][2] + m[0][1]*mat.m[1][2] + m[0][2]*mat.m[2][2],
|
|
|
|
m[1][0]*mat.m[0][0] + m[1][1]*mat.m[1][0] + m[1][2]*mat.m[2][0],
|
|
m[1][0]*mat.m[0][1] + m[1][1]*mat.m[1][1] + m[1][2]*mat.m[2][1],
|
|
m[1][0]*mat.m[0][2] + m[1][1]*mat.m[1][2] + m[1][2]*mat.m[2][2],
|
|
|
|
m[2][0]*mat.m[0][0] + m[2][1]*mat.m[1][0] + m[2][2]*mat.m[2][0],
|
|
m[2][0]*mat.m[0][1] + m[2][1]*mat.m[1][1] + m[2][2]*mat.m[2][1],
|
|
m[2][0]*mat.m[0][2] + m[2][1]*mat.m[1][2] + m[2][2]*mat.m[2][2]);
|
|
}
|
|
|
|
//! Operator for Point Mul = Matrix3x3 * Point;
|
|
inline_ Point operator*(const Point& v) const { return Point(GetRow(0)|v, GetRow(1)|v, GetRow(2)|v); }
|
|
|
|
//! Operator for Matrix3x3 Mul = Matrix3x3 * float;
|
|
inline_ Matrix3x3 operator*(float s) const
|
|
{
|
|
return Matrix3x3(
|
|
m[0][0]*s, m[0][1]*s, m[0][2]*s,
|
|
m[1][0]*s, m[1][1]*s, m[1][2]*s,
|
|
m[2][0]*s, m[2][1]*s, m[2][2]*s);
|
|
}
|
|
|
|
//! Operator for Matrix3x3 Mul = float * Matrix3x3;
|
|
inline_ friend Matrix3x3 operator*(float s, const Matrix3x3& mat)
|
|
{
|
|
return Matrix3x3(
|
|
s*mat.m[0][0], s*mat.m[0][1], s*mat.m[0][2],
|
|
s*mat.m[1][0], s*mat.m[1][1], s*mat.m[1][2],
|
|
s*mat.m[2][0], s*mat.m[2][1], s*mat.m[2][2]);
|
|
}
|
|
|
|
//! Operator for Matrix3x3 Div = Matrix3x3 / float;
|
|
inline_ Matrix3x3 operator/(float s) const
|
|
{
|
|
if (s) s = 1.0f / s;
|
|
return Matrix3x3(
|
|
m[0][0]*s, m[0][1]*s, m[0][2]*s,
|
|
m[1][0]*s, m[1][1]*s, m[1][2]*s,
|
|
m[2][0]*s, m[2][1]*s, m[2][2]*s);
|
|
}
|
|
|
|
//! Operator for Matrix3x3 Div = float / Matrix3x3;
|
|
inline_ friend Matrix3x3 operator/(float s, const Matrix3x3& mat)
|
|
{
|
|
return Matrix3x3(
|
|
s/mat.m[0][0], s/mat.m[0][1], s/mat.m[0][2],
|
|
s/mat.m[1][0], s/mat.m[1][1], s/mat.m[1][2],
|
|
s/mat.m[2][0], s/mat.m[2][1], s/mat.m[2][2]);
|
|
}
|
|
|
|
//! Operator for Matrix3x3 += Matrix3x3
|
|
inline_ Matrix3x3& operator+=(const Matrix3x3& mat)
|
|
{
|
|
m[0][0] += mat.m[0][0]; m[0][1] += mat.m[0][1]; m[0][2] += mat.m[0][2];
|
|
m[1][0] += mat.m[1][0]; m[1][1] += mat.m[1][1]; m[1][2] += mat.m[1][2];
|
|
m[2][0] += mat.m[2][0]; m[2][1] += mat.m[2][1]; m[2][2] += mat.m[2][2];
|
|
return *this;
|
|
}
|
|
|
|
//! Operator for Matrix3x3 -= Matrix3x3
|
|
inline_ Matrix3x3& operator-=(const Matrix3x3& mat)
|
|
{
|
|
m[0][0] -= mat.m[0][0]; m[0][1] -= mat.m[0][1]; m[0][2] -= mat.m[0][2];
|
|
m[1][0] -= mat.m[1][0]; m[1][1] -= mat.m[1][1]; m[1][2] -= mat.m[1][2];
|
|
m[2][0] -= mat.m[2][0]; m[2][1] -= mat.m[2][1]; m[2][2] -= mat.m[2][2];
|
|
return *this;
|
|
}
|
|
|
|
//! Operator for Matrix3x3 *= Matrix3x3
|
|
inline_ Matrix3x3& operator*=(const Matrix3x3& mat)
|
|
{
|
|
Point TempRow;
|
|
|
|
GetRow(0, TempRow);
|
|
m[0][0] = TempRow.x*mat.m[0][0] + TempRow.y*mat.m[1][0] + TempRow.z*mat.m[2][0];
|
|
m[0][1] = TempRow.x*mat.m[0][1] + TempRow.y*mat.m[1][1] + TempRow.z*mat.m[2][1];
|
|
m[0][2] = TempRow.x*mat.m[0][2] + TempRow.y*mat.m[1][2] + TempRow.z*mat.m[2][2];
|
|
|
|
GetRow(1, TempRow);
|
|
m[1][0] = TempRow.x*mat.m[0][0] + TempRow.y*mat.m[1][0] + TempRow.z*mat.m[2][0];
|
|
m[1][1] = TempRow.x*mat.m[0][1] + TempRow.y*mat.m[1][1] + TempRow.z*mat.m[2][1];
|
|
m[1][2] = TempRow.x*mat.m[0][2] + TempRow.y*mat.m[1][2] + TempRow.z*mat.m[2][2];
|
|
|
|
GetRow(2, TempRow);
|
|
m[2][0] = TempRow.x*mat.m[0][0] + TempRow.y*mat.m[1][0] + TempRow.z*mat.m[2][0];
|
|
m[2][1] = TempRow.x*mat.m[0][1] + TempRow.y*mat.m[1][1] + TempRow.z*mat.m[2][1];
|
|
m[2][2] = TempRow.x*mat.m[0][2] + TempRow.y*mat.m[1][2] + TempRow.z*mat.m[2][2];
|
|
return *this;
|
|
}
|
|
|
|
//! Operator for Matrix3x3 *= float
|
|
inline_ Matrix3x3& operator*=(float s)
|
|
{
|
|
m[0][0] *= s; m[0][1] *= s; m[0][2] *= s;
|
|
m[1][0] *= s; m[1][1] *= s; m[1][2] *= s;
|
|
m[2][0] *= s; m[2][1] *= s; m[2][2] *= s;
|
|
return *this;
|
|
}
|
|
|
|
//! Operator for Matrix3x3 /= float
|
|
inline_ Matrix3x3& operator/=(float s)
|
|
{
|
|
if (s) s = 1.0f / s;
|
|
m[0][0] *= s; m[0][1] *= s; m[0][2] *= s;
|
|
m[1][0] *= s; m[1][1] *= s; m[1][2] *= s;
|
|
m[2][0] *= s; m[2][1] *= s; m[2][2] *= s;
|
|
return *this;
|
|
}
|
|
|
|
// Cast operators
|
|
//! Cast a Matrix3x3 to a Matrix4x4.
|
|
operator Matrix4x4() const;
|
|
//! Cast a Matrix3x3 to a Quat.
|
|
operator Quat() const;
|
|
|
|
inline_ const Point& operator[](int row) const { return *(const Point*)&m[row][0]; }
|
|
inline_ Point& operator[](int row) { return *(Point*)&m[row][0]; }
|
|
|
|
public:
|
|
|
|
float m[3][3];
|
|
};
|
|
|
|
#endif // __ICEMATRIX3X3_H__
|
|
|