github.com/SahandAslani/gomobile@v0.0.0-20210909130135-2cb2d44c09b2/exp/f32/mat4.go (about) 1 // Copyright 2014 The Go Authors. All rights reserved. 2 // Use of this source code is governed by a BSD-style 3 // license that can be found in the LICENSE file. 4 5 package f32 6 7 import "fmt" 8 9 // A Mat4 is a 4x4 matrix of float32 values. 10 // Elements are indexed first by row then column, i.e. m[row][column]. 11 type Mat4 [4]Vec4 12 13 func (m Mat4) String() string { 14 return fmt.Sprintf(`Mat4[% 0.3f, % 0.3f, % 0.3f, % 0.3f, 15 % 0.3f, % 0.3f, % 0.3f, % 0.3f, 16 % 0.3f, % 0.3f, % 0.3f, % 0.3f, 17 % 0.3f, % 0.3f, % 0.3f, % 0.3f]`, 18 m[0][0], m[0][1], m[0][2], m[0][3], 19 m[1][0], m[1][1], m[1][2], m[1][3], 20 m[2][0], m[2][1], m[2][2], m[2][3], 21 m[3][0], m[3][1], m[3][2], m[3][3]) 22 } 23 24 func (m *Mat4) Identity() { 25 *m = Mat4{ 26 {1, 0, 0, 0}, 27 {0, 1, 0, 0}, 28 {0, 0, 1, 0}, 29 {0, 0, 0, 1}, 30 } 31 } 32 33 func (m *Mat4) Eq(n *Mat4, epsilon float32) bool { 34 for i := range m { 35 for j := range m[i] { 36 diff := m[i][j] - n[i][j] 37 if diff < -epsilon || +epsilon < diff { 38 return false 39 } 40 } 41 } 42 return true 43 } 44 45 // Mul stores a × b in m. 46 func (m *Mat4) Mul(a, b *Mat4) { 47 // Store the result in local variables, in case m == a || m == b. 48 m00 := a[0][0]*b[0][0] + a[0][1]*b[1][0] + a[0][2]*b[2][0] + a[0][3]*b[3][0] 49 m01 := a[0][0]*b[0][1] + a[0][1]*b[1][1] + a[0][2]*b[2][1] + a[0][3]*b[3][1] 50 m02 := a[0][0]*b[0][2] + a[0][1]*b[1][2] + a[0][2]*b[2][2] + a[0][3]*b[3][2] 51 m03 := a[0][0]*b[0][3] + a[0][1]*b[1][3] + a[0][2]*b[2][3] + a[0][3]*b[3][3] 52 m10 := a[1][0]*b[0][0] + a[1][1]*b[1][0] + a[1][2]*b[2][0] + a[1][3]*b[3][0] 53 m11 := a[1][0]*b[0][1] + a[1][1]*b[1][1] + a[1][2]*b[2][1] + a[1][3]*b[3][1] 54 m12 := a[1][0]*b[0][2] + a[1][1]*b[1][2] + a[1][2]*b[2][2] + a[1][3]*b[3][2] 55 m13 := a[1][0]*b[0][3] + a[1][1]*b[1][3] + a[1][2]*b[2][3] + a[1][3]*b[3][3] 56 m20 := a[2][0]*b[0][0] + a[2][1]*b[1][0] + a[2][2]*b[2][0] + a[2][3]*b[3][0] 57 m21 := a[2][0]*b[0][1] + a[2][1]*b[1][1] + a[2][2]*b[2][1] + a[2][3]*b[3][1] 58 m22 := a[2][0]*b[0][2] + a[2][1]*b[1][2] + a[2][2]*b[2][2] + a[2][3]*b[3][2] 59 m23 := a[2][0]*b[0][3] + a[2][1]*b[1][3] + a[2][2]*b[2][3] + a[2][3]*b[3][3] 60 m30 := a[3][0]*b[0][0] + a[3][1]*b[1][0] + a[3][2]*b[2][0] + a[3][3]*b[3][0] 61 m31 := a[3][0]*b[0][1] + a[3][1]*b[1][1] + a[3][2]*b[2][1] + a[3][3]*b[3][1] 62 m32 := a[3][0]*b[0][2] + a[3][1]*b[1][2] + a[3][2]*b[2][2] + a[3][3]*b[3][2] 63 m33 := a[3][0]*b[0][3] + a[3][1]*b[1][3] + a[3][2]*b[2][3] + a[3][3]*b[3][3] 64 m[0][0] = m00 65 m[0][1] = m01 66 m[0][2] = m02 67 m[0][3] = m03 68 m[1][0] = m10 69 m[1][1] = m11 70 m[1][2] = m12 71 m[1][3] = m13 72 m[2][0] = m20 73 m[2][1] = m21 74 m[2][2] = m22 75 m[2][3] = m23 76 m[3][0] = m30 77 m[3][1] = m31 78 m[3][2] = m32 79 m[3][3] = m33 80 } 81 82 // Perspective sets m to be the GL perspective matrix. 83 func (m *Mat4) Perspective(fov Radian, aspect, near, far float32) { 84 t := Tan(float32(fov) / 2) 85 86 m[0][0] = 1 / (aspect * t) 87 m[1][1] = 1 / t 88 m[2][2] = -(far + near) / (far - near) 89 m[2][3] = -1 90 m[3][2] = -2 * far * near / (far - near) 91 } 92 93 // Scale sets m to be a scale followed by p. 94 // It is equivalent to 95 // m.Mul(p, &Mat4{ 96 // {x, 0, 0, 0}, 97 // {0, y, 0, 0}, 98 // {0, 0, z, 0}, 99 // {0, 0, 0, 1}, 100 // }). 101 func (m *Mat4) Scale(p *Mat4, x, y, z float32) { 102 m[0][0] = p[0][0] * x 103 m[0][1] = p[0][1] * y 104 m[0][2] = p[0][2] * z 105 m[0][3] = p[0][3] 106 m[1][0] = p[1][0] * x 107 m[1][1] = p[1][1] * y 108 m[1][2] = p[1][2] * z 109 m[1][3] = p[1][3] 110 m[2][0] = p[2][0] * x 111 m[2][1] = p[2][1] * y 112 m[2][2] = p[2][2] * z 113 m[2][3] = p[2][3] 114 m[3][0] = p[3][0] * x 115 m[3][1] = p[3][1] * y 116 m[3][2] = p[3][2] * z 117 m[3][3] = p[3][3] 118 } 119 120 // Translate sets m to be a translation followed by p. 121 // It is equivalent to 122 // m.Mul(p, &Mat4{ 123 // {1, 0, 0, x}, 124 // {0, 1, 0, y}, 125 // {0, 0, 1, z}, 126 // {0, 0, 0, 1}, 127 // }). 128 func (m *Mat4) Translate(p *Mat4, x, y, z float32) { 129 m[0][0] = p[0][0] 130 m[0][1] = p[0][1] 131 m[0][2] = p[0][2] 132 m[0][3] = p[0][0]*x + p[0][1]*y + p[0][2]*z + p[0][3] 133 m[1][0] = p[1][0] 134 m[1][1] = p[1][1] 135 m[1][2] = p[1][2] 136 m[1][3] = p[1][0]*x + p[1][1]*y + p[1][2]*z + p[1][3] 137 m[2][0] = p[2][0] 138 m[2][1] = p[2][1] 139 m[2][2] = p[2][2] 140 m[2][3] = p[2][0]*x + p[2][1]*y + p[2][2]*z + p[2][3] 141 m[3][0] = p[3][0] 142 m[3][1] = p[3][1] 143 m[3][2] = p[3][2] 144 m[3][3] = p[3][0]*x + p[3][1]*y + p[3][2]*z + p[3][3] 145 } 146 147 // Rotate sets m to a rotation in radians around a specified axis, followed by p. 148 // It is equivalent to m.Mul(p, affineRotation). 149 func (m *Mat4) Rotate(p *Mat4, angle Radian, axis *Vec3) { 150 a := *axis 151 a.Normalize() 152 153 c, s := Cos(float32(angle)), Sin(float32(angle)) 154 d := 1 - c 155 156 m.Mul(p, &Mat4{{ 157 c + d*a[0]*a[1], 158 0 + d*a[0]*a[1] + s*a[2], 159 0 + d*a[0]*a[1] - s*a[1], 160 0, 161 }, { 162 0 + d*a[1]*a[0] - s*a[2], 163 c + d*a[1]*a[1], 164 0 + d*a[1]*a[2] + s*a[0], 165 0, 166 }, { 167 0 + d*a[2]*a[0] + s*a[1], 168 0 + d*a[2]*a[1] - s*a[0], 169 c + d*a[2]*a[2], 170 0, 171 }, { 172 0, 0, 0, 1, 173 }}) 174 } 175 176 func (m *Mat4) LookAt(eye, center, up *Vec3) { 177 f, s, u := new(Vec3), new(Vec3), new(Vec3) 178 179 *f = *center 180 f.Sub(f, eye) 181 f.Normalize() 182 183 s.Cross(f, up) 184 s.Normalize() 185 u.Cross(s, f) 186 187 *m = Mat4{ 188 {s[0], u[0], -f[0], 0}, 189 {s[1], u[1], -f[1], 0}, 190 {s[2], u[2], -f[2], 0}, 191 {-s.Dot(eye), -u.Dot(eye), +f.Dot(eye), 1}, 192 } 193 }