adafruit_bno055 / utility / vector.h @ 55604844
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/*
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Inertial Measurement Unit Maths Library
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Copyright (C) 2013-2014 Samuel Cowen
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www.camelsoftware.com
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This program is free software: you can redistribute it and/or modify
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it under the terms of the GNU General Public License as published by
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the Free Software Foundation, either version 3 of the License, or
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(at your option) any later version.
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This program is distributed in the hope that it will be useful,
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but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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GNU General Public License for more details.
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You should have received a copy of the GNU General Public License
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along with this program. If not, see <http://www.gnu.org/licenses/>.
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*/
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#ifndef IMUMATH_VECTOR_HPP
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#define IMUMATH_VECTOR_HPP
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#include <stdlib.h> |
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#include <string.h> |
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#include <stdint.h> |
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#include <math.h> |
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namespace imu |
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{
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template <uint8_t N> class Vector |
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{
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public:
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Vector() |
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{
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memset(p_vec, 0, sizeof(double)*N); |
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} |
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Vector(double a)
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{
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memset(p_vec, 0, sizeof(double)*N); |
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p_vec[0] = a;
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} |
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Vector(double a, double b) |
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{
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memset(p_vec, 0, sizeof(double)*N); |
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p_vec[0] = a;
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p_vec[1] = b;
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} |
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Vector(double a, double b, double c) |
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{
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memset(p_vec, 0, sizeof(double)*N); |
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p_vec[0] = a;
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p_vec[1] = b;
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p_vec[2] = c;
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} |
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Vector(double a, double b, double c, double d) |
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{
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memset(p_vec, 0, sizeof(double)*N); |
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p_vec[0] = a;
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p_vec[1] = b;
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p_vec[2] = c;
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p_vec[3] = d;
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} |
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Vector(const Vector<N> &v)
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{
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for (int x = 0; x < N; x++) |
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p_vec[x] = v.p_vec[x]; |
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} |
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~Vector() |
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{
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} |
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uint8_t n() { return N; }
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double magnitude()
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{
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double res = 0; |
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int i;
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for(i = 0; i < N; i++) |
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res += (p_vec[i] * p_vec[i]); |
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if(isnan(res))
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return 0; |
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if((fabs(res-1)) >= 0.000001) // Avoid a sqrt if possible. |
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return sqrt(res);
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return 1; |
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} |
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void normalize()
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{
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double mag = magnitude();
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if(abs(mag) <= 0.0001) |
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return;
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int i;
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for(i = 0; i < N; i++) |
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p_vec[i] = p_vec[i]/mag; |
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} |
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double dot(Vector v)
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{
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double ret = 0; |
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int i;
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for(i = 0; i < N; i++) |
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ret += p_vec[i] * v.p_vec[i]; |
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return ret;
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} |
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Vector cross(Vector v) |
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{
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Vector ret; |
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// The cross product is only valid for vectors with 3 dimensions,
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// with the exception of higher dimensional stuff that is beyond the intended scope of this library
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if(N != 3) |
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return ret;
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ret.p_vec[0] = (p_vec[1] * v.p_vec[2]) - (p_vec[2] * v.p_vec[1]); |
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ret.p_vec[1] = (p_vec[2] * v.p_vec[0]) - (p_vec[0] * v.p_vec[2]); |
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ret.p_vec[2] = (p_vec[0] * v.p_vec[1]) - (p_vec[1] * v.p_vec[0]); |
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return ret;
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} |
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Vector scale(double scalar) const |
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{
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Vector ret; |
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for(int i = 0; i < N; i++) |
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ret.p_vec[i] = p_vec[i] * scalar; |
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return ret;
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} |
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Vector invert() const
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{
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Vector ret; |
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for(int i = 0; i < N; i++) |
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ret.p_vec[i] = -p_vec[i]; |
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return ret;
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} |
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Vector operator = (Vector v) |
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{
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for (int x = 0; x < N; x++ ) |
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p_vec[x] = v.p_vec[x]; |
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return *this;
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} |
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double& operator [](int n) |
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{
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return p_vec[n];
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} |
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double operator [](int n) const |
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{
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return p_vec[n];
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} |
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double& operator ()(int n) |
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{
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return p_vec[n];
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} |
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double operator ()(int n) const |
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{
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return p_vec[n];
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} |
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Vector operator + (Vector v) const
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{
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Vector ret; |
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for(int i = 0; i < N; i++) |
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ret.p_vec[i] = p_vec[i] + v.p_vec[i]; |
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return ret;
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} |
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Vector operator - (Vector v) const
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{
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Vector ret; |
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for(int i = 0; i < N; i++) |
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ret.p_vec[i] = p_vec[i] - v.p_vec[i]; |
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return ret;
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} |
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Vector operator * (double scalar) const |
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{
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return scale(scalar);
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} |
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Vector operator / (double scalar) const |
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{
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Vector ret; |
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for(int i = 0; i < N; i++) |
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ret.p_vec[i] = p_vec[i] / scalar; |
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return ret;
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} |
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void toDegrees()
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{
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for(int i = 0; i < N; i++) |
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p_vec[i] *= 57.2957795131; //180/pi |
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} |
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void toRadians()
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{
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for(int i = 0; i < N; i++) |
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p_vec[i] *= 0.01745329251; //pi/180 |
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} |
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double& x() { return p_vec[0]; } |
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double& y() { return p_vec[1]; } |
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double& z() { return p_vec[2]; } |
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double x() const { return p_vec[0]; } |
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double y() const { return p_vec[1]; } |
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double z() const { return p_vec[2]; } |
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private:
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double p_vec[N];
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}; |
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}; |
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#endif
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