Larry Littlefield
IMU 10dof MEMS from DR Robot adapted from HK10DOF Changed gyro to ITG3200
Fork of
HK10DOF
by 
Aloïs Wolff
WARNING: This project is not complete, but this library seems ok so far.
I have the module DFRobotics.com 10DOF MEMS IMU. I wanted a concise module for resolving direction and movement.
I found HK10DOF library (http://developer.mbed.org/users/pommzorz/code/HK10DOF/) with quaternions. But it used a different gyro. So I modified that code to use the same higher level calls but use the ITG3200 low level calls.
helper_3dmath.h
- Committer:
- svkatielee
- Date:
- 2014-11-18
- Revision:
- 4:c4db4e2ffdd7
- Parent:
- 0:9a1682a09c50
File content as of revision 4:c4db4e2ffdd7:
// I2C device class (I2Cdev) demonstration Arduino sketch for MPU6050 class, 3D math helper
// 6/5/2012 by Jeff Rowberg <jeff@rowberg.net>
// Updates should (hopefully) always be available at https://github.com/jrowberg/i2cdevlib
//
// Changelog:
// 2012-06-05 - add 3D math helper file to DMP6 example sketch
/* ============================================
I2Cdev device library code is placed under the MIT license
Copyright (c) 2012 Jeff Rowberg
Permission is hereby granted, free of charge, to any person obtaining a copy
of this software and associated documentation files (the "Software"), to deal
in the Software without restriction, including without limitation the rights
to use, copy, modify, merge, publish, distribute, sublicense, and/or sell
copies of the Software, and to permit persons to whom the Software is
furnished to do so, subject to the following conditions:
The above copyright notice and this permission notice shall be included in
all copies or substantial portions of the Software.
THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR
IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE
AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER
LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM,
OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN
THE SOFTWARE.
===============================================
*/
#ifndef _HELPER_3DMATH_H_
#define _HELPER_3DMATH_H_
class Quaternion {
public:
float w;
float x;
float y;
float z;
Quaternion() {
w = 1.0f;
x = 0.0f;
y = 0.0f;
z = 0.0f;
}
Quaternion(float nw, float nx, float ny, float nz) {
w = nw;
x = nx;
y = ny;
z = nz;
}
Quaternion getProduct(Quaternion q) {
// Quaternion multiplication is defined by:
// (Q1 * Q2).w = (w1w2 - x1x2 - y1y2 - z1z2)
// (Q1 * Q2).x = (w1x2 + x1w2 + y1z2 - z1y2)
// (Q1 * Q2).y = (w1y2 - x1z2 + y1w2 + z1x2)
// (Q1 * Q2).z = (w1z2 + x1y2 - y1x2 + z1w2
return Quaternion(
w*q.w - x*q.x - y*q.y - z*q.z, // new w
w*q.x + x*q.w + y*q.z - z*q.y, // new x
w*q.y - x*q.z + y*q.w + z*q.x, // new y
w*q.z + x*q.y - y*q.x + z*q.w); // new z
}
Quaternion getConjugate() {
return Quaternion(w, -x, -y, -z);
}
float getMagnitude() {
return sqrt(w*w + x*x + y*y + z*z);
}
void normalize() {
float m = getMagnitude();
w /= m;
x /= m;
y /= m;
z /= m;
}
Quaternion getNormalized() {
Quaternion r(w, x, y, z);
r.normalize();
return r;
}
};
class VectorInt16 {
public:
int16_t x;
int16_t y;
int16_t z;
VectorInt16() {
x = 0;
y = 0;
z = 0;
}
VectorInt16(int16_t nx, int16_t ny, int16_t nz) {
x = nx;
y = ny;
z = nz;
}
float getMagnitude() {
return sqrt((float)(x*x + y*y + z*z));
}
void normalize() {
float m = getMagnitude();
x /= m;
y /= m;
z /= m;
}
VectorInt16 getNormalized() {
VectorInt16 r(x, y, z);
r.normalize();
return r;
}
void rotate(Quaternion *q) {
// http://www.cprogramming.com/tutorial/3d/quaternions.html
// http://www.euclideanspace.com/maths/algebra/realNormedAlgebra/quaternions/transforms/index.htm
// http://content.gpwiki.org/index.php/OpenGL:Tutorials:Using_Quaternions_to_represent_rotation
// ^ or: http://webcache.googleusercontent.com/search?q=cache:xgJAp3bDNhQJ:content.gpwiki.org/index.php/OpenGL:Tutorials:Using_Quaternions_to_represent_rotation&hl=en&gl=us&strip=1
// P_out = q * P_in * conj(q)
// - P_out is the output vector
// - q is the orientation quaternion
// - P_in is the input vector (a*aReal)
// - conj(q) is the conjugate of the orientation quaternion (q=[w,x,y,z], q*=[w,-x,-y,-z])
Quaternion p(0, x, y, z);
// quaternion multiplication: q * p, stored back in p
p = q -> getProduct(p);
// quaternion multiplication: p * conj(q), stored back in p
p = p.getProduct(q -> getConjugate());
// p quaternion is now [0, x', y', z']
x = p.x;
y = p.y;
z = p.z;
}
VectorInt16 getRotated(Quaternion *q) {
VectorInt16 r(x, y, z);
r.rotate(q);
return r;
}
};
class VectorFloat {
public:
float x;
float y;
float z;
VectorFloat() {
x = 0;
y = 0;
z = 0;
}
VectorFloat(float nx, float ny, float nz) {
x = nx;
y = ny;
z = nz;
}
float getMagnitude() {
return sqrt(x*x + y*y + z*z);
}
void normalize() {
float m = getMagnitude();
x /= m;
y /= m;
z /= m;
}
VectorFloat getNormalized() {
VectorFloat r(x, y, z);
r.normalize();
return r;
}
void rotate(Quaternion *q) {
Quaternion p(0, x, y, z);
// quaternion multiplication: q * p, stored back in p
p = q -> getProduct(p);
// quaternion multiplication: p * conj(q), stored back in p
p = p.getProduct(q -> getConjugate());
// p quaternion is now [0, x', y', z']
x = p.x;
y = p.y;
z = p.z;
}
VectorFloat getRotated(Quaternion *q) {
VectorFloat r(x, y, z);
r.rotate(q);
return r;
}
};
#endif /* _HELPER_3DMATH_H_ */