# Euler to Quaternion / Quaternion to Euler using Eigen

I'm trying to implement a functionality that can convert an Euler angle into an Quaternion and back "YXZ"-convention using Eigen. Later this should be used to let the user give you Euler angles and rotate around as Quaternion and convert Back for the user. In fact i am realy bad at math but tried my best. I have no Idea if this matrices are correct or anything. The code Works, but my results are way to off, i suppose. Any idea where i take the wrong turn? This is what my Quat.cpp looks like:

``````#include "Quat.h"
#include <Eigen/Geometry>
#include <Eigen/Dense>
#include <cmath>
#include <iostream>

using namespace Eigen;

Vector3f Quat::MyRotation(const Vector3f YPR)
{
Matrix3f matYaw(3, 3), matRoll(3, 3), matPitch(3, 3), matRotation(3, 3);
const auto yaw = YPR*M_PI / 180;
const auto pitch = YPR*M_PI / 180;
const auto roll = YPR*M_PI / 180;

matYaw << cos(yaw), sin(yaw), 0.0f,
-sin(yaw), cos(yaw), 0.0f,  //z
0.0f, 0.0f, 1.0f;

matPitch << cos(pitch), 0.0f, -sin(pitch),
0.0f, 1.0f, 0.0f,   // X
sin(pitch), 0.0f, cos(pitch);

matRoll << 1.0f, 0.0f, 0.0f,
0.0f, cos(roll), sin(roll),   // Y
0.0f, -sin(roll), cos(roll);

matRotation = matYaw*matPitch*matRoll;

Quaternionf quatFromRot(matRotation);

quatFromRot.normalize(); //Do i need to do this?

return Quat::toYawPitchRoll(quatFromRot);
}

Vector3f Quat::toYawPitchRoll(const Eigen::Quaternionf& q)
{
Vector3f retVector;

const auto x = q.y();
const auto y = q.z();
const auto z = q.x();
const auto w = q.w();

retVector = atan2(2.0 * (y * z + w * x), w * w - x * x - y * y + z * z);
retVector = asin(-2.0 * (x * z - w * y));
retVector = atan2(2.0 * (x * y + w * z), w * w + x * x - y * y - z * z);

#if 1
retVector = (retVector * (180 / M_PI));
retVector = (retVector * (180 / M_PI))*-1;
retVector = retVector * (180 / M_PI);
#endif
return retVector;
}
``````

Input: x = 55.0, y = 80.0, z = 12.0 Quaternion: w:0.872274, x: -0.140211, y:0.447012, z:-0.140211 Return Value: x:-55.5925, y: -6.84901, z:-21.8771 The X-Value seems about right disregarding the prefix, but Y and z are off.

From Euler to Quaternion:

``````using namespace Eigen;
//Roll pitch and yaw in Radians
float roll = 1.5707, pitch = 0, yaw = 0.707;
Quaternionf q;
q = AngleAxisf(roll, Vector3f::UnitX())
* AngleAxisf(pitch, Vector3f::UnitY())
* AngleAxisf(yaw, Vector3f::UnitZ());
std::cout << "Quaternion" << std::endl << q.coeffs() << std::endl;
``````

From Quaternion to Euler:

``````auto euler = q.toRotationMatrix().eulerAngles(0, 1, 2);
std::cout << "Euler from quaternion in roll, pitch, yaw"<< std::endl << euler << std::endl;
``````
• Typo in "eulerAnglers". Aug 30, 2017 at 15:43
• To compile your code I have to provide a template argument (Scalar) when constructing a Quaternion, e.g., `Quternion<float> q` or `Quaternionf q` for your case. (with Eigen@3.3.4 and gcc@7.3.0) Feb 28, 2018 at 18:27

Here's one approach (not tested):

``````  Vector3d euler = quaternion.toRotationMatrix().eulerAngles(2, 1, 0);
yaw = euler; pitch = euler; roll = euler;
``````

When I use

auto euler = q.toRotationMatrix().eulerAngles(0, 1, 2)

It can not work perfectly all the time, the euler angle always has a regular beat (the actual value and the calculated value have a deviation of ±π). For example, read and show yaw angle by rqt picture.

I have no idea about this, but I find ros tf::getYaw() also can achieve "Quaternion to Euler" (because I just need yaw angle).

• I'm seeing the same exact behavior - the quaternions plot smoothly but the conversion to Euler roll/pitch/yaw exhibit the +/- pi instability. Jul 12, 2021 at 2:25

The Quaternation to Euler solution didnt work for me, so i researched and modified the code, now it works for my purpose:

``````Vector3f ToEulerAngles(const Eigen::Quaternionf& q) {
Vector3f angles;    //yaw pitch roll
const auto x = q.x();
const auto y = q.y();
const auto z = q.z();
const auto w = q.w();

// roll (x-axis rotation)
double sinr_cosp = 2 * (w * x + y * z);
double cosr_cosp = 1 - 2 * (x * x + y * y);
angles = std::atan2(sinr_cosp, cosr_cosp);

// pitch (y-axis rotation)
double sinp = 2 * (w * y - z * x);
if (std::abs(sinp) >= 1)
angles = std::copysign(M_PI / 2, sinp); // use 90 degrees if out of range
else
angles = std::asin(sinp);

// yaw (z-axis rotation)
double siny_cosp = 2 * (w * z + x * y);
double cosy_cosp = 1 - 2 * (y * y + z * z);
angles = std::atan2(siny_cosp, cosy_cosp);
return angles;
}
``````

I was inspired by this wiki entry and did some bench marking with the presented solution here. Checkout the wiki: https://en.wikipedia.org/wiki/Conversion_between_quaternions_and_Euler_angles

Without Eigen (just in case), I did:

``````tf2::Matrix3x3 ( quat ) . getEulerYPR( &roll, &pitch, &yaw );
// and
tf2::Matrix3x3 ( quat ) . getRPY( &roll, &pitch, &yaw );
``````

Though, these can give only two of the 24 configurations possible.