Euler angles

 ( Rotation In Three Dimensions ) 

• $\backslash alpha$ (or $\backslash varphi$) is the signed angle between the x axis and the N axis ( x-convention – it could also be defined between y and N, called y-convention).
• $\backslash beta$ (or $\backslash theta$) is the angle between the z axis and the Z axis.
• $\backslash gamma$ (or $\backslash psi$) is the signed angle between the N axis and the X axis ( x-convention).

Euler angles between two reference frames are defined only if both frames have the same handedness.

Euler angles can be defined by intrinsic rotations. The rotated frame XYZ may be imagined to be initially aligned with xyz, before undergoing the three elemental rotations represented by Euler angles. Its successive orientations may be denoted as follows:

• x- y- z or x₀- y₀- z₀ (initial)
• x′- y′- z′ or x₁- y₁- z₁ (after first rotation)
• x″- y″- z″ or x₂- y₂- z₂ (after second rotation)
• X- Y- Z or x₃- y₃- z₃ (final)

For the above-listed sequence of rotations, the line of nodes N can be simply defined as the orientation of X after the first elemental rotation. Hence, N can be simply denoted x′. Moreover, since the third elemental rotation occurs about Z, it does not change the orientation of Z. Hence Z coincides with z″. This allows us to simplify the definition of the Euler angles as follows:

• α (or φ) represents a rotation around the z axis,
• β (or θ) represents a rotation around the x′ axis,
• γ (or ψ) represents a rotation around the z″ axis.

• The XYZ system rotates about the z axis by γ. The X axis is now at angle γ with respect to the x axis.
• The XYZ system rotates again, but this time about the x axis by β. The Z axis is now at angle β with respect to the z axis.
• The XYZ system rotates a third time, about the z axis again, by angle α.

In sum, the three elemental rotations occur about z, x and z. This sequence is often denoted z- x- z (or 3-1-3). Sets of rotation axes associated with both proper Euler angles and Tait–Bryan angles are commonly named using this notation (see above for the six possibilities for each).

If each step of the rotation acts on the rotating coordinate system XYZ, the rotation is intrinsic ( Z-X'-Z''). Intrinsic rotation can also be denoted 3-1-3.

About the ranges (using interval notation):

• for α and γ, the range is defined modulo 2 . For instance, a valid range could be .
• for β, the range covers radians (but can not be said to be modulo ). For example, it could be or .

The angles α, β and γ are uniquely determined except for the singular case that the xy and the XY planes are identical, i.e. when the z axis and the Z axis have the same or opposite directions. Indeed, if the z axis and the Z axis are the same, β = 0 and only ( α +  γ) is uniquely defined (not the individual values), and, similarly, if the z axis and the Z axis are opposite, β =  and only ( α −  γ) is uniquely defined (not the individual values). These ambiguities are known as gimbal lock in applications.

There are six possibilities of choosing the rotation axes for proper Euler angles. In all of them, the first and third rotation axes are the same. The six possible sequences are:

1. z₁- x′- z₂″ (intrinsic rotations) or z₂- x- z₁ (extrinsic rotations)
2. x₁- y′- x₂″ (intrinsic rotations) or x₂- y- x₁ (extrinsic rotations)
3. y₁- z′- y₂″ (intrinsic rotations) or y₂- z- y₁ (extrinsic rotations)
4. z₁- y′- z₂″ (intrinsic rotations) or z₂- y- z₁ (extrinsic rotations)
5. x₁- z′- x₂″ (intrinsic rotations) or x₂- z- x₁ (extrinsic rotations)
6. y₁- x′- y₂″ (intrinsic rotations) or y₂- x- y₁ (extrinsic rotations)

Note: If an object undergoes a certain change of orientation this can be described as a combination of precession, nutation, and internal rotation, but how much of each depends on what XYZ coordinate system one has chosen for the object.

As an example, consider a Spinning top. If we define the Z axis to be the symmetry axis of the top, then the top spinning around its own axis of symmetry corresponds to intrinsic rotation. It also rotates around its pivotal axis, with its center of mass orbiting the pivotal axis; this rotation is a precession. Finally, the top may wobble up and down (if it is not what is called a symmetric top); the change of inclination angle is nutation. The same example can be seen with the movements of the earth.

Though all three movements can be represented by rotation matrices, only precession can be expressed in general as a matrix in the basis of the space without dependencies on the other angles.

These movements also behave as a gimbal set. Given a set of frames, able to move each with respect to the former according to just one angle, like a gimbal, there will exist an external fixed frame, one final frame and two frames in the middle, which are called "intermediate frames". The two in the middle work as two gimbal rings that allow the last frame to reach any orientation in space.

This implies a different definition for the line of nodes in the geometrical construction. In the proper Euler angles case it was defined as the intersection between two homologous Cartesian planes (parallel when Euler angles are zero; e.g. xy and XY). In the Tait–Bryan angles case, it is defined as the intersection of two non-homologous planes (perpendicular when Euler angles are zero; e.g. xy and YZ).

There are six possibilities of choosing the rotation axes for Tait–Bryan angles. The six possible sequences are:

• x- y′- z″ (intrinsic rotations) or z- y- x (extrinsic rotations)
• y- z′- x″ (intrinsic rotations) or x- z- y (extrinsic rotations)
• z- x′- y″ (intrinsic rotations) or y- x- z (extrinsic rotations)
• x- z′- y″ (intrinsic rotations) or y- z- x (extrinsic rotations)
• z- y′- x″ (intrinsic rotations) or x- y- z (extrinsic rotations): the intrinsic rotations are known as: yaw, pitch and roll
• y- x′- z″ (intrinsic rotations) or z- x- y (extrinsic rotations)

The range for the angles ψ and φ covers 2 radians. For θ the range covers radians.

• A yaw will obtain the bearing,
• a Pitching moment will yield the elevation, and
• a roll gives the bank angle.

Therefore, in aerospace they are sometimes called yaw, pitch, and roll. Notice that this will not work if the rotations are applied in any other order or if the airplane axes start in any position non-equivalent to the reference frame.

Tait–Bryan angles, following z- y′- x″ (intrinsic rotations) convention, are also known as nautical angles, because they can be used to describe the orientation of a ship or aircraft, or Cardan angles, after the Italian mathematician and physicist Gerolamo Cardano, who first described in detail the Cardan suspension and the Cardan joint.

$\backslash cos\; (\backslash beta)\; =\; Z\_3.$

And, since

$\backslash sin^2\; x\; =\; 1\; -\; \backslash cos^2\; x,$

$\backslash sin\; (\backslash beta)\; =\; \backslash sqrt\; \{1\; -\; Z\_3^2\}.$

As $Z\_2$ is the double projection of a unitary vector,

$\backslash cos(\backslash alpha)\; \backslash cdot\; \backslash sin(\backslash beta)\; =\; -Z\_2,$

$\backslash cos(\backslash alpha)\; =\; -Z\_2\; /\; \backslash sqrt\{1\; -\; Z\_3^2\}.$

There is a similar construction for $Y\_3$, projecting it first over the plane defined by the axis z and the line of nodes. As the angle between the planes is $\backslash pi/2\; -\; \backslash beta$ and $\backslash cos(\backslash pi/2\; -\; \backslash beta)\; =\; \backslash sin(\backslash beta)$, this leads to:

$\backslash sin(\backslash beta)\; \backslash cdot\; \backslash cos(\backslash gamma)\; =\; Y\_3,$

$\backslash cos(\backslash gamma)\; =\; Y\_3\; /\; \backslash sqrt\{1\; -\; Z\_3^2\},$

and finally, using the inverse cosine function,

$\backslash alpha\; =\; \backslash arccos\backslash left(-Z\_2\; /\; \backslash sqrt\{1\; -\; Z\_3^2\}\backslash right),$

$\backslash beta\; =\; \backslash arccos\backslash left(Z\_3\backslash right),$

$\backslash gamma\; =\; \backslash arccos\backslash left(Y\_3\; /\; \backslash sqrt\{1\; -\; Z\_3^2\}\backslash right).$

$\backslash sin\; (\backslash theta)\; =\; -X\_3$

As before,

$\backslash cos^2\; x\; =\; 1\; -\; \backslash sin^2\; x,$

$\backslash cos\; (\backslash theta)\; =\; \backslash sqrt\; \{1\; -\; X\_3^2\}.$

in a way analogous to the former one:

$\backslash sin(\backslash psi)\; =\; X\_2\; /\; \backslash sqrt\{1\; -\; X\_3^2\}.$

$\backslash sin(\backslash phi)\; =\; Y\_3\; /\; \backslash sqrt\{1\; -\; X\_3^2\}.$

Looking for similar expressions to the former ones:

$\backslash psi\; =\; \backslash arcsin\backslash left(X\_2\; /\; \backslash sqrt\{1\; -\; X\_3^2\}\backslash right),$

$\backslash theta\; =\; \backslash arcsin(-X\_3),$

$\backslash phi\; =\; \backslash arcsin\backslash left(Y\_3\; /\; \backslash sqrt\{1\; -\; X\_3^2\}\backslash right).$

For computational purposes, it may be useful to represent the angles using . For example, in the case of proper Euler angles:

$\backslash alpha\; =\; \backslash operatorname\{atan2\}(Z\_1\; ,\; -Z\_2),$

$\backslash gamma\; =\; \backslash operatorname\{atan2\}(X\_3\; ,\; Y\_3).$

The most common orientation representations are the rotation matrix, the axis-angle and the , also known as Euler–Rodrigues parameters, which provide another mechanism for representing 3D rotations. This is equivalent to the special unitary group description.

Expressing rotations in 3D as unit quaternions instead of matrices has some advantages:

• Concatenating rotations is computationally faster and numerically more stable.
• Extracting the angle and axis of rotation is simpler.
• Interpolation is more straightforward. See for example slerp.
• Quaternions do not suffer from gimbal lock as Euler angles do.

Regardless, the rotation matrix calculation is the first step for obtaining the other two representations.

1. Each matrix is meant to operate by pre-multiplying $\backslash begin\{bmatrix\}\; x\; \backslash \backslash \; y\; \backslash \backslash \; z\; \backslash end\{bmatrix\}$ (see Ambiguities in the definition of rotation matrices)
2. Each matrix is meant to represent an active rotation (the composing and composed matrices are supposed to act on the coordinates of vectors defined in the initial fixed reference frame and give as a result the coordinates of a rotated vector defined in the same reference frame).
3. Each matrix is meant to represent, primarily, a composition of intrinsic rotations (around the axes of the rotating reference frame) and, secondarily, the composition of three extrinsic rotations (which corresponds to the constructive evaluation of the R matrix by the multiplication of three truly elemental matrices, in reverse order).
4. Right handed reference frames are adopted, and the right hand rule is used to determine the sign of the angles α, β, γ.

1. X, Y, Z are the matrices representing the elemental rotations about the axes x, y, z of the fixed frame (e.g., X _α represents a rotation about x by an angle α).
2. s and c represent sine and cosine (e.g., s _α represents the sine of α).

c_\beta          & - c_\gamma s_\beta                            & s_\beta s_\gamma \\
c_\alpha s_\beta & c_\alpha c_\beta c_\gamma - s_\alpha s_\gamma & - c_\gamma s_\alpha - c_\alpha c_\beta s_\gamma \\
s_\alpha s_\beta & c_\alpha s_\gamma + c_\beta c_\gamma s_\alpha & c_\alpha c_\gamma - c_\beta s_\alpha s_\gamma
     

c_\beta c_\gamma                              & - s_\beta        & c_\beta s_\gamma \\
s_\alpha s_\gamma + c_\alpha c_\gamma s_\beta & c_\alpha c_\beta & c_\alpha s_\beta s_\gamma - c_\gamma s_\alpha \\
c_\gamma s_\alpha s_\beta - c_\alpha s_\gamma & c_\beta s_\alpha & c_\alpha c_\gamma + s_\alpha s_\beta s_\gamma
     

c_\beta            & s_\beta s_\gamma                              & c_\gamma s_\beta \\
s_\alpha s_\beta   & c_\alpha c_\gamma - c_\beta s_\alpha s_\gamma & - c_\alpha s_\gamma - c_\beta c_\gamma s_\alpha \\
- c_\alpha s_\beta & c_\gamma s_\alpha + c_\alpha c_\beta s_\gamma & c_\alpha c_\beta c_\gamma - s_\alpha s_\gamma
     

c_\beta c_\gamma                              & - c_\beta s_\gamma                            & s_\beta \\
c_\alpha s_\gamma + c_\gamma s_\alpha s_\beta & c_\alpha c_\gamma - s_\alpha s_\beta s_\gamma & - c_\beta s_\alpha \\
s_\alpha s_\gamma - c_\alpha c_\gamma s_\beta & c_\gamma s_\alpha + c_\alpha s_\beta s_\gamma & c_\alpha c_\beta
     

c_\alpha c_\gamma - c_\beta s_\alpha s_\gamma   & s_\alpha s_\beta & c_\alpha s_\gamma + c_\beta c_\gamma s_\alpha \\
s_\beta s_\gamma                                & c_\beta          & - c_\gamma s_\beta \\
- c_\gamma s_\alpha - c_\alpha c_\beta s_\gamma & c_\alpha s_\beta & c_\alpha c_\beta c_\gamma - s_\alpha s_\gamma
     

c_\alpha c_\gamma + s_\alpha s_\beta s_\gamma & c_\gamma s_\alpha s_\beta - c_\alpha s_\gamma &   c_\beta s_\alpha \\
c_\beta s_\gamma                              & c_\beta c_\gamma                              & - s_\beta \\
c_\alpha s_\beta s_\gamma - c_\gamma s_\alpha & c_\alpha c_\gamma s_\beta + s_\alpha s_\gamma & c_\alpha c_\beta
     

c_\alpha c_\beta c_\gamma - s_\alpha s_\gamma    & - c_\alpha s_\beta & c_\gamma s_\alpha + c_\alpha c_\beta s_\gamma \\
c_\gamma s_\beta                                 & c_\beta            & s_\beta s_\gamma \\
 - c_\alpha s_\gamma - c_\beta c_\gamma s_\alpha & s_\alpha s_\beta   & c_\alpha c_\gamma - c_\beta s_\alpha s_\gamma
     

c_\alpha c_\beta   & s_\alpha s_\gamma - c_\alpha c_\gamma s_\beta & c_\gamma s_\alpha + c_\alpha s_\beta s_\gamma \\
s_\beta            & c_\beta c_\gamma                              & - c_\beta s_\gamma \\
- c_\beta s_\alpha & c_\alpha s_\gamma + c_\gamma s_\alpha s_\beta & c_\alpha c_\gamma - s_\alpha s_\beta s_\gamma
     

c_\alpha c_\beta c_\gamma - s_\alpha s_\gamma &  - c_\gamma s_\alpha - c_\alpha c_\beta s_\gamma & c_\alpha s_\beta \\
c_\alpha s_\gamma + c_\beta c_\gamma s_\alpha & c_\alpha c_\gamma - c_\beta s_\alpha s_\gamma    & s_\alpha s_\beta \\
- c_\gamma s_\beta                            & s_\beta s_\gamma                                 & c_\beta
     

c_\alpha c_\beta & c_\alpha s_\beta s_\gamma - c_\gamma s_\alpha & s_\alpha s_\gamma + c_\alpha c_\gamma s_\beta \\
c_\beta s_\alpha & c_\alpha c_\gamma + s_\alpha s_\beta s_\gamma & c_\gamma s_\alpha s_\beta - c_\alpha s_\gamma \\
- s_\beta        & c_\beta s_\gamma                              & c_\beta c_\gamma
     

c_\alpha c_\gamma - c_\beta s_\alpha s_\gamma & - c_\alpha s_\gamma - c_\beta c_\gamma s_\alpha &  s_\alpha s_\beta \\
c_\gamma s_\alpha + c_\alpha c_\beta s_\gamma & c_\alpha c_\beta c_\gamma - s_\alpha s_\gamma   & - c_\alpha s_\beta \\
s_\beta s_\gamma                              & c_\gamma s_\beta                                & c_\beta
     

c_\alpha c_\gamma - s_\alpha s_\beta s_\gamma & - c_\beta s_\alpha & c_\alpha s_\gamma + c_\gamma s_\alpha s_\beta \\
c_\gamma s_\alpha + c_\alpha s_\beta s_\gamma & c_\alpha c_\beta   & s_\alpha s_\gamma - c_\alpha c_\gamma s_\beta \\
- c_\beta s_\gamma                            & s_\beta            & c_\beta c_\gamma
     

These tabular results are available in numerous textbooks. E.g. Appendix I (p. 483) of: