I have a 3D point and the x,y,z rotations (qInitial) for that point. I want to rotate that point more (by some degrees that could be 0 up to 360) around y axis (qYextra). How can I calculate the final Euler rotation (qResult.eulerAngles) that is a combination of these 4 rotations (x-y-z-y)?

I have tried calculating the initial quaternion rotation, and the extra rotation to be applied. And then multiply these two quaternions. However, I get weird results (probably gimbal lock).

Code in C#. Unity.

1.Quaternion qX = Quaternion.AngleAxis(rotationFromBvh.x,Vector3.right);

2.Quaternion qY = Quaternion.AngleAxis(rotationFromBvh.y,Vector3.up);

3.Quaternion qZ = Quaternion.AngleAxis(rotationFromBvh.z,Vector3.forward);

4.Quaternion qYextra = Quaternion.AngleAxis(angle,Vector3.up);

Quaternion qInitial = qY * qX * qZ; // Yes. This is the correct order.

qY*qX*qZ has exactly the same Euler x,y,z results as Quaternion.Euler(rotationFromBvh)

Quaternion qResult = qInitial * qYextra;

return qResult.eulerAngles;

I can confirm that the code works fine (no gimbal lock) when 4th rotation is 0 degrees (qYextra = identity). Meaning that qInitial is correct. So, the error might be due to the combination of those 2 rotations (qInitial and qYextra) OR due to the convertion from Quaternion to Euler.

EXAMPLE: (qYextra angle is 120 degrees)


qInitial.eulerAngles gives these results: applying_qInitial_rotation

qResult.eulerAngles gives these results: applying_qResult_rotation


The expected results should be like qInitial but rotated 120 degrees around y.

Any suggestions? I haven't yet found a solution, and probably I won't.

  • Any suggestions? – tsynn Feb 17 '19 at 17:51
  • To me the correct order should be "qResult = qYextra * qInitial" – Mauricio Cele Lopez Belon Feb 18 '19 at 14:57
  • Thank you @MauricioCeleLopezBelon . I have just tried it, and I still get weird results (gimbal lock). – tsynn Feb 18 '19 at 16:09
  • The problem might be when I convert Quaternions to Euler qResult.eulerAngles;? – tsynn Feb 18 '19 at 16:11
  • Conversion to Euler angles might be the problem. Euler angles creates a map with the topology of a Torus and the Quaternions creates a map with the topology of a Sphere (projected from 4d linear space). A map from quaternions to euler angles is like a map from Sphere to Torus, it is not injective (one to one) and have singularities (gimbal lock). The following site explain the singularities in detail euclideanspace.com/maths/geometry/rotations/conversions/… I would recommend to stick with quaterniona and avoid conversion to Euler angles. – Mauricio Cele Lopez Belon Feb 18 '19 at 17:34

In your question, you write:

How can I calculate the final Euler rotation that is a combination of these 4 rotations (x-y-z-y)?

However, in your code, you write

Quaternion qInitial = qY * qX * qZ; // Multiply them in the correct order.

I don't know unity, but I would have expected that you would want the order of the rotations to match x, y, z, rather than y, x, z.

You stated that it works when the y-rotation is 0, in which case the place of the y-rotation in the order becomes irrelevant.

Do you get the correct result if you instead write the code below?

Quaternion qInitial = qX * qY * qZ; // Multiply them in the correct order.
  • Unity handle's Euler angles, when dealing with Quaterions, in the order Z, X, Y so multiplying 3 quaternions in the order Y, X, Z and then requesting the eulerAngles property of the result will be the same as providing those rotations in a single Vector3 as an argument in Quaternion.Euler. – Foggzie Feb 15 '19 at 18:10
  • These two lines of code: Quaternion qInitial = qY * qX * qZ; and Quaternion qAfter = qInitial * qRotationToBeApplied; show that I want to combine 4 rotations. The first 3 INITIAL rotations are (qY, qX, qZ). The 4th rotation is qRotationToBeApplied. Speaking about the order of multiplication will agree with @Foggzie . Also, what I'm saying is that the code works fine when (4th rotation)qRotationToBeApplied is identity (0 degrees rotation). – tsynn Feb 16 '19 at 18:30
  • I have edit my question, to avoid any ambiguities. Thank you. – tsynn Feb 16 '19 at 18:50

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