2

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)

RESULTS:

qInitial.eulerAngles gives these results: applying_qInitial_rotation

qResult.eulerAngles gives these results: applying_qResult_rotation

EXPECTED RESULTS:

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
0

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

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.