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I need to flip a quaternion from right:
x = left to right
y = front to back
z = top to bottom

to left handed coordinates where:
x = left to right
y = top to bottom
z = front to back

How would I go about doing this?

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Please explain what you're actually trying to do. As is, your question does not make sense. It's okay not to understand how to do something, but you have to give the full story. My guess is that your question should read something like "I have a quaternion that represents a rotation in 3 dimensions, but because I'm using a coordinate system that differs from the intended one in this particular way, the quaternion doesn't represent the rotation I want. How do I convert it into a quaternion that does the rotation I want?" This is almost a dup of stackoverflow.com/questions/1263072 –  Anton Geraschenko Aug 14 '09 at 1:54
I didn't think a needed to give more but yes it represents a rotation, or maybe an orientation, in 3d where the z axis is facing up. Now I need to essentially swap the z and y axis so that the y axis is facing up. And yes it is similar to my other question because I'm trying to achieve the same but they are two different questions. –  cmann Aug 14 '09 at 9:38

3 Answers 3

Ok, just to be clear, quaternions don't actually have handedness. They are handless(see wikipedia article on quaternions). HOWEVER, the conversion to a matrix from a quaternion does have handedness associated with it. See http://osdir.com/ml/games.devel.algorithms/2002-11/msg00318.html If your code performs this conversion, you may have to have two separate functions to convert to a left handed matrix or a right handed matrix.

Hope that helps.

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To paraphrase, negate the axis.

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The post you cited actually answers a different question -- the original poster seems to have used "left handed" to mean "rotate in the opposite direction". That's quite different from swapping the Y and Z axes as cmann wants to do. –  Jim Lewis Aug 13 '09 at 22:31

Once you do that, you no longer have a quaternion, i.e. the usual rules for multiplying them won't work. The identity i^2 = j^2 = k^2 = ijk = -1 will no longer hold if you swap j and k (y and z in your right handed system).

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So are you saying that you can't change the quaternion? –  cmann Aug 13 '09 at 22:39
@cmann Not if you want to preserve the usual properties. I suppose one could derive a whole other set of rules for LH-quaternions...but why? What are you trying to accomplish? Maybe there's an easier way; perhaps converting LH to RH coordinates, doing your rotations or whatever, then converting back to the LH system? –  Jim Lewis Aug 13 '09 at 22:54
I'm trying to export data from Blender to OpenGL –  cmann Aug 14 '09 at 9:31

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