# Rotate a Unit Vector by a Given Quaternion

I am attempting to calculate the unit vector which points out of my opengl camera. Given a rotation quaternion (w,x,y,z), how would I calculate the rotation of a unit vector around that quaternion?

In this case, the unit vector can be limited to (0,0,-1).

EDIT: Final solution

For rotation of (0,0,1):

``````vec.x=2*x*z - 2*y*w;
vec.y=2*y*z + 2*x*w;
vec.z=1 - 2*x*x - 2*y*y;
``````

Note that the matrix needs to be transposed for use with OpenGL.

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I've been reading through miles of text, trying to find an efficient solution. If I find it before I get an answer here, I'll post it. –  Builder_K Feb 2 at 19:59

Convert the quaternion to a 3x3 rotation matrix and apply this rotation to your vector.

For a unit `(w, x, y, z)` quaternion, this matrix is:

``````      ( 1 - 2 * ( y * y + z * z )      2 * ( x * y - z * w )      2 * (x * z + y * w ) )
R = (     2 * ( x * y + z * w )  1 - 2 * ( x * x + z * z )      2 * (y * z - x * w ) )
(     2 * ( x * z - y * w )      2 * ( y * z + x * w )  1 - 2 * (x * x + y * y ) )
``````

If your vector has such a simple form as `(0, 0, -1)`, you will not need to compute all the 9 coefficients of the rotation matrix since the result of the matrix vector multiplication only uses some of the coefficients (the last column of `R`).

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I'm not sure about this, but I think you may have swapped a `+` for a `-` in the entry in the north-east corner. –  David Wallace Feb 2 at 20:15
I've already coded this, but it's terribly inefficient. The point is to find a solution which does not rely on matrices. (question changed accordingly, and +1 anyways) –  Builder_K Feb 2 at 20:19
@DavidWallace Indeed, thanks for spotting this. –  user3146587 Feb 2 at 20:19
@Builder_K So 9 multiplications and 4 additions (5 taking into account the `-1`) are terribly inefficient for what you want to achieve (again only the last column of `R` is needed)? How many times per frame do you need to compute this? –  user3146587 Feb 2 at 20:24
Well, since the right answer has those multiplications, additions and subtractions in it, it won't matter whether you express it as a matrix, or express it some different way - those are the calculations you will have to do. I really don't see how you could possibly improve on this. –  David Wallace Feb 2 at 20:30