A unit quaternion q = cos(F)+u*sin(F) represents the rotation of vector v by the angle 2*F about axis u.

If your vectors are v and w, then we should normalize them, then calculate the angle between them as 2*F=ArcCos(Dot(v, w)). Rotation axis direction vector u = Normalize(VectorProduct(v, w)). Now we can build required rotation quaternion.

It might also be a good idea to normalize the rotation axis u after it's been computed to sustain a unit quaternion, as the cross product of two unit vectors is only normalized for orthogonal input vectors.
– Christian RauApr 20 '12 at 9:29

@Christian Rau You are right, I've missed this normalization. Added.
– MBoApr 20 '12 at 9:55

4

Note that the case v = −w needs special handling.
– Gareth ReesApr 21 '12 at 12:13