As the title says, i have a problem to convert a Quaternion
to a Matrix4f
. Eigen
has the method Quaternion.toRotationMatrix()
which gives me a Matrix3f
.
Now i need a Matrix4f
( because our program is designed to take only Matrix4f
), is there an easy way to achieve this?


M3 to M4 The answere is already there, given by Rob and Najzero. In most cases, it will be sufficient to construct the matrix as follows: m3:
to m4:
The 4x4 matrix does not only allow to rotate a vector, but also to shift(translate) and scale (in all 3 directions) any vector. So basically you got a full transformation matrix  thats why it is often used in computer graphics, describing the transformation of an object. Depending on rowcolumn order, we might identify the matrix as:
with sx,sy,sz as scaling coefficients, and x,y,z as translation coefficients. PS: of course, if you want to rotate a vector with m4, you will than have to use a 4dimensional vector, e.g. (x,y,z,w) with w=1 (in most cases). The direct approach Convert Quaternion rotation to rotation matrix? And my personal recommendation: http://www.euclideanspace.com/maths/geometry/rotations/conversions/quaternionToMatrix/ There you will find also other transformations, backtrafos and so on. 


Matrix4f
with the 3 components of theMatrix3f
, plus a1
as the 4th (w
) component. But as I said, it definitely depends on the application  not all quaternions even represent rotation matrices. – Rob I Apr 2 '13 at 12:54