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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?

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It depends on the application, but you could try creating the Matrix4f with the 3 components of the Matrix3f, plus a 1 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
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I second Rob I's comment. Most matrix implementations take the 4th column "as position vector" and the 4th row as the "scaling". –  Najzero Apr 2 '13 at 12:57

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up vote 3 down vote accepted

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:

|a00|a01|a02|
|a10|a11|a12|
|a20|a21|a22|

to m4:

|a00|a01|a02| 0 | 
|a10|a11|a12| 0 | 
|a20|a21|a22| 0 |
| 0 | 0 | 0 | 1 |

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 row-column order, we might identify the matrix as:

|rot|rot|rot| sx | 
|rot|rot|rot| sy | 
|rot|rot|rot| sz |
| x | y | z | 1 |

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 4-dimensional 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.

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thanks for your effort! –  Captain GouLash Apr 2 '13 at 13:41

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