In general, there is no unique matrix solution 
to the matrix equation
 |
Even in the case of 
parallel to 
,
there are still multiple matrices that perform this transformation. For example,
given 
,
all the following matrices satisfy the above equation:
![[2 0; 0 2],[-184 93; 72 -34],[134 -66; -68 36].](/images/equations/VectorDivision/NumberedEquation2.svg) |
Therefore, vector division cannot be uniquely defined in terms of matrices.
However, if the vectors are represented by complex numbers or quaternions, vector division can be uniquely defined using the usual rules of complex division and quaternion algebra, respectively.
