Matrix multiplication is not commutative, which is why our matrix order matters when transforming our scenes. However, there are some special situations where commutativity still holds.

Imagine we are applying two model transformations A and B to a polygon in three$-$dimensional space. Theorize one situation where A x B $=$ B x A$,$ and justify your answer. Please note the following restrictions:

Neither A nor B is a matrix consisting of only $1$s and $0$s

A and B are not inverses of one another

A and B are not the same type of model transformation