## MATRIX DIVISION IS NOT POSSIBLE BECAUSE OF THE FOLLOWING REASONS:-

If there should arise an occurrence of grids one contrast is that they are commutative when added yet they are not generally commutative when they are duplicated. So for two genuine numbers, x, and y

AB= BA, consistently.

Yet, for two grids, A and B,

Generally AB ≠ BA

Another is that, while each non-0 genuine number has a multiplicative opposite (corresponding), few out of every odd non-0 framework has a reverse. Furthermore, numerically talking, division by x comprises augmentation by the reverse of x.

So to separate framework A from matrix B, we initially need to find the converse of B which could possibly exist. In any case, regardless of whether it exists in light of that non-commutativity thing in duplication about the frameworks, you have two methods for duplicating it onto A:-

A * B^{-1} or then again B^{-1} * A , what’s more, those will usually be unique.

End Words:-

So because of the different reasons referenced over partitioning the two matrices simply don’t function admirably when applied to networks. I hope now you got the answer to why **matrices cannot divide**.