If all of your matrices are square, then for your first expression you have the equivalence

```
A * B / (C * C) <==> A * B * inv(C * C) <==> A * B * inv(C) * inv(C)
```

On the other hand, your second expression is equivalent to

```
(A / C) * (B / C) <==> A * inv(C) * B * inv(C)
```

Since matrices don't commute in general, these don't have to be the same. If we equate the right-hand sides, we find that (as long as `A`

and `C`

are invertible) we can make some cancellations, and end up with the equation

```
B * inv(C) == inv(C) * B
```

i.e. the two expressions are the same if `B`

commutes with `inv(C)`

. In fact we can multiply on the left and right by `C`

, and get

```
C * B = B * C
```

so this is the same as requiring that `B`

commutes with `C`

.