Invertible matrices/K/Product/Exercise

Let ${\displaystyle {}M}$ and ${\displaystyle {}N}$ be invertible ${\displaystyle {}n\times n}$-matrices. Show that also ${\displaystyle {}M\circ N}$ is invertible, and that

${\displaystyle {}(M\circ N)^{-1}=N^{-1}\circ M^{-1}\,}$

holds.