Power set/Ring structure with symmetric difference/Exercise

Let ${\displaystyle {}M}$ be a set. Show that the power set ${\displaystyle {}{\mathfrak {P}}\,(M)}$ is a commutative ring, if we consider the intersection ${\displaystyle {}\cap }$ as multiplication and the symmetric difference

${\displaystyle {}A\triangle B={\left(A\setminus B\right)}\cup {\left(B\setminus A\right)}\,}$

as addition (what are the neutral elements?).