Ring of Idempotents of Commutative and Unitary Ring is Boolean Ring

Theorem
Let $\left({R, +, \circ}\right)$ be a commutative and unitary ring.

Let $\left({A, \oplus, \circ}\right)$ be its ring of idempotents.

Then $\left({A, \oplus, \circ}\right)$ is a Boolean ring.

Proof
From Ring of Idempotents is Idempotent Ring, $\left({A, \oplus, \circ}\right)$ is an idempotent ring.

By Unity is Unity in Ring of Idempotents, $\left({A, \oplus, \circ}\right)$ is also a unitary ring.

Hence, by definition, $\left({A, \oplus, \circ}\right)$ is a Boolean ring.

Also see

 * Ring of Idempotents is Idempotent Ring