Preimage of Subring under Ring Homomorphism is Subring

Let $$\phi: \left({R_1, +_1, \circ_1}\right) \to \left({R_2, +_2, \circ_2}\right)$$ be a ring epimorphism.

Let $$S_2$$be a subring of $$R_2$$.

Then $$S_1 = \phi^{-1} \left({S_2}\right)$$ is a subring of $$R_1$$ such that $$\mathrm{ker} \left({R_1}\right) \subseteq S_1$$.

Proof
Uses a similar argument as for Homomorphism Preserves Subrings.