Unique Isomorphism from Quotient Mapping to Epimorphism Domain

Theorem
Let $\struct {S, \oplus}$ and $\struct {T, *}$ be algebraic structures.

Let $\phi: \struct {S, \oplus} \to \struct {T, *}$ be an epimorphism.

Let $\RR_\phi$ be the equivalence induced by $\phi$.

Let $S / \RR_\phi$ be the quotient of $S$ by $\RR_\phi$.

Let $q_{\RR_\phi}: S \to S / \RR_\phi$ be the quotient mapping induced by $\RR_\phi$.

Let $\struct {S / \RR_\phi, \oplus_{\RR_\phi} }$ be the quotient structure defined by $\RR_\phi$.

Then there is one and only one isomorphism:
 * $\psi: \struct {S / \RR_\phi, \oplus_{\RR_\phi} } \to \struct {T, *}$

which satisfies:
 * $\psi \circ q_{\RR_\phi} = \phi$

where $\circ$ denotes composition of mappings.

Proof
From the Quotient Theorem for Surjections, there is a unique bijection from $S / \RR_\phi$ onto $T$ satisfying $\psi \circ q_{\RR_\phi} = \phi$.

Also:

Therefore $\psi$ is an isomorphism.