Group homomorphism/Homomorphism theorem/Surjective and kernel/Fact/Proof

We show firstly the uniqueness. For every Element ${\displaystyle {}u\in Q}$, there exists some ${\displaystyle {}g\in G}$ with ${\displaystyle {}\psi (g)=u}$. The commutativity of the diagram ensures that

${\displaystyle {}{\tilde {\varphi }}(u)=\varphi (g)\,}$

holds. This means that there exists at most one ${\displaystyle {}{\tilde {\varphi }}}$.

We have to show that this condition yields a well-defined mapping. Hence, let ${\displaystyle {}g,g'\in G}$ be two preimages of ${\displaystyle {}u}$. Then

${\displaystyle {}\psi {\left(g'g^{-1}\right)}=uu^{-1}=e_{Q}\,;}$

therefore, we have ${\displaystyle {}g'g^{-1}\in \operatorname {kern} \psi \subseteq \operatorname {kern} \varphi }$. Hence, ${\displaystyle {}\varphi (g)=\varphi (g')}$, and the mapping is well-defined. Let ${\displaystyle {}u,v\in Q}$ be given, and let ${\displaystyle {}g,h\in G}$ be preimages. Then ${\displaystyle {}gh}$ is a preimage of ${\displaystyle {}uv}$. Therefore,

${\displaystyle {}{\tilde {\varphi }}(uv)=\varphi (gh)=\varphi (g)\varphi (h)={\tilde {\varphi }}(u){\tilde {\varphi }}(v)\,.}$

This means that ${\displaystyle {}{\tilde {\varphi }}}$ is a group homomorphism.