Group homomorphism/Inverse to inverse/Fact/Proof

To prove the first statement, consider

${\displaystyle {}\varphi (e_{G})=\varphi (e_{G}e_{G})=\varphi (e_{G})\varphi (e_{G})\,.}$

Multiplication with ${\displaystyle {}\varphi (e_{G})^{-1}}$ yields ${\displaystyle {}e_{H}=\varphi (e_{G})}$.
To prove the second claim, we use

${\displaystyle {}\varphi {\left(g^{-1}\right)}\varphi (g)=\varphi {\left(g^{-1}g\right)}=\varphi (e_{G})=e_{H}\,.}$

This means that ${\displaystyle {}\varphi {\left(g^{-1}\right)}}$ has the property that characterizes the inverse element of ${\displaystyle {}\varphi (g)}$. Since the inverse element in a group is, due to fact, uniquely determined, we must have ${\displaystyle {}\varphi {\left(g^{-1}\right)}=(\varphi (g))^{-1}}$.