Group Homomorphism Preserves Inverses/Proof 2
Theorem
Let $\struct {G, \circ}$ and $\struct {H, *}$ be groups.
Let $\phi: \struct {G, \circ} \to\struct {H, *}$ be a group homomorphism.
Let:
- $e_G$ be the identity of $G$
- $e_H$ be the identity of $H$
Then:
- $\forall x \in G: \map \phi {x^{-1} } = \paren {\map \phi x}^{-1}$
Proof
A direct application of Homomorphism to Group Preserves Inverses.
$\blacksquare$
Sources
- 1965: Seth Warner: Modern Algebra ... (previous) ... (next): Chapter $\text {II}$: New Structures from Old: $\S 12$: Homomorphisms