Inverse of Group Inverse/Proof 1
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Theorem
Let $\struct {G, \circ}$ be a group.
Let $g \in G$, with inverse $g^{-1}$.
Then:
- $\paren {g^{-1} }^{-1} = g$
Proof
Let $g \in G$.
Then:
| \(\ds g\) | \(\in\) | \(\ds G\) | ||||||||||||
| \(\ds \leadsto \ \ \) | \(\ds e\) | \(=\) | \(\ds g^{-1} \circ g\) | Definition of Inverse Element | ||||||||||
| \(\ds \leadsto \ \ \) | \(\ds \paren {g^{-1} }^{-1} \circ e\) | \(=\) | \(\ds \paren {g^{-1} }^{-1} \circ \paren {g^{-1} \circ g}\) | |||||||||||
| \(\ds \leadsto \ \ \) | \(\ds \paren {g^{-1} }^{-1} \circ e\) | \(=\) | \(\ds \paren {\paren {g^{-1} }^{-1} \circ g^{-1} } \circ g\) | Definition of Associative Operation | ||||||||||
| \(\ds \leadsto \ \ \) | \(\ds \paren {g^{-1} }^{-1} \circ e\) | \(=\) | \(\ds e \circ g\) | Definition of Inverse Element | ||||||||||
| \(\ds \leadsto \ \ \) | \(\ds \paren {g^{-1} }^{-1}\) | \(=\) | \(\ds g\) | Definition of Identity Element |
$\blacksquare$
Sources
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- 1974: Thomas W. Hungerford: Algebra ... (previous) ... (next): $\text{I}$: Groups: $\S 1$ Semigroups, Monoids and Groups: Theorem $1.2 \text{(iv)}$