Theorem

In a group, each element only has one inverse.

Proof

0. Choose $g \in G$ . Then, [[../Definition of a Group/Definition of Inverse#Usage1\|inverse]] g₁⁻¹ of g is also in G.
1. Assume g has a different [[../Definition of a Group/Definition of Inverse\|inverse]] g₂⁻¹ in G
2. $(g_{1}^{- 1} * g) * g_{2}^{- 1} = g_{1}^{- 1} * (g * g_{2}^{- 1})$	[[../Definition of a Group/Definition of Associativity#Usage1\| $*$ is associative on G]]
3. $e_{G} * g_{2}^{- 1} = g_{1}^{- 1} * e_{G}$	[[../Definition of a Group/Definition of Inverse#Usage3\|g₁^-1 and g₂^-1 are inverses of g on G (usage 3)]]
4. $g_{2}^{- 1} = g_{1}^{- 1}$ , contradicting 1.	[[../Definition of a Group/Definition of Identity#Usage3\|e_G is identity of G (usage 3)]]

0. Choose $g \in G$ . Then, [[../Definition of a Group/Definition of Inverse#Usage1\|inverse]] g₁⁻¹ of g is also in G.
1. Assume g has a different [[../Definition of a Group/Definition of Inverse\|inverse]] g₂⁻¹ in G
2. $(g_{1}^{- 1} * g) * g_{2}^{- 1} = g_{1}^{- 1} * (g * g_{2}^{- 1})$	[[../Definition of a Group/Definition of Associativity#Usage1\| $*$ is associative on G]]
3. $e_{G} * g_{2}^{- 1} = g_{1}^{- 1} * e_{G}$	[[../Definition of a Group/Definition of Inverse#Usage3\|g₁^-1 and g₂^-1 are inverses of g on G (usage 3)]]
4. $g_{2}^{- 1} = g_{1}^{- 1}$ , contradicting 1.	[[../Definition of a Group/Definition of Identity#Usage3\|e_G is identity of G (usage 3)]]