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Metamath Proof Explorer

Theorem grpolidinv

Description: A group has a left identity element, and every member has a left inverse. (Contributed by NM, 2-Nov-2006) (New usage is discouraged.)

		Ref	Expression
	Hypothesis	grpfo.1	$⊢ X = ran G$
	Assertion	grpolidinv	$⊢ G \in GrpOp \to \exists u \in X \forall x \in X (u G x = x \land \exists y \in X y G x = u)$

Proof

Step	Hyp	Ref	Expression
1		grpfo.1	$⊢ X = ran G$
2	1	isgrpo	$⊢ G \in GrpOp \to (G \in GrpOp \leftrightarrow (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists u \in X \forall x \in X (u G x = x \land \exists y \in X y G x = u)))$
3	2	ibi	$⊢ G \in GrpOp \to (G : X \times X ⟶ X \land \forall x \in X \forall y \in X \forall z \in X (x G y) G z = x G (y G z) \land \exists u \in X \forall x \in X (u G x = x \land \exists y \in X y G x = u))$
4	3	simp3d	$⊢ G \in GrpOp \to \exists u \in X \forall x \in X (u G x = x \land \exists y \in X y G x = u)$