rusgr1vtxlem

		Ref	Expression
	Assertion	rusgr1vtxlem	$⊢ ((\forall v \in V \|A\| = K \land \forall v \in V A = \emptyset) \land (V \in W \land \|V\| = 1)) \to K = 0$

Step	Hyp	Ref	Expression
1		r19.26	$⊢ \forall v \in V (\|A\| = K \land A = \emptyset) \leftrightarrow (\forall v \in V \|A\| = K \land \forall v \in V A = \emptyset)$
2		fveqeq2	$⊢ A = \emptyset \to (\|A\| = K \leftrightarrow \|\emptyset\| = K)$
3	2	biimpac	$⊢ (\|A\| = K \land A = \emptyset) \to \|\emptyset\| = K$
4	3	ralimi	$⊢ \forall v \in V (\|A\| = K \land A = \emptyset) \to \forall v \in V \|\emptyset\| = K$
5		hash1n0	$⊢ (V \in W \land \|V\| = 1) \to V \neq \emptyset$
6		rspn0	$⊢ V \neq \emptyset \to (\forall v \in V \|\emptyset\| = K \to \|\emptyset\| = K)$
7	5 6	syl	$⊢ (V \in W \land \|V\| = 1) \to (\forall v \in V \|\emptyset\| = K \to \|\emptyset\| = K)$
8		hash0	$⊢ \|\emptyset\| = 0$
9		eqeq1	$⊢ \|\emptyset\| = K \to (\|\emptyset\| = 0 \leftrightarrow K = 0)$
10	8 9	mpbii	$⊢ \|\emptyset\| = K \to K = 0$
11	7 10	syl6com	$⊢ \forall v \in V \|\emptyset\| = K \to ((V \in W \land \|V\| = 1) \to K = 0)$
12	4 11	syl	$⊢ \forall v \in V (\|A\| = K \land A = \emptyset) \to ((V \in W \land \|V\| = 1) \to K = 0)$
13	1 12	sylbir	$⊢ (\forall v \in V \|A\| = K \land \forall v \in V A = \emptyset) \to ((V \in W \land \|V\| = 1) \to K = 0)$
14	13	imp	$⊢ ((\forall v \in V \|A\| = K \land \forall v \in V A = \emptyset) \land (V \in W \land \|V\| = 1)) \to K = 0$

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