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Metamath Proof Explorer

Theorem elspansn5

Description: A vector belonging to both a subspace and the span of the singleton of a vector not in it must be zero. (Contributed by NM, 17-Dec-2004) (New usage is discouraged.)

		Ref	Expression
	Assertion	elspansn5	$⊢ A \in S_{ℋ} \to (((B \in ℋ \land \neg B \in A) \land (C \in span (\{B\}) \land C \in A)) \to C = 0_{ℎ})$

Proof

Step	Hyp	Ref	Expression
1		elspansn4	$⊢ ((A \in S_{ℋ} \land B \in ℋ) \land (C \in span (\{B\}) \land C \neq 0_{ℎ})) \to (B \in A \leftrightarrow C \in A)$
2	1	biimprd	$⊢ ((A \in S_{ℋ} \land B \in ℋ) \land (C \in span (\{B\}) \land C \neq 0_{ℎ})) \to (C \in A \to B \in A)$
3	2	exp32	$⊢ (A \in S_{ℋ} \land B \in ℋ) \to (C \in span (\{B\}) \to (C \neq 0_{ℎ} \to (C \in A \to B \in A)))$
4	3	com34	$⊢ (A \in S_{ℋ} \land B \in ℋ) \to (C \in span (\{B\}) \to (C \in A \to (C \neq 0_{ℎ} \to B \in A)))$
5	4	imp32	$⊢ ((A \in S_{ℋ} \land B \in ℋ) \land (C \in span (\{B\}) \land C \in A)) \to (C \neq 0_{ℎ} \to B \in A)$
6	5	necon1bd	$⊢ ((A \in S_{ℋ} \land B \in ℋ) \land (C \in span (\{B\}) \land C \in A)) \to (\neg B \in A \to C = 0_{ℎ})$
7	6	exp31	$⊢ A \in S_{ℋ} \to (B \in ℋ \to ((C \in span (\{B\}) \land C \in A) \to (\neg B \in A \to C = 0_{ℎ})))$
8	7	com34	$⊢ A \in S_{ℋ} \to (B \in ℋ \to (\neg B \in A \to ((C \in span (\{B\}) \land C \in A) \to C = 0_{ℎ})))$
9	8	imp4c	$⊢ A \in S_{ℋ} \to (((B \in ℋ \land \neg B \in A) \land (C \in span (\{B\}) \land C \in A)) \to C = 0_{ℎ})$