Metamath Proof Explorer

Theorem shscom

Description: Commutative law for subspace sum. (Contributed by NM, 15-Dec-2004) (New usage is discouraged.)

		Ref	Expression
	Assertion	shscom	$⊢ (A \in S_{ℋ} \land B \in S_{ℋ}) \to A +_{ℋ} B = B +_{ℋ} A$

Proof

Step	Hyp	Ref	Expression
1		shel	$⊢ (A \in S_{ℋ} \land y \in A) \to y \in ℋ$
2		shel	$⊢ (B \in S_{ℋ} \land z \in B) \to z \in ℋ$
3	1 2	anim12i	$⊢ ((A \in S_{ℋ} \land y \in A) \land (B \in S_{ℋ} \land z \in B)) \to (y \in ℋ \land z \in ℋ)$
4	3	an4s	$⊢ ((A \in S_{ℋ} \land B \in S_{ℋ}) \land (y \in A \land z \in B)) \to (y \in ℋ \land z \in ℋ)$
5		ax-hvcom	$⊢ (y \in ℋ \land z \in ℋ) \to y +_{ℎ} z = z +_{ℎ} y$
6	4 5	syl	$⊢ ((A \in S_{ℋ} \land B \in S_{ℋ}) \land (y \in A \land z \in B)) \to y +_{ℎ} z = z +_{ℎ} y$
7	6	eqeq2d	$⊢ ((A \in S_{ℋ} \land B \in S_{ℋ}) \land (y \in A \land z \in B)) \to (x = y +_{ℎ} z \leftrightarrow x = z +_{ℎ} y)$
8	7	2rexbidva	$⊢ (A \in S_{ℋ} \land B \in S_{ℋ}) \to (\exists y \in A \exists z \in B x = y +_{ℎ} z \leftrightarrow \exists y \in A \exists z \in B x = z +_{ℎ} y)$
9		rexcom	$⊢ \exists y \in A \exists z \in B x = z +_{ℎ} y \leftrightarrow \exists z \in B \exists y \in A x = z +_{ℎ} y$
10	8 9	bitrdi	$⊢ (A \in S_{ℋ} \land B \in S_{ℋ}) \to (\exists y \in A \exists z \in B x = y +_{ℎ} z \leftrightarrow \exists z \in B \exists y \in A x = z +_{ℎ} y)$
11		shsel	$⊢ (A \in S_{ℋ} \land B \in S_{ℋ}) \to (x \in (A +_{ℋ} B) \leftrightarrow \exists y \in A \exists z \in B x = y +_{ℎ} z)$
12		shsel	$⊢ (B \in S_{ℋ} \land A \in S_{ℋ}) \to (x \in (B +_{ℋ} A) \leftrightarrow \exists z \in B \exists y \in A x = z +_{ℎ} y)$
13	12	ancoms	$⊢ (A \in S_{ℋ} \land B \in S_{ℋ}) \to (x \in (B +_{ℋ} A) \leftrightarrow \exists z \in B \exists y \in A x = z +_{ℎ} y)$
14	10 11 13	3bitr4d	$⊢ (A \in S_{ℋ} \land B \in S_{ℋ}) \to (x \in (A +_{ℋ} B) \leftrightarrow x \in (B +_{ℋ} A))$
15	14	eqrdv	$⊢ (A \in S_{ℋ} \land B \in S_{ℋ}) \to A +_{ℋ} B = B +_{ℋ} A$