cnncvsmulassdemo

Description: Derive the associative law for complex number multiplication mulass interpreted as scalar multiplication to demonstrate the use of the properties of a normed subcomplex vector space for the complex numbers. (Contributed by AV, 9-Oct-2021) (Proof modification is discouraged.)

		Ref	Expression
	Assertion	cnncvsmulassdemo	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A B C = A B C$

Proof

Step	Hyp	Ref	Expression
1		eqid	$⊢ ringLMod (ℂ_{fld}) = ringLMod (ℂ_{fld})$
2	1	cncvs	$⊢ ringLMod (ℂ_{fld}) \in ℂVec$
3		id	$⊢ ringLMod (ℂ_{fld}) \in ℂVec \to ringLMod (ℂ_{fld}) \in ℂVec$
4	3	cvsclm	$⊢ ringLMod (ℂ_{fld}) \in ℂVec \to ringLMod (ℂ_{fld}) \in CMod$
5	2 4	ax-mp	$⊢ ringLMod (ℂ_{fld}) \in CMod$
6	1	cnrbas	$⊢ {Base}_{ringLMod (ℂ_{fld})} = ℂ$
7	6	eqcomi	$⊢ ℂ = {Base}_{ringLMod (ℂ_{fld})}$
8		cnfldex	$⊢ ℂ_{fld} \in V$
9		rlmsca	$⊢ ℂ_{fld} \in V \to ℂ_{fld} = Scalar (ringLMod (ℂ_{fld}))$
10	8 9	ax-mp	$⊢ ℂ_{fld} = Scalar (ringLMod (ℂ_{fld}))$
11		cnfldmul	$⊢ \times = \cdot_{ℂ_{fld}}$
12		rlmvsca	$⊢ \cdot_{ℂ_{fld}} = \cdot_{ringLMod (ℂ_{fld})}$
13	11 12	eqtri	$⊢ \times = \cdot_{ringLMod (ℂ_{fld})}$
14		cnfldbas	$⊢ ℂ = {Base}_{ℂ_{fld}}$
15	14	eqcomi	$⊢ {Base}_{ℂ_{fld}} = ℂ$
16	15	eqcomi	$⊢ ℂ = {Base}_{ℂ_{fld}}$
17	7 10 13 16	clmvsass	$⊢ (ringLMod (ℂ_{fld}) \in CMod \land (A \in ℂ \land B \in ℂ \land C \in ℂ)) \to A B C = A B C$
18	5 17	mpan	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A B C = A B C$

Metamath Proof Explorer

Theorem cnncvsmulassdemo

Proof