cnfldmulg

Description: The group multiple function in the field of complex numbers. (Contributed by Mario Carneiro, 14-Jun-2015)

		Ref	Expression
	Assertion	cnfldmulg	$⊢ (A \in ℤ \land B \in ℂ) \to A \cdot_{ℂ_{fld}} B = A B$

Proof

Step	Hyp	Ref	Expression
1		oveq1	$⊢ x = 0 \to x \cdot_{ℂ_{fld}} B = 0 \cdot_{ℂ_{fld}} B$
2		oveq1	$⊢ x = 0 \to x B = 0 \cdot B$
3	1 2	eqeq12d	$⊢ x = 0 \to (x \cdot_{ℂ_{fld}} B = x B \leftrightarrow 0 \cdot_{ℂ_{fld}} B = 0 \cdot B)$
4		oveq1	$⊢ x = y \to x \cdot_{ℂ_{fld}} B = y \cdot_{ℂ_{fld}} B$
5		oveq1	$⊢ x = y \to x B = y B$
6	4 5	eqeq12d	$⊢ x = y \to (x \cdot_{ℂ_{fld}} B = x B \leftrightarrow y \cdot_{ℂ_{fld}} B = y B)$
7		oveq1	$⊢ x = y + 1 \to x \cdot_{ℂ_{fld}} B = (y + 1) \cdot_{ℂ_{fld}} B$
8		oveq1	$⊢ x = y + 1 \to x B = (y + 1) B$
9	7 8	eqeq12d	$⊢ x = y + 1 \to (x \cdot_{ℂ_{fld}} B = x B \leftrightarrow (y + 1) \cdot_{ℂ_{fld}} B = (y + 1) B)$
10		oveq1	$⊢ x = - y \to x \cdot_{ℂ_{fld}} B = (- y) \cdot_{ℂ_{fld}} B$
11		oveq1	$⊢ x = - y \to x B = (- y) B$
12	10 11	eqeq12d	$⊢ x = - y \to (x \cdot_{ℂ_{fld}} B = x B \leftrightarrow (- y) \cdot_{ℂ_{fld}} B = (- y) B)$
13		oveq1	$⊢ x = A \to x \cdot_{ℂ_{fld}} B = A \cdot_{ℂ_{fld}} B$
14		oveq1	$⊢ x = A \to x B = A B$
15	13 14	eqeq12d	$⊢ x = A \to (x \cdot_{ℂ_{fld}} B = x B \leftrightarrow A \cdot_{ℂ_{fld}} B = A B)$
16		cnfldbas	$⊢ ℂ = {Base}_{ℂ_{fld}}$
17		cnfld0	$⊢ 0 = 0_{ℂ_{fld}}$
18		eqid	$⊢ \cdot_{ℂ_{fld}} = \cdot_{ℂ_{fld}}$
19	16 17 18	mulg0	$⊢ B \in ℂ \to 0 \cdot_{ℂ_{fld}} B = 0$
20		mul02	$⊢ B \in ℂ \to 0 \cdot B = 0$
21	19 20	eqtr4d	$⊢ B \in ℂ \to 0 \cdot_{ℂ_{fld}} B = 0 \cdot B$
22		oveq1	$⊢ y \cdot_{ℂ_{fld}} B = y B \to (y \cdot_{ℂ_{fld}} B) + B = y B + B$
23		cnring	$⊢ ℂ_{fld} \in Ring$
24		ringmnd	$⊢ ℂ_{fld} \in Ring \to ℂ_{fld} \in Mnd$
25	23 24	ax-mp	$⊢ ℂ_{fld} \in Mnd$
26		cnfldadd	$⊢ + = +_{ℂ_{fld}}$
27	16 18 26	mulgnn0p1	$⊢ (ℂ_{fld} \in Mnd \land y \in ℕ_{0} \land B \in ℂ) \to (y + 1) \cdot_{ℂ_{fld}} B = (y \cdot_{ℂ_{fld}} B) + B$
28	25 27	mp3an1	$⊢ (y \in ℕ_{0} \land B \in ℂ) \to (y + 1) \cdot_{ℂ_{fld}} B = (y \cdot_{ℂ_{fld}} B) + B$
29		nn0cn	$⊢ y \in ℕ_{0} \to y \in ℂ$
30	29	adantr	$⊢ (y \in ℕ_{0} \land B \in ℂ) \to y \in ℂ$
31		simpr	$⊢ (y \in ℕ_{0} \land B \in ℂ) \to B \in ℂ$
32	30 31	adddirp1d	$⊢ (y \in ℕ_{0} \land B \in ℂ) \to (y + 1) B = y B + B$
33	28 32	eqeq12d	$⊢ (y \in ℕ_{0} \land B \in ℂ) \to ((y + 1) \cdot_{ℂ_{fld}} B = (y + 1) B \leftrightarrow (y \cdot_{ℂ_{fld}} B) + B = y B + B)$
34	22 33	syl5ibr	$⊢ (y \in ℕ_{0} \land B \in ℂ) \to (y \cdot_{ℂ_{fld}} B = y B \to (y + 1) \cdot_{ℂ_{fld}} B = (y + 1) B)$
35	34	expcom	$⊢ B \in ℂ \to (y \in ℕ_{0} \to (y \cdot_{ℂ_{fld}} B = y B \to (y + 1) \cdot_{ℂ_{fld}} B = (y + 1) B))$
36		fveq2	$⊢ y \cdot_{ℂ_{fld}} B = y B \to {inv}_{g} (ℂ_{fld}) (y \cdot_{ℂ_{fld}} B) = {inv}_{g} (ℂ_{fld}) (y B)$
37		eqid	$⊢ {inv}_{g} (ℂ_{fld}) = {inv}_{g} (ℂ_{fld})$
38	16 18 37	mulgnegnn	$⊢ (y \in ℕ \land B \in ℂ) \to (- y) \cdot_{ℂ_{fld}} B = {inv}_{g} (ℂ_{fld}) (y \cdot_{ℂ_{fld}} B)$
39		nncn	$⊢ y \in ℕ \to y \in ℂ$
40		mulneg1	$⊢ (y \in ℂ \land B \in ℂ) \to (- y) B = - y B$
41	39 40	sylan	$⊢ (y \in ℕ \land B \in ℂ) \to (- y) B = - y B$
42		mulcl	$⊢ (y \in ℂ \land B \in ℂ) \to y B \in ℂ$
43	39 42	sylan	$⊢ (y \in ℕ \land B \in ℂ) \to y B \in ℂ$
44		cnfldneg	$⊢ y B \in ℂ \to {inv}_{g} (ℂ_{fld}) (y B) = - y B$
45	43 44	syl	$⊢ (y \in ℕ \land B \in ℂ) \to {inv}_{g} (ℂ_{fld}) (y B) = - y B$
46	41 45	eqtr4d	$⊢ (y \in ℕ \land B \in ℂ) \to (- y) B = {inv}_{g} (ℂ_{fld}) (y B)$
47	38 46	eqeq12d	$⊢ (y \in ℕ \land B \in ℂ) \to ((- y) \cdot_{ℂ_{fld}} B = (- y) B \leftrightarrow {inv}_{g} (ℂ_{fld}) (y \cdot_{ℂ_{fld}} B) = {inv}_{g} (ℂ_{fld}) (y B))$
48	36 47	syl5ibr	$⊢ (y \in ℕ \land B \in ℂ) \to (y \cdot_{ℂ_{fld}} B = y B \to (- y) \cdot_{ℂ_{fld}} B = (- y) B)$
49	48	expcom	$⊢ B \in ℂ \to (y \in ℕ \to (y \cdot_{ℂ_{fld}} B = y B \to (- y) \cdot_{ℂ_{fld}} B = (- y) B))$
50	3 6 9 12 15 21 35 49	zindd	$⊢ B \in ℂ \to (A \in ℤ \to A \cdot_{ℂ_{fld}} B = A B)$
51	50	impcom	$⊢ (A \in ℤ \land B \in ℂ) \to A \cdot_{ℂ_{fld}} B = A B$

Metamath Proof Explorer

Theorem cnfldmulg

Proof