Theorem ringsm 8139

Description: Functionality of the multiplication operation of a ring. (Contributed by Steve Rodriguez, 9-Sep-2007.)

Hypotheses

Ref	Expression
ringsm.1	⊢ G = (1st ‘R)
ringsm.2	⊢ H = (2nd ‘R)
ringsm.3	⊢ X = ran G

Assertion

Ref	Expression
ringsm	⊢ (R ∈ Ring → H:(X × X)–→X)

Proof of Theorem ringsm

Step	Hyp	Ref	Expression
1		ringsm.1	. . . 4 ⊢ G = (1st ‘R)
2		ringsm.2	. . . 4 ⊢ H = (2nd ‘R)
3		ringsm.3	. . . 4 ⊢ X = ran G
4	1, 2, 3	ringi 8138	. . 3 ⊢ (R ∈ Ring → ((G ∈ Abel ⋀ H:(X × X)–→X) ⋀ (∀x ∈ X ∀y ∈ X ∀z ∈ X (((xHy)Hz) = (xH(yHz)) ⋀ (xH(yGz)) = ((xHy)G(xHz)) ⋀ ((xGy)Hz) = ((xHz)G(yHz))) ⋀ ∃x ∈ X ∀y ∈ X ((yHx) = y ⋀ (xHy) = y))))
5	4	pm3.26d 321	. 2 ⊢ (R ∈ Ring → (G ∈ Abel ⋀ H:(X × X)–→X))
6	5	pm3.27d 325	1 ⊢ (R ∈ Ring → H:(X × X)–→X)

Syntax hints:   → wi 3   ⋀ wa 223   ⋀ w3a 777   = wceq 958   ∈ wcel 960  ∀wral 1648  ∃wrex 1649   × cxp 3174  ran crn 3177  –→wf 3184   ‘cfv 3188  (class class class)co 3969  1^st c1st 4083  2^nd c2nd 4084  Abelcabl 8095  Ringcring 8135

This theorem is referenced by:  ringcl 8140

This theorem was proved from axioms:  ax-1 4  ax-2 5  ax-3 6  ax-mp 7  ax-7 964  ax-gen 965  ax-8 966  ax-9 967  ax-10 968  ax-11 969  ax-12 970  ax-13 971  ax-14 972  ax-17 973  ax-4 975  ax-5o 977  ax-6o 980  ax-9o 1125  ax-10o 1142  ax-16 1212  ax-11o 1220  ax-ext 1462  ax-sep 2708  ax-nul 2715  ax-pow 2748  ax-pr 2785  ax-un 2872

This theorem depends on definitions:  df-bi 147  df-or 224  df-an 225  df-3an 779  df-ex 983  df-sb 1174  df-eu 1384  df-mo 1385  df-clab 1467  df-cleq 1472  df-clel 1475  df-ne 1590  df-ral 1652  df-rex 1653  df-v 1815  df-dif 2052  df-un 2053  df-in 2054  df-ss 2056  df-nul 2284  df-pw 2406  df-sn 2416  df-pr 2417  df-op 2420  df-uni 2508  df-br 2625  df-opab 2672  df-id 2841  df-xp 3190  df-rel 3191  df-cnv 3192  df-co 3193  df-dm 3194  df-rn 3195  df-res 3196  df-ima 3197  df-fun 3198  df-fn 3199  df-f 3200  df-fv 3204  df-opr 3971  df-1st 4085  df-2nd 4086  df-ring 8136

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