rngbase - Metamath Proof Explorer

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Theorem rngbase 14596

Description: The base set of a constructed ring. (Contributed by Mario Carneiro, 2-Oct-2013.) (Revised by Mario Carneiro, 30-Apr-2015.)

**Hypothesis**
Ref	Expression
rngfn.r

**Assertion**
Ref	Expression
rngbase

**Proof of Theorem rngbase**
Step	Hyp	Ref	Expression
1		rngfn.r	. . 3
2	1	rngstr 14595	. 2 Struct
3		baseid 14529	. 2 Slot
4		snsstp1 4178	. . 3
5	4, 1	sseqtr4i 3537	. 2
6	2, 3, 5	strfv 14517	1

Colors of variables: wff setvar class

Syntax hints:

wi 4

wceq 1379

wcel 1767

csn 4027

ctp 4031

cop 4033

cfv 5586

c1 9489

c3 10582

cnx 14480

cbs 14483

cplusg 14548

cmulr 14549

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1601 ax-4 1612 ax-5 1680 ax-6 1719 ax-7 1739 ax-8 1769 ax-9 1771 ax-10 1786 ax-11 1791 ax-12 1803 ax-13 1968 ax-ext 2445 ax-sep 4568 ax-nul 4576 ax-pow 4625 ax-pr 4686 ax-un 6574 ax-cnex 9544 ax-resscn 9545 ax-1cn 9546 ax-icn 9547 ax-addcl 9548 ax-addrcl 9549 ax-mulcl 9550 ax-mulrcl 9551 ax-mulcom 9552 ax-addass 9553 ax-mulass 9554 ax-distr 9555 ax-i2m1 9556 ax-1ne0 9557 ax-1rid 9558 ax-rnegex 9559 ax-rrecex 9560 ax-cnre 9561 ax-pre-lttri 9562 ax-pre-lttrn 9563 ax-pre-ltadd 9564 ax-pre-mulgt0 9565

This theorem depends on definitions: df-bi 185 df-or 370 df-an 371 df-3or 974 df-3an 975 df-tru 1382 df-ex 1597 df-nf 1600 df-sb 1712 df-eu 2279 df-mo 2280 df-clab 2453 df-cleq 2459 df-clel 2462 df-nfc 2617 df-ne 2664 df-nel 2665 df-ral 2819 df-rex 2820 df-reu 2821 df-rab 2823 df-v 3115 df-sbc 3332 df-csb 3436 df-dif 3479 df-un 3481 df-in 3483 df-ss 3490 df-pss 3492 df-nul 3786 df-if 3940 df-pw 4012 df-sn 4028 df-pr 4030 df-tp 4032 df-op 4034 df-uni 4246 df-int 4283 df-iun 4327 df-br 4448 df-opab 4506 df-mpt 4507 df-tr 4541 df-eprel 4791 df-id 4795 df-po 4800 df-so 4801 df-fr 4838 df-we 4840 df-ord 4881 df-on 4882 df-lim 4883 df-suc 4884 df-xp 5005 df-rel 5006 df-cnv 5007 df-co 5008 df-dm 5009 df-rn 5010 df-res 5011 df-ima 5012 df-iota 5549 df-fun 5588 df-fn 5589 df-f 5590 df-f1 5591 df-fo 5592 df-f1o 5593 df-fv 5594 df-riota 6243 df-ov 6285 df-oprab 6286 df-mpt2 6287 df-om 6679 df-1st 6781 df-2nd 6782 df-recs 7039 df-rdg 7073 df-1o 7127 df-oadd 7131 df-er 7308 df-en 7514 df-dom 7515 df-sdom 7516 df-fin 7517 df-pnf 9626 df-mnf 9627 df-xr 9628 df-ltxr 9629 df-le 9630 df-sub 9803 df-neg 9804 df-nn 10533 df-2 10590 df-3 10591 df-n0 10792 df-z 10861 df-uz 11079 df-fz 11669 df-struct 14485 df-ndx 14486 df-slot 14487 df-base 14488 df-plusg 14561 df-mulr 14562

This theorem is referenced by: rng1 32165 rng1nnzr 32166 lmod1zr 32175 erngbase 35597 erngbase-rN 35605