simprrr - Metamath Proof Explorer

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Theorem simprrr 781

Description: Simplification of a conjunction. (Contributed by Jeff Hankins, 28-Jul-2009.)

**Assertion**
Ref	Expression
simprrr	⊢ ((𝜑 ∧ (𝜓 ∧ (𝜒 ∧ 𝜃))) → 𝜃)

**Proof of Theorem simprrr**
Step	Hyp	Ref	Expression
1		simpr 488	. 2 ⊢ ((𝜒 ∧ 𝜃) → 𝜃)
2	1	ad2antll 728	1 ⊢ ((𝜑 ∧ (𝜓 ∧ (𝜒 ∧ 𝜃))) → 𝜃)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∧ wa 399

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8

This theorem depends on definitions: df-bi 210 df-an 400

This theorem is referenced by: prproe 4798 f1prex 7018 fliftfun 7044 wfrlem17 7954 mapdom2 8672 domunfican 8775 fofinf1o 8783 finsschain 8815 wemaplem3 8996 oemapvali 9131 iunfictbso 9525 enfin2i 9732 fin1a2s 9825 distrlem4pr 10437 mulcmpblnr 10482 prsrlem1 10483 addsrmo 10484 mulsrmo 10485 divdivdiv 11330 divsubdiv 11345 lediv12a 11522 xralrple 12586 seqcaopr 13403 leexp2r 13534 hashbclem 13806 wrd2ind 14076 cshwidxmod 14156 rtrclreclem4 14412 relexpindlem 14414 rtrclind 14416 rlimresb 14914 summo 15066 fsum2dlem 15117 prodmo 15282 fprod2dlem 15326 bezoutlem3 15879 bezoutlem4 15880 qredeu 15992 coprmproddvdslem 15996 pcqmul 16180 pcadd 16215 pockthg 16232 ramub1lem2 16353 cshwsdisj 16424 mreexexlem4d 16910 issubc3 17111 cofucl 17150 setcmon 17339 setcepi 17340 drsdirfi 17540 poslubmo 17748 posglbmo 17749 grpridd 17877 ghmpreima 18372 gaorber 18430 psgnunilem4 18617 psgneu 18626 odcau 18721 pgpssslw 18731 fislw 18742 lsmsubm 18770 efgsfo 18857 pgpfac1 19195 pgpfaclem2 19197 pgpfaclem3 19198 unitgrp 19413 islmodd 19633 lmodprop2d 19689 lsspropd 19782 lbsextlem4 19926 assapropd 20558 evlslem1 20754 mdetunilem8 21224 mdetmul 21228 ppttop 21612 epttop 21614 restbas 21763 iscnp4 21868 cnpco 21872 nrmsep 21962 regsep2 21981 ordthauslem 21988 1stcfb 22050 2ndcctbss 22060 2ndcdisj 22061 2ndcomap 22063 dis2ndc 22065 1stcelcls 22066 nlly2i 22081 islly2 22089 hausllycmp 22099 lly1stc 22101 comppfsc 22137 1stckgenlem 22158 ptbasin 22182 txcls 22209 ptcnp 22227 txlly 22241 txnlly 22242 txtube 22245 txcmplem1 22246 txcmplem2 22247 xkococnlem 22264 basqtop 22316 regr1lem 22344 kqreglem1 22346 kqreglem2 22347 kqnrmlem1 22348 kqnrmlem2 22349 reghmph 22398 nrmhmph 22399 filuni 22490 rnelfmlem 22557 fmufil 22564 fclscf 22630 fclsfnflim 22632 flimfnfcls 22633 uffclsflim 22636 cnpfcfi 22645 cnpfcf 22646 alexsublem 22649 alexsubALTlem3 22654 tgpconncompeqg 22717 ghmcnp 22720 qustgplem 22726 blssps 23031 blss 23032 blcld 23112 metequiv2 23117 met2ndci 23129 prdsxmslem2 23136 txmetcnp 23154 nlmvscnlem1 23292 xrge0tsms 23439 ipcnlem1 23849 iscmet3 23897 metsscmetcld 23919 minveclem3 24033 pmltpc 24054 ovolscalem2 24118 ovolicc2lem5 24125 ovolicc2 24126 nulmbl2 24140 ioombl1 24166 uniioombllem6 24192 uniioombl 24193 vitalilem3 24214 i1faddlem 24297 mbfmullem 24329 itg2const2 24345 itg2split 24353 lhop2 24618 dvfsumrlim 24634 itgsubst 24652 plydivex 24893 plyexmo 24909 ulmbdd 24993 cxploglim 25563 dchrptlem2 25849 lgsquad2lem2 25969 2sqlem5 26006 dchrvmasumif 26087 rpvmasum2 26096 dchrisum0re 26097 dchrisum0lem3 26103 dchrisum0 26104 dchrmusum 26108 dchrvmasum 26109 pntibndlem3 26176 pntlemp 26194 ostth3 26222 legtrid 26385 hlcgreu 26412 mirreu3 26448 opphllem 26529 oppperpex 26547 lnperpex 26597 trgcopy 26598 iscgra1 26604 cgraswap 26614 cgracom 26616 cgratr 26617 flatcgra 26618 acopyeu 26628 ax5seglem9 26731 ax5seg 26732 axcontlem8 26765 axcontlem12 26769 upgrclwlkcompim 27570 wwlksnextwrd 27683 2pthfrgr 28069 frgrnbnb 28078 ablo4 28333 smcnlem 28480 pjhthmo 29085 1stpreimas 30465 xrge0tsmsd 30742 locfinref 31194 xpinpreima2 31260 qqhval2 31333 dya2iocnrect 31649 orvcgteel 31835 orvclteel 31840 cnpconn 32590 txpconn 32592 connpconn 32595 pconnpi1 32597 iccllysconn 32610 rellysconn 32611 cvmcov2 32635 cvmliftmolem2 32642 cvmliftmo 32644 cvmliftlem15 32658 cvmliftpht 32678 cvmlift3lem2 32680 nosupbnd1lem1 33321 nosupbnd2 33329 conway 33377 cgrextend 33582 btwnouttr2 33596 btwnexch2 33597 cgrxfr 33629 lineext 33650 btwnconn1lem5 33665 btwnconn1lem13 33673 btwnconn3 33677 segletr 33688 segleantisym 33689 outsideofeq 33704 outsidele 33706 lineunray 33721 refssfne 33819 neibastop2lem 33821 neibastop2 33822 unblimceq0lem 33958 knoppndvlem22 33985 mblfinlem3 35096 mblfinlem4 35097 cnambfre 35105 itg2addnclem 35108 areacirclem5 35149 istotbnd3 35209 crngm4 35441 cvlcvr1 36635 4atlem12 36908 cdlemb 37090 paddasslem10 37125 paddasslem12 37127 paddasslem13 37128 lhpexle3lem 37307 cdlemd4 37497 cdlemefs32sn1aw 37710 cdleme43fsv1snlem 37716 cdleme32d 37740 cdleme32f 37742 cdleme40m 37763 cdleme40n 37764 cdleme50trn2 37847 cdlemftr3 37861 cdlemm10N 38414 dihvalcqpre 38531 dihopelvalcpre 38544 dihmeetlem1N 38586 dihglblem5apreN 38587 dihmeetlem4preN 38602 dihjat1lem 38724 mapd0 38961 mapdh9a 39085 mzpmfp 39688 mzpcompact2lem 39692 diophin 39713 pellexlem3 39772 pellex 39776 pell14qrmulcl 39804 jm2.19lem3 39932 jm2.25 39940 jm2.27b 39947 fnwe2lem2 39995 hbtlem2 40068 hbtlem5 40072 gsumws3 40902 gsumws4 40903 mnuprdlem1 40980 mnuprdlem2 40981 mnuprdlem4 40983 fnchoice 41658 stoweidlem53 42695 stoweidlem61 42703 qndenserrnbllem 42936 bgoldbtbnd 44327

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