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 484	. 2 ⊢ ((𝜒 ∧ 𝜃) → 𝜃)
2	1	ad2antll 729	1 ⊢ ((𝜑 ∧ (𝜓 ∧ (𝜒 ∧ 𝜃))) → 𝜃)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∧ wa 395

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 207 df-an 396

This theorem is referenced by: prproe 4855 f1prex 7213 fliftfun 7241 fprresex 8235 nnaordex2 8549 naddssim 8595 mapdom2 9056 domunfican 9201 fofinf1o 9211 finsschain 9238 wemaplem3 9429 oemapvali 9569 iunfictbso 9997 enfin2i 10204 fin1a2s 10297 distrlem4pr 10909 mulcmpblnr 10954 prsrlem1 10955 addsrmo 10956 mulsrmo 10957 divdivdiv 11814 divsubdiv 11829 lediv12a 12007 xralrple 13096 seqcaopr 13938 leexp2r 14073 hashbclem 14351 wrd2ind 14622 cshwidxmod 14702 rtrclreclem4 14960 relexpindlem 14962 rtrclind 14964 rlimresb 15464 summo 15616 fsum2dlem 15669 prodmo 15835 fprod2dlem 15879 bezoutlem3 16444 bezoutlem4 16445 qredeu 16561 coprmproddvdslem 16565 prmdvdsncoprmbd 16630 pcqmul 16757 pcadd 16793 pockthg 16810 ramub1lem2 16931 cshwsdisj 17002 mreexexlem4d 17545 issubc3 17748 cofucl 17787 setcmon 17986 setcepi 17987 drsdirfi 18203 poslubmo 18307 posglbmo 18308 grprida 18575 ghmpreima 19143 gaorber 19213 psgnunilem4 19402 psgneu 19411 odcau 19509 pgpssslw 19519 fislw 19530 lsmsubm 19558 efgsfo 19644 pgpfac1 19987 pgpfaclem2 19989 pgpfaclem3 19990 unitgrp 20294 islmodd 20792 lmodprop2d 20850 lsspropd 20944 lbsextlem4 21091 assapropd 21802 evlslem1 22010 mdetunilem8 22527 mdetmul 22531 ppttop 22915 epttop 22917 restbas 23066 iscnp4 23171 cnpco 23175 nrmsep 23265 regsep2 23284 ordthauslem 23291 1stcfb 23353 2ndcctbss 23363 2ndcdisj 23364 2ndcomap 23366 dis2ndc 23368 1stcelcls 23369 nlly2i 23384 islly2 23392 hausllycmp 23402 lly1stc 23404 comppfsc 23440 1stckgenlem 23461 ptbasin 23485 txcls 23512 ptcnp 23530 txlly 23544 txnlly 23545 txtube 23548 txcmplem1 23549 txcmplem2 23550 xkococnlem 23567 basqtop 23619 regr1lem 23647 kqreglem1 23649 kqreglem2 23650 kqnrmlem1 23651 kqnrmlem2 23652 reghmph 23701 nrmhmph 23702 filuni 23793 rnelfmlem 23860 fmufil 23867 fclscf 23933 fclsfnflim 23935 flimfnfcls 23936 uffclsflim 23939 cnpfcfi 23948 cnpfcf 23949 alexsublem 23952 alexsubALTlem3 23957 tgpconncompeqg 24020 ghmcnp 24023 qustgplem 24029 blssps 24332 blss 24333 blcld 24413 metequiv2 24418 met2ndci 24430 prdsxmslem2 24437 txmetcnp 24455 nlmvscnlem1 24594 xrge0tsms 24743 ipcnlem1 25165 iscmet3 25213 metsscmetcld 25235 minveclem3 25349 pmltpc 25371 ovolscalem2 25435 ovolicc2lem5 25442 ovolicc2 25443 nulmbl2 25457 ioombl1 25483 uniioombllem6 25509 uniioombl 25510 vitalilem3 25531 i1faddlem 25614 mbfmullem 25646 itg2const2 25662 itg2split 25670 lhop2 25940 dvfsumrlim 25958 itgsubst 25976 plydivex 26225 plyexmo 26241 ulmbdd 26327 cxploglim 26908 dchrptlem2 27196 lgsquad2lem2 27316 2sqlem5 27353 dchrvmasumif 27434 rpvmasum2 27443 dchrisum0re 27444 dchrisum0lem3 27450 dchrisum0 27451 dchrmusum 27455 dchrvmasum 27456 pntibndlem3 27523 pntlemp 27541 ostth3 27569 nosupbday 27637 nosupbnd1lem1 27640 nosupbnd2 27648 noinfbday 27652 noinfbnd1lem1 27655 noinfbnd2 27663 conway 27733 madebdaylemlrcut 27837 mulsproplem9 28056 mulsuniflem 28081 uzsind 28322 readdscl 28394 legtrid 28562 hlcgreu 28589 mirreu3 28625 opphllem 28706 oppperpex 28724 lnperpex 28774 trgcopy 28775 iscgra1 28781 cgraswap 28791 cgracom 28793 cgratr 28794 flatcgra 28795 acopyeu 28805 ax5seglem9 28908 ax5seg 28909 axcontlem8 28942 axcontlem12 28946 upgrclwlkcompim 29752 wwlksnextwrd 29868 2pthfrgr 30254 frgrnbnb 30263 ablo4 30520 smcnlem 30667 pjhthmo 31272 1stpreimas 32677 xrge0tsmsd 33032 locfinref 33844 xpinpreima2 33910 qqhval2 33985 dya2iocnrect 34284 orvcgteel 34471 orvclteel 34476 cnpconn 35242 txpconn 35244 connpconn 35247 pconnpi1 35249 iccllysconn 35262 rellysconn 35263 cvmcov2 35287 cvmliftmolem2 35294 cvmliftmo 35296 cvmliftlem15 35310 cvmliftpht 35330 cvmlift3lem2 35332 cgrextend 36021 btwnouttr2 36035 btwnexch2 36036 cgrxfr 36068 lineext 36089 btwnconn1lem5 36104 btwnconn1lem13 36112 btwnconn3 36116 segletr 36127 segleantisym 36128 outsideofeq 36143 outsidele 36145 lineunray 36160 refssfne 36371 neibastop2lem 36373 neibastop2 36374 weiunpo 36478 unblimceq0lem 36519 knoppndvlem22 36546 mblfinlem3 37678 mblfinlem4 37679 cnambfre 37687 itg2addnclem 37690 areacirclem5 37731 istotbnd3 37790 crngm4 38022 cvlcvr1 39357 4atlem12 39630 cdlemb 39812 paddasslem10 39847 paddasslem12 39849 paddasslem13 39850 lhpexle3lem 40029 cdlemd4 40219 cdlemefs32sn1aw 40432 cdleme43fsv1snlem 40438 cdleme32d 40462 cdleme32f 40464 cdleme40m 40485 cdleme40n 40486 cdleme50trn2 40569 cdlemftr3 40583 cdlemm10N 41136 dihvalcqpre 41253 dihopelvalcpre 41266 dihmeetlem1N 41308 dihglblem5apreN 41309 dihmeetlem4preN 41324 dihjat1lem 41446 mapd0 41683 mapdh9a 41807 nna4b4nsq 42672 mzpmfp 42759 mzpcompact2lem 42763 diophin 42784 pellexlem3 42843 pellex 42847 pell14qrmulcl 42875 jm2.19lem3 43003 jm2.25 43011 jm2.27b 43018 fnwe2lem2 43063 hbtlem2 43136 hbtlem5 43140 gsumws3 44208 gsumws4 44209 mnuprdlem1 44284 mnuprdlem2 44285 mnuprdlem4 44287 fnchoice 45045 stoweidlem53 46070 stoweidlem61 46078 qndenserrnbllem 46311 bgoldbtbnd 47819 cycldlenngric 47938 grtrimap 47958 isubgr3stgrlem6 47981 prsthinc 49475

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