simprrr - Metamath Proof Explorer

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Theorem simprrr 780

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 485	. 2 ⊢ ((𝜒 ∧ 𝜃) → 𝜃)
2	1	ad2antll 727	1 ⊢ ((𝜑 ∧ (𝜓 ∧ (𝜒 ∧ 𝜃))) → 𝜃)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∧ wa 396

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 206 df-an 397

This theorem is referenced by: prproe 4868 f1prex 7235 fliftfun 7262 fprresex 8246 wfrlem17OLD 8276 naddssim 8636 mapdom2 9099 domunfican 9271 fofinf1o 9278 finsschain 9310 wemaplem3 9493 oemapvali 9629 iunfictbso 10059 enfin2i 10266 fin1a2s 10359 distrlem4pr 10971 mulcmpblnr 11016 prsrlem1 11017 addsrmo 11018 mulsrmo 11019 divdivdiv 11865 divsubdiv 11880 lediv12a 12057 xralrple 13134 seqcaopr 13955 leexp2r 14089 hashbclem 14361 wrd2ind 14623 cshwidxmod 14703 rtrclreclem4 14958 relexpindlem 14960 rtrclind 14962 rlimresb 15459 summo 15613 fsum2dlem 15666 prodmo 15830 fprod2dlem 15874 bezoutlem3 16433 bezoutlem4 16434 qredeu 16545 coprmproddvdslem 16549 prmdvdsncoprmbd 16613 pcqmul 16736 pcadd 16772 pockthg 16789 ramub1lem2 16910 cshwsdisj 16982 mreexexlem4d 17541 issubc3 17749 cofucl 17788 setcmon 17987 setcepi 17988 drsdirfi 18208 poslubmo 18314 posglbmo 18315 grpridd 18544 ghmpreima 19044 gaorber 19102 psgnunilem4 19293 psgneu 19302 odcau 19400 pgpssslw 19410 fislw 19421 lsmsubm 19449 efgsfo 19535 pgpfac1 19873 pgpfaclem2 19875 pgpfaclem3 19876 unitgrp 20110 islmodd 20384 lmodprop2d 20441 lsspropd 20535 lbsextlem4 20681 assapropd 21312 evlslem1 21529 mdetunilem8 22005 mdetmul 22009 ppttop 22394 epttop 22396 restbas 22546 iscnp4 22651 cnpco 22655 nrmsep 22745 regsep2 22764 ordthauslem 22771 1stcfb 22833 2ndcctbss 22843 2ndcdisj 22844 2ndcomap 22846 dis2ndc 22848 1stcelcls 22849 nlly2i 22864 islly2 22872 hausllycmp 22882 lly1stc 22884 comppfsc 22920 1stckgenlem 22941 ptbasin 22965 txcls 22992 ptcnp 23010 txlly 23024 txnlly 23025 txtube 23028 txcmplem1 23029 txcmplem2 23030 xkococnlem 23047 basqtop 23099 regr1lem 23127 kqreglem1 23129 kqreglem2 23130 kqnrmlem1 23131 kqnrmlem2 23132 reghmph 23181 nrmhmph 23182 filuni 23273 rnelfmlem 23340 fmufil 23347 fclscf 23413 fclsfnflim 23415 flimfnfcls 23416 uffclsflim 23419 cnpfcfi 23428 cnpfcf 23429 alexsublem 23432 alexsubALTlem3 23437 tgpconncompeqg 23500 ghmcnp 23503 qustgplem 23509 blssps 23814 blss 23815 blcld 23898 metequiv2 23903 met2ndci 23915 prdsxmslem2 23922 txmetcnp 23940 nlmvscnlem1 24087 xrge0tsms 24234 ipcnlem1 24646 iscmet3 24694 metsscmetcld 24716 minveclem3 24830 pmltpc 24851 ovolscalem2 24915 ovolicc2lem5 24922 ovolicc2 24923 nulmbl2 24937 ioombl1 24963 uniioombllem6 24989 uniioombl 24990 vitalilem3 25011 i1faddlem 25094 mbfmullem 25127 itg2const2 25143 itg2split 25151 lhop2 25416 dvfsumrlim 25432 itgsubst 25450 plydivex 25694 plyexmo 25710 ulmbdd 25794 cxploglim 26364 dchrptlem2 26650 lgsquad2lem2 26770 2sqlem5 26807 dchrvmasumif 26888 rpvmasum2 26897 dchrisum0re 26898 dchrisum0lem3 26904 dchrisum0 26905 dchrmusum 26909 dchrvmasum 26910 pntibndlem3 26977 pntlemp 26995 ostth3 27023 nosupbday 27090 nosupbnd1lem1 27093 nosupbnd2 27101 noinfbday 27105 noinfbnd1lem1 27108 noinfbnd2 27116 conway 27181 madebdaylemlrcut 27271 legtrid 27596 hlcgreu 27623 mirreu3 27659 opphllem 27740 oppperpex 27758 lnperpex 27808 trgcopy 27809 iscgra1 27815 cgraswap 27825 cgracom 27827 cgratr 27828 flatcgra 27829 acopyeu 27839 ax5seglem9 27949 ax5seg 27950 axcontlem8 27983 axcontlem12 27987 upgrclwlkcompim 28792 wwlksnextwrd 28905 2pthfrgr 29291 frgrnbnb 29300 ablo4 29555 smcnlem 29702 pjhthmo 30307 1stpreimas 31687 xrge0tsmsd 31969 locfinref 32511 xpinpreima2 32577 qqhval2 32652 dya2iocnrect 32970 orvcgteel 33156 orvclteel 33161 cnpconn 33911 txpconn 33913 connpconn 33916 pconnpi1 33918 iccllysconn 33931 rellysconn 33932 cvmcov2 33956 cvmliftmolem2 33963 cvmliftmo 33965 cvmliftlem15 33979 cvmliftpht 33999 cvmlift3lem2 34001 cgrextend 34669 btwnouttr2 34683 btwnexch2 34684 cgrxfr 34716 lineext 34737 btwnconn1lem5 34752 btwnconn1lem13 34760 btwnconn3 34764 segletr 34775 segleantisym 34776 outsideofeq 34791 outsidele 34793 lineunray 34808 refssfne 34906 neibastop2lem 34908 neibastop2 34909 unblimceq0lem 35045 knoppndvlem22 35072 mblfinlem3 36190 mblfinlem4 36191 cnambfre 36199 itg2addnclem 36202 areacirclem5 36243 istotbnd3 36303 crngm4 36535 cvlcvr1 37874 4atlem12 38148 cdlemb 38330 paddasslem10 38365 paddasslem12 38367 paddasslem13 38368 lhpexle3lem 38547 cdlemd4 38737 cdlemefs32sn1aw 38950 cdleme43fsv1snlem 38956 cdleme32d 38980 cdleme32f 38982 cdleme40m 39003 cdleme40n 39004 cdleme50trn2 39087 cdlemftr3 39101 cdlemm10N 39654 dihvalcqpre 39771 dihopelvalcpre 39784 dihmeetlem1N 39826 dihglblem5apreN 39827 dihmeetlem4preN 39842 dihjat1lem 39964 mapd0 40201 mapdh9a 40325 nna4b4nsq 41056 mzpmfp 41128 mzpcompact2lem 41132 diophin 41153 pellexlem3 41212 pellex 41216 pell14qrmulcl 41244 jm2.19lem3 41373 jm2.25 41381 jm2.27b 41388 fnwe2lem2 41436 hbtlem2 41509 hbtlem5 41513 gsumws3 42591 gsumws4 42592 mnuprdlem1 42674 mnuprdlem2 42675 mnuprdlem4 42677 fnchoice 43356 stoweidlem53 44414 stoweidlem61 44422 qndenserrnbllem 44655 bgoldbtbnd 46121 prsthinc 47194

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