3anass - Metamath Proof Explorer

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Theorem 3anass 1095

Description: Associative law for triple conjunction. (Contributed by NM, 8-Apr-1994.)

**Assertion**
Ref	Expression
3anass	⊢ ((𝜑 ∧ 𝜓 ∧ 𝜒) ↔ (𝜑 ∧ (𝜓 ∧ 𝜒)))

**Proof of Theorem 3anass**
Step	Hyp	Ref	Expression
1		df-3an 1089	. 2 ⊢ ((𝜑 ∧ 𝜓 ∧ 𝜒) ↔ ((𝜑 ∧ 𝜓) ∧ 𝜒))
2		anass 468	. 2 ⊢ (((𝜑 ∧ 𝜓) ∧ 𝜒) ↔ (𝜑 ∧ (𝜓 ∧ 𝜒)))
3	1, 2	bitri 275	1 ⊢ ((𝜑 ∧ 𝜓 ∧ 𝜒) ↔ (𝜑 ∧ (𝜓 ∧ 𝜒)))

Colors of variables: wff setvar class

Syntax hints: ↔ wb 206 ∧ wa 395 ∧ w3a 1087

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 df-3an 1089

This theorem is referenced by: 3anan12 1096 3ancoma 1098 anandi3 1102 4anpull2 1362 3biant1d 1480 an33rean 1485 cad1 1617 3exdistr 1960 ceqsex2 3535 ceqsex2v 3536 ceqsex3v 3537 ceqsex4v 3538 ceqsex6v 3539 ceqsex8v 3540 2reu5lem1 3761 2reu5lem2 3762 2reu5lem3 3763 eldifpr 4658 rexdifpr 4659 trel3 5269 2rbropap 5571 ordelord 6406 dflim2 6441 dff1o4 6856 foco2 7129 brfvopab 7490 eloprabga 7542 ndmovass 7621 ndmovdistr 7622 dflim3 7868 dflim4 7869 frxp2 8169 mpoxopovel 8245 dfsmo2 8387 dfrecs3 8412 dfrecs3OLD 8413 oeeui 8640 naddasslem2 8733 ecopovtrn 8860 elixp2 8941 elixp 8944 mptelixpg 8975 dif1en 9200 dif1enOLD 9202 ssfi 9213 sbthfilem 9238 eqinf 9524 zorn2lem7 10542 grothprim 10874 grothtsk 10875 divmulasscom 11946 muldivdir 11960 divmuldiv 11967 sup3 12225 dfnn3 12280 prime 12699 eluz2 12884 raluz2 12939 elixx1 13396 elixx3g 13400 elioo2 13428 elioo5 13444 elicc4 13454 iccneg 13512 icoshft 13513 difreicc 13524 elfz1 13552 elfz 13553 elfz2 13554 elfzm11 13635 elfz2nn0 13658 elfzo2 13702 elfzo3 13716 lbfzo0 13739 fzo1lb 13753 fzind2 13824 zmodid2 13939 hashgt23el 14463 swrdnd2 14693 swrdnd0 14695 swrdccatin1 14763 swrdccat 14773 repswswrd 14822 swrdco 14876 2swrd2eqwrdeq 14992 rediv 15170 imdiv 15177 cosmul 16209 bitsval 16461 bitsmod 16473 bitscmp 16475 smueqlem 16527 dfgcd2 16583 lcmneg 16640 lcmftp 16673 coprmgcdb 16686 divgcdcoprmex 16703 cncongr1 16704 cncongr2 16705 difsqpwdvds 16925 oddprmdvds 16941 elgz 16969 xpsfrnel 17607 xpsfrnel2 17609 ismre 17633 mreexexlem4d 17690 iscatd2 17724 isssc 17864 eldmcoa 18110 isdrs 18347 isipodrs 18582 mgmsscl 18658 ismhm 18798 mhmpropd 18805 issubm 18816 issubmndb 18818 submacs 18840 issubg 19144 eqglact 19197 eqgid 19198 ecqusaddd 19210 ecqusaddcl 19211 pgrpsubgsymgbi 19426 isslw 19626 efgsdm 19748 mulgmhm 19845 mulgghm 19846 dmdprd 20018 dprdw 20030 subgdmdprd 20054 dmdprdpr 20069 isrng 20151 issrg 20185 srglmhm 20218 srgrmhm 20219 isring 20234 ringlghm 20309 dfrhm2 20474 issubrng 20547 issubrg3 20600 isdomn3 20715 issdrg 20789 sdrgacs 20802 islmod 20862 lsspropd 21016 islmhm 21026 islbs 21075 lbspropd 21098 qusmulrng 21292 rngqiprngghmlem3 21299 rngqiprnglinlem3 21303 rngqiprnglin 21312 cnfldfunALT 21379 cnfldfunALTOLD 21392 isphl 21646 elocv 21686 isobs 21740 mat1dimscm 22481 scmatghm 22539 scmatmhm 22540 ma1repvcl 22576 smadiadetr 22681 mat2pmatghm 22736 mat2pmatmul 22737 decpmatmulsumfsupp 22779 pm2mpghm 22822 pm2mpmhmlem1 22824 neindisj 23125 lmbrf 23268 hauscmplem 23414 llyi 23482 subislly 23489 islocfin 23525 uptx 23633 txcn 23634 qtopeu 23724 elmptrab 23835 isfbas 23837 trfil2 23895 flimcls 23993 cnextcn 24075 xmetec 24444 ngppropd 24650 ngpocelbl 24725 bl2ioo 24813 xrtgioo 24828 om1elbas 25065 elpi1 25078 isclm 25097 isclmp 25130 isncvsngp 25183 iscph 25204 tcphcph 25271 lmmbr2 25293 lmmbrf 25296 iscau2 25311 caussi 25331 lmclim 25337 bcthlem1 25358 srabn 25394 ishl2 25404 evthicc2 25495 ovolfioo 25502 ovolficc 25503 iblcnlem1 25823 iblrelem 25826 iblre 25829 iblcn 25834 isuc1p 26180 ismon1p 26182 ellogrn 26601 logreclem 26805 atandm 26919 atandm2 26920 atandm3 26921 atans2 26974 dmarea 27000 dchrelbas4 27287 lgsmodeq 27386 lgsmulsqcoprm 27387 nocvxminlem 27822 scutcut 27846 scutbday 27849 addscut2 28012 mulscut2 28159 ax5seg 28953 eengtrkg 29001 uspgredg2v 29241 nb3grpr2 29400 isrusgr0 29584 rusgrprop0 29585 ewlkprop 29621 wksfval 29627 wlkeq 29652 wlkson 29674 wlkonprop 29676 upgr2wlk 29686 upgrtrls 29719 upgristrl 29720 wksonproplem 29722 wksonproplemOLD 29723 pthsfval 29739 ispth 29741 dfpth2 29749 isspthonpth 29769 uhgrwkspth 29775 usgr2wlkspth 29779 crctcshwlkn0lem4 29833 wspthnp 29870 wwlknon 29877 wwlksnextwrd 29917 wwlksnextinj 29919 wspthsnwspthsnon 29936 umgr2adedgwlk 29965 umgr2adedgwlkon 29966 umgr2adedgwlkonALT 29967 umgr2adedgspth 29968 s3wwlks2on 29976 wpthswwlks2on 29981 usgr2wspthons3 29984 usgr2wspthon 29985 elwwlks2 29986 elwspths2spth 29987 rusgrnumwwlkl1 29988 rusgrnumwwlkslem 29989 isclwwlk 30003 clwwlkbp 30004 clwlkclwwlklem3 30020 isclwwlknx 30055 clwwlknp 30056 clwwlkn1 30060 clwwlkn2 30063 clwwlkwwlksb 30073 clwwlknonel 30114 0pth 30144 frcond4 30289 1to3vfriswmgr 30299 3cyclfrgr 30307 frgrwopreglem5 30340 2clwwlk2clwwlk 30369 numclwlk1lem1 30388 numclwwlk6 30409 ajval 30880 issh 31227 dmadjss 31906 adjeu 31908 adjval 31909 isst 32232 ishst 32233 xrdifh 32782 nndiffz1 32788 xdivpnfrp 32915 isomnd 33078 isslmd 33208 isprmidl 33466 isprmidlc 33475 ismxidl 33490 ressply1mon1p 33593 isrrext 34001 ismntop 34027 isros 34169 issros 34176 issibf 34335 eulerpartleme 34365 eulerpartlemt0 34371 probun 34421 bnj250 34715 bnj255 34719 bnj345 34728 bnj945 34787 bnj1209 34810 bnj1275 34827 bnj543 34907 bnj571 34920 bnj607 34930 bnj882 34940 bnj983 34965 bnj996 34970 bnj1006 34974 bnj1033 34983 bnj1097 34995 bnj1110 34996 bnj1145 35007 bnj1174 35017 bnj1189 35023 bnj1450 35064 bnj1514 35077 wevgblacfn 35114 cusgr3cyclex 35141 erdszelem1 35196 cvmsval 35271 cvmliftiota 35306 snmlval 35336 lediv2aALT 35682 elwlim 35824 brtxp2 35882 brpprod3a 35887 brcart 35933 brsuccf 35942 broutsideof3 36127 ivthALT 36336 df3nandALT2 36401 andnand1 36402 topdifinffinlem 37348 relowlssretop 37364 rdgeqoa 37371 unccur 37610 fin2solem 37613 poimirlem3 37630 poimirlem4 37631 poimirlem26 37653 poimirlem27 37654 poimirlem32 37659 itg2gt0cn 37682 iblabsnclem 37690 areacirc 37720 neificl 37760 ablo4pnp 37887 isrngohom 37972 isidl 38021 ispridl 38041 pridlidl 38042 ismaxidl 38047 maxidlidl 38048 isfldidl2 38076 isdmn3 38081 triantru3 38231 moantr 38365 brxrn2 38376 dfxrn2 38377 ecxrn 38388 disjressuc2 38389 inxpxrn 38396 rnxrn 38399 islshp 38980 isopos 39181 cvrfval 39269 cvrval 39270 isatl 39300 isat3 39308 islpln5 39537 4atlem11 39611 dalem20 39695 lhpexle3 40014 lhpex2leN 40015 isltrn2N 40122 diclspsn 41196 lcfls1lem 41536 lcfls1N 41537 uzindd 41978 isprimroot 42094 flt4lem5e 42666 3cubes 42701 fz1eqin 42780 dflim6 43277 dflim7 43286 nnoeomeqom 43325 cantnfub2 43335 fzunt 43468 fzuntd 43469 fzunt1d 43470 fzuntgd 43471 rp-isfinite6 43531 snhesn 43799 ismnuprim 44313 ismnushort 44320 iotasbc2 44439 eelT00 44725 eelTTT 44726 eelT11 44727 eelT12 44729 eelTT1 44730 eelT01 44731 eel0T1 44732 uun132 44805 uun132p1 44806 un2122 44810 uunTT1 44813 uunTT1p1 44814 uunTT1p2 44815 uunT11 44816 uunT11p1 44817 uunT11p2 44818 uunT12 44819 uunT12p1 44820 uunT12p2 44821 uunT12p3 44822 uunT12p4 44823 uunT12p5 44824 uun111 44825 uun2221 44833 uun2221p1 44834 uun2221p2 44835 stoweidlem17 46032 stoweidlem34 46049 stoweidlem60 46075 ndmaovass 47218 ndmaovdistr 47219 4an21 47282 2elfz3nn0 47328 difltmodne 47344 prproropf1o 47494 fpprel 47715 clnbgredg 47826 dfvopnbgr2 47839 dfclnbgr6 47842 dfnbgr6 47843 dfsclnbgr6 47844 uspgrimprop 47873 isuspgrimlem 47874 clnbgrgrim 47902 isgrtri 47910 isubgr3stgrlem4 47936 isubgr3stgrlem7 47939 upwlksfval 48051 isupwlkg 48053 upwlkbprop 48054 2zrngnmrid 48172 lindslinindsimp2lem5 48379 i0oii 48817 io1ii 48818 sepnsepolem1 48819 isthincd2 49086 functhinc 49097 elpg 49233 alimp-no-surprise 49300

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