3anass - Metamath Proof Explorer

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Theorem 3anass 1094

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 1088	. 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 1086

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 1088

This theorem is referenced by: 3anan12 1095 3ancoma 1097 anandi3 1101 4anpull2 1362 3biant1d 1480 an33rean 1485 cad1 1617 3exdistr 1960 ceqsex2 3504 ceqsex2v 3505 ceqsex3v 3506 ceqsex4v 3507 ceqsex6v 3508 ceqsex8v 3509 2reu5lem1 3729 2reu5lem2 3730 2reu5lem3 3731 eldifpr 4625 rexdifpr 4626 trel3 5227 2rbropap 5529 ordelord 6357 dflim2 6393 dff1o4 6811 foco2 7084 brfvopab 7449 eloprabga 7501 ndmovass 7580 ndmovdistr 7581 dflim3 7826 dflim4 7827 frxp2 8126 mpoxopovel 8202 dfsmo2 8319 dfrecs3 8344 oeeui 8569 naddasslem2 8662 ecopovtrn 8796 elixp2 8877 elixp 8880 mptelixpg 8911 dif1en 9130 dif1enOLD 9132 ssfi 9143 sbthfilem 9168 eqinf 9443 zorn2lem7 10462 grothprim 10794 grothtsk 10795 divmulasscom 11868 muldivdir 11882 divmuldiv 11889 sup3 12147 dfnn3 12207 prime 12622 eluz2 12806 raluz2 12863 elixx1 13322 elixx3g 13326 elioo2 13354 elioo5 13371 elicc4 13381 iccneg 13440 icoshft 13441 difreicc 13452 elfz1 13480 elfz 13481 elfz2 13482 elfzm11 13563 elfz2nn0 13586 elfzo2 13630 elfzo3 13644 lbfzo0 13667 fzo1lb 13681 1elfzo1 13682 fzind2 13753 zmodid2 13868 hashgt23el 14396 swrdnd2 14627 swrdnd0 14629 swrdccatin1 14697 swrdccat 14707 repswswrd 14756 swrdco 14810 2swrd2eqwrdeq 14926 rediv 15104 imdiv 15111 cosmul 16148 bitsval 16401 bitsmod 16413 bitscmp 16415 smueqlem 16467 dfgcd2 16523 lcmneg 16580 lcmftp 16613 coprmgcdb 16626 divgcdcoprmex 16643 cncongr1 16644 cncongr2 16645 difsqpwdvds 16865 oddprmdvds 16881 elgz 16909 xpsfrnel 17532 xpsfrnel2 17534 ismre 17558 mreexexlem4d 17615 iscatd2 17649 isssc 17789 eldmcoa 18034 isdrs 18269 isipodrs 18503 mgmsscl 18579 ismhm 18719 mhmpropd 18726 issubm 18737 issubmndb 18739 submacs 18761 issubg 19065 eqglact 19118 eqgid 19119 ecqusaddd 19131 ecqusaddcl 19132 pgrpsubgsymgbi 19345 isslw 19545 efgsdm 19667 mulgmhm 19764 mulgghm 19765 dmdprd 19937 dprdw 19949 subgdmdprd 19973 dmdprdpr 19988 isrng 20070 issrg 20104 srglmhm 20137 srgrmhm 20138 isring 20153 ringlghm 20228 dfrhm2 20390 issubrng 20463 issubrg3 20516 isdomn3 20631 issdrg 20704 sdrgacs 20717 islmod 20777 lsspropd 20931 islmhm 20941 islbs 20990 lbspropd 21013 qusmulrng 21199 rngqiprngghmlem3 21206 rngqiprnglinlem3 21210 rngqiprnglin 21219 cnfldfunALT 21286 cnfldfunALTOLD 21299 isphl 21544 elocv 21584 isobs 21636 mat1dimscm 22369 scmatghm 22427 scmatmhm 22428 ma1repvcl 22464 smadiadetr 22569 mat2pmatghm 22624 mat2pmatmul 22625 decpmatmulsumfsupp 22667 pm2mpghm 22710 pm2mpmhmlem1 22712 neindisj 23011 lmbrf 23154 hauscmplem 23300 llyi 23368 subislly 23375 islocfin 23411 uptx 23519 txcn 23520 qtopeu 23610 elmptrab 23721 isfbas 23723 trfil2 23781 flimcls 23879 cnextcn 23961 xmetec 24329 ngppropd 24532 ngpocelbl 24599 bl2ioo 24687 xrtgioo 24702 om1elbas 24939 elpi1 24952 isclm 24971 isclmp 25004 isncvsngp 25056 iscph 25077 tcphcph 25144 lmmbr2 25166 lmmbrf 25169 iscau2 25184 caussi 25204 lmclim 25210 bcthlem1 25231 srabn 25267 ishl2 25277 evthicc2 25368 ovolfioo 25375 ovolficc 25376 iblcnlem1 25696 iblrelem 25699 iblre 25702 iblcn 25707 isuc1p 26053 ismon1p 26055 ellogrn 26475 logreclem 26679 atandm 26793 atandm2 26794 atandm3 26795 atans2 26848 dmarea 26874 dchrelbas4 27161 lgsmodeq 27260 lgsmulsqcoprm 27261 nocvxminlem 27696 scutcut 27720 scutbday 27723 addscut2 27893 mulscut2 28043 ax5seg 28872 eengtrkg 28920 uspgredg2v 29158 nb3grpr2 29317 isrusgr0 29501 rusgrprop0 29502 ewlkprop 29538 wksfval 29544 wlkeq 29569 wlkson 29591 wlkonprop 29593 upgr2wlk 29603 upgrtrls 29636 upgristrl 29637 wksonproplem 29639 wksonproplemOLD 29640 pthsfval 29656 ispth 29658 dfpth2 29666 isspthonpth 29686 uhgrwkspth 29692 usgr2wlkspth 29696 crctcshwlkn0lem4 29750 wspthnp 29787 wwlknon 29794 wwlksnextwrd 29834 wwlksnextinj 29836 wspthsnwspthsnon 29853 umgr2adedgwlk 29882 umgr2adedgwlkon 29883 umgr2adedgwlkonALT 29884 umgr2adedgspth 29885 s3wwlks2on 29893 wpthswwlks2on 29898 usgr2wspthons3 29901 usgr2wspthon 29902 elwwlks2 29903 elwspths2spth 29904 rusgrnumwwlkl1 29905 rusgrnumwwlkslem 29906 isclwwlk 29920 clwwlkbp 29921 clwlkclwwlklem3 29937 isclwwlknx 29972 clwwlknp 29973 clwwlkn1 29977 clwwlkn2 29980 clwwlkwwlksb 29990 clwwlknonel 30031 0pth 30061 frcond4 30206 1to3vfriswmgr 30216 3cyclfrgr 30224 frgrwopreglem5 30257 2clwwlk2clwwlk 30286 numclwlk1lem1 30305 numclwwlk6 30326 ajval 30797 issh 31144 dmadjss 31823 adjeu 31825 adjval 31826 isst 32149 ishst 32150 xrdifh 32710 nndiffz1 32716 xdivpnfrp 32860 isomnd 33022 isslmd 33162 isprmidl 33416 isprmidlc 33425 ismxidl 33440 ressply1mon1p 33544 isrrext 33997 ismntop 34023 isros 34165 issros 34172 issibf 34331 eulerpartleme 34361 eulerpartlemt0 34367 probun 34417 bnj250 34698 bnj255 34702 bnj345 34711 bnj945 34770 bnj1209 34793 bnj1275 34810 bnj543 34890 bnj571 34903 bnj607 34913 bnj882 34923 bnj983 34948 bnj996 34953 bnj1006 34957 bnj1033 34966 bnj1097 34978 bnj1110 34979 bnj1145 34990 bnj1174 35000 bnj1189 35006 bnj1450 35047 bnj1514 35060 wevgblacfn 35103 cusgr3cyclex 35130 erdszelem1 35185 cvmsval 35260 cvmliftiota 35295 snmlval 35325 lediv2aALT 35671 elwlim 35818 brtxp2 35876 brpprod3a 35881 brcart 35927 brsuccf 35936 broutsideof3 36121 ivthALT 36330 df3nandALT2 36395 andnand1 36396 topdifinffinlem 37342 relowlssretop 37358 rdgeqoa 37365 unccur 37604 fin2solem 37607 poimirlem3 37624 poimirlem4 37625 poimirlem26 37647 poimirlem27 37648 poimirlem32 37653 itg2gt0cn 37676 iblabsnclem 37684 areacirc 37714 neificl 37754 ablo4pnp 37881 isrngohom 37966 isidl 38015 ispridl 38035 pridlidl 38036 ismaxidl 38041 maxidlidl 38042 isfldidl2 38070 isdmn3 38075 triantru3 38225 moantr 38353 brxrn2 38364 dfxrn2 38365 ecxrn 38380 disjressuc2 38381 inxpxrn 38388 rnxrn 38391 dmqsblocks 38852 islshp 38979 isopos 39180 cvrfval 39268 cvrval 39269 isatl 39299 isat3 39307 islpln5 39536 4atlem11 39610 dalem20 39694 lhpexle3 40013 lhpex2leN 40014 isltrn2N 40121 diclspsn 41195 lcfls1lem 41535 lcfls1N 41536 uzindd 41972 isprimroot 42088 flt4lem5e 42651 3cubes 42685 fz1eqin 42764 dflim6 43260 dflim7 43269 nnoeomeqom 43308 cantnfub2 43318 fzunt 43451 fzuntd 43452 fzunt1d 43453 fzuntgd 43454 rp-isfinite6 43514 snhesn 43782 ismnuprim 44290 ismnushort 44297 iotasbc2 44416 eelT00 44701 eelTTT 44702 eelT11 44703 eelT12 44705 eelTT1 44706 eelT01 44707 eel0T1 44708 uun132 44781 uun132p1 44782 un2122 44786 uunTT1 44789 uunTT1p1 44790 uunTT1p2 44791 uunT11 44792 uunT11p1 44793 uunT11p2 44794 uunT12 44795 uunT12p1 44796 uunT12p2 44797 uunT12p3 44798 uunT12p4 44799 uunT12p5 44800 uun111 44801 uun2221 44809 uun2221p1 44810 uun2221p2 44811 stoweidlem17 46022 stoweidlem34 46039 stoweidlem60 46065 ndmaovass 47211 ndmaovdistr 47212 4an21 47275 2elfz3nn0 47321 difltmodne 47347 prproropf1o 47512 fpprel 47733 clnbgredg 47844 dfvopnbgr2 47857 dfclnbgr6 47860 dfnbgr6 47861 dfsclnbgr6 47862 uhgrimprop 47896 isuspgrimlem 47899 clnbgrgrim 47938 isgrtri 47946 isubgr3stgrlem4 47972 isubgr3stgrlem7 47975 upwlksfval 48127 isupwlkg 48129 upwlkbprop 48130 2zrngnmrid 48248 lindslinindsimp2lem5 48455 i0oii 48912 io1ii 48913 sepnsepolem1 48914 isthincd2 49430 functhinc 49441 elpg 49707 alimp-no-surprise 49774

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