3expb - Metamath Proof Explorer

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Theorem 3expb 1120

Description: Exportation from triple to double conjunction. (Contributed by NM, 20-Aug-1995.)

**Hypothesis**
Ref	Expression
3exp.1	⊢ ((𝜑 ∧ 𝜓 ∧ 𝜒) → 𝜃)

**Assertion**
Ref	Expression
3expb	⊢ ((𝜑 ∧ (𝜓 ∧ 𝜒)) → 𝜃)

**Proof of Theorem 3expb**
Step	Hyp	Ref	Expression
1		3exp.1	. . 3 ⊢ ((𝜑 ∧ 𝜓 ∧ 𝜒) → 𝜃)
2	1	3exp 1119	. 2 ⊢ (𝜑 → (𝜓 → (𝜒 → 𝜃)))
3	2	imp32 418	1 ⊢ ((𝜑 ∧ (𝜓 ∧ 𝜒)) → 𝜃)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∧ 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: 3expia 1121 3adant3r1 1183 3adant3r2 1184 3adant3r3 1185 mp3an1 1450 sotri 6073 fnfco 6688 mpoeq3dva 7423 oprres 7514 fovcdmda 7517 fnmpoovd 8017 offval22 8018 bropfvvvvlem 8021 fnsuppres 8121 suppsssn 8131 sprmpod 8154 oaass 8476 omlimcl 8493 odi 8494 nnmsucr 8540 nnasmo 8578 unfi 9080 ttrclse 9617 cflim2 10154 mulcanenq 10851 mul4 11281 add4 11334 2addsub 11374 addsubeq4 11375 subadd4 11405 muladd 11549 ltleadd 11600 divmul 11779 divne0 11788 div23 11795 div12 11798 div11 11804 divsubdir 11815 subdivcomb1 11816 divcan5 11823 divmuleq 11826 divcan6 11828 divdiv32 11829 div2sub 11946 letrp1 11965 lemul12b 11978 lediv1 11987 lt2mul2div 12000 lemuldiv 12002 ltdiv2 12008 ledivdiv 12011 lediv2 12012 ltdiv23 12013 lediv23 12014 sup2 12078 cju 12121 nndivre 12166 nndivtr 12172 nn0addge1 12427 nn0addge2 12428 peano2uz2 12561 uzind 12565 uzind3 12567 fzind 12571 fnn0ind 12572 uzind4 12804 qre 12851 irrmul 12872 rpdivcl 12917 rerpdivcl 12922 xrinfmsslem 13207 ixxin 13262 iccshftr 13386 iccshftl 13388 iccdil 13390 icccntr 13392 fzaddel 13458 fzadd2 13459 fzrev 13487 modlt 13784 modcyc 13810 axdc4uzlem 13890 expdiv 14020 fundmge2nop0 14409 swrd00 14552 swrdcl 14553 swrdnnn0nd 14564 swrd0 14566 swrdwrdsymb 14570 ccatpfx 14608 swrdccat 14642 splid 14660 swrdco 14744 2shfti 14987 isermulc2 15565 fsummulc2 15691 dvdscmulr 16195 dvdsmulcr 16196 dvds2add 16201 dvds2sub 16202 dvdstr 16205 alzdvds 16231 divalg2 16316 dvdslegcd 16415 lcmgcdlem 16517 lcmgcdeq 16523 isprm6 16625 pcqcl 16768 vdwmc2 16891 ressinbas 17156 cicer 17713 isposd 18228 pleval2i 18240 poslubmo 18315 posglbmo 18316 tosso 18323 mgmplusf 18558 ismgmd 18560 grpinva 18582 idmgmhm 18609 resmgmhm 18619 resmgmhm2 18620 resmgmhm2b 18621 mgmhmco 18622 mgmhmima 18623 submgmacs 18625 sgrpidmnd 18647 ismndd 18664 imasmnd2 18682 idmhm 18703 mndvcl 18705 issubm2 18712 0mhm 18727 resmhm 18728 resmhm2 18729 resmhm2b 18730 mhmco 18731 mhmimalem 18732 submacs 18735 prdspjmhm 18737 pwsdiagmhm 18739 pwsco1mhm 18740 pwsco2mhm 18741 gsumwsubmcl 18745 gsumsgrpccat 18748 gsumwmhm 18753 grpinvcnv 18919 grpinvnzcl 18924 grpsubf 18932 imasgrp2 18968 qusgrp2 18971 mhmfmhm 18978 mulgnnsubcl 18999 mulgnndir 19016 issubg4 19058 isnsg3 19072 nsgacs 19074 nsgid 19082 qusadd 19100 qus0subgadd 19111 ghmmhm 19138 ghmmhmb 19139 idghm 19143 resghm 19144 ghmf1 19158 qusghm 19167 gaid 19211 subgga 19212 gasubg 19214 invoppggim 19272 gsmsymgrfix 19340 smndlsmidm 19568 pj1ghm 19615 mulgnn0di 19737 mulgmhm 19739 mulgghm 19740 ghmfghm 19742 invghm 19745 ghmplusg 19758 ablnsg 19759 qusabl 19777 gsumval3eu 19816 gsumval3 19819 gsumzcl2 19822 gsumzaddlem 19833 gsumzadd 19834 gsumzmhm 19849 gsumzoppg 19856 srgfcl 20114 srgcom4lem 20131 srgmulgass 20135 srglmhm 20139 srgrmhm 20140 ringcomlem 20197 ringlghm 20230 ringrghm 20231 pwspjmhmmgpd 20246 c0mgm 20377 c0mhm 20378 isnzr2 20433 subrngringnsg 20468 issubrng2 20473 rhmimasubrnglem 20480 issubrg2 20507 domnmuln0 20624 isdomn3 20630 issrngd 20770 islmodd 20799 lmodscaf 20817 lcomf 20834 lmodvsghm 20856 rmodislmodlem 20862 lssacs 20900 idlmhm 20975 invlmhm 20976 lmhmvsca 20979 reslmhm2 20987 reslmhm2b 20988 pwsdiaglmhm 20991 pwssplit2 20994 pwssplit3 20995 issubrgd 21123 qusrhm 21213 qusmul2idl 21216 crngridl 21217 qusmulrng 21219 expmhm 21373 zntoslem 21493 znfld 21497 psgnghm 21517 phlipf 21589 frlmup1 21735 asclghm 21820 asclrhm 21827 rnasclmulcl 21831 psraddcl 21875 psraddclOLD 21876 psrvscacl 21888 psrass23 21906 psrbagev1 22012 coe1sclmulfv 22197 cply1mul 22211 evls1fpws 22284 rhmply1vsca 22303 matbas2d 22338 submaeval 22497 minmar1eval 22564 cpmatacl 22631 pmatcollpw1 22691 pmatcollpw 22696 tgclb 22885 topbas 22887 ntrss 22970 mretopd 23007 neissex 23042 cnpnei 23179 lmcnp 23219 ordthaus 23299 llynlly 23392 restnlly 23397 llyidm 23403 nllyidm 23404 ptbasin 23492 txcnp 23535 ist0-4 23644 kqt0lem 23651 isr0 23652 regr1lem2 23655 cmphmph 23703 connhmph 23704 fbun 23755 trfbas2 23758 isfil2 23771 isfild 23773 infil 23778 fbasfip 23783 fbasrn 23799 trfil2 23802 rnelfmlem 23867 fmfnfmlem3 23871 flimopn 23890 txflf 23921 fclsnei 23934 fclsfnflim 23942 fcfnei 23950 clssubg 24024 tgphaus 24032 qustgplem 24036 tsmsadd 24062 psmetxrge0 24228 psmetlecl 24230 xmetlecl 24261 xmettpos 24264 imasdsf1olem 24288 imasf1oxmet 24290 imasf1omet 24291 elbl3ps 24306 elbl3 24307 metss 24423 comet 24428 stdbdxmet 24430 stdbdmet 24431 methaus 24435 nrmmetd 24489 abvmet 24490 isngp4 24527 subgngp 24550 nmoi2 24645 nmoleub 24646 nmoid 24657 bl2ioo 24707 zcld 24729 divcnOLD 24784 divcn 24786 divccn 24791 divccnOLD 24793 cncfcdm 24818 divccncf 24826 icoopnst 24863 clmzlmvsca 25040 cph2ass 25140 tcphcph 25164 cfilfcls 25201 bcthlem2 25252 rrxmet 25335 rrxdstprj1 25336 rrxdsfi 25338 cldcss 25368 dvrec 25886 dvmptfsum 25906 aalioulem3 26269 taylply2 26302 taylply2OLD 26303 efsubm 26487 dchrelbasd 27177 dchrmulcl 27187 2sqreulem3 27391 pntrmax 27502 padicabv 27568 nosupbnd2 27655 noinfbnd2 27670 ssltd 27731 divsmulw 28132 axtgcont 28447 xmstrkgc 28864 axsegconlem1 28895 axlowdimlem15 28934 usgredg2vlem1 29203 usgredg2vlem2 29204 iswlkon 29634 wwlksnextsurj 29878 elwwlks2 29947 elwspths2spth 29948 frrusgrord 30321 numclwwlk1lem2foalem 30331 grpoidinvlem2 30485 grpoidinvlem3 30486 ablo4 30530 ablomuldiv 30532 nvaddsub4 30637 nvmeq0 30638 sspmval 30713 sspimsval 30718 lnosub 30739 dipsubdir 30828 hvadd4 31016 hvpncan 31019 his35 31068 hiassdi 31071 shscli 31297 shmodsi 31369 chj4 31515 spansnmul 31544 spansncol 31548 spanunsni 31559 hoadd4 31764 hosubadd4 31794 lnopl 31894 unopf1o 31896 counop 31901 lnfnl 31911 hmopadj2 31921 eighmre 31943 lnopmi 31980 lnophsi 31981 hmops 32000 hmopm 32001 cnlnadjlem2 32048 adjmul 32072 adjadd 32073 kbass6 32101 mdslj1i 32299 mdslj2i 32300 mdslmd1lem1 32305 mdslmd2i 32310 chirredlem3 32372 isoun 32683 xdivmul 32905 odutos 32949 lmodvslmhm 33030 isarchi2 33154 archiabllem2 33166 imasmhm 33319 imasghm 33320 imasrhm 33321 imaslmhm 33322 quslmhm 33324 tngdim 33626 fedgmullem2 33643 metider 33907 pl1cn 33968 rossros 34193 ismeas 34212 dya2iocnei 34295 inelcarsg 34324 signstfvc 34587 bnj563 34755 fisshasheq 35159 cnpconn 35274 cvmseu 35320 elmrsubrn 35564 mrsubco 35565 fneint 36392 fnessref 36401 tailfb 36421 onsucuni3 37411 pibt2 37461 ptrecube 37670 poimirlem4 37674 heicant 37705 mblfinlem1 37707 mblfinlem2 37708 mblfinlem3 37709 mblfinlem4 37710 cnambfre 37718 itg2addnclem2 37722 ftc1anclem5 37747 ftc1anclem6 37748 metf1o 37805 isbnd3b 37835 equivbnd 37840 heiborlem3 37863 rrnmet 37879 rrndstprj1 37880 rrntotbnd 37886 exidcl 37926 ghomco 37941 ghomdiv 37942 grpokerinj 37943 rngoneglmul 37993 rngonegrmul 37994 rngosubdi 37995 rngosubdir 37996 isdrngo2 38008 rngohomco 38024 rngoisocnv 38031 riscer 38038 crngm4 38053 crngohomfo 38056 idlsubcl 38073 inidl 38080 keridl 38082 ispridlc 38120 pridlc3 38123 dmncan1 38126 lflvscl 39186 3dim0 39566 linepsubN 39861 cdlemg2fvlem 40703 trlcoat 40832 istendod 40871 dva1dim 41094 dvhvaddcomN 41205 dihf11 41376 dihlatat 41446 sn-sup2 42594 fsuppssind 42696 mhphf 42700 ismrc 42804 isnacs3 42813 mzpindd 42849 pellex 42938 monotoddzzfi 43045 lermxnn0 43053 rmyeq0 43056 rmyeq 43057 lermy 43058 jm2.27 43111 lsmfgcl 43177 fsumcnsrcl 43269 rngunsnply 43272 gsumws3 44299 mnringmulrcld 44331 nzin 44421 ofdivrec 44429 ofdivcan4 44430 chordthmALT 45035 wessf1ornlem 45292 projf1o 45304 ltdiv23neg 45502 fmulcl 45691 prproropf1olem2 47614 prproropf1olem4 47616 mgmplusgiopALT 48304 itsclc0xyqsolb 48881 toslat 49092 cicerALT 49157

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