3expb - Metamath Proof Explorer

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Theorem 3expb 1113

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 1112	. 2 ⊢ (𝜑 → (𝜓 → (𝜒 → 𝜃)))
3	2	imp32 419	1 ⊢ ((𝜑 ∧ (𝜓 ∧ 𝜒)) → 𝜃)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∧ wa 396 ∧ w3a 1080

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 208 df-an 397 df-3an 1082

This theorem is referenced by: 3expia 1114 3adant3r1 1175 3adant3r2 1176 3adant3r3 1177 mp3an1 1440 sotri 5870 fnfco 6418 mpoeq3dva 7096 oprres 7179 fovrnda 7182 grprinvd 7250 fnmpoovd 7645 offval22 7646 bropfvvvvlem 7649 fnsuppres 7715 suppsssn 7723 sprmpod 7748 oaass 8044 omlimcl 8061 odi 8062 nnmsucr 8108 cflim2 9538 mulcanenq 10235 mul4 10661 add4 10713 2addsub 10754 addsubeq4 10755 subadd4 10784 muladd 10926 ltleadd 10977 divmul 11155 divne0 11164 div23 11171 div12 11174 divsubdir 11188 subdivcomb1 11189 divcan5 11196 divmuleq 11199 divcan6 11201 divdiv32 11202 div2sub 11319 letrp1 11338 lemul12b 11351 lediv1 11359 lt2mul2div 11372 lemuldiv 11374 ltdiv2 11380 ledivdiv 11383 lediv2 11384 ltdiv23 11385 lediv23 11386 sup2 11451 cju 11488 nndivre 11532 nndivtr 11538 nn0addge1 11797 nn0addge2 11798 peano2uz2 11924 uzind 11928 uzind3 11930 fzind 11934 fnn0ind 11935 uzind4 12159 qre 12206 irrmul 12227 rpdivcl 12268 rerpdivcl 12273 xrinfmsslem 12555 ixxin 12609 iccshftr 12726 iccshftl 12728 iccdil 12730 icccntr 12732 fzaddel 12795 fzadd2 12796 fzrev 12824 modlt 13102 modcyc 13128 axdc4uzlem 13205 expdiv 13334 fundmge2nop0 13700 swrd00 13846 swrdcl 13847 swrdnnn0nd 13858 swrd0 13860 swrdwrdsymb 13864 swrdccat 13937 splid 13955 swrdco 14039 2shfti 14277 isermulc2 14852 fsummulc2 14976 dvdscmulr 15475 dvdsmulcr 15476 dvds2add 15480 dvds2sub 15481 dvdstr 15483 alzdvds 15507 divalg2 15593 dvdslegcd 15690 lcmgcdlem 15783 lcmgcdeq 15789 isprm6 15891 pcqcl 16026 vdwmc2 16148 ressinbas 16393 cicer 16909 isposd 17398 pleval2i 17407 tosso 17479 poslubmo 17589 posglbmo 17590 mgmplusf 17694 ismndd 17756 imasmnd2 17770 idmhm 17787 issubm2 17791 0mhm 17801 resmhm 17802 resmhm2 17803 resmhm2b 17804 mhmco 17805 mhmima 17806 submacs 17808 prdspjmhm 17810 pwsdiagmhm 17812 pwsco1mhm 17813 pwsco2mhm 17814 gsumwsubmcl 17818 gsumccat 17821 gsumwmhm 17825 grpinvcnv 17928 grpinvnzcl 17932 grpsubf 17939 imasgrp2 17975 qusgrp2 17978 mhmfmhm 17983 mulgnnsubcl 17999 mulgnndir 18014 issubg4 18056 isnsg3 18071 nsgacs 18073 nsgid 18083 qusadd 18094 ghmmhm 18113 ghmmhmb 18114 idghm 18118 resghm 18119 ghmf1 18132 qusghm 18140 gaid 18174 subgga 18175 gasubg 18177 invoppggim 18233 gsmsymgrfix 18291 lsmidm 18521 pj1ghm 18560 mulgnn0di 18675 mulgmhm 18677 mulgghm 18678 ghmfghm 18680 invghm 18683 ghmplusg 18693 ablnsg 18694 qusabl 18712 gsumval3eu 18749 gsumval3 18752 gsumzcl2 18755 gsumzaddlem 18765 gsumzadd 18766 gsumzmhm 18781 gsumzoppg 18788 srgfcl 18959 srgmulgass 18975 srglmhm 18979 srgrmhm 18980 ringlghm 19048 ringrghm 19049 issubrg2 19249 issrngd 19326 islmodd 19334 lmodscaf 19350 lcomf 19367 lmodvsghm 19389 rmodislmodlem 19395 lssacs 19433 idlmhm 19507 invlmhm 19508 lmhmvsca 19511 reslmhm2 19519 reslmhm2b 19520 pwsdiaglmhm 19523 pwssplit2 19526 pwssplit3 19527 issubrngd2 19655 qusrhm 19703 crngridl 19704 quscrng 19706 isnzr2 19729 domnmuln0 19764 opprdomn 19767 asclghm 19804 asclrhm 19811 rnasclmulcl 19814 psraddcl 19855 psrvscacl 19865 psrass23 19882 psrbagev1 19981 coe1sclmulfv 20138 cply1mul 20149 expmhm 20300 zntoslem 20389 znfld 20393 psgnghm 20410 phlipf 20482 frlmup1 20628 mndvcl 20688 matbas2d 20720 submaeval 20879 minmar1eval 20946 cpmatacl 21012 pmatcollpw1 21072 pmatcollpw 21077 tgclb 21266 topbas 21268 ntrss 21351 mretopd 21388 neissex 21423 cnpnei 21560 lmcnp 21600 ordthaus 21680 llynlly 21773 restnlly 21778 llyidm 21784 nllyidm 21785 ptbasin 21873 txcnp 21916 ist0-4 22025 kqt0lem 22032 isr0 22033 regr1lem2 22036 cmphmph 22084 connhmph 22085 fbun 22136 trfbas2 22139 isfil2 22152 isfild 22154 infil 22159 fbasfip 22164 fbasrn 22180 trfil2 22183 rnelfmlem 22248 fmfnfmlem3 22252 flimopn 22271 txflf 22302 fclsnei 22315 fclsfnflim 22323 fcfnei 22331 clssubg 22404 tgphaus 22412 qustgplem 22416 tsmsadd 22442 psmetxrge0 22610 psmetlecl 22612 xmetlecl 22643 xmettpos 22646 imasdsf1olem 22670 imasf1oxmet 22672 imasf1omet 22673 elbl3ps 22688 elbl3 22689 metss 22805 comet 22810 stdbdxmet 22812 stdbdmet 22813 methaus 22817 nrmmetd 22871 abvmet 22872 isngp4 22908 subgngp 22931 nmoi2 23026 nmoleub 23027 nmoid 23038 bl2ioo 23087 zcld 23108 divcn 23163 divccn 23168 cncffvrn 23193 divccncf 23201 icoopnst 23230 clmzlmvsca 23404 cph2ass 23504 tcphcph 23527 cfilfcls 23564 bcthlem2 23615 rrxmet 23698 rrxdstprj1 23699 rrxdsfi 23701 cldcss 23731 dvrec 24239 dvmptfsum 24259 aalioulem3 24610 taylply2 24643 efsubm 24820 dchrelbasd 25501 dchrmulcl 25511 2sqreulem3 25715 pntrmax 25826 padicabv 25892 axtgcont 25941 xmstrkgc 26359 axsegconlem1 26390 axlowdimlem15 26429 usgredg2vlem1 26694 usgredg2vlem2 26695 iswlkon 27125 wwlksnextsurj 27364 elwwlks2 27431 elwspths2spth 27432 frrusgrord 27808 numclwwlk1lem2foalem 27818 grpoidinvlem2 27969 grpoidinvlem3 27970 ablo4 28014 ablomuldiv 28016 nvaddsub4 28121 nvmeq0 28122 sspmval 28197 sspimsval 28202 lnosub 28223 dipsubdir 28312 hvadd4 28500 hvpncan 28503 his35 28552 hiassdi 28555 shscli 28781 shmodsi 28853 chj4 28999 spansnmul 29028 spansncol 29032 spanunsni 29043 hoadd4 29248 hosubadd4 29278 lnopl 29378 unopf1o 29380 counop 29385 lnfnl 29395 hmopadj2 29405 eighmre 29427 lnopmi 29464 lnophsi 29465 hmops 29484 hmopm 29485 cnlnadjlem2 29532 adjmul 29556 adjadd 29557 kbass6 29585 mdslj1i 29783 mdslj2i 29784 mdslmd1lem1 29789 mdslmd2i 29794 chirredlem3 29856 isoun 30121 xdivmul 30281 odutos 30320 isarchi2 30448 archiabllem2 30460 lmodvslmhm 30495 quslmhm 30574 tngdim 30611 fedgmullem2 30626 metider 30747 pl1cn 30811 rossros 31052 ismeas 31071 dya2iocnei 31153 inelcarsg 31182 bnj563 31627 fisshasheq 31962 cnpconn 32087 cvmseu 32133 elmrsubrn 32377 mrsubco 32378 nosupbnd2 32827 fneint 33307 fnessref 33316 tailfb 33336 onsucuni3 34200 pibt2 34250 ptrecube 34444 poimirlem4 34448 heicant 34479 mblfinlem1 34481 mblfinlem2 34482 mblfinlem3 34483 mblfinlem4 34484 cnambfre 34492 itg2addnclem2 34496 ftc1anclem5 34523 ftc1anclem6 34524 metf1o 34583 isbnd3b 34616 equivbnd 34621 heiborlem3 34644 rrnmet 34660 rrndstprj1 34661 rrntotbnd 34667 exidcl 34707 ghomco 34722 ghomdiv 34723 grpokerinj 34724 rngoneglmul 34774 rngonegrmul 34775 rngosubdi 34776 rngosubdir 34777 isdrngo2 34789 rngohomco 34805 rngoisocnv 34812 riscer 34819 crngm4 34834 crngohomfo 34837 idlsubcl 34854 inidl 34861 keridl 34863 ispridlc 34901 pridlc3 34904 dmncan1 34907 lflvscl 35765 3dim0 36145 linepsubN 36440 cdlemg2fvlem 37282 trlcoat 37411 istendod 37450 dva1dim 37673 dvhvaddcomN 37784 dihf11 37955 dihlatat 38025 ismrc 38804 isnacs3 38813 mzpindd 38849 pellex 38938 monotoddzzfi 39045 lermxnn0 39053 rmyeq0 39056 rmyeq 39057 lermy 39058 jm2.27 39111 lsmfgcl 39180 fsumcnsrcl 39272 rngunsnply 39279 isdomn3 39310 gsumws3 40056 nzin 40209 ofdivrec 40217 ofdivcan4 40218 chordthmALT 40827 wessf1ornlem 41006 projf1o 41020 ltdiv23neg 41228 fmulcl 41425 prproropf1olem2 43170 prproropf1olem4 43172 ismgmd 43547 idmgmhm 43559 resmgmhm 43569 resmgmhm2 43570 resmgmhm2b 43571 mgmhmco 43572 mgmhmima 43573 submgmacs 43575 mgmplusgiopALT 43601 c0mgm 43680 c0mhm 43681 itsclc0xyqsolb 44260

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