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 6100 fnfco 6725 mpoeq3dva 7466 oprres 7557 fovcdmda 7560 fnmpoovd 8066 offval22 8067 bropfvvvvlem 8070 fnsuppres 8170 suppsssn 8180 sprmpod 8203 oaass 8525 omlimcl 8542 odi 8543 nnmsucr 8589 nnasmo 8627 unfi 9135 ttrclse 9680 cflim2 10216 mulcanenq 10913 mul4 11342 add4 11395 2addsub 11435 addsubeq4 11436 subadd4 11466 muladd 11610 ltleadd 11661 divmul 11840 divne0 11849 div23 11856 div12 11859 div11 11865 divsubdir 11876 subdivcomb1 11877 divcan5 11884 divmuleq 11887 divcan6 11889 divdiv32 11890 div2sub 12007 letrp1 12026 lemul12b 12039 lediv1 12048 lt2mul2div 12061 lemuldiv 12063 ltdiv2 12069 ledivdiv 12072 lediv2 12073 ltdiv23 12074 lediv23 12075 sup2 12139 cju 12182 nndivre 12227 nndivtr 12233 nn0addge1 12488 nn0addge2 12489 peano2uz2 12622 uzind 12626 uzind3 12628 fzind 12632 fnn0ind 12633 uzind4 12865 qre 12912 irrmul 12933 rpdivcl 12978 rerpdivcl 12983 xrinfmsslem 13268 ixxin 13323 iccshftr 13447 iccshftl 13449 iccdil 13451 icccntr 13453 fzaddel 13519 fzadd2 13520 fzrev 13548 modlt 13842 modcyc 13868 axdc4uzlem 13948 expdiv 14078 fundmge2nop0 14467 swrd00 14609 swrdcl 14610 swrdnnn0nd 14621 swrd0 14623 swrdwrdsymb 14627 ccatpfx 14666 swrdccat 14700 splid 14718 swrdco 14803 2shfti 15046 isermulc2 15624 fsummulc2 15750 dvdscmulr 16254 dvdsmulcr 16255 dvds2add 16260 dvds2sub 16261 dvdstr 16264 alzdvds 16290 divalg2 16375 dvdslegcd 16474 lcmgcdlem 16576 lcmgcdeq 16582 isprm6 16684 pcqcl 16827 vdwmc2 16950 ressinbas 17215 cicer 17768 isposd 18283 pleval2i 18295 poslubmo 18370 posglbmo 18371 tosso 18378 mgmplusf 18577 ismgmd 18579 grpinva 18601 idmgmhm 18628 resmgmhm 18638 resmgmhm2 18639 resmgmhm2b 18640 mgmhmco 18641 mgmhmima 18642 submgmacs 18644 sgrpidmnd 18666 ismndd 18683 imasmnd2 18701 idmhm 18722 mndvcl 18724 issubm2 18731 0mhm 18746 resmhm 18747 resmhm2 18748 resmhm2b 18749 mhmco 18750 mhmimalem 18751 submacs 18754 prdspjmhm 18756 pwsdiagmhm 18758 pwsco1mhm 18759 pwsco2mhm 18760 gsumwsubmcl 18764 gsumsgrpccat 18767 gsumwmhm 18772 grpinvcnv 18938 grpinvnzcl 18943 grpsubf 18951 imasgrp2 18987 qusgrp2 18990 mhmfmhm 18997 mulgnnsubcl 19018 mulgnndir 19035 issubg4 19077 isnsg3 19092 nsgacs 19094 nsgid 19102 qusadd 19120 qus0subgadd 19131 ghmmhm 19158 ghmmhmb 19159 idghm 19163 resghm 19164 ghmf1 19178 qusghm 19187 gaid 19231 subgga 19232 gasubg 19234 invoppggim 19292 gsmsymgrfix 19358 smndlsmidm 19586 pj1ghm 19633 mulgnn0di 19755 mulgmhm 19757 mulgghm 19758 ghmfghm 19760 invghm 19763 ghmplusg 19776 ablnsg 19777 qusabl 19795 gsumval3eu 19834 gsumval3 19837 gsumzcl2 19840 gsumzaddlem 19851 gsumzadd 19852 gsumzmhm 19867 gsumzoppg 19874 srgfcl 20105 srgcom4lem 20122 srgmulgass 20126 srglmhm 20130 srgrmhm 20131 ringcomlem 20188 ringlghm 20221 ringrghm 20222 pwspjmhmmgpd 20237 c0mgm 20368 c0mhm 20369 isnzr2 20427 subrngringnsg 20462 issubrng2 20467 rhmimasubrnglem 20474 issubrg2 20501 domnmuln0 20618 isdomn3 20624 issrngd 20764 islmodd 20772 lmodscaf 20790 lcomf 20807 lmodvsghm 20829 rmodislmodlem 20835 lssacs 20873 idlmhm 20948 invlmhm 20949 lmhmvsca 20952 reslmhm2 20960 reslmhm2b 20961 pwsdiaglmhm 20964 pwssplit2 20967 pwssplit3 20968 issubrgd 21096 qusrhm 21186 qusmul2idl 21189 crngridl 21190 qusmulrng 21192 expmhm 21353 zntoslem 21466 znfld 21470 psgnghm 21489 phlipf 21561 frlmup1 21707 asclghm 21792 asclrhm 21799 rnasclmulcl 21803 psraddcl 21847 psraddclOLD 21848 psrvscacl 21860 psrass23 21878 psrbagev1 21984 coe1sclmulfv 22169 cply1mul 22183 evls1fpws 22256 rhmply1vsca 22275 matbas2d 22310 submaeval 22469 minmar1eval 22536 cpmatacl 22603 pmatcollpw1 22663 pmatcollpw 22668 tgclb 22857 topbas 22859 ntrss 22942 mretopd 22979 neissex 23014 cnpnei 23151 lmcnp 23191 ordthaus 23271 llynlly 23364 restnlly 23369 llyidm 23375 nllyidm 23376 ptbasin 23464 txcnp 23507 ist0-4 23616 kqt0lem 23623 isr0 23624 regr1lem2 23627 cmphmph 23675 connhmph 23676 fbun 23727 trfbas2 23730 isfil2 23743 isfild 23745 infil 23750 fbasfip 23755 fbasrn 23771 trfil2 23774 rnelfmlem 23839 fmfnfmlem3 23843 flimopn 23862 txflf 23893 fclsnei 23906 fclsfnflim 23914 fcfnei 23922 clssubg 23996 tgphaus 24004 qustgplem 24008 tsmsadd 24034 psmetxrge0 24201 psmetlecl 24203 xmetlecl 24234 xmettpos 24237 imasdsf1olem 24261 imasf1oxmet 24263 imasf1omet 24264 elbl3ps 24279 elbl3 24280 metss 24396 comet 24401 stdbdxmet 24403 stdbdmet 24404 methaus 24408 nrmmetd 24462 abvmet 24463 isngp4 24500 subgngp 24523 nmoi2 24618 nmoleub 24619 nmoid 24630 bl2ioo 24680 zcld 24702 divcnOLD 24757 divcn 24759 divccn 24764 divccnOLD 24766 cncfcdm 24791 divccncf 24799 icoopnst 24836 clmzlmvsca 25013 cph2ass 25113 tcphcph 25137 cfilfcls 25174 bcthlem2 25225 rrxmet 25308 rrxdstprj1 25309 rrxdsfi 25311 cldcss 25341 dvrec 25859 dvmptfsum 25879 aalioulem3 26242 taylply2 26275 taylply2OLD 26276 efsubm 26460 dchrelbasd 27150 dchrmulcl 27160 2sqreulem3 27364 pntrmax 27475 padicabv 27541 nosupbnd2 27628 noinfbnd2 27643 ssltd 27703 divsmulw 28096 axtgcont 28396 xmstrkgc 28813 axsegconlem1 28844 axlowdimlem15 28883 usgredg2vlem1 29152 usgredg2vlem2 29153 iswlkon 29585 wwlksnextsurj 29830 elwwlks2 29896 elwspths2spth 29897 frrusgrord 30270 numclwwlk1lem2foalem 30280 grpoidinvlem2 30434 grpoidinvlem3 30435 ablo4 30479 ablomuldiv 30481 nvaddsub4 30586 nvmeq0 30587 sspmval 30662 sspimsval 30667 lnosub 30688 dipsubdir 30777 hvadd4 30965 hvpncan 30968 his35 31017 hiassdi 31020 shscli 31246 shmodsi 31318 chj4 31464 spansnmul 31493 spansncol 31497 spanunsni 31508 hoadd4 31713 hosubadd4 31743 lnopl 31843 unopf1o 31845 counop 31850 lnfnl 31860 hmopadj2 31870 eighmre 31892 lnopmi 31929 lnophsi 31930 hmops 31949 hmopm 31950 cnlnadjlem2 31997 adjmul 32021 adjadd 32022 kbass6 32050 mdslj1i 32248 mdslj2i 32249 mdslmd1lem1 32254 mdslmd2i 32259 chirredlem3 32321 isoun 32625 xdivmul 32845 odutos 32894 lmodvslmhm 32990 isarchi2 33139 archiabllem2 33151 imasmhm 33325 imasghm 33326 imasrhm 33327 imaslmhm 33328 quslmhm 33330 tngdim 33609 fedgmullem2 33626 metider 33884 pl1cn 33945 rossros 34170 ismeas 34189 dya2iocnei 34273 inelcarsg 34302 signstfvc 34565 bnj563 34733 fisshasheq 35102 cnpconn 35217 cvmseu 35263 elmrsubrn 35507 mrsubco 35508 fneint 36336 fnessref 36345 tailfb 36365 onsucuni3 37355 pibt2 37405 ptrecube 37614 poimirlem4 37618 heicant 37649 mblfinlem1 37651 mblfinlem2 37652 mblfinlem3 37653 mblfinlem4 37654 cnambfre 37662 itg2addnclem2 37666 ftc1anclem5 37691 ftc1anclem6 37692 metf1o 37749 isbnd3b 37779 equivbnd 37784 heiborlem3 37807 rrnmet 37823 rrndstprj1 37824 rrntotbnd 37830 exidcl 37870 ghomco 37885 ghomdiv 37886 grpokerinj 37887 rngoneglmul 37937 rngonegrmul 37938 rngosubdi 37939 rngosubdir 37940 isdrngo2 37952 rngohomco 37968 rngoisocnv 37975 riscer 37982 crngm4 37997 crngohomfo 38000 idlsubcl 38017 inidl 38024 keridl 38026 ispridlc 38064 pridlc3 38067 dmncan1 38070 lflvscl 39070 3dim0 39451 linepsubN 39746 cdlemg2fvlem 40588 trlcoat 40717 istendod 40756 dva1dim 40979 dvhvaddcomN 41090 dihf11 41261 dihlatat 41331 sn-sup2 42479 fsuppssind 42581 mhphf 42585 ismrc 42689 isnacs3 42698 mzpindd 42734 pellex 42823 monotoddzzfi 42931 lermxnn0 42939 rmyeq0 42942 rmyeq 42943 lermy 42944 jm2.27 42997 lsmfgcl 43063 fsumcnsrcl 43155 rngunsnply 43158 gsumws3 44185 mnringmulrcld 44217 nzin 44307 ofdivrec 44315 ofdivcan4 44316 chordthmALT 44922 wessf1ornlem 45179 projf1o 45191 ltdiv23neg 45390 fmulcl 45579 prproropf1olem2 47505 prproropf1olem4 47507 mgmplusgiopALT 48182 itsclc0xyqsolb 48759 toslat 48970 cicerALT 49035

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