reximdva - Metamath Proof Explorer

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Theorem reximdva 3161

Description: Deduction quantifying both antecedent and consequent, based on Theorem 19.22 of [Margaris] p. 90. (Contributed by NM, 22-May-1999.)

**Hypothesis**
Ref	Expression
ralimdva.1	⊢ ((𝜑 ∧ 𝑥 ∈ 𝐴) → (𝜓 → 𝜒))

**Assertion**
Ref	Expression
reximdva	⊢ (𝜑 → (∃𝑥 ∈ 𝐴 𝜓 → ∃𝑥 ∈ 𝐴 𝜒))

Distinct variable group: 𝜑,𝑥 Allowed substitution hints: 𝜓(𝑥) 𝜒(𝑥) 𝐴(𝑥)

**Proof of Theorem reximdva**
Step	Hyp	Ref	Expression
1		ralimdva.1	. . 3 ⊢ ((𝜑 ∧ 𝑥 ∈ 𝐴) → (𝜓 → 𝜒))
2	1	ex 413	. 2 ⊢ (𝜑 → (𝑥 ∈ 𝐴 → (𝜓 → 𝜒)))
3	2	reximdvai 3158	1 ⊢ (𝜑 → (∃𝑥 ∈ 𝐴 𝜓 → ∃𝑥 ∈ 𝐴 𝜒))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∧ wa 396 ∈ wcel 2106 ∃wrex 3069

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1797 ax-4 1811 ax-5 1913

This theorem depends on definitions: df-bi 206 df-an 397 df-ex 1782 df-rex 3070

This theorem is referenced by: reximddv 3164 reximdvva 3198 reximddv2 3202 wereu2 5635 frpomin 6299 dffo4 7058 nnaordex 8590 frfi 9239 fisupg 9242 marypha1 9379 fiinfg 9444 wemapsolem 9495 unwdomg 9529 rankr1ai 9743 cofsmo 10214 cfcoflem 10217 inar1 10720 nqerf 10875 prlem936 10992 fimaxre 12108 fiminre 12111 arch 12419 bndndx 12421 suprfinzcl 12626 zmin 12878 elpq 12909 qbtwnxr 13129 qsqueeze 13130 qextltlem 13131 xrsupsslem 13236 xrinfmsslem 13237 xrub 13241 supxrunb1 13248 ssnn0fi 13900 fsuppmapnn0fiub0 13908 fsuppmapnn0fz 13911 expnlbnd2 14147 r19.29uz 15247 cau3lem 15251 rlim2lt 15391 rlimclim 15440 2clim 15466 o1co 15480 climcn1 15486 climcn2 15487 rlimo1 15511 climsqz 15535 climsqz2 15536 rlimsqzlem 15545 lo1le 15548 climsup 15566 climcau 15567 caucvgrlem2 15571 iseralt 15581 cvgcmp 15712 cvgcmpce 15714 supcvg 15752 rpnnen2lem12 16118 bezoutlem1 16431 divgcdcoprmex 16553 exprmfct 16591 prmdvdsfz 16592 prmdvdsncoprmbd 16613 pclem 16721 pc2dvds 16762 pcprmpw 16766 dvdsprmpweqle 16769 unbenlem 16791 infpnlem2 16794 infpn2 16796 prmunb 16797 vdwlem2 16865 ramub1lem2 16910 prmdvdsprmop 16926 prmgaplem7 16940 ipodrsima 18444 smndex1mgm 18731 grpinveu 18799 dfgrp3lem 18859 psgneu 19302 odbezout 19354 sylow2blem3 19418 nn0gsumfz 19775 irredrmul 20152 lbsextlem2 20679 znunit 21007 mptcoe1fsupp 21623 scmate 21896 scmatscm 21899 scmatfo 21916 mat1scmat 21925 pmatcoe1fsupp 22087 pmatcollpwfi 22168 pmatcollpw3fi 22171 mptcoe1matfsupp 22188 pm2mp 22211 chmaidscmat 22234 cpmadumatpoly 22269 chcoeffeq 22272 cayhamlem3 22273 cayhamlem4 22274 neiptopnei 22520 neitr 22568 cnpnei 22652 haust1 22740 isnrm3 22747 isreg2 22765 tgcmp 22789 hauscmplem 22794 hauscmp 22795 bwth 22798 1stcfb 22833 1stcelcls 22849 lly1stc 22884 txcmplem1 23029 txlm 23036 xkococnlem 23047 filuni 23273 filufint 23308 ufilen 23318 fclscf 23413 cnextcn 23455 ustex2sym 23605 ustex3sym 23606 utopreg 23641 isucn2 23668 ucnima 23670 ucncn 23674 neipcfilu 23685 metequiv2 23903 metrest 23917 xrsmopn 24212 mulc1cncf 24305 cncfco 24307 bndth 24358 lmmcvg 24662 cfil3i 24670 iscau4 24680 cmetcaulem 24689 iscmet3lem1 24692 caussi 24698 equivcfil 24700 equivcau 24701 caubl 24709 minveclem3b 24829 ovolgelb 24881 ovollb2lem 24889 ovolctb 24891 ovolicc2lem4 24921 ioombl1lem4 24962 dyadmax 24999 volsup2 25006 itg2monolem1 25152 c1liplem1 25397 c1lip1 25398 dvivthlem1 25409 lhop1 25415 ftc1a 25438 ftc1lem6 25442 ply1divex 25538 elply2 25594 dgrlem 25627 aacjcl 25724 aalioulem2 25730 aalioulem3 25731 aalioulem4 25732 ulmcaulem 25790 ulmcau 25791 ulmss 25793 mtest 25800 itgulm 25804 reeff1o 25843 efif1olem4 25938 rlimcnp 26352 xrlimcnp 26355 lgamucov 26424 ftalem3 26461 fta 26466 muval1 26519 dvdssqf 26524 mumullem1 26565 lgsqrmod 26737 lgsqrmodndvds 26738 pntlem3 26994 ostth 27024 nosupno 27088 nosupbnd1lem4 27096 noinfno 27103 noinfbnd1lem4 27111 conway 27181 etasslt 27195 tgtrisegint 27504 tgbtwndiff 27511 tgcgrxfr 27523 lnext 27572 legov2 27591 legtrd 27594 hlcgrex 27621 colperpexlem3 27737 colperpex 27738 hlpasch 27761 hpgerlem 27770 hpgtr 27773 dfcgra2 27835 acopy 27838 inagswap 27846 inaghl 27850 cgrg3col4 27858 axpasch 27953 wwlksnredwwlkn0 28904 midwwlks2s3 28960 clwwlkn1loopb 29050 2pthfrgrrn2 29290 frgrwopreg1 29325 frgrwopreg2 29326 grpoidinvlem3 29511 grpoideu 29514 grpoinveu 29524 ubthlem1 29875 minvecolem5 29886 htthlem 29922 chscllem2 30643 nmopun 31019 lnconi 31038 rnbra 31112 sumdmdii 31420 cdj3lem2b 31442 foresf1o 31495 acunirnmpt 31642 xrofsup 31740 fprodex01 31791 isarchi3 32093 isarchiofld 32183 evls1fpws 32348 lmxrge0 32622 lmdvg 32623 esumlub 32748 esumfsup 32758 esumcvg 32774 ftc2re 33300 cusgr3cyclex 33817 cvmliftmolem2 33963 cvmlift2lem12 33995 satfv1 34044 satffunlem1lem2 34084 satffunlem2lem2 34087 satfv0fvfmla0 34094 wzel 34485 wsuclem 34486 btwndiff 34688 trisegint 34689 cgrxfr 34716 lineext 34737 segcon2 34766 brsegle2 34770 seglecgr12im 34771 segletr 34775 broutsideof3 34787 opnrebl2 34869 nn0prpw 34871 fin2so 36138 poimirlem27 36178 poimirlem30 36181 poimirlem31 36182 poimir 36184 mblfinlem1 36188 mblfinlem2 36189 mblfinlem3 36190 mblfinlem4 36191 itg2addnclem 36202 ftc1cnnc 36223 ftc1anclem5 36228 sdclem1 36275 geomcau 36291 equivtotbnd 36310 bndss 36318 ismtybndlem 36338 heibor1lem 36341 rrncmslem 36364 rngo2 36439 prtlem15 37410 lsateln0 37530 lsat0cv 37568 eqlkr3 37636 lkrshp 37640 lshpset2N 37654 hlhgt2 37925 hlrelat2 37939 atle 37972 athgt 37992 2dim 38006 1cvratex 38009 ps-2 38014 dalem20 38229 lhpexle1lem 38543 lhpexle1 38544 lhpexle2lem 38545 lhpmcvr5N 38563 lhpmcvr6N 38564 cdleme25a 38889 cdleme29ex 38910 cdlemfnid 39100 cdlemg33b0 39237 cdlemg33a 39242 cdlemg35 39249 cdleml3N 39514 dihlsscpre 39770 dih1dimb2 39777 dihatexv 39874 dvh3dim2 39984 dochkr1 40014 dochkr1OLDN 40015 lcfl8 40038 lcfl8b 40040 lcfrlem5 40082 lcfrlem6 40083 mapdrvallem2 40181 mapdh9a 40325 mapdh9aOLDN 40326 hdmaprnlem3eN 40394 hdmaprnlem16N 40398 flt4lem5elem 41047 flt4lem7 41055 nna4b4nsq 41056 fphpdo 41198 rencldnfilem 41201 irrapxlem2 41204 oasubex 41679 tfsconcatlem 41729 tfsconcatrev 41741 cvgdvgrat 42715 expgrowth 42737 projf1o 43539 ssfiunibd 43664 supxrgere 43688 supxrgelem 43692 suplesup 43694 infrpge 43706 infleinf 43727 supxrunb3 43754 unb2ltle 43770 uzub 43786 cvgcaule 43847 qinioo 43893 qelioo 43904 climinf 43967 mullimc 43977 islptre 43980 limccog 43981 mullimcf 43984 limcrecl 43990 sumnnodd 43991 neglimc 44008 0ellimcdiv 44010 limclner 44012 allbutfifvre 44036 climleltrp 44037 fnlimabslt 44040 climinf2lem 44067 limsuppnflem 44071 limsupvaluz2 44099 supcnvlimsup 44101 limsupgtlem 44138 liminflelimsupuz 44146 liminflimsupclim 44168 limsupub2 44173 xlimpnfxnegmnf 44175 cncfioobd 44258 stoweidlem7 44368 stoweidlem27 44388 stoweidlem39 44400 stoweidlem48 44409 stoweidlem49 44410 stoweidlem60 44421 stoweidlem61 44422 stoweid 44424 dirkercncflem2 44465 fourierdlem20 44488 fourierdlem39 44507 fourierdlem41 44509 fourierdlem48 44515 fourierdlem49 44516 fourierdlem50 44517 fourierdlem64 44531 fourierdlem73 44540 fourierdlem74 44541 fourierdlem75 44542 fourierdlem87 44554 fourierdlem103 44570 fourierdlem104 44571 qndenserrnopnlem 44658 sge0ltfirp 44761 sge0gerpmpt 44763 sge0ltfirpmpt2 44787 sge0isum 44788 sge0pnffigtmpt 44801 sge0pnffsumgt 44803 sge0gtfsumgt 44804 sge0uzfsumgt 44805 nnfoctbdjlem 44816 meaiuninclem 44841 meaiuninc3v 44845 omeiunltfirp 44880 carageniuncllem2 44883 hoicvr 44909 volicorescl 44914 hoidmv1le 44955 hoidmvlelem3 44958 hoiqssbllem3 44985 hspmbllem2 44988 iunhoiioolem 45036 vonioo 45043 vonicc 45046 smfaddlem1 45124 smflimlem2 45133 smflimlem3 45134 smfmullem4 45155 fsetsnfo 45407 2reu8i 45465 imasetpreimafvbijlemfo 45717 2pwp1prmfmtno 45902 proththd 45926 sbgoldbwt 46089 sbgoldbst 46090 sbgoldbalt 46093 bgoldbtbndlem4 46120 bgoldbtbnd 46121 zrninitoringc 46489 ply1mulgsumlem3 46589 ply1mulgsumlem4 46590 islindeps2 46684 isldepslvec2 46686

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