ne0d - Metamath Proof Explorer

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Theorem ne0d 4292

Description: Deduction form of ne0i 4291. If a class has elements, then it is nonempty. (Contributed by Glauco Siliprandi, 23-Oct-2021.)

**Hypothesis**
Ref	Expression
ne0d.1	⊢ (𝜑 → 𝐵 ∈ 𝐴)

**Assertion**
Ref	Expression
ne0d	⊢ (𝜑 → 𝐴 ≠ ∅)

**Proof of Theorem ne0d**
Step	Hyp	Ref	Expression
1		ne0d.1	. 2 ⊢ (𝜑 → 𝐵 ∈ 𝐴)
2		ne0i 4291	. 2 ⊢ (𝐵 ∈ 𝐴 → 𝐴 ≠ ∅)
3	1, 2	syl 17	1 ⊢ (𝜑 → 𝐴 ≠ ∅)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∈ wcel 2111 ≠ wne 2928 ∅c0 4283

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1796 ax-4 1810 ax-5 1911 ax-6 1968 ax-7 2009 ax-8 2113 ax-9 2121 ax-ext 2703

This theorem depends on definitions: df-bi 207 df-an 396 df-tru 1544 df-fal 1554 df-ex 1781 df-sb 2068 df-clab 2710 df-cleq 2723 df-clel 2806 df-ne 2929 df-dif 3905 df-nul 4284

This theorem is referenced by: snnzg 4727 prnzg 4731 eqsnd 4782 exss 5403 isofrlem 7274 fvmpocurryd 8201 onnseq 8264 oeoalem 8511 oeoelem 8513 oeeui 8517 nnawordex 8552 omxpenlem 8991 frfi 9169 supgtoreq 9355 infltoreq 9388 cantnfp1lem2 9569 cantnfp1lem3 9570 oemapvali 9574 cantnflem1a 9575 cantnflem1d 9578 cantnflem1 9579 epfrs 9621 dfac9 10028 axdc3lem4 10344 intwun 10626 r1limwun 10627 gruina 10709 grur1a 10710 mulclpi 10784 indpi 10798 supsrlem 11002 axpre-sup 11060 supfirege 12109 uzn0 12749 suprzub 12837 fzn0 13438 flval3 13719 icopnfsup 13769 hashelne0d 14275 dfrtrcl2 14969 01sqrexlem3 15151 isercolllem2 15573 isercolllem3 15574 climsup 15577 mertenslem2 15792 gcdcllem1 16410 pclem 16750 prmreclem1 16828 4sqlem13 16869 vdwmc2 16891 vdwlem6 16898 vdwnnlem3 16909 prmgaplem3 16965 prmgaplem4 16966 mrcflem 17512 mrcval 17516 iscatd2 17587 chnub 18528 mndbn0 18658 grpbn0 18879 issubgrpd2 19055 issubg4 19058 subgint 19063 nmzsubg 19078 cycsubgcl 19119 ghmpreima 19151 gastacl 19222 sylow1lem5 19515 pgpssslw 19527 sylow2alem2 19531 sylow2blem3 19535 fislw 19538 sylow3lem4 19543 torsubg 19767 oddvdssubg 19768 iscygd 19800 iscygodd 19801 dprdsubg 19939 ablfac1eu 19988 simpgnideld 20014 submomnd 20045 01eq0ring 20446 cntzsubrng 20483 cntzsubr 20522 imadrhmcl 20713 primefld 20721 primefld0cl 20722 primefld1cl 20723 abvn0b 20752 suborng 20792 islss4 20896 lss1d 20897 lssintcl 20898 lspsolvlem 21080 lbsextlem1 21096 dflidl2rng 21156 lidlsubg 21161 rhmpreimaidl 21215 zringlpirlem1 21400 ocvlss 21610 lmiclbs 21775 lmisfree 21780 psrbas 21871 mplsubglem 21937 mplind 22006 mhpsubg 22069 mat1ric 22403 dmatsgrp 22415 scmatsgrp 22435 scmatsgrp1 22438 scmatlss 22441 scmatric 22453 cpmatsubgpmat 22636 matcpmric 22675 pmmpric 22739 clscld 22963 2ndcdisj 23372 dfac14lem 23533 opnfbas 23758 isfil2 23772 filn0 23778 filssufilg 23827 rnelfmlem 23868 flimfnfcls 23944 ptcmplem2 23969 clssubg 24025 tgpconncomp 24029 tsmsfbas 24044 ustfilxp 24129 ustne0 24130 xbln0 24330 bln0 24331 metustfbas 24473 metustbl 24482 nrgdomn 24587 icccmplem2 24740 icccmplem3 24741 reconnlem2 24744 phtpcer 24922 reparpht 24926 phtpcco2 24927 pcohtpy 24948 pcorevlem 24954 isclmp 25025 iscmet3lem2 25220 bcthlem4 25255 minveclem3b 25356 ivthlem2 25381 ivthlem3 25382 evthicc 25388 ovollb2 25418 ovolunlem1a 25425 ovolunlem1 25426 ovoliunlem1 25431 ovoliun2 25435 ioombl1lem4 25490 uniioombllem1 25510 uniioombllem2 25512 uniioombllem6 25517 mbfsup 25593 mbfinf 25594 mbflimsup 25595 itg2monolem1 25679 itg2mono 25682 ulm0 26328 pilem2 26390 pilem3 26391 ftalem3 27013 ftalem4 27014 ftalem5 27015 dchrabs 27199 pntlem3 27548 nocvxminlem 27718 tglnne0 28619 axlowdim1 28938 nvo00 30739 nmorepnf 30746 minvecolem1 30852 wrdpmtrlast 33060 cycpmco2lem5 33097 elrgspnlem1 33207 primefldchr 33265 fldgensdrg 33278 nsgqusf1olem1 33376 intlidl 33383 idlinsubrg 33394 rhmimaidl 33395 ssdifidl 33420 ssdifidlprm 33421 ssmxidl 33437 pidufd 33506 1arithufdlem1 33507 ply1dg1rtn0 33542 ply1degltlss 33555 exsslsb 33607 constrsdrg 33786 ordtconnlem1 33935 rrhre 34032 sigagenval 34151 oddpwdc 34365 bnj1177 35016 bnj1523 35081 rankfilimbi 35110 erdszelem8 35240 txsconnlem 35282 cvxsconn 35285 cvmsss2 35316 cvmliftmolem2 35324 cvmlift2lem12 35356 cvmliftpht 35360 finminlem 36358 onint1 36489 weiunlem2 36503 weiunfr 36507 finxpreclem4 37434 heicant 37701 itg2addnc 37720 ftc1anclem7 37745 ftc1anc 37747 prdsbnd2 37841 lkrlss 39140 pclvalN 39935 dian0 41084 docaclN 41169 dicn0 41237 dihglblem5 41343 dihglb2 41387 doch2val2 41409 dochocss 41411 lclkr 41578 lclkrs 41584 lcfr 41630 aks6d1c6lem3 42211 unitscyglem2 42235 qsalrel 42279 nacsfix 42751 mzpcln0 42767 rencldnfilem 42859 fnwe2lem2 43090 kelac1 43102 harn0 43141 hbtlem2 43163 naddwordnexlem4 43440 omltoe 43446 gneispa 44169 imo72b2lem0 44204 scottrankd 44287 relpfrlem 44992 ubelsupr 45063 suprnmpt 45217 disjinfi 45235 suprubrnmpt2 45295 suprubrnmpt 45296 ssfiunibd 45356 allbutfi 45437 allbutfiinf 45464 uzn0d 45469 uzublem 45474 climinf 45652 limclr 45699 climinf2lem 45750 limsupubuzlem 45756 liminflelimsupuz 45829 cnrefiisplem 45873 ioodvbdlimc1lem1 45975 ioodvbdlimc1 45977 ioodvbdlimc2 45979 stoweidlem36 46080 fourierdlem20 46171 fourierdlem25 46176 fourierdlem31 46182 fourierdlem37 46188 fourierdlem46 46196 fourierdlem52 46202 fourierdlem54 46204 fouriercn 46276 elaa2lem 46277 salgenval 46365 salgenn0 46375 sge0isum 46471 sge0reuzb 46492 ovnlerp 46606 ovnf 46607 hsphoidmvle2 46629 hsphoidmvle 46630 hoiprodp1 46632 hoidmv1lelem1 46635 hoidmv1lelem3 46637 hoidmv1le 46638 hoidifhspdmvle 46664 hspmbllem1 46670 hspmbllem3 46672 ovnovollem2 46701 smflimlem1 46815 smfsuplem1 46855 smfsuplem3 46857 smflimsuplem5 46868 smflimsuplem7 46870 preimafvn0 47417 lincolss 48472 fvconstr2 48901 catprs 49049 discsubc 49102 iinfconstbas 49104 eloppf 49171 eloppf2 49172 oppcup3 49247 oppcthinendcALT 49479 termcterm3 49553 termcciso 49554 idfudiag1bas 49562 idfudiag1 49563

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