ne0d - Metamath Proof Explorer

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Theorem ne0d 4291

Description: Deduction form of ne0i 4290. 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 4290	. 2 ⊢ (𝐵 ∈ 𝐴 → 𝐴 ≠ ∅)
3	1, 2	syl 17	1 ⊢ (𝜑 → 𝐴 ≠ ∅)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∈ wcel 2113 ≠ wne 2929 ∅c0 4282

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 2115 ax-9 2123 ax-ext 2705

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 2712 df-cleq 2725 df-clel 2808 df-ne 2930 df-dif 3901 df-nul 4283

This theorem is referenced by: snnzg 4728 prnzg 4732 eqsnd 4783 exss 5408 isofrlem 7282 fvmpocurryd 8209 onnseq 8272 oeoalem 8519 oeoelem 8521 oeeui 8525 nnawordex 8560 omxpenlem 9000 frfi 9178 supgtoreq 9364 infltoreq 9397 cantnfp1lem2 9578 cantnfp1lem3 9579 oemapvali 9583 cantnflem1a 9584 cantnflem1d 9587 cantnflem1 9588 epfrs 9630 dfac9 10037 axdc3lem4 10353 intwun 10635 r1limwun 10636 gruina 10718 grur1a 10719 mulclpi 10793 indpi 10807 supsrlem 11011 axpre-sup 11069 supfirege 12118 uzn0 12757 suprzub 12841 fzn0 13442 flval3 13723 icopnfsup 13773 hashelne0d 14279 dfrtrcl2 14973 01sqrexlem3 15155 isercolllem2 15577 isercolllem3 15578 climsup 15581 mertenslem2 15796 gcdcllem1 16414 pclem 16754 prmreclem1 16832 4sqlem13 16873 vdwmc2 16895 vdwlem6 16902 vdwnnlem3 16913 prmgaplem3 16969 prmgaplem4 16970 mrcflem 17516 mrcval 17520 iscatd2 17591 chnub 18532 mndbn0 18662 grpbn0 18883 issubgrpd2 19059 issubg4 19062 subgint 19067 nmzsubg 19081 cycsubgcl 19122 ghmpreima 19154 gastacl 19225 sylow1lem5 19518 pgpssslw 19530 sylow2alem2 19534 sylow2blem3 19538 fislw 19541 sylow3lem4 19546 torsubg 19770 oddvdssubg 19771 iscygd 19803 iscygodd 19804 dprdsubg 19942 ablfac1eu 19991 simpgnideld 20017 submomnd 20048 01eq0ring 20449 cntzsubrng 20486 cntzsubr 20525 imadrhmcl 20716 primefld 20724 primefld0cl 20725 primefld1cl 20726 abvn0b 20755 suborng 20795 islss4 20899 lss1d 20900 lssintcl 20901 lspsolvlem 21083 lbsextlem1 21099 dflidl2rng 21159 lidlsubg 21164 rhmpreimaidl 21218 zringlpirlem1 21403 ocvlss 21613 lmiclbs 21778 lmisfree 21783 psrbas 21874 mplsubglem 21939 mplind 22008 mhpsubg 22071 mat1ric 22405 dmatsgrp 22417 scmatsgrp 22437 scmatsgrp1 22440 scmatlss 22443 scmatric 22455 cpmatsubgpmat 22638 matcpmric 22677 pmmpric 22741 clscld 22965 2ndcdisj 23374 dfac14lem 23535 opnfbas 23760 isfil2 23774 filn0 23780 filssufilg 23829 rnelfmlem 23870 flimfnfcls 23946 ptcmplem2 23971 clssubg 24027 tgpconncomp 24031 tsmsfbas 24046 ustfilxp 24131 ustne0 24132 xbln0 24332 bln0 24333 metustfbas 24475 metustbl 24484 nrgdomn 24589 icccmplem2 24742 icccmplem3 24743 reconnlem2 24746 phtpcer 24924 reparpht 24928 phtpcco2 24929 pcohtpy 24950 pcorevlem 24956 isclmp 25027 iscmet3lem2 25222 bcthlem4 25257 minveclem3b 25358 ivthlem2 25383 ivthlem3 25384 evthicc 25390 ovollb2 25420 ovolunlem1a 25427 ovolunlem1 25428 ovoliunlem1 25433 ovoliun2 25437 ioombl1lem4 25492 uniioombllem1 25512 uniioombllem2 25514 uniioombllem6 25519 mbfsup 25595 mbfinf 25596 mbflimsup 25597 itg2monolem1 25681 itg2mono 25684 ulm0 26330 pilem2 26392 pilem3 26393 ftalem3 27015 ftalem4 27016 ftalem5 27017 dchrabs 27201 pntlem3 27550 nocvxminlem 27720 tglnne0 28621 axlowdim1 28941 nvo00 30745 nmorepnf 30752 minvecolem1 30858 wrdpmtrlast 33071 cycpmco2lem5 33108 elrgspnlem1 33218 primefldchr 33276 fldgensdrg 33289 nsgqusf1olem1 33387 intlidl 33394 idlinsubrg 33405 rhmimaidl 33406 ssdifidl 33431 ssdifidlprm 33432 ssmxidl 33448 pidufd 33517 1arithufdlem1 33518 ply1dg1rtn0 33553 ply1degltlss 33566 exsslsb 33632 constrsdrg 33811 ordtconnlem1 33960 rrhre 34057 sigagenval 34176 oddpwdc 34390 bnj1177 35041 bnj1523 35106 rankfilimbi 35135 erdszelem8 35265 txsconnlem 35307 cvxsconn 35310 cvmsss2 35341 cvmliftmolem2 35349 cvmlift2lem12 35381 cvmliftpht 35385 finminlem 36385 onint1 36516 weiunlem2 36530 weiunfr 36534 finxpreclem4 37461 heicant 37718 itg2addnc 37737 ftc1anclem7 37762 ftc1anc 37764 prdsbnd2 37858 lkrlss 39217 pclvalN 40012 dian0 41161 docaclN 41246 dicn0 41314 dihglblem5 41420 dihglb2 41464 doch2val2 41486 dochocss 41488 lclkr 41655 lclkrs 41661 lcfr 41707 aks6d1c6lem3 42288 unitscyglem2 42312 qsalrel 42361 nacsfix 42832 mzpcln0 42848 rencldnfilem 42940 fnwe2lem2 43171 kelac1 43183 harn0 43222 hbtlem2 43244 naddwordnexlem4 43521 omltoe 43527 gneispa 44250 imo72b2lem0 44285 scottrankd 44368 relpfrlem 45073 ubelsupr 45144 suprnmpt 45298 disjinfi 45316 suprubrnmpt2 45376 suprubrnmpt 45377 ssfiunibd 45437 allbutfi 45518 allbutfiinf 45545 uzn0d 45550 uzublem 45555 climinf 45733 limclr 45780 climinf2lem 45831 limsupubuzlem 45837 liminflelimsupuz 45910 cnrefiisplem 45954 ioodvbdlimc1lem1 46056 ioodvbdlimc1 46058 ioodvbdlimc2 46060 stoweidlem36 46161 fourierdlem20 46252 fourierdlem25 46257 fourierdlem31 46263 fourierdlem37 46269 fourierdlem46 46277 fourierdlem52 46283 fourierdlem54 46285 fouriercn 46357 elaa2lem 46358 salgenval 46446 salgenn0 46456 sge0isum 46552 sge0reuzb 46573 ovnlerp 46687 ovnf 46688 hsphoidmvle2 46710 hsphoidmvle 46711 hoiprodp1 46713 hoidmv1lelem1 46716 hoidmv1lelem3 46718 hoidmv1le 46719 hoidifhspdmvle 46745 hspmbllem1 46751 hspmbllem3 46753 ovnovollem2 46782 smflimlem1 46896 smfsuplem1 46936 smfsuplem3 46938 smflimsuplem5 46949 smflimsuplem7 46951 preimafvn0 47507 lincolss 48562 fvconstr2 48991 catprs 49139 discsubc 49192 iinfconstbas 49194 eloppf 49261 eloppf2 49262 oppcup3 49337 oppcthinendcALT 49569 termcterm3 49643 termcciso 49644 idfudiag1bas 49652 idfudiag1 49653

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