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Theorem rgen 3053

Description: Generalization rule for restricted quantification. (Contributed by NM, 19-Nov-1994.)

**Hypothesis**
Ref	Expression
rgen.1	⊢ (𝑥 ∈ 𝐴 → 𝜑)

**Assertion**
Ref	Expression
rgen	⊢ ∀𝑥 ∈ 𝐴 𝜑

**Proof of Theorem rgen**
Step	Hyp	Ref	Expression
1		df-ral 3052	. 2 ⊢ (∀𝑥 ∈ 𝐴 𝜑 ↔ ∀𝑥(𝑥 ∈ 𝐴 → 𝜑))
2		rgen.1	. 2 ⊢ (𝑥 ∈ 𝐴 → 𝜑)
3	1, 2	mpgbir 1801	1 ⊢ ∀𝑥 ∈ 𝐴 𝜑

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∈ wcel 2114 ∀wral 3051

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

This theorem depends on definitions: df-bi 207 df-ral 3052

This theorem is referenced by: ralel 3054 rgenw 3055 mprg 3057 mprgbir 3058 nrex 3065 rgen2 3177 r19.21be 3230 rexlimi 3237 rgen2a 3333 sbcth2 3822 unimax 4887 reusv2lem4 5343 fnopab 6636 fmpti 7064 sorpssuni 7686 sorpssint 7687 onssmin 7746 tfis 7806 omssnlim 7832 finds 7847 finds2 7849 opabex3 7920 seqomlem2 8390 findcard3 9193 fifo 9345 fisupcl 9383 dfom3 9568 cantnfvalf 9586 frinsg 9675 rankf 9718 scottex 9809 cplem1 9813 harcard 9902 cardiun 9906 r0weon 9934 acnnum 9974 alephon 9991 alephsmo 10024 alephf1ALT 10025 alephfplem4 10029 dfac5lem4 10048 dfac5lem4OLD 10050 dfacacn 10064 kmlem1 10073 cflem 10167 cflemOLD 10168 cflecard 10175 cfsmolem 10192 fin23lem17 10260 hsmexlem4 10351 omina 10614 0tsk 10678 inar1 10698 wfgru 10739 reclem2pr 10971 nnssre 12178 nnsscn 12179 dfnn2 12187 dfnn3 12188 nnind 12192 nnsub 12221 dfuzi 12620 uzsupss 12890 cnref1o 12935 xrsupsslem 13259 xrinfmsslem 13260 xrsup0 13275 reltre 13293 rpltrp 13294 reltxrnmnf 13295 seqexw 13979 ser0f 14017 bccl 14284 hashkf 14294 hashbc 14415 wrdind 14684 01sqrexlem5 15208 sqrtf 15326 ackbijnn 15793 incexclem 15801 prodf1f 15857 eff2 16066 reeff1 16087 sqrt2irr 16216 prmind2 16654 3prm 16663 phisum 16761 pockthi 16878 infpn2 16884 prminf 16886 prmreclem2 16888 prmrec 16893 1arith 16898 1arith2 16899 vdwlem13 16964 ramz 16996 prmgap 17030 prmgaplcm 17031 prmgapprmo 17033 prmlem1a 17077 xpsff1o 17531 isacs1i 17623 dmaf 18016 cdaf 18017 coapm 18038 lublecllem 18324 chninf 18601 ex-chn1 18603 ex-chn2 18604 smndex1mnd 18881 pwmnd 18908 pmtrdifel 19455 pmtrdifwrdel 19460 odf 19512 efgrelexlemb 19725 dprd2da 20019 rngmgpf 20138 mgpf 20229 prdscrngd 20301 crhmsubc 20659 drhmsubc 20758 drngcat 20759 fldcat 20760 fldhmsubc 20762 cnfld1 21377 cnsubglem 21396 cnmsubglem 21410 nn0srg 21417 rge0srg 21418 pzriprnglem4 21464 pzriprnglem9 21469 pzriprnglem14 21474 pmatcoe1fsupp 22666 isbasis3g 22914 basdif0 22918 distop 22960 mretopd 23057 2ndcsep 23424 refref 23478 kqf 23712 fbssfi 23802 filconn 23848 prdstmdd 24089 ustfilxp 24178 prdsxmslem2 24494 qdensere 24734 recld2 24780 isclmi0 25065 iscvsi 25096 ovolf 25449 dyadmax 25565 dveflem 25946 mdegxrf 26033 fta1 26274 vieta1 26278 aalioulem2 26299 taylfval 26324 pilem2 26417 pilem3 26418 recosf1o 26499 divlogrlim 26599 logcn 26611 ressatans 26898 leibpi 26906 ftalem3 27038 chtub 27175 2sqlem6 27386 2sqlem10 27391 2sqreulem4 27417 chtppilim 27438 pntpbnd1 27549 pntlem3 27572 padicabvf 27594 bdayfo 27641 nodense 27656 oldf 27829 cutsfo 27897 addsfo 27975 negsf 28044 negsfo 28045 subsfo 28057 oniso 28263 dfn0s2 28324 n0subs 28355 bdayn0sf1o 28362 dfnns2 28364 zsoring 28401 bdaypw2n0bndlem 28455 bdayfinbndlem2 28460 z12zsodd 28474 axcontlem2 29034 nbgrnself 29428 vtxdginducedm1 29612 isgrpoi 30569 isvciOLD 30651 cnidOLD 30653 isnvi 30684 ipasslem8 30908 hilid 31232 hlimf 31308 shsspwh 31317 pjrni 31773 pjmf1 31787 df0op2 31823 dfiop2 31824 hoaddcomi 31843 hoaddassi 31847 hocadddiri 31850 hocsubdiri 31851 hoaddridi 31857 ho0coi 31859 hoid1i 31860 hoid1ri 31861 honegsubi 31867 hoddii 32060 lnopunilem2 32082 elunop2 32084 lnophm 32090 imaelshi 32129 cnlnadjlem8 32145 pjnmopi 32219 pjsdii 32226 pjddii 32227 pjtoi 32250 chirred 32466 nnindf 32893 nn0min 32894 wrdt2ind 33013 zringfrac 33614 ccfldsrarelvec 33815 constrconj 33889 2sqr3minply 33924 cos9thpiminply 33932 esum2d 34237 dmvlsiga 34273 volmeas 34375 ddemeas 34380 sxbrsigalem3 34416 coinfliprv 34627 ballotlem7 34680 signsw0glem 34697 rpsqrtcn 34737 tgoldbachgt 34807 bnj580 35055 bnj1384 35174 bnj1497 35202 fineqvnttrclse 35268 onvf1odlem1 35285 kur14lem9 35396 sat1el2xp 35561 msrf 35724 dfon2lem7 35969 fobigcup 36080 nn0prpwlem 36504 topmeet 36546 onsucsuccmpi 36625 dfttc4lem2 36711 taupilemrplb 37634 relowlssretop 37679 ptrecube 37941 poimirlem27 37968 heicant 37976 mblfinlem1 37978 volsupnfl 37986 dvtan 37991 itg2addnc 37995 indexa 38054 sstotbnd2 38095 heiborlem7 38138 disjimeceqim 39125 atpsubN 40199 idldil 40560 cdleme50ldil 40994 mzpclall 43159 dgraaf 43575 arearect 43643 areaquad 43644 onintunirab 43655 onsupuni 43657 infordmin 43959 omiscard 43970 clsk1indlem2 44469 clsk1indlem4 44471 mnuunid 44704 mnurndlem1 44708 prmunb2 44738 radcnvrat 44741 trwf 45386 rankrelp 45387 wfac8prim 45429 unirnmapsn 45643 ssmapsn 45645 upbdrech 45738 supminfxr 45892 supminfxr2 45897 supminfxrrnmpt 45899 rexanuz2nf 45920 fsumiunss 46005 resincncf 46303 dmvolss 46413 volioof 46415 stoweidlem57 46485 wallispilem3 46495 stirlinglem13 46514 dirkertrigeqlem3 46528 fourierdlem62 46596 salexct 46762 salexct3 46770 salgencntex 46771 salgensscntex 46772 gsumge0cl 46799 0ome 46957 icoresmbl 46971 hoidmv1le 47022 smflimlem1 47199 smfpimbor1lem2 47227 smfliminflem 47258 natlocalincr 47306 sinnpoly 47339 ralndv1 47553 fmtno4prm 48038 31prm 48060 tgoldbach 48293 gpg5grlim 48569 gpg5grlic 48570 nn0mnd 48655 2zlidl 48716 2zrngagrp 48725 2zrngnmlid 48731 crhmsubcALTV 48803 drhmsubcALTV 48805 drngcatALTV 48806 fldcatALTV 48807 fldhmsubcALTV 48809 zlmodzxznm 48973 ldepsnlinc 48984 nn0sumshdiglem2 49098 itcovalpclem1 49146 itcovalt2lem1 49151 rrx2xpref1o 49194 slotresfo 49374 basresposfo 49453 oppff1 49623 setc2othin 49941 setcsnterm 49965 onsetrec 50183

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