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Theorem rgen 3056

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 3055	. 2 ⊢ (∀𝑥 ∈ 𝐴 𝜑 ↔ ∀𝑥(𝑥 ∈ 𝐴 → 𝜑))
2		rgen.1	. 2 ⊢ (𝑥 ∈ 𝐴 → 𝜑)
3	1, 2	mpgbir 1806	1 ⊢ ∀𝑥 ∈ 𝐴 𝜑

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∈ wcel 2119 ∀wral 3054

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1802

This theorem depends on definitions: df-bi 208 df-ral 3055

This theorem is referenced by: ralel 3057 rgenw 3058 mprg 3060 mprgbir 3061 nrex 3068 rgen2 3180 r19.21be 3233 rexlimi 3240 rgen2a 3336 sbcth2 3823 unimax 4882 reusv2lem4 5337 fnopab 6630 fmpti 7060 sorpssuni 7682 sorpssint 7683 onssmin 7742 tfis 7802 omssnlim 7828 finds 7843 finds2 7845 opabex3 7916 seqomlem2 8387 findcard3 9190 fifo 9342 fisupcl 9380 dfom3 9566 cantnfvalf 9584 frinsg 9673 rankf 9716 scottex 9807 cplem1 9811 harcard 9900 cardiun 9904 r0weon 9932 acnnum 9972 alephon 9989 alephsmo 10022 alephf1ALT 10023 alephfplem4 10027 dfac5lem4 10046 dfac5lem4OLD 10048 dfacacn 10062 kmlem1 10071 cflem 10165 cflemOLD 10166 cflecard 10173 cfsmolem 10190 fin23lem17 10258 hsmexlem4 10349 omina 10612 0tsk 10676 inar1 10696 wfgru 10737 reclem2pr 10969 nnssre 12176 nnsscn 12177 dfnn2 12185 dfnn3 12186 nnind 12190 nnsub 12219 dfuzi 12618 uzsupss 12888 cnref1o 12933 xrsupsslem 13257 xrinfmsslem 13258 xrsup0 13273 reltre 13291 rpltrp 13292 reltxrnmnf 13293 seqexw 13977 ser0f 14015 bccl 14282 hashkf 14292 hashbc 14413 wrdind 14682 01sqrexlem5 15206 sqrtf 15324 ackbijnn 15791 incexclem 15799 prodf1f 15855 eff2 16064 reeff1 16085 sqrt2irr 16214 prmind2 16652 3prm 16661 phisum 16759 pockthi 16876 infpn2 16882 prminf 16884 prmreclem2 16886 prmrec 16891 1arith 16896 1arith2 16897 vdwlem13 16962 ramz 16994 prmgap 17028 prmgaplcm 17029 prmgapprmo 17031 prmlem1a 17075 xpsff1o 17529 isacs1i 17621 dmaf 18014 cdaf 18015 coapm 18036 lublecllem 18322 chninf 18599 ex-chn1 18601 ex-chn2 18602 smndex1mnd 18879 pwmnd 18906 pmtrdifel 19453 pmtrdifwrdel 19458 odf 19510 efgrelexlemb 19723 dprd2da 20017 rngmgpf 20136 mgpf 20227 prdscrngd 20299 crhmsubc 20661 drhmsubc 20760 drngcat 20761 fldcat 20762 fldhmsubc 20764 cnfld1 21379 cnsubglem 21398 cnmsubglem 21412 nn0srg 21419 rge0srg 21420 pzriprnglem4 21466 pzriprnglem9 21471 pzriprnglem14 21476 pmatcoe1fsupp 22691 isbasis3g 22939 basdif0 22943 distop 22985 mretopd 23082 2ndcsep 23449 refref 23503 kqf 23737 fbssfi 23827 filconn 23873 prdstmdd 24114 ustfilxp 24203 prdsxmslem2 24519 qdensere 24759 recld2 24805 isclmi0 25090 iscvsi 25121 ovolf 25474 dyadmax 25590 dveflem 25971 mdegxrf 26058 fta1 26299 vieta1 26303 aalioulem2 26324 taylfval 26349 pilem2 26442 pilem3 26443 recosf1o 26524 divlogrlim 26624 logcn 26636 ressatans 26923 leibpi 26931 ftalem3 27063 chtub 27200 2sqlem6 27411 2sqlem10 27416 2sqreulem4 27442 chtppilim 27463 pntpbnd1 27574 pntlem3 27597 padicabvf 27619 bdayfo 27666 nodense 27681 oldf 27854 cutsfo 27922 addsfo 28000 negsf 28069 negsfo 28070 subsfo 28082 oniso 28288 dfn0s2 28349 n0subs 28380 bdayn0sf1o 28387 dfnns2 28389 zsoring 28426 bdaypw2n0bndlem 28480 bdayfinbndlem2 28485 z12zsodd 28499 axcontlem2 29059 nbgrnself 29453 vtxdginducedm1 29637 isgrpoi 30594 isvciOLD 30676 cnidOLD 30678 isnvi 30709 ipasslem8 30933 hilid 31257 hlimf 31333 shsspwh 31342 pjrni 31798 pjmf1 31812 df0op2 31848 dfiop2 31849 hoaddcomi 31868 hoaddassi 31872 hocadddiri 31875 hocsubdiri 31876 hoaddridi 31882 ho0coi 31884 hoid1i 31885 hoid1ri 31886 honegsubi 31892 hoddii 32085 lnopunilem2 32107 elunop2 32109 lnophm 32115 imaelshi 32154 cnlnadjlem8 32170 pjnmopi 32244 pjsdii 32251 pjddii 32252 pjtoi 32275 chirred 32491 nnindf 32919 nn0min 32920 wrdt2ind 33039 zringfrac 33644 ccfldsrarelvec 33862 constrconj 33936 2sqr3minply 33971 cos9thpiminply 33979 esum2d 34284 dmvlsiga 34320 volmeas 34422 ddemeas 34427 sxbrsigalem3 34463 coinfliprv 34674 ballotlem7 34727 signsw0glem 34744 rpsqrtcn 34784 tgoldbachgt 34854 bnj580 35102 bnj1384 35221 bnj1497 35249 fineqvnttrclse 35312 onvf1odlem1 35338 kur14lem9 35449 sat1el2xp 35614 msrf 35777 dfon2lem7 36022 fobigcup 36133 nn0prpwlem 36557 topmeet 36599 onsucsuccmpi 36678 dfttc4lem2 36764 taupilemrplb 37687 relowlssretop 37732 ptrecube 37994 poimirlem27 38021 heicant 38029 mblfinlem1 38031 volsupnfl 38039 dvtan 38044 itg2addnc 38048 indexa 38107 sstotbnd2 38148 heiborlem7 38191 disjimeceqim 39178 atpsubN 40252 idldil 40613 cdleme50ldil 41047 mzpclall 43183 dgraaf 43599 arearect 43667 areaquad 43668 onintunirab 43679 onsupuni 43681 infordmin 43983 omiscard 43994 clsk1indlem2 44493 clsk1indlem4 44495 mnuunid 44728 mnurndlem1 44732 prmunb2 44762 radcnvrat 44765 trwf 45410 rankrelp 45411 wfac8prim 45453 unirnmapsn 45666 ssmapsn 45668 upbdrech 45760 supminfxr 45914 supminfxr2 45919 supminfxrrnmpt 45921 rexanuz2nf 45942 fsumiunss 46027 resincncf 46325 dmvolss 46435 volioof 46437 stoweidlem57 46507 wallispilem3 46517 stirlinglem13 46536 dirkertrigeqlem3 46550 fourierdlem62 46618 salexct 46784 salexct3 46792 salgencntex 46793 salgensscntex 46794 gsumge0cl 46821 0ome 46979 icoresmbl 46993 hoidmv1le 47044 smflimlem1 47221 smfpimbor1lem2 47249 smfliminflem 47280 natlocalincr 47328 sinnpoly 47361 ralndv1 47575 fmtno4prm 48060 31prm 48082 tgoldbach 48315 gpg5grlim 48591 gpg5grlic 48592 nn0mnd 48677 2zlidl 48738 2zrngagrp 48747 2zrngnmlid 48753 crhmsubcALTV 48825 drhmsubcALTV 48827 drngcatALTV 48828 fldcatALTV 48829 fldhmsubcALTV 48831 zlmodzxznm 48995 ldepsnlinc 49006 nn0sumshdiglem2 49120 itcovalpclem1 49168 itcovalt2lem1 49173 rrx2xpref1o 49216 slotresfo 49396 basresposfo 49475 oppff1 49645 setc2othin 49963 setcsnterm 49987 onsetrec 50205

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