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Theorem ralrimi 2957

Description: Inference from Theorem 19.21 of [Margaris] p. 90 (restricted quantifier version). (Contributed by NM, 10-Oct-1999.) Shortened after introduction of hbralrimi 2954. (Revised by Wolf Lammen, 4-Dec-2019.)

**Hypotheses**
Ref	Expression
ralrimi.1	⊢ Ⅎ𝑥𝜑
ralrimi.2	⊢ (𝜑 → (𝑥 ∈ 𝐴 → 𝜓))

**Assertion**
Ref	Expression
ralrimi	⊢ (𝜑 → ∀𝑥 ∈ 𝐴 𝜓)

**Proof of Theorem ralrimi**
Step	Hyp	Ref	Expression
1		ralrimi.1	. . 3 ⊢ Ⅎ𝑥𝜑
2	1	nf5ri 2065	. 2 ⊢ (𝜑 → ∀𝑥𝜑)
3		ralrimi.2	. 2 ⊢ (𝜑 → (𝑥 ∈ 𝐴 → 𝜓))
4	2, 3	hbralrimi 2954	1 ⊢ (𝜑 → ∀𝑥 ∈ 𝐴 𝜓)

Colors of variables: wff setvar class

Syntax hints: → wi 4 Ⅎwnf 1708 ∈ wcel 1990 ∀wral 2912

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1722 ax-4 1737 ax-5 1839 ax-6 1888 ax-7 1935 ax-12 2047

This theorem depends on definitions: df-bi 197 df-ex 1705 df-nf 1710 df-ral 2917

This theorem is referenced by: ralimdaa 2958 reximdai 3012 rexlimd2 3025 r19.12 3063 r19.37 3086 ralcom2 3104 2rmorex 3412 iineq2d 4541 disjxiun 4649 disjxiunOLD 4650 mpteq2da 4743 mpteqb 6299 fmptdf 6387 eusvobj2 6643 offval2f 6909 zfrep6 7134 wfrlem4 7418 tfr3 7495 tz7.49 7540 mapxpen 8126 dfac2 8953 hsmexlem4 9251 axcc3 9260 domtriomlem 9264 axdc3lem2 9273 axdc3lem4 9275 axdc4lem 9277 ac6num 9301 dedekind 10200 dedekindle 10201 fsuppmapnn0fiublem 12789 fsuppmapnn0fiub 12790 fsuppmapnn0fiubOLD 12791 fprodcllemf 14688 lcmfunsnlem1 15350 lcmfunsnlem2lem1 15351 lcmfunsnlem2 15353 mreexexd 16308 mreexexdOLD 16309 cpmatmcllem 20523 ptcnplem 21424 xkocnv 21617 cfilucfil 22364 itg2splitlem 23515 itg2split 23516 itgeq1f 23538 mptelee 25775 lfgrnloop 26020 foresf1o 29343 funimass4f 29437 fcomptf 29458 aciunf1lem 29462 funcnvmptOLD 29467 funcnvmpt 29468 isarchiofld 29817 reff 29906 locfinreflem 29907 prodindf 30085 esumeq12dvaf 30093 esumgsum 30107 esumel 30109 esumf1o 30112 esumc 30113 esummono 30116 gsumesum 30121 esumlub 30122 esumlef 30124 esumfsup 30132 esumpinfval 30135 esumpinfsum 30139 esum2d 30155 ldsysgenld 30223 sigapildsyslem 30224 ldgenpisyslem1 30226 measinblem 30283 voliune 30292 volmeas 30294 oms0 30359 omssubadd 30362 dstrvprob 30533 bnj1379 30901 bnj1204 31080 bnj1388 31101 bnj1417 31109 bnj1489 31124 untsucf 31587 trpredmintr 31731 frrlem4 31783 bj-rabbida 32914 cover2 33508 upixp 33524 indexdom 33529 filbcmb 33535 sdclem2 33538 eq0rabdioph 37340 eqrabdioph 37341 setindtr 37591 ss2iundf 37951 gneispace 38432 iunconnlem2 39171 rzalf 39176 fnchoice 39188 refsumcn 39189 rfcnnnub 39195 refsum2cnlem1 39196 iuneq2df 39212 uzwo4 39221 ixpeq2d 39237 ixpssmapc 39243 elintd 39245 ssdf 39247 ralimralim 39253 nelrnmpt 39257 ixpssixp 39269 ballss3 39270 rabbida 39274 iinssiin 39312 eliind2 39313 ralrimia 39315 rabssd 39332 fompt 39379 rnmptssd 39385 choicefi 39392 iunmapss 39407 iunmapsn 39409 rnmpt0 39412 axccdom 39416 dmmptdf 39417 axccd 39429 fnmptd 39434 dmmptdf2 39439 mptfnd 39451 mpteq12da 39452 rnmptbd2lem 39463 rnmptssdf 39469 rnmptbdlem 39470 ssfiunibd 39523 xralrple2 39570 infxr 39583 xrralrecnnle 39602 xrralrecnnge 39613 supxrunb3 39623 fimaxre4 39625 supxrleubrnmpt 39632 rexabslelem 39645 suprleubrnmpt 39649 uzublem 39657 infxrgelbrnmpt 39683 iooiinicc 39769 iooiinioc 39783 mccl 39830 climsuse 39840 mullimc 39848 mullimcf 39855 limcrecl 39861 limsupre 39873 limcleqr 39876 addlimc 39880 0ellimcdiv 39881 limclner 39883 limsupubuzlem 39944 climinf3 39948 limsupequzmpt2 39950 limsupmnfuzlem 39958 limsupre3uzlem 39967 liminfequzmpt2 40023 cncficcgt0 40101 cncfioobd 40110 cncfcompt2 40112 fprodsubrecnncnvlem 40121 fprodaddrecnncnvlem 40123 dvmptfprodlem 40159 dvnprodlem1 40161 iblsplitf 40186 stoweidlem5 40222 stoweidlem16 40233 stoweidlem18 40235 stoweidlem21 40238 stoweidlem26 40243 stoweidlem27 40244 stoweidlem28 40245 stoweidlem29 40246 stoweidlem31 40248 stoweidlem34 40251 stoweidlem36 40253 stoweidlem41 40258 stoweidlem42 40259 stoweidlem44 40261 stoweidlem45 40262 stoweidlem48 40265 stoweidlem51 40268 stoweidlem55 40272 stoweidlem59 40276 stoweidlem60 40277 stoweidlem62 40279 wallispilem3 40284 stirlinglem5 40295 fourierdlem16 40340 fourierdlem21 40345 fourierdlem22 40346 fourierdlem31 40355 fourierdlem39 40363 fourierdlem68 40391 fourierdlem71 40394 fourierdlem73 40396 fourierdlem77 40400 fourierdlem80 40403 fourierdlem83 40406 fourierdlem87 40410 fourierdlem94 40417 fourierdlem103 40426 fourierdlem104 40427 fourierdlem112 40435 fourierdlem113 40436 etransclem32 40483 subsaliuncllem 40575 sge0revalmpt 40595 sge0fodjrnlem 40633 sge0fsummptf 40653 iundjiun 40677 meadjiun 40683 voliunsge0lem 40689 meaiininclem 40700 omeiunle 40731 hoicvrrex 40770 ovnsubaddlem2 40785 hoissrrn2 40792 hoidmv1lelem1 40805 hoidmvlelem3 40811 ovnhoilem1 40815 hoi2toco 40821 ovnlecvr2 40824 hspdifhsp 40830 hoiqssbllem1 40836 hoiqssbllem3 40838 hspmbllem2 40841 iinhoiicclem 40887 iunhoiioolem 40889 vonioo 40896 vonicc 40899 pimconstlt0 40914 pimconstlt1 40915 pimltpnf 40916 pimiooltgt 40921 pimdecfgtioc 40925 pimincfltioc 40926 pimdecfgtioo 40927 pimincfltioo 40928 preimageiingt 40930 preimaleiinlt 40931 issmfd 40944 issmfdf 40946 sssmf 40947 issmfle 40954 issmfdmpt 40957 issmfgt 40965 issmfled 40966 issmfgtd 40969 smflimlem2 40980 smfmullem4 41001 smfpimcclem 41013 smfsuplem1 41017 smfsupmpt 41021 smfinflem 41023 smfinfmpt 41025 iccelpart 41369 mogoldbb 41673 sbgoldbo 41675 aacllem 42547

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