impbid2 - Metamath Proof Explorer

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Theorem impbid2 225

Description: Infer an equivalence from two implications. (Contributed by NM, 6-Mar-2007.) (Proof shortened by Wolf Lammen, 27-Sep-2013.)

**Hypotheses**
Ref	Expression
impbid2.1	⊢ (𝜓 → 𝜒)
impbid2.2	⊢ (𝜑 → (𝜒 → 𝜓))

**Assertion**
Ref	Expression
impbid2	⊢ (𝜑 → (𝜓 ↔ 𝜒))

**Proof of Theorem impbid2**
Step	Hyp	Ref	Expression
1		impbid2.2	. . 3 ⊢ (𝜑 → (𝜒 → 𝜓))
2		impbid2.1	. . 3 ⊢ (𝜓 → 𝜒)
3	1, 2	impbid1 224	. 2 ⊢ (𝜑 → (𝜒 ↔ 𝜓))
4	3	bicomd 222	1 ⊢ (𝜑 → (𝜓 ↔ 𝜒))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ↔ wb 205

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

This theorem depends on definitions: df-bi 206

This theorem is referenced by: biimt 359 bimsc1 842 biorf 934 pm4.72 947 19.38a 1835 19.38b 1836 ax13b 2028 19.3t 2190 cgsexg 3509 cgsex2g 3510 cgsex4g 3511 cgsex4gOLD 3512 elab3gf 3671 elab3g 3672 abidnf 3695 reuan 3888 sscon34b 4293 elsn2g 4661 eqoreldif 4683 difsn 4797 elpreqprb 4866 dfnfc2 4929 intmin4 4977 dfiin2g 5032 elpw2g 5341 ssrel 5778 ssrelOLD 5779 ssrel2 5781 ssrelrel 5792 dmopab2rex 5914 releldmb 5942 relelrnb 5943 cnveqb 6197 dmsnopg 6214 relcnvtrg 6267 elsnxp 6292 onelssex 6413 ord0eln0 6420 f1ocnvb 6845 eqfnun 7039 ffvresb 7128 isof1oopb 7326 soisores 7328 riotaclb 7411 fnoprabg 7537 difex2 7757 dfwe2 7771 ordpwsuc 7813 ordunisuc2 7843 limsssuc 7849 dfom2 7867 relcnvexb 7928 dfsmo2 8366 ord1eln01 8515 ord2eln012 8516 omord 8587 nneob 8675 fsetcdmex 8881 pw2f1olem 9103 sucdom 9259 sucdomOLD 9260 1sdom 9272 fundmfibi 9368 f1dmvrnfibi 9373 fieq0 9454 hartogslem1 9575 rankr1ag 9835 rankeq0b 9893 fidomtri 10026 fidomtri2 10027 pr2ne 10037 isfin2-2 10350 enfin2i 10352 isfin3-2 10398 isf34lem6 10411 isfin1-2 10416 isfin1-3 10417 isfin7-2 10427 axgroth6 10859 ltsonq 11000 ltexnq 11006 znegclb 12642 rpneg 13051 nltpnft 13188 ngtmnft 13190 xrrebnd 13192 qextlt 13227 qextle 13228 iccneg 13494 fzsn 13588 fz1sbc 13622 fzofzp1b 13776 ceilidz 13863 fleqceilz 13865 hashclb 14367 hashnncl 14375 hashfun 14446 reim0b 15116 rexanre 15343 rexuzre 15349 lo1resb 15558 o1resb 15560 dvdsext 16315 zob 16353 ncoprmgcdne1b 16643 pceq0 16865 pc11 16874 pcz 16875 ramtcl 17004 cshwsiun 17094 oduposb 18346 pospo 18362 cnvpsb 18596 tsrlemax 18603 issubg2 19128 issubg4 19132 eqg0subg 19183 ghmmhmb 19214 pmtrmvd 19447 mndodcong 19533 issubrng2 20533 issubrg2 20569 ring2idlqusb 21292 lpigen 21317 cyggic 21563 ip2eq 21642 maducoeval2 22627 eltg3 22950 bastop 22969 0top 22971 iscld3 23053 isclo2 23077 cnprest 23278 dfconn2 23408 comppfsc 23521 cmphaushmeo 23789 reghaus 23814 nrmhaus 23815 fbun 23829 fsubbas 23856 ufileu 23908 uffix 23910 txflf 23995 fclsrest 24013 flimfnfcls 24017 ptcmplem2 24042 tgpt1 24107 tgpt0 24108 isngp2 24591 nrgdomn 24673 nmhmcn 25132 iscmet3 25306 limcflf 25895 ply1nzb 26144 coe11 26274 dgreq0 26287 eldmgm 27044 sqf11 27161 sqff1o 27204 zabsle1 27319 lgsabs1 27359 lgsquadlem2 27404 madebday 27917 oldbday 27918 slelss 27925 issubgr2 29202 uhgrissubgr 29205 usgrfilem 29257 uvtxnbgrb 29331 nbusgrvtxm1uvtx 29335 cusgrfilem3 29388 vdiscusgr 29462 wwlksn0s 29789 clwwlknon1loop 30025 clwwlknun 30039 nmobndi 30702 hmopadj2 31868 mdslle1i 32244 mdslle2i 32245 relfi 32519 ssrelf 32532 prodindf 33866 bnj1173 34857 revwlkb 34963 resconn 35084 cvmsval 35104 fmlafvel 35223 dmopab3rexdif 35243 elmrsubrn 35358 funsseq 35601 brcolinear 35893 outsideofeu 35965 lineunray 35981 nn0prpw 36045 bj-nfimexal 36340 bj-sngltag 36700 bj-elpwg 36769 bj-elsn0 36872 bj-opelid 36873 bj-opelidres 36878 bj-ideqg1 36881 bj-imdirval3 36901 bj-inftyexpiinj 36926 wl-ax11-lem2 37291 poimirlem26 37357 poimirlem27 37358 heicant 37366 cover2 37426 isbndx 37493 isbnd2 37494 equivbnd2 37503 prdsbnd2 37506 elghomlem2OLD 37597 isdrngo3 37670 riotaclbgBAD 38662 lssatle 38723 opcon3b 38904 cdlemk33N 40618 cdlemk34 40619 ioin9i8 41949 eu6w 42366 wepwsolem 42737 onsupmaxb 42938 rp-fakeimass 43213 iscard5 43237 cnvssb 43287 intimag 43357 ntrneiiso 43792 pm11.71 44105 pm14.122b 44131 pm14.123b 44134 iotavalb 44138 elixpconstg 44724 eliuniin 44734 eliuniin2 44755 climreeq 45267 f1cof1b 46723 rexrsb 46746 afv0nbfvbi 46797 dfafn5b 46807 elfz2z 46961 zeo2ALTV 47276 fpprwpprb 47345 dfsclnbgr6 47458 nnlog2ge0lt1 47987

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