impbid2 - Metamath Proof Explorer

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Theorem impbid2 217

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 216	. 2 ⊢ (𝜑 → (𝜒 ↔ 𝜓))
4	3	bicomd 214	1 ⊢ (𝜑 → (𝜓 ↔ 𝜒))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ↔ wb 197

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 198

This theorem is referenced by: biimt 351 bimsc1 870 biort 959 biorf 960 pm4.72 972 19.38a 1934 19.38aOLD 1935 19.38b 1936 19.38bOLD 1937 ax13b 2132 19.3t 2232 sb3b 2446 cgsexg 3391 cgsex2g 3392 cgsex4g 3393 elab3gf 3513 abidnf 3534 elsn2g 4370 eqoreldif 4384 difsn 4485 prel12OLD 4536 elpreqprb 4556 dfnfc2 4616 intmin4 4664 dfiin2g 4711 elpw2g 4987 ssrel 5379 ssrel2 5381 ssrelrel 5391 releldmb 5531 relelrnb 5532 cnveqb 5775 dmsnopg 5792 relcnvtr 5843 elsnxp 5865 ord0eln0 5964 f1ocnvb 6337 ffvresb 6588 isof1oopb 6771 soisores 6773 riotaclb 6845 fnoprabg 6963 difex2 7171 dfwe2 7183 ordpwsuc 7217 ordunisuc2 7246 limsssuc 7252 dfom2 7269 relcnvexb 7316 dfsmo2 7652 omord 7857 nneob 7941 pw2f1olem 8275 sucdom 8368 fundmfibi 8456 f1dmvrnfibi 8461 fieq0 8538 hartogslem1 8658 rankr1ag 8884 rankeq0b 8942 fidomtri 9074 fidomtri2 9075 isfin2-2 9398 enfin2i 9400 isfin3-2 9446 isf34lem6 9459 isfin1-2 9464 isfin1-3 9465 isfin7-2 9475 axgroth6 9907 ltsonq 10048 ltexnq 10054 znegclb 11666 rpneg 12066 nltpnft 12202 ngtmnft 12204 xrrebnd 12206 qextlt 12241 qextle 12242 iccneg 12503 fzsn 12595 fz1sbc 12628 fzofzp1b 12779 ceilidz 12864 fleqceilz 12866 hashclb 13356 hashnncl 13364 hashfun 13430 reim0b 14158 rexanre 14385 rexuzre 14391 lo1resb 14594 o1resb 14596 dvdsext 15342 zob 15379 ncoprmgcdne1b 15658 pceq0 15868 pc11 15877 pcz 15878 ramtcl 16007 cshwsiun 16094 pospo 17253 oduposb 17416 cnvpsb 17493 tsrlemax 17500 issubg2 17887 issubg4 17891 ghmmhmb 17949 pmtrmvd 18153 mndodcong 18239 issubrg2 19083 lpigen 19544 cyggic 20207 ip2eq 20287 maducoeval2 20737 eltg3 21060 bastop 21079 0top 21081 iscld3 21162 isclo2 21186 cnprest 21387 dfconn2 21516 comppfsc 21629 cmphaushmeo 21897 reghaus 21922 nrmhaus 21923 fbun 21937 fsubbas 21964 ufileu 22016 uffix 22018 txflf 22103 fclsrest 22121 flimfnfcls 22125 ptcmplem2 22150 tgpt1 22214 tgpt0 22215 isngp2 22694 nrgdomn 22768 nmhmcn 23212 iscmet3 23384 limcflf 23950 ply1nzb 24187 coe11 24314 dgreq0 24326 eldmgm 25053 sqf11 25170 sqff1o 25213 zabsle1 25326 lgsabs1 25366 lgsquadlem2 25411 issubgr2 26457 uhgrissubgr 26460 usgrfilem 26512 uvtxnbgrb 26601 nbusgrvtxm1uvtx 26605 cusgrfilem3 26658 vdiscusgr 26732 wwlksn0s 27070 clwwlknon1loop 27389 clwwlknun 27404 nmobndi 28107 hmopadj2 29277 mdslle1i 29653 mdslle2i 29654 relfi 29884 ssrelf 29896 prodindf 30553 bnj1173 31539 resconn 31697 cvmsval 31717 elmrsubrn 31886 funsseq 32132 brcolinear 32631 outsideofeu 32703 lineunray 32719 nn0prpw 32782 bj-sngltag 33419 bj-elid2 33540 bj-inftyexpiinj 33551 wl-ax11-lem2 33809 poimirlem26 33880 poimirlem27 33881 heicant 33889 cover2 33952 eqfnun 33960 isbndx 34024 isbnd2 34025 equivbnd2 34034 prdsbnd2 34037 elghomlem2OLD 34128 isdrngo3 34201 riotaclbgBAD 34931 lssatle 34992 opcon3b 35173 cdlemk33N 36886 cdlemk34 36887 ioin9i8 37948 wepwsolem 38313 rp-fakeimass 38557 cnvssb 38591 intimag 38647 sscon34b 39015 ntrneiiso 39087 pm11.71 39295 pm14.122b 39321 pm14.123b 39324 iotavalb 39328 eliuniin 39954 eliuniin2 39977 climreeq 40507 rexrsb 41865 reuan 41875 afv0nbfvbi 41923 dfafn5b 41933 elfz2z 42083 zeo2ALTV 42282 nnlog2ge0lt1 43053

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