impbid2 - Metamath Proof Explorer

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Theorem impbid2 227

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 226	. 2 ⊢ (𝜑 → (𝜒 ↔ 𝜓))
4	3	bicomd 224	1 ⊢ (𝜑 → (𝜓 ↔ 𝜒))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ↔ wb 207

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 208

This theorem is referenced by: biimt 362 bimsc1 839 biorf 931 pm4.72 944 19.38a 1822 19.38b 1823 ax13b 2017 19.3t 2165 sb3b 2461 cgsexg 3479 cgsex2g 3480 cgsex4g 3481 elab3gf 3609 abidnf 3631 reuan 3810 elsn2g 4510 eqoreldif 4531 difsn 4640 elpreqprb 4707 dfnfc2 4765 intmin4 4813 dfiin2g 4862 elpw2g 5141 ssrel 5546 ssrel2 5548 ssrelrel 5558 dmopab2rex 5675 releldmb 5701 relelrnb 5702 cnveqb 5931 dmsnopg 5948 relcnvtrg 5997 elsnxp 6020 ord0eln0 6123 f1ocnvb 6499 ffvresb 6754 isof1oopb 6944 soisores 6946 riotaclb 7018 fnoprabg 7134 difex2 7342 dfwe2 7355 ordpwsuc 7389 ordunisuc2 7418 limsssuc 7424 dfom2 7441 relcnvexb 7490 dfsmo2 7839 omord 8047 nneob 8132 pw2f1olem 8471 sucdom 8564 fundmfibi 8652 f1dmvrnfibi 8657 fieq0 8734 hartogslem1 8855 rankr1ag 9080 rankeq0b 9138 fidomtri 9271 fidomtri2 9272 isfin2-2 9590 enfin2i 9592 isfin3-2 9638 isf34lem6 9651 isfin1-2 9656 isfin1-3 9657 isfin7-2 9667 axgroth6 10099 ltsonq 10240 ltexnq 10246 znegclb 11869 rpneg 12271 nltpnft 12407 ngtmnft 12409 xrrebnd 12411 qextlt 12446 qextle 12447 iccneg 12708 fzsn 12799 fz1sbc 12833 fzofzp1b 12985 ceilidz 13070 fleqceilz 13072 hashclb 13569 hashnncl 13577 hashfun 13646 reim0b 14312 rexanre 14540 rexuzre 14546 lo1resb 14755 o1resb 14757 dvdsext 15504 zob 15541 ncoprmgcdne1b 15823 pceq0 16036 pc11 16045 pcz 16046 ramtcl 16175 cshwsiun 16262 pospo 17412 oduposb 17575 cnvpsb 17652 tsrlemax 17659 issubg2 18048 issubg4 18052 ghmmhmb 18110 pmtrmvd 18315 mndodcong 18401 issubrg2 19245 lpigen 19718 cyggic 20401 ip2eq 20479 maducoeval2 20933 eltg3 21254 bastop 21273 0top 21275 iscld3 21356 isclo2 21380 cnprest 21581 dfconn2 21711 comppfsc 21824 cmphaushmeo 22092 reghaus 22117 nrmhaus 22118 fbun 22132 fsubbas 22159 ufileu 22211 uffix 22213 txflf 22298 fclsrest 22316 flimfnfcls 22320 ptcmplem2 22345 tgpt1 22409 tgpt0 22410 isngp2 22889 nrgdomn 22963 nmhmcn 23407 iscmet3 23579 limcflf 24162 ply1nzb 24399 coe11 24526 dgreq0 24538 eldmgm 25281 sqf11 25398 sqff1o 25441 zabsle1 25554 lgsabs1 25594 lgsquadlem2 25639 issubgr2 26737 uhgrissubgr 26740 usgrfilem 26792 uvtxnbgrb 26866 nbusgrvtxm1uvtx 26870 cusgrfilem3 26922 vdiscusgr 26996 wwlksn0s 27321 clwwlknon1loop 27559 clwwlknun 27573 nmobndi 28235 hmopadj2 29401 mdslle1i 29777 mdslle2i 29778 relfi 30034 ssrelf 30048 prodindf 30891 bnj1173 31880 revwlkb 31975 resconn 32095 cvmsval 32115 fmlafvel 32234 dmopab3rexdif 32254 elmrsubrn 32369 funsseq 32613 brcolinear 33123 outsideofeu 33195 lineunray 33211 nn0prpw 33274 bj-sngltag 33913 bj-epelg 33972 bj-elid2 34041 bj-inftyexpiinj 34062 wl-ax11-lem2 34362 poimirlem26 34462 poimirlem27 34463 heicant 34471 cover2 34534 eqfnun 34542 isbndx 34605 isbnd2 34606 equivbnd2 34615 prdsbnd2 34618 elghomlem2OLD 34709 isdrngo3 34782 riotaclbgBAD 35634 lssatle 35695 opcon3b 35876 cdlemk33N 37589 cdlemk34 37590 ioin9i8 38642 wepwsolem 39140 rp-fakeimass 39376 iscard5 39399 cnvssb 39444 intimag 39499 sscon34b 39867 ntrneiiso 39939 pm11.71 40280 pm14.122b 40306 pm14.123b 40309 iotavalb 40313 elixpconstg 40907 eliuniin 40917 eliuniin2 40939 climreeq 41449 rexrsb 42828 afv0nbfvbi 42880 dfafn5b 42890 elfz2z 43045 zeo2ALTV 43332 fpprwpprb 43401 nnlog2ge0lt1 44121

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