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Theorem syl5ibcom 245

Description: A mixed syllogism inference. (Contributed by NM, 19-Jun-2007.)

**Hypotheses**
Ref	Expression
imbitrid.1	⊢ (𝜑 → 𝜓)
imbitrid.2	⊢ (𝜒 → (𝜓 ↔ 𝜃))

**Assertion**
Ref	Expression
syl5ibcom	⊢ (𝜑 → (𝜒 → 𝜃))

**Proof of Theorem syl5ibcom**
Step	Hyp	Ref	Expression
1		imbitrid.1	. . 3 ⊢ (𝜑 → 𝜓)
2		imbitrid.2	. . 3 ⊢ (𝜒 → (𝜓 ↔ 𝜃))
3	1, 2	imbitrid 244	. 2 ⊢ (𝜒 → (𝜑 → 𝜃))
4	3	com12 32	1 ⊢ (𝜑 → (𝜒 → 𝜃))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ↔ wb 206

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 207

This theorem is referenced by: biimpcd 249 elrab3t 3693 mob2 3723 rmob 3898 sneqrg 4843 preq1b 4850 prel12g 4868 disjxun 5145 sotric 5625 sotrieq 5626 iss 6054 poirr2 6146 xp11 6196 nordeq 6404 nsuceq0 6468 ordequn 6488 tz6.12cOLD 6933 fnbrfvb 6959 foeqcnvco 7319 f1eqcocnv 7320 dfwe2 7792 releldmdifi 8068 mposn 8126 poxp2 8166 poxp3 8173 poseq 8181 tfrlem15 8430 tz7.44-2 8445 tz7.48-1 8481 tz7.49 8483 oawordexr 8592 oewordi 8627 oeeulem 8637 nna0r 8645 nnawordex 8673 nnaordex 8674 nnaordex2 8675 oaabs 8684 oaabs2 8685 eldifsucnn 8700 ectocld 8822 ecoptocl 8845 mapsnd 8924 eqeng 9024 difsnen 9091 fopwdom 9118 nneneq 9243 frfi 9318 elfiun 9467 ordiso 9553 ordtypelem7 9561 wemaplem2 9584 suc11reg 9656 inf3lem6 9670 noinfep 9697 cantnff 9711 cantnfp1lem2 9716 cantnfp1lem3 9717 cantnflem1 9726 cantnf 9730 ttrcltr 9753 r111 9812 rankc2 9908 tcrank 9921 cardnueq0 10001 fodomfi2 10097 alephinit 10132 dfac9 10174 dfac12k 10185 djuinf 10226 ackbij1 10274 ackbij2 10279 sornom 10314 fin23lem16 10372 fin23lem21 10376 isf32lem2 10391 fin1a2lem6 10442 itunitc 10458 zorn2lem4 10536 wunr1om 10756 tskr1om 10804 recmulnq 11001 ltexnq 11012 distrlem4pr 11063 1re 11258 0re 11260 0cnALT 11493 0cnALT2 11494 mulge0 11778 prodgt0 12111 peano2nn 12275 recnz 12690 zneo 12698 uzn0 12892 xlemul1a 13326 prunioo 13517 flidz 13846 ceilidz 13888 modid2 13934 modmuladdnn0 13952 om2uzrani 13989 uzrdgfni 13995 seqid 14084 seqz 14087 facdiv 14322 facwordi 14324 hashdom 14414 wrdnval 14579 wrdnfi 14582 wrdl1s1 14648 sqrmo 15286 fsumf1o 15755 isumltss 15880 supcvg 15888 dvdsnegb 16307 dvdsexp2im 16360 odd2np1lem 16373 odd2np1 16374 ltoddhalfle 16394 halfleoddlt 16395 opoe 16396 omoe 16397 opeo 16398 omeo 16399 bitsuz 16507 bezoutlem4 16575 gcddiv 16584 gcdzeq 16585 dvdssqim 16587 dvdsexpim 16588 lcmgcdeq 16645 coprmdvds2 16687 rpmul 16692 divgcdcoprmex 16699 cncongr2 16701 dvdsprm 16736 coprm 16744 prmdvdsexp 16748 prmdiv 16818 pythagtriplem19 16866 pc2dvds 16912 pcadd 16922 prmpwdvds 16937 vdwlem11 17024 ramubcl 17051 0ram 17053 posasymb 18376 pleval2 18394 pltval3 18396 plttr 18399 pospo 18402 letsr 18650 intopsn 18679 ismgmid 18690 imasmnd2 18799 isgrpid2 19006 isgrpinv 19023 dfgrp3lem 19068 imasgrp2 19085 orbsta 19343 symgfix2 19448 pmtrfrn 19490 pmtrrn2 19492 odmulg 19588 odmulgeq 19589 gexdvdsi 19615 gexnnod 19620 pgpssslw 19646 sylow2alem1 19649 fislw 19657 lsmss1b 19698 lsmss2b 19700 efgrelexlemb 19782 torsubg 19886 ablfacrplem 20099 pgpfac1lem2 20109 pgpfac1lem3 20111 ablsimpnosubgd 20138 imasrng 20194 imasring 20343 dvdsrcl2 20382 dvdsrtr 20384 dvdsrmul1 20385 irredn0 20439 lspsneq0 21027 lmhmima 21063 lspsolv 21162 xrsdsreclblem 21447 dvdsrzring 21489 prmirredlem 21500 znunit 21599 pjdm2 21748 obselocv 21765 lindfrn 21858 opsrtoslem2 22097 mpfind 22148 psdmul 22187 mpfpf1 22370 pf1mpf 22371 cpmadugsumlemF 22897 baspartn 22976 bastop 23003 iscld3 23087 isopn3 23089 iscldtop 23118 ordtrest2lem 23226 2ndcredom 23473 2ndc1stc 23474 2ndcrest 23477 2ndcdisj 23479 2ndcsep 23482 kgenidm 23570 dfac14 23641 tx2ndc 23674 kqreglem1 23764 rnelfm 23976 fmfnfmlem2 23978 fmfnfmlem4 23980 fmfnfm 23981 flimtopon 23993 fclstopon 24035 xrsmopn 24847 icccmplem2 24858 reconnlem1 24861 iccpnfcnv 24988 cphsqrtcl2 25233 ivthlem3 25501 ivthicc 25506 ovolctb 25538 ioombl 25613 itgabs 25884 itgsplitioo 25887 dvlip 26046 c1liplem1 26049 c1lip1 26050 dvgt0lem1 26055 dvivthlem2 26062 dvne0 26064 lhop1lem 26066 lhop1 26067 lhop2 26068 lhop 26069 dvcvx 26073 itgsubstlem 26103 mdegnn0cl 26124 ig1peu 26228 elply2 26249 plypf1 26265 dgreq0 26319 aannenlem3 26386 abelthlem2 26490 lognegb 26646 eflogeq 26658 efopn 26714 cxpge0 26739 cxplea 26752 cxple2 26753 cxpcn3lem 26804 cxpaddlelem 26808 cxpaddle 26809 cxpeq 26814 asinsinb 26954 acoscosb 26955 atantanb 26981 wilthlem2 27126 sqf11 27196 sqff1o 27239 ppiublem1 27260 lgsdir 27390 lgsne0 27393 lgsquadlem3 27440 2sqblem 27489 dchrisum0flblem1 27566 ostth3 27696 ostth 27697 noseponlem 27723 nodenselem4 27746 nodenselem5 27747 nodenselem7 27749 nodenselem8 27750 nolt02o 27754 nogt01o 27755 nosupbnd2lem1 27774 noetasuplem4 27795 slerec 27878 madebdayim 27940 negsproplem2 28075 negsunif 28101 slemul1ad 28222 precsexlem6 28250 precsexlem7 28251 noseqp1 28311 om2noseqlt 28319 noseqrdgfn 28326 dfnns2 28376 colinearalg 28939 axcontlem5 28997 axcontlem9 29001 uhgrn0 29098 upgrfn 29118 umgrfn 29130 uvtxnbgrvtx 29424 vtxduhgr0nedg 29524 pthdivtx 29761 iswwlksnx 29869 wpthswwlks2on 29990 clwwlkn 30054 clwwlknonwwlknonb 30134 eupth2lem2 30247 eupth2lem3lem6 30261 htthlem 30945 pjpreeq 31426 h1dn0 31580 spansneleqi 31597 rnbra 32135 dfpjop 32210 elpjrn 32218 stm1i 32271 mdbr2 32324 mdsl2i 32350 sumdmdlem 32446 dmdbr6ati 32451 ordtrest2NEWlem 33882 xrge0iifcnv 33893 eulerpartlemb 34349 erdszelem8 35182 cvmlift3lem4 35306 cvmlift3lem5 35307 fmlasucdisj 35383 mrsub0 35500 mrsubccat 35502 mrsubcn 35503 msubrn 35513 msrid 35529 elmthm 35560 dfon2lem9 35772 btwnconn1lem11 36078 broutsideof2 36103 opnbnd 36307 tailfb 36359 bj-ideqg1 37146 fin2so 37593 lindsadd 37599 poimirlem9 37615 poimirlem17 37623 poimirlem26 37632 poimirlem27 37633 poimirlem31 37637 itgabsnc 37675 ftc2nc 37688 sdclem2 37728 subspopn 37738 equivtotbnd 37764 rngosn3 37910 igenval2 38052 isfldidl 38054 relcnveq3 38302 ecex2 38309 iss2 38325 elrelscnveq3 38472 lshpinN 38970 lsatcv0eq 39028 lsatcv1 39029 cvrnbtwn3 39257 cvrnbtwn4 39260 cvrcmp 39264 atnlt 39294 cvlexchb1 39311 2llnne2N 39390 atcvr0eq 39408 lnnat 39409 cvrat4 39425 ps-1 39459 3at 39472 llncmp 39504 llnnlt 39505 llncvrlpln2 39539 llncvrlpln 39540 lplncmp 39544 lplnnlt 39547 lplncvrlvol2 39597 lplncvrlvol 39598 lvolcmp 39599 lvolnltN 39600 dalempnes 39633 dalemqnet 39634 dalem-cly 39653 dalem44 39698 lncmp 39765 cdlemblem 39775 llnexch2N 39852 osumcllem4N 39941 pexmidlem1N 39952 lhp2atnle 40015 cdleme11dN 40244 cdleme20k 40301 cdleme21at 40310 cdleme21ct 40311 cdleme32e 40427 cdleme35f 40436 tendoex 40957 dochexmidlem1 41442 lcfrlem9 41532 mapd1o 41630 mapdindp3 41704 zndvdchrrhm 41952 elre0re 42273 flt0 42623 ismrc 42688 pellexlem1 42816 aomclem4 43045 dfac21 43054 lsmfgcl 43062 lmhmfgima 43072 dfacbasgrp 43096 hbtlem6 43117 fiuneneq 43180 oaabsb 43283 cantnfresb 43313 stoweidlem27 45982 stoweidlem29 45984 fcoresf1 47018 tz6.12c-afv2 47191 dfatbrafv2b 47194 fnbrafv2b 47197 iccpartrn 47354 prmdvdsfmtnof1lem2 47509 mod42tp1mod8 47526 isubgredg 47789 isuspgrim0 47809 grimuhgr 47815 grimcnv 47816 assintopass 48057 rrxsphere 48597

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