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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 3690 mob2 3720 rmob 3889 sneqrg 4838 preq1b 4845 prel12g 4863 disjxun 5140 sotric 5621 sotrieq 5622 iss 6052 poirr2 6143 xp11 6194 nordeq 6402 nsuceq0 6466 ordequn 6486 tz6.12cOLD 6932 fnbrfvb 6958 foeqcnvco 7321 f1eqcocnv 7322 dfwe2 7795 releldmdifi 8071 mposn 8129 poxp2 8169 poxp3 8176 poseq 8184 tfrlem15 8433 tz7.44-2 8448 tz7.48-1 8484 tz7.49 8486 oawordexr 8595 oewordi 8630 oeeulem 8640 nna0r 8648 nnawordex 8676 nnaordex 8677 nnaordex2 8678 oaabs 8687 oaabs2 8688 eldifsucnn 8703 ectocld 8825 ecoptocl 8848 mapsnd 8927 eqeng 9027 difsnen 9094 fopwdom 9121 nneneq 9247 frfi 9322 elfiun 9471 ordiso 9557 ordtypelem7 9565 wemaplem2 9588 suc11reg 9660 inf3lem6 9674 noinfep 9701 cantnff 9715 cantnfp1lem2 9720 cantnfp1lem3 9721 cantnflem1 9730 cantnf 9734 ttrcltr 9757 r111 9816 rankc2 9912 tcrank 9925 cardnueq0 10005 fodomfi2 10101 alephinit 10136 dfac9 10178 dfac12k 10189 djuinf 10230 ackbij1 10278 ackbij2 10283 sornom 10318 fin23lem16 10376 fin23lem21 10380 isf32lem2 10395 fin1a2lem6 10446 itunitc 10462 zorn2lem4 10540 wunr1om 10760 tskr1om 10808 recmulnq 11005 ltexnq 11016 distrlem4pr 11067 1re 11262 0re 11264 0cnALT 11497 0cnALT2 11498 mulge0 11782 prodgt0 12115 peano2nn 12279 recnz 12695 zneo 12703 uzn0 12896 xlemul1a 13331 prunioo 13522 flidz 13851 ceilidz 13893 modid2 13939 modmuladdnn0 13957 om2uzrani 13994 uzrdgfni 14000 seqid 14089 seqz 14092 facdiv 14327 facwordi 14329 hashdom 14419 wrdnval 14584 wrdnfi 14587 wrdl1s1 14653 sqrmo 15291 fsumf1o 15760 isumltss 15885 supcvg 15893 dvdsnegb 16312 dvdsexp2im 16365 odd2np1lem 16378 odd2np1 16379 ltoddhalfle 16399 halfleoddlt 16400 opoe 16401 omoe 16402 opeo 16403 omeo 16404 bitsuz 16512 bezoutlem4 16580 gcddiv 16589 gcdzeq 16590 dvdssqim 16592 dvdsexpim 16593 lcmgcdeq 16650 coprmdvds2 16692 rpmul 16697 divgcdcoprmex 16704 cncongr2 16706 dvdsprm 16741 coprm 16749 prmdvdsexp 16753 prmdiv 16823 pythagtriplem19 16872 pc2dvds 16918 pcadd 16928 prmpwdvds 16943 vdwlem11 17030 ramubcl 17057 0ram 17059 posasymb 18366 pleval2 18383 pltval3 18385 plttr 18388 pospo 18391 letsr 18639 intopsn 18668 ismgmid 18679 imasmnd2 18788 isgrpid2 18995 isgrpinv 19012 dfgrp3lem 19057 imasgrp2 19074 orbsta 19332 symgfix2 19435 pmtrfrn 19477 pmtrrn2 19479 odmulg 19575 odmulgeq 19576 gexdvdsi 19602 gexnnod 19607 pgpssslw 19633 sylow2alem1 19636 fislw 19644 lsmss1b 19685 lsmss2b 19687 efgrelexlemb 19769 torsubg 19873 ablfacrplem 20086 pgpfac1lem2 20096 pgpfac1lem3 20098 ablsimpnosubgd 20125 imasrng 20175 imasring 20328 dvdsrcl2 20367 dvdsrtr 20369 dvdsrmul1 20370 irredn0 20424 lspsneq0 21011 lmhmima 21047 lspsolv 21146 xrsdsreclblem 21431 dvdsrzring 21473 prmirredlem 21484 znunit 21583 pjdm2 21732 obselocv 21749 lindfrn 21842 opsrtoslem2 22081 mpfind 22132 psdmul 22171 mpfpf1 22356 pf1mpf 22357 cpmadugsumlemF 22883 baspartn 22962 bastop 22989 iscld3 23073 isopn3 23075 iscldtop 23104 ordtrest2lem 23212 2ndcredom 23459 2ndc1stc 23460 2ndcrest 23463 2ndcdisj 23465 2ndcsep 23468 kgenidm 23556 dfac14 23627 tx2ndc 23660 kqreglem1 23750 rnelfm 23962 fmfnfmlem2 23964 fmfnfmlem4 23966 fmfnfm 23967 flimtopon 23979 fclstopon 24021 xrsmopn 24835 icccmplem2 24846 reconnlem1 24849 iccpnfcnv 24976 cphsqrtcl2 25221 ivthlem3 25489 ivthicc 25494 ovolctb 25526 ioombl 25601 itgabs 25871 itgsplitioo 25874 dvlip 26033 c1liplem1 26036 c1lip1 26037 dvgt0lem1 26042 dvivthlem2 26049 dvne0 26051 lhop1lem 26053 lhop1 26054 lhop2 26055 lhop 26056 dvcvx 26060 itgsubstlem 26090 mdegnn0cl 26111 ig1peu 26215 elply2 26236 plypf1 26252 dgreq0 26306 aannenlem3 26373 abelthlem2 26477 lognegb 26633 eflogeq 26645 efopn 26701 cxpge0 26726 cxplea 26739 cxple2 26740 cxpcn3lem 26791 cxpaddlelem 26795 cxpaddle 26796 cxpeq 26801 asinsinb 26941 acoscosb 26942 atantanb 26968 wilthlem2 27113 sqf11 27183 sqff1o 27226 ppiublem1 27247 lgsdir 27377 lgsne0 27380 lgsquadlem3 27427 2sqblem 27476 dchrisum0flblem1 27553 ostth3 27683 ostth 27684 noseponlem 27710 nodenselem4 27733 nodenselem5 27734 nodenselem7 27736 nodenselem8 27737 nolt02o 27741 nogt01o 27742 nosupbnd2lem1 27761 noetasuplem4 27782 slerec 27865 madebdayim 27927 negsproplem2 28062 negsunif 28088 slemul1ad 28209 precsexlem6 28237 precsexlem7 28238 noseqp1 28298 om2noseqlt 28306 noseqrdgfn 28313 dfnns2 28363 colinearalg 28926 axcontlem5 28984 axcontlem9 28988 uhgrn0 29085 upgrfn 29105 umgrfn 29117 uvtxnbgrvtx 29411 vtxduhgr0nedg 29511 pthdivtx 29748 iswwlksnx 29861 wpthswwlks2on 29982 clwwlkn 30046 clwwlknonwwlknonb 30126 eupth2lem2 30239 eupth2lem3lem6 30253 htthlem 30937 pjpreeq 31418 h1dn0 31572 spansneleqi 31589 rnbra 32127 dfpjop 32202 elpjrn 32210 stm1i 32263 mdbr2 32316 mdsl2i 32342 sumdmdlem 32438 dmdbr6ati 32443 ordtrest2NEWlem 33922 xrge0iifcnv 33933 eulerpartlemb 34371 erdszelem8 35204 cvmlift3lem4 35328 cvmlift3lem5 35329 fmlasucdisj 35405 mrsub0 35522 mrsubccat 35524 mrsubcn 35525 msubrn 35535 msrid 35551 elmthm 35582 dfon2lem9 35793 btwnconn1lem11 36099 broutsideof2 36124 opnbnd 36327 tailfb 36379 bj-ideqg1 37166 fin2so 37615 lindsadd 37621 poimirlem9 37637 poimirlem17 37645 poimirlem26 37654 poimirlem27 37655 poimirlem31 37659 itgabsnc 37697 ftc2nc 37710 sdclem2 37750 subspopn 37760 equivtotbnd 37786 rngosn3 37932 igenval2 38074 isfldidl 38076 relcnveq3 38323 ecex2 38330 iss2 38346 elrelscnveq3 38493 lshpinN 38991 lsatcv0eq 39049 lsatcv1 39050 cvrnbtwn3 39278 cvrnbtwn4 39281 cvrcmp 39285 atnlt 39315 cvlexchb1 39332 2llnne2N 39411 atcvr0eq 39429 lnnat 39430 cvrat4 39446 ps-1 39480 3at 39493 llncmp 39525 llnnlt 39526 llncvrlpln2 39560 llncvrlpln 39561 lplncmp 39565 lplnnlt 39568 lplncvrlvol2 39618 lplncvrlvol 39619 lvolcmp 39620 lvolnltN 39621 dalempnes 39654 dalemqnet 39655 dalem-cly 39674 dalem44 39719 lncmp 39786 cdlemblem 39796 llnexch2N 39873 osumcllem4N 39962 pexmidlem1N 39973 lhp2atnle 40036 cdleme11dN 40265 cdleme20k 40322 cdleme21at 40331 cdleme21ct 40332 cdleme32e 40448 cdleme35f 40457 tendoex 40978 dochexmidlem1 41463 lcfrlem9 41553 mapd1o 41651 mapdindp3 41725 zndvdchrrhm 41973 elre0re 42295 flt0 42652 ismrc 42717 pellexlem1 42845 aomclem4 43074 dfac21 43083 lsmfgcl 43091 lmhmfgima 43101 dfacbasgrp 43125 hbtlem6 43146 fiuneneq 43209 oaabsb 43312 cantnfresb 43342 stoweidlem27 46047 stoweidlem29 46049 fcoresf1 47086 tz6.12c-afv2 47259 dfatbrafv2b 47262 fnbrafv2b 47265 iccpartrn 47422 prmdvdsfmtnof1lem2 47577 mod42tp1mod8 47594 isubgredg 47857 isuspgrim0 47877 grimuhgr 47883 grimcnv 47884 assintopass 48135 rrxsphere 48674

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