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Theorem syl5ibcom 244

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 243	. 2 ⊢ (𝜒 → (𝜑 → 𝜃))
4	3	com12 32	1 ⊢ (𝜑 → (𝜒 → 𝜃))

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: biimpcd 248 elrab3t 3643 mob2 3672 rmob 3845 sneqrg 4796 preq1b 4803 prel12g 4820 disjxun 5102 sotric 5572 sotrieq 5573 iss 5988 poirr2 6077 xp11 6126 nordeq 6335 nsuceq0 6399 ordequn 6419 tz6.12cOLD 6867 fnbrfvb 6893 foeqcnvco 7243 f1eqcocnv 7244 f1eqcocnvOLD 7245 dfwe2 7705 releldmdifi 7974 mposn 8032 poxp2 8072 poxp3 8079 poseq 8087 tfrlem15 8335 tz7.44-2 8350 tz7.48-1 8386 tz7.49 8388 oawordexr 8500 oewordi 8535 oeeulem 8545 nna0r 8553 nnawordex 8581 nnaordex 8582 oaabs 8591 oaabs2 8592 eldifsucnn 8607 ectocld 8720 ecoptocl 8743 mapsnd 8821 eqeng 8923 difsnen 8994 fopwdom 9021 nneneq 9150 frfi 9229 elfiun 9363 ordiso 9449 ordtypelem7 9457 wemaplem2 9480 suc11reg 9552 inf3lem6 9566 noinfep 9593 cantnff 9607 cantnfp1lem2 9612 cantnfp1lem3 9613 cantnflem1 9622 cantnf 9626 ttrcltr 9649 r111 9708 rankc2 9804 tcrank 9817 cardnueq0 9897 fodomfi2 9993 alephinit 10028 dfac9 10069 dfac12k 10080 djuinf 10121 ackbij1 10171 ackbij2 10176 sornom 10210 fin23lem16 10268 fin23lem21 10272 isf32lem2 10287 fin1a2lem6 10338 itunitc 10354 zorn2lem4 10432 wunr1om 10652 tskr1om 10700 recmulnq 10897 ltexnq 10908 distrlem4pr 10959 1re 11152 0re 11154 0cnALT 11386 0cnALT2 11387 mulge0 11670 prodgt0 11999 peano2nn 12162 recnz 12575 zneo 12583 uzn0 12777 xlemul1a 13204 prunioo 13395 flidz 13712 ceilidz 13754 modid2 13800 modmuladdnn0 13817 om2uzrani 13854 uzrdgfni 13860 seqid 13950 seqz 13953 facdiv 14184 facwordi 14186 hashdom 14276 wrdnval 14430 wrdnfi 14433 wrdl1s1 14499 sqrmo 15133 fsumf1o 15605 isumltss 15730 supcvg 15738 dvdsnegb 16153 dvdsexp2im 16206 odd2np1lem 16219 odd2np1 16220 ltoddhalfle 16240 halfleoddlt 16241 opoe 16242 omoe 16243 opeo 16244 omeo 16245 bitsuz 16351 bezoutlem4 16420 gcddiv 16429 gcdzeq 16430 dvdssqim 16432 lcmgcdeq 16485 coprmdvds2 16527 rpmul 16532 divgcdcoprmex 16539 cncongr2 16541 dvdsprm 16576 coprm 16584 prmdvdsexp 16588 prmdiv 16654 pythagtriplem19 16702 pc2dvds 16748 pcadd 16758 prmpwdvds 16773 vdwlem11 16860 ramubcl 16887 0ram 16889 posasymb 18205 pleval2 18223 pltval3 18225 plttr 18228 pospo 18231 letsr 18479 intopsn 18506 ismgmid 18517 imasmnd2 18590 isgrpid2 18784 isgrpinv 18800 dfgrp3lem 18841 imasgrp2 18858 orbsta 19089 symgfix2 19194 pmtrfrn 19236 pmtrrn2 19238 odmulg 19334 odmulgeq 19335 gexdvdsi 19361 gexnnod 19366 pgpssslw 19392 sylow2alem1 19395 fislw 19403 lsmss1b 19444 lsmss2b 19446 efgrelexlemb 19528 torsubg 19628 ablfacrplem 19840 pgpfac1lem2 19850 pgpfac1lem3 19852 ablsimpnosubgd 19879 imasring 20041 dvdsrcl2 20075 dvdsrtr 20077 dvdsrmul1 20078 irredn0 20128 lspsneq0 20469 lmhmima 20504 lspsolv 20600 xrsdsreclblem 20839 dvdsrzring 20878 prmirredlem 20889 znunit 20966 pjdm2 21113 obselocv 21130 lindfrn 21223 opsrtoslem2 21459 mpfind 21513 mpfpf1 21713 pf1mpf 21714 cpmadugsumlemF 22221 baspartn 22300 bastop 22327 iscld3 22411 isopn3 22413 iscldtop 22442 ordtrest2lem 22550 2ndcredom 22797 2ndc1stc 22798 2ndcrest 22801 2ndcdisj 22803 2ndcsep 22806 kgenidm 22894 dfac14 22965 tx2ndc 22998 kqreglem1 23088 rnelfm 23300 fmfnfmlem2 23302 fmfnfmlem4 23304 fmfnfm 23305 flimtopon 23317 fclstopon 23359 xrsmopn 24171 icccmplem2 24182 reconnlem1 24185 iccpnfcnv 24303 cphsqrtcl2 24546 ivthlem3 24813 ivthicc 24818 ovolctb 24850 ioombl 24925 itgabs 25195 itgsplitioo 25198 dvlip 25353 c1liplem1 25356 c1lip1 25357 dvgt0lem1 25362 dvivthlem2 25369 dvne0 25371 lhop1lem 25373 lhop1 25374 lhop2 25375 lhop 25376 dvcvx 25380 itgsubstlem 25408 mdegnn0cl 25432 ig1peu 25532 elply2 25553 plypf1 25569 dgreq0 25622 aannenlem3 25686 abelthlem2 25787 lognegb 25941 eflogeq 25953 efopn 26009 cxpge0 26034 cxplea 26047 cxple2 26048 cxpcn3lem 26096 cxpaddlelem 26100 cxpaddle 26101 cxpeq 26106 asinsinb 26243 acoscosb 26244 atantanb 26270 wilthlem2 26414 sqf11 26484 sqff1o 26527 ppiublem1 26546 lgsdir 26676 lgsne0 26679 lgsquadlem3 26726 2sqblem 26775 dchrisum0flblem1 26852 ostth3 26982 ostth 26983 noseponlem 27008 nodenselem4 27031 nodenselem5 27032 nodenselem7 27034 nodenselem8 27035 nolt02o 27039 nogt01o 27040 nosupbnd2lem1 27059 noetasuplem4 27080 slerec 27154 madebdayim 27213 colinearalg 27757 axcontlem5 27815 axcontlem9 27819 uhgrn0 27916 upgrfn 27936 umgrfn 27948 uvtxnbgrvtx 28239 vtxduhgr0nedg 28338 pthdivtx 28575 iswwlksnx 28683 wpthswwlks2on 28804 clwwlkn 28868 clwwlknonwwlknonb 28948 eupth2lem2 29061 eupth2lem3lem6 29075 htthlem 29757 pjpreeq 30238 h1dn0 30392 spansneleqi 30409 rnbra 30947 dfpjop 31022 elpjrn 31030 stm1i 31083 mdbr2 31136 mdsl2i 31162 sumdmdlem 31258 dmdbr6ati 31263 ordtrest2NEWlem 32394 xrge0iifcnv 32405 eulerpartlemb 32859 erdszelem8 33683 cvmlift3lem4 33807 cvmlift3lem5 33808 fmlasucdisj 33884 mrsub0 34001 mrsubccat 34003 mrsubcn 34004 msubrn 34014 msrid 34030 elmthm 34061 dfon2lem9 34258 negsproplem2 34353 btwnconn1lem11 34671 broutsideof2 34696 opnbnd 34786 tailfb 34838 bj-ideqg1 35624 fin2so 36054 lindsadd 36060 poimirlem9 36076 poimirlem17 36084 poimirlem26 36093 poimirlem27 36094 poimirlem31 36098 itgabsnc 36136 ftc2nc 36149 sdclem2 36190 subspopn 36200 equivtotbnd 36226 rngosn3 36372 igenval2 36514 isfldidl 36516 relcnveq3 36771 ecex2 36778 iss2 36794 elrelscnveq3 36942 lshpinN 37440 lsatcv0eq 37498 lsatcv1 37499 cvrnbtwn3 37727 cvrnbtwn4 37730 cvrcmp 37734 atnlt 37764 cvlexchb1 37781 2llnne2N 37860 atcvr0eq 37878 lnnat 37879 cvrat4 37895 ps-1 37929 3at 37942 llncmp 37974 llnnlt 37975 llncvrlpln2 38009 llncvrlpln 38010 lplncmp 38014 lplnnlt 38017 lplncvrlvol2 38067 lplncvrlvol 38068 lvolcmp 38069 lvolnltN 38070 dalempnes 38103 dalemqnet 38104 dalem-cly 38123 dalem44 38168 lncmp 38235 cdlemblem 38245 llnexch2N 38322 osumcllem4N 38411 pexmidlem1N 38422 lhp2atnle 38485 cdleme11dN 38714 cdleme20k 38771 cdleme21at 38780 cdleme21ct 38781 cdleme32e 38897 cdleme35f 38906 tendoex 39427 dochexmidlem1 39912 lcfrlem9 40002 mapd1o 40100 mapdindp3 40174 elre0re 40753 dvdsexpim 40790 flt0 40951 ismrc 41000 pellexlem1 41128 aomclem4 41360 dfac21 41369 lsmfgcl 41377 lmhmfgima 41387 dfacbasgrp 41411 hbtlem6 41432 fiuneneq 41500 cantnfresb 41634 stoweidlem27 44238 stoweidlem29 44240 fcoresf1 45273 tz6.12c-afv2 45444 dfatbrafv2b 45447 fnbrafv2b 45450 iccpartrn 45592 prmdvdsfmtnof1lem2 45747 mod42tp1mod8 45764 assintopass 46118 rrxsphere 46804

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