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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 3646 mob2 3674 rmob 3841 sneqrg 4791 preq1b 4798 prel12g 4816 disjxun 5089 sotric 5554 sotrieq 5555 iss 5984 poirr2 6071 xp11 6122 nordeq 6325 nsuceq0 6391 ordequn 6411 fnbrfvb 6872 2f1fvneq 7194 foeqcnvco 7234 f1eqcocnv 7235 dfwe2 7707 releldmdifi 7977 mposn 8033 poxp2 8073 poxp3 8080 poseq 8088 tfrlem15 8311 tz7.44-2 8326 tz7.48-1 8362 tz7.49 8364 oawordexr 8471 oewordi 8506 oeeulem 8516 nna0r 8524 nnawordex 8552 nnaordex 8553 nnaordex2 8554 oaabs 8563 oaabs2 8564 eldifsucnn 8579 elecex 8672 ectocld 8706 ecoptocl 8731 mapsnd 8810 eqeng 8908 difsnen 8972 fopwdom 8998 nneneq 9115 frfi 9169 elfiun 9314 ordiso 9402 ordtypelem7 9410 wemaplem2 9433 suc11reg 9509 inf3lem6 9523 noinfep 9550 cantnff 9564 cantnfp1lem2 9569 cantnfp1lem3 9570 cantnflem1 9579 cantnf 9583 ttrcltr 9606 r111 9668 rankc2 9764 tcrank 9777 cardnueq0 9857 fodomfi2 9951 alephinit 9986 dfac9 10028 dfac12k 10039 djuinf 10080 ackbij1 10128 ackbij2 10133 sornom 10168 fin23lem16 10226 fin23lem21 10230 isf32lem2 10245 fin1a2lem6 10296 itunitc 10312 zorn2lem4 10390 wunr1om 10610 tskr1om 10658 recmulnq 10855 ltexnq 10866 distrlem4pr 10917 1re 11112 0re 11114 0cnALT 11348 0cnALT2 11349 mulge0 11635 prodgt0 11968 peano2nn 12137 recnz 12548 zneo 12556 uzn0 12749 xlemul1a 13187 prunioo 13381 flidz 13714 ceilidz 13756 modid2 13802 modmuladdnn0 13822 om2uzrani 13859 uzrdgfni 13865 seqid 13954 seqz 13957 facdiv 14194 facwordi 14196 hashdom 14286 wrdnval 14452 wrdnfi 14455 wrdl1s1 14522 sqrmo 15158 fsumf1o 15630 isumltss 15755 supcvg 15763 dvdsnegb 16184 dvdsexp2im 16238 odd2np1lem 16251 odd2np1 16252 ltoddhalfle 16272 halfleoddlt 16273 opoe 16274 omoe 16275 opeo 16276 omeo 16277 bitsuz 16385 bezoutlem4 16453 gcddiv 16462 gcdzeq 16463 dvdssqim 16465 dvdsexpim 16466 lcmgcdeq 16523 coprmdvds2 16565 rpmul 16570 divgcdcoprmex 16577 cncongr2 16579 dvdsprm 16614 coprm 16622 prmdvdsexp 16626 prmdiv 16696 pythagtriplem19 16745 pc2dvds 16791 pcadd 16801 prmpwdvds 16816 vdwlem11 16903 ramubcl 16930 0ram 16932 posasymb 18225 pleval2 18241 pltval3 18243 plttr 18246 pospo 18249 letsr 18499 intopsn 18562 ismgmid 18573 imasmnd2 18682 isgrpid2 18889 isgrpinv 18906 dfgrp3lem 18951 imasgrp2 18968 orbsta 19226 symgfix2 19329 pmtrfrn 19371 pmtrrn2 19373 odmulg 19469 odmulgeq 19470 gexdvdsi 19496 gexnnod 19501 pgpssslw 19527 sylow2alem1 19530 fislw 19538 lsmss1b 19579 lsmss2b 19581 efgrelexlemb 19663 torsubg 19767 ablfacrplem 19980 pgpfac1lem2 19990 pgpfac1lem3 19992 ablsimpnosubgd 20019 imasrng 20096 imasring 20249 dvdsrcl2 20285 dvdsrtr 20287 dvdsrmul1 20288 irredn0 20342 lspsneq0 20946 lmhmima 20982 lspsolv 21081 xrsdsreclblem 21350 dvdsrzring 21399 prmirredlem 21410 znunit 21501 pjdm2 21649 obselocv 21666 lindfrn 21759 opsrtoslem2 21992 mpfind 22043 psdmul 22082 mpfpf1 22267 pf1mpf 22268 cpmadugsumlemF 22792 baspartn 22870 bastop 22897 iscld3 22980 isopn3 22982 iscldtop 23011 ordtrest2lem 23119 2ndcredom 23366 2ndc1stc 23367 2ndcrest 23370 2ndcdisj 23372 2ndcsep 23375 kgenidm 23463 dfac14 23534 tx2ndc 23567 kqreglem1 23657 rnelfm 23869 fmfnfmlem2 23871 fmfnfmlem4 23873 fmfnfm 23874 flimtopon 23886 fclstopon 23928 xrsmopn 24729 icccmplem2 24740 reconnlem1 24743 iccpnfcnv 24870 cphsqrtcl2 25114 ivthlem3 25382 ivthicc 25387 ovolctb 25419 ioombl 25494 itgabs 25764 itgsplitioo 25767 dvlip 25926 c1liplem1 25929 c1lip1 25930 dvgt0lem1 25935 dvivthlem2 25942 dvne0 25944 lhop1lem 25946 lhop1 25947 lhop2 25948 lhop 25949 dvcvx 25953 itgsubstlem 25983 mdegnn0cl 26004 ig1peu 26108 elply2 26129 plypf1 26145 dgreq0 26199 aannenlem3 26266 abelthlem2 26370 lognegb 26527 eflogeq 26539 efopn 26595 cxpge0 26620 cxplea 26633 cxple2 26634 cxpcn3lem 26685 cxpaddlelem 26689 cxpaddle 26690 cxpeq 26695 asinsinb 26835 acoscosb 26836 atantanb 26862 wilthlem2 27007 sqf11 27077 sqff1o 27120 ppiublem1 27141 lgsdir 27271 lgsne0 27274 lgsquadlem3 27321 2sqblem 27370 dchrisum0flblem1 27447 ostth3 27577 ostth 27578 noseponlem 27604 nodenselem4 27627 nodenselem5 27628 nodenselem7 27630 nodenselem8 27631 nolt02o 27635 nogt01o 27636 nosupbnd2lem1 27655 noetasuplem4 27676 slerec 27761 madebdayim 27834 negsproplem2 27972 negsunif 27998 slemul1ad 28122 precsexlem6 28151 precsexlem7 28152 noseqp1 28222 om2noseqlt 28230 noseqrdgfn 28237 bdayn0sf1o 28296 dfnns2 28298 colinearalg 28889 axcontlem5 28947 axcontlem9 28951 uhgrn0 29046 upgrfn 29066 umgrfn 29078 uvtxnbgrvtx 29372 vtxduhgr0nedg 29472 pthdivtx 29706 iswwlksnx 29819 wpthswwlks2on 29940 clwwlkn 30004 clwwlknonwwlknonb 30084 eupth2lem2 30197 eupth2lem3lem6 30211 htthlem 30895 pjpreeq 31376 h1dn0 31530 spansneleqi 31547 rnbra 32085 dfpjop 32160 elpjrn 32168 stm1i 32221 mdbr2 32274 mdsl2i 32300 sumdmdlem 32396 dmdbr6ati 32401 ordtrest2NEWlem 33933 xrge0iifcnv 33944 eulerpartlemb 34379 onvf1odlem4 35148 erdszelem8 35240 cvmlift3lem4 35364 cvmlift3lem5 35365 fmlasucdisj 35441 mrsub0 35558 mrsubccat 35560 mrsubcn 35561 msubrn 35571 msrid 35587 elmthm 35618 dfon2lem9 35831 btwnconn1lem11 36137 broutsideof2 36162 opnbnd 36365 tailfb 36417 bj-ideqg1 37204 fin2so 37653 lindsadd 37659 poimirlem9 37675 poimirlem17 37683 poimirlem26 37692 poimirlem27 37693 poimirlem31 37697 itgabsnc 37735 ftc2nc 37748 sdclem2 37788 subspopn 37798 equivtotbnd 37824 rngosn3 37970 igenval2 38112 isfldidl 38114 relcnveq3 38361 iss2 38378 elrelscnveq3 38534 lshpinN 39034 lsatcv0eq 39092 lsatcv1 39093 cvrnbtwn3 39321 cvrnbtwn4 39324 cvrcmp 39328 atnlt 39358 cvlexchb1 39375 2llnne2N 39453 atcvr0eq 39471 lnnat 39472 cvrat4 39488 ps-1 39522 3at 39535 llncmp 39567 llnnlt 39568 llncvrlpln2 39602 llncvrlpln 39603 lplncmp 39607 lplnnlt 39610 lplncvrlvol2 39660 lplncvrlvol 39661 lvolcmp 39662 lvolnltN 39663 dalempnes 39696 dalemqnet 39697 dalem-cly 39716 dalem44 39761 lncmp 39828 cdlemblem 39838 llnexch2N 39915 osumcllem4N 40004 pexmidlem1N 40015 lhp2atnle 40078 cdleme11dN 40307 cdleme20k 40364 cdleme21at 40373 cdleme21ct 40374 cdleme32e 40490 cdleme35f 40499 tendoex 41020 dochexmidlem1 41505 lcfrlem9 41595 mapd1o 41693 mapdindp3 41767 zndvdchrrhm 42011 elre0re 42293 mullt0b2d 42523 flt0 42676 ismrc 42740 pellexlem1 42868 aomclem4 43096 dfac21 43105 lsmfgcl 43113 lmhmfgima 43123 dfacbasgrp 43147 hbtlem6 43168 fiuneneq 43231 oaabsb 43333 cantnfresb 43363 orbitcl 44996 stoweidlem27 46071 stoweidlem29 46073 fcoresf1 47106 tz6.12c-afv2 47279 dfatbrafv2b 47282 fnbrafv2b 47285 iccpartrn 47467 prmdvdsfmtnof1lem2 47622 mod42tp1mod8 47639 isubgredg 47903 grimuhgr 47924 grimcnv 47925 isuspgrim0 47931 assintopass 48251 rrxsphere 48786

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