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Theorem syl5ibcom 247

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

**Hypotheses**
Ref	Expression
syl5ib.1	⊢ (𝜑 → 𝜓)
syl5ib.2	⊢ (𝜒 → (𝜓 ↔ 𝜃))

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

**Proof of Theorem syl5ibcom**
Step	Hyp	Ref	Expression
1		syl5ib.1	. . 3 ⊢ (𝜑 → 𝜓)
2		syl5ib.2	. . 3 ⊢ (𝜒 → (𝜓 ↔ 𝜃))
3	1, 2	syl5ib 246	. 2 ⊢ (𝜒 → (𝜑 → 𝜃))
4	3	com12 32	1 ⊢ (𝜑 → (𝜒 → 𝜃))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ↔ wb 208

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 209

This theorem is referenced by: biimpcd 251 elrab3t 3679 mob2 3706 rmob 3874 sneqrg 4770 preq1b 4777 prel12g 4794 disjxun 5064 sotric 5501 sotrieq 5502 iss 5903 poirr2 5984 xp11 6032 nordeq 6210 nsuceq0 6271 ordequn 6291 tz6.12c 6695 fnbrfvb 6718 foeqcnvco 7056 f1eqcocnv 7057 dfwe2 7496 releldmdifi 7744 mposn 7798 tfrlem15 8028 tz7.44-2 8043 tz7.48-1 8079 tz7.49 8081 oawordexr 8182 oewordi 8217 oeeulem 8227 nna0r 8235 nnawordex 8263 nnaordex 8264 oaabs 8271 oaabs2 8272 ectocld 8364 ecoptocl 8387 mapsnd 8450 eqeng 8543 difsnen 8599 fopwdom 8625 frfi 8763 elfiun 8894 ordiso 8980 ordtypelem7 8988 wemaplem2 9011 suc11reg 9082 inf3lem6 9096 noinfep 9123 cantnff 9137 cantnfp1lem2 9142 cantnfp1lem3 9143 cantnflem1 9152 cantnf 9156 r111 9204 rankc2 9300 tcrank 9313 cardnueq0 9393 fodomfi2 9486 alephinit 9521 dfac9 9562 dfac12k 9573 djuinf 9614 ackbij1 9660 ackbij2 9665 sornom 9699 fin23lem16 9757 fin23lem21 9761 isf32lem2 9776 fin1a2lem6 9827 itunitc 9843 zorn2lem4 9921 wunr1om 10141 tskr1om 10189 recmulnq 10386 ltexnq 10397 distrlem4pr 10448 1re 10641 0re 10643 0cnALT 10874 0cnALT2 10875 mulge0 11158 prodgt0 11487 peano2nn 11650 recnz 12058 zneo 12066 uzn0 12261 xlemul1a 12682 prunioo 12868 flidz 13181 ceilidz 13221 modid2 13267 modmuladdnn0 13284 om2uzrani 13321 uzrdgfni 13327 seqid 13416 seqz 13419 facdiv 13648 facwordi 13650 hashdom 13741 wrdnval 13896 wrdnfi 13899 wrdl1s1 13968 sqrmo 14611 fsumf1o 15080 isumltss 15203 supcvg 15211 dvdsnegb 15627 odd2np1lem 15689 odd2np1 15690 ltoddhalfle 15710 halfleoddlt 15711 opoe 15712 omoe 15713 opeo 15714 omeo 15715 bitsuz 15823 bezoutlem4 15890 gcddiv 15899 gcdzeq 15902 dvdssqim 15904 lcmgcdeq 15956 coprmdvds2 15998 rpmul 16003 divgcdcoprmex 16010 cncongr2 16012 dvdsprm 16047 coprm 16055 prmdvdsexp 16059 prmdiv 16122 pythagtriplem19 16170 pc2dvds 16215 pcadd 16225 prmpwdvds 16240 vdwlem11 16327 ramubcl 16354 0ram 16356 posasymb 17562 pleval2 17575 pltval3 17577 plttr 17580 pospo 17583 letsr 17837 intopsn 17864 ismgmid 17875 imasmnd2 17948 isgrpid2 18140 isgrpinv 18156 dfgrp3lem 18197 imasgrp2 18214 orbsta 18443 symgfix2 18544 pmtrfrn 18586 pmtrrn2 18588 odmulg 18683 odmulgeq 18684 gexdvdsi 18708 gexnnod 18713 pgpssslw 18739 sylow2alem1 18742 fislw 18750 lsmss1b 18792 lsmss2b 18794 efgrelexlemb 18876 torsubg 18974 ablfacrplem 19187 pgpfac1lem2 19197 pgpfac1lem3 19199 ablsimpnosubgd 19226 imasring 19369 dvdsrcl2 19400 dvdsrtr 19402 dvdsrmul1 19403 irredn0 19453 lspsneq0 19784 lmhmima 19819 lspsolv 19915 opsrtoslem2 20265 mpfind 20320 mpfpf1 20514 pf1mpf 20515 xrsdsreclblem 20591 dvdsrzring 20630 prmirredlem 20640 znunit 20710 pjdm2 20855 obselocv 20872 lindfrn 20965 cpmadugsumlemF 21484 baspartn 21562 bastop 21589 iscld3 21672 isopn3 21674 iscldtop 21703 ordtrest2lem 21811 2ndcredom 22058 2ndc1stc 22059 2ndcrest 22062 2ndcdisj 22064 2ndcsep 22067 kgenidm 22155 dfac14 22226 tx2ndc 22259 kqreglem1 22349 rnelfm 22561 fmfnfmlem2 22563 fmfnfmlem4 22565 fmfnfm 22566 flimtopon 22578 fclstopon 22620 xrsmopn 23420 icccmplem2 23431 reconnlem1 23434 iccpnfcnv 23548 cphsqrtcl2 23790 ivthlem3 24054 ivthicc 24059 ovolctb 24091 ioombl 24166 itgabs 24435 itgsplitioo 24438 dvlip 24590 c1liplem1 24593 c1lip1 24594 dvgt0lem1 24599 dvivthlem2 24606 dvne0 24608 lhop1lem 24610 lhop1 24611 lhop2 24612 lhop 24613 dvcvx 24617 itgsubstlem 24645 mdegnn0cl 24665 ig1peu 24765 elply2 24786 plypf1 24802 dgreq0 24855 aannenlem3 24919 abelthlem2 25020 lognegb 25173 eflogeq 25185 efopn 25241 cxpge0 25266 cxplea 25279 cxple2 25280 cxpcn3lem 25328 cxpaddlelem 25332 cxpaddle 25333 cxpeq 25338 asinsinb 25475 acoscosb 25476 atantanb 25502 wilthlem2 25646 sqf11 25716 sqff1o 25759 ppiublem1 25778 lgsdir 25908 lgsne0 25911 lgsquadlem3 25958 2sqblem 26007 dchrisum0flblem1 26084 ostth3 26214 ostth 26215 colinearalg 26696 axcontlem5 26754 axcontlem9 26758 uhgrn0 26852 upgrfn 26872 umgrfn 26884 uvtxnbgrvtx 27175 vtxduhgr0nedg 27274 pthdivtx 27510 iswwlksnx 27618 wpthswwlks2on 27740 clwwlkn 27804 clwwlknonwwlknonb 27885 eupth2lem2 27998 eupth2lem3lem6 28012 htthlem 28694 pjpreeq 29175 h1dn0 29329 spansneleqi 29346 rnbra 29884 dfpjop 29959 elpjrn 29967 stm1i 30020 mdbr2 30073 mdsl2i 30099 sumdmdlem 30195 dmdbr6ati 30200 ordtrest2NEWlem 31165 xrge0iifcnv 31176 eulerpartlemb 31626 erdszelem8 32445 cvmlift3lem4 32569 cvmlift3lem5 32570 fmlasucdisj 32646 mrsub0 32763 mrsubccat 32765 mrsubcn 32766 msubrn 32776 msrid 32792 elmthm 32823 dvdspw 32982 dfon2lem9 33036 poseq 33095 noseponlem 33171 nodenselem4 33191 nodenselem5 33192 nodenselem7 33194 nodenselem8 33195 nolt02o 33199 nosupbnd2lem1 33215 noetalem3 33219 slerec 33277 btwnconn1lem11 33558 broutsideof2 33583 opnbnd 33673 tailfb 33725 bj-ideqg1 34459 fin2so 34894 lindsadd 34900 poimirlem9 34916 poimirlem17 34924 poimirlem26 34933 poimirlem27 34934 poimirlem31 34938 itgabsnc 34976 ftc2nc 34991 sdclem2 35032 subspopn 35042 equivtotbnd 35071 rngosn3 35217 igenval2 35359 isfldidl 35361 relcnveq3 35593 ecex2 35600 iss2 35616 elrelscnveq3 35746 lshpinN 36140 lsatcv0eq 36198 lsatcv1 36199 cvrnbtwn3 36427 cvrnbtwn4 36430 cvrcmp 36434 atnlt 36464 cvlexchb1 36481 2llnne2N 36559 atcvr0eq 36577 lnnat 36578 cvrat4 36594 ps-1 36628 3at 36641 llncmp 36673 llnnlt 36674 llncvrlpln2 36708 llncvrlpln 36709 lplncmp 36713 lplnnlt 36716 lplncvrlvol2 36766 lplncvrlvol 36767 lvolcmp 36768 lvolnltN 36769 dalempnes 36802 dalemqnet 36803 dalem-cly 36822 dalem44 36867 lncmp 36934 cdlemblem 36944 llnexch2N 37021 osumcllem4N 37110 pexmidlem1N 37121 lhp2atnle 37184 cdleme11dN 37413 cdleme20k 37470 cdleme21at 37479 cdleme21ct 37480 cdleme32e 37596 cdleme35f 37605 tendoex 38126 dochexmidlem1 38611 lcfrlem9 38701 mapd1o 38799 mapdindp3 38873 elre0re 39203 dvdsexpim 39230 ismrc 39347 pellexlem1 39475 aomclem4 39706 dfac21 39715 lsmfgcl 39723 lmhmfgima 39733 dfacbasgrp 39757 hbtlem6 39778 fiuneneq 39846 stoweidlem27 42361 stoweidlem29 42363 tz6.12c-afv2 43490 dfatbrafv2b 43493 fnbrafv2b 43496 iccpartrn 43639 prmdvdsfmtnof1lem2 43796 mod42tp1mod8 43816 assintopass 44170 rrxsphere 44784

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