syl5ibcom - Metamath Proof Explorer

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Theorem syl5ibcom 248

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 247	. 2 ⊢ (𝜒 → (𝜑 → 𝜃))
4	3	com12 32	1 ⊢ (𝜑 → (𝜒 → 𝜃))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ↔ wb 209

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 210

This theorem is referenced by: biimpcd 252 elrab3t 3594 mob2 3621 rmob 3793 sneqrg 4740 preq1b 4747 prel12g 4764 disjxun 5041 sotric 5485 sotrieq 5486 iss 5892 poirr2 5978 xp11 6027 nordeq 6221 nsuceq0 6282 ordequn 6302 tz6.12c 6731 fnbrfvb 6754 foeqcnvco 7099 f1eqcocnv 7100 f1eqcocnvOLD 7101 dfwe2 7548 releldmdifi 7805 mposn 7860 tfrlem15 8117 tz7.44-2 8132 tz7.48-1 8168 tz7.49 8170 oawordexr 8273 oewordi 8308 oeeulem 8318 nna0r 8326 nnawordex 8354 nnaordex 8355 oaabs 8362 oaabs2 8363 ectocld 8455 ecoptocl 8478 mapsnd 8556 eqeng 8651 difsnen 8716 fopwdom 8742 frfi 8905 elfiun 9035 ordiso 9121 ordtypelem7 9129 wemaplem2 9152 suc11reg 9223 inf3lem6 9237 noinfep 9264 cantnff 9278 cantnfp1lem2 9283 cantnfp1lem3 9284 cantnflem1 9293 cantnf 9297 r111 9374 rankc2 9470 tcrank 9483 cardnueq0 9563 fodomfi2 9657 alephinit 9692 dfac9 9733 dfac12k 9744 djuinf 9785 ackbij1 9835 ackbij2 9840 sornom 9874 fin23lem16 9932 fin23lem21 9936 isf32lem2 9951 fin1a2lem6 10002 itunitc 10018 zorn2lem4 10096 wunr1om 10316 tskr1om 10364 recmulnq 10561 ltexnq 10572 distrlem4pr 10623 1re 10816 0re 10818 0cnALT 11049 0cnALT2 11050 mulge0 11333 prodgt0 11662 peano2nn 11825 recnz 12235 zneo 12243 uzn0 12438 xlemul1a 12861 prunioo 13052 flidz 13368 ceilidz 13408 modid2 13454 modmuladdnn0 13471 om2uzrani 13508 uzrdgfni 13514 seqid 13604 seqz 13607 facdiv 13836 facwordi 13838 hashdom 13929 wrdnval 14083 wrdnfi 14086 wrdl1s1 14154 sqrmo 14798 fsumf1o 15270 isumltss 15393 supcvg 15401 dvdsnegb 15816 dvdsexp2im 15869 odd2np1lem 15882 odd2np1 15883 ltoddhalfle 15903 halfleoddlt 15904 opoe 15905 omoe 15906 opeo 15907 omeo 15908 bitsuz 16014 bezoutlem4 16083 gcddiv 16092 gcdzeq 16095 dvdssqim 16097 lcmgcdeq 16150 coprmdvds2 16192 rpmul 16197 divgcdcoprmex 16204 cncongr2 16206 dvdsprm 16241 coprm 16249 prmdvdsexp 16253 prmdiv 16319 pythagtriplem19 16367 pc2dvds 16413 pcadd 16423 prmpwdvds 16438 vdwlem11 16525 ramubcl 16552 0ram 16554 posasymb 17798 pleval2 17815 pltval3 17817 plttr 17820 pospo 17823 letsr 18071 intopsn 18098 ismgmid 18109 imasmnd2 18182 isgrpid2 18376 isgrpinv 18392 dfgrp3lem 18433 imasgrp2 18450 orbsta 18679 symgfix2 18780 pmtrfrn 18822 pmtrrn2 18824 odmulg 18919 odmulgeq 18920 gexdvdsi 18944 gexnnod 18949 pgpssslw 18975 sylow2alem1 18978 fislw 18986 lsmss1b 19028 lsmss2b 19030 efgrelexlemb 19112 torsubg 19211 ablfacrplem 19424 pgpfac1lem2 19434 pgpfac1lem3 19436 ablsimpnosubgd 19463 imasring 19609 dvdsrcl2 19640 dvdsrtr 19642 dvdsrmul1 19643 irredn0 19693 lspsneq0 20021 lmhmima 20056 lspsolv 20152 xrsdsreclblem 20381 dvdsrzring 20420 prmirredlem 20431 znunit 20500 pjdm2 20645 obselocv 20662 lindfrn 20755 opsrtoslem2 20985 mpfind 21039 mpfpf1 21239 pf1mpf 21240 cpmadugsumlemF 21745 baspartn 21823 bastop 21850 iscld3 21933 isopn3 21935 iscldtop 21964 ordtrest2lem 22072 2ndcredom 22319 2ndc1stc 22320 2ndcrest 22323 2ndcdisj 22325 2ndcsep 22328 kgenidm 22416 dfac14 22487 tx2ndc 22520 kqreglem1 22610 rnelfm 22822 fmfnfmlem2 22824 fmfnfmlem4 22826 fmfnfm 22827 flimtopon 22839 fclstopon 22881 xrsmopn 23681 icccmplem2 23692 reconnlem1 23695 iccpnfcnv 23813 cphsqrtcl2 24055 ivthlem3 24322 ivthicc 24327 ovolctb 24359 ioombl 24434 itgabs 24704 itgsplitioo 24707 dvlip 24862 c1liplem1 24865 c1lip1 24866 dvgt0lem1 24871 dvivthlem2 24878 dvne0 24880 lhop1lem 24882 lhop1 24883 lhop2 24884 lhop 24885 dvcvx 24889 itgsubstlem 24917 mdegnn0cl 24941 ig1peu 25041 elply2 25062 plypf1 25078 dgreq0 25131 aannenlem3 25195 abelthlem2 25296 lognegb 25450 eflogeq 25462 efopn 25518 cxpge0 25543 cxplea 25556 cxple2 25557 cxpcn3lem 25605 cxpaddlelem 25609 cxpaddle 25610 cxpeq 25615 asinsinb 25752 acoscosb 25753 atantanb 25779 wilthlem2 25923 sqf11 25993 sqff1o 26036 ppiublem1 26055 lgsdir 26185 lgsne0 26188 lgsquadlem3 26235 2sqblem 26284 dchrisum0flblem1 26361 ostth3 26491 ostth 26492 colinearalg 26973 axcontlem5 27031 axcontlem9 27035 uhgrn0 27130 upgrfn 27150 umgrfn 27162 uvtxnbgrvtx 27453 vtxduhgr0nedg 27552 pthdivtx 27788 iswwlksnx 27896 wpthswwlks2on 28017 clwwlkn 28081 clwwlknonwwlknonb 28161 eupth2lem2 28274 eupth2lem3lem6 28288 htthlem 28970 pjpreeq 29451 h1dn0 29605 spansneleqi 29622 rnbra 30160 dfpjop 30235 elpjrn 30243 stm1i 30296 mdbr2 30349 mdsl2i 30375 sumdmdlem 30471 dmdbr6ati 30476 ordtrest2NEWlem 31558 xrge0iifcnv 31569 eulerpartlemb 32019 erdszelem8 32845 cvmlift3lem4 32969 cvmlift3lem5 32970 fmlasucdisj 33046 mrsub0 33163 mrsubccat 33165 mrsubcn 33166 msubrn 33176 msrid 33192 elmthm 33223 dfon2lem9 33455 poxp2 33478 poxp3 33484 poseq 33490 noseponlem 33561 nodenselem4 33584 nodenselem5 33585 nodenselem7 33587 nodenselem8 33588 nolt02o 33592 nogt01o 33593 nosupbnd2lem1 33612 noetasuplem4 33633 slerec 33707 madebdayim 33764 btwnconn1lem11 34093 broutsideof2 34118 opnbnd 34208 tailfb 34260 bj-ideqg1 35027 fin2so 35458 lindsadd 35464 poimirlem9 35480 poimirlem17 35488 poimirlem26 35497 poimirlem27 35498 poimirlem31 35502 itgabsnc 35540 ftc2nc 35553 sdclem2 35594 subspopn 35604 equivtotbnd 35630 rngosn3 35776 igenval2 35918 isfldidl 35920 relcnveq3 36150 ecex2 36157 iss2 36173 elrelscnveq3 36303 lshpinN 36697 lsatcv0eq 36755 lsatcv1 36756 cvrnbtwn3 36984 cvrnbtwn4 36987 cvrcmp 36991 atnlt 37021 cvlexchb1 37038 2llnne2N 37116 atcvr0eq 37134 lnnat 37135 cvrat4 37151 ps-1 37185 3at 37198 llncmp 37230 llnnlt 37231 llncvrlpln2 37265 llncvrlpln 37266 lplncmp 37270 lplnnlt 37273 lplncvrlvol2 37323 lplncvrlvol 37324 lvolcmp 37325 lvolnltN 37326 dalempnes 37359 dalemqnet 37360 dalem-cly 37379 dalem44 37424 lncmp 37491 cdlemblem 37501 llnexch2N 37578 osumcllem4N 37667 pexmidlem1N 37678 lhp2atnle 37741 cdleme11dN 37970 cdleme20k 38027 cdleme21at 38036 cdleme21ct 38037 cdleme32e 38153 cdleme35f 38162 tendoex 38683 dochexmidlem1 39168 lcfrlem9 39258 mapd1o 39356 mapdindp3 39430 elre0re 39950 dvdsexpim 39988 flt0 40129 ismrc 40178 pellexlem1 40306 aomclem4 40537 dfac21 40546 lsmfgcl 40554 lmhmfgima 40564 dfacbasgrp 40588 hbtlem6 40609 fiuneneq 40677 stoweidlem27 43197 stoweidlem29 43199 fcoresf1 44189 tz6.12c-afv2 44360 dfatbrafv2b 44363 fnbrafv2b 44366 iccpartrn 44509 prmdvdsfmtnof1lem2 44664 mod42tp1mod8 44681 assintopass 45035 rrxsphere 45721

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