syl5ibcom - Metamath Proof Explorer

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Theorem syl5ibcom 246

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 245	. 2 ⊢ (𝜒 → (𝜑 → 𝜃))
4	3	com12 32	1 ⊢ (𝜑 → (𝜒 → 𝜃))

Colors of variables: wff setvar class

Syntax hints: → wi 4 ↔ wb 207

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 208

This theorem is referenced by: biimpcd 250 elrab3t 3612 mob2 3637 rmob 3797 sneqrg 4671 preq1b 4678 prel12g 4695 disjxun 4954 sotric 5381 sotrieq 5382 iss 5776 poirr2 5852 xp11 5900 nordeq 6077 nsuceq0 6138 ordequn 6158 tz6.12c 6555 fnbrfvb 6578 foeqcnvco 6912 f1eqcocnv 6913 dfwe2 7343 releldmdifi 7591 mposn 7645 tfrlem15 7871 tz7.44-2 7886 tz7.48-1 7921 tz7.49 7923 oawordexr 8023 oewordi 8058 oeeulem 8068 nna0r 8076 nnawordex 8104 nnaordex 8105 oaabs 8112 oaabs2 8113 ectocld 8205 ecoptocl 8228 mapsnd 8289 eqeng 8381 difsnen 8436 fopwdom 8462 frfi 8599 elfiun 8730 ordiso 8816 ordtypelem7 8824 wemaplem2 8847 suc11reg 8917 inf3lem6 8931 noinfep 8958 cantnff 8972 cantnfp1lem2 8977 cantnfp1lem3 8978 cantnflem1 8987 cantnf 8991 r111 9039 rankc2 9135 tcrank 9148 cardnueq0 9228 fodomfi2 9321 alephinit 9356 dfac9 9397 dfac12k 9408 djuinf 9449 ackbij1 9495 ackbij2 9500 sornom 9534 fin23lem16 9592 fin23lem21 9596 isf32lem2 9611 fin1a2lem6 9662 itunitc 9678 zorn2lem4 9756 wunr1om 9976 tskr1om 10024 recmulnq 10221 ltexnq 10232 distrlem4pr 10283 1re 10476 0re 10478 0cnALT 10710 0cnALT2 10711 mulge0 10995 prodgt0 11324 peano2nn 11487 recnz 11895 zneo 11903 uzn0 12098 xlemul1a 12520 prunioo 12706 flidz 13018 ceilidz 13058 modid2 13104 modmuladdnn0 13121 om2uzrani 13158 uzrdgfni 13164 seqid 13253 seqz 13256 facdiv 13485 facwordi 13487 hashdom 13576 wrdnval 13730 wrdnfi 13733 wrdl1s1 13800 sqrmo 14433 fsumf1o 14901 isumltss 15024 supcvg 15032 dvdsnegb 15448 odd2np1lem 15510 odd2np1 15511 ltoddhalfle 15531 halfleoddlt 15532 opoe 15533 omoe 15534 opeo 15535 omeo 15536 bitsuz 15644 bezoutlem4 15707 gcddiv 15716 gcdzeq 15719 dvdssqim 15721 lcmgcdeq 15773 coprmdvds2 15815 rpmul 15820 divgcdcoprmex 15827 cncongr2 15829 dvdsprm 15864 coprm 15872 prmdvdsexp 15876 prmdiv 15939 pythagtriplem19 15987 pc2dvds 16032 pcadd 16042 prmpwdvds 16057 vdwlem11 16144 ramubcl 16171 0ram 16173 posasymb 17379 pleval2 17392 pltval3 17394 plttr 17397 pospo 17400 letsr 17654 intopsn 17680 ismgmid 17691 imasmnd2 17754 isgrpid2 17885 isgrpinv 17901 dfgrp3lem 17942 imasgrp2 17959 orbsta 18172 symgfix2 18263 pmtrfrn 18305 pmtrrn2 18307 odmulg 18401 odmulgeq 18402 gexdvdsi 18426 gexnnod 18431 pgpssslw 18457 sylow2alem1 18460 fislw 18468 lsmss1b 18508 lsmss2b 18510 efgrelexlemb 18591 torsubg 18685 ablfacrplem 18892 pgpfac1lem2 18902 pgpfac1lem3 18904 imasring 19047 dvdsrcl2 19078 dvdsrtr 19080 dvdsrmul1 19081 irredn0 19131 lspsneq0 19462 lmhmima 19497 lspsolv 19593 opsrtoslem2 19940 mpfind 19991 mpfpf1 20184 pf1mpf 20185 xrsdsreclblem 20261 dvdsrzring 20300 prmirredlem 20310 znunit 20380 pjdm2 20525 obselocv 20542 lindfrn 20635 cpmadugsumlemF 21156 baspartn 21234 bastop 21261 iscld3 21344 isopn3 21346 iscldtop 21375 ordtrest2lem 21483 2ndcredom 21730 2ndc1stc 21731 2ndcrest 21734 2ndcdisj 21736 2ndcsep 21739 kgenidm 21827 dfac14 21898 tx2ndc 21931 kqreglem1 22021 rnelfm 22233 fmfnfmlem2 22235 fmfnfmlem4 22237 fmfnfm 22238 flimtopon 22250 fclstopon 22292 xrsmopn 23091 icccmplem2 23102 reconnlem1 23105 iccpnfcnv 23219 cphsqrtcl2 23461 ivthlem3 23725 ivthicc 23730 ovolctb 23762 ioombl 23837 itgabs 24106 itgsplitioo 24109 dvlip 24261 c1liplem1 24264 c1lip1 24265 dvgt0lem1 24270 dvivthlem2 24277 dvne0 24279 lhop1lem 24281 lhop1 24282 lhop2 24283 lhop 24284 dvcvx 24288 itgsubstlem 24316 mdegnn0cl 24336 ig1peu 24436 elply2 24457 plypf1 24473 dgreq0 24526 aannenlem3 24590 abelthlem2 24691 lognegb 24842 eflogeq 24854 efopn 24910 cxpge0 24935 cxplea 24948 cxple2 24949 cxpcn3lem 24997 cxpaddlelem 25001 cxpaddle 25002 cxpeq 25007 asinsinb 25144 acoscosb 25145 atantanb 25171 leibpilem1OLD 25188 wilthlem2 25316 sqf11 25386 sqff1o 25429 ppiublem1 25448 lgsdir 25578 lgsne0 25581 lgsquadlem3 25628 2sqblem 25677 dchrisum0flblem1 25754 ostth3 25884 ostth 25885 colinearalg 26367 axcontlem5 26425 axcontlem9 26429 uhgrn0 26523 upgrfn 26543 umgrfn 26555 uvtxnbgrvtx 26846 vtxduhgr0nedg 26945 pthdivtx 27185 iswwlksnx 27293 wpthswwlks2on 27415 clwwlkn 27479 eupth2lem2 27674 eupth2lem3lem6 27688 htthlem 28373 pjpreeq 28854 h1dn0 29008 spansneleqi 29025 rnbra 29563 dfpjop 29638 elpjrn 29646 stm1i 29699 mdbr2 29752 mdsl2i 29778 sumdmdlem 29874 dmdbr6ati 29879 ordtrest2NEWlem 30738 xrge0iifcnv 30749 eulerpartlemb 31199 erdszelem8 32009 cvmlift3lem4 32133 cvmlift3lem5 32134 fmlasucdisj 32207 mrsub0 32316 mrsubccat 32318 mrsubcn 32319 msubrn 32329 msrid 32345 elmthm 32376 dvdspw 32535 dfon2lem9 32589 poseq 32649 noseponlem 32725 nodenselem4 32745 nodenselem5 32746 nodenselem7 32748 nodenselem8 32749 nolt02o 32753 nosupbnd2lem1 32769 noetalem3 32773 slerec 32831 btwnconn1lem11 33112 broutsideof2 33137 opnbnd 33227 tailfb 33279 bj-ismooredr2 33948 fin2so 34356 lindsadd 34362 poimirlem9 34378 poimirlem17 34386 poimirlem26 34395 poimirlem27 34396 poimirlem31 34400 itgabsnc 34438 ftc2nc 34453 sdclem2 34495 subspopn 34505 equivtotbnd 34534 rngosn3 34680 igenval2 34822 isfldidl 34824 relcnveq3 35058 ecex2 35066 iss2 35083 elrelscnveq3 35212 lshpinN 35606 lsatcv0eq 35664 lsatcv1 35665 cvrnbtwn3 35893 cvrnbtwn4 35896 cvrcmp 35900 atnlt 35930 cvlexchb1 35947 2llnne2N 36025 atcvr0eq 36043 lnnat 36044 cvrat4 36060 ps-1 36094 3at 36107 llncmp 36139 llnnlt 36140 llncvrlpln2 36174 llncvrlpln 36175 lplncmp 36179 lplnnlt 36182 lplncvrlvol2 36232 lplncvrlvol 36233 lvolcmp 36234 lvolnltN 36235 dalempnes 36268 dalemqnet 36269 dalem-cly 36288 dalem44 36333 lncmp 36400 cdlemblem 36410 llnexch2N 36487 osumcllem4N 36576 pexmidlem1N 36587 lhp2atnle 36650 cdleme11dN 36879 cdleme20k 36936 cdleme21at 36945 cdleme21ct 36946 cdleme32e 37062 cdleme35f 37071 tendoex 37592 dochexmidlem1 38077 lcfrlem9 38167 mapd1o 38265 mapdindp3 38339 elre0re 38631 dvdsexpim 38653 ismrc 38733 pellexlem1 38862 aomclem4 39093 dfac21 39102 lsmfgcl 39110 lmhmfgima 39120 dfacbasgrp 39144 hbtlem6 39165 fiuneneq 39233 ablsimpnosubgd 40114 stoweidlem27 41808 stoweidlem29 41810 tz6.12c-afv2 42911 dfatbrafv2b 42914 fnbrafv2b 42917 iccpartrn 43026 prmdvdsfmtnof1lem2 43183 mod42tp1mod8 43203 assintopass 43553 rrxsphere 44170

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