sylibrd - Metamath Proof Explorer

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Theorem sylibrd 259

Description: A syllogism deduction. (Contributed by NM, 3-Aug-1994.)

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

**Assertion**
Ref	Expression
sylibrd	⊢ (𝜑 → (𝜓 → 𝜃))

**Proof of Theorem sylibrd**
Step	Hyp	Ref	Expression
1		sylibrd.1	. 2 ⊢ (𝜑 → (𝜓 → 𝜒))
2		sylibrd.2	. . 3 ⊢ (𝜑 → (𝜃 ↔ 𝜒))
3	2	biimprd 248	. 2 ⊢ (𝜑 → (𝜒 → 𝜃))
4	1, 3	syld 47	1 ⊢ (𝜑 → (𝜓 → 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: 3imtr4d 294 sbciegftOLD 3826 opeldmd 5917 elreldm 5946 predtrss 6343 ordtr2 6428 ssimaex 6994 fliftfun 7332 isopolem 7365 isosolem 7367 ordsucss 7838 f1oweALT 7997 fnse 8158 soseq 8184 brtpos 8260 issmo2 8389 seqomlem1 8490 omcl 8574 oecl 8575 oawordeulem 8592 oaass 8599 omordi 8604 omord 8606 odi 8617 oen0 8624 oeordi 8625 oeordsuc 8632 nnmcl 8650 nnecl 8651 nnmordi 8669 nnmord 8670 nnmwordri 8674 nnaordex 8676 swoord1 8777 ecopovtrn 8860 f1domg 9012 pw2f1olem 9116 domtriord 9163 mapen 9181 mapxpen 9183 mapunen 9186 nndomog 9253 nndomogOLD 9263 onomeneq 9265 inficl 9465 supmo 9492 infmo 9535 inf3lem6 9673 cantnflem1 9729 tcmin 9781 tcrank 9924 cardne 10005 cardlim 10012 cardsdomel 10014 carduni 10021 alephord 10115 cardinfima 10137 dfac5lem4 10166 dfac5lem4OLD 10168 infdif2 10249 cofsmo 10309 cfcoflem 10312 infpssrlem4 10346 infpssrlem5 10347 fin4en1 10349 isfin2-2 10359 enfin2i 10361 fin23lem27 10368 isf32lem12 10404 isf34lem6 10420 domtriomlem 10482 cardmin 10604 fpwwe2lem11 10681 inar1 10815 gruiun 10839 ltsonq 11009 prub 11034 reclem3pr 11089 mulcmpblnr 11111 mulgt0sr 11145 axpre-sup 11209 leltadd 11747 infm3 12227 peano5nni 12269 zextle 12691 prime 12699 uzin 12918 ublbneg 12975 zbtwnre 12988 mul2lt0bi 13141 xrre2 13212 xralrple 13247 xmulneg1 13311 supxrbnd 13370 supxrgtmnf 13371 fzrevral 13652 flge 13845 ceile 13889 modadd1 13948 modmul1 13965 modsumfzodifsn 13985 seqcl2 14061 facdiv 14326 hashss 14448 hash2exprb 14510 elfzelfzccat 14618 repswswrd 14822 cshf1 14848 cshwcsh2id 14867 rlim2lt 15533 rlim3 15534 o1lo1 15573 climshftlem 15610 o1co 15622 o1of2 15649 isercolllem2 15702 isercoll 15704 caucvgrlem2 15711 climcndslem2 15886 sqrt2irr 16285 dvds2lem 16306 dvdsle 16347 dvdsfac 16363 ltoddhalfle 16398 divalglem0 16430 ndvdsadd 16447 bitsinv1lem 16478 sadcaddlem 16494 dvdslegcd 16541 bezoutlem2 16577 bezoutlem4 16579 gcdzeq 16589 algcvga 16616 rpdvds 16697 cncongr1 16704 cncongr2 16705 prmind2 16722 isprm6 16751 rpexp 16759 eulerthlem2 16819 pclem 16876 pceulem 16883 pc2dvds 16917 fldivp1 16935 infpnlem1 16948 prmunb 16952 mrieqv2d 17682 plttr 18387 clatl 18553 issubg4 19163 gexdvds 19602 pgpssslw 19632 sylow2alem2 19636 efgs1b 19754 efgsfo 19757 imasabl 19894 lspindpi 21134 psgnodpm 21606 psgndif 21620 obselocv 21748 pf1ind 22359 mdetunilem9 22626 fiinbas 22959 bastg 22973 tgcl 22976 opnssneib 23123 clslp 23156 tgcnp 23261 iscnp4 23271 cncls2 23281 cncls 23282 cnntr 23283 cnpresti 23296 lmss 23306 lmcnp 23312 cmpsub 23408 tgcmp 23409 dfconn2 23427 t1connperf 23444 1stcfb 23453 1stcrest 23461 kgenss 23551 llycmpkgen2 23558 txdis 23640 qtoptop2 23707 kqt0lem 23744 isr0 23745 regr1lem2 23748 cmphaushmeo 23808 fbun 23848 ssfg 23880 fgtr 23898 ufildr 23939 cnpflf 24009 fclsnei 24027 flimfnfcls 24036 fclscmp 24038 ufilcmp 24040 cnpfcf 24049 alexsublem 24052 alexsubALTlem3 24057 alexsubALTlem4 24058 ptcmplem3 24062 tgphaus 24125 tgpt1 24126 tsmsres 24152 imasdsf1olem 24383 xblss2ps 24411 xblss2 24412 blsscls2 24517 metequiv2 24523 stdbdxmet 24528 nmoi 24749 reconn 24850 mulc1cncf 24931 cncfco 24933 iccpnfhmeo 24976 xrhmeo 24977 evth 24991 pi1grplem 25082 fgcfil 25305 ivthlem2 25487 ivthlem3 25488 ovolicc2lem4 25555 voliunlem1 25585 ioombl1lem4 25596 itg2gt0 25795 limcco 25928 lhop1 26053 tdeglem4 26099 plypf1 26251 coeeulem 26263 coeidlem 26276 coeid3 26279 plymul0or 26322 dvnply2 26329 plydivex 26339 vieta1lem2 26353 plyexmo 26355 aaliou3lem2 26385 ulmss 26440 ulmdvlem3 26445 iblulm 26450 sincosq2sgn 26541 sincosq3sgn 26542 sincosq4sgn 26543 logcnlem5 26688 dcubic 26889 amgm 27034 isnsqf 27178 mumullem2 27223 chtublem 27255 chtub 27256 fsumvma2 27258 vmasum 27260 dchrfi 27299 bposlem1 27328 bposlem3 27330 bposlem7 27334 lgsdir 27376 lgsquadlem2 27425 2sqlem8a 27469 2sqlem10 27472 dchrisum0flb 27554 pntpbnd1 27630 pntlemf 27649 pntlem3 27653 peano5uzs 28390 axeuclid 28978 uspgrushgr 29194 uspgrupgr 29195 usgruspgr 29197 usgr2pth 29784 crctcshwlkn0lem5 29834 wwlksnext 29913 wwlksnextsurj 29920 clwwlkccatlem 30008 clwlkclwwlkf 30027 clwwisshclwwslemlem 30032 lnon0 30817 normpyc 31165 ocsh 31302 ocorth 31310 ococss 31312 shsel2 31341 hsupss 31360 pjhth 31412 shlub 31433 cm2j 31639 lnfncnbd 32076 riesz1 32084 rnbra 32126 leopadd 32151 leopmuli 32152 hstles 32250 stge1i 32257 stle0i 32258 dmdbr5 32327 ssmd2 32331 superpos 32373 chcv1 32374 atoml2i 32402 chirredlem2 32410 atcvat3i 32415 mdsymlem5 32426 mdsymlem6 32427 sumdmdii 32434 sumdmdlem2 32438 isarchiofld 33347 sqsscirc2 33908 cnre2csqlem 33909 xrge0iifiso 33934 sigaclci 34133 omssubadd 34302 eulerpartlemb 34370 ballotlemimin 34508 ballotlem7 34538 fineqvac 35111 subgrwlk 35137 cusgracyclt3v 35161 cvmlift2lem12 35319 fmlasucdisj 35404 dfon2lem8 35791 segconeq 36011 ifscgr 36045 brofs2 36078 brifs2 36079 endofsegid 36086 dissneqlem 37341 rdgellim 37377 fvineqsneq 37413 tan2h 37619 matunitlindflem2 37624 poimirlem31 37658 poimir 37660 fzmul 37748 fdc 37752 incsequz2 37756 sstotbnd2 37781 sstotbnd3 37783 totbndbnd 37796 isexid2 37862 ispridl2 38045 mpobi123f 38169 disjlem18 38801 disjdmqsss 38803 riotasvd 38957 lsator0sp 39002 lssatle 39016 lshpset2N 39120 lkrlspeqN 39172 omllaw2N 39245 cmtbr3N 39255 lecmtN 39257 cvlcvr1 39340 cvrval4N 39416 cvrat3 39444 3noncolr2 39451 4noncolr3 39455 3dimlem3 39463 3dimlem3OLDN 39464 3dimlem4 39466 3dimlem4OLDN 39467 llncvrlpln 39560 lplncvrlvol 39618 snatpsubN 39752 linepsubN 39754 pmapjat1 39855 pclfinclN 39952 pl42N 39985 ltrneq2 40150 cdleme7aa 40244 cdleme18d 40297 cdleme21b 40328 trlord 40571 trlcoat 40725 dochkrshp 41388 lcfl8 41504 mulgt0con1dlem 42487 irrapxlem2 42834 pell14qrdich 42880 monotoddzz 42955 pw2f1ocnv 43049 iocinico 43224 ordnexbtwnsuc 43280 tfsconcat0i 43358 naddwordnexlem4 43414 harval3 43551 sbcim2g 44558 stoweidlem62 46077 elfzelfzlble 47333 1arymaptf1 48563 2arymaptf1 48574 eenglngeehlnmlem2 48659 mpbiran3d 48717 opnneil 48807

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