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 3803 opeldmd 5886 elreldm 5915 predtrss 6311 ordtr2 6397 ssimaex 6963 fliftfun 7304 isopolem 7337 isosolem 7339 ordsucss 7810 f1oweALT 7969 fnse 8130 soseq 8156 brtpos 8232 issmo2 8361 seqomlem1 8462 omcl 8546 oecl 8547 oawordeulem 8564 oaass 8571 omordi 8576 omord 8578 odi 8589 oen0 8596 oeordi 8597 oeordsuc 8604 nnmcl 8622 nnecl 8623 nnmordi 8641 nnmord 8642 nnmwordri 8646 nnaordex 8648 swoord1 8749 ecopovtrn 8832 f1domg 8984 pw2f1olem 9088 domtriord 9135 mapen 9153 mapxpen 9155 mapunen 9158 nndomog 9225 nndomogOLD 9233 onomeneq 9235 inficl 9435 supmo 9462 infmo 9507 inf3lem6 9645 cantnflem1 9701 tcmin 9753 tcrank 9896 cardne 9977 cardlim 9984 cardsdomel 9986 carduni 9993 alephord 10087 cardinfima 10109 dfac5lem4 10138 dfac5lem4OLD 10140 infdif2 10221 cofsmo 10281 cfcoflem 10284 infpssrlem4 10318 infpssrlem5 10319 fin4en1 10321 isfin2-2 10331 enfin2i 10333 fin23lem27 10340 isf32lem12 10376 isf34lem6 10392 domtriomlem 10454 cardmin 10576 fpwwe2lem11 10653 inar1 10787 gruiun 10811 ltsonq 10981 prub 11006 reclem3pr 11061 mulcmpblnr 11083 mulgt0sr 11117 axpre-sup 11181 leltadd 11719 infm3 12199 peano5nni 12241 zextle 12664 prime 12672 uzin 12890 ublbneg 12947 zbtwnre 12960 mul2lt0bi 13113 xrre2 13184 xralrple 13219 xmulneg1 13283 supxrbnd 13342 supxrgtmnf 13343 fzrevral 13627 flge 13820 ceile 13864 modadd1 13923 modmul1 13940 modsumfzodifsn 13960 seqcl2 14036 facdiv 14303 hashss 14425 hash2exprb 14487 elfzelfzccat 14596 repswswrd 14800 cshf1 14826 cshwcsh2id 14845 rlim2lt 15511 rlim3 15512 o1lo1 15551 climshftlem 15588 o1co 15600 o1of2 15627 isercolllem2 15680 isercoll 15682 caucvgrlem2 15689 climcndslem2 15864 sqrt2irr 16265 dvds2lem 16286 dvdsle 16327 dvdsfac 16343 ltoddhalfle 16378 divalglem0 16410 ndvdsadd 16427 bitsinv1lem 16458 sadcaddlem 16474 dvdslegcd 16521 bezoutlem2 16557 bezoutlem4 16559 gcdzeq 16569 algcvga 16596 rpdvds 16677 cncongr1 16684 cncongr2 16685 prmind2 16702 isprm6 16731 rpexp 16739 eulerthlem2 16799 pclem 16856 pceulem 16863 pc2dvds 16897 fldivp1 16915 infpnlem1 16928 prmunb 16932 mrieqv2d 17649 plttr 18350 clatl 18516 issubg4 19126 gexdvds 19563 pgpssslw 19593 sylow2alem2 19597 efgs1b 19715 efgsfo 19718 imasabl 19855 lspindpi 21091 psgnodpm 21546 psgndif 21560 obselocv 21686 pf1ind 22291 mdetunilem9 22556 fiinbas 22888 bastg 22902 tgcl 22905 opnssneib 23051 clslp 23084 tgcnp 23189 iscnp4 23199 cncls2 23209 cncls 23210 cnntr 23211 cnpresti 23224 lmss 23234 lmcnp 23240 cmpsub 23336 tgcmp 23337 dfconn2 23355 t1connperf 23372 1stcfb 23381 1stcrest 23389 kgenss 23479 llycmpkgen2 23486 txdis 23568 qtoptop2 23635 kqt0lem 23672 isr0 23673 regr1lem2 23676 cmphaushmeo 23736 fbun 23776 ssfg 23808 fgtr 23826 ufildr 23867 cnpflf 23937 fclsnei 23955 flimfnfcls 23964 fclscmp 23966 ufilcmp 23968 cnpfcf 23977 alexsublem 23980 alexsubALTlem3 23985 alexsubALTlem4 23986 ptcmplem3 23990 tgphaus 24053 tgpt1 24054 tsmsres 24080 imasdsf1olem 24310 xblss2ps 24338 xblss2 24339 blsscls2 24441 metequiv2 24447 stdbdxmet 24452 nmoi 24665 reconn 24766 mulc1cncf 24847 cncfco 24849 iccpnfhmeo 24892 xrhmeo 24893 evth 24907 pi1grplem 24998 fgcfil 25221 ivthlem2 25403 ivthlem3 25404 ovolicc2lem4 25471 voliunlem1 25501 ioombl1lem4 25512 itg2gt0 25711 limcco 25844 lhop1 25969 tdeglem4 26015 plypf1 26167 coeeulem 26179 coeidlem 26192 coeid3 26195 plymul0or 26238 dvnply2 26245 plydivex 26255 vieta1lem2 26269 plyexmo 26271 aaliou3lem2 26301 ulmss 26356 ulmdvlem3 26361 iblulm 26366 sincosq2sgn 26458 sincosq3sgn 26459 sincosq4sgn 26460 logcnlem5 26605 dcubic 26806 amgm 26951 isnsqf 27095 mumullem2 27140 chtublem 27172 chtub 27173 fsumvma2 27175 vmasum 27177 dchrfi 27216 bposlem1 27245 bposlem3 27247 bposlem7 27251 lgsdir 27293 lgsquadlem2 27342 2sqlem8a 27386 2sqlem10 27389 dchrisum0flb 27471 pntpbnd1 27547 pntlemf 27566 pntlem3 27570 peano5uzs 28307 axeuclid 28888 uspgrushgr 29102 uspgrupgr 29103 usgruspgr 29105 usgr2pth 29692 crctcshwlkn0lem5 29742 wwlksnext 29821 wwlksnextsurj 29828 clwwlkccatlem 29916 clwlkclwwlkf 29935 clwwisshclwwslemlem 29940 lnon0 30725 normpyc 31073 ocsh 31210 ocorth 31218 ococss 31220 shsel2 31249 hsupss 31268 pjhth 31320 shlub 31341 cm2j 31547 lnfncnbd 31984 riesz1 31992 rnbra 32034 leopadd 32059 leopmuli 32060 hstles 32158 stge1i 32165 stle0i 32166 dmdbr5 32235 ssmd2 32239 superpos 32281 chcv1 32282 atoml2i 32310 chirredlem2 32318 atcvat3i 32323 mdsymlem5 32334 mdsymlem6 32335 sumdmdii 32342 sumdmdlem2 32346 isarchiofld 33285 sqsscirc2 33886 cnre2csqlem 33887 xrge0iifiso 33912 sigaclci 34109 omssubadd 34278 eulerpartlemb 34346 ballotlemimin 34484 ballotlem7 34514 fineqvac 35074 subgrwlk 35100 cusgracyclt3v 35124 cvmlift2lem12 35282 fmlasucdisj 35367 dfon2lem8 35754 segconeq 35974 ifscgr 36008 brofs2 36041 brifs2 36042 endofsegid 36049 dissneqlem 37304 rdgellim 37340 fvineqsneq 37376 tan2h 37582 matunitlindflem2 37587 poimirlem31 37621 poimir 37623 fzmul 37711 fdc 37715 incsequz2 37719 sstotbnd2 37744 sstotbnd3 37746 totbndbnd 37759 isexid2 37825 ispridl2 38008 mpobi123f 38132 disjlem18 38764 disjdmqsss 38766 riotasvd 38920 lsator0sp 38965 lssatle 38979 lshpset2N 39083 lkrlspeqN 39135 omllaw2N 39208 cmtbr3N 39218 lecmtN 39220 cvlcvr1 39303 cvrval4N 39379 cvrat3 39407 3noncolr2 39414 4noncolr3 39418 3dimlem3 39426 3dimlem3OLDN 39427 3dimlem4 39429 3dimlem4OLDN 39430 llncvrlpln 39523 lplncvrlvol 39581 snatpsubN 39715 linepsubN 39717 pmapjat1 39818 pclfinclN 39915 pl42N 39948 ltrneq2 40113 cdleme7aa 40207 cdleme18d 40260 cdleme21b 40291 trlord 40534 trlcoat 40688 dochkrshp 41351 lcfl8 41467 mulgt0con1dlem 42447 irrapxlem2 42793 pell14qrdich 42839 monotoddzz 42914 pw2f1ocnv 43008 iocinico 43183 ordnexbtwnsuc 43238 tfsconcat0i 43316 naddwordnexlem4 43372 harval3 43509 sbcim2g 44511 stoweidlem62 46039 elfzelfzlble 47298 1arymaptf1 48570 2arymaptf1 48581 eenglngeehlnmlem2 48666 mpbiran3d 48724 opnneil 48832

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