ELF 4 4 ( | | |  TUWVSҍ}=\aGXa]t 5Ta5D~(Et! 8tv8/u H @8u- 1kaP`aS̀r1ÉøÍvUˍvjh k}lat c҉c赮,qlat cc׭ qÙu"lat cc躭p8Élat ccplat c҉c pplat cc/Nplat c҉c詭 plat cc߬olat c҉cDYolat cc菬olat c҉ct olat cc?^olat ccllat cctllat c҉c@ellat cc$Cllat c҉cp螩llat ccԨklat c҉cNklat cc脨klat c҉cuklat cc4Sklat c҉c讨%klat ccklat c҉c@^jlat cc蔧jlat c҉cjlat ccDcjlat c҉c辧5jlat ccjlat c҉cnilat cc褦ilat c҉cilat ccTsilat cc2Qilat c҉cX謦#ilat ccilat c҉c\hlat cc蒥hlat c҉c hlat ccBahlat c҉c輥3hlat cchlat c҉clglat cc袤gƅH8lat cc[zglat c҉cPդLglat cc *glat c҉cH腤flat cc軣flat c҉c5flat cckflat c҉c\flat cc:flat c҉c蕣 flat ccˢelat c҉cEelat cc{elat c҉clelat cc+Jelat cc (elat c҉c胢dlat cc蹡dlat c҉cH3dlat ccidlat c҉c0Zdlat cc8dlat c҉c蓡 dlat ccɠcƅx_lat cc肠clat c҉c|sclat cc2Qclat c҉c謠#clat ccclat c҉c\blat cc蒟blat c҉c blat ccBablat c҉c輟3blat ccblat c҉c lalat cc袞alat c҉c4alat ccRqalat c҉cH̞Calat cc!alat c҉cP|`lat cc貝`lat c҉c,`lat ccb`lat c҉cܝS`lat cc1`ƅXylat cc˜_lat c҉c`E_lat cc{_ƅxt ƅlat cc-_lat c҉c舜^lat cc辛^lat c҉c8^lat ccn^lat c҉c_^lat cc=^ƅlat ccך]lat c҉cQ]lat cc臚]lat c҉c@x]lat cc7V]lat c҉c豚(]lat cc]ƅ}lat cc蠙\lat c҉c\lat ccPo\lat c҉cʙA\lat cc\lat c҉cz[lat cc谘[lat c҉cP*[lat cc`[lat c҉cژQ[lat cc/[lat c҉c芘[lat ccZlat c҉c :Zlat ccpZlat c҉cTaZlat cc ?Zlat c҉c蚗Zlat ccЖYƅ "`lat cc胖Ylat c҉ctYlat cc3RYlat c҉c譖$Ylat ccYƅ "Dslat cc薕Xlat c҉cLXlat ccFeXlat c҉c7Xlat ccXƅ "lat cc詔Wlat c҉c#Wlat ccYxWlat c҉c ӔJWlat cc (Wƅ0Ilat c҉c<^Vlat cc蔓Vlat c҉cVlat ccDcVlat c҉c输5Vlat ccVlat ccҒUlat c҉cLUlat cc肒Ulat c҉c sUlat cc2QUlat c҉cD謒#Ulat ccUlat c҉c|\Tlat cc蒑Tlat c҉c Tlat ccBaTlat c҉c輑3Tlat ccTlat c҉c(lSlat cc袐Sƅ|8 lat cc[zSlat c҉cՐLSlat cc *Slat c҉c腐Rlat cc軏Rlat c҉c5Rlat cckRlat c҉c@\Rlat cc:Rlat c҉c蕏 Rlat ccˎQlat c҉cEQlat cc{Qƅ(lat c҉c4ЎGQlat cc%Qlat c҉cd耎Plat cc趍Plat c҉cd+Plat ccaPƅhlat c҉ct趍-Plat cc Plat c҉cfOlat cc蜌Oƅ2tWlat c҉clOlat cc+JOƅlat c҉c而Nlat cc趋Nlat c҉cd0Nlat ccfNƅxlat c҉c軋2Nlat ccNlat c҉ckMlat cc衊Mlat c҉cMlat ccQpMlat c҉c<ˊBMlat cc Mlat c҉c{Llat cc豉Llat c҉c+Llat ccaLlat c҉cۉRLlat cc0Llat c҉c苉Llat ccKlat c҉c ;Klat ccqKlat c҉cT bKlat cc!@Klat c҉cx 蛈Klat ccчJlat c҉c KJlat cc聇Jlat c҉c !rJlat cc1PJlat c҉cp!談"Jlat ccJlat c҉c![Ilat cc葆Ilat c҉c! Ilat ccA`Iƅ8"7lat c҉c@"薆 Ilat cc̅Hlat c҉c"FHlat cc|Hlat c҉c"mHlat cc,KHlat c҉c"覅Hlat cc܄Glat c҉c8#VGlat cc茄Glat c҉cT#}Glat cc<[Glat c҉c#趄-Glat cc Gƅ#Ê$j7lat c҉c$)Flat cc_~Flat c҉c0$كPFlat cc.Flat c҉cX$艃Flat cc迂Elat c҉c$9Elat ccoElat c҉c$`Elat cc>Elat c҉c$虂Elat ccρDlat c҉c,%IDlat ccDƅ8"7lat c҉c@"ԁKDlat cc )Dlat c҉c"脁Clat cc躀Clat c҉c"4Clat ccjClat c҉c"[Clat cc9Clat c҉c8#蔀 Clat ccBlat c҉cT#DBlat cczBlat c҉c#kBlat cc*IBƅl%<lat c҉ct%Alat cc~Alat c҉c%/Alat cce~Alat c҉c&~VAlat cc~4Alat c҉c,&~Alat cc}@jjL&k^;IP&Qklat c҉c}?@lat cc|@lat c҉ch&x}?lat c҉ckn?lat cc]|?kkn:olat c҉cp&|D?lat c҉ckoP?lat cc{>kmlat c҉cx&-|>lat c҉ckn谀g>lat cc{E>kkn:olat c҉cp&{=lat c҉cko=lat ccgz=lat c҉c&zl=lat cc+zJ=Plat c҉c&z=lat ccy<ƅ&f7lat c҉c&%z<lat cc[yz<lat c҉c 'yL<lat cc y*<lat c҉c<'y;lat ccx;lat c҉cp'5y;lat cckx;lat c҉c"x\;lat ccx:;lat c҉c'x ;lat ccw:lat c҉c'Ex:lat cc{w:ƅ(tWlat c҉c(wK:lat cc w):ƅD(lat ccv9lat c҉cP(=w9lat ccsv9lat ccQvp9ÈزLrƅ(Ê(tmdƅ(lat ccu8lat c҉c("v8lat ccXuw8lat cc6uU8ːÈزeP)rƅ(lat cct7lat c҉c(Tu7lat cct7lat ccht7ˍvjh ktGeblat c҉ct7lat ccs6Ùu"lat ccs68lat ccws6ƅ) qlat cc0sO6qÉڹ)s26s&6qÉڹh)s 6r5xqÉڹx)is5r5OqÉڹ)@s5r5&qÉڹ)s5cr5pÉڹ)re5:rY5pÉڹ*r<5r05pÉڹH*r5q5ƅT*~alat c҉c\*=r4lat ccsq4fˉk,pfFjh k,HDW_lat c҉cq4lat ccp3ƙu"lat ccp3T"lat ccip3ƅ*Ê*3lat c҉c*p3lat cco2lat c҉c*Vp2lat cco2lat c҉c+p}2lat cc/uf8/uf8.uf8.uf` 8.u'fd$8%08`.fVÉڹ2 Xڹ\jڱ_XbWڹ\Aڱ_/b.ڹa\V lat ccMG88-'f;"EPEPEPMȍU썅TjL&@8*ڸVUEDŽu.vTÉڹH8gVUEttO0TÉڹP8!VMڸZYUxSÉڹ\8UVEPuuȍ肼ڸUTRSÉڹd8}UjU׍NڸTUT9xp8C+Ít8.+fXf|8Hüp8*XEJ9uZQ$8&u9S$8f  8G 91QÉڹ2SWڱ E^DڹwX.ڱ.^ڹNXڱ.]ڹ%Xڱ ]PڸFF FF؋\$`t$d|$hlÐ$t$ËƋC $t$Ív\$ t$|$$$@ t $@u D$$@t$$H B$@9u D$kD$$pFÅtt$XD$$@t=tD$uD$tD$t|$D$\$ t$|$ÍvU]u}EhE@ PE0hU UR QuUBUBUBUB]u}ÉU ]u}Pja]u}ÉU ]u}QRPh]u}ÐU ]u}RPhE]u}ÉU ]u}j]u}ÍvU ]u}jQRPj5]u}ÉU ]u}RPj!]u}ÐU ]u}Pj)}]u}ÉU ]u}RPjZ]u}ÐU ]u}RPjIh]u}ÐU ]u}QRPj6_]u}U ]u}j]u}ÍvU ]u}RPjt]u}ÐU ]u}QRPhT]u}ÐU ]u}RPh]u}ÉU]u}EӋEu-EEu EEE:u Eu"ElE؉EEU)‰PuhFu;Eo8i2c,H J HJHJHJHJH J HJHJ ËHJHJHJHJHJH J HJHJ HfJ ËHJHJHJHJHJH J HJHJf ËHJHJHJHJH J H J HJHJ ÍvVWƉ_^ÐVWt| NOIu_^ÉS(у)ʃl| l| ~;ك[ÐSl )˃,l| < }|[Ð}[H|Soу)ʃ oLoTo\odL T \ d ~w[ك Stу))ك)VWƉ׉ȃ?ooLoTo\od ol(ot0o|8LT\d l(t0|8uwك_^[ÃHSoD )˃ o oTo\odd \ T  }Dw [VƉȃ=uX((L(T (\0))L)T )\0(d@(lP(t`(|p)d@)lP)t`)|px.LT \0))L)T )\0d@lPt`|p)d@)lP)t`)|pxuh@((L(T (\0++L+T +\0(d@(lP(t`(|p+d@+lP+t`+|pxf@LT \0++L+T +\0d@lPt`|p+d@+lP+t`+|pxt) u^Á}\DHJʃ Sу)ʃ LT)L )T ~ك [Stу))ك)RPQYXZʉ[ÍvD  T T SD )˃  T) )T  }D [Ã$w9Ѝ~t#)~9 tP9X%P@%T@ÍvU= tP@T@<=v?tTP@T@=w?t0P@8T@nUW ~|i_ÉU}у~ Љуf}U}ljȉу~}U }]Ljˉ1tʈuA)ʉ}]ÍvU }]fˉ1tffuA)ʉ}]U }]ljˉ1tʉuA)ʉ}]ÍvU }ulj։ȅt;|&ك) u t ))lj NG)ȋ}uÉU}u]lj։ȅtN|8;u2ڃ)Љ t ))@)) fNG)ȋ}u]ÐU}ulj։ȅt1+~(}uU u]مt11v8tAF9tuȋu]ÐU}uljΉ19vȪ|ك)}uÐUu}EUMPQ}u1M9vȪ|ك)YXu}ÐU}u]։FG9v؃|&ك) u t ))lj tV_)Ћ}u]ÉU]u}Ήlj}}VG)tFgGʈGu덴&ڃ!Ѓ%_u wՃr#ArArAtt Gu}u}]ÍvU}ǹ1t )ȋ}Ív t@ tÐÐÐÃ$?u È؋$Ð?uUHÐU@ÐUUÍvUÍvUSWNjU EM]_[Uf?fEm=v?t X@EUlat xm|m2Uf?fEm=v?t X@EUlat mmUnMnt n( nnv?hw?v<u = tP@T@<=v?tTP@T@=w?t0P@8T@Ív8uÃ$:|2=?u tÉt$$ɋtHt]$ÉÍv$ÉÍvÉÉÉ$ÉЉ‰q$É ÉU]u]u х~ vp9r]uU]u}EыEEU ]ȅ|= ȍ9s2 ˉ+3{9u;uuu) 9rӹȋ]u}v $t$|$ljօt*ˉډyt M ى@$t$|$ Ð\$t$|$ Ӊ$ʉ@9)lj<$$}.$~ tu CA9rЋ\$t$|$ Ív\$t$ |$$׉L$u$A7$uv$t$$D$0$؋\$t$ |$É$t$É΅tGtC؋t9؋t؋؋@t fv$t$à $t$|$É։υtHtBu3t ؋u !$t$|$ Ðtt @t fÍv$t$Éօtt Stf9t[uf$t$ÐU]u}EˋEEEEΉE9~+EƋE9uE@%M}GhEU9u/E@%M}GsMEPCb/MEPCOE@%MEX1UE]u}U0UuyDž;uƅӋ9|#Hv@;4u ƅ9ኅtDžƅu ˉA%׋9tKvC4t^;~+F9tev\$t$|$ $΋ $ffff9~ ω)ȉf@% $ÉFЋ$\$t$|$ Ã$ )u B@vÉ؋$ÍvѺÍvU]u}lj΋M EAMA;MUU}EtUh…}]]ˍW-]u}U ]u}É׉։B9}B։~ @B)3{]u}ɸv@f BfuÐÃUEU UEU ‰U]M] |s ȉ؃ȉڋ]vUEU RPRP}KUEU RPRPH(X@uuÐPÃ$щKغ)É؋$Ð$щKغ)É؋$Ð@\$4t$8|$u9$t$|$ É\$t$|$ É։$Hǹ9|IAЊ %u9$$\$t$|$ Ív%Ív$Ð% f$f$Ðf% f$f$Ív‰%ɉ%ÉU]M] ʉظʋ]vU]M] ʉظʋ]v$$D$ fBfD$D$ \$D$Ív$$D$fBfD$D$s|$l$ÍvUfEfEf?mÐj<$XÍvUEEX@UÐU]EEEÍv f<$,$ U f}m U f}m U f}m U f}m U f}m U fm}m U fQ}m Umɛ}}fefMmm U <$f $f $,$mmf $,$ vU <$f $f $,$mf $,$ U m<$f $f $,$f $|$,$D$T$ Um}EU Umu%mt }mu }ms%EPu ut [mmɃ <${}ms1}}fMmm}mEUEtm}m$Ëlat mm ЈËlat mmlat xm|mӋlat mm ÀÅt<lat xm|mӋlat mm ÀÅtlat xm|mӋlat mm ÀÅt:lat xm|mӋlat mm ÀÅt Llat xm|mӋlat mm À Åt $UfE-<v8v<M]f E-<w<}]fErEEE EEU]ff~+v<M]fHff<}]f@ff|EM]E\$t$\$Z\$ ff9|fNfFL$\$f9D$$D$ D$$\$t$Ív\$t$\$Iff9|fNfFL$\$f9D$$D$ D$$\$t$Ív$$D$fBfD$D$ D$D$ D$T$ ЈD$D$T$ ЈD$D$T$ ЈD$D$$%T$ ЈD$D$$%D$fD$%~ffL$ ʈT$%D$D$$T$ЈD$D$ D$D$D$D$ÍvU …ډЃk m۪B}Ѕƒk m۪C}Ѕƒ k m۪D}<U<Uf<fUvƒk m۪\@}ЅtUƒk m۪A}Ѕt4ƒ k mۨމ̋]u}vU]u}E]M UEUEƒ|6BJމȃDu>މ̋]u}vU]u}Nju] UEE|3AIڃ0ʁƉӃϋ]u}U]M] SQ]vU]M] SQ]vU]M] SQ>]v$t$ÉAI%Dƃދ$t$Ív@ hÍvUƉӉElj‰9}I)ЉdQvUƉӉElj‰9}I)ЉvU}u ÉPRΉ9}I)Љ) U}u ÉPRΉJ9}I)Љ}_LUpE Et$HtTHHHH'Dž<E<Ef<fE<E<Ef=fE Dž Dž=E=Ef =fE Dž<E<Ef=fE^ Dž=E=Ef =fE. Dž=E=Ef =fE=ufEf%%fEf%%=UuUut\t>t=%=  =ltm}+EЋ9~ EЉ}@|9}~9}+EЍ(=щVEEEPuuFmmvEPuu}|E;~ EЋE؃uFmt: -,=m}Mԋ|Mm-8=mrMԋ}؋EЅ<E<Ef<fE}܋Eл9|KC-,=m}9mm}苅tmmm}mmr mm}EPuuuMEPXEPuuX}}MЋEЅuEEƄ0uл9KCmvEPuu-,=}-,=m}Eٽٽfm٭߽٭0U؈E؊<9v1E U؈EHPM95}؉H<0ujщEԊtƅ-|Eԉ#xj.j Uԉ1)ЍщJ9}_P)PD=щ{ Eԅ}8Pp=щ z6Pt=щX Bjx=lujщEԅËMI‰9~NËU)RD=щPJӋEP.\Uԉ1)ЉEHPuԍD=щcP.E~'.B& .I;}RP)ЉV8!U,04Eƅ8IvGB~ ƅ8k E >E BfEf F-,=m}Ehmw@ƃ~ExJEPԋE@ЅٽDٽFfDk Uj۬>٭D߽<٭F-,=ɋExu8t9t8utE@Ѕ8u}RE@k Eh۬> <$-|=wE@PEE,04 U ]uEЊMv0ъ9v 0Ʌuϋ]uU ]u}} ]uVuuWS]u}U]u}ƉUʋ]E EEEEkuOJЃɋA9A9A)Ɖ؃ЋUER؃؃Hv<9}G <9~ O9vbLE]‰5U;E}=EE)Љˆӈز8r!ʐ‹uu 8wEEE]u} U ]u}ÉЋuU }VRW‰t fk]u} U@]uĉ}ȉEUM̋EEE=uEE @|rE 8XEEE @ڃ׉þvFjj SW 0D5jj SWoljӅuׅuӉu܋EtFE}AE}E+EEԉ;E}uEԅ~uE+EԉENE܉EFuvFE܋ED0E܃|+EEԋEE؅tE؃~EE+uԋEԅmEԺ9|AJBuL9uD0LL5rC;M9uHD<0uD;E}u;E~Eԅ}+EEԋuًUE0ًEE @u uE܃lj|ȃ%U+ȃ%U-؉lj 0؋ËIgfffƒ0؋ËЋEEIЋE0IEԋEԅ|U܋E@9|2KvCM؋E؅u%u.ID}̈7I9ҋEЃu"ʁE-IʁE Iȅ]uċ} U ׉΋]9}5P)Љ@9} @;vU ׉΋]9}5P)ЉhJ@9} @vU}u ÉPRc9}5P)Љ@9}  @FU}u ÉPR9}5P)Љ@9}  @vU u ]}WuuWh@9} @U΋]uu h,@9} @苻 v \$t$Ɖ$ u $$;$|$ t tފ$+r+t u $$;$s$%<$`,$ttt, t ,(t, uH$@$8$0;$~($@%Xtxu$v$;$~$%<0t$؋\$t$ Ð(\$t$ |$$D$T$ L$D$D$D$\$ ‰T$D$ D$9D$D$ u;D$D$J%T$ <0D$~ $$ uD$D$|$ ,0`, v,rX,v",rP,v2JD$|$ 0D$7D$8T$ :7D$D$|$ WD$jD$L$$d$D$D$:$sT$)Љ;T$r9v D$D$D$D$D$D$ 8D$9D$D$D$|$t D$؉D$D$u3$ t*D$|!HtHtD$D$ fD$D$D$\$t$ |$$(É\$ t$|$D$D$T$D$||$D$9T$H%T$<0vT$,0rN, v,rF,v,r>,v&8T$0(T$7T$WV\$: $s)‰4$9s D$,$d$ЉD$D$79FD$\$ t$|$U<]ĉuȉ}̉E܉UEEEEME]܉‰UEE9EE܊u7UEJ%U܊<0EUPRjj EUE uUUE4EE!EU܊  ,0s, v,g,v&,r_,v:YEE0UIEE7U-EEWUEu]uuERP EUU9r*w;Uv#EU+E;Urw;Er ;]wr;uvEEYEUEEU؋EEE9EEU؉EЉUԀ}tUЋEڃUЉEԋEЋUԋ]ċuȋ}ÐU$]܉u}EUEEME]‰U}EE9EE\UlEJ%U<0QECEM$,0s, v,g,v&,r_,v:YEE0UIEE7U-EEWUEu]U9r:w;Uv3ERPU)Љ¸ȉQRN 9rw9sEEIuuERP5 EEUEEE9EEU]܋u}É@\$4t$8|$<Ɖ<$|$|$$9| t t9e+rZ+ttNJ=T$$=T$(f=fT$,& 0T$0D$0-,=,$<$9|0 r9o.ud|$ 6 0T$0D$0-,=,$<$-,=l$ |$ 9|0 rl$ ,$<$%u <$9 ʋ}uu Ɖ"Er!rrEƉru}EEEEE}t EUu}U]uJBM !t,C|JvBM!tC|؋]uU ]u}EEEE]u }u}u O|s‰؉؃EM]u}|}s‹MEكM EE]tSuuu؃ljSuuulj։]u}U]u}]uEE} uu ~|s؉؃‰ډ|}sEMكˉ E]PRډPRMt ÉۃÉщ؉ʋ]u}U$]܉u}M]UUU EE|sEEȉ؃ωޅ|!}sEEE؃MЉ}WuˉVSEUEmu }_uS;}wBrE;Ew8;uw3r;]w,UEut"}u }uEu EtEU؃EU]܋u}ƒ $t$$@$@$$Ð$Ët+0$Ívt!ƒ|?uÉ$t$É֋9t0t#~?uɧ躩3$t$Ð\$ t$|$$T$L$D$uD$]$wD$D$uD$7$QD$D$t@NjD$t@Ƌ$;D$uKD$;D$É$t$$$AD$ס$;D$u6$$@ $裡$D$蓡?$苨$u$D$e$AD$R\$ t$|$ÉU$]܉u}EUυu]EEEUM;uE]9|*KCEU;uEEE9؋Eu]诧Et@ú9|IAu4tv9EhE؉E]9|2KCEEtEt@@UE,u9эE!]܋u}É \$t$Ɖ $$u!$t@9~ӉٍV$՟\$t$ Ív \$t$$3$~$C蒟\$t$ É\$$Ӌ$k$$@\$Ív \$t$$օtu蹦Éڋ$؅~$\$t$ ÐU]u}E׉ΊEt'uBVÃu @@ÉڋE؅~Eى荞]u}U]u}É׉MEt@Ɖ@9}@Ɖ~ ڋE@B)3՞]u}É \$$T$$;D$u i $tID$t@9~ȅ~-T$$蘟Åu4$t@T$tR)Љ$t@T$tR)ЉÉ؋\$ à \$$T$$;D$u3 $tID$t@)‰Ӆuȅ~T$$É؋\$ ÐUu aÍvU9} BÃ\$t$ |$$׉$u# $p$$$uN$($苤É 9ڃ ~ډ9| $蘤$Ƌ$t@@É9}ى$)$~<$?u D$ D$|$t $ߣ$0$$x$t$趢$\$t$ |$Ð $t$|$NjXAƉkZ`$t$|$ Ð\$$Ӌ$tRB$'$tR$J$tR$\$Ív \$t$$tA$0tv$$ C讚$tR$\$t$ Ã\$t$ |$$T$D$td$;D$ËD$t@Ƌ$t@lj$;u$@\$ $A$ \$t$ |$ÉU]u}EUϋuO}Et@9|UtR9~Et@)Ɖ~3}ÅtEډs؃pEbE]u}\$t$|$D$$D$T$~W$t@L$)ЉD$ 4$.CT$:BuD$|$G裚u\$ F;D$ ~̋D$\$t$|$Ã\$ t$|$$T$D$$t@~UD$t@$tR)ЉǾ\$+F$:u $t@ڋ$ ut$C9~ϋD$\$ t$|$Ív\$t$|$ $$4$tv9|OvG 8u C9Ћ\$t$|$ Ð$$|$$t@=~ $D$zڍD$#|$l$$Ð$ $Ӌ$t@=~|$( $D$ ڍD$ -=|$l$$ Ð $$$Ӿ$t@=~ $D$ڍD$Ɖ$$ Á$$$ lj$˾$t@=~ $D$/ٍT$Ɖ$$$ É$$$ $׻$t@=~ $D$D$]É։؉$$$ Ð$$$ $׻$t@=~ $D$(D$mÉ։؉$$$ ÐU8É։DžEbdePueEPuu Phf苛DžA][fCDžXtgU }] uWWhז $$É$΋ $D$|T$$$ ÉU8É։MDžEbʙPu]u uhwDž]șe谙DžXtLfU8É։MDžEaPuWhDž;]=d֘DžXtreU8É։MDžEaPuWhqFDžc]ecDžXtdU<u} ÉUDžE-`0PuWWVعdDž]4bDžXtcU<u} ÉUDžEA_DPuWWVع觾xDž.]Ha0DžXtb\$t$|$ $׉ˋ$0tv9X~R؅~L$)9})@É)9|!O))A$$:茎)ڋ$\$t$|$ U@]uĉ}ȉEUEMUи]PEt@Et@É9~@NEt@hEUtRڍE~UEE0Et@}褍)~#UEt@)E0yEQ]kE_EYEXt`]uċ}Ð\$$Ӊʋ$"$tR$蒔\$É \$t$$Ӊ΋$$t$؉Ɍ\$t$ Ð\$t$ |$D$$$tRD$$t[9|$NvFD$“Nj$D0耵D79\$t$ |$Ã\$t$ |$D$$$tRD$#$t[9|$NvFD$RNj$D0舵D79\$t$ |$Ã\$t$|$ lj$ˉڋ$޻9|2KC=}$ŠD $ےD?9ϋ\$t$|$ Ív\$t$|$ É$Ή$9|OG$ffTxC9\$t$|$ Ð t$|$$<$mt$|$ É t$|$$<$m󥿐mt$|$ Ív4$|$ƿm4$|$à t$|$$<$mt$|$ É t$|$$<$m󥿐mt$|$ Ív4$|$ƿm4$|$U1Ív\$ÉڍU w$t $X$$f@$$\$Ã$Ët+脑$Ív\$Ët6|+?u $C$<$t\$Ívt!ƒ|?u ÉU<]ĉuȉ}̉É׉MEMUԸsXvPuBUtRЅ~-9~EumэU5m֋MsZEzEXt\]ċuȋ}É \$t$$֋$؅~Fً$5m$f\$t$ Ð \$D$$\$ $tIȅ~T$$mӋ\$ à \$D$$\$/ $tIȅ~$umT$mӋ\$ ÐD$$$tRD$ $tID$$1ÐD$$$tRD$ $tID$$Ð \$t$$Ӌ4$֍t#f ~ $؋mӋ\$t$ Ð \$t$$Ӌ4$ t@f踇Ɖ$~$B$f\$t$ à \$t$$Ӌ4$t@fHƉ$~$҅$f\$t$ U<]ĉuȉ}̉EЉӉEMUظ/U2Pu>Et4f軆~E5m‰֋MڋE3WE:EXtX]ċuȋ}É \$t$$Ӌ4$t#f8~ $؋mӋ\$t$ ÐU<]ĉuȉ}̉EЉӉEMUظ;T>Pu>Et4fDž~E5m‰֋MڋE?VEFEXtW]ċuȋ}É$t$Éօt#~?ut3$t$Ív\$ t$|$$T$L$D$uD$$/D$:D$uD$c$ D$D$t@NjD$t@Ƌ$;D$u[D$;D$É$t"$‰ $$‰AD$$;D$u:$s$‰A$轂$D$諂K$+$)$\$‰w$‰AD$^\$ t$|$ÉU$]܉u}EUυu]EEEUM;uE]9|*KCEU;uEEE9؋Eu]CEt@ú9|IAu4tv9EE‰U]9|8KCEEt%Et@@UE0E9ɍE]܋u}ÉU4]̈EEMUԸP蔇PuEUmӋEf%SEIEXt`Tf؋]à \$t$$Ӌ$# $Wƈff$f\$t$ ÉU4]fEEMUԸOۆPu+EUmӋEt@uE?ZREEXtS؋]É\$$fӋ$Z $f\$ÍvU4]̈EEMUԸ)O,PuEUmӋEfQEEXtRf؋]U4]fEEMUԸN迅Pu+EUmӋEt@uE?>QEڅEXtyR؋]ÉU<]ĉuȉ}̉ÉfMEMUԸ2N5PuEU5m֋MUPE\EXtQ]ċuȋ}Ã\$$fӋ$ $f\$Ív \$D$f$T$mӋ\$ ÉU<]ĉuȉ}̉ÉfMEMUԸVMYPuEU5m֋MyOE耄EXtQ]ċuȋ}à \$t$$Ӆtu4$ر辄$5m‰֋\$t$ ÐU]u}E։ˊEt2u}g8B_ƒu BC؉ÉڋEF U5m֋]u}UD]u}ĉEȉỦ΋} ]EMUظKPk@EЋE@;EẺEEЅ}EtUЉfg}…}UUЉ‰U5m֋MŰE:NEւEXtuO]u}U ]uE։ˊEtBf|ƒu BC؉ÉڋEoU5m֋]uU]u}EӉϊEtBf}|ƃu @@ƉEEz]u}vU]u}EӉϊEtBf|ƃu @@ƉE@Ez]u}vUD]u}ĉEȉỦ΋} ]EMUظIPk@EЋE@;EẺEEЅ}EtUЉf_{…}UUЉ‰U5m֋MŰE2LE΀EXtmM]u}U ]uE։ˊEtBfzƒu BC؉ÉڋEgU5m֋]uU]u}EӉϊEtBfuzƃu @@ƉEEx]u}vU@]uĉ}ȉẺӉMEMUԸZH]PuYEt@ƅ~EU=m׋Et@Ɖ@9}@ƉŰEexB)M̍1xJEJEXtK]uċ}ÉU]u}É׉MEt@Ɖ@9}@Ɖ~ڋEwB)swx]u}U@]uĉ}ȉẺ։MEMUԸ>GA~Pu]Et@Å~EٍU=m׋Et@É@9}@ÉŰEGwB)M̍YwIEEXtJ]uċ}ÉU<]ĉuȉ}̉EЉ։EMUظF}PuVÅ~GٍU=m׋Et@É@9}@ÉUЋEvB)MЍYwHEEXtJ]ċuȋ}ÉU@]uĉ}ȉẺ։MEMUԸE|Pu]Et@Å~EٍU=m׋Et@É@9}@ÉŰEuB)M̍Y_vHE:EXtQI]uċ}ÉU<]ĉuȉ}̉EЉ։EMUظE |PuVÅ~GٍU=m׋Et@É@9}@ÉUЋEuB)MЍYu^GEEXtH]ċuȋ}ÉU]u}É׉MEt@Ɖ@9}@Ɖ~ڋEtB)s'u]u}à \$$T$$;D$uP $tID$t@9~T$$Mvu$tRL$tI)ʉЉÉ؋\$ à \$$T$$;D$u4 $tID$t@9tT$$u؋\$ Uu rÍvU9|} rÉ \$t$$Ӊ؅$uN$$u6$(ލ4u $z9vڍU $'{$^Ƌ$t@~6$t@@9~$t@@$r$$0$f$X$t$$\$t$ U4]̉EEMUظAxPu/EEڍEMЅtIڋE:EDEiEXtE]ÍvU<]ĉuȉ}̉E׉EMUԸ;A>xPucMtIEumU5m֋Et@9}MtIEDqIE3qfD_CEEXtD؋]ċuȋ}ÍvU4]̉EEMUظ{@~wPu/EQEڍEMЅtIڋE2BEEXt4D]ÍvU<]ĉuȉ}̉E׉EMUԸ?vPucMtIEumU5m֋Et@9}MtIEoIEofD_9BE]EXttC؋]ċuȋ}Ív\$$Ћ$mӋ\$ÐU8]ȉủÉ։MEEMUظ?vPu2EOvEڍEE]*vEЉ|AEvEXtB]ȋuÍvU4]̉ÉUEEMUظn>quPu0EuEڍE_E]uEЉ@EuEXt&B]Ð\$$Ћ$mӋ\$ÐU8]ȉủÉ։MEEMUظ=tPu2E uEڍEE]tEЉ8@EtEXtsA]ȋuÍvU4]̉ÉUEEMUظ*=-tPu0ExtEڍEgE;]UtEЉ?ECtEXt@]Ð\$t$|$ Nj$tQtE@Ɖ@lBL74$$\$t$|$ U]u}EUϋuO}Et@9|UtR9~Et@)Ɖ~F}EÅt.Eumxl؃P4sfEE]u}v\$ t$|$$T$D$$t@aD$t@$tR)ЉǾ\$3F$ff;u"$t@ڋ$mut$ 9~ɋD$\$ t$|$Ð\$t$|$ $ $$t[9|NFf9f9u 9Ћ\$t$|$ ÐU8]ȉEUEEMUԸV:YqPu'E,EUEE̋U<EEEiqXt>؋]U4EUUxmDž9pPu6DžU'<HDžXt\=؋ÉU8]ȉEUEEZMUԸ9pPu'EEUEŰE_;EEEXt<؋]Ã\$t$|$ $ $$t[9|NFf9f9u 9Ћ\$t$|$ Ð\$t$|$ $׉ˋ$t@$p9f؅~`$+9~)@É95O))A$umB$umzh)ڋ$\$t$|$ ÍvU@]uĉ}ȉEUEMUи^7anPEt@Et@É9~@NEt@rEUtRڍE~#UumEumgEumpEt@}umf)~9UumEt@B)EumpfE}]#E8EEXt(:]uċ}ÐU4]fEEMUظ5lPu.fڍEEEUEЋ mыEfa8EEEvEXt9f؋]ÐD$$$D$ mуÍv \$t$$Ӊ΋$$'tE~?Bff…~9}Ƌ$5‰Pe$f\$t$ É \$t$$Ӊ΋$$t/~)Bرf…~9}Ɖ$؋mӋ\$t$ Á$$|$$t@=~ $D$ڍD$%|$l$$Ív$$ˋ$t@=~! $D$.ٍT$辩$Á$ $Ӌ$t@=~|$( $D$ ڍD$ a-=|$l$$ Ív $$$Ӿ$t@=~ $D$VڍD$'Ɖ$$ É$$$ lj$˾$t@=~ $D$ٍT$pƉ$$$ Á$$$ $׻$t@=~ $D$ZD$É։؉$$$ Ív$$$ $׻$t@=~ $D$D$É։؉$$$ ÍvU8É։DžE0gPueEPuu PhDž]w>3_DžXts4U<Ӊ΋} DžE/fPu_WPhڋeDž]I2jDžXt~3U8É։MDžE/fPu]u uhÜDž]c1DžXt2U8É։MDžE3.6ePuWh蕋Dž]0DžXt1U8É։MDžE[-^dPuWhiDžD]/DžXt0U<u} ÉUDžEy,|cPuWWVعߋ8Dž9b].DžXt0U<u} ÉUDžE+bPuWWVعGLDžMv]-DžXt/\$t$|$ $$f\Pfvfrvfwa4$tv9~Q<$Fftwfr?<$Fftwfw-4$BtVӁ ց\$t$|$ U ]u}É׉΅tf[P]u}ÐU`]u}EĉӉMEEEEEMUظ)`P4EE"EEEą1UEfBfEf-v+f-v9f-vuf-f-f-v[EUċM EE@9E UċM E@fEf%?f UĈ EE9E UċM E@E? MĈEfEf%?f UĈ E8E9>}M9 9E@UfBf=E@UfBf=EEEEE@MfAE}̍EEEMfHEUȍEЉ8EЍM UċM E@ ? UĈ E? UĈ E? UĈ EEEE;Es 9]H;EsHEUċEUMfJf-v$f-v#f-v#f-v#f-bf-v ZEUEOEIEU9|-9v)E@UfBf=rE@UfBf=wEEEE;EcE@E)ECEE4EE%EXt<*E]u}U ]u}É։υt [P]u}ÉU8]ȉủ}ЉÉMEEEu EEEEE-MEE$%vEԃ uO} t1/EfC EEfC EE EHU؋Hƻ9|(KCu؋UӋE‰ЋUJыU9ڊEt%EUEEHU؋ IEH]̋uЋ}U(]؉u܉}EMEEHƸEEEB‰UEЃUEuu EsE||C;E} V@+E@NjC+E@9} C+E@ljEÉڃEHE‹EEE։@EEJPHǻ9|KCEU29uE]؋u܋}UD]u}ĉEȉỦ΋] EԉE EGH¹9|IvAH)ȋ}Ћ9uЉŰEE;EtEH]u}UUE??U]UURUmӋ]хtt‹tÉU]Ӆt‹xu >؋]ÐU]Ã;t3P]UE}t uEPU]ÉU}t uEP;t 3PE]ÐU ]ÉU}t2EPQuEt 7>;t 3PE;t 3P]ÐU]EU}t'EPQuEt =EU]]Ív \$$Љʅt"L$Mu =$D$$\$ ÃtVu L=$ÉU]uÉփv R4Ått t؋RD؋]uÐ$t$É։~؋RHt t؋R8$t$Ívt Ⱥ Q0ÐÐ\$t$|$ $4Y(t(3CBuz$<8BNIt n;A(u\$t$|$ à \$t$É։؋$Q=؉ n;P(td\$t$ É@Ã\$ É؋T$D$t0T$$<$ n;C(t $$D$$\$ É$É]D$ÍvÍv\$ t$|$T$D$IvD$Xt0HǾ9r"NFDT$莒u D$9wD$@D$D$u$$\$ t$|$Ã\$ t$|$T$L$$H$Xt5HǾ9r'NvFD;D$uLD$3>9w݋$@$$uD$\$ t$|$É$\$t$|$ D$T$D$D$$D$oD$@D$tUT$BËD$JD$ ;|$ |4L$ D$ CT$Pu D$*C@SЉ;|$ ЋD$@D$D$u\$t$|$ $ÉÉ@ÉЋI =É@ ܐÉ@t9u9Ív@,Ã0\$$t$(|$,D$ T$D$D$D$ D$D$ wD$ @D$tD$ËD$D$D$D$HǾ9|0NvF;D$uD$D$ D$T$D$ $&9ԋD$ @D$ D$ uT$L$ ȋ Q@\$$t$(|$,0É,$ $$$($$$;$$$ $ @,$t+$t$$$B DŽ$$HǾ9|GNFFu2D$$$$$$99$ @$ $ ;$$ȋ QL$ $$$(,ÉÍvÍv\$t$|$D$ D$ $D$KD$x t3G@lj<$_\$9|NF@D$ )9D$@D$D$u\$t$|$ÍvÍvÍv$; u(HZ ; uHZ ; u ;u$ÍvUD]u}ĉljӈMȋuEMUԸ`c=P|Ct HtHtGHt jCaCV}CEEEŰEMыẺ(}CEEEŰEMыẺ>ttEȄu 6PXEEXt ؋]u}U]Q=‰ر]ÐU]Q‰ر]ÐÉ\$ t$|$T$D$PvD$p(t7Hÿ9|)OGkD$8t$T$u,9ڋD$@D$D$t nD$;P(u$$\$ t$|$Ív\$ t$|$T$D$RvD$X(t9HǾ9|+NFkD$x t$B T$Bt,9؋D$@D$D$t nT$;B(u$$\$ t$|$Ð@(UEU Mct@ vUEr9U]uuFA9Åu Q0؋]uv?u $8$DÉ@t 3É t@ÍvU4]̉uЉÉ։Mv R4ÅtKMUظ9PuغuECXtt غ Q0t t؋RD؋]̋uÍvU8]ȉủ}Ћ}] uEMUܸil9Pu3EOEGdE8GEVSuԋEԋEEXt؋]ȋű} vU0]Ћ]EMUܸ8Pu2EECECEuԋEԋPTEEXt؋]U0]Ћ]EMUܸQT8Pu2E7ECLE CEuԋEԋPEEXt؋] \$t$É$C4$C\$t$ ÐUEU M3t@ vlat nnÐ$lat nnt@  f$0؋$Ívlat nnt B ~J f/à $t$|$É։ϋlat nnW8_$t$|$ ÍvU(]؉u܉}ƉӉMlat nnNju8@8P}E2ZB ]EEEXm4Ek4EEEE;E|EUEt7EMU Eދ]?E9}D9v@lat hm҉lmlat pmtm9WU EAUP]؋u܋}ÐU]lat nn?ttpHP?Ӱ,?u f-f?f=v , ?,]ÐU ]u}Éп‰lat nnu8lat nn?ttpHP5?֋y4]u}Ã$lat n҉nu +@$Ív $t$|$lat nnu +NC u;ދlat nnS~tF4;5?$t$|$ à $t$|$lat nnt{u *4C@ uC0{GCtGd44$t$|$ Ã$lat nnuglat nn@ 2$Ív$t$Ëlat nn0u*; Etu$t$É?Élat nnlat nnÍv+Ív=?t?É=?t?É=?t ?Éf=?t ʋ ?Ív \$t$É։ $lat Xm\mwF=|P-t*HuF؃u$ nMً$n<lat Xm\mfilat Xm\mfg\$t$ UL]u}EUˋuIE5MUԸ0Pu8IE~SVuEPnЃUEIEAXtC]u}Uu}EUEQPuEPnЃu} \$$D$$D$PnӋD$\$ Ð\$$$nӋ\$ÍvD$$$D$ HnуÍvD$$$D$ |nуÍvD$$$D$ LnуÍvD$$$D$ nуÍvUu}֋URQPnЃu}v\$$$XnӋ\$Ã\$$ҋ$XnӋ\$Ív\$$$XnӋ\$Ã\$$ҋ$XnӋ\$Ív\$$$XnӋ\$É\$$$XnӋ\$ÉUEEU RPE`nUEEU RPE\n$$ TnуÍv$f ‹$ TnуÐ$ ‹$ TnуÉ$fT$T$$ pnсÃ\$$$XnӋ\$Ã$$ pnуÍvD$$$D$ tnуÍvD$$$D$ xnуÍvU4EUEMUԸ,Pu(EgEUE!ŰE xnE:EXtQÍvU0EEMUظ,Pu(EEuEUЋE xnEśEXtUEE <$EdnvUEE <$EdnvUEEPu uEdn UEm <$EdnvUEE <$EdnvUEu uElnUEE$E D$Ehn\$$$XnӋ\$É$$ n҃Ív$$ n҃Ív$$ n҃Ív$$ n҃Ív$$ n҃Ív$$ n҃Ív$$(n҃Ív$$$n҃Ív$$,n҃Ív$$,nf%f؃Ív$$,n%؃Ív$$D$ <$,$ÉfÍvfÍvfÍvU4ÉUDž PuUعl9 DžVfb] X DžXtÐUÍvUÍvUÍvUÍvUlat Xm҉\mtfÍvlat Xm҉\mffÐlat pataÐU]É؅}!=?t ؋ ?щ؋]Ív$=?u< Á@lat hmlm9r?$É$t$ 9| NF< t  Љ5 9=?t?Ћ$t$Ív<Ív'  @<Ũ t @Ũ С Ð$$3lat Xm\mf|?|?С|?uulat hhơ?ڹ4>K; ?ڸt@ڹD>';?/ڸ ;]:? ?щڸ:6:L@ڹ<::lat cc@=ulat cc0lat aa@=ulat aa0F=u0lat kk@=ulat kkA0<~$$ÐrnÐÉ%`aUÍH.PعL>p Ã\$t$|$ ƉӉ $?t $ډ=?f5??4$5L@lat nntڸf?f=v 1 ?%\$t$|$ Ð $t$|$É։lj‰؉3$t$|$ UUf?X?TL@f?f=v ?ÉfÉuf?ÉUDEUM؍UPEHEEE3EvEEEEEtlU䍅 ?эU7E6Et9Ex?U9}}u"E=EEEEE;EwXtE7MUPfXt0gXÉ$$$ $P ?щዔ$6$5pXN9|5NvF ?щዔ$G6$59ϋ$$$ Ív$EEP|?XDӋ$ÍvU]ø E|?PXE@|?]ÍvU]u}EӉM؅} EgUڃEEu EDپ9|#NvFUE}2lat kk2Clat k҉kٸ2lat kk1lat k҉kh>m2lat k҉kG2lat k҉kl>2lat k҉k6lat k҉kx>1lat kk 1lat k҉k<1lat kk0]u}pxh |$x<$xx1Érzj bbÐU]hjjjÃu +؋]É t$|$$<$ E t$|$ É4$|$ƿ E 4$|$U@ ;$Eu P ;(EtÍv$ÉЋ$E҉$ÐÉ ,EÍvÉHEÍvLEÍv8EÍv(EÍvÉ$EÍvÉ0EÍv 4EÍvÉ$EÍv(EÍv4$|$Njlat `ydyЋJP )щH4$|$Ã$Ëlat `ydy‹HB )JB C BCBCCCCCC C$$ÐP@ H t AÐ$xt XHKxt HXY@$Éx t P HJxt PH J P@ Ív\$t$ |$‹B|jЃD$ $+$R$DӋt$~t F~x~t ~FGF$D$D$9vƋ\$t$ |$É$t$É։W~t VF B F C~ t F VP)$t$Ã$t$ËstF#-F;?s ;?v ډi CF$t$É$‰Ѓ$z t J ZYzt JZ Y JR j$ÍvPHu$PHu Hà $t$|$Ӌptډ~ u v $t$|$ É\$t$|$ $Y؃+$ǃr]$ȉƉ؃uȉ8؃ F$AF؃ $AAAA tH $Ћ\$t$|$ Ð$t$É֋Ft FCVtK S~ t F VP~t FV P VF $t$Ã$PuP‹Juc؋$Ã$t$ÉCu3)ƋFu ډ$؋$t$ÐU]u}UMUUE]t#[uEC^>;}r-;}w(E8u SECFEH ދ[u؋]u}U ]u}EUME$ƋEtUB;?rEPىEDž=4yu=8yu xPy3xxxnEPxىDžtVEGt GW P G x t G WPUBG Ext UBxGExPyE$%EEt?Džt^?ETE;?w?Džt9?E/E;?w?|Džt?E EdDžu-EVDžu=mt ECEGGUBG Ext UBxExE썐EBB;vB}EUEE@EƋE)9v IEEMA E)9rȉÉYK׋EU\YtKEMUDPE@E$EUE$ BEBBB tPE]u}É\$ t$|$D$D$D$lat `ydyƋD$\t)‰׋GuFN>WtD$$eL$T$NÅu $G؃lj؃$CT$Dt@@D$B B ;BvB B$\$ t$|$Ð\$t$|$ $lat `ydy(vy9rty;zsʋy9t I HtwӉׅuىWDžt^ $ t G WPt WG B WG ډˉKœB B ;BvB B$\$t$|$ Ã$t$Åu w؃%؃Ɖ$t$Ã$t$ÉָPy4 FCFPy! $t$É$øPy CC CPy $Ã\$t$ |$Nj )ȉÉ֋%D$C9tډKD$$]D$)D$‰ϋL@HtADKCC} 3LD$$$\$t$ |$É\$t$|$ É׋G$G9t 4$M؋$)`ËSCS tZP u4$\$t$|$ É\$t$|$ Åu $Elat `ydylj؃Ƌuڃ $ \$$\$t$|$ É$t$Fuދ$t$Ív$t$ƋuPyPy؋$t$Ã$t$F Luދ$t$Ív$ËtPy4Py/$Ã$uzÉ؋$Ívƒu ƒЃ ЃÉ$$E҉Åt؋8E҉‰ر؋$É\$ t$|$D$t.Ɓ у9D$s D$ƃ T$;t$r;D$s D$zlat `ydyNj ËC9uR4$ tC9t$w6;t$v T$Ɖ+$B B ;BvB BD$D$\$ t$|$Ð $t$|$ƉӅu(Euu؋$E҉aډuT8E҉sЍE9v؉9sNj$E҉Åt ڋV(E҉$t$|$ ÐfTyf~PyfTyPylat `ydyÐfTylat `ydycxRÐ$lat `y҉dyfTyPy؉DEtDEЋ$Ð $t$|$lat `y҉dyfTyf~Py;wu 9'uCfTyf~^x*Džt!xG =xtxxCxf TyfTyføPyt Py$t$|$ Ð$clat kklat k҉k>|lat kkfÐUEE EK v?É7É/É'ÉÉÉ=?t?lat pataÉ=?t?ÉÉÉÉUÉÉÉÉ=?tn?Ã=?tV?GÉ?É7É $$D$BD$ ÐÉÉÉÉUzzzz$z$z$z,z4z<zDzLzzzzzzzzz{{{ {{{{{${,({$,{L0{d4{T<{\8{ziÍvlat patamÃ$S `zуu$Ív$t$f5 ff9|fKfCË f9$t$Ív $t$|$&dz҉ËƋOډu֋$t$|$ Ív$t$f5 ff9|fKfCË f9$t$Ív$#hzla$Ð$É9|JvB  ?s/9$Ív$9|(IAʁ?s ʁ/9ڋ$Ív$t$Éƃu t$t$Ðd\$`É}\fD$tlat Xm\mf/w}Rlat Xm\mf\$`dÍvUQRU}lat Xm\mfÍv'}lat Xm\mfÉ\$t$ |$ƉӉύvډD$$D$u$t؋$#tЋD$}gD$lat Xm\mfD$\$t$ |$Ã\$t$ |$ƉӉύvډD$$D$u$t؋$#tЋD$}D$lat Xm\mfD$\$t$ |$U]ujj~Éօ| solat Xm\mf؉]uUMU RQ+| s lat Xm\mfU]ujjÉօ| slat Xm\mf؉]uÃh\$`t$du \$0t$4 }qlat Xm\mf؉\$`t$dhÉ\$t$|$ $Ӊω%uL$B=|-t8H|$$"lat Xm\mff|$|=tHtHt$1$@ $@$@%=u %=uƊu`$B=-tH~Ht!$$$$@f$$u tڋ$}?u5t.ƐfK$$u tڋ$}xlat Xm\mf\$t$|$ Ð$$\$Ív$$H$P$$B$@Ã$$@tG$H$P$$R9tlat Xm\mfe$@ÐU]uËC=|&-t Htt0)"lat Xm\mffiSL<"C(C$C=u \"C :"C lat Xm\mut"C$]uÍvU]uÉ։رPCCPC"C@@tHtHt$+fǃL L?, fǃL SLF ]uÍv$ÉщB$Áf$Ã$Ëlat Xm\mvC=|O-~uCC=u؋S ҋttt؋S(CCClat Xm\mfg$Ã$t$É֋C=|-t2H| *!lat Xm\mff>sCC؋Sҋlat Xm\mtC$t$É$Ëlat Xm\muع,$Ð$Ëlat Xm\muع$Ð$Ëlat Xm\muع$Ð$Ëlat Xm\muYC=tHC=ulat Xm\mfi&lat Xm\mfg؋S ҋ$Ð$Ëlat Xm\muC=uCLg$Ã$t$É֋lat Xm\muGC=u=CLlat Xm\mu=ASLh$t$Ð$$É֋lat Xm\muF,$$Ív \$t$ƈӋlat Xm\mu$D$\$t$ Ð$t$Ƌlat Xm\mtF=tJF=ulat Xm\mfhlat Xm\mfg;FV9|V ҋFV9|==@tVF<u؋$t$Élat @fDfÉU$]܉u}Elat Xm\mt EUB=tRUB=ulat Xm\mfhlat Xm\mfgEYE@EE@EEEUTÉEHEP9lGuCu%tc$6tCS9}Jع$>f$%tlat Xm\mfj$$ Ð$$$ É׉Ήta$tGW9}H $!$tlat Xm\mfj$$$ Ív $$É>k$tCS9}Rعb$|-=>f$%tlat Xm\mfj$$ Ð $$ÉF$tb$5tCS9}Iع$V$tlat Xm\mfj$$ Ð $$ÉF|tb$tCS9}Iع $V$tlat Xm\mfj$$ Ð\$t$|$ $$Btn$B,$xƋ$H$C<9~ $H<)ωЉѺfډ@%$Hȉ輰$@\$t$|$ É $t$|$ËCt8C,0>tSo踷GT8CKXC$t$|$ ÉU8]ȉủEEMUظ軶PuYCtRC,0SEE;‹CKޯEb&EUE(MЋ+C E0&EE虶EXt8]ȋuÃ$Éغ<CCC($U]uƉӋlat @{D{lat @{D{P,2lat @{҉D{Z<ډclat @{D{GP lat @{D{GP$lat @{D{]uÍvUEElat @{D{lat @{D{P,Elat @{D{GP lat @{D{GP$lat @{D{ÍvUEElat @{D{lat @{D{P,Elat @{D{HP lat @{D{HP$lat @{D{Ív$X,$Ív$t$ƍF<)ˋF9^؅~F<VŬF<^F$t$ÍvH, tIÃ$Éغ<CCC(C<$ÍvU]Elat @{D{E lat @{D{X, Elat @{D{KP lat @{D{8KP$lat @{D{]ÍvU0]ЉEMUܸ"{%Pu#EpEڍE E}EHEXt~؋]U4]̉EEMUظz谱Pu$EEUE"E6}EұEXtq~؋]ÉU ]u}É։ωغ<s<"S(|2tNt %\"S %"S t"C$ f輩]u}Ð$t$É։رL輪CSLF$t$É$Éщ$Áf$kÃ$t$É֋lat Xm\m{C=|-t5HtH| D !lat Xm\mff5ulat Xm\mfSLعs$t$Ð$t$É֋lat Xm\m}C=|-t5HtH| !lat Xm\mff7ulat Xm\mfSL ?%s$t$Ív$Ëlat Xm\mu غY$É$Ëlat Xm\mu غ$ÉU]u}EӋ}u MEE@lat Xm\mUB=p-tJH|faVWEPPRdڋEMyUEH<lat Xm\mfilat Xm\mfg]u}U]u]VQME]uvU]u]VQMfEf]uvU]u]VQMzE]uvU]u]VQMDfEf]uvU]uˉىVQMlat Xm\mu4؉;U|&;Ev!~lat Xm\mfe]uÉU]u}EӋ}u MEE@lat Xm\mUB=n-tHtEHuaVWEPPRڋEMyUEH<lat Xm\mfhlat Xm\mfg]u}U]u]VQME]uvU]u]VQMfEf]uvU]u]VQM~E]uvU]u]VQMHfEf]uvU]u]M މSVMlat Xm\mu7UE9|+9s'|!vlat Xm\mfd]uU ]u}ÿlat Xm\muTC=|--tH|#SPRDRPaljlat Xm\mfg]u}ÍvU ]u}ÿlat Xm\mu[C=|4-tH|*%C~;SPRRPljlat Xm\mfg]u}Ã\$t$|$ $lat Xm\m^C=|7-tH|-(lj։Y9| 9w$#$lat Xm\mfg$\$t$|$ ÍvU ]u}Ë}u lat Xm\muWC=|0-tH|&!VWSPRRPlat Xm\mfg]u}U]Ëlat Xm\muVC=|/-(2RPSPRt‹/lat Xm\mfg]Ív$Ëlat Xm\muFC=|-tH| Clat Xm\mfg$Ã$Ëlat Xm\muC=uCL$Ã$t$É֋lat Xm\muGC=u=CLOlat Xm\mu譣ASL؞$t$Ð$$É֋lat Xm\muF舞,$$Ív \$t$ƈӋlat Xm\mu$D$\$t$ Ð$t$É։رL蜞CSLFݝ$t$É$Éщá$Áf$kÃ$t$É֋lat Xm\mu b$t$Ív$t$É֋lat Xm\mu f$t$Ív $t$|$É։ϋlat Xm\mbF=|;-tH|1,ً <lat Xm\mfilat Xm\mfg$t$|$ à $t$|$É։ϋlat Xm\mF=Z-tHt1HuMً9}[lat Xm\mfd<lat Xm\mfhlat Xm\mfg$t$|$ Ð$flat Xm\muG C6f}Klat Xm\mf$É$Éغ,?ulat Xm\mftblat Xm\muC C}}薑lat Xm\mf$Ð$lat Xm\m C蠈}lat Xm\mflat Xm\mulat Xm\mf$ÐU0ϋt.& ~ƅ@ƅ@0?@bBj@,?4?n j@8?4?`Åƅ@~ƅj@r4A怀!r*r/rr%r rrGG GG1}uÍvU }E1 t"0шЋ}Ou@}ÐU}uE thP5d5`Phۭtۭ-۽ٽٽfۭ٭߽٭f;uӋ)ЉƉ9|>EPu uPhӋ)Љ)‹EPu uPhӘtٽٽfۭ-٭߽٭fӋ)Љ‰9|6EPu uPhӋ)Љ‹/,EPu uPh'_ $$É$L$-_D$8r+ʐL AsL  L48w؍L$غ^$$ Ív,C<5w6%$~f+f%f f2fdf ff%DtLtVÉ$$$$׈$ $L$<^D$$DŽ$$D@w$D!ƅ}9|$$0$D)tOؙ ~@)$$${$ t$؉$$$$$ÐU(E׉ΊEU]Dž|$~ƅAʈÊy<0,9v,z,v5q09}Ѓ0ID:r.:w ЃA :Lt؉U$E}E] M -u&8wuAs0 rJ8w ȃ0 r8wS<.u= 8w0 rр;tX)R‰|E蒜f]8I)R‰M|UC8f]ffۋUƈЉˋ}U M  -u 8wux0 r^8w0 r)R\{MMfEf U(]س-m <$t-m}m- -m <$s-m}m-EEffEm <$s}vmm <$esmm}m-w[mm <$+smm}m-w!-m}mmm؋] U mm}mU -`mu \EPuum <$$}mUm tmr0mr$m u mtmstЛEԛEf؛fE}m mm--m}m rmr ms m}EEEEfEfEm$vU0]Љuԉ}؉EUʋEE܅t E|E|E E~ EE~ ыE@ HE }}fMME $m}m}}fM]E-(m}mE]E]uBk EkE=|]}}fMME-4m}mEڃ)‰}}fMEE @m}mUMӋE؋]Ћuԋ}U ]u}ÉЉʋMMف#|i}}fMف}ME%@5Dm}m}F}}fM}E @m}m+uMف}}fMف:%ME-T-`-Hm}mMim}}fMME @m}mu}}}fM)uE-(m}mu)}}fMuE-(m}m+]}H ~* kE~EEE]u}v$t$ñؙu,ؙduؙduؙuȋ$t$Ívk<k<ÐU]EUEEPMUEnÊEu lCEPMUEuKEPMUE]Ív@@ÍvUEE--}EPuummm-}m}mU,ƍEPMUCEPM})À}t؃|=nfojЀڍY1fÉU$EӉuEEEE }UPӋ)ʉЃ}Vj؍‰Ӌ)ʉЃ} / :t tkj؍‰ 8t / :t vU(EӉu}EE EU O>?8VEPjEP؍‰:t Eu8w 0u8w 8tthWEPjEP؍‰K8t !:t UPE]} EUxMugEE׊<-u ƅƅjEPE׈EuE:MA‰9jM׍nGIu It @EE:w D|8-mw(mr-mw ms u  <$EPuuEPuu؋?8#EPEPjmjyEPM׊‰ 8MU􋅼EPEPjdjyEPM׊‰8MEk^EPEPjmjdEPM׊‰[8t%E]‰ E:w }t8 v$$L$;T$UEU;mr mvqjEPu uC, UEU:msqj́EPu uC UEUE:msqjEPu uuoB UEU9mwqjEPu uAL UEU9muEj[A UEU8-,mr mvqj8EPu u@( UEU7-,mv mrqj\EPu u?x U mm m}m$vU mm m}m$vU mm }m$U m m mmmm <$G}m$UEPuu EE-pmm }m$U m m mmmm <$m <$g-p}m$vU mm}mU mm}mU mmmm <$M}mvUEPu uEE-pmm}mU msIEPu uP|<@ m}m vU EPu uv-}m U msIEPuu'P|G<mm}mUmw msgjEPu u <mm}m U]EPu u%B}m}t mm}EEE EfEfEm] $t$|$fu"ff9|fOfGff9ۉىȋ$t$|$ ÉUu }l…}u]ډ}7ƒUt HEm}…~‰E]…ċEEEEfEfEmUH-ԍmuTmv }msԍE؍Ef܍fED-ލmu9-ԍmt-ލmu }`ȂQ-ԍmuPms }+mvԍE؍Ef܍fE-`mu>-`mulHELEfPfE-`muN-`msԍE؍Ef܍fEd`EdEfhfEE-HmuEEEEfEfE-Hmu-EPuut }m}EPu uKmu6-,ms&m]E$m}E}-`mv)mm}EPuua>}T-`mEPu uJm}؛U؋M܉ЃEt%m <$EPu u}m}؋EE̋E EfEfEԋE؉EE܉EfEfEẺEEЉE fEfEj8EPuu pLEPu u 9(7mU -ԍmuԍE؍Ef܍fEmu}m}m U]u}хuE?ljΉRVEE <$}uuʅ)Ӊ}E]u}ÐU EPu uI}m U muEEEEfEfE mm <$mm}mU mu} mm <$Hmm}mU-`mv-`ms ‰Ѕ~}Ã$$-`w ʉ1) 1)ډЃÉU -`mr m} m}mvUEPu uG}msmmt m}EEEEfEfEm vUEPu u>G}mrmmt m}EEEEfEfEm vU mmwEEEEfEfEEEE EfEfEmU mmrEEEEfEfEEEE EfEfEm9~Ív9}ÍvUmmuUmv $t$|$Ӊ9~ ȉډÉș ىșօu߉$t$|$ É$ؙ$ÉU EPu uP!EPu uq}m vU EPu u*}m U EPu u\mm m}m$U$HELEfPfEms"TEXEf\fEm}EPu u7}m <$7m-lm}m vUmsm}m}EPu ur7}m <$_7m-l}m U-ԍmu}W-ލmu,E0Ef4fE+EPu u}EPu u8m}m U EPu u}m U m}m vU m}m vU-ԍmu,E0Ef4fEB-ԍmu}+EPu uq}EPu um}m vU EPu u6-H}m UmuԍE؍Ef܍fEZ-ԍmt-ލmu}3EPu uA}m <$Am-}m UHELEfPfEms"TEXEf\fEm}mm <$mm}m UEPu upHELEfPfEms"TEXEf\fEm}mm <$Bmm}m UEPu uHELEfPfEms"TEXEf\fEm}mm-lm}m U EPu um-H <$?}m U EPu um-H <$o}m U EPu uЃYm-H <$}m U$m}-`muԍE؍Ef܍fEHm}mu}-muE܉EEEfEfE mm}m vU EPu u-Hm-<vpEtEfxfEJ-Hm-<v -p}#mm <$m}m UEPu uam-<vpEtEfxfEWmm <$Tm}-`ms-m}EEEEfEfEm U EPu uEm}m U EPu um <$}m U EPu um <$}m 0<$|$ |$k $L$fL$f¹)L$$D$$l$ ƒD$$D$$-|$ @D$$D$(D$,l$(l$ȃD$$D$(D$,l$(|$l$l$ ,$<$B0ÉU ]mu(E,Ef0fEmuԍE؍Ef܍fE}CK@EE <$EPu uk -ۨm}P55EPu u--m}m] vU\`dÉUME*uغ} E*u8܍P5؍5ԍ <$E.Mغ4SEҺFvN@EE <$ <$iq.iM~9~k -ۨ <$ <$i-.iE6UMҍE5MEҺcM@E8M@i|6i E15ME1P55 <$E-MUҍi$6iME6Mغ\`dUp]u}ԍE؍Ef܍fE}}}EEE EfEfEfEmEm}EPuu8}}-m <$8-u,E0Ef4fEmm}mu5-m-m}m}m}mun-4mw[m}܋EEЋEEfEfEm}-0mE܉EEEfEfE-@mwm}-mw-m}f -Lmw f-mm-4mm-X}m}mm}ԏEġ؏Ef܏fEffJfBmmk ۨڎ}f|mmm}@fƃfk ڎEċގEffEk EEffEff9|;fJfBmmk ۨڎ}mmk ۨ}f9mmmm}Et mm}EEEEfEfEm]u} UEPu u5mukmw[m-drG}}fMmm}mEUk UUffEEPu u <$b(}m UhEPuu۽p`EdEfhfEH|LEfPfEEEE EfEfE`EdEfhfEHEġLEfPfE̡HEСLEfPfEffKfCÉlۅl-H}mm}mۭ|mm۽|mmmm}mm}ۭ|mmm}mmmm}-`m{m-H}mm}mmm-v2mmmۭp <$&m}xE܉EEEfEfEfJÉڹpLKmmmۭp <$&m}mhU@]EPuu[}-`mw`EdEfhfE EEċEEfEfEm-H}܋E܉EЋEEfEfEffKfC-Hm}mmm}mm}mm-v/mmmm <$%m}]f|-IÉڹpK jJ mmmm <$$m}m]U EPu uJt}[-Hmms EPuuEPu uK}&EPuuEPu u-H}mU EPu uƯt}[-Hmms(EPuuEPu u-H}EPuuEPu uK}mUEPu um <$k}EPuuEPu um}mU]É]E <$؃xQk ۨƠs@EE <$jk ۸Ơk ƠUʠUfΠfEC]E <$-}m]É \$t$Éօt9u<$.A|$ 6l$ |$ )#l$ <$,$\$t$ ÍvU]É]E <$G؃x"k UUffE <$!}m]ÐU$]܉uÉ։uE-`uHELEfPfEuE-`v`EdEfhfEuE-Hu]E})}`EdEfhfEb9uHELEfPfE@}m})m <$ <$-}m]܋uÉU ]uÉ։uE-`uHELEfPfEuE-Hu]E}u)}`EdEfhfEQ9u <$! }m}-})m <$}m}m]uÐU]É]E <$؃ k ۫}] Ȅ8؋]ÐU(]؉u܉}É։uE-`u s}fu[}m})m <$}-mv  m}웋}]؋u܋}U$]܉u}Éօu mub)}SV})Jm <$}m}-mv  m}웋}]܋u}ÐUP]EPuu4EPu uTE(Pu$u tmmm}}}}ܳEEPuuEPuuEPu um }m}EPuu <$-mvjmv)EĉEEȉEfEfEmm-}9ms-EĉE܋EȉEfEfEmm-}EEu  EĉEEȉEfEfEm]$U EPuuEPu uE(Pu$u ȅWm <$-m <$-m <$} m mmm }m$U]EPu u.EPuuȅ-4mÄtm-m}m-}EPuu<P5854-m <$F}mmm}tEPuuc}EPuuN}m]vU-`mt-`muԍE؍Ef܍fEQEPuuV}EPu uCm}mm <$(m <$}mU8HXL\fPf`H|LEfPfEHpLtfPfxmm }-Hm }-Hm }mmm-H}ffJfB‰<ۅ<}mm}‰<ۅ=pEtEfxfEm8$vU$E(Pu$u -`m t-Hm u`EdEfhfEymm <$}EPuum}EPu umm mm -Hm <$'}mm-l-Hmm s5EPuuEPu uE(Pu$u ;mm}AEPu uEPuum -H <$mm-H}m$U E(Pu$u EPuuEPu u`-H}m$  $HL$fHfL$ JHfJfH$D$BfD$fB Ð$ $Ív$ffff $ÍvU EPu uhP5d5`~}-mv-`m}EEE EfEfEm U EPu uP55 }-mv- m}EEE EfEfEm U -m- <$ }m U -m-}EPu u<}m UUEOU EUE0MUEU҉]ÍvUt]ÉUM5Eeu*E <$ݭ <$ <$8>UEU EUEMUEU҉T]Ív$$É$L$ T$D$C't$CT$D$mrT$m D$XT$XD$.-T$.D$T$@$$ČÍv4\$0É$L$L$ D$T$)\$04Ð4\$0É$L$L$ D$T$M\$04Ð4\$0É$L$zL$ D$LT$q\$04ÐU`]ÉUMUM3UMθ#UMM΍UEUM]UPƉU]UMϸE}E}mryjEPuulEEEPuulEĸEȍMujEPuu~lE Em <$MlEĸEȍMIU<ƉU]UMijEЍES <$kEԸLE؍EY <$kEܸEMЉUfE?mÍvUuf fʐ…uk ۸BHk ʉMEۨk ۸k ۨk ۸ƠxrGHELEfPfEm-l}-Hm}mm}-HmtɡHEܡLEfPfEvm-l}mm}mm}-`mt}}fMmm}mEHEܡLEfPfEm-l}mm}mm}-`mt}}fMmm}mm}mm}mm}-`mu `EСdEfhfEءHEܡLEfPfEv-Hm}m}-Hm}mm}-Hmtm-HɃ <$=0=t-l-0=0-0=@$PHEСLEfPfEعvAEЉEEԉEfEfEm}mmu H(t <$ <$EM <$P55EpM <$ <$EFM  <$ <$EMP55 <$EM@T<P5854 <$EM`0P5,5( <$EzM-- <$ <$EDM-- <$ <$EM|܍P5؍5ԍ <$EMFP55ލ <$EM}}fM(m}mE}}fMɃ <$m}mEU=t $)JJ =P55p=ԍ؍ff܍-ԍ=ލP55#-@--H=P$(f,f0 4$f8f(<0@4fDf8H@LDfPfHT`Xdf\fh`dfhflpptftfxx|ffffPTffXěffțffff-l-=p--=`-`=-=čfȍf--=--=--=Л-Л= Q-=К--=--=|É|É4 dÉ\$˸Mb‰$și@BT$T$~\$øÉ)Ð$ÉЉ‰$ÉϴÉ4É+ÉU4ÉUDžDž‘Pu^ DžDž"8Lغ!DžDžXt1ÐU0EUDžӐPu3Dž;!8\MDžXt肔؋U8EUUUDžDžPuaNDžk "Dž? fWODžDžXto؋ÐU0EUDžPu3ZDžwZ艑"DžXt辒؋U0EU'Dž_bPu3DžUِrDžXt؋U4ÉUxDžDž覍Pu^DžDž;غDžyDžXtÐU4ÉUDžDž讌Pu^DžDž88غDžDžXtÐU4ÉU舿DžDž趋Pu^DžDž 7غDžDžXt%ÐU4ÉU萾DžDž辊Pu^ DžDžD7غ DžDžXt-ÐU4ÉU蘽DžDžƉPu^DžDž7غDžDžXt5Ð$$L$誼D$ÉUjhRPUjhRPÁ $$T$ˋ$L$AT$$,$D$$ ÍvU fff}fu] EU讻Pˍ8M@jWVPjEHPff2k }UOWVPEPhffQMH5jWVPjEHPfffk }WVPEPhffIMPdjWVPjEHPffk }4MWVPEPhff6}MXjWVPjEHPffk }LWVPEPhfflM`jWVPjEHPffk }藷WVPEPhffMhjWVPjEHPff0k }JWVPEPhffQJMp$jWVPjEHPffUj0׍AWVPEPhffxA JMtKjWVPjEHPff|׍?WVPE@Phff(覽o8IMxyjWVPjEHPffj0֍m?WVPEPhffOͼ_HMjWVPjEHPffj0֍>EWVPEPhff`޻pGMjWVPjEHPffj0֍=DWVPEPhffqFMjWVPjEHPff֍k<DWVPE@Phff EMjWVPjEHPff j0;WVPEPhff* DMjWVPjEHPff.:WVPE@PhffT CM'jWVPjEHPffXj0b]f :WVPEPhffi2 BM<jWVPjEHPffmj0w\f9WVPEPhff~G BMQjWVPjEHPff[f7WVPE@Phff蚵c M~jWVPjEHPffڍ6@WVPEPhffD´MjWVPjEHPffڍ#6WVPEPhff}MjWVPjEHPffڍ\5>WVPEPhff#MjWVPjEHPff84Q>WVPEPhffMMȒ1jWVPjEHPffb3WVPEPhff 舱QMВljWVPjEHPff22HJXع0-{عDeعXOعp9عՒ#ع迒 ع詒عȓ蓒ع}عgع$Qع8;عL%sع`]عtGع1ع͑عĔ跑ع衑ع苑j EAE0EMغ-ع47عD!rعd_عLع9jԕEE0EMغ荙ÍvU]]S΢]ÐU EPMUE谢EPMUE:ÐU]]S]vU(MUEEPMUE7:-=%EE}EPMUEEEE-m-EEE-EEEEEE-}mUEPMUE<EUUUÁ$É$L$舏T$y$ÍvÉ ÉUEUU.Ufu_j^Fu=(芳蓯u f=Éڹ$Wڸ@ڹ<*ڸڱ<Clat f0fÍv\$,$%%É\$ D$ D$D$l$<$,$\$Ív uJt uÍv…uBÍv…uJuRÍv$uYu IID$É$uYu IID$ɅuBÍv…uBÉ$t$ÉօuLغыFk Lغ趋$t$ÍvPÈPà $t$|$ljӀ=ܫtOxƉXiى͂]躂菿讂t ڋ<Ɖh 耂ىmBa$t$|$ Ã$$@D$t$D$$Ð$t$Ët8~#"Ƌ謏$t$Ív\$t$ |$D$$D$4$9rOvGDB9w̫$$‹D$_\$t$ |$Ív$Z XZJB $Ã$t$É֋F u F FV VV RV $t$Ív\$t$|$ ƀ=ܫtTYÉڹJNڸq謀ڹȖ薀k芀H C~SC~$$Bƻ9KC=ܫtl豻ljЖ袽ىOؖy$L諼$D~$T$HDɌ9]\$t$|$ Ð\$t$ |$À=ܫt)Ɖ޼U*If{ff9r0fNfFƋD~ƋTKƍDf9wC~C$SڍD$D$谌D$\$t$ |$Ã\$$ӈȄt7r3,v t",t%#$‰n ډ\$É$$$ Ɖ$=vWt`$8$rNËWDf$$⍄$$e8$wN$$$ É $$T$$L$OT$D$D$uD$@D$ T$BD$9rJBD$X%DD9w=ܫtT菸Éڹ耺|L$ڸk|ڹU|衹|$ É\$t$|$ Ӌ;t$6$9r'NFAD0 {|7 9t$9wۊ$\$t$|$ Ã$B tB'ZtKt KR D $UljG t_iwFuTj _5 VG \É$t$Ӊt$t$É $t$|$Ɖ׉Ép-t=tDD$t$|$ U]k UTU TfUfT] v\$t$|$ljӉ<uډQD$ D$ <$u&Ɖ,tC=t$FD$fFfD$?k T$TT$fDfD$k D$DD$fDfD$,$\$t$|$Ð$\$t$ É։ $$L$蕂zkD0L$5\$t$ $ÐU]u}Ɖ׉ˉ<u&ډCEE <$ <$dE<u ډ <$ <$9kL蝁]u}É$t$ֈ\0$t$É $t$|$Ɖ׉É +t=tDD;$t$|$ Ã$t$Ӊ5t$t$É $t$|$Ɖ׉ É*t=tDD$t$|$ ÉPË@ÉPË@Ã$t$ֈ\0$t$É $t$|$Ɖ׉É *t=tDD;$t$|$ Ã$;iP$Ív\$ Ӊ $T$QT$T$TT$T\$ É$$$ É։ $$L$迄ljD$BTWT$$$ É\$ t$|$ƉT$ $QÉ(t=t D$ D$\$$T$\$L$$B$fff9r-fKfCD$t$TÉNj$pÊT:Tf9w׋\$ t$|$ÍvUƅӉyƉز(t =t Dž ftff9rGfOfGTDfP…f9w}Ív $t$|$Åu\ 諂ǡGGغ9r!JvBODOD9w$t$|$ Ã\$t$|$T$%u D${D$u D$ aD$$9$rNKC|$GT|$GL؃u)@D$ t$ )D$ D$ )@Ɖ9$wD$ D$D$\$t$|$Ð\$t$|$ LjӀ=ܫƉ0 sk Lfs[TSs艵@s<賰*sË Xs]rѯr~Ë׉$\$t$|$ Ív\$t$ |$$$ffD$ff9\$|:fKfCșB1)֋$PD ։f9\$ɉșNЋ\$t$ |$Ð $t$|$Átgt vu$t$|$ É\$ t$|$$T$@D$D$ffD$nNj8tt\$ t$|$UPÈu.ܬƉDͮDq8q-裬ljމؿ‰~pڰ{߸p[ؾ‰5pmp"t- ÉڸLnp/bp"t-̫ÉڸT蹭0p$pw"t-莫Éڸ\{o賬otORÉڸh?oؾ‰ݱoUo~fÉڸtWoؾ‰~5oڰ]o߫o荪Éڰ}n赫n?~E蜫n 9fNF5 Éڰ tsn4gn~TҩÉڰ[:9nڸo&nڰ]nЪn~Éڹ|om觪mu.FÉڹ7momO<<tItunKu踨ÉEڸmש m耨É ڸ{l蟩lHÉڹ9lql+=ÉCڸ譮dl%Xl}辧EPuu hڸ莩lƨk‰=EߺRtEjE聄 <$ E胄 <$ |ڸ詨 kk芦Éڸgj蟧jHÉڹ9jqjTÉڹjFyj)ÉڹZjNjɥ ?j9lat ccjÉ$ $$$Ӊ$$L$rT$$$D$rD$u)ljЗfi;ZifDŽ$f$f$$\>$8uNڍ$$D$t زo[uf$Nr8J$ $$É$ $$L$ cqT$D$ D$ÍD$*؋$ É$Éf‹  $É$ $$L$ pT$D$ fD$ÍD$؋$ É$$L$pD$ xÐ$$À=ܫtEƉ|gډ`g!TgfÀ=ܫt=輢Ɖ譤$gˉYggËt$t ӉDËDpD$$U]u}ˋMMUoډV]F EF FF]u}U]u}ˋ}UBZ ӉC CUSC]u}vPUE։ˋUn sGrGrAA@A0AXjjÉU EӋUm rF,rFrAAjÉH@JÍv$t$Ƌu ^Ë‹@B,R@2r$t$ÐU]u}ÈU΋}u$q@PUW]u}U0Èϋuu<CBVj,ڍ8k Lk<XAtUEӉ΋}UDkUWڍEivU0Èϋuut 1Ɖ$t$É$t$É։زt t0 Ɖ$t$ÉUE׉UejXÉ;‹FCkk DCÍvUE׉Uej?ɋF_CkDCÍvUE׉ˋUdS%É‹FBzUE׉ˋUdS(ɋFHBzUE׉ˋUcS%É‹FBzUE׉ˋUcS(ɋFHBzUE׉ˋUbS%É‹FBzUE׉ˋUbS(ɋFHBzUE׉ˋUaS %É‹FBzÃ$t$À=ܫt)֓Ɖ򹨘Ǖ>X2X8ef@@@ 8ffIfADfNr$t$Ð|ī ȫ̫ЫԫثP|Ð$t$À=ܫt)辒Ɖ诔&WWu ؘ8u 8$t$ÍvUEӉϋUw_ƅuFu =t PڍoWjڍƉÉU@E։ˋU^ ٍv<r,t[t:ufuE <$ <$mغuE <$غغ%j$@8ڍX\fÐU$EӋU}] ٍ<r ,uEPu uغj$EPu u P8ڍXEe U@EUˋUf\US\ ٍ<r,uغfj$j `8ڍX+drÉU EӉ΋UI[ <r,uىDkjp8XTcÐU$EӉϋUgZ <rBt,t8ى\f`kj8XDbÍvU EӉ΋UUY <r,uىkj8X`aÐU0EUˋU~XUkX ٍ<r6,u2-t UMغj 8ڍX=`Á$$L$rWD$_Á$$L$>WD$|$l$Á$$L$WD$u?Á$$L$VD$AÁ$É$L$VD$‰ع$ÍvuQ sÍvtP Åt P Åt H !щH ÐU0EUϋUUUUTÅu^j@H^dƅu'UWE.Ɖ< t)tct@tzغDغ%غ~Lغedغ <$DڍMغMD$8$<$@$T$$4$L$St$$D$$0Ƅ$($0:$($($($(T$,$,$s_Éڰ(onJ$,ؾ‰SRJڰ)<;J/J/訅Ê$,ؾ‰ JˆI$0:$(2$4tZ豆I$8$<$@DÁ$$$L$_RÍL$ڸwI8kI$ÐTtÉ$趄 ,I规Éڹ蘆IЅI贼$u .É؋$UhEUoQQħQ;t ̧m t ƻv蒃ƈى‰G躄G蕃F/ƉT FXF8-mk#JŁ;Fm\誁 FH  u Dž u ƅƅ 9;蒂E,jt Vɂ@E4EPPPt9|' O9|u ƅƅj)老DƉ򹌩 DCvD# <t-tZtw*u ƅ 4 K5t n t }Cƅ7PPPP PPPP uPPPt@ |)UM ƅ}Ɖ򹜩B~B|}Ɖ򹰩mA~AÍvU fÉUMU]JUJJftmjӍRà $t$|$fÉ֋fX Åu @7M9|OvG@D9$t$|$ ÍvU]u}LjfMu4Nfz@@@f@ fE4]u}v $t$|$É֋։*Mff9rfOvfG M ׉Df9w$t$|$ Ív\$t$|$ $fff9rfNfF$ƋDiMf9wӋ$g\$t$|$ ÍvU Y1$0Щ04ff80#dg   I,@0Df4fH@8DdT,0f4fd%=``p =pp|ff mľffȾ\ܾܾȪتоԾffؾоN= $f(f,~@DfHfLJ`/00t!@8`JJLLKKȫ{=@@ԫ_P55P55(P5$5 l8P5450,IHP5D5@8&hP5d5`HP55XxP5t5pdP55tP55wXP5T5PTțP5ě51P55P55ĬP55Ȭ0̬ج480f@- <$HTd`Pp<(P55U=ĭ\ԭK:) 0@P`tn] <$̮P5Ȯ5ĮЮdܮ=/d1 }P$Ht9P,Ht&P8HtP@HuHfPHu=PsHuXƶаjj=аа=  (8LߵT輵d``ttL||8$pıtfȱfxp̱ܱffЛ ,P<DPvdP55IU-  <$lP55U-  <$|X <$A <$*d  в`Բdfزfh`ܲ"B. $0@Pm\((d7))tt`ij22гܫܫtY  >  # ,84@`Llat @f҉DfTlat c҉c\ht|sU7  dh @Pp>,oPP WTT09ʍ@PH0\}@piԍUԍAލ--Į-ԍ=--Į <$O=-=@@̵-@=PPtĿffȿ п$Կf(fؿ,0f4f8DDпP\=lpftf $f(fx@,8P5450P55ĶjԶ=ffP 5,y8[@=L j軮jħ藮UEU+0`u`5`ǀX``4`Xu,0臔m/誗u=;!/`P/= u =tQaÉڹcP&ߕڸc(&b&`ǀP`ǀTXuj` R.ÉU]u`uXpy`Ptj`P`{`P-5`X`2`u`mu؋]uÍvU]2j`P``X`2`uƋ]Ð$$$ $Ӊ΋$L$A-=5ڍD$=$$$ Ív $$$Ӌ$L$,5D$=t 賨5$$ Ð8\$,t$0|$4D$($4$|$_ËD$(ڸa}#ڱ(kkj#D$(ڸeO#ڱ,=k<#D$(ڸje!#ڱ)k#ڹ`"D$(ڸ&e"ڹP`"D$(ڸd"ڹ`"D$(ڸ`{"P_o"D$(6u+]Éڹ_@"_4">]Éڹ_"L$(ڸ_"^!o]Éڹ,`_!^!ˍvD$/]ƉT _!\_z!O^n!1tdEu_D$$L$$vD$$\Ɖ\^7!D$$kt^!] !|$$ru8XuT$(D$(蔲$\$,t$0|$48Ð$$$L$[) \ÍL$ڸ]s H]g p 4[ùxڸ]3 ڱ(!h tڸRb ڱ,g pڸ(bڱ)gڹh?]ڹ)]xڸ]_\~Zùxڸ\\ڱ(JgI tڸ{a2ڱ, g pڸQaڱ)fڹh\ tڸaڹ;\ pڸ`ڹ\xڸ[oD[cXu_tp"$ÐU=u< 9 X=tR@YÉڹ1[X&ڸ[TZshX-lat @fDfO%(`عDkiλY%f`PB`Pf`T`P@%= @< u3WƊ ‰dX WƊ ‰cX= < u3'WƊ ‰c_X~wVƊ ‰XcWXKD= < u3VƊ ‰bWXVÊ ڸbWf%@%f= tc< u,UÊ ڸ?b>W2.UƊ ‰bVÁ$c7f$$Ḁ^lK=s>f$$蠳Ḁ/o8s>f$$?ḀEt e-t0 $f$$IJḀSf$$膲ḀƄ$f$$@Ḁ<_u=f$$ḀXtF_puKT$p;pu'T$px8tT$p\$$t$(|$,0Ð4$|$K|px4$|$Ð4$|$ |py4$|$Ð4$|$|pz4$|$Ð4$|$|p{4$|$Ð4$|$K|p|4$|$Ð4$|$ |p}4$|$Ð4$|$|p~4$|$ÐUf j M F;j EPع3Ð<uÐU]ø tPf@]Uj%k Ld k L1Ã$<],tt(t-tt7t*t8?B90' 8؋$Ív \$t$Ém$0ƺX7m$<\$t$ Ã$<u$Ã$<uex6$ÍvU~<}@zB7tojPU@CNjfK9KvC@D+l@D@<jP薀@D@k L/ 9t9-xUÐU4 EӉU Ƌ9jڍ,<b˖ƻ9KCڋljڋ 9u$ڋ.ljڋ9|jHi~dڍt~xڋ{~茕ڋ~Yڋ~&ڋ}97ÍvUƉӉ}<,tt3tU,C<CC:}ŠCtCd}ŠCnQC<tJC[>Ct5t0|ŠC:C< tC ' 芲t4{PBUÉ։{uB<t<uQڍJ{P <t<uNڸU$Ɖ׉{É{8j0z8zTG{ڍ#zPxډщU(B ǻ9jKCBtgz4BDtYtTjDymBD@觯tRjxdABDPBTB8 u  uu u jk Lڍck LX$ 9U EU = tF6ÍP4 ڸ87HM<u Pt  << uut hE tVMcVjMÉ؋U]u}hP ‰VCv<FCuEFuËEEEEEE9r*IA{HuDD{HuDD9wًEHUEPMEJMAEJMAEUBEUB]u}ÉU(Ef8EJjM虗 A@ t  fY=<u,PA DB@%R@ D_@ u1@HB@‰ 'hB@ us9tojڍ蛊b}<y|EHB @B ÉÍvU$U8ƅ<= tF1ƍP32y QBR<uNUD<uB\B@ Q@@Mq@B-<"= tF0ƍP 21C QBB@uEj(@ BRTrn[BPB@ QT= tF/ƍPty10TC<uBZBPي覜 QBB@ Qv@@otBÐ$øL@@@ @@@@ @$@@(@,@0@4@8@<@@@D@H$ÐU,]ԉu؉}܉EUด詉EuejGEj1j‰ƋEuEuEuEaUE UE܋UE ËU踋UEƋU蔋UEUEEEH9|eJB}xE||E8(E||E8,E||E80E||E8G4}DD9U:UJG,UJG(UJG,UJG0UJG4UEDUEDEUDUEDEUDEEBUEHtEEB(U3tEEB,UtEEB0EEB4]ԋu؋}ÐU u M I([DI,CӉ\ [x0PLH0Rt I42VDH4RDB$9} X$KC5jJ@TpjkR8_= e)Éڹ+-HBTiڸz+ڹd+J(BLڸ/ڹ#+H,@Lڸ/oD*cH4BDt`(Éڹ*(J4BDkڸz*)vUljӉt_JtO:t?j@@ @nj JRD@ <$P@Dp= !K'ƉL<)H-d)P@Tg(W"E3D(8= t{&Ɖh( H@-dj(W("2'Ív$HP؋f@@ @@@@@ @$@(@,@0P4@@@8@<@D$Ã$SH$ÐUljƅˉsWjpk L rhpÍvU$É։ϊ< C'jtCkL9jk ÐU]u}Eȋ}t4J H މ5J кuN ‰t9uE@E@q t9uE@E@M t 9uE@E@) t09uE@E@@t@tE@E@@t tE@E@@ttE@E@t9uE@E@xt9uE@E@Wǀt9uE@E@6ǀt"9t 9uE@E@ ڋE[]u}U]h@H@@]ÍvU]h@H@~@]ÍvU]uÉV@H@IV@H@P1]uÐU]uƉS@H@S@H@PS@H @P]uÐU]uË@<j%$ر0Xر Hر8@@r10@H ‹@Hز@@u@Hز@@r10@H ‹ p@Hز0X@@t,@H ‹ر @@t1 @H ‹{ر@@r10@H ‹'wر?g@@t,@H ‹ر@@ t,@H ‹ر @@t1t,@H ‹9رV~@@t,@H ‹ر 2@@t1t,@H ‹ر@@t1t,@H ‹Kرh@@t1t,@H ‹ر?@@t1t,@H ‹@@@t2t-@@H ‹fر@@trtr,@H ‹@H@@ވ‰9@@r,p@H ‹@Hز @@r,p@H ‹N@@<u@HزU} @Hز=e @@<r<,t r4,w0@Hز 3 @Hز p@H ‹ @@r,p@H ‹V@H@@ވ‰_ @@<t,@H ‹ر= @@r,@H ‹@H@@ވ‰ @H@@ވ‰ @@r,`@H ‹"@Hز7_ @@t1t,@H ‹@Hز @@<t,@H ‹w@@@<t-@@H ‹;رX @@<t,@H ‹ر6 @@<t,@H ‹ر @@r,p@H ‹X@Hزm h@H@u h@H@U j`@H@t8 j @H@W jp@H@:j@H@h@H@j@H@h@H@@~j0@H@@@BR@@<t,@H ‹@@@<t-@@H ‹ر@@<t,@H ‹=@@@<t-@@H ‹@@@<t-@@H ‹ر @@<t,@H ‹{@@@<t-@@H ‹?ر\xlj`@H@O@@r10@H ‹ @@@r20@@H ‹uر@@<t1@H ‹&v@@@<t2@@H ‹5ر%@@t,@H ‹@@@<t-@@H ‹XرuX@`Au00@^ @@A@@@<t-@@H ‹@@@<t-@@H ‹t@ GGCa`Gu\$t$|$ U$ljƅƅ<u%t ֧ƅ3<u*t 訧ƅƅdl3ppd_Åu%hpAزHzuDjpMt+<u"t (誦Ѻƅ3t)譼<u u (u蜺ƅ訾%YPlG^É $t$|$É։ϋu l \B@@@@ @@$t$|$ Åt+u P=tÃ$uxtÉ؋$Ð\$t$ $D$\vD$tFuD$/~t)D$t$D$ $-ƅu$t T$\$t$ Ã\$t$|$ lj։˅tM$;U$@ B $@B$@B$Pرmu\$t$|$ ÉU*<$)tPL莸dl肸p[B @ uDjpl~@ vuDjpM*E<\?p[B@uDjpl跢@uuDjpcÍv$Ät [KvC$P9~$PL$DD82Ƌ$Bt9Ɖ@@@ @@@@@ @$@(@,@0$B~$PJD$&\$t$ |$ÉU4ƉUE(E$} EE]U5WtEje@@ѺD@@@Du5j ^BEPuu @DjjaBjfCPX؋TAPATBHBDx jjj\i'E`ZJTBHPЋTBjjj<_ZJTB HPDPjjjL'_JZTB$HBTBjjh^ZJTB(jjhOM^ZJTB,jjh ^JZTB0HBDP4HBDP5$U]u}EUϋu ]EEE#T蓯E2É$t$Ë5dmddB8d@8tsd0=<u@/i<u)P PPHP Vgh<(fdl8gp{h<u)0P PPH,P($>dh<u)0P PPH,P($= f&@$@(@,@04Pf1@4Eƅ:rCEP Ef@EPE@ D2i:wŻvEP EfEPE@ DEPE@ D@r>h4EPE@ D@k L'PEPE@ D@r !‰f:[<`sv`Y{ǺUY= t) Ɖ0seHgeeiáZ<`tC$$$ Ív$t$àYuJ`3]=trƀ= t)CÉڹP4d耡dhˆv  f$t$USumjH6uWqÐU@ EuxjlV^!cc耠bɟb蹘btjb ÉUpƈ*^@uojzTs<,,&jh Hrj赕h HqdadnÐD`Ŭ` $@`@s`$P9| T$P9}گ]`[N` $A@6`@'`ÍvU Ɖ׈ˋummǀ@<b,t^tZ,t uRPNL Xu4P(ok>0}9蓡PPoNj|፠o<,tWtb,jh ng~o`^\j| )ofU ]uƈӈ<r:,t6t2,tu*jr 0]<rc,v,t:uWj7Uv\\!US\Ԩ\MM@\@\k`]uÍv$É$L$8eL$ڸ\$Ív$É$L$dL$ڸ脙՘,\)$ÍvUƉUˊEUhd< ,, ,ttI}H~[z yB[>Ћte [N葌t=Z&mtZ UEӋUc|H us=tV蒕Éڹ胗YڸlYڹ0VY袖YjjÐ $t$|$s 9|OGCD9$t$|$ Ð $t$|$s 9|OGCD9$t$|$ ÐU0B@2 fPB@ B@PPPDžhX;|B ~}}u;ƋE%eDž;|(vED;(WDž;|7QËETBET;Ѿhx;= |}UDž;|!FED؉;]E <$;=Edh@PBP5f"Ah@PPfÍvUDB@6B@@vPPDžhX;|B }u};Ƌ;~yjX.f_ TDž;fNhx;=|c vi}u؉;|&NuE <$;=;PAhPPAd.ÉUB@B@@hPBXBphx;=|4  <$;=ҋhB@PbAhPPbÐU0ƳːËVËD<jPӍ\VËDkYbVËD@ltYjPӍG&bmjVËD@tWjPӍaxF@@r $@ u $@PPEPEP$H C@$nsEPuuC)‹C@EPuuC@‹C@@ÉUÅC<M,stt_ <$ KnN跋NAPڍ| 聅N]|NЋGN8Nڍ蕋 NފMkߕM谊M="(MqMbMÐU։}<,ti,~PL\]yÉ8MQÉB9}mE]ElE։"UTeÉ8<Pl[U u=hjÉڹ[Jkڸ1Jڰ[蒒JڸÌzJڹdJڸÇ:Jڰ $#Jڸ脇Iڰ[IڸIڹDI>ڸIhIt $<e7,tm,1PщtY(p5<u+ <$s EE <$Bk<u1]‰ZM㋕+V<u@ <$ <$E_M㋕Mۅ <$ <$Eg_M㋕[M‰vMb#<PGWnUDE=LԁÉڸ,8Fؾ‰蓃 Fڰ[Eؾ‰!Eڸ@GEؾ‰EڸE ؾ‰[EڸDʂAEPk Lؾ‰袂E E^t@PTщOUv1<-,tmyt, PpщT9KvCdڋ9w9KC,ڋc9wvt99KCB<u[۽ۅ۽Pڋ19w9KvCB<u,CKB<u< <$ <$ZJFۅ <$ <$EZJڋ&99KC芿ڋ9w9rtKvCDƅڋv9w<PQU,E։]E E=W|ljH~@U]#~@ ~@趂m@}W@k}4@}@H Ȃ@|?PpLD)Aȉu G ƻ9KCu"PT)Љ@,PT)ЉGD<u+@PGLEGtE;9K Uf׋]F<=yً袀Y>{?>FPڹ{>(=ϋ詀=S{=z=U֋BP<qt ,`=xÉڸj!=ڹz =BP蠸ڸfz<ڹPzÐUTX\dl`}8p9p|UKCj Dt щStuT}9plhP ֻ9KChBD<t>hPDkPtXYEt hBt ^hPD@<n,tAtN,>hBDtd!Md:eEPMUEˡC ƅ:vSD<jPS 茼SDkw15:|fCtXjPS 9SD@<,ttISD臔‹CD@LM蛬DEEE <$SD3STJ‰ɬDEۅ <$ <$E~?uSDГ‹KD@ZXjS 肺a8訶:nU LjӋG϶jGP:Ív$t$ƋF買ËF趒‹F@Kܪ$t$Ð$t$ƋFrËFv‹F@C蜪$t$ÐU@jÍvU@[!.Iu)P5É$ËC٢kuC¢G%G$ÐU\ËCCP]TjC:CP5q$qÐ$ËC赡JC袡'$,'$Ð$ËCeiuCN#D$Ð$ËCC#\$ÐUEU+ttj th/3=tV]ÍtsP2ڸ_("^"jt"$Uøtu aftSjx)uOO-莎t)豑trҙ )]u=蝙(t&tE茙fP[Éڹ]tڸ\]\Ív@$Q$()ÉU@蟯jÍv@趰Á$$$ É$΀=toZljPa$z\kCE]\4G\[<(%$$$u$`}$l$[$PRݛ拔$B$Û$y%$$$$$)$L$$N$Pu*$BmMN$P@m薫/m$K$B9*$$$$P/L$|3 pڋ$]lat @fDf$A2lat @fDf$$$$$$3$Bݬ]$Lxlat cc$lPlat cc$D($/$$$$ Á$$$ É$΀=tnVlj\8WmډWQ4W;W/ƋF&$F ZËFp؋$$$ U]u}ƉӉMEE=t=2UNjM[PW[VzEˈtT=t=TƋM[GXV1V%زpEZEtS=t=TËMڸ5[ڹ`_VUEEE]u}\$t$ |$$։D$=t<TljىZnhUX-ULÃtu t\$ $}tъD$\$t$ |$Ð\$t$ |$$։D$=tc_SljىZt=UT%Ãtu t\$ $ՆuъD$\$t$ |$ÐU=|  }d} fDž0ƅjJ'j虺غÍvUlj։ˋUƅvk^P@k^w)uDkmknЈkoЈ bU`dhƉ׀=tP 69wlpx tMpB(蚡tpB,膡+t@xpB$^|pB(۽pB,ٯ۽pP0u xpB0 xۭۭዅxHۅ۽pB$} Džxpx tUpB蝠pB艠+BËpBYpB۽pBԮ۽pBupB ¸sۭۭHۅ۽pByDž;vpx tJ+Hۅۭۭ8xDž;rltNpx ttH|+Hۅۭۭ8pP4B Dž;vt脰pB4@D@<v1,ttTQpB4@DpP4BDp <$ 蟰路PpB4@T+D_ppB4@Tt,=pP4BD?%f;=.;lt ;j@`dhÉU(@9@@ @ R9~vs諼SD$@@ jPRppVP(Rp$p l@HEE} PA )‰UE@}jEPuuzEPuu荅C=蕬@Ív$$ $$$΀=tÉؾ‰Dڸd@U$~ؾ‰?]ڸ?C?7EDžƅEutUjlU}x1xIE+~<EƋËؒt ,tt2hDž\角EẼ <$8胒HEẼ <$)ؙ)ؙ@ljDž;t= tUЍEԱ~EEtu?t _= REв蒢Ct= t Eвp;EQ|<E̡Ƌ諟}蝟}䊅t ,t t)c}\t}EPuu%<贐HEẼ <$mmዅEE}}}fMmmmm}mΛ}ċEEFfEfFDž;t= tUЍEԱ肞E Etu?t c= VEв薠Gt= t Eвtm.>;jU^U9z'uByB Dž;0uHE赱)PtEщt= tUЍEԱvEEtu4t t[= tREв蒞Ft= t Eвs;t= t EԲBU ]u}ƈU=t@t<7Ëڸ=qڹ8[08OEEt= tUEÅFNF <%$dF6EVFlEVFE6NVFEVFEVF]EFPv v$F(P6NVF!EfVF~ESVF=E>fE/=tFY4FE%VF/E6NVFE}uE[}uEO}uECEt= t EvJEEt= t EE]u}$Ëlat cc 5*lat c҉ckt~5lat c҉c P5lat cc4<a %$lat c҉c 4alat cc 4? lat c҉c 4 lat cc3 lat c҉c@ @4lat ccv3V lat c҉cP 3blat cc!3@lat c҉c\ 3lat cc2lat c҉ch F3lat cc|2lat c҉ct 2mlat cc,2K lat c҉c 2lat cc1lat c҉c L2lat cc1blat c҉c 1nlat cc-1Llat c҉c\ 1lat cc0lat c҉c R1lat cc0lat c҉c 1ylat cc80Wlat c҉c 0$lat cc/lat c҉c ]0lat cc/slat c҉c 0lat cc>/]lat c҉c //lat cc. lat c҉cHc/lat cc.lat c҉c\/lat ccI.h)lat c҉c|.5lat cc-lat c҉c\n.lat cc-lat c҉c.lat ccO-nlat c҉c\-@lat cc,lat c҉ct-lat cc,lat c҉c$-lat ccZ,y:lat c҉c,Flat cc,$lat c҉c\,lat cc+lat c҉c *,lat cc`+lat c҉cH+Qlat cc+/lat c҉c+lat cc*lat c҉c5+lat cck*lat c҉c*\lat cc*:ÅtUtPlat c҉c*lat cc)lat cc)$Ð\$ t$D$T$D$lat c҉c )glat c҉cD$kL),lat cc( ]lat c҉cD$kLV)lat ccx(D$kL}Ulat c҉c,(klat cc(ID$kL<uUlat c҉c<(lat cc'>D$kL<(lat c҉c(2lat ccG'zD$kL$8$`D$kL9lat c҉cx2lat c҉cþ,lat c҉cD8'lat ccZ&lat c҉cxZ1Ylat c҉cþ+)lat cc%8$D$kLtMlat c҉c)0lat ccl%D$u"lat ccV%ulat c҉cH%Glat c҉cD$kL%lat cc$\$ t$É\$ t$D$T$D$lat c҉cT%lat c҉cD$kCE$Xlat cc$6]lat c҉cD$kCE$lat cc#D$kCR}Ulat c҉c, $lat ccB#uD$kCR<uUlat c҉c<#0lat cc">D$kCR<(lat c҉c(-lat ccs"D$kCR$8$`D$kCR9lat c҉cx>-=lat c҉cþ' lat c҉cDd"lat cc!lat c҉cx,lat c҉cþ'Ulat cc!38$D$kCRtMlat c҉c)+lat cc D$u"lat cc lat c҉c w+vlat c҉cD$kCS ?lat cc\$ t$Ð$Ëlat c҉c`c lat cclat c҉c lat ccIhlat c҉c:lat cclat c҉cslat cclat c҉c0#lat ccYxlat c҉cxJlat c҉ck lat cc$Ëlat cclat c҉c%lat cc[zlat cc9Xlat c҉c*lat cclat c҉cclat cclat c҉c lat ccIhlat c҉c@:lat cclat c҉cslat cclat c҉c#lat ccYxÍvlat cc3Rlat c҉c$lat cclat cclat c҉c;lat ccqlat c҉cblat cc!@lat c҉c(lat cclat c҉cdKlat cclat c҉crlat cc1Plat c҉c "lat cclat c҉c[lat ccÍvlat c҉c~lat cc=\lat c҉c.lat cc lat c҉c glat cclat c҉c<lat ccMllat c҉cl>lat cclat c҉cwlat cclat ccÐUËlat ccPo,<-%$8lat c҉c)lat cclat c҉cblat cc}-lat c҉c$ lat ccCblat c҉cD4lat cc,lat c҉chlat cclat c҉clat ccNmlat c҉c?lat cclat c҉cxlat cclat c҉c<(lat cc^}lat c҉cxOlat cc-lat c҉clat cclat cclat c҉clat ccLklat c҉c4=lat cclat c҉cxvlat cclat c҉c&lat cc\{lat c҉cMlat cc +lat c҉c<lat c҉cdlat c҉c)lat ccclat c҉ctTP55wwlat c҉clat c҉c)lat ccs'lat c҉czlat cc9Xlat c҉c*lat cclat c҉c$clat cclat c҉chlat ccIhlat c҉c:lat cc %lat c҉cnlat cc lat c҉clat ccT slat c҉c( Elat cc #lat c҉cT~ lat cc lat c҉c. lat ccd lat c҉c Ulat cc 3lat c҉c lat cc lat c҉c(> lat cct lat c҉ch e8P5450 rlat c҉c lat c҉c)lat cc lat c҉c lat ccO n4"lat c҉c ;lat cc lat c҉ct lat cc lat c҉c,$ lat ccZ ylat c҉c` Klat cc )lat c҉c lat cclat c҉c4 lat ccjlat c҉c[lat cc9lat c҉c lat cclat c҉cDDlat cczlat c҉clklat cc*Ilat c҉clat cclat c҉cOlat cclat c҉cvlat cc5Tlat c҉c&lat cclat c҉cL_lat cclat c҉clat ccEdlat c҉c6lat cclat c҉cxolat cclat c҉clat ccUtlat c҉cFlat cc$lat c҉czlat cclat c҉c4*lat cc`lat c҉c\Qlat cc/lat c҉clat cclat c҉c:lat ccplat c҉calat cc ?lat c҉c lat cclat c҉cL Elat cc{lat c҉cp llat cc+Jlat c҉c\lat cclat c҉cUlat cclat c҉c|lat cc;Zlat c҉c ,lat cc lat c҉c elat cclat c҉c!lat ccFelat c҉c8!7lat cclat c҉c`!plat cclat c҉c! lat ccVulat c҉c!Glat cc%lat c҉c"lat cclat c҉cH"+lat ccalat c҉ch"Rlat cc0lat c҉c"lat cclat c҉c";貿lat ccq萿lat c҉c"blat cc!@lat c҉c"lat cclat c҉c$#K¾lat cc蠾lat c҉c`#rlat cc1P9lat c҉c#lat cclat c҉c#Oƽlat cc褽lat c҉c#vlat cc5Tlat c҉c$&lat cclat c҉c@$_ּlat cc贼lat c҉cX$膼lat ccEdlat c҉c$6lat cclat c҉c$olat ccĻuRlat c҉c$腻lat cc0cPlat c҉c$3lat cclat c҉c%llat cclat c҉c%蓺lat ccRqlat c҉c4%Clat cc!lat c҉c@%|lat ccѹlat c҉c`%,裹lat ccb聹lat c҉ch%Slat cc1lat c҉c%lat cc lat c҉c%0觸lat ccf腸lat c҉c<&Wlat cc5lat c҉c&lat cc lat c҉c&;買lat ccq萷lat c҉c&blat cc!@lat c҉c'lat cclat c҉cD'K¶lat cc蠶lat c҉c'rlat cc1Plat c҉c'"lat cclat c҉c'[ҵlat cc谵lat c҉c4( 肵lat ccA`lat c҉cx(2lat cc lat c҉c(fݴlat cc軴lat c҉c(荴lat ccLklat c҉c)=lat cclat c҉cX)vlat cc˳lat c҉c)&蝳lat cc\{<lat c҉c)Clat cc!lat c҉c)|lat ccѲlat c҉c*,裲lat ccb聲lat c҉c0*Nlat cc ,lat c҉c<*lat ccܱlat c҉cd*2話lat cch臱lat c҉c*Ylat cc7lat c҉c* lat ccilat c҉c*3誰lat cci舰lat c҉c+Zlat cc8lat c҉c + lat cc7lat c҉c0*>赯lat cct蓯lat c҉cL+elat cc$C lat c҉ct+lat cclat c҉c+Ilat cc螮lat c҉c+plat cc/Nlat c҉c0*lat cclat c҉c,T˭lat cc詭olat c҉c(,vlat cc5Tlat c҉cH,&lat cclat c҉cl,_֬lat cc贬lat c҉c, 聬lat cc@_lat c҉c,1lat cclat c҉c,jlat cc迫lat c҉c,茫lat c҉ckWlat cc5lat ccÐlat c҉c-_֪lat cc贪Ívlat c҉c@- 肪lat ccA`Ívlat c҉cx-.lat cc Ívlat c҉c-cکlat c҉c-5謩lat cck芩Ðlat c҉c-Zlat c҉c-,lat cc Ðlat c҉c-cڨlat cc踨Ívlat c҉c.膨lat ccEdÍvlat c҉c<.2lat ccÍvlat c҉cp.gާlat cc輧Ívlat c҉c.芧lat ccIhÍv$$L$lat c҉c-lat c҉cL${lat c҉c.MĦlat cc袦Élat c҉c.nlat cc-L?lat c҉c /lat cclat c҉cd/Rɥlat cc觥lat c҉c/ylat cc8WÉlat c҉c/&lat cclat c҉c0ZѤlat cc诤Élat c҉c40~lat cc=\Olat c҉ct0lat ccËlat c҉c0WΣlat cc謣lat c҉c0~lat cc=\lat c҉c0$lat ccÐlat c҉c1[Ңlat cc谢lat c҉cL1 肢lat ccA`lat c҉cp12lat ccÍvlat c҉c1gޡlat cc輡lat c҉c1莡lat ccMllat c҉c 29lat ccÉlat c҉c,2olat ccĠlat c҉c`2薠lat ccUtlat c҉ct2Flat cc$lat c҉c2lat ccԟlat c҉c2/覟lat cce脟lat c҉c2Vlat cc4lat c҉c2lat cclat c҉c2?趞lat ccu蔞lat c҉c2flat cc%Dlat c҉c,3lat cclat c҉cl3OƝlat cc褝lat c҉c3vlat cc5Tlat c҉c3&lat cclat c҉c4_֜lat cc贜ÍvU(]؈ÃP?t%ԍ؍f܍f@P?t#ލffP?t%ԍ؍f܍f@P0?t#ލffÃP>t%ԍ؍f܍f@P>t#ލffE|Puxut>tԍEt؍Exf܍fE|.E|Puxut;>tލEtExffE|ÃEpPuluh=tԍEh؍Elf܍fEp.EpPuluh=tލEhElffEpEdPu`u\?=tԍE\؍E`f܍fEd.EdPu`u\s=tލE\E`ffEdÃEXPuTuPlat ccÉlat c҉c=olat cc西Ălat c҉c`=薂lat ccUtlat c҉c=ϿFlat cc$Élat c҉c=wlat cc譾́lat c҉c0>'螁lat cc]|lat c҉ct>׾Nlat cc ,lat c҉c>臾lat cc载܀Ívlat c҉c>3誀lat cci舀lat c҉c>Zlat cc8lat c҉cblat c҉cO號blat ccϞaÐlat c҉cOGalat cc}a菷lat c҉cPialat cc(Galat c҉c(P袞alat cc؝`lat c҉cTPR`lat cc舝`Élat c҉ctPv`lat cc5T`Glat c҉cP誝!`lat cc_lat c҉cPZ_lat cc萜_Élat c҉c Q~_lat cc=\_Olat c҉cXQ貜)_lat cc_lat c҉ctQb^lat cc蘛^Élat c҉cQ^lat ccEd^lat c҉cQ进6^lat cc^lat c҉cXQj]lat cc蠚]lat c҉cQ]lat ccPo]Élat c҉cQǚ>]lat cc]lat c҉cRw\lat cc譙\迲lat c҉c8R"\lat ccXw\lat c҉chRҙI\lat cc'\Élat c҉c|R[lat cc赘[lat c҉cR/[lat cce[{lat c҉cR՘L[lat cc *[lat c҉cR腘Zlat cc軗ZͱÍvlat c҉cS'Zlat cc]|Zlat c҉cDSחNZlat cc ,Zlat c҉cdS臗Ylat cc轖Ylat c҉cS7Ylat ccmYΰÐlat c҉cSۖRYlat cc0Ylat c҉cT苖Ylat ccXӮlat c҉c-6Xlat c҉c4TXlat cc>]Xlat c҉cpT踕/Xlat cc Xlat c҉cThWlat cc螔WËlat c҉cTWlat ccMlWlat c҉cUǔ>Wlat ccWblat c҉c$UmVlat cc裓Vlat c҉cDUVlat ccSrVÐlat c҉c`U˓BVlat cc Vlat c҉cU{Ulat cc豒Ulat c҉cU&Ulat cc\{UÉlat c҉c,VӒJUlat cc (Ulat c҉c`V胒Tlat cc蹑T#lat c҉cV.Tlat ccdTÉlat c҉cVۑRTlat cc0Tlat c҉c$W苑Tlat ccSרvlat c҉cDW1Slat ccgSÐlat c҉cWߐVSlat cc4Slat c҉cW菐Slat ccŏRۧzͨlat c҉cW0Rlat ccfRËlat c҉cÐlat c҉cX^蛄Glat ccуF3ڞlat c҉c^AFlat ccwFlat c҉c^hFlat cc'FFÐlat c҉c_蟃Flat ccՂElat c҉c<_OElat cc腂E莝lat c҉c\_lElat cc+JElat c҉c_襂Elat ccہDÐlat c҉c_SDlat cc艁Dlat c҉c`zDlat cc9XDOlat c҉c(`詁 Dlat cc߀Clat c҉cL`YClat cc菀CÐlat c҉c`~Clat cc=\Clat c҉c`跀.Clat cc C袚lat c҉ca]Blat ccBlat c҉c,a Blat ccCbBÐlat c҉cLa2Blat cc~Blat c҉cakAlat cc~Alat c҉caAlat ccQ~pAclat c҉c b~=Alat cc}AÉlat c҉cPbs~@lat cc}@lat c҉cb#~@lat ccY}x@klat c҉cb}E@lat cc}#@ÉU]uƈUM]UMHlat c҉ccT}?lat c҉cM(}?lat c҉cc|q?lat c҉ckн|8?lat c҉cc| ?lat cc{>E%$lat c҉c$c4|>lat c҉cM|>lat c҉c,c{Q>lat cc{/>lat c҉c4c{=lat c҉cMY{=lat c҉c,c+{=lat ccaz= lat c҉c4czM=lat c҉cMz!=lat c҉c:lat c҉cMw:lat c҉cdcmw9lat ccv9L lat c҉clcw9lat c҉cMvc9lat c҉ctcv59lat ccu9 lat c҉cMkv8lat c҉c|c=v8lat c҉cv8lat c҉ccu[8lat c҉cHu-8lat cct 8lat c҉cdu7lat c҉cc6u7lat c҉cM u7lat c҉cctS7lat c҉ct(7lat c҉cct6lat c҉cHUt6lat ccs64lat c҉cMty6lat c҉c|csK6lat c҉cs 6lat c҉cc{s5lat c҉cHMs5lat ccr5,lat c҉ccro5lat c҉cMrC5lat c҉c-}5lat c҉cvr4lat c҉ccHr4lat c҉cHr4lat c҉ccqc4lat cc"qA4lat c҉cq4lat c҉cclq3lat c҉cH>q3lat c҉ccq3lat c҉cMp[3lat c҉ccp-3lat c҉cp3lat c҉cc]p2lat c҉cH/p2lat cceo2lat c҉ccoQ2lat c҉cMo%2lat c҉c,co1lat ccn1_lat c҉cLc+o1lat c҉cHnt1lat c҉ccnF1lat c҉cHn1lat ccm0lat c҉ccLn0lat ccm0+lat c҉c$cmn0lat c҉cMmB0lat c҉ccm0lat ccl/|lat c҉ccHm/lat c҉cMm/lat ccRlq/]uvU]ÈUtEd 7E d 7Eslat c҉c,dzl.lat c҉cMNl.lat c҉c0d l.lat ccVku.lat c҉cpdkG.lat cck%.lat c҉cdk-lat ccj-jk,^k,hxJEplat c҉cdjq-lat c҉cMjE-lat c҉cdj-lat cci,lat c҉cdPj,lat cci,lat c҉cdjw,lat cc"iU,jk,^k,hxJEtE]ÉU]Ëlat cch+lat c҉ck,H?i+lat c҉c,ei+lat ccGhf+k,Zk,\]EEk,[؄t Zlat c҉c4*   as]OvIle^ɿWPlat c҉c\ebZ%lat ccb8%Ek,]tRlat c҉cxeb$lat cca$Plat c҉ce1b$lat ccga$lat ccEad$]ÍvU4׉ˋuEk,HӸP@ڸ f6@n?EE8]~ˉÈ<ettiH=Ɖ FJEVE4Pu0u, yF >=Ɖ IVE(Pu$u %F>6=Ɖ IVEPuu Ex9>lO<Ɖ MILVEPu u E'=8]<Éڹf~>=Ek,[U8]rjI<Ɖ HVk MDPEtEt Dy:=m8]w;Éڱ)OHN#=B]u}0UD]u}ĈEȉӉΊEHE̋}2|9EDPu@u<E8Pu4u0E,Pu(u$E PuuŮEEȃBt QE<{ttttDi? ^? SE$E(GfE,fGE,Pu(u$ 'E$E(GfE,fGEG EGfE fG}}ẼuEڹ f8SEPuuܹ>bڱ PBO7CEЉEEԉEfEfEm]u}DvUD]u}ĈEȉӉΊEHE̋}2|9EDPu@u<E8Pu4u0E,Pu(u$E PuuŮE}}ẼuE~8Ar s!lat tlat flat f-EEEEEEXtJ]u}Ív$f tf [Bf f lfff~f$É$Ã}$ËftËf7u$Ë t Ë v7t D$l$ $Ív$Ã}$ËftËf7u$Ë t Ë 6t D$l$ $Ív$KC< t  |ً$É$T$$D$D$D$ Ã\$t$|$$ӉL$D$$%<*J,*p,:$@ T$9D$]PC$P9J$%<*r*,*t+,t #$P D$9~ D$ UD$D$D$uD$$@9D$$P D$9$HD$$1::uϋ$@ T$9}8D$@@‹$t$X$P T$D$yD$$@ T$9uD$^$@ T$9fJ$P T$D$9$P D$9&$$PD$1::uD$D$CD$D$t$@9ID$t$P D$9~D$ D$ D$ \$t$|$Ív$$@uKk $I9tBЃ~Ѓ"k ǂ$@ t $@ \$@ ÉUlptljƅx|Q#ЅEEEEfEf%%=@u EEfEf%%uM @%<.uMCЋE!ubC h A||@E܈CECfEfCUEESEƅxxlptÐ$t$,k uزk k 9~Cكtɋ$t$ÉUFJBk N9uk |߅ uƅ.ƅ/ƅ' ! ƄF tSk ~k k Vk F V|v F UD؅~ k ǃh A FƅF F Åu ƅ$Sgu ƅntYP P ;htƅ5t,F GCVlat f$lat fÍv $t$|$f׉ˉر"iu"lat f ǃ CCf f f  ~  UB jEPjt蟶t E UEE]u}ÍvD$$D$BD$ L$ 9 ‰ЋT$ЃÍvU ]u}u ]SVQRPj]s]u}U ]u}QRPh]u}ÐU ]u}RPh]u}É $t$|$øZ?ƃu#telj$t$|$ ÉU]u}É։؅|؃~E۳ VSjdEE]u}ÍvU ]u}É։ω؅|؃|~ 肳 WVSj`Ҵ]u}ÍvU ]u}RPj9萴]u}ÐU ]u}]u jSQRPh迴]u}U ]u}]u jSQRPh苴]u}U ]u}QRPjx]u}U ]u}QRPjy]u}U ]u}RPjz輳]u}Ðf%%=@Éf%%= Éf%%=`Éf%f=f%%=Éf%f=f%f=ÃÐɃt tÉU4]̉EUEQ$EI$MUԸPuUumEum苙E'EXtŚ؋]ÉU0]ЉEfӋE#MUظ腖PuEumf7EXt^؋]ÍvU0]ЉEfӋEi#MUظ PuEumf贘EPXt؋]ÍvU4]̉uЉEӉ΋E"MUظ豕PuEumGEXt艙؋]̋uÍvU0]ЉEӋE"MUظFIPuEumuޗEzXt ؋]ÐU EE&u]4jE&ÍvU4]̉uЉEӉ΋E!MUظ联PuEumEXtY؋]̋uÍvU0]ЉEӋEb!MUظPuEum Ta/訖EDXt؋]ÍvU0]ЉEE MUظ謓PuEum譲FEXt舗؋]ÐU4]̉uЉEf΋E MUظDGPuEumf\ٕEuXt؋]̋uÐU0]ЉEfӋE% MUظْPuEumfpE Xt貖؋]ÍvU0]ЉEEMUظtwPuEumEXtP؋]ÐU0]ЉEE`MUظPuEume讔EJXt؋]ÐU4]̉EUEEMUԸ詑PuUumEumN7EEXtq؋]ÉU0]ЉEӋE~MUظ25PuEum ʓEfXt ؋]ÐU0]ЉEӋEMUظΐPuEumfEXt訔؋]ÐÉU4]̉EӋEMUظbePuڋEumMEЋ]EXt8؋]ÐU0]ЉEӋEFMUظPuEumղ蒒E.Xtԓ؋]Ð9Ív)Ív4\$0É$D$dD$L$DZtD$\$04Ív$Éȉ虭$É$Éȉ衭$ÉfCÉU0]ЉEӋE.MUظPuEumfvEXt踒؋]ÐUEӋU!hjf腫ÐU Ef΋Uhj]f!ÍvU0]ЉEEMUظ贍PuEum-NEXt萑؋]ÐUEUhjǬÐUEӋUhjRիÐ\$t$|$ É$u蔷<$$P$P豯$$\$t$|$ Ív $t$|$Ӊ߉Sq$t$|$ Ã\$t$|$ $Ӌ$B=|- $C=|- ζfߋ4$%PC $\$t$|$ É $t$|$f׉SƮ$t$|$ ÍvVÉU ]u}EUMM uu.Mb‰UiUEÉPPME]‰]u}Utx|ljӋG=u UHEUG=ujSU@+jSM@Ɖtx|Ã\$t$ |$Ӊ؃u,޸Mb‰$ؙiT$\$t$ |$É$Éȉ衬$ÉU8]ȉEUEEMUи蚉PufEUumEum虮…~!EE]E]E}EEnXt]U ]u}EU΋EM ]}UUUtSQPVuuh]u} vUX]u}U΋} UUEEE8URP耽PMES…}mPPEPEMU-É؋]u}U]uӉEE&VPPEٺ.…|]uÉÍv赩覩藩舩0XyDjXЎ[l؏L=X.pД8U]u}EӉM؅} EgUڃE课Eu EDپ9|#NvFUE}u 艇`(E,($茜Dž$$$.Wu&踏\$\o蒏󥋅PPP-XД` P(Dž g$講Dž$XtHh ÉU (UDž,T<cٚP9ÃRtWtL~Dž$dƃuDž$`u/.dDž$`WuOt"FƍUЍdEuZ N"蝍dt"dƍdpu 軄`0E40,辙Dž,,P,`hWu&r(dS$dLnj(S󥋅(P-`Dž$kd,Dž,Xte$ ÉUHLPƉ׉M]DžT\uDžTu+追\诽ҋDžTw莃Xu=耽裋\p蓋d臋X{*X9\-Plat @f҉Df ulat c҉c\u貎\諼ΊًE ]‰芎h\聼褊q蔊F-ÉڍX` F(G-X` G(XTTHLPUƉ׉]Dž`uDžu+蘻軉`舻諉DžWuK[~`Kn;^+NDž, ug#`к贺׈Dž 苺讈袈o蒈lat @f҉DfMu5.Qlat c҉c` u`lat k҉ku賋謹χًU E菋胹覇`s薇c膇F-Éڍ ` F(G-Éڍ Ќ` G(P-ҍ 譌` P(  v$ÍC胼u C$Á$É*u T$ u$ĤÍv$fJ$ÍvUTX\EUM]EEEMh<[?PuMEuUE]t[9|)NFED0<:t ED0<;u E}D09؋U?uU*t]EumNjEt@þEzEt@~%UEt@D$D$+ 8tas as, 8u CFB;|$|;T$} %) D$+D$ ‰Ћ\$t$|$ Ã$T$T$$&Ð\$t$ D$$$t[ڋD$9|&NvFD$t‹$D0pD29ދ\$t$ É\$t$ D$$$t[ڋD$!9|&NvFD$Zt‹$D0pD29ދ\$t$ É\$t$ |$$T$$tRL$tI$\3|$|7)Fu 99~څu)ʉЋ\$t$ |$É\$t$ |$$T$$tRL$tI%$\3p\$\3p)߉Fu 99~̅u)ʉЋ\$t$ |$Ã$t$Ӻu tKDu93)@Cu t uu: tuЋ$t$Ív$t$ӺuYRu"Gp p)Ή@Cu t uօu: tuЋ$t$Ð\$t$|$ $t?$u t4-u"v$)É$BFu9u\$t$|$ Ã\$t$|$ $tM$u tB;u0v$pp)؉$BFu9u؉\$t$|$ ɉЅt p Aʊ uЉЅt p Aʊ uÐ$T$T$$vÐ$T$T$$6Ð$$HÐ HÐU8]ȉEUEMUԸ8oPu4E0pEUE̋ mыE] pẺ[;EoEXt<]ÐU8]ȉEUEMUԸZ8]oPu4EoEUE̋ mыEg]oẺ:EooEXt<]Ð$T$T$$ mуÍv$T$T$$ mуÍv mÍv mÍv$t$ÉЋ5m‰֋$t$Ív$t$ÉЋ5m‰֋$t$ÍvmÍvmÍvUEUEt@H…~ UT!rA9 UT !r@)PUEEÍvUEUEt@vA9 UT !rPUEÉUEUEt@H…~ UT!rPUEÐD$$$D$'UT]u}EUMEEMUԸ6 mP'EPmEUEE],mẺEt@þvv@ƋED0:EubEEElE)PAUEẺEčElEUE)EEȍUEW9|9t2ElE)PAUEoMEEESlEUEMEE7E$lEElEXt8]u}Ð\$ t$|$$T$L$T$qƋ<$k9t^:D$uVC)B$$$B:D$u@Ê:D$tJ @9uډًD$$)‰ҋ$Y\$ t$|$ÐD$$ @@$D$à \$t$|$D$$L$$D$ $t@D$t$]v$D< rN, t,t D|$u=F:|$u;D$}$@D< uCF;D$}$@D< uNC;D$~;D$u$V|$oj$D$VD$jcD$Wt$ < r>, t,t4|$u A AC,|$u A ACt$ < uC t$  AC;D$|\$t$|$ Ív\$$$tRe $ Ar t 7A˄t* $L0 rr t st9|\$ÐU4EDžMUظ1hPuZh hDž蔾]h3hDžXt25ÉU8E]u DžMUظ0gPuZVSChDž1ʽ]g33gDžXth4U8E]u DžMUظ0gPuZVSǎDgDža]gc2fDžXt3U@]uĉ}ȉEỦEMUظJ/MfPEHƻ9|gKvCEf‰)؉ẼD m98ELfEẼE詿UЋEEumE̅um1E fEXt2]uċ}ÐUH]u}EEEċE EȉUEMUظT.WePŰEEHþ9NvFEe‹E)}ċEȃD UċEUĉE9OE8eEEċUȃE荾UЋEEYUċEUĉEȃ}u}u=0EdEXtx1]u}vUEEM QPEv \$$ӍL$$fD$%\$ U]EMUfE%t4EEE EPj @ KE .؋]U]uEUEVÉfE%t4EEE EPj @ 麩 g.؉]uÍv \$$ӍT$$SfD$%\$ ÉU]uEUE2ÉfE%t4EEE EPj @ GI -؉]uÍv \$$ӍT$$SfD$%\$ É \$$ӍL$$fT$t؋\$ U]uEu] UEfMtڋ]uU]uEu] UEfMtڋ]u\$$$b\$ÉU]EE]a]U8]ȉEMUظF*IaPEaEKt Kt>KtqEEE EPj   ,jEEE EPj  LD +4EEE EPj  z +),E`EXtd-]ÍvU|EUMEEDžEMU(_P ]A`Et@EEEE EEU9EUD<%uEU9~6E_EEU)PMUEɾMEE EU9 <%6 ,% ,tMi2,, ,,,9  tYEUDh&E^EE!E轴E^EE t[EUD@PR躆E^EE豷EMEi^EEk? tYEUD@PRME!^EEDEE]EE؋UЉ1)ЉEЋU؅tRE)ЉEԋE؊<-t/E]EMԍE0tUM؍EA E]EMAE0DEUع I tYEUDhE0]EESEE ]EE t[UED@PR@E\EEEE\EEkq tYEUD@PRӃES\EEvEE.\EE؋UЉ1)ЉEЋU؅tRE)ЉEԍE[EMԍE0UM؍E1| tOE[EUEDp0jEPM̍E)EfE[EEU EY[EUEDPRp0jEPM̍EX(EE[EE tREZEEUDp0űEPE'L(E蘰EZEEM7EZEEUDPRp0űEPE''E+EGZEE tOE"ZEEUDp0jEPM̍E~'EʯEYEEiEYEEUTBPr2jEPM̍E&E`E|YEE OtREWYEUEDp0űEPE'&EEYEEEXEEUDPRp0űEPE'%E菮EXEED~tWEXEEUDPRp0űEPE'%E&EBXEE EXEEUDp0űEPE'r%E辭EWEEstEE[HEELHEXt؋]u}ÉÐUhÐUL]u}ƉUĉEMUԸGP EkEU@:BtUE@苨t EE@<.tU.jt EUE@Oƅt EGD0.؅t2HtHtVHyHt4HtaUEg-,ɋE8jUEME8XUE;]EȋE@UE#]E̋E(UE E8UE]EȋEEE EFEXtGE]u}v$$ÐUEMEPE?Ð$$ÐUEMEPEÐ$$Ð$L$L$$ÉUTEˋuEE DžMUظ+.EPUB؅t!HH7HH& WrHut~At~(-8v(tnHtvHt>(]Ẽ <$}DW肨(]EЃ <$}kDWMp0hz!DDž>י}C8BPp0}CW裧E.DžtECT8@9|EETtuWCDžVEPF]CEE٣Hǃ ED<+u'‹EǬE赬O~ ED8<0t܉ ED8: ErO} u E<-uFEtR@9~@9~@ljE+Et@vO~ ED8<0t~ED8:uOE t~H|HtA(]Ẽ <$]ASm(]EЃ <$]VAS5‹p0hкwADž踖]@ZBPp0]@Sщ}vEщjE< tߋE<-uE@PE@PEEDž+ ~ DžEt@)+@?DžPDщH^ӘU EqEt@9}‹EMY E ED8<0t3 u Dž~ DžHHtF(]Ẽ <$]>S蔢(]EЃ <$]}>SWp0ht'>DžDݓ]=@PRp0]=S衡E< uEщ舧E.\DžE=T8lu Dž~ DžHHtF(]Ẽ <$]׏]9<BPp0]9S蟝E<-ÄtE腣E.YDžtE9T8CE@t6K9DžEP訒U謣Ett%t9tcEEPE5EHEEE@EȸTE̋EEЍUȋEWEEȸTE̋E@EЍUȋE)utU#Io`EċE@EȋEE̸lEЍUċE蕏xEȋE@E̋EEЍUȋEgE@EȸxE̋EEЍUȋE9E@EȋEE̸xEЍUȋE W`EċEEȋE@E̸lEЍUċEՎ!xEȋEE̋E@EЍUȋE觎EEȸxE̋E@EЍUȋEyEEȋE@E̸xEЍUȋEKxEċEEȸTE̋E@EЍUċEdxEċE@EȸTE̋EEЍUċE1E@EĸTEȋEE̸xEЍUċE词J5DžXtUEUjjjEPUE UEEPu uE vUEUjjjEPUE^UEu uEUEUE}jjjEPUE UEE$E D$EUEUE}jjjEPUEUEuEvUEUm}jjjEPUE`UEu uEUEEU RPEUEME UMEm}jjjEPUEUh]u}EӉ΋} EMȍU,/3PuLEz3EEPuuWEPڍEME׺(3]׋UٍE2,E)3EXt؋]u}U]uÉЋUuVuu Rh‰]uUEE QPjEPэUEvU]EE]Suu PhE]UEE QPjEPэUEwvUEEuu PhE UEE E}QPjEPэUE%U]EE] $]\$PhE] UEE E}QPjEPэUE UEEu PhEvUEE m}QPjEPэUEuUEEuu PhE U ]uEE]u E]m}QVjEPэUE]uU ]uE] EuPSVhE]u UEuu QEPE vUEu uhEUmrmv4EEEEPj  V: m]E U-,m-w-,m-İrt -,m: UP5r!@1@@L5rhDDtL:sP:uk@1WD0D~!L0t @Pu u@LDžXtURQU U EUMEPu uUumMƄE: vUEUEPu uUE U EUM-m <$MUERUEUu uUEUEUQUEuÐUEUȋUtR9} UtRPMtIA)UEtÐU]u}EEOvG؃ƃ ~Lu t uQEH]EEPj  {  EEEEk EÃ|E]u}Ã0t$(|$,$T$|$$t@9|IA$T T$9D$t@H…~T$TT$st$(|$,0ÐUX]uEUMuEEEEM܍UĸP EjE:EEEjE$EEtfEEUE mыEiEEEEEUE mыEiEEEEiEEE]4UE};Åu$MEEiE[EEEE?EHPUE(rEEE EUEjEt@؉ÍEEEt@)@PًUEqEhEEEu!MEEhEE@EEEt@)@PًUEkqE;hEWEEEt@E2EE#EEEEEXt]u \$$T$ȅ~$D$t@9|D$D$rÈ؋\$ Ã$$t@9~ЃÃ$ЃÃ$$t@9~ЃÃ$ЃÃ$ÐÉmÍv$É؋$UP]u}E׈MEEEEMUиuxP7EEfEEEEt0EEUE茘E`fE|EȉE5vE`EڍEEȅt@ƅE3EڍEEsuHPE EڍE躳UčEnEt0EEUEɗEeEEĉEUEkEKEu ؅(EEEtEEeEEVEXtE]u}Ív$Ѻ $Ív$ $ÍvUh]u}EUME EEEEEMU̸Z]P]EpdEEEEt@E~ EUEEt@BEEEUDEE8EuEE"t'uEEEtCbE:Eu4E EuًUElUċE@iuEEEt];E~EUEC9$;E~EuEIE>Er EHPUEĹ[lMċEEcEuMEEcIEwEt@ƉaE EE EXt]u}UEUh@QUEhUT]u}EUM]EMUȸ PEEEE;uME Ått;HtjHE藧M}EEt@U9xEU UEDEER3~PE{UM8E/~-E\aEU7E@EE EPj up E@'EPE@TEt E@؋]Ív$$@$@t@ $I9~$H$@D8uϋ$@$@t@$R9|U4]̉EEMUظ P]C\ C vE@E@t@UR9~XEPE@D< tBE EEPE@TEmbMЋEPE5_E@E@t@UR9|EPE@D< uEXt[EEXt5؋]ÉUX]uEEMUظP]C=CE@E@t@UR9~XEPE@D< tBEEEPE@TEQaMЋEPE^E@E@t@UR9|1EpEXj l UDEwEXt[E]EXt؋]uÉU8]ȉủEEMUظPruFFE@E@t@UR9~EPE@D< tϋE@t@UR9EPE@D+t -t*EPE@D<-uEX[ESEEPE@TE_MЋEPEt\E@AEEEPE@TEi_MЋEPE1\E@E@t@UR9|EPE@D0 rE@t@EEXt*؋]ȋuU]]St}}fMEm}mE]ÉU ]f]S]Su]E]UEs3E <$d}}fMEm}mm]1E <$1}}fMEm}mm]EvU]E <$-}E}}fMEm}mEUZ C]vUPZ UE$-]E$]EÉU }}fM-mm}mUP@-m}m}U@-<$,$U ]u}fffMEEÅ~@='}6H s-E~%f%kfMf;Pzwǃ~ff fKÉƸQ‰ָd)‰Ӹ:׸ƒEƉuEEEmEE(Eȋ]u}U ]u}fffU fUUUЃ} Ӄ<}փ<}U}tHи6Ӹ`ָElj}EEEm5Eȋ]u}U,]ԉu؉}fff΍EPfffuMljEEÉEEƉEEEPj }g E]ԋu؋}ÍvU8]ȉủ}ffffEfEuԍEPfffu[ÉEEƉEEljEEEԉEEEPj f麸 XE]ȋű}U(]؉u܉}EUMEwEfEfEf"}}fME <$m}mEU EUk9Ѹ:)EE͸smUeߍ<)։ӸƸ׀+‰ָǃ)Ǹgfff‰ӸdE s AfʋEffEff؋Uf]؋u܋}U]uËuE $ED$dE $ED$cff]u U]u}lj։ˋEEE <$-}Mʸ|!fȺ6ѸsEfȺ`ѸMbfȺEf]u} U]ÃE$E D$KSlE$E D$C PK SC]vU]fKfSf9EE$C PfK fSfCW$x]E]ÐU]jj}}fMEm}mEU|sكM]EUuuP]vD$HfL$ fT$ fD$pD$D$$$ÉUEEPfMfUfEx]EÃD$D$$$ÐU]ÃE$E D$MUESMUE@fMfUfEEE$E$E D$]E]U]u}ÉUMu|*f E0JЃ Ѕ} k )ffBEffQ%kU uff;Hzv$f+%kU fHzUf]u}$fu"duu$ÐUEE$E D$E,2 UEE$E D$E< UEE$E D$EHUx|EEMUPEu3EEE EPj T;`U ƅEƅƅƅZGUT:DrLDt4 t u=u2(uuUtR9~Ѓ|%t |^% OGD|EDžEt@ƿ9OGED80 sBED8fPM덅E< tED8< 9ED8:t&Et@9ED80 ~3EEE EPj TH^H ;uE~ƅMUu6Df]Åt3EEE EPj T]麿 QECED80 r3EEE EPj T] 9TE舍fEfu&ftf\fLESẺEt@9}GE8E)PDEAAŰMEO>UًECEEEEXtoÐ \$D$$$t[D$@=}C$umًD$G D$ڋD$D$PڋD$P\$ Ð\$$ˋ$@=}2ً$ $ڋ$$Pڋ$P\$ÍvU8]ȉEUEEMUԸUXPuAEEE$E D$UEEU<]oẺE]EXt]UE$E D$MUEE$E D$EPMUEEEPEPEPfMfUfE0U1$MUE9fEÍvUURURURURMU.fMfUfE$jfMfUfEA$Z]EÉU`EUEMUиԭPu EEtXtY tFEȍMU蒭PuE;Xt<{b-jEÐU`EUEMUи47Pu EnEԯXtY ytFEȍMUPuE蛯Xte蜱۰¯荱ʰEÐU`EUEMUи蔬Pu EE4XtY ٰtFEȍMURUPuEXtů;"*EÐU EUE u EEE EEU EUEu EEE EEU EUEu EEE EEU]Ã$CD$E$E D$]U ]ËEEE EE$ED$$CD$y]EEC]U}uEׅqO)tGFGtXIu&t&҃!сကut!tt0fWfE}uÍvU }uƉ׹1щ։O}uÍvU}u։ɉlj} t Itu0E}uÐU}1 t 1H}ÐU}uEUM׹1;M|M}uFO)ȋ}uU}uEU׹1ы}ut#FWr4A怀!r*r/rr%r rrGG GG1}uÍvU }E1 t"0шЋ}Ou@}ÐU}uE tUECUM؍EGG EBEEEMAE07>UECEUعlc q t#UEtEAMغ mn< t&UEDp0E}AUظn6 t$EUDp0EEAUظtnEЉ1)‰UЋU؅tRE)ЉEԍE AEEvEMԍE0&=UEBUM؍EmF b tiE@EEEEUDp0jEPM̍EwUE$BE@E\@EEq [E3@EEEUEDPRp0jEPM̍E蛝UEAE0@E?EE c tlE?EEEUEDp0űEPE'uUE"AE?EZ?EEoYE1?EEEEUTBPr2űEPE'薜UE@E+?E>EE ^tiE>EEEEUDp0jEPM̍EsUE @E>EX>EEmWE/>EEEEUTBPr2jEPM̍E藛UE?E,>E=EE _tlE=EEEUEDp0űEPE'qUE?E=EV=EEkUE-=EEEUETBPr2űEPE'蒚UE>E'=EE tUEfTE F{bt u}D:E:DEI 0t7E:EEUTEÈ؋\$ É$$P$@fDBf=.u3$@$/$@u $@$$@B̃Ã$$$@t$$@BЋ$@Ív$$P$@fDBf=-u$@$@ $@Ív$$P$@fDBf=:t $c $@$P$@fDBf=:u5$@u b$$@Bԋ$@$@ÍvU4EEMUظȌPE@UE@B E@EU@R96EPE@fDBf=9wEPE@fDBf=0sEU@R9~ aEPE@fDBf=*EU@R9EU@R 9~ oaEPE@…ft t!HtEP"E!EE GE!EUEDRPE"E!E!EEt EUDEZtEUDXE*UETZEE̋U9~ME ESUԍWE!E !E EEEEԋM@|  | ¸9r w;wEԃ|EԋU9~EԉE̍E2 ESU̍E$!EP EEE Eu؋EЃE؅t@U9E˄uKEEU؅tRE)Љ E UM؍E %IEcEU؅tRE)ЉEL MU؍E$M؋EE$EEEEU9zEfEEEEEEEXt{ \$t$$$@ԃu4$$@F 4$$@ԉF$@@4$F$4$@v 9$p$@9tt L$H؋\$t$ Ð \$$$@$@$@D$$@$P$@fDBf=%u%C3$P$@fDB@f=v&È؋\$ É$$P$@fDBf=.u3$@$/$@u $@$$@B̃Ã$$$@t$$@BЋ$@Ív$$P$@fDBf=-u$@$@ $@Ív$$P$@fDBf=:t $c $@$P$@fDBf=:u5$@u J$$@Bԋ$@$@ÍvU4EEMUظuPE@UE@B E@EU@R96EPE@fDBf=9wEPE@fDBf=0sEU@R9~ IEPE@fDBf=*EU@R9EU@R 9~ IEPE@…ft t!Ht t@UtBHtFHtJHtNHtRHtVHVYRPKD=6/P( ! 0 @0 pEƉ^ lat Xm\mf @l  P̙ 0  Pg D}K @a/ E `0) 8   @ l pОk ОO 0Оe3 ОI @О- О  pأ `Х p r 8Y o@ V']EEPj LƉUGT]u}UD]uEMUܸQPv$ÅtO]EE*EڍE] EĉEE EPj h) htƉ^ 麅v STE踈EXtWU]uÍvUX]u}lj։ˋEEEEMUظQPEMEEtEЅuE#E/EEE8EEEЉEEEE uE]EEPj UeRRE蔇EE腇EXt$T]u}vULm ? p@ `t@ v ?p ?Ðp@ pBt@ tzBÐ$NuN؋$É$NuNX؋$Ð$}NumNX؋$Ð$UNuENX؋$ÐUPÉ׉uEEMUظN腅PE̅Ej}EDEEME38E_E{EЉEڸL>tQE]EjEEE CEE MEк7EEEЉEEt@ËED<.tUEAC9~؅~ًE}%PEEE貄EXtQQ؋UhAߢ=hat,EÍڸ5w聴w=tҋÍvU]܁Ë uN]É麐{ p{NÉ$ø‹ J$Ð$t$5 ЈËvtu؋$t$ÉU8]ȉEEEMUԸK͂PUEEtE uUtUEu( pn@ 麍| ME跂EUEỦoME茂EE}EXtO؋]ÐD$$$t@~$E]u}Ív\$ t$|$$։L$D$\D$(mk$rD$D$[|$4kD$P ֈF $?Pu%$*BuT$$tJC$F;q$Ft@~ VD,Dv ,tt,2r.,v(D$!D$D$D$ D$D$D$-sD$ŠD$L$D$u D$D$D$uD$u D$t&T$D$ D$ ‰|$u2D$tD$%D$D$D$D$4 t>D$:4 u2D$ tD$%D$D$ D$D$}6 t8D$:6 u,D$tD$%D$OD$D$D$:5 t/D$:5 u#D$tD$%D$ D$L$ubT$D$D$$%t&D$$%uD$ sD$vD$AD$$%t4|$ u-D$D$!D$D$<$t D$D$oD$uD$u D$t#T$D$ D$ ‰\$ t$$(Ív$ʃ; s -ЃÉ$$% u$%Vрr@tttt%ttt'#)É$t}$ÐÐPÍvsPt,@$L,Ívu=tÉ=t=tÉ=t Ív=tÍv=tÍv=t fÐ=t fÐ=t fÐ=t É$ $BA;u  $ff;Bu$ff;Pt $f@$ff;tu $f@ $f@$BÉ$À=t ~ ->؋2=tC؋رI*$É=t= PQ€;u =tÃ$=t~ QP=t ҈؋$É4$|$Ơu  4$|$Ív t$|$$<$ t$|$ ÉѺt,@Ív\$t$|$ Éυ|!tJt Jtt,!t,t,z$J$$\$t$|$ Ã$$P$Ã$$P(Ë`` a_P P@ @!Ív{t ÉѺvtÍvѺwt@Ív^t Ã$t$Ã|3JtJtJt*(عot oعnt ZƉ$t$ÍvѺt<Ív0t,@)D$,%0ÉÃp\$l$Ӌ$T$ t(uD$ D$D$D$ \$lpÉUtEU)M)h21WEu{z\vjV541hfj]V33zV3z3tXV3t?Vw3 ?3tEmtE*TUR9u.E;Pu E'ƅ؋Ëfff~f ÐfÐ4$|$Ơu 4$|$Ív t$|$$<$ t$|$ Ét2++Ã\$t$|$fD$ fT$ډ+߉D$+ff;D$ s ffD$ ff;D$s ffD$ffX$ÍB ƍAL$ "T$ÍB ƍAL$ "ft$ fffL$D$=$D$\$t$|$ÐuG=tСu.=t 0 ffLÍv=t=t:Éff=tÉꡨf "=t ꡬf w"É=tÉ=t fÐ=t É=t fÐ$$ff$ffP$PÃ\$t$|$ Ǡ$t_=t>f5f=t҈$$$t%fffGf$\$t$|$ Ã=t fÐ $t$|$fƉ׃=tf шÄt؋$t$|$ ÉÍvˆ<,Y,Z[\,BC,,N|,<,:,T"b,    ,,,,~,,td,,,zf|f^wfvnf>ef<\faVfuPfkJfjDfm>fv8fw2ft,fq&fx fnflf*faffÐ$t"ڸL^$ÐP4^ÍvUhJULϋ] uu+@9u$tPL ƅH9uZ9ueuf J+9%C9u)9%AHunjX5(Eߺ B-1)bEߺ j\EЍMߍEfE؍MЋ'vU$ƈ$$\T$%t $%u3h`'&$%thd&$%t$$%u7hl%"$%thp%$ڀ8tNjuxE$%&fEXEM3&$8tNju|E$%&fEXEM%<;u mUDDžDžƅDžDžDžDž;aDžDž9uu ÉDž;u1ff;u~ƅatOƅff< ubu $ȋ%‰9u|~9t f@ff;D~tƅ;Dž39 D躔8fBf9t f躘ff9t 5fBa AB'=&t%&UÐ$$t`$$Y$D$AT$$$$$$$ǀÍv$$Ћ $9t.$ÈڍD$T$$$É$ÉUEUQ%PPEEUEUE=|)EESEǀÉ $$$։ˡ$Ht.HtKHtHteٍT$$L$nٍT$$L$NٍT$$L$.ٍT$$8L$ى$$ ÍvUP]u}E׉EEEMUԸPEEE:EyMEUE,v ,ar",vEfE~!EfE fE蹐fÍEJEfڍEpM̋UEƍE:EwEEUEMȉ]qEdEE݇EE·EXt]u}ÉUE׉ƅ:,wf4E ffff%fPt:wÉU(E׉ƅ:,v ,ar(,v"fE>fE~ ffff%f=u%&ugh$&K=&tBj}%EEEM&ff%fP:ÉU(E׉ƅ:,v ,ar(,v"fE>fE~ ffff%f=u2&uh$&ff%K=&tBj}%EE,EM&fP:ÉuP u \\PuPu@%t ]]Ð8t$0|$4$4$|$ =\td$d$gD$$D$%=]td$D$ % D$ L$t$0|$48Ðsa6$g$}5ະqu ຸUu  #;u $r=t Htt$.$8, s  Ét,@$Ã0t,@y$0<Ã0t,@TD$,00ÐÐU,EP# j 0u<0r<9w q47 ffKvfC$P/Ӎ$uËp$f r";u  #;u & I&IMht@wEufEPEufEfEff=v ffEffffu -$ P%` $t%t 8 Éff$D$fP  #;uH$%ÐxÍv YfÍvUffff9u ff9t>@P@PABVff5ÍvfÍvff9t2ftf-u Ã\$t$ Ƴht@fFf;$u&ff;D$ufffFf؋\$t$ É&9tÍv\$ t$|$D$Ӊ΋T$ui T$T$T$D$A: D$BD$D$A T$@0T$T$ T$D$ T$H¹9|2IvA|$@<$DDD$8D$||9ҋ $D$\L$T$tT$JD$A} D$JD$Ac D$$BD$D$B\$ t$|$ÉU <ts%sf-mv:-msm}L@EDEfHfE0PETEfXfEEEE EfEfEm U ]u}Étmtmm +; m +;tk U TU$TfU(fT a?9Ɖh50;VEPuuAt5:lVCPs3AH:<mtmm+; m+;tk UTUTfUfT ~\8Ɖ5M:VEPuu@5:VCPs3@e:9Ymt#EPuuEPu uq+; m+;tk U TU$TfU(fT f7Ɖ5W9VEPuu@59VCPs3?oD8c]u}$U]u}׉΋]%$`+>ԍ؍Cf܍fC>;55Ff5fF;>ԍ؍Cf܍fCGFfGfFԍ؍Cf܍fCxލFffFGCfGfCH>GCfGfC-ލFffFԍ؍Cf܍fCo />ԍ؍Cf܍fCGFfGfF.o ;GFfGfFo -5/;-o }m/>m/;bo />o /;K>GGCfGfC//o} <$oo m <$>GPww EPuu?;ލFffFԍ؍Cf܍fCG GFfGfF/ooo ;>o/;p>G GCfGfCW>ԍ؍Cf܍fC8o -5>ԍ؍Cf܍fC 5Ӈ]u}Up]u}ÉUMEmmu1EUEUBfEUfBE踗}}*؃EUEUBfEUfBEEt}ЋEUE UBfEUfBEEE}mm-5mm}كmm]E}m-5mE8}޿9|4OGEEǖ}mm}mE(E89mmmɉ]Em-5}܋E܉EEEfEfEm]u}UX]u}EU5EС5Ef5fEء5Eġ5Ef5fE̡EE9]KCEE(Pu$u EPuuMEމ‰}m-5m-5}mmmmEEEEfEfE=0Ɖ62IVE(Pu$u }9$ = VEPuuA96[2VEPuu9 6 2ى6Y1xEEċEEfEfE̋E܉EЋEEfEfE9]N/Éڹ(61% ڸW6ڹ461SE(Pu$u ,8ڱ ;SEPuu7ڹT61SEPuu7`50Tm]u}$U@]uĉ}ȉEԉMЉUmmEHEE}}EHƿ9OGHEEmmE8tEH9uE辒-\6m}t Ẽ9uE萒-h6m}ft Ẽ9uEe-t6m};t Ẽ9uE:-6m}E m}9=a~-Éڹ6o/SEPuu6ڱ 9SEPu u5ڹ6.sSmmɃ <$5Kڹ6.5SEPuui5ڱ*8SEPuuܹ15ڹ 6K.M̉ڸ2-mm}m]uċ}vUL]u}EȉMĉUmmEHEE}}܋5}9KC5HEEmmE8؃t;EuE-6}{؃tEH9uE܏-6}W؃t E9uE趏-6}1؃t E9uE萏-6} E{}EPuuxtEE܋EEfEfE mm}9=a*Éڹ6,SEPuuE3ڱ 6SEPu u 3ڹ6',SmmɃ <$2vڹ6+`SEPuuܹ2;ڱ*)6(SEPuuй\2ڹ 6v+Mڸ"0*mm}m]u}Up]u}fUfUf~fEƋE E$FfE(fFωh}Љ]EuUEEUBfEUfB}E0m-6}fEm m}ܸhmmɉ>fE-6m}܋EEċEEfEfEMHffEf;}|BfMvfEEEEEmm E8E背m}f;}mmEk <}fUfEf;UfMfE-5m}EM)fEHi@ k m,EHiÍ k ,mEiÍ k <f;UEHiEi,,}fEf;E}mmEiUTUfDfE=3&Éڹ6(CSE(Pu$u w/ڱ 3 SEPuu?/ڹ6Y(SEiTRt4 .ڹ7(SEPuu.dڹ 6'NMڸ,9'-m]u}$UXÉ}}܋EEE EfEfEfDžfDžfDž)Blj)Љf}}۽h}۽,fmm uL۽} fDžfDžE E$$fE(f(EEfEf۽8 $Bf(fB裈۽\m m-7۽Dۭۭ -5۽zۭzۭ -5۽Rۭۭz-5۽ۭRۭ -5۽>ۭzۭR-5۽fۭۭz-5۽ۭۭ-5۽fDž`k * .Bf 2fPrk ۼfff=~f vۭ>ۭ -5۽448Bfk ƃk *< .| f2fD fi8ff;~2fѥffۭ mm mm}ۭm}ЋEЉEEԉEfEfEۭm}-\7ۭۭh۽h#ff9ufff k j8nk 9*D9.fD9f2fkjۭhm}ЋEЉEEԉEfEfEmtHmm۽mۭtEЉEEԉEfEfEm-6}m􋝨$vUTEEE EfEfEmm u۽f}d DžDž}}}}}DžDž۽|m m-7}E E$fE(fEPETfEfXۭPۭ-6۽ۭۭ-6۽ۭPۭ-6۽(ۭۭ-6۽ۭۭ-6۽ۭ(ۭ-6۽ۭPۭ(-6۽<Džvk  Bf fB}k ۼ\|Dž vKCHHk @k ۬۬-6k ۼk  Pf fP}k ۼ\UۭۭP-7}ۭۭ\- 7ۭۭf-,7ۭۭp-87ۭۭz-D7ۭ-P7m۽Xۭۭ- 7ۭۭ-,7ۭۭ-87ۭۭ-D7ۭ-P7mɋ@k ۼ@k ۭX۬۽pۭ|ۭp۽dۭdm}ۭd-\7۽Lmm}mmvmmm۽@mmm۽@ƅ;|m}ƅj;~BDžۭmm mm}ƅۭ@ۭLwƅ|KC؃i,k k 5\ 5`D f5dfD i,k k 5 5D f5fD iX|\Ef`fEKvC)؃ )k k \ \` `fdf d )k k   ff ilۭpm}ۭLm}-\7ۭdm}u k |EffEPTfXf\`ffdKCk i,k \D`fDfdk i,k DfDfxmm}mt5mm}mm}mmt-6m}ЋEĉEEȉEfEfE=Ɖh7VE(Pu$u E VEPuu 6#VEPuuĹu|7_VEPuuй:.Ɖ7C7mٽٽfm٭߽٭i7VEPuuy <$V+Jm􋝬$U|]u}ÉUME=EEE EfEfEmm;E~(CPs3EPu uMIU} Et}E}Emm;E~(CPs3EPu uMIU4} EWt}E]EUUEPfUEfPmmmmuE8ԍE؍Ef܍fEKC-7m}EmmE8E~6EPREpE0EPu uMIEu‰k} Es}EEmmE8E~6UBPEpE0EPu uMIEu‰ } E-s}EUEUEPfUEfPmmmmk E|7Eġ7Ef7fẺE;uMEEHkdMTk m,ɋEHkdHMTk ,mEkdMTk <m-7}ċEHkdULk }kdU|:k ,, <$EHkdHMTk }kdM|9k ,, <${}mms:EEEEfEfEEkdULk EDEfDfE;uHkdHUL k kd}Tk ,,1m-6wjE4= Ɖ76Mk"8 m E=tS_ Éڹ 8PMڸڹ8&r m]u}UL]u}MM Mċ}} M̋ ԍMЋ ؍Mf ܍fM؉;MƉUȋEȉIv9tẸEE܋EEfEfEom}mm};EmmsEĄuẸ= Éڹ$8 Mȉڸqڱ _^MڸJڹ6 4SEPuuh EEEEfEfEm]u}vUL]u}MM Mċ}} M̋ ԍMЋ ؍Mf ܍fM؉;MƉUȋEȉIv9tẸEE܋EEfEfEEnm}mm};EmmsEĄuẸ=y Éڹ,8j Mȉڸڱ Mڸڹ6 SEPuuk@ _EEEEfEfEm]u}vU`]u}ËC@QE]EPB@Q}fff9fNfFEPƍEDXu#EP@D ^EE}EP@Dl}EPƃȋDhl}mmm}f9lE@Q}Ѐ}u=tE EE<%$+EЉEċEԉEfEfEZEPuuEPuu1}}7 <$EPuu}m}mu <$EPuu|} <$EPuu|}EPuum} <$mm <$|}EPuuEPuub|}hEPuuEPuu'}EEPuuEPuu <$}EЉEċEԉEfEfEmm}mm <$}muEЉEċEԉEfEfEEPuum}mm}EPuuWm}cmm <$v}Kmm <$薨}3mm <$}mm <$}ċEĉEEȉEfEfEm]u}U@k,f\fƅ fff9rPfNfFPƋDt'PƋDhk | k |f9wk,[ffff9rdfNfFPȋDt/PȋD_hk ۼ^k ۼ^f9wk,]tMHBDt+HBDg۽\۽\<,te,>, t,t,*EPuuEPuuEPuuEPuuŠ 6}EPuuEPuuEPuupPlhzPvrEPu| N}=m߽<<ۭh߽44ۭr߽,,EPu|m߽$$m߽ Q}EPuuEPuuEPuuEPuuEPuuEPuuEPuuEPuupPlhzPvrEPu|EPuuEPuu )}DPk,^PhщCk,Zti EPuuEPuuEPuuEPuuhPdP`\DP}g EPuuEPuuEPuuEPuuhPdP`\DP}mÐU $Dž(M MЋM$MfM(fM؋MMċMMfMfM̉ËEЉEԉCfEfC։+d},Eċ,Eȋ,BfE̋,fBc}ƅ00E4Ef8fEEЉEEԉEfEfEEEEEfEfEmm}E|EEfEfEmmvxEĉEЋEȉEfEfE؋EEċEEfEfE̋EЉEEԉEfEfEEEEEfEfEEEEEfEfEEEEEfEfEm-6mm-5}mm-5۽@ v(ۭ|mmmmmu?mm۽pۭ@-6ۭp۽dۭp۽Xmm۽Xmm۽Lmm۽pۭ@-6ۭXۭLۭXۭLmmۭp۽dۭXۭLۭp۽XۭdvۭX۽Xۭd۽dۭ@-5ۭXۭXm۽4ۭd-6ۭ4vOۭ|-5ۭXۭds*E|EEfEfEۭXۭd}t4@EDEfHfEE|EEfEfEEĉEЋEȉEfEfE؋EEEEfEfEmms mm}'ۭ@v mm} mm}ċEċ,Eȋ,BfŰ,fP `}@mmms ƅ0ƅ00tJEЉEEԉEfEfEEEEEfEfEmm}E|EEfEfEmmvxEĉEЋEȉEfEfE؋EEċEEfEfE̋EЉEEԉEfEfEEEEEfEfEEEEEfEfEEEEEfEfEm-6mm-5}mm-5۽@2mt 88uۭ@msmt(;$EĉEEȉEfEfE(;$u)ÉڹD8@4m $vUÉ}иmm,sE,EE0EfE4fEEEEEfEfEmm,vE,E܋E0EfE4fEEE܋EEfEfEE 4E$8fE(f<4(8,fk | k |frk,[ffff9rdfOfGPȋDt/PȋD=k ۼ^k ۼ^f9wk,]tMHBDt+H@D&=۽\۽\<,te,>, t,t,*EPuuEPuuEPuuEPuuŠ + }+EPuuEPuuEPuupPlhzPvrEPu| #}m߽<<ۭh߽44ۭr߽,,EPu|m߽$$m߽ *'}JEPuuEPuuEPuuEPuuEPuuEPuuEPuuEPuupPlhzPvrEPu|EPuuEPuu _}DPk,^Phщ臟 EPuuEPuuEPuuEPuuhPdP`\DPC}m vU]Év}EPuui}m]É|$ l$ <$,$É\$ËC9|$ l$ uԍ$؍D$f܍fD$cl$ <$,$\$ÍvU(]؉á$@ u 99)PPEPEP$H $PE܉EEEfEfEm]É0$$$($,É$ S$$Bþ9NF$PD*Kt$$ BD@h$D$BD<t1,3t>,=T$D$$ BD$$#$T$$ PTD$D$$B$T$$ BD")$$T$$ BD7$8$D$Nj$ PTD$\L$ҟJ$D$ $ BD$ $ PD3'$D9$P$$$$($,0Á$$$$$ $ L$RT$ËC}ƀ=ljT9]SD$ L$ ,tq~t6,CD$CT$|$SD$ _L$ ϝdCT$OCwD$8:|$SD$ fL$ ~CT$CM=GÉڹ98诔VD$ OL$ ڸ莔ڹt9x$ k LڸV+J$$$É $t$|$ $m $It_ $ItR $fyff9r?fKfC $qˋL ;Hu $qˋLI4uf9wňЋ$t$|$ U$B1ÅuXPtFPFFP~FhϏFP<F&荏xFPFߙ6j<:FkL{:.uF<+,,d=,Zw,,,tk,,t ,;FEÉڱ ('MڸFTF耄 ;Y[B %'B@ ËBP҃PBPB@ ËBp wy[UWPR]PAN<ւPF蘂BZ\BcP%lށP6蠁Pc P jlPB, ËB`YBPP躀PRP/]_Bf, Éڱ yxwڸaw6UwP@ <$B@ËPBvS}B@?ËPs*,B@PB@ËB~B@ËPub |~~PT>~@BG~P }Bv}PF}HBK}P获|BN|P{B|BPB*1|6BkLP;-Ð $$$Ɗ<>tNt%,, D$D$T$+D$$ F<qt,tg7‹F$ VD$ L$ {$t ,;3D$$ p\;_FvF@$ :F$ F@gvƄ$fV 9u Ƅ$VËDz$ 9VËDt!Ƅ$V@DF$ f$tF<G,t),i,t0,/,F$ :FD$$ 藬Éڱ qL$ڸp­pF@uËFi$ F@KËF?$ FD$ "L$ xD$$ fFD$ gL$ xD$$ ;D$ L$ x$t |;D$$ $ $$$ Ã\$t$|$ $$t  tltB$P r! u$‹ $A;$Ps$B@i$BUNj$B@ksua_$B 9u$BD2$BD5t$P@DƄt\$t$|$ U|Ɗ<]tEt!,-, tY4EEU܉vE쉅F<u‹F ; FDrF@C F.F@r EEvF U9uEFUD3FUDtEVE@DE}t F< ,, ,,-,;,, ,+,g,,,,,8,Y, g,5 ,, ",Cd,,,,%, o," @ ^ ,  , , ,, , ,m ,  H F1)‰Z FËF@É6 FËF@!É   FREF@DU)ЋUF F"H F<u9FËF@9uDži DžZ F<u@Fe }F@W muDž" Dž F<uJFPE.]FE.E}uDž Dž F<uVFPrF\W}uDžt Dže F<u9FËF@8uDž4 Dž% F< FËF@8uDžDžEPF@NËF@ANjF5ى|FPIF3%NF(;F@ËF}6FFܪF<u,F~DžDžvFsDžTDžEFËF@ؙF@fF@rËFf aEPFFMUfFf=uf-ut(fHtfHE䉅E艅E쉅uF@ËFDLF@ËFD#F@ËFCF@kËF_@F@BËF6FËF@ ؉F؉lFЉUFËF@ É1F%FPFFJE쉅\Éڱ ȬdMڸd舡dF}m-;rm}ERj<EPuu􍅸 <|uF}m-;r3}ٽfMmm߽٭j,<EPuu􍅸 <t(F F<uFo?F <$>F5ËF@(㉝FËF@뉝wF<uL}ٽfMF@rm߽٭Fg>$F@ËF>>FEPEPEPFMUEtEt\j<<FIL<rBE쉅4FËF@)ÉFBF蝣F<uFQx%F}ER%F ËF@1ÉvF<uFh%SFe}EE%0FkLP`<p|ÉUdPu&EE}m#ʀZ#$`.EEUEEEEfEfE#PcB@D}"B,}􋅨PBjc""P}䋕B@}؋P ~B@}`E̡dEfhfEmv'm}f}`E̡dEfhfEf= 4HtHtjHHHY EPuuEPuu؋BJZ Lhm}!EPuuEPuu؋BJZ T߉щTj}E!EPuuEPuuEPuűBpJZ Tf} EPuuEPuuEPuűBJZ T|} EPuuEPuuEPuűBJZ Tt|}= EPuuEPuuEPuűBhJZ Tffn} qPx<lP7ËB@$ƋP ~B@}}EPuu䋕B PPH tBm}PËPB~ƋP ~PB}}EPuu䋅P PPA tB#}PPBtB@z}0E4Ef8fE싅PB tPB P! <$EPuu䋕BJQ躄}}}qY}^z}KP}䋅PBr}؋P ~PBO}-6m-6m}̋P ~B@ }08P5450P55a6}B ~B@EPuuEPuuEPuuEPuuBQN T;}B ~B@+}08P5450P55}5}P ~B@ 6B <$B@ <$EPuuBQN Tǒ}EfvP 9uEPNjD&}=PNjDhtEP@D}f}tBp BPBHPXC/}GPr PRBHPXC0}BPBHPXCx2}BPBHPXC15}Pxsl!hgyt t-tqBPHg}BPH}tPRH菎}PBPHy}*BPHe}B荓}B}~}B@ <$}B2}B@<i,t t0tFXB1)‰UE}1Bl}BEEk}BEEdl}B@kËPYZH}BEEk}|BEtEk}YB+ }<BzF}BUG}B@ËPH}B@ <$BTCW}B@ <$B \}hB@ <$Bb}4B@n <$Bg}P$.B <$&3}B <$3}B <$3}uB <$a4}RP <$z4}/Bj <$4} BG <$85}B$ <$5}B <$>6}B <$K6}B <$`6}]B}AB| <$U,}BY <$B@B <$}B}m <$EPuuQ+}B}B}tB <$B@ <$B@ <$B@ j <$e} BG <$}B$ <$}B <$Fe}B <$B@ <$B@ <$}RB <$,}/Bj <$',} BG <$)}B$ <$q}B <$>;}B}P <$'}dB <$B@ <$B@q <$rE}BN}mr mv<mw<EPuu䋅PB <$z}B}mu<g[m}LB}mr mv<EPuu}B3 <$PB <$-F}B <$B@ <$B@ <$@E}mB <$}JB <$}'Pb <$5}P? <$} P <$} P <$U} P}| B <$ <$ <$ <$p}A B| <$} } BL}EEEEfEfE谄Éڱ IEPuu EڸkH跅H 8H@}t B <$,K}Q B <$))}. Pi} PO <$`'} P,}Bm} P <$PB <$} P}msNEPuu䍅 P=W& EPuu!} B= <$+} B <$'} B <$.} B <$)(}v B}B@m}E B <$PBi <$vB} BF <$&} B# <$'} B}䋕B@m <$EPuu#"}| B <$X%}Y B <$i&}6 Bq <$%} BN <$G}B+ <$B@ <$}B <$B@ <$}|B <$PB <$y}BB} <$B@f <$o}BC <$B@, <$6}B <$B@ <$7}B <$B@ <$e7}ZB <$B@~ <$[=} B[ <$B@D <$}B! <$B@ <$}B <$B@ <$9}rB}PBm}AB|}B@hm}BK <$B@4 <$}B <$B@ <$K}B <$B@ <$}bB <$B@ <$}(Bc <$B@L <$}B) <$B@ <$PB <$}B <$B@ <$B@ <$P/UI}:Bu <$B@^ <$B@G <$}P$ <$PB <$B@ <$}P <$PB <$B@ <$^}GB <$PBk <$PBT <$)}P1 <$PB <$B@ <$}B <$B@ <$B@ <$}TB <$B@x <$B@a <$=}B> <$B@' <$B@ <$>}B}EPuuEPuu䍅 PD=+N B@m}B@nmm} PrUt'uL覩‹Az}胩‹AEE}jX=P耸d=Bk L"EM'&o}r} wËkڸyBPEMB'BEMBB@H>fP 9u+PƋTEuM.BJB֋Dt,P@TE0MAfrKPʀ7$2PJPEIpMABHPEqMSABHPE[sM AhPJPEwuM@YBHPE`wM@&PEUE"mM@BEUEhMQ@ <$ <$EOM@PE)PEU E[M> PEUEPMN> PEnUE3[M> PE'PkLڸd'c'Évv 88ÐUX]u}E։ME EEÈڍE]h@Du5Et E*Ej}ЋEt%E*uh@D蒫}mv E'}}EPuuСhP8E'}EPuuEPuuEPuuhH8E}Ĉ‰w'h@Ci JKCkL3M WXLر)( JkLW EWDL8CHfK ر)(=fC SC DJƉH?yLKyZJkDL ViKCJƉ({Vz;KnffOfGSNjDt>ff=t&IƉ,6V5J)SNjDf|IƉ)U J C^IƉP?OK J O0IkK U~ ?Jr C@ tZHƉ(OUN JB C@ +HƉX?J I CHƉ=T I CQHƉ$?BJ zI C@C@t4HƉ$?J{ BƉ$?/DgCC@ BÉڹP?Cr3Cf$t$|$ U(]؉u܉}EϋM ]EtEFEfFfEEDu0upfufpPfЉM}ETEEBfEfBm]؋u܋}vUD]u}ĉÈUȰSTT<rދFLVPBF@F@ `EءdEfhfEpE̡tEfxfEԋE`E dfEfhEȄtEpE tfEfx ԍp؍tf܍fxEȄtt VPBh@7;}Eأ`EܣdfEfhẸpEУtfEfxN؋\\<rm]u} $$$$$ī$$)Ƅ$Ƅ$̻$DŽ$ܻ;$ܻ|)$ܻv$ܻ$ܻD;$ܻDŽ$ػ?$?$f?f$$DŽ$ܻ;$ܻ$ܻ$ܻ$ܻD$DŽ$Ļ;$Ļ$Ļ$Ļ$ĻD$8$$Ļ$ܻk l۬$sO$ܻ$Ի$Ļ$л$8$$л$Ի蹝k lۼ$;$ĻP;$ܻ۬$u:Ƅ$=Éڸ??">-?۬$u Ƅ$̻$Ի$лT$Ի;$лf$fDŽ$Ȼf;$Ȼrqf$Ȼf$Ȼ$$$Ȼ‹$Ի誜k $$Ȼk tt tt fDfD f;$Ȼwf$f$fDŽ$Ȼf$f;$Ȼf$Ȼf$Ȼ$8$$Ȼ‹$Ի k $$$Ȼ‹$лk TT7TT7fDfD7f$f;$Ȼvf$fDŽ$Ȼf;$Ȼrqf$Ȼf$Ȼ$$$Ȼ‹$лZk $$Ȼk t tt tfT fTf;$Ȼw$ػ$л$ػD$$$л$л‰k lۼ$$$$л$л‰訚k |$$DŽ$Ļ$;$Ļ$Ļv$Ļ$$$Ļ$л‰:k $8$$Ļ$лk ۬$l|3$;$Ļ$$DŽ$ܻ$;$ܻ$ܻ$ܻ$ܻ;$лg$$$л$ܻ‰zk T$T$fDf$$$$л$ܻ‰-k |$$DŽ$Ļ$;$Ļ$Ļ$Ļ$$$Ļ$ܻ‰˜k $0$$Ļ$л蜘k ۬$lۼ$$0$$Ļ$ܻbk ۬$l|;$;$ĻJ$;$ܻj$̻?$ػD$лD$Ի$DŽ$ܻ;$ܻ|s$ܻ$ܻ$$$л$ܻ覗k \$8$$Ի$ܻ|k DJ;$ܻ$ػ$ػ?ī$$x$$$$ÉUX]u}UMU UUU}ĉ¹9IAEk D3EЋD3EfD3fEmvYE0k Ek ll>m}E0k E8k llm}mmmm}9sEĉEEȉEfEfEm]u} vUpƉӉEfEfE EfffDžff;DfvfLE܋AEfAfELEЋAEfAfEƅk D ĿD fȿfD fDž}fLk l)}Kk -?lɋk |Lk l)}mmr mmvk lrEPuuf}mm-пk k -All:k |k -@lk @D DD fHfD ƅZmm-v<k k -Al8l k |ƅ9~ƅ V3lj?G59?59x?4bWk D Pt t ;.?4Wmm <$ I;3jmtyj?@艭s1lj?3$U8 ?3'8?Q3Wk LQtt 9?3~Wmm <$ 9V+2Jff;UtfƉEEE ]lat cc(ƅ3h@ЀEh@辀Eh@謀Eh@蚀EhEB8hEBɋElUEk |E;EE;EE8E8|8EE;UMvEM]k uEk llɋE(E8M]k uEk llɋE(E8MEk ]uk l3lɋ|(|8;UvUEZUEZUEYEPREpE0Q-ɋE8UEYUBPEpE0!-ɋE8UEY|BP|p|0-ɋ|8UEaYptx,vU\]u}UMfUfU]U UȋUU-|E8ԍU؍UBf܍UfB-UīEUE UEEE;]MEEċMTEBEfBfEE8MUEvk TRttʵ-}EċULmm9P{E(mEUk |MċETEEBfEfB;]QEEEE;EMEUEk |EEEE;E|gMАEЋ]EEk E؋uEЉEk E܋E8MUЋEuk lElɋElUEk |E;EE;EeE8EE;]|4MEEuk UMk l l0ɋE(E8;]ЋUEVEPREpE0=-ɋE8UEV]u}UtfˋEE }8P5450@ߊ <$}@蓊ffDžE@PuEEUk |#B>Uk |tjB5<rX,tt-NB=EEUk |#BH>Uk |;5t3= mm}mm}}}}fMmm}mu;5= m <$EPuuEPuuZ}HEEm <$EPuuEPuu%m} mm};5[}}fMmmm}mummɉuE}񋕤]m}A‰3mm}ċEĉEEȉEfEfE;5 B43<rd,tt.ZUk l}MB ;.Mk DPttBh;uB2<rc,tt.YUk l}MB:-Mk TRttB:;5m􋝐 U BR5B5B}mÍvUáu1~19tjjA0BBB5|D=1<tjjAG0BBBD f2ÐUËrft5E fd0EyU0Tjv/BCACU -EmuEEEEfEfE-|EmuEEEEfEfEv-|Emu|EEEEfEfEJ-EmuEEEEfEfEEPuuEPu u}mU‰UE-|EvEEEEfEfECUE-|EuEEE EfEfE|EEEEfEfEm vU‰UE-|Eum-E}CUE-EuEEE EfEfE|EEEEfEfEm vU mms|EEEEfEfEEEEEfEfEmU‰UE-|ErEE行EEfEfE%m-E <$UE <$3}EPuuEPu u]}mvU ]É]E-|Er|EE血EEfEfE2m-E <$]E-E <$褆m}-Emt0EPuu-Em <$mm}EEEEfEfEm]UME-|EvEE行EEfEfE,EPuuUE <$AME <$h}EPuuEPu u}mU$]܉uÉ։]E-|Ev|EE血EEfEfEQHJģuEmm-E]E}EPuu3}-Emt2EPuu-Em <$mm}EEEEfEfEm]܋uU4]̉uЉ}ԉU؉ˋ|EUEUfEfUEP5E5|E]EmɋE)؉EE <$薋}ܛ}9|/OGEPu u <$ًU؉Hm}9ԋEEEEfEfEm]̋uЋ} U4]̉uЉ}ԉE؉ӉΉuEm}ܛ}EP5E5|E)EE <$E؉EEsEE行EEfEfEk]E <$}E <$XE؉EEv|EE血EEfEfE"EPuuڋEY-E}EPuuEPu u;}m]̋uЋ}U4]̉uЉ}ԉE؉ӉΉuEm}ܛ}EP5E5|E)EE <$͉E؉EEr-]E <$}E <$\E؉EEv|EE血EEfEfEGU؉膠}܉+U؉)um}܉ډdm}EPuu}-Emt5EPuu-Em <$ڋEmm}EEEEfEfEm]̋uЋ}UME-|EvEE行EEfEfE9||EE血EEfEfEa-|Emu|EE血EEfEfE5EPuuME-E <$)ʉUE <$}EPuuEPu u}mU$]܉uÉ։]E-|Ew9~|EE血EEfEfEQډ讞]Em)؉EEm-E}EPuu}-Emt2EPuu-Em <$Qmm}EEEEfEfEm]܋uvU‰UE-|EvEE行EEfEfE'UE-E <$EPuu赛}EPuuEPu us}mU,]ԉÉ]E-|Ev|EE血EEfEfEFm <$}EPuu]E <$~m}܉dm}-Emt0EPuu-Em <$mm}EEEEfEfEm]U@]uĉ}ȉÉ]E-|Ev|EE血EEfEfE}޿9OGE(Pu$u }E <$}}؉}m}܉؉EEmɃ <$諾m}܉}EmɃ <$)EE؃ <$q}}̉)!mmm}9cm <$Gm}-Emt0E(Pu$u -Em <$\mm}EEEEfEfEm]uċ}$vU$]܉uÉ]E-|Ev}B}9|4NFE(Pu$u EPuu <$.m}9΋EEEEfEfEm]܋u$U‰UE-|EvEE行EEfEfE,E(Pu$u EPuu <$}EPuuEPu u }m$U<]ĉuȉÉ։؅|9~|EE血EEfEfE}H9|!JvBUEmm m}9}܉)H9|%JvBUEmm m}9}ЉH9|JBUEmm}9ډ7mmm <$軻}-Emt=E(Pu$u EPuu-Em <$mm}EEEEfEfEm]ċu$U$]܉u}É։؅}}P9~}C}9|5OGEPuuEPu u <$ m}9̋EEEEfEfEm]܋u}UME-|Ev}19~}$E(Pu$u EPuu }EPuuEPu u}m$U4]̉uЉ}ԉE؉ӉΉuEm}ܛ}܋E9| );E}|EE血EEfEfEhJ,}܋U)ډ)m)@EE}܋UJm+E@EE <$聹}-Emt5EPuu-Em <$ڋEmm}EEEEfEfEm]̋uЋ}U(]؉u܉}M];M}}MM)9}};}Ƌ}9|-OGEPuu <$ًUtm}9ԋEEEEfEfEm]؋u܋}U,]ԉu؉MEm}ܛ]܉9}}-)9}}uVuuQщ}EPuuEPu uI}m]ԋuU$]܉uÉ]E-|ErEE行EEfEfE~|EE血EEfEfE9|2NFEPuuuE <$ovuEm}9mm-E}m-E}EPuuEPu u_}m]܋uvU ]É]E-|Er|EE血EEfEfE<EPuu]E <$um-E]E}-Emt0EPuu-Em <$kmm}EEEEfEfEm]U,]ԉÉ]E-Ev|EE血EEfEfE=]E <$m <$t}m <$Am}-Emt0EPuu-Em <$.mm}EEEEfEfEm]vU$]܉uÉ؃}EE行EEfEfEv|EE血EEfEfE9|1NvFuE <$m <$sm}9m <$Am-E}EPuuEPu u}m]܋uUm m,m}m m,rm <$]-pE}#EPuu@-pE-E}EPuuEPu uN}m0Um m,m <$m-E}-EmtDE4Pu0u,E(Pu$u EPuu-Em <$mm}EEEEfEfEm0vU m uԍE؍Ef܍fEzm uލEEffER-4Cm r$m -@Cmm}m -@Cmm}m$Um m,m8sEE行EEfEfEm m,m8v|EE血EEfEfEm,m8m }m,m8r>EPuu-Em <$p-E-pE-E}mm}EEEEfEfEm0U0-|Em,wEE行EEfEfEm,mɃ <$ Y}mm m,m <$@$-E}m -EɃ <$Ǖ}m mm,m <$#mm}m-E}EPuuEPu u}m0U$-|Em,w|EE血EEfEfEcm m,m,mm -Em-E <$}m-`m,Ƀ <$Wm}-EmtDE4Pu0u,E(Pu$u EPuu-Em <$8mm}EEEEfEfEm0UEPu uC]Kmm}mmm <$}m0U$m m,m}m-Ds}6EPuu-}m-E}mmmm}-EmtDE4Pu0u,E(Pu$u EPuu-Em <$mm}܋E܉EEEfEfEm0U m uލEEffEGm uԍE؍Ef܍fEm m mm}m$UHm}-DmvN-|EmvEEСEEfEfE|EEСEEfEfElm-\DmɃ <$}}-Hm}-Hmm-H-Hm-|Hm-pHm-dHm-XHm-LHm-@H}m-4H-(Hm-Hm-Hm-Hm-Gm-Gmm}G-Dm-Dm-hDm-@Cm-Emm}-|Emrm-E}ЋEЉEEԉEfEfEm U -mɃ <$-E-E}m U EPu u-E}m UmuԍE؍Ef܍fEE4Pu0u,7t }E4Pu0u,t}om m,m}-Dmv}H-Dms}1EPuu-E <$EPu u躣}m0U$muԍE؍Ef܍fEm m,m}m-Ds|EEܡEEfEfE5mm-E <$m-m-E}-EmtDE4Pu0u,E(Pu$u EPuu-Em <$8mm}܋E܉EEEfEfEm0U E(Pu$u ~mm}m$U$m,},m m,m <$j}m,m m <$Mm-E}EPuuEPu u}m0U$m,},m m,m <$ <$ <$ <$}m m,m <$ <$ <$ <$mm}-EmtDE4Pu0u,E(Pu$u EPuu-Em <$mm}EEEEfEfEm0vUImm mmmm}EPuuxk -EۨI}k k m m۪>I-pEk m m۪>Iۨ>I}-EmvEPuu-E}+- Emsm <$w- E}EPuuXbm-m8mhm, <$m m\m <$EPu u} mPmhuxmmmhm,}mm-E <$#m}mmDm <$}mm\m <$m} mDm\uxm,mm\m}mm-E <$&#m,}mmPm <$Z}mmhm <$?m}-ލmhu:-ԍmPu*-ލm\u-ԍmDu }Q-ލmh-ލm\@EP5`}m0U0-|Em,s|EE血EEfEfEmm -@C <$}mm <$-@Cm <$um}E4Pu0u,-@Cm -@C <$Dm}-@Cm <$*}-@Cm <$m}mm m, <$mm -@C <$mm}-EmtDE4Pu0u,E(Pu$u EPuu-Em <$mm}EEEEfEfEm0vUE(Pu$u -@Cm <$-@Cm <$ }mmmm}m$U-|Em,wEE行EEfEfE!EPuum,m Ƀ <$}EPuuEPu u]}m0U$-|Em,s|EE血EEfEfEtE(Pu$u EPuu3}E4Pu0u,-Em <$m}EPuusm,m <$'m}-EmtDE4Pu0u,E(Pu$u EPuu-Em <$mm}EEEEfEfEm0vU E(Pu$u m-@CɃ <$虘m-@C}m$Um,m8wEE行EEfEfE&EPuum,m8m <$}EPuuEPu u\}m<U$m,m8s|EE血EEfEfEvm,m8m <$-Em <$T}m,m8m <$C&m}EPuu <$ &m m}-EmtOE@PuRNrfP<f;‰;QYBNIfFr;=1fPr):u7'5 v \$ËC @CDuC S BCD輆<$$\$ ÍvULDž;j @DѲuǻ9|0KC <$@D詅9ѻKvCjh@T|JkRrGƋ@D‰΃ <$BD軄;X9FNvFDž;k D ED EfD fE5EPuu苅BD@@Dm <$@D褃@D誃mm <$BDFt*BDEms+EPuu苅BD܂t*@Dۂmv+EPuu苕@Dr;[k z 9ZJ ؅ Dž;@BD]E}؃EPuu苅BDz؃؃@Dy}؃@DL}؃]EmmmHEE <$BDŀ؃@Dπ}؃EPuu <$@DXN <$@Dڃ/ <$BDڃ;K AD@Du K ADU$Ku Kb7"*‰ыtADž;Hk4K&7[6Ƌ@9KC;qHX2w`K胧Ằ2U'2FhK2-xK9Ằ2 1J:tJK^2ະJẰ<21@K2 6uK1\.1M(>Kf3ff9fKfC@K1hPËToẰZ1KA1hP(ËL5K1|hP,ËL5Y+0Jf9)'2$$ÐU,]ԉu؉}܉EUME E]E]9u&NFEDtdUD@<rH,tt$>UDEEEk |(EDxEk | KE\E<r%ttCaECaEEu[E =t=~-ljLo/M4.[d9uE]ԋu؋}UJ蝈uLx=u =tf,ÉڹLL.Jڸs.ڹ`L].-Dž=~xjhLxLăIE8Dž;|;DUD;͡hP 9KvCh@(D;~h@(LDž;|ivh@,D9uE"h@(DjMhPSvMh@,TvJh@(TuMMh@,DLh@(DDNq;hphp hH0h4‰tUh@ h@h@uhPKP.h@hP īЋ2^h@ `djJ`hp 9KCh@,Dh@(D~vUh@,DTh@(DDtOUh@,DTh@(DD8Uh@,DTh@(DD9]Dž;|^h@hpHKlq^h@hSPhCBhS P hC$B$hS(P(hS,P,hS0P0hS4P4hS8P8hS xO~=edٸ‰J 10P55щOxPOщk‰NO"  feO H /.O   O I O  po VUO 8 O fff9fKfCHEEmm}EPuu|lEPEPEPEPEPEPxtp]EPuuuG .- EPuu􋍀 >ua EPuu苍 t  ji POEPuu܋ zt  EPuuЋ %tH   EPuuċ s P 76EPuu as  f9pfX ff9r`fNfFp<uƃtAp<uƃt-|lpPƋDxt}f9w`dhU $(,48 9 M 2H <$g1(RMG <$f‰:0RVG <$2fU=2F=  k jMS > =F <$]e8RgU]u}E׋GtPG~Hfwff9r;fKfCWËDP5RP4Rp(p,WˋTE*f9wɋ]u}ÉUˋu E%$7E <$d6譿 蓿D <$cQ <;غD <$_c Ծ0=2#D <$b| gfC <$b   NC <$*bMĽ 讽l蟽U]u}E׋GtSG~Kfwff9r>fKfCWËDp,OӋTR4RWˋTH(Ef9wƋ]u}ÍvUӉ΋E EDR{nm <$`艼 poٸ‰U <;񺰻n% N6mcܻȻTR8读蕻pR|Nmf!|RH9Nol|vU4׉]Eu EuER,LjhRktEk5  Mw Թ? <$]莹(Ru3ft> <$虓}}EPuu苍f]0RpظmuԍE؍Ef܍fE8EPuu[t}=mm}EPuu苍 \=. hE PuuH=2m3 0觷 葷Mz ed< <$[8RU]u}EUEEUBtoUB~dEfXff9rTfNfFEPƋ|G; <$G5PG4Pw0uEPƋDEEf9w]u}vU u ]4; <$Z3誵 萵N聵t: <$躏}}EPuuY! -0ms-R-0}:mm}EPuu X 胴 nm+^=29 <$lX  ׳ 訳 蒳P胳U]u}EMEEEPtjUB~_EfXff9rOfNfFEPƋ|G`8 <$w0uEPƋDG4}f9w]u}U ։ϊ] EuERLjhRktmEº-  M_ֱ 7 <$U~Po=2, 6 ! M  ;6 <$U:豰8R!蘰j艰[zU]u}E׋GtJG~Bfwff9r5fKfCWËDP5RP4RWˋTE4f9wϋ]u}UÉցue5 <$ٍS蒯 }|:ml=2tc4 <$ٍS$ Ð\$t$|$ $׋GtAG~9fwff9r,fKfCWËDWˋTH4$f9w؋\$t$|$ U։ˋEDR_m <$pR  񺰻#ڭ ĭٺ训 蘭V艭N^Fe2QR8 gpRfRZѬ¬N]IvU$Ɖ׉ˋEEEE ES-. <$ ZP}Sd۫.- Sɉۅ <$ щO‰ 肫,SeGPw7 щO‰$8S‰#ڪHSF轪裪\S芪U?R$Ck3XU Ӊ΋EEE EDRU[m <$Mc JIٸ‰x/ 񸰻‰D ҨNZщA螨k芨hSm‰OpR2#fSNYU(fÉEEEE EÅ6S 9S S T kT NŦT 1訦T 苦]|fff9=fKfC˺O 65ËTBPr2 SJv ӥĥËDPRp0 I| cb SËDPRp0 qI  ËDPRp0 I#蚤 耤>qËDPRp0 H) ËDPRp0 HA踣 螣\菣ËDPRp0 GG8f9 U0ϋUfff9$fKfCËTËD(*j TӍ5(TPTËTBPr2 ~F\TËTBPr2 ?F91ËTËD(*j TӍ4hTPTËTBPr2 qETËDPRp0 ,E&m0f9U,]ԉu؉}܉U}UUUUUUU UUURE;U|(ME[u\[4u;UEEEEEE‰EUӬUɬUE辬UE賬UE訬UE蝬UE蒬²+UEEE;E|^ME59|?OGE EB:k ԍT؍Tf܍fT9ËE;E]ԋu؋}UXÉE(E$E EEEEE EJ4P5ٍ5ffrff95fKvfCPËD@4fGPËDvNjDPRp0P4"NjTBPr2jT蓮h46"NjDPRp0jT*3!NjTBPr2jT3d!NjDPRp0jTX-3 NjTBPr2jT2 t#NjTBPr2u}}EPuujTb72 f9PTH1ffff9fNvfFfffDžff;roff n5k TRtt F5‰)ff;wf9\- <$PTJ0PT0 P55PTΩ0QPU蝩R0 P Uf0 kPU// 4P U/ P,Uv/ Ps2s=(u =)Ep4pV%#p^{=t?HÉڹ|V9rpڸ#ror=(pGppHp貥Qr=E;}|KMEp (ru+EPETp rpq;}p£qV#t:EPE PE$PE(PE,PEHEPfEPEHEPfwEEPEH EPEÄ7QW#E yV"t聪E㺬VtE㺴V评uLE@PE@ PhhhhuuhuEHEPf8KE㺼VRtEVAuLE@PE@ PhhhhuuhuEHEPf4EVuLE@PE@ PhhhhuuhuEHEPfKEV臃uIE@PE@ PhhhhuuhuEHEPfm&EPVV!t/55uuP ÄW t1P55u ‰M Ww u-,Wi u=Ju=Lu =K8W< i=t)ÉڹHW^n3RnE@PE@PhuEH EPfyE,PEH,WtEP555Ep,Pu ‰ WVtEffQhW+t'PPEH EPE@0XxWt'PPEH EPE@0ÞW[=t){ÉڹWll踩lhuEH EPfE,PEH2,W<tEP555Ep,Pu ‰K WtEffhWt'PPEH EPE@0xWt'PPEH EPE@0VWT=t)ÉڹWvkKjkE$PE(PP55PhuEHEPE =P555u ‰ޭWtEP Eff~!VEP MftnËE@@tE@@nPEPEPEPEPE PE$PE(PE,PMAEPEPE PE$PE(PE,PEHEP vU ]u}EUME EEEEBǻ9KvCU@DU;B uEU@DU;BuEudU@D;uOEBDMRTBF‹M@DU@D@4vu9T]u}v$ÀrEt tt(7عXq$عXqعXp$ÍvUֈˋUU }PPTsx(*8PT:xi<tt<(- Xɋۅ8mB‰ۅ(- Xɋۅ8.EPuu@:ɋ(- X8U$fu}UU UP?ٍ,$PƋDnPvBum88jT w8U48$P Sft}J T Bf$fBًf$0}EEEEfEfEEEEEfEfEGmm-`۽ۭm -۽XۭX-(`۽Lmm-`ۭLۭۭwG Pf$fBEEEEfEfEmۭX ۭ(ۭmm۽dۭ4ۭmm۽pۭ4ۭۭpۭ(ۭۭd۽|ۭdۭp-(`۽pۭpvۭ|۽|ۭp۽pEĉEEȉEfEfEEЉEċEԉEfEfEۭ|ۭp-`mv@ۭmۭpۭ|v ۭmۭpۭ|rDۭۭrۭm}ۭm}m-p}ۭpۭ|}mۭ۽@mۭ@ۭLwۭ@mۭLvq`P\Xۭۭ <$%}?ۭۭrۭm}ۭm}m-p}mۭXwmۭ۽@2`P\XEPuu$ۭ۽@ u>HPD@SfA}J T@DBfHfBًf+}mmۭۭ@rE苅 Ef$fEE܋ Ef$fE䋅(4,8f0fDD>DfD>fDf;Bh ‰mЋ(ዅ8t_0PRp0BPp0ff‰-@(wEPO}}ffDžf;ffk lm}苅8t"k lm}Nk k ll1k lm}f;Qmumm}ffDžf;ffk lk |k 0k mllk |k 0k D>DD>DfD>fDf;7uWm#PZщ/LO|8UPfE,](E$E EEEEE EīE HīEGīEGīEGZZ2NuEEfff9r@fJfB‹t‹D8>x~f@fFuk |f9wċSEPPPEPEPEPEPPff5ӡīEmӡīEYӡīEEīE.(U,]ԉu؉}܉EUȋUUEuAME;MMEEEDEEk |;MEHEEE;EMEEEE@9U|nJvBEMLk E0E8EDk ll v0EDEEE0MDDEMED9UE;ErE;Eu"E~EEBEEB]ԋu؋}vUtx|fӉE,E(E$E EEEEE EEPDīE8D8ffDžf;rGffLtFAfFfAf;wDžuRÉڸ\TE$Pu u щEؾ‰gTڸ\MTEDPu@u< щؾ‰Tڸ\Skؾ‰XP%SDQÉڸ]S#ؾ‰QXڸ ]wSؾ‰Xڸ8]BSؾ‰WsR QÉڸP]Rqؾ‰WV+RJPÉڸp]R)Q9KvCvPƉى *W \k DPtt R]Qok TRtt 荸Q*P9OP@U8@LELPEHDEDD>BfD>fB<k @|D2GD2fGfD2 D9 Dž\;\|E\v\\k ލDDffD;\ċ``$Tf8B}E苕U싅PfUfPEEBfEfBDžtDžlDžpDžhDž(Dž|;|% ||ܾDžx;xxx8Dž;98Dž\;\@\\\;-(`-`鋅X\k |X\k D0\k ll ɋX\k |@\LX\k l)X\k |7X\k @\tD FD fFfD X0\k L\|/lr2X0\k P\L)lL\tQP\LL\|/).X\k |HBH|&EPuu苍@X8‰T\LX\k D2D2AfD2fA;\`$Tf8}ܡ|1EPuuEPuu苍@X8‰,04$(`߹4 mmP|l7IÉڸ]$K EPuu܍ щñؾ‰J\ 1JP 8Dž\;\|M\\@\LX\k D2D2AfD2fA;\E܉EEEfEfEB LA Lt(m|lGÉڸ]IZ EPuu܍ щ肰ؾ‰I H 8Dž\;\|Q\\<\k X0\k D>DD>DfD>fD;\E܋UPfU䋅fPpmmዅ( <$"}e}mm/|lFÉڸ]H EPuu܍ щ:ؾ‰\H G 8Dž\;\|L\\@\LX\k D2D2AfD2fA;\E܉EEEfEfEB LA Lh|l|lyEÉڸ]fG EPuu܍ щؾ‰'G sF }mj^輜(^x蒜4^|h<^(<&߿;;x-s =3-`-v ``f`f--`}8Dž\;\K\\ \Dܾ}=mmvWD0\k -m-L^-Ƀ <$T+lɋD\k |"-mD0\k mm-L^-Ƀ <$*lɋD\k |mmvND\k mm---`lɋD\k |_-msOD\k m----`lD\k |D\k P\tL\D(.l v;P\\L\T*+ዅD\k |;\~@(̴t/D<@8$(8Dž\;\|-\v\ \D;\܋;|ƅdEEBfEfBm苅(ዅ 8( PR p 0PRp08оEԾEfؾfEEPEPEPEPEPPPEPEPEPPU(8P_8EPuu щ:‰Y87h_-8v7ÿ9OG ȍ7R_79Mk DPtt \769cL5Éڹ_=76#5ÉڹP_7EPuu 距ڸ6T)6H4Éڹ_6+6ÿ9OG4Ɖ Mc6_M6Mk TRtt 6Y5x9h3Éڸ_5OPRp0 щfؾ‰5ڸ_n5ؾ‰:473Éڸ_$5ڸ9ڹ_4lM܉ڸ9Xڹ_4BM؉ڸw9.4"2Ëk3Xڸ43EsīЍEsīEsīEwsīE_s(2 ljss4@ 8@ 4o ENDvMODEL.Specifies a model with parameters to maximize:; [BEGIN END] {executed before each iteration}v+ {the likelihood}v; [BEGIN END] {executed after each likelihood}vRUN [THEN END]v, FULL {all params free}> REDUCE p1=p2 ... {constrain parameter p1 to p2, etc}F REDUCE p3=c ... {constrain parameter p3 to constant c, etc}> WITH p1, p2 ... {includes only p1, p2 ... in model}C WITH p1 (p2, p3) p4 {creates 4 models including parameters:}vF {p1 p2 p3 p4, p1 p2 p4, p1 p3 p4, p1 p4}+With optional THEN END clause:vFRUN THEN END {statements executed for each model}H FULL THEN END {statements executed after this model}' REDUCE p1=c ... THEN ENDvDATAJSpecifies how to read fields in the INFILE and does simple transformations v1 FIELD 10 v2 FIELD 4 KEEPIF v2 < 100 DROPIF v2 = 0 ... v3 FIELD 5 = v3 + 0.0001v v4 = v1^2 + v2With optional LINE clauseC v1 FIELD 1 LINE 2 {takes v1 from 2nd line of each observation}vIF8The IF statement conditionally executes other statementsIF bexpr1 THEN ENDv1IF bexpr1 THEN ELSE ENDIF bexpr1 THENELSEIF bexpr2 THEN ......vELSEBEGINBEGIN END STATEMENTSREPEAT!REPEAT UNTIL MThe are repeatedly executed until the boolean expression evaluates to TRUEWHILE!WHILE DO ENDBWhile the boolean expression is true, the arerepeatedly exectuedvFORv9FOR loops through statements a specified number of times.0FOR = TO DO END: (REAL or INTEGER) incriments from to =FOR = TO STEP DO END9 (REAL or INTEGER) incriments with step size >FOR = TO STEPS DO ENDE (REAL only) incriments from to in steps1FOR = [expr1, expr2, ...] DO END0 (any type) traverses through the expr listPFORBPFOR is a parallelized FOR statement. It loops through statements:like FOR, but each iteration is run as a separate process.PBEGIN5PBEGIN is a parallelized BEGIN...END block statement.9Each statement in the block is run as a separate process.PMODEL@PMODEL is a parallelized MODEL statement. Each model in the RUN"part is run as a separate process. PROCEDUREFA procedure performs a specific action, based on a set of zero or more?parameters. E.g. HALT or WRITELN("The answer is", answer, ".")v9Type mle -h PROCEDURES for a list of intrinsic proceduresUser defined proceduresv!PROCEDURE END5PROCEDURE (: . . .) END9PROCEDURE (VAR : . . .) END? is the formal name of the argument within the procedurev( is a type (INTEGER, REAL, etc.)O VAR passes the variable to the procedure so it can be modified for the callerv ASSIGNMENTIAssignment statements define variables and change values of the varaibles$ = {e.g. x = 23 + y^2}@ : {Defines as a specific type e.g. x:BOOLEAN}H : = {forces to a particular type e.g. x:real = 2}M :[c1 TO c2, ...] {defines an array. E.g. x:real[1 TO 4, 1 TO 10]}G :[c1 TO c2, ...] = {defines and initializes an array}vFUNCTION,function/expressions that return a value areINCLUDEv)Includes other files into the source code*INCLUDE # is a file nameBREAK7BREAK exits the current FOR, REPEAT, or WHILE statementvCONTINUEDCONTINUE skips to the next iteration of the the current FOR, REPEAT,or WHILE statementCURVE8CURVE draws a 2d or 3d curve to the plot file (see PLOT):CURVE [KEY | WITH | AXES . . .]B = TO | (, , [])K [ BY = TO | BY (, , ) ]v5 [ . . .] [ . . .] where:v. is a key title used for this curveO is a gnuplot WITH string (and any options). e.g. WITH "linespoints"v Help is available for WITHvO is an axis string: "x1y1", "x1y2", "x2y1", "x2y2". e.g. AXIS "X1Y2"vO is an INTEGER index variable from to . Alternatively,vL is a REAL index variable from to with points The BY clause is for 3d plotsO ... are the plot variables (min of 2 for 2d plots and 3 for 3d plots.vM ... are optional string exprs appended to the gnuplot PLOT commandPLOTBPLOT sets up a single 2d or 3d plot for use by the CURVE statement&PLOT [( END< optional (. . .) writes each string to the plot fileH is a block of statements, that usually including 1 or more CURVE...END statementsK Plot file must be opened before PLOT...END. See procedure OPENPLOTFILE()vJ Multiple plots can be written to the same page. See MULTIPLOT statement PROFILEBEGIN PROFILENEXTvPROFILEBEGIN END$PROFILEBEGIN(iexpr) END- Records the time taken to execute statements; The statement PROFILENEXT closes the time stamp and storesv" the result in REAL array PROFILE< optional sets the maximum size of the PROFILE array< and each call to PROFILENEXT incriments the PROFILE_INDEX.WITH9WITH is an optional clause to the CURVE commandL The string begins with a gnuplot plot style, and also includes any options.* E.g. WITH "lines linetype 1 pointtype 3" valid gnuplot WITH types are"" vUses  to (2d) or  (3d) CURVE exprs CURVE exprs (2d only) MULTIPLOTNMULTIPLOT sets up multiple plots on the same page. Used by the PLOT statement,MULTIPLOT ( END/ is number of plots in the x-directionv/ is number of plots in the y-directionv PLOT...END statementsF Plot file must be opened before MULTIPLOT...END. See OPENPLOTFILE()EXIT1EXIT leaves a procedure or function (or program). FUNCTIONS-The following simple functions are available:SYMBOLSvSYMBOL PROCEDURES.Help is available on the following procedures:FORMS3Help is available on the following parameter forms:vHAZARDLSome PDFs permit a HAZARD specification to follow the intrinsic parameter(s) The form is:The form is: HAZARD v For example:PDF NORMAL(t) mu, sigmav< HAZARD COVAR age PARAM b_age LOW=-2 HIGH=2 START=0 END< COVAR agesq PARAM b_agesq LOW=-2 HIGH=2 START=0 END END {pdf}PDFS-Help is available on the following PDF types:NUMBERNUMBERSvSupported number formats:I x, -x --> integer; x.x, -x.x --> real. These can have these suffixes:? symbol name symbol name symbol namev/ da (deka) 10^1 d (deci) 10^-1v/ h (hecto) 10^2 c, % (centi) 10^-2vG k (kilo) 10^3 m (milli) 10^-3 Ki (kibi) 2^10 v M (mega) 10^6 uv v (micro) 10^-6 Mi (Mebi) 2^20vF G (giga) 10^9 n (nano) 10^-9 Gi (Gibi) 2^30F T (tera) 10^12 p (pico) 10^-12 Ti (Tebi) 2^40F P (peta) 10^15 f (femto) 10^-15 Pi (Pebi) 2^50F E (exa) 10^18 a (atto) 10^-18 Ei (Exbi) 2^600 Z (zeta) 10^21 z (zepto) 10^-210 Y (yotta) 10^24 y (yocto) 10^-247 xEy, xE-y, x.xEy, x.xE-y (also with - prefix) --> realv? 0Rv, -0Rv (v is string of IVXLCDM (roman numerals) --> integervA xXy, -xXy (x is base 2 to 36, y is char set of base) --> integerO x:y:z, x:y:z, x:y:z.z, x:y:z.z, x:y, x:y.y (error checked 24hr) --> real hoursvB (AM and PM suffixes on previous line is 12hr error checked time@ xHy'z", xHy'z.z", xHy', xHy.y' (convert HMS/DMS) --> real hoursH x`y'z", x`y'z.z", x`y', x`y.y', x`, x.x` (convert DMS) --> real radians@ x'y", x'y.y", x', x.x', x", x.x" (convert DMS) --> real radians: x_y/z (fraction x + y/z; y, z positive integers) --> real> xDyMzY, xMyDzY, xYyMzD (calendar date) --> integer Julian day. xmmmy (e.g. 30jun1961) --> integer julian daySymbol: 0Type mle -h to match keywords exactly.0Type mle -H to match partial keywords.$ mle -h MLE gives a program outline.$ mle -h PROCEDURES lists procedures. mle -h PDFS lists PDF types.$ mle -h FORMS lists parameter forms.: mle -h HAZARD gives an example of a hazard specification., mle -h SYMBOLS lists pre-defined variables.% mle -h NUMBERS lists number formats.) mle -h FUNCTIONS lists simple functions,CHelp is available for the following types of functions/expressions:vError: vUsage: vmlev4 -v -p -i -I -Sr -Sw -b -t -d mlefile argsL -v iteration histories and other messages are written to the screen% -q quiet--don't print header$ -p only parses the mle file" -i runs mle interactively+ -I searches path for INCLUDE filesvF -b batch mode--turns off interactive monitoring while solving@ -Sr read START values from restart files .@ -Sw writes START values to restart files .6 -e execute command line argument as a program: -ex execute command line argument as an expression? -t terminate solving MODEL when file .trm existsvA -d debugging: x execution, e echo, i integration, d data= l likelihood, p parser, s symbol table) mlefile is the name of the program file, args are optional arguments to the program -h [name1 name2 . . . .]: help for PDFs, functions, symbols, parameter transforms 4 -h matches words exactly, -H searches within words -pn n1 n2 . . . .( parses n's and returns values and type-dCouldn't set debug level: "v".Debug level = -b-q-afv-IInclude path = v-h-H-S-Srv-Swv-p PARSE_ONLY-t-v-dpv-dev-dsv-ddv-div-dlv-dxv-iMLEFILEv-vxv-pnv" is badvinteger real complex -e-exv OUTFILENAMEvIncorrect number of parameters(c)1991-2010 Darryl J Holman Program file to run?  File v does not exist. Try again. MLEFILEBASEvCouldn't find program file v PLOTFILENAMETObjectP9Z nкл,  $F&{00000000-0000-0000-C000-000000000046}vF&{00020400-0000-0000-C000-000000000046}T:H:d:NkXkbkF&{00000000-0000-0000-C000-000000000046}TInterfacedObjectv X9:`0:к, TAggregatedObjectX9:Ha nкл,  $;t;;lkzkkF&{00000000-0000-0000-C000-000000000046}TContainedObject ;;a\;кл,  $@paaPcP@fPhPkPXm`mhmpmxmmmnnn`y@{Pv?@ZS?[HM ?ΡY?-Inf+InfNanv 0@?(0000000000000000000000000000000000000000-+E@@ @6This binary has no unicodestrings support compiled in.SRecompile the application with a unicodestrings-manager in the program uses clause.v/Runtime error  at $ $vAssertion failed (, line v)..This binary has no thread support compiled in.jRecompile the application with a thread-driver in the program uses clause before other units using thread. TRUEFALSE./..../v/ c(c0c@cTc\clctc|ccc2v?@@@@ @P@$@@ @(k@ @@C#@&@*焑*@ -@1_0@4@.7@@v:k :@#NJ>@bxA@z&D@n2xH@W ?hK@N@@aQYR@ȥoU@: 'X@ x9?\@ 6_@Ngb@"E@|oe@?p+ŝi@֦Ix@=AGA+BoU'9p|B29F?ƑF uuvHM᧓9;5S]=];Z T7aZ%]g']݀n R`%uYnb5{?? ףp= ף?;On?,eX?#GGŧ?il7?BzՔ?aw̫?6A_p??$ ?̈Po ̼?KB.?\ 5$?٬:|?[Mľ?I62w?]?a}J?d弼?{tP?,?'m?S;uD?QӮ?۝Xv%ƨ?H~t??>;5ʞ?2^_B?CK,΁?9Eϔ?9'*?Su>d|FU>sۓ=#Tw=N1J<=6zc%C1@G @3333333@@+Invalid month/year combination in MONTHDAYSvX9v@K>@Bad result in YEARDAY for returned da@KiMiGiTiPiEi@@$@(k@&@1_0@@v:k :@z&D@N@Rpmam@Bad  should be > 0 and < 1 but =  should be >=1 but =  should be >= 0 but =  should be > 0 but =  cannot be =0 but is should be >= -1 and =< 1 but =  should be > -1 and < 1 but = "Attempted log of negative number: Bad Logit()PWR: 1^oo is undefined*PWR: x^-oo is undefined except at x=oo,-ooPWR: oo^x is undefined for x=0PWR: 0^0 is undefined @Bad arg to: POWER(, FISHER argSTANDARDIZE arg 3ARCCOSH(p) or ARCSECH(1/p) argARCTANH(p) or ARCCOTH(1/p) arg ARCCOTH argv ARCSECH argv ARCCSCH argv ARCSIN arg ARCCOS arg ARCCOT arg ARCSEC arg ARCCSC arg@??@з%C??@-Warning: gamma SDF didn't completely convergeLNFACTORIAL arg nFACTORIAL arg nvInteger overflow in FACT@Integer overflow in COMBINATIONvInteger overflow in PERMUTEvINVBETA df1 (2nd) parametervINVBETA df2 (3rd) parametervINVBETA p (1st) parameterFINV df1 (2nd) parameterFINV df2 (3rd) parameterFINV p (1st) parameter"Warning: beta CDF did not convergeIBETA@@@:e$1@f ĝ@6a8e?>!\}Lփ?tPW?x?ѐ?.,wɬ?2mN?h>I?/{LUq?ځBV? hvYa@I~?Kx BESSELI arg nDu"@< [@Hz.XgC*(@,:u"@u@η@y@0O7@L뷤?N Oy)c?gL<$쿉pCIYU?A+c?7hN D5dē?J>'?!l?.Ɇ#@JQ*@K7 o2ı.a @M8nHh.Ɇ$@a@Q^Ǎ@6X;@OG@=w˖@?#}p?hl鿉d?=R2Ŧ? É꿉 >-? BESSELJ arg nepgē)+w?*4-;?bvy?[/i)?q?*]UQM?? ul?֝Yhd>^?57;8G?#h٤ҠH{?GF#?cLvC;1?yP7{'翉S#Z)t#v'@"ffffY8@ˡEsTT[r @P޵+@l%@@(\PY@= ףpMM@`s M{@ BESSELY arg n#ARG is undefined for imaginary zerov+exp: c^(oo*1i) and c^(-oo*1i) are undefinedv3PWR: x^-oo is undefined except at x=oo,-oo,ooi,-ooiv$PWR: oo^x is undefined for RE(x) = 0"PWR: 0^x is undefined for RE(x) =0+i-{}5h!@0ܐ?X=6-?@?J? b?u?EmR>?,am#r@P@@h?ǰ}gē?ݍ]@d3?janfebmaraprmayjunjulaugsepoctnovdec@ @?uu\T??@@@@ @@@'@1@;@Z!e݃@8l]+0a@AV9v,@1Ge܂RQU!h\P?Қ$6]sjd;@0]@RFݧ @8k 6Ø @7, @P n5 ,b: ;=$ FxclgNMNp )}v< with params > Free object[*Warning: trying to free nil pointer, size $Tried to pop a nil activation record Activate  varsVar  size: vDeactivate varsvString v made. Variable  is not defined hereCreate v x vNILv Const Data Staticv, Dims:v[1..= nilv PTR->+iFileuser-defined functionuser-defined procedure!-------- BEGIN TABLE ------------Adding symbol  hashv= Tried to free a nil symbol Declaring  (). Symbol exists already (), already exists and cannot be declared againmaking variable  : vPushing a symbol tablePopping a symbol tablePanic...disposing of nil table!v%Panic...trying to pop the last table!Wrong type: can't assign  (INTEGER) to (REAL) to v (COMPLEX) to %Wrong type: can't assign BOOLEAN to "Wrong type: can't assign CHAR to 'Wrong type: can't assign a POINTER to v!Wrong type: can't assign STRING "" to 'Error trying to copy undefined symbol "v" to "" undef typeCHAR POINTER BOOLEAN INTEGER REAL COMPLEX STRING PROCEDURE FUNCTION FILE v HASHRANGEN HASHRANGENposintvposintv sym_types s_undefs_char s_pointers_bool s_integers_real_ s_complexs_strings_procs_funcs_files_endv sym_types s_undefs_char s_pointers_bool s_integers_real_ s_complexs_strings_procs_funcs_files_endvś̛֛ޛ śޛ   ̛֛ sym_range s_undefs_char s_pointers_bool s_integers_real_ s_complexs_strings_procs_funcs_files_endv sym_range s_undefs_char s_pointers_bool s_integers_real_ s_complexs_strings_procs_funcs_files_endv<DKU\fnx UDn   \Kfx<sym_type s_undefs_char s_pointers_bool s_integers_real_ s_complexs_strings_procs_funcs_files_endsym_type s_undefs_char s_pointers_bool s_integers_real_ s_complexs_strings_procs_funcs_files_endǞϞ֞ ! Ϟ !  ֞ Ǟ sym_type_set sym_type_set$char_ptrchar_ptr char_arrayG char_arrayG char_a_ptr char_a_ptrstring_type_ptrvstring_type_ptrv string_typev string_typeDv bool_arrayG bool_arrayG bool_a_ptr bool_a_ptrbool_ptrbool_ptrsym_ptrvsym_ptrv sym_a_array v sym_a_array,v sym_a_ptr sym_a_ptr int_array|F int_arrayF int_a_ptr int_a_ptrint_ptrvint_ptrv real_array $I real_array 0I real_a_ptr real_a_ptrreal_ptrreal_ptr complex_array@ complex_arrayL complex_a_ptr complex_a_ptr complex_ptrv complex_ptrv string_arrayx string_array string_a_ptr string_a_ptr string_ptr string_ptr subdef_ptr subdef_ptr subdef_type v subdef_type ԡԡv sym_arrayN  sym_arrayN,ar_rangear_range ar_zrange ar_zrange ar_arrayTI ar_array`Iar_typar_typ ar_stack_ptr ar_stack_ptr ar_stack ar_stack table_ptr table_ptr table_type8 table_type8ԡ, ԣ8file_ptrfile_ptr file_arrayPI file_arrayPJ file_a_ptr file_a_ptrspecialssp_undefsp_const sp_static sp_modelparam sp_varparam sp_isdataspecialssp_undefsp_const sp_static sp_modelparam sp_varparam sp_isdata'09CQ]0]C9'Q special_type special_type sym_entry_type$ sym_entry_type$̦ d,`I  :eXit Resume One_step Pick_sym Change_sym Search_syms Help:Symbol: TRUEFALSEMenu: EXit mle Resume solving Resume solving for One step Pick a symbolv Change the value of a symbol  Search for symbols by nameText to search symbols on: v Index (1 to ): v New value: vAssignment failedhuh? : v SYMBOLINFINvITERATION_PRINTv CREATE_OBS;On?DIFF_DXvMAXITERvMAXTIMEvMAXEVALS#GGŧ?EPSILONv MINIMUM_ITSv FIND_MAXITSvFIND_EPSDFTIMEOvDFTIMECv? DIST_DX_SCALETERMFILE? SA_COOLING SA_ADJ_CYCLESSA_STEPS@SA_TEMPERATURE SA_EPS_NUMBER SA_STEPLENGTH@SA_STEPLENGTH_ADJ?SA_ADJ_LOWERBOUNDSA_ALT_ADJUSTMENT BATCHMODEPROFILEv PROFILE_INDEX PROFILE_TIME AIC_SELECT AICC_SELECTv BIC_SELECTIC_SAMPLE_SIZE INFO_METHOD1 INFO_METHOD2EULERSCvPLANCKSC PLACNKINV2PI AVOGADROSN ATOMICMASSUv BOHRMAGNETON BOHRRADIUS BOLTZMANNSCvRYDBERGCLIGHTC UNIVERSALGASCGRAVITATIONALCLOG_10MAXINTPIJXT@EGNUPLOTvmlev PROGRAM_NAMEVERSIONvREVISIONRELEASEv(c)1991-2010 Darryl J Holman COPYRIGHTOSSEP OSVERSION MAX_CHARS MAX_BOOLEANS MAX_INTEGERS MAX_REALS MAX_STRINGSvM2rà@CI_CHISQDIRECTMETHOD PRINT_LLIKSvPRINT_CIPRINT_SE PRINT_PARAMS PRINT_VCV PRINT_INFO PRINT_OBS PRINT_FIELDS PRINT_COUNTS PRINT_BASICv PRINT_SHORTvPRINT_DATA_STATS PRINT_DISTSv PLOT_DISTSPRINT_FREE_PARAMS METHOD_LOOPv DIST_T_START@ DIST_T_ENDDIST_T_N DIST_ERR_C PLOTPOINTS VCV_WIDTH, vDATADELIMITERSDOSvWindowsvOS2vWin32Kset terminal windows; reset; set data style lines; set autoscale; set nokeyv GNUPLOTINITvApolloJset terminal apollo; reset; set data style lines; set autoscale; set nokey MacintoshMset terminal macintosh; reset; set data style lines; set autoscale; set nokeyGset terminal x11; reset; set data style lines; set autoscale; set nokeyvPLOTINITset size 1,1; set origin 0,0 MULTIPLOTINIT INTERMPLOT MPLOTXSCALEv MPLOTYSCALEv REALWIDTH REALDECIMALS COMPLEXWIDTHCOMPLEXDECIMALSv , READDELIMITERSWRITEDELIMITERPOWELLNEWTON CGRADIENT1 CGRADIENT2SIMPLEXv ANNEALING BRENT_ITS,^, ? BRENT_MAGICvd弼? LARGE_ZERORADIANSPERDEGREEDEGREESSPERRADIAN SECONDSPERDAYSURFACE_POINTSSYSTEM INPUT_SKIPMIN_SIGNIFICANTvTITLE HIGH_DEFAULT LOW_DEFAULTv START_DEFAULT TEST_DEFAULT INTEGRATE_NvINTEGRATE_METHODaw̫? INTEGRATE_TOL I_TRAP_OPENv I_TRAP_CLOSED I_SIMPSONI_AQUADv I_ROMBERG ALT_LOGISTIC ALT_VQUANTILE EXP_HAZARDD_IDX READSTARTFILEWRITESTARTFILE MLEFILEBASEv OUTFILENAMEv DATAFILENAME PLOTFILENAMEVERBOSEv PRINT_REDUCED DEBUG_SYM DEBUG_EXEC DEBUG_ECHO DEBUG_PARSEv DEBUG_DATA DEBUG_INT DEBUG_LIKDEBUG PARSE_ONLYFDATAFINPUTFOUTPUTvFOUTFILEFPLOT FPLOTDATA LINE_NUMBN_OBS DROPPED_OBSv TOTAL_OBSN_VARS? MAX_CHILDREN WAIT_ON_CHILDNANvSMALLEST_NUMBERvMACHINE_EPSILONv SQRT_EPSILONINFINITYoo NEGINFINITYvLARGEST_LIKELIHOODSMALLEST_LIKELIHOODvLARGEST_LLIKELIHOODvSMALLEST_LLIKELIHOOD LNINFINITY RANDOMSEED?? ףp= ף?DX_START DX_MAXITS DX_TOOBIG DX_TOOSMALLv? SIMPLEX_ALPHA SIMPLEX_BETA SIMPLEX_GAMMACI_LIMIT_DELTAil7? CI_CONVERGEv CI_MAXITS LOGLIKELIHOOD FREE_PARAMSvDELTA_LL INVERT_FLAGv CONVERGE_FLAG ITERATIONSEVALS VCV_EVALSCI_EVALSNot done *Stopped after maximum function evaluations *Stopped after maximum number of iterations Stopped after maximum time Stopped by termination file Converged normally #Trouble converging in one dimension /Starting value is not within min and max bounds $Starting temperature is not positive Did not converge SUM SUMSQMEAN VAR STDEVMIN MAX ADD DIVIDE EXCESS EXPADD FISHER  FISHERINV INVADD INVERT  INVLOGLIN  INVMULTIPLYLOGISTIC LOGIT LOGLIN MULTIPLY NUMBER POWER POWEREXP  boxerrorbars boxes boxxyerrorbars candlesticks dots  errorbars  financebars fsteps histeps impulses lines  linespoints points steps vector  xerrorbars  xyerrorbars  yerrorbars SUMLL SUM SUMMATIONPROD PRODUCT  a b c d e f h c r n h a1b1a2a3b3r a1a2b2 p h1h2 p n p m n p n c uxsxuysyr c p a1a2a3b3r ? Time Shape Scale Location Rate Count Hazard Hazard Proportion Correlation Age-dependent hazardPower Circular location Degrees of freedom           vALPHA  ARCSINE ;ASYMPTOTICRANGE  ATRESIA FBERNOULLITRIAL Ll)BETA FBINOMIAL Ll)BIRNBAUMSAUNDERS   BIVNORMAL R"5CAUCHY X CHI j  CHISQUARED  COMPOUNDEXTREME ʼ DANIELS ;DISK    EXPONENTIAL ^;F kFAILED @ FDEPLETE F FL2PT dX FOLDEDNORMAL XGAMMA A GAMMAFRAIL p;GAUSSIAN X GENGAMMA   GENGUMBEL   GEOMETRIC vl)GOMPERTZ |0GGUMBEL X  HORSESHOE j HYPERBOLICSECANT  HYPERGEOMETRIC ּ / HYPER2EXP dXHYPO2EXP MIMMUNE @ INVBETA1  INVBETA2  INVCHI  INVGAMMA   INVGAUSSIAN  LAPLACE X  LARGEEXTREME1 X  LARGEEXTREME2 м  LINEARHAZARD GLNGAMMA   LNLOGISTIC м LNNORMAL  LOGISTIC X  LOGNORMAL   LOGSERIES LXLOWMAX   MAKEHAM DGMAXWELL   MIXMAKEHAM 4S NEGBINOMIAL Ll)NEGHYPERGEOMETRIC /NORMAL X PARETO  PASCAL Ll)POISSON FePOLYAEGGENBERGER  / POWERFUNCTION  j  RAISEDCOSINE    RANDOMWALK ļ RAYLEIGH   RECTANGULAR   REVPOWERFUNCTION  j  RINGINGEXP0 j  RINGINGEXP180 м SHIFTEXPONENTIAL X  SHIFTGAMMA j SHIFTLOGNORMAL j  SHIFTWEIBULL  SILER .0Y SMALLEXTREME1 X  SMALLEXTREME2 м STERILE @ STUDENTT @kSUBBOTIN  THOMAS FeUNIFORM   VONMISES ܼ_WEIBULL p#ZIPF F  IDENTIFIER FUNCTION ARRAY DATA DATAARRAY DERIVATIVE FINDMIN FINDZERO FUNCTION IF INTEGRATE LEVEL LEVELDELTA PARAM PDATA PDF PHAZARD PPDF POSTASSIGN PREASSIGN PRODUCT QUANTILE QDF SUMMATION ABS  |x|, the absolute value of x ADD x1 + x2 ANDF  x1 and x2 ARCCOS the inverse cosine of x ARCCOSH "the inverse hyperbolic cosine of x ARCCOT the inverse cotangent of x ARCCOTH %the inverse hyperbolic cotangent of x ARCCSC the inverse cosecant of x ARCCSCH $the inverse hyperbolic cosecant of x ARCSEC the inverse secant of x ARCSECH "the inverse hyperbolic secant of x ARCSIN the inverse sin of x ARCSINH the inverse hyperbolic sin of x ARCTAN the inverse tangent of x ARCTANH #the inverse hyperbolic tangent of x ARG !the argument for complex number x ARGCOUNT $the number of command line arguments ARGSTRING the x-th command line argument BESSELI 2the modified Bessel fcn I (integer order x1) of x2 BESSELJ .the Bessel fcn J (integer order x1) of real x2 BESSELK 2the modified Bessel fcn K (integer order x1) of x2 BESSELY )the Bessel fcn Y (integer order x1) of x2 BETA the Beta fcn for x1, x2 BOOL2STR a string from boolean x CEIL the least integer >= x CHISQ 3area beyond x1 of a Chi^2 distribution with x2 d.f. CHR  CHAR number x CLOCKSEED a seed based on date and time COMB .combinations of x1 elements taken x2 at a time COMP &the complement of x. SIGN(1-ABS(x), x) COMPN -the x2 complement of x1. SIGN(x2-ABS(x1), x1) CONCAT 2 strings concatinated COS the cosine of x COSH the hyperbolic cosine of x COT the cotangent of x COTH the hyperbolic cotangent of x CSC the cosecant of x CSCH the hyperbolic cosecant of x DEC x - 1 DEFAULTOUTNAME a reasonable output file name DEFAULTPLOTNAMEa reasonable plot file name DELETESUBSTR 'x1 with x3 chars removed starting at x2 DELTA $Kronecker's delta. 1 if x1=x2 else 0 DIREXISTS !whether or not directory x exists DIVIDE x1/x2 DMSTOD *degrees from degrees, minutes, and seconds DMSTOR *radians from degrees, minutes, and seconds DMYTOJ $Julian day from day, month, and year DTOR radians from degrees EARTHDIST 7distance on earth (in km) between lat1 long1 lat2 long2 ENVCOUNT #the number of environment variables ENVSTRING the x-th environment variable EOF &TRUE when FILE x is at the end of file EOLN $TRUE when FILE x is at end of a line ERF  the error fcn ERFC the complementary error fcn EXEC 3OS exit code. Exectutes OS command X1 w/ options X2 EXISTS whether or not a file exists EXP e^x FACT x! FDIST $area past x1 of a F dist (x2, x3 df) FILESIZE size of file x FINDFIRST -first file matching path x1 and attributes x2 FINDNEXT (next file in search started by FINDFIRST FISHER "Fisher transform ln((1+x)/(1-x))/2 FISHERINV .inverse Fisher transf. (exp(2x)-1)/(exp(2x)+1) FLOOR the greatest integer <= x FORK 4a child pid after forking a process (or 0 for child) FORMATDATE (Date x1 (integer) formatted as string x2 FRAC the fractional part of x FREEPARAM #true if x is a free model parameter FSEARCH -full pathname of file x1 in directory list x2 GAMMA  the gamma fcn GCF 'the greatest common factor of x1 and x2 GETDIR the current directory name GETENV #the value of environment variable x GETFILEATTR "the attributes of the file named x GETFILEBNAME "the base file name for file name x GETFILEDRIVE  the drive letter for file name x GETFILEEXT "the file extension for file name x GETFILEPATH the file path for file name x GETPID the current process ID GETPPID the parent process ID HEAVISIDE 1 if x>=0 else 0 IBETA the incomplete beta fcn IBETAC )the complement of the incomplete beta fcn IDIV  x1 div x2 IGAMMA the incomplete gamma fcn IGAMMAC *the complement of the incomplete gamma fcn IGAMMAE IGAMMA(x1, x2)*ROOT(x2, x1) IM ,imaginary part of complex number x as a real INC x + 1 INT the integer part of x INT2STR a string from x INVBETA /the inverse BETA with prob x1, arguments x2, x3 INVCHISQ -the inverse chisq with probability x1 (x2 df) INVERT 1/x INVFDIST .inverse F dist with probability x1 (x2, x3 df) INVNORMAL *inverse standard normal with probability x INVSTUDENTT -inverse Student T with probability x1 (x2 df) IRAND a random integer from x1 to x2 ISANINFINITY true if x is oo or -oo ISEQ x1 = x2 INSERTSTR )string x1 with x2 inserted at position x3 ISEVEN TRUE if integer x is even ISGE x1 >= x2 ISGT x1 > x2 ISINFINITY true if x is oo ISLE x1 <= x2 ISLT x1 < x2 ISNAN true if x is not a number (NaN) ISNE x1 <> x2 ISNEAR *TRUE if x1 is in [x2-x3, x2+x3] else FALSE ISNEGINFINITY true if x is -oo ISODD TRUE if integer x is odd ISPRIME true if x is a prime number JULIAND %the day of the month for a julian day JULIANM the month for a julian day JULIANY the year for a julian day LCM &the least common multiple of x1 and x2 LEAPYEAR TRUE if x is a leap year LEFTSTRING 'the leftmost x2 characters of string x1 LN *the natural (Naperian) log of x (also LOG) LNFACT ln(x!) LNGAMMA  ln(gamma(x)) LOG )the natural (Naperian) log of x (also LN) LOG10 the log (base 10) of x LOGBASE the log (base x2) of x1 LOGISTIC 41/(1 + exp(x)) (its complement if alt_logistic=true) LOGIT  ln(x/(1 - x)) LUNARPHASE approximate phase of the moon MAX the greatest of x1 and x2 MIN the least of x1 and x2 MIX x1*x2 + (1 - x1)*x3 MODULO integer mod function MONTHDAYS 'number of days for month x1 and year x2 MONTHNAME #name of month (for x from -12 to 12 MULTIPLY x1*x2 NEGATE -x NORMAL normal pdf at x NORMALCDF normal cdf at x NOW seconds since the year 0 NOTF NOT x ORD the ordinal value of char x ORF x1 or x2 PADINT 0integer x1 left padded to width x2 with char x3 PERMUTATIONS 3permutations: x1 taken x2 at a time: x1!/(x1 - x2)! POLARTORECTX !rectangular x from 2 polar coords POLARTORECTY !rectangular y from 2 polar coords POS $starting position of string x2 in x1 POWER x1 to the power x2. x1^x2 PUT x and writes it to output RAND random number from 0 to 1 RE real part of complex x REAL2STR 0a string from real x1, width x2, x3+ sig. digits RECTTOPOLARA %polar angle from 2 rectangular coords RECTTOPOLARR &polar radius from 2 rectangular coords RECTTOSPHEREA1 *spherical angle1 from 3 rectangular coords RECTTOSPHEREA2 *spherical angle2 from 3 rectangular coords RECTTOSPHERER *spherical radius from 3 rectangular coords REMAINDER 0remainder: x1 - x2*int(x1/x2) if x2 <> 0, else 0 RIGHTSTRING (the rightmost x2 characters of string x1 ROOT x1 to the power 1/x2 ROUND  x rounded to the nearest integer RRAND "a real random number from x1 to x2 RTOD degrees from radians SEC the secant of x SECH the hyperbolic secant of x SETRANSFORM SE of x within a MODEL SGN 1 (x>0), 0 (x=0), -1 (x<0) SHIFTLEFT "x1 bit-shifted x2 bits to the left SHIFTRIGHT "x1 bit-shifted x2 bits to the left SIGN x1 with the same sign of x2 SIN  the sine of x SINH the hyperbolic sine of x SPHERETORECTX %rectangular x from 3 spherical coords SPHERETORECTY %rectangular y from 3 spherical coords SPHERETORECTZ %rectangular z from 3 spherical coords SQR  x squared SQRT the square root of x STANDARDIZE  (x1 - x2)/x3 STRINGLEN length of string x STRINGREPLACE 9x1 with x3 replacing x2; x4=first only; x5=case sensitive STRING2INT an integer from string x STRING2REAL a real from string x STUDENTT (area past x1 of a Student T dist (x2 df) SUBSTRING +substring of x1 from position x2, length x3 SUBTRACT x1 - x2 TAN the tangent of x TANH the hyperbolic tangent of x TOBASE x1 as a string in base x2 TODAY today's date TOLOWER lower case string TOUPPER upper case string TRIM )x1 trimmed of leading and trailing spaces TRIML x1 trimmed on leading spaces TRIMR x1 trimmed of trailing spaces TRUNC integer part of real number x VMAX maximum value in array x VMEAN mean of array x1 weighted by x2 VMEDIAN !median of array x1 weighted by x2 VMIN minimum value in array x VQUANTILE )x3-th Quantile of array x1 weighted by x2 VSTDEV -standard deviation of array x1 weighted by x2 VSUM sum of array x1 weighted by x2 VSUMSQ )sum of squares of array x1 weighted by x2 VVARIANCE 7variance (w/bias correction) of array x1 weighted by x2 WAITPID *status. Waits for child x (pid) to return WEEKDAY 1day of the week (Sun=1 Mon=2...) for a julian day WEEKDAYNAME  name the week for x from -7 to 7 XORF  x1 xor x2 YEARDAY /day of the year (1-jan = 1...) for a julian day ZETA )Riemann's zeta = sum k (1 to oo) of 1/k^x ARRAYTODATA /Converts array variable(s) to DATA variables(s) BOOTSTRAP (Creates bootstrap frequencies x2 from x1 CHDIR "Changes to the specified directory CLOSE  Closes a file COPYDATAVAR Copies data var x1 to x2 DATAFILE Names and assigns the data file DATATOARRAY %Converts DATA variable(s) to array(s) DEC Adds one to an integer variable DRAWDOWN /Removes x2 observations from frequency array x1 DUMPSYMBOL -Gives information about a symbol-table symbol DUMPTABLE "Prints out the entire symbol table ERASE  Erases a file EXEC %Executes command x1 with arguments x2 FILETIME ,Returns yr, mo, dy, hr, min, sec for file x1 FINDQUIT .Frees resources after using findfirst/findnext FINISHPLOT 2Closes plotfile, generates (pauses if true) a plot FLUSH Flushes a file buffer GETDATE Returns current Year, Month, Day GETTIME /Returns current Hour, Minute, Second, 100th_Sec HALT Halts execution of the program INC &Subtracts one from an integer variable MKDIR Creates a directory OPENAPPEND Opens a text file for appending OPENREAD Opens a text file for reading OPENWRITE Opens a text file for writing OUTFILE  Names and assigns an output file PLOTFILE $Opens plot file (FPLOT) for plotting PRINT Prints arg(s) to the output file PRINTLN *Prints arg(s) to the output file w/newline PTRANSFORM 3Computes x1 and StdErr (x2) from Expr x3 (in MODEL) READ Reads from a file READLN Reads a line from a file RENAME Changes a file's name RMDIR Deletes a directory SEED Sets a random number seed SLEEP %Sleeps for the specified milliseconds VSORT Sorts one or more arrays WRITE (Writes arg(s) to standard output or file WRITELN 2Writes arg(s) to standard output or file w/newline WRITEPLOT Writes arg(s) to the plot file WRITEPLOTLN (Writes arg(s) to the plot file w/newline pid_ptrvpid_ptrv pid_type pid_typeFF$HJ JP diff_method diff_forward diff_backward diff_central diff_method diff_forward diff_backward diff_central--xresultsX_OKX_BREAK X_CONTINUEX_EXITxresultsX_OKX_BREAK X_CONTINUEX_EXITxresulthX_OKX_BREAK X_CONTINUEX_EXITxresultX_OKX_BREAK X_CONTINUEX_EXIT^ckvckv^ ZSTAT_RANGE  ZSTAT_RANGE  Z_PARAM_RANGEp Z_PARAM_RANGEp PARAM_RANGEp PARAM_RANGEpstr3str3str20str20 np_pwork_arrayph np_pwork_arraypnp_pwork_array_ptrnp_pwork_array_ptr form_typesform_udfform_add form_divide form_excess_ form_expadd form_fisherform_fisherinv form_invadd form_invertform_invloglinform_invmultiply form_logistic form_logit form_loglin form_multiply form_real form_power form_powerexp form_hazardform_end form_typesform_udfform_add form_divide form_excess_ form_expadd form_fisherform_fisherinv form_invadd form_invertform_invloglinform_invmultiply form_logistic form_logit form_loglin form_multiply form_real form_power form_powerexp form_hazardform_end ,8DS_kz ,8DS_ k z    form_z_rangeform_udfform_add form_divide form_excess_ form_expadd form_fisherform_fisherinv form_invadd form_invertform_invloglinform_invmultiply form_logistic form_logit form_loglin form_multiply form_real form_power form_powerexp form_hazardform_endv form_z_rangeform_udfform_add form_divide form_excess_ form_expadd form_fisherform_fisherinv form_invadd form_invertform_invloglinform_invmultiply form_logistic form_logit form_loglin form_multiply form_real form_power form_powerexp form_hazardform_endv!(!1!=!J!V!b!q!}!!!!!!!!!!! "(!1! "=!J!V!b!!q!}! ! ! ! ! !!!!!! form_rangeform_add form_divide form_excess_ form_expadd form_fisherform_fisherinv form_invadd form_invertform_invloglinform_invmultiply form_logistic form_logit form_loglin form_multiply form_real form_power form_powerexp form_hazardform_end form_rangeform_add form_divide form_excess_ form_expadd form_fisherform_fisherinv form_invadd form_invertform_invloglinform_invmultiply form_logistic form_logit form_loglin form_multiply form_real form_power form_powerexp form_hazardform_end1$:$F$S$_$k$z$$$$$$$$$$$%%1$:$%F$S$_$k$%z$$ $ $ $ $ $$$$$ form_v_range form_v_range form_info_rec form_info_recT&$& $& with_types with_types&G&& datf_typesdatf_udf datf_sumlldatf_sumdatf_summation datf_prod datf_productdatf_end datf_typesdatf_udf datf_sumlldatf_sumdatf_summation datf_prod datf_productdatf_endm'v''''''''''v''m' datf_range& datf_sumlldatf_sumdatf_summation datf_prod datf_productdatf_endv datf_rangeT' datf_sumlldatf_sumdatf_summation datf_prod datf_productdatf_endv((((((((((((df_typeUdf_undefdf_alpha df_arcsinedf_asymptoticrange df_atresiadf_bernoullitrialdf_beta df_binomialdf_birnbaumsaunders df_bivnormal df_cauchydf_chi df_chisquareddf_compoundextreme df_danielsdf_diskdf_expodf_f df_failed df_fdepletedf_fl2ptdf_foldednormaldf_gamma df_gammafrail df_gaussian df_gengamma df_gengumbel df_geometric df_gompertz df_gumbel df_horseshoedf_hyperbolicsecantdf_hypergeometric df_hyper2exp df_hypo2exp df_immune df_invbeta1 df_invbeta2 df_invchi df_invgammadf_invgaussian df_laplacedf_largeextreme1df_largeextreme2 df_linearhaz df_lngamma df_lnlogistic df_lnnormal df_logistic df_lognormal df_logseries_ df_lowmax df_makeham df_maxwell df_mixmakehamdf_negbinomialdf_neghypergeometric df_normal df_pareto df_pascal df_poissondf_polyaeggenbergerdf_powerfunctiondf_raisedcosine df_randomwalk df_rayleighdf_rectangulardf_revpowerfunctiondf_ringingexp0df_ringingexp180 df_shiftexp df_shiftgammadf_shiftlognormaldf_shiftweibulldf_silerdf_smallextreme1df_smallextreme2 df_sterile df_studentt df_subbotin df_thomas df_uniform df_vonmises df_weibulldf_zipfdf_enddf_typeUdf_undefdf_alpha df_arcsinedf_asymptoticrange df_atresiadf_bernoullitrialdf_beta df_binomialdf_birnbaumsaunders df_bivnormal df_cauchydf_chi df_chisquareddf_compoundextreme df_danielsdf_diskdf_expodf_f df_failed df_fdepletedf_fl2ptdf_foldednormaldf_gamma df_gammafrail df_gaussian df_gengamma df_gengumbel df_geometric df_gompertz df_gumbel df_horseshoedf_hyperbolicsecantdf_hypergeometric df_hyper2exp df_hypo2exp df_immune df_invbeta1 df_invbeta2 df_invchi df_invgammadf_invgaussian df_laplacedf_largeextreme1df_largeextreme2 df_linearhaz df_lngamma df_lnlogistic df_lnnormal df_logistic df_lognormal df_logseries_ df_lowmax df_makeham df_maxwell df_mixmakehamdf_negbinomialdf_neghypergeometric df_normal df_pareto df_pascal df_poissondf_polyaeggenbergerdf_powerfunctiondf_raisedcosine df_randomwalk df_rayleighdf_rectangulardf_revpowerfunctiondf_ringingexp0df_ringingexp180 df_shiftexp df_shiftgammadf_shiftlognormaldf_shiftweibulldf_silerdf_smallextreme1df_smallextreme2 df_sterile df_studentt df_subbotin df_thomas df_uniform df_vonmises df_weibulldf_zipfdf_end--------..$...5.C.V.a.i.q.v............//%/7/D/P/Z/f/r/|//////////000'020=0K0Z0o0y0000000000 11*161D1V1f1o11111111111V-------. . $. .. 5. C.V.a.U1i.q.v............/!7// %/"D/#P/$Z/%f/&r/'|/(/)/*/+/,/-/.///0/1020304'05206=07K08Z09o0:y0;0<0=0>0?0@0A0B0C0D 1E1F*1G61HD1IV1Jf1Ko1L1M1N1O1P1-Q1R1S1T1df_rangeT()df_alpha df_arcsinedf_asymptoticrange df_atresiadf_bernoullitrialdf_beta df_binomialdf_birnbaumsaunders df_bivnormal df_cauchydf_chi df_chisquareddf_compoundextreme df_danielsdf_diskdf_expodf_f df_failed df_fdepletedf_fl2ptdf_foldednormaldf_gamma df_gammafrail df_gaussian df_gengamma df_gengumbel df_geometric df_gompertz df_gumbel df_horseshoedf_hyperbolicsecantdf_hypergeometric df_hyper2exp df_hypo2exp df_immune df_invbeta1 df_invbeta2 df_invchi df_invgammadf_invgaussian df_laplacedf_largeextreme1df_largeextreme2 df_linearhaz df_lngamma df_lnlogistic df_lnnormal df_logistic df_lognormal df_logseries_ df_lowmax df_makeham df_maxwell df_mixmakehamdf_negbinomialdf_neghypergeometric df_normal df_pareto df_pascal df_poissondf_polyaeggenbergerdf_powerfunctiondf_raisedcosine df_randomwalk df_rayleighdf_rectangulardf_revpowerfunctiondf_ringingexp0df_ringingexp180 df_shiftexp df_shiftgammadf_shiftlognormaldf_shiftweibulldf_silerdf_smallextreme1df_smallextreme2 df_sterile df_studentt df_subbotin df_thomas df_uniform df_vonmises df_weibulldf_zipfdf_enddf_rangeT-df_alpha df_arcsinedf_asymptoticrange df_atresiadf_bernoullitrialdf_beta df_binomialdf_birnbaumsaunders df_bivnormal df_cauchydf_chi df_chisquareddf_compoundextreme df_danielsdf_diskdf_expodf_f df_failed df_fdepletedf_fl2ptdf_foldednormaldf_gamma df_gammafrail df_gaussian df_gengamma df_gengumbel df_geometric df_gompertz df_gumbel df_horseshoedf_hyperbolicsecantdf_hypergeometric df_hyper2exp df_hypo2exp df_immune df_invbeta1 df_invbeta2 df_invchi df_invgammadf_invgaussian df_laplacedf_largeextreme1df_largeextreme2 df_linearhaz df_lngamma df_lnlogistic df_lnnormal df_logistic df_lognormal df_logseries_ df_lowmax df_makeham df_maxwell df_mixmakehamdf_negbinomialdf_neghypergeometric df_normal df_pareto df_pascal df_poissondf_polyaeggenbergerdf_powerfunctiondf_raisedcosine df_randomwalk df_rayleighdf_rectangulardf_revpowerfunctiondf_ringingexp0df_ringingexp180 df_shiftexp df_shiftgammadf_shiftlognormaldf_shiftweibulldf_silerdf_smallextreme1df_smallextreme2 df_sterile df_studentt df_subbotin df_thomas df_uniform df_vonmises df_weibulldf_zipfdf_ends:|::::::::::: ;;);1;9;>;H;T;];m;v;;;;;;;;;;; <<"<.<:<D<P<_<j<{<<<<<<<<<<<=="=7=A=K=U=`=t========== >>.>7>H>Y>d>p>|>>>>>>Us:|::::::: : : : : ;;);U>1;9;>;H;T;];m;v;;;;;;;;!;; ;" <#<$"<%.<&:<'D<(P<)_<*j<+{<,<-<.</<0<1<2<3<4<5<6=7=8"=97=:A=;K=<U==`=>t=?=@=A=B=C=D=E=F=G=H >I>J.>K7>LH>MY>Nd>Op>P|>Q>R>S>T>df_typesT()df_undefdf_alpha df_arcsinedf_asymptoticrange df_atresiadf_bernoullitrialdf_beta df_binomialdf_birnbaumsaunders df_bivnormal df_cauchydf_chi df_chisquareddf_compoundextreme df_danielsdf_diskdf_expodf_f df_failed df_fdepletedf_fl2ptdf_foldednormaldf_gamma df_gammafrail df_gaussian df_gengamma df_gengumbel df_geometric df_gompertz df_gumbel df_horseshoedf_hyperbolicsecantdf_hypergeometric df_hyper2exp df_hypo2exp df_immune df_invbeta1 df_invbeta2 df_invchi df_invgammadf_invgaussian df_laplacedf_largeextreme1df_largeextreme2 df_linearhaz df_lngamma df_lnlogistic df_lnnormal df_logistic df_lognormal df_logseries_ df_lowmax df_makeham df_maxwell df_mixmakehamdf_negbinomialdf_neghypergeometric df_normal df_pareto df_pascal df_poissondf_polyaeggenbergerdf_powerfunctiondf_raisedcosine df_randomwalk df_rayleighdf_rectangulardf_revpowerfunctiondf_ringingexp0df_ringingexp180 df_shiftexp df_shiftgammadf_shiftlognormaldf_shiftweibulldf_silerdf_smallextreme1df_smallextreme2 df_sterile df_studentt df_subbotin df_thomas df_uniform df_vonmises df_weibulldf_zipfdf_endvdf_typesT-df_undefdf_alpha df_arcsinedf_asymptoticrange df_atresiadf_bernoullitrialdf_beta df_binomialdf_birnbaumsaunders df_bivnormal df_cauchydf_chi df_chisquareddf_compoundextreme df_danielsdf_diskdf_expodf_f df_failed df_fdepletedf_fl2ptdf_foldednormaldf_gamma df_gammafrail df_gaussian df_gengamma df_gengumbel df_geometric df_gompertz df_gumbel df_horseshoedf_hyperbolicsecantdf_hypergeometric df_hyper2exp df_hypo2exp df_immune df_invbeta1 df_invbeta2 df_invchi df_invgammadf_invgaussian df_laplacedf_largeextreme1df_largeextreme2 df_linearhaz df_lngamma df_lnlogistic df_lnnormal df_logistic df_lognormal df_logseries_ df_lowmax df_makeham df_maxwell df_mixmakehamdf_negbinomialdf_neghypergeometric df_normal df_pareto df_pascal df_poissondf_polyaeggenbergerdf_powerfunctiondf_raisedcosine df_randomwalk df_rayleighdf_rectangulardf_revpowerfunctiondf_ringingexp0df_ringingexp180 df_shiftexp df_shiftgammadf_shiftlognormaldf_shiftweibulldf_silerdf_smallextreme1df_smallextreme2 df_sterile df_studentt df_subbotin df_thomas df_uniform df_vonmises df_weibulldf_zipfdf_endv;GDGMGXGkGvGGGGGGGGGGGH HHH%H.H>HGHUHaHmHzHHHHHHHHHHH II!I0I;ILI]IjIuIIIIIIIIIIIJJJ&J1JEJVJfJtJJJJJJJJJJKK*K5KAKMKWKbKnKyKKVDGMGXGkGvGGGG G G G G GGGUKH HHH%H.H>HGHUHaHmHzHHHH!HH H"H#H$H%H& I'I(!I)0I*;I+LI,]I-jI.uI/I0I1I2I3I4I5I6I7I8I9J:J;J<&J=1J>EJ?VJ@fJAtJBJCJDJEJFJGJHJIJJJKKLKM*KN5KOAKPMK;GQWKRbKSnKTyK print_df_info_typeTG print_df_info_typeTG param_array_type $I param_array_type 0I int_form_type int_form_typeint_form_type_ptrint_form_type_ptr df_cv_array $Iv df_cv_array 0Ivconstraint_typec_gtzeroc_gezeroc_probc_corrc_geonec_hazc_sp1ac_sp1bc_sp2c_sp3c_sp4c_sp5ac_sp6c_sp7c_sp8c_sp9c_sp10c_sp11c_sp12c_sp13c_sp14c_sp15c_sp16c_noneconstraint_typec_gtzeroc_gezeroc_probc_corrc_geonec_hazc_sp1ac_sp1bc_sp2c_sp3c_sp4c_sp5ac_sp6c_sp7c_sp8c_sp9c_sp10c_sp11c_sp12c_sp13c_sp14c_sp15c_sp16c_noneQQQQQQQQQQQR RRRR#R*R1R8R?RFRMRTRQQQQQTRQ#R*R1R8R?RFRMRQQQ Q Q R R RRR cns_forms_typeP cns_forms_typeQ cns_forms_ptr cns_forms_ptr pname_str pname_str pname_info_typeSv pname_info_typeSvpname_info_ptrpname_info_ptr pclass_typepc_undef pc_variablepc_shapepc_scale pc_locationpc_ratepc_numbpc_mhaz pc_hazardpc_ppc_corrpc_agepc_powerpc_2pipc_dfpc_endv pclass_typepc_undef pc_variablepc_shapepc_scale pc_locationpc_ratepc_numbpc_mhaz pc_hazardpc_ppc_corrpc_agepc_powerpc_2pipc_dfpc_endv"U+U7U@UIUUU]UeUmUwU|UUUUUU U U |UUUmUIUeU]U wU UUU@U7U"U+U pclass_info_typedT pclass_info_typeUpclass_info_ptrvpclass_info_ptrv df_info_rec,v df_info_rec, VGW WGQSPTT V$G(v part_typep_undefp_ident p_ufunctionp_arrayp_data p_dataarray p_derivative p_findmin p_findzerop_ifnp_if p_integratep_lev p_leveldeltap_paramp_pdatap_pdf p_phazardp_ppdf p_postassign p_preassign p_productp_quantp_qdf p_summationp_end part_typep_undefp_ident p_ufunctionp_arrayp_data p_dataarray p_derivative p_findmin p_findzerop_ifnp_if p_integratep_lev p_leveldeltap_paramp_pdatap_pdf p_phazardp_ppdf p_postassign p_preassign p_productp_quantp_qdf p_summationp_endXXXXXXXXXYY YYY+Y3Y;YAYKYRY_YkYuY}YYYXXXXYXXX Y Y Y Y Y+Y3Y;YAYRYKY_YkY}YuYYXX part_rangeWp_ident p_ufunctionp_arrayp_data p_dataarray p_derivative p_findmin p_findzerop_ifnp_if p_integratep_lev p_leveldeltap_paramp_pdatap_pdf p_phazardp_ppdf p_postassign p_preassign p_productp_quantp_qdf p_summationp_end part_rangeXp_ident p_ufunctionp_arrayp_data p_dataarray p_derivative p_findmin p_findzerop_ifnp_if p_integratep_lev p_leveldeltap_paramp_pdatap_pdf p_phazardp_ppdf p_postassign p_preassign p_productp_quantp_qdf p_summationp_end[[\ \\ \-\7\B\H\M\Y\_\l\t\|\\\\\\\\\\\ \\ \\-\7\[ H\ B\ M\ Y\ _\l\t\|\\\\\\\\\[ part_typesWp_undefp_ident p_ufunctionp_arrayp_data p_dataarray p_derivative p_findmin p_findzerop_ifnp_if p_integratep_lev p_leveldeltap_paramp_pdatap_pdf p_phazardp_ppdf p_postassign p_preassign p_productp_quantp_qdf p_summationp_end part_typesXp_undefp_ident p_ufunctionp_arrayp_data p_dataarray p_derivative p_findmin p_findzerop_ifnp_if p_integratep_lev p_leveldeltap_paramp_pdatap_pdf p_phazardp_ppdf p_postassign p_preassign p_productp_quantp_qdf p_summationp_end-_5_=_I_Q_X_d_q_{_______________```I_Q_X_d_`q_{_5_ _ _ _ _ _________`_`=_-_ part_info_rec part_info_rectaifn_type ifn_undefifn_absifn_addifn_and ifn_arccos ifn_arccosh ifn_arccot ifn_arccoth ifn_arccsc ifn_arccsch ifn_arcsec ifn_arcsech ifn_arcsin ifn_arcsinh ifn_arctan ifn_arctanhifn_arg ifn_argcount_ ifn_argstring ifn_besseli ifn_besselj ifn_besselk ifn_besselyifn_beta ifn_bool2strifn_ceil ifn_chisqifn_chr ifn_clockseedifn_combifn_complementifn_complementn ifn_concatifn_cosifn_coshifn_cotifn_cothifn_cscifn_cschifn_decifn_defaultoutifn_defaultplotifn_deletesubstr ifn_delta ifn_direxists ifn_divide ifn_dms2d ifn_dms2rifn_dmy2julianifn_dtor ifn_earthdist ifn_envcount ifn_envstringifn_eofifn_eolnifn_erfifn_erfcifn_exec ifn_existsifn_expifn_fact ifn_fdist ifn_filesize ifn_findfirst ifn_findnext ifn_fisher ifn_fisherinv ifn_floorifn_forkifn_formatdateifn_frac ifn_freeparam ifn_fsearch ifn_gammaifn_gcd ifn_getdir ifn_getenvifn_getfileattrifn_getfilebnameifn_getfiledriveifn_getfileextifn_getfilepath ifn_getpid ifn_getppid ifn_heaviside ifn_ibeta ifn_ibetacifn_idiv ifn_igamma ifn_igammac ifn_igammaeifn_imifn_incifn_int ifn_int2str ifn_invbeta ifn_invchisq ifn_invert ifn_invfdist ifn_invnormalifn_invstudentt ifn_irand ifn_isaninfinifn_iseq ifn_insertstr ifn_isevenifn_isgeifn_isgt ifn_isinfinifn_isleifn_islt ifn_isnanifn_isne ifn_isnear ifn_isneginf ifn_isodd ifn_isprime ifn_juliand ifn_julianm ifn_julianyifn_lcm ifn_leapyear ifn_leftstrifn_ln ifn_lnfact ifn_lngammaifn_log ifn_log10 ifn_logbase ifn_logist ifn_logitifn_lunarphaseifn_maxifn_minifn_mixifn_modf ifn_monthdays ifn_monthname ifn_multiply ifn_negate ifn_normal ifn_normalcdfifn_nowifn_notifn_ordifn_or ifn_padint ifn_permuteifn_p2rxifn_p2ryifn_pos ifn_powerifn_put ifn_rand_ifn_re ifn_real2strifn_r2paifn_r2pr ifn_r2sa1 ifn_r2sa2ifn_r2sr ifn_remainder ifn_rightstrifn_root ifn_round ifn_rrandifn_rtodifn_secifn_sechifn_setransformifn_sgnifn_shlifn_shrifn_signifn_sinifn_sinhifn_s2rxifn_s2ryifn_s2rzifn_sqrifn_sqrtifn_standardizeifn_stringlen_ifn_stringreplaceifn_string2intifn_string2real ifn_studentt ifn_substr ifn_subtractifn_tanifn_tanh ifn_tobase ifn_today ifn_tolower ifn_toupperifn_trim ifn_triml ifn_trimr ifn_truncifn_vmax ifn_vmean ifn_vmedianifn_vmin ifn_vquantile ifn_vstdevifn_vsum ifn_vsumsq ifn_vvariance ifn_waitpid ifn_weekdayifn_weekdaynameifn_xor ifn_yeardayifn_zetaifn_endifn_type ifn_undefifn_absifn_addifn_and ifn_arccos ifn_arccosh ifn_arccot ifn_arccoth ifn_arccsc ifn_arccsch ifn_arcsec ifn_arcsech ifn_arcsin ifn_arcsinh ifn_arctan ifn_arctanhifn_arg ifn_argcount_ ifn_argstring ifn_besseli ifn_besselj ifn_besselk ifn_besselyifn_beta ifn_bool2strifn_ceil ifn_chisqifn_chr ifn_clockseedifn_combifn_complementifn_complementn ifn_concatifn_cosifn_coshifn_cotifn_cothifn_cscifn_cschifn_decifn_defaultoutifn_defaultplotifn_deletesubstr ifn_delta ifn_direxists ifn_divide ifn_dms2d ifn_dms2rifn_dmy2julianifn_dtor ifn_earthdist ifn_envcount ifn_envstringifn_eofifn_eolnifn_erfifn_erfcifn_exec ifn_existsifn_expifn_fact ifn_fdist ifn_filesize ifn_findfirst ifn_findnext ifn_fisher ifn_fisherinv ifn_floorifn_forkifn_formatdateifn_frac ifn_freeparam ifn_fsearch ifn_gammaifn_gcd ifn_getdir ifn_getenvifn_getfileattrifn_getfilebnameifn_getfiledriveifn_getfileextifn_getfilepath ifn_getpid ifn_getppid ifn_heaviside ifn_ibeta ifn_ibetacifn_idiv ifn_igamma ifn_igammac ifn_igammaeifn_imifn_incifn_int ifn_int2str ifn_invbeta ifn_invchisq ifn_invert ifn_invfdist ifn_invnormalifn_invstudentt ifn_irand ifn_isaninfinifn_iseq ifn_insertstr ifn_isevenifn_isgeifn_isgt ifn_isinfinifn_isleifn_islt ifn_isnanifn_isne ifn_isnear ifn_isneginf ifn_isodd ifn_isprime ifn_juliand ifn_julianm ifn_julianyifn_lcm ifn_leapyear ifn_leftstrifn_ln ifn_lnfact ifn_lngammaifn_log ifn_log10 ifn_logbase ifn_logist ifn_logitifn_lunarphaseifn_maxifn_minifn_mixifn_modf ifn_monthdays ifn_monthname ifn_multiply ifn_negate ifn_normal ifn_normalcdfifn_nowifn_notifn_ordifn_or ifn_padint ifn_permuteifn_p2rxifn_p2ryifn_pos ifn_powerifn_put ifn_rand_ifn_re ifn_real2strifn_r2paifn_r2pr ifn_r2sa1 ifn_r2sa2ifn_r2sr ifn_remainder ifn_rightstrifn_root ifn_round ifn_rrandifn_rtodifn_secifn_sechifn_setransformifn_sgnifn_shlifn_shrifn_signifn_sinifn_sinhifn_s2rxifn_s2ryifn_s2rzifn_sqrifn_sqrtifn_standardizeifn_stringlen_ifn_stringreplaceifn_string2intifn_string2real ifn_studentt ifn_substr ifn_subtractifn_tanifn_tanh ifn_tobase ifn_today ifn_tolower ifn_toupperifn_trim ifn_triml ifn_trimr ifn_truncifn_vmax ifn_vmean ifn_vmedianifn_vmin ifn_vquantile ifn_vstdevifn_vsum ifn_vsumsq ifn_vvariance ifn_waitpid ifn_weekdayifn_weekdaynameifn_xor ifn_yeardayifn_zetaifn_endjk kkk(k4k?kKkVkbkmkykkkkkkkkkkkklll$l,l:lClRlblmlul~llllllllllllmmm'm5mBmPmXmamimrm{mmmmmmmmmmmmn nn'n1n9nDnOn_npnnnnnnnnnnnno ooo)o5oBoMoZohoxooooooooooooop pp#p/p;pGpOp\phpopzpppppppppppppqqq(q6q>qFqNqUq`qlquq~qqqqqqqqqqqqqr rrr&r.r7rGrOrWr_rhrpryrrrrrrrrrrrs ss"s+s6s@sLsXsasksusssssssssssss ttt'tk kkk(k4k?kKk Vk bk mk yk kkkkkkkkkkklll$l,l:lClRl bl!ml"ul#~l$l%l&l'l(l)l*l+l,l-l.l/m0m1m2'm't35m4Bm5Pm6Xm7am8im9rm:{m;m<m=m>m?m@mAmBmCmDmEmFnG nHnI'nJ1nK9nLDnMOnN_nOpnPnQnRnSnTnUnVnWnXnYnZn[o\ oho]o^o_)o`5oaBobMocZodhoexofogoiojokolomonooopoqorps ptpu#pv/pw;pxGpyOpz\p{hp|op}zp~ppppppppppppqqq(q>q6qNqFqlquqUq`q~qqqqqqqqqqqqqr rrryrrr&r.r7rGrOrWr_rhrprrrrrrrrrs ss"s+s6s@sLsXsasksusjssssssssssss ttt ifn_rangeaifn_absifn_addifn_and ifn_arccos ifn_arccosh ifn_arccot ifn_arccoth ifn_arccsc ifn_arccsch ifn_arcsec ifn_arcsech ifn_arcsin ifn_arcsinh ifn_arctan ifn_arctanhifn_arg ifn_argcount_ ifn_argstring ifn_besseli ifn_besselj ifn_besselk ifn_besselyifn_beta ifn_bool2strifn_ceil ifn_chisqifn_chr ifn_clockseedifn_combifn_complementifn_complementn ifn_concatifn_cosifn_coshifn_cotifn_cothifn_cscifn_cschifn_decifn_defaultoutifn_defaultplotifn_deletesubstr ifn_delta ifn_direxists ifn_divide ifn_dms2d ifn_dms2rifn_dmy2julianifn_dtor ifn_earthdist ifn_envcount ifn_envstringifn_eofifn_eolnifn_erfifn_erfcifn_exec ifn_existsifn_expifn_fact ifn_fdist ifn_filesize ifn_findfirst ifn_findnext ifn_fisher ifn_fisherinv ifn_floorifn_forkifn_formatdateifn_frac ifn_freeparam ifn_fsearch ifn_gammaifn_gcd ifn_getdir ifn_getenvifn_getfileattrifn_getfilebnameifn_getfiledriveifn_getfileextifn_getfilepath ifn_getpid ifn_getppid ifn_heaviside ifn_ibeta ifn_ibetacifn_idiv ifn_igamma ifn_igammac ifn_igammaeifn_imifn_incifn_int ifn_int2str ifn_invbeta ifn_invchisq ifn_invert ifn_invfdist ifn_invnormalifn_invstudentt ifn_irand ifn_isaninfinifn_iseq ifn_insertstr ifn_isevenifn_isgeifn_isgt ifn_isinfinifn_isleifn_islt ifn_isnanifn_isne ifn_isnear ifn_isneginf ifn_isodd ifn_isprime ifn_juliand ifn_julianm ifn_julianyifn_lcm ifn_leapyear ifn_leftstrifn_ln ifn_lnfact ifn_lngammaifn_log ifn_log10 ifn_logbase ifn_logist ifn_logitifn_lunarphaseifn_maxifn_minifn_mixifn_modf ifn_monthdays ifn_monthname ifn_multiply ifn_negate ifn_normal ifn_normalcdfifn_nowifn_notifn_ordifn_or ifn_padint ifn_permuteifn_p2rxifn_p2ryifn_pos ifn_powerifn_put ifn_rand_ifn_re ifn_real2strifn_r2paifn_r2pr ifn_r2sa1 ifn_r2sa2ifn_r2sr ifn_remainder ifn_rightstrifn_root ifn_round ifn_rrandifn_rtodifn_secifn_sechifn_setransformifn_sgnifn_shlifn_shrifn_signifn_sinifn_sinhifn_s2rxifn_s2ryifn_s2rzifn_sqrifn_sqrtifn_standardizeifn_stringlen_ifn_stringreplaceifn_string2intifn_string2real ifn_studentt ifn_substr ifn_subtractifn_tanifn_tanh ifn_tobase ifn_today ifn_tolower ifn_toupperifn_trim ifn_triml ifn_trimr ifn_truncifn_vmax ifn_vmean ifn_vmedianifn_vmin ifn_vquantile ifn_vstdevifn_vsum ifn_vsumsq ifn_vvariance ifn_waitpid ifn_weekdayifn_weekdaynameifn_xor ifn_yeardayifn_zetaifn_end ifn_rangejifn_absifn_addifn_and ifn_arccos ifn_arccosh ifn_arccot ifn_arccoth ifn_arccsc ifn_arccsch ifn_arcsec ifn_arcsech ifn_arcsin ifn_arcsinh ifn_arctan ifn_arctanhifn_arg ifn_argcount_ ifn_argstring ifn_besseli ifn_besselj ifn_besselk ifn_besselyifn_beta ifn_bool2strifn_ceil ifn_chisqifn_chr ifn_clockseedifn_combifn_complementifn_complementn ifn_concatifn_cosifn_coshifn_cotifn_cothifn_cscifn_cschifn_decifn_defaultoutifn_defaultplotifn_deletesubstr ifn_delta ifn_direxists ifn_divide ifn_dms2d ifn_dms2rifn_dmy2julianifn_dtor ifn_earthdist ifn_envcount ifn_envstringifn_eofifn_eolnifn_erfifn_erfcifn_exec ifn_existsifn_expifn_fact ifn_fdist ifn_filesize ifn_findfirst ifn_findnext ifn_fisher ifn_fisherinv ifn_floorifn_forkifn_formatdateifn_frac ifn_freeparam ifn_fsearch ifn_gammaifn_gcd ifn_getdir ifn_getenvifn_getfileattrifn_getfilebnameifn_getfiledriveifn_getfileextifn_getfilepath ifn_getpid ifn_getppid ifn_heaviside ifn_ibeta ifn_ibetacifn_idiv ifn_igamma ifn_igammac ifn_igammaeifn_imifn_incifn_int ifn_int2str ifn_invbeta ifn_invchisq ifn_invert ifn_invfdist ifn_invnormalifn_invstudentt ifn_irand ifn_isaninfinifn_iseq ifn_insertstr ifn_isevenifn_isgeifn_isgt ifn_isinfinifn_isleifn_islt ifn_isnanifn_isne ifn_isnear ifn_isneginf ifn_isodd ifn_isprime ifn_juliand ifn_julianm ifn_julianyifn_lcm ifn_leapyear ifn_leftstrifn_ln ifn_lnfact ifn_lngammaifn_log ifn_log10 ifn_logbase ifn_logist ifn_logitifn_lunarphaseifn_maxifn_minifn_mixifn_modf ifn_monthdays ifn_monthname ifn_multiply ifn_negate ifn_normal ifn_normalcdfifn_nowifn_notifn_ordifn_or ifn_padint ifn_permuteifn_p2rxifn_p2ryifn_pos ifn_powerifn_put ifn_rand_ifn_re ifn_real2strifn_r2paifn_r2pr ifn_r2sa1 ifn_r2sa2ifn_r2sr ifn_remainder ifn_rightstrifn_root ifn_round ifn_rrandifn_rtodifn_secifn_sechifn_setransformifn_sgnifn_shlifn_shrifn_signifn_sinifn_sinhifn_s2rxifn_s2ryifn_s2rzifn_sqrifn_sqrtifn_standardizeifn_stringlen_ifn_stringreplaceifn_string2intifn_string2real ifn_studentt ifn_substr ifn_subtractifn_tanifn_tanh ifn_tobase ifn_today ifn_tolower ifn_toupperifn_trim ifn_triml ifn_trimr ifn_truncifn_vmax ifn_vmean ifn_vmedianifn_vmin ifn_vquantile ifn_vstdevifn_vsum ifn_vsumsq ifn_vvariance ifn_waitpid ifn_weekdayifn_weekdaynameifn_xor ifn_yeardayifn_zetaifn_endˇׇ'3>JR`nzLjψ݈!)2:CKZj{ʉ؉ )1:DQ_lwʊԊ܊$3CNZhr}̋؋ %3<JU^gs|ƌҌތ )1;GR\ks{ˍٍ!)3;ELYbkuɎюڎ %.7?HXgyŏΏُ"+5AJXclwʐˇׇ     '3>JR`nzLjψ݈ !"#!$)%2&:'C(K)Z*j+{,-./012ʉʐ3؉45678 9:;)<1=:>D?Q@_AlBwCDEFGHIʊJԊK܊LMNOP$Q3RCSNTZUhVrW}XYZ[\h<]^_̋`؋abcd ef%g3iJjUk^lgmsn|opqrstuƌvҌwތxyz{ |}~)1;GR\ks{ˍٍ!)3Ybku;EL%.Ɏюڎ 7?HyXgŏΏُ"+5AJXclw ifn_typesa ifn_undefifn_absifn_addifn_and ifn_arccos ifn_arccosh ifn_arccot ifn_arccoth ifn_arccsc ifn_arccsch ifn_arcsec ifn_arcsech ifn_arcsin ifn_arcsinh ifn_arctan ifn_arctanhifn_arg ifn_argcount_ ifn_argstring ifn_besseli ifn_besselj ifn_besselk ifn_besselyifn_beta ifn_bool2strifn_ceil ifn_chisqifn_chr ifn_clockseedifn_combifn_complementifn_complementn ifn_concatifn_cosifn_coshifn_cotifn_cothifn_cscifn_cschifn_decifn_defaultoutifn_defaultplotifn_deletesubstr ifn_delta ifn_direxists ifn_divide ifn_dms2d ifn_dms2rifn_dmy2julianifn_dtor ifn_earthdist ifn_envcount ifn_envstringifn_eofifn_eolnifn_erfifn_erfcifn_exec ifn_existsifn_expifn_fact ifn_fdist ifn_filesize ifn_findfirst ifn_findnext ifn_fisher ifn_fisherinv ifn_floorifn_forkifn_formatdateifn_frac ifn_freeparam ifn_fsearch ifn_gammaifn_gcd ifn_getdir ifn_getenvifn_getfileattrifn_getfilebnameifn_getfiledriveifn_getfileextifn_getfilepath ifn_getpid ifn_getppid ifn_heaviside ifn_ibeta ifn_ibetacifn_idiv ifn_igamma ifn_igammac ifn_igammaeifn_imifn_incifn_int ifn_int2str ifn_invbeta ifn_invchisq ifn_invert ifn_invfdist ifn_invnormalifn_invstudentt ifn_irand ifn_isaninfinifn_iseq ifn_insertstr ifn_isevenifn_isgeifn_isgt ifn_isinfinifn_isleifn_islt ifn_isnanifn_isne ifn_isnear ifn_isneginf ifn_isodd ifn_isprime ifn_juliand ifn_julianm ifn_julianyifn_lcm ifn_leapyear ifn_leftstrifn_ln ifn_lnfact ifn_lngammaifn_log ifn_log10 ifn_logbase ifn_logist ifn_logitifn_lunarphaseifn_maxifn_minifn_mixifn_modf ifn_monthdays ifn_monthname ifn_multiply ifn_negate ifn_normal ifn_normalcdfifn_nowifn_notifn_ordifn_or ifn_padint ifn_permuteifn_p2rxifn_p2ryifn_pos ifn_powerifn_put ifn_rand_ifn_re ifn_real2strifn_r2paifn_r2pr ifn_r2sa1 ifn_r2sa2ifn_r2sr ifn_remainder ifn_rightstrifn_root ifn_round ifn_rrandifn_rtodifn_secifn_sechifn_setransformifn_sgnifn_shlifn_shrifn_signifn_sinifn_sinhifn_s2rxifn_s2ryifn_s2rzifn_sqrifn_sqrtifn_standardizeifn_stringlen_ifn_stringreplaceifn_string2intifn_string2real ifn_studentt ifn_substr ifn_subtractifn_tanifn_tanh ifn_tobase ifn_today ifn_tolower ifn_toupperifn_trim ifn_triml ifn_trimr ifn_truncifn_vmax ifn_vmean ifn_vmedianifn_vmin ifn_vquantile ifn_vstdevifn_vsum ifn_vsumsq ifn_vvariance ifn_waitpid ifn_weekdayifn_weekdaynameifn_xor ifn_yeardayifn_zetaifn_endv ifn_typesj ifn_undefifn_absifn_addifn_and ifn_arccos ifn_arccosh ifn_arccot ifn_arccoth ifn_arccsc ifn_arccsch ifn_arcsec ifn_arcsech ifn_arcsin ifn_arcsinh ifn_arctan ifn_arctanhifn_arg ifn_argcount_ ifn_argstring ifn_besseli ifn_besselj ifn_besselk ifn_besselyifn_beta ifn_bool2strifn_ceil ifn_chisqifn_chr ifn_clockseedifn_combifn_complementifn_complementn ifn_concatifn_cosifn_coshifn_cotifn_cothifn_cscifn_cschifn_decifn_defaultoutifn_defaultplotifn_deletesubstr ifn_delta ifn_direxists ifn_divide ifn_dms2d ifn_dms2rifn_dmy2julianifn_dtor ifn_earthdist ifn_envcount ifn_envstringifn_eofifn_eolnifn_erfifn_erfcifn_exec ifn_existsifn_expifn_fact ifn_fdist ifn_filesize ifn_findfirst ifn_findnext ifn_fisher ifn_fisherinv ifn_floorifn_forkifn_formatdateifn_frac ifn_freeparam ifn_fsearch ifn_gammaifn_gcd ifn_getdir ifn_getenvifn_getfileattrifn_getfilebnameifn_getfiledriveifn_getfileextifn_getfilepath ifn_getpid ifn_getppid ifn_heaviside ifn_ibeta ifn_ibetacifn_idiv ifn_igamma ifn_igammac ifn_igammaeifn_imifn_incifn_int ifn_int2str ifn_invbeta ifn_invchisq ifn_invert ifn_invfdist ifn_invnormalifn_invstudentt ifn_irand ifn_isaninfinifn_iseq ifn_insertstr ifn_isevenifn_isgeifn_isgt ifn_isinfinifn_isleifn_islt ifn_isnanifn_isne ifn_isnear ifn_isneginf ifn_isodd ifn_isprime ifn_juliand ifn_julianm ifn_julianyifn_lcm ifn_leapyear ifn_leftstrifn_ln ifn_lnfact ifn_lngammaifn_log ifn_log10 ifn_logbase ifn_logist ifn_logitifn_lunarphaseifn_maxifn_minifn_mixifn_modf ifn_monthdays ifn_monthname ifn_multiply ifn_negate ifn_normal ifn_normalcdfifn_nowifn_notifn_ordifn_or ifn_padint ifn_permuteifn_p2rxifn_p2ryifn_pos ifn_powerifn_put ifn_rand_ifn_re ifn_real2strifn_r2paifn_r2pr ifn_r2sa1 ifn_r2sa2ifn_r2sr ifn_remainder ifn_rightstrifn_root ifn_round ifn_rrandifn_rtodifn_secifn_sechifn_setransformifn_sgnifn_shlifn_shrifn_signifn_sinifn_sinhifn_s2rxifn_s2ryifn_s2rzifn_sqrifn_sqrtifn_standardizeifn_stringlen_ifn_stringreplaceifn_string2intifn_string2real ifn_studentt ifn_substr ifn_subtractifn_tanifn_tanh ifn_tobase ifn_today ifn_tolower ifn_toupperifn_trim ifn_triml ifn_trimr ifn_truncifn_vmax ifn_vmean ifn_vmedianifn_vmin ifn_vquantile ifn_vstdevifn_vsum ifn_vsumsq ifn_vvariance ifn_waitpid ifn_weekdayifn_weekdaynameifn_xor ifn_yeardayifn_zetaifn_endvLV^fnyʤդ(4@LUbku}ƥϥץ)3ALV`oxæ̦צߦ %3=FU^lxҧ +4?KW^fnzɨӨ !*3=FQ^ht˩שߩ !)1:HVcnyƪϪת#-6DQZdnwʫӫܫ'6FS^ks|ƬЬ٬%3?K[coxV^fny    ʤ դ(4@LUbku} !"ƥ#ϥ$ץ%&'()*+),3-A.L/V0`1o2xx3456789æ:̦;צ<ߦ=>?@ AB%C3D=EFFUG^HlIxJKLMNOPҧQRSTUV W+X4Y?ZK[W\^h]f^n_z`abcdeɨfӨgijk lm!n*o3p=qFrQs^thutvwxyz{|}˩~שߩ !)1:HVcnyƪϪת#-6DQZdnʫӫܫw'6FS^ks|ƬLЬ٬%3?K[co ifn_info_recL: ifn_info_recLȷipr_type* ipr_undefipr_array2dataipr_bootstrap_ ipr_chdir ipr_closeipr_copydatavar ipr_datafileipr_data2arrayipr_dec ipr_drawdown ipr_dumpsym ipr_dumptab ipr_erase_ipr_exec ipr_filetime ipr_findquitipr_finishplot ipr_flush_ ipr_getdate ipr_gettimeipr_haltipr_inc ipr_mkdir ipr_openappnd ipr_openread ipr_openwrite ipr_outfile ipr_plotfile ipr_print ipr_printlnipr_ptransformipr_read ipr_readln ipr_rename ipr_rmdiripr_seed ipr_sleep ipr_vsort ipr_write_ ipr_writeln ipr_writeplotipr_writeplotlnipr_endipr_type* ipr_undefipr_array2dataipr_bootstrap_ ipr_chdir ipr_closeipr_copydatavar ipr_datafileipr_data2arrayipr_dec ipr_drawdown ipr_dumpsym ipr_dumptab ipr_erase_ipr_exec ipr_filetime ipr_findquitipr_finishplot ipr_flush_ ipr_getdate ipr_gettimeipr_haltipr_inc ipr_mkdir ipr_openappnd ipr_openread ipr_openwrite ipr_outfile ipr_plotfile ipr_print ipr_printlnipr_ptransformipr_read ipr_readln ipr_rename ipr_rmdiripr_seed ipr_sleep ipr_vsort ipr_write_ ipr_writeln ipr_writeplotipr_writeplotlnipr_end'1@OYcsǺкݺ%-7ER`lyǻлڻ +1@OYcs   *  Ǻкݺ%-7ER`ly !"#ǻ$л'%ڻ'() & ipr_range)ipr_array2dataipr_bootstrap_ ipr_chdir ipr_closeipr_copydatavar ipr_datafileipr_data2arrayipr_dec ipr_drawdown ipr_dumpsym ipr_dumptab ipr_erase_ipr_exec ipr_filetime ipr_findquitipr_finishplot ipr_flush_ ipr_getdate ipr_gettimeipr_haltipr_inc ipr_mkdir ipr_openappnd ipr_openread ipr_openwrite ipr_outfile ipr_plotfile ipr_print ipr_printlnipr_ptransformipr_read ipr_readln ipr_rename ipr_rmdiripr_seed ipr_sleep ipr_vsort ipr_write_ ipr_writeln ipr_writeplotipr_writeplotlnipr_endv ipr_range)ipr_array2dataipr_bootstrap_ ipr_chdir ipr_closeipr_copydatavar ipr_datafileipr_data2arrayipr_dec ipr_drawdown ipr_dumpsym ipr_dumptab ipr_erase_ipr_exec ipr_filetime ipr_findquitipr_finishplot ipr_flush_ ipr_getdate ipr_gettimeipr_haltipr_inc ipr_mkdir ipr_openappnd ipr_openread ipr_openwrite ipr_outfile ipr_plotfile ipr_print ipr_printlnipr_ptransformipr_read ipr_readln ipr_rename ipr_rmdiripr_seed ipr_sleep ipr_vsort ipr_write_ ipr_writeln ipr_writeplotipr_writeplotlnipr_endvTcr| '3?HPZhu,<*Tcr|   *<   '3?HPZhu !"#$%'(),& ipr_types* ipr_undefipr_array2dataipr_bootstrap_ ipr_chdir ipr_closeipr_copydatavar ipr_datafileipr_data2arrayipr_dec ipr_drawdown ipr_dumpsym ipr_dumptab ipr_erase_ipr_exec ipr_filetime ipr_findquitipr_finishplot ipr_flush_ ipr_getdate ipr_gettimeipr_haltipr_inc ipr_mkdir ipr_openappnd ipr_openread ipr_openwrite ipr_outfile ipr_plotfile ipr_print ipr_printlnipr_ptransformipr_read ipr_readln ipr_rename ipr_rmdiripr_seed ipr_sleep ipr_vsort ipr_write_ ipr_writeln ipr_writeplotipr_writeplotlnipr_end ipr_types* ipr_undefipr_array2dataipr_bootstrap_ ipr_chdir ipr_closeipr_copydatavar ipr_datafileipr_data2arrayipr_dec ipr_drawdown ipr_dumpsym ipr_dumptab ipr_erase_ipr_exec ipr_filetime ipr_findquitipr_finishplot ipr_flush_ ipr_getdate ipr_gettimeipr_haltipr_inc ipr_mkdir ipr_openappnd ipr_openread ipr_openwrite ipr_outfile ipr_plotfile ipr_print ipr_printlnipr_ptransformipr_read ipr_readln ipr_rename ipr_rmdiripr_seed ipr_sleep ipr_vsort ipr_write_ ipr_writeln ipr_writeplotipr_writeplotlnipr_endt~ *7FQ]irz '1<HVf+~   *f  *7FQ]irz !" #$t%''<(H)V&1 ipr_info_recC 4 ipr_info_recC  p_work_arrayp p_work_arraypp_work_array_ptrp_work_array_ptr param_class param_classfunc_ptrfunc_ptr arg_a_typex arg_a_type arg_a_ptr arg_a_ptr func_rec func_rec_F,F  xform_class xform_classkeep_ptrkeep_ptr keep_type keep_type X| keep_array:p keep_array:|keep_array_ptrkeep_array_ptrdata_ptrdata_ptr data_type data_type<, data_vars_ptr data_vars_ptr data_vars_typeL data_vars_typeLFFFF F,FF F$ԡ(ԡ,04<8<<<@,DHass_ptrvass_ptrv ass_type ass_type F statement_ptr statement_ptr reduce_ptr reduce_ptr reduce_type v reduce_type ,,v runlist_ptrv runlist_ptrv runlist_type runlist_type , ,F@model_param_ptrvmodel_param_ptrv model_param_type8 model_param_type8,T ,,, ,$,(,,,0`45 model_param_array model_param_arraymodel_param_array_ptrmodel_param_array_ptr model_ptr model_ptr model_typeH model_typeHF@ < $(,048<@GD mplot_ptr mplot_ptr mplot_rec0 mplot_rec0FF 0I0I plot_rec_ptr plot_rec_ptr plot_rec_rec plot_rec_recGG curve_ptr curve_ptr curve_type8 curve_type8G ,G ,$(,04 for_style for_simple for_arrayfor_step for_stepsv for_style for_simple for_arrayfor_step for_stepsv statementsst_undef st_assign st_var_def st_callprocst_if st_repeatst_whilest_for st_compoundst_profilebeginst_profilenext st_break_ st_continuest_exitst_datast_modelst_plot st_multiplotst_curvest_proc_definest_func_definest_call_userprocst_last statementsst_undef st_assign st_var_def st_callprocst_if st_repeatst_whilest_for st_compoundst_profilebeginst_profilenext st_break_ st_continuest_exitst_datast_modelst_plot st_multiplotst_curvest_proc_definest_func_definest_call_userprocst_lastMV`kw}->V k-  w>  }M` statement_type, statement_type,)FF4 ddFF, ,E, $G(GcharsetGcharsetG============-=d8======/ u|==8==== 8X8X-/==X^T^^^^X=====XX/JMd?-=c==7XX====8 8==cnn=M~MHII~MJGdLdL@MCAA5GFGAAGMLELIBSv Reading from  Bad syntax, line  column  of  Unexpectedly came to end of fileThe bad token is: #One of the following was expected: v  v Error at end of file in  Error while parsing line  col Doing: v #Unclosed ' at end of a line or filev'Unclosed " at the end of a line or filevUnclosed comment at end of filev@@&Unexpected token or statement on line Token: vError: gettoken overflow(Bad number format found while scanning ""Token  l:v c:v ->v<-%TCan't assign value of type v to variable of type `+" is not an array and cannot be subscriptedv*Non-integer subscripts found for variable . Type was v%Wrong number of dimensions assigning . Expected v, found Bad subscripts assigning . dimension   range:  to . Found: .Bad type assigned in statementCan't assign to constant 3Cannot assign an array variable/function to scalar v an array variable/function Arg  passed to VAR parameter is the wrong type. It must be  passed as a VAR parameter to Arg passed to VAR parameter  is not an identifier is a constantIncompatable arg (type v) passed for arg number . Type was expected Parse type for %FILE arguments must be VAR parameters4Incorrect number of dimensions in DATAARRAY. Found expected == def assignment of == array assignment to vSubscripted variable "" doesn't existv== assignment statement to v INPUT_NAME INPUT_FIELDv INPUT_LINEINFINITYSetup  field v line Added transform that begins FREQUENCYFREQ0" already exists. It cannot be a DATA variable.created data var # v "var #  Bad argument type to function . Expected: Bad argument type to Undefined function called (Expected a number or scalar of type REAL' doesn't exists, so it can't be reducedv isn't a model parameter.  Cannot REDUCE it Cannot nest ( or [ in WITH lists! cannot include it in a WITH list"Cannot mix () and [] in WITH lists  doesn't exist. It can't be a surface variable.v@ *" exists and cannot be declared as a PARAM.UCI.LCI.VAR (Wrong number of parameters. Called with , expected v, expected from  TEST_DEFAULT$@0 New func: Reading arg  for  func: *" must be previously declared for use hereCall user def function v with argument Identifier v'Couldn't determine the type for symbol v I const: R const: Cmplx const: B const S const C const  Boolean expression was expected Creating model variables.SEv LOGLIKELIHOOD FREE_PARAMSvDELTA_LL ITERATIONSEVALS VCV_EVALSCI_EVALS INVERT_FLAGv CONVERGE_FLAGVCVvCreated model variablesv $Expected a string or string functionA string must follow (Expected a positive constant instead of DFTIMEOvDFTIMECv==== Begin Intrinsic PROCEDURE v Call==== End Intrinsic PROCEDURE *==== Begin user-defined PROCEDURE call to (==== End user-defined PROCEDURE call to == Begin IF THEN stmt  == End IF THEN stmtv== Begin REPEAT stmt== End REPEAT stmt== Begin WHILE stmtv== End WHILE stmt== Begin [P]FOR stmtSTEPS variable must be integerFOR variable () with STEPS must be type REAL== End FOR stmtv== Begin BEGIN...END block== End BEGIN...END block!== Begin PROFILEBEGIN...END block0Integer expression was expected for PROFILE size== End PROFILEBEGIN...END blockv== Begin PROFILENEXT== End PROFILENEXT == BREAK stmt == EXIT stmt== CONTINUE stmt== Begin MODEL stmtv== End MODEL stmt  not allowed here in CURVE== Begin CURVE stmtv== End CURVE stmt== Begin PLOT stmt== End PLOT stmt== Begin MULTIPLOT stmtv,Arguments to MULTIPLOT must integer. Found  and == End MULTIPLOT stmt== Begin INCLUDE==== End INCLUDE== Begin PROCEDURE define stmt== End PROCEDURE define stmt== Begin FUNCTION define stmtRETURN== End FUNCTION define stmtv== Begin DATA stmt== End DATA stmtUnknown statement beginning  -> End Parsing. Begin executionEnd CL, start executionv, ; [ ] ( ) - = == > < >= <= <> ^ * / + : STATIC INTEGER REAL COMPLEX BOOLEAN STRING CHAR FILE DATA FIELD LINE MODEL PMODEL PLOT CURVE MULTIPLOT SURFACE KEY WITH AXES BY PROCEDURE FUNCTION INCLUDE NFUNCTION BFUNCTION IFUNCTION SFUNCTION CMPLX FUNCTION DIST FUNCTION INTRINSIC PROC PFOR FOR STEP STEPS TO IF REPEAT UNTIL WHILE DO VAR PBEGIN BEGIN CONTINUE BREAK EXIT PROFILEBEGIN PROFILENEXT FORM DATA FORM THEN ELSE ELSEIF PARAM COVAR HAZARD RUN LOW HIGH START TEST FORM FULL REDUCE END DIV MOD SHL SHR AND OR XOR NOT TRUE FALSE MLE KEEPIF DROPIF _START END OF FILE MATCH ' MATCH "  COMMENT # END LINE QUOTED STR Character IN IDENT IDENTIFIER END OF LINE  SYMBOL OPERATOR  BAD BOOLEAN const REAL number COMPLEX number INT number  number :K]m~0A\c$ nRzzz->5Far 5Mbwr$ Waiting for child process : erasing child FILE vChild process  returned an error: .res&Error assigning result pipe for data: (Couldn't fork a parallel child process: OUTFILENAMEv.writing to a fileopening for appending FILE vopening for reading FILE opening for writing FILE closing FILE flushing FILE Opening OUTFILE for writingA isn't a data variable. Can't use it as an argument to BOOTSTRAPDRAWDOWN: Can't remove v when the sum of frequencies is @ isn't a data variable. Can't use it as an argument to DRAWDOWNC isn't a data variable. Can't use it as an argument to COPYDATAVARv Argument * to PTRANSFORM was not a variable, it was  to PTRANSFORM was a constant& to PTRANSFORM was not a REAL variable=Argument 3 to PTRANSFORM was not a REAL or INTEGER expression7PTRANSFORM must be called from within a MODEL statementvCan't compare a file type: v+Couldn't determine the type when comparing vIn do_assign_s: ] is type Can't assign to this variableCan't assign to a file type: +Couldn't determine the type when assigning vIn do_assign: sym .. func is type Can't assign to CONSTANT Can't assign a file type: In assign_dataarray:  i= func is args is : Array def dimensions) : Assign  = ...[] = .../Unexpected end of file in READ/READLN statementv3Argument to READ/READLN was not a variable, it was v&Argument to READ/READLN was a constant$Cannot READ/READLN BOOLEAN variablesBad INTEGER format: ""Bad REAL number format: "Bad COMPLEX number format: ",Expected 1 to 3 arguments to GETDATE, found & to GETDATE was not a variable, it is to GETDATE is a constantInvalid argument to GETDATEv-Expected 2 to 7 arguments to FILETIME, found ' to FILETIME was not a variable, it is vto FILETIME is a constant to FILETIME,Expected 1 to 4 arguments to GETTIME, found & to GETTIME was not a variable, it is to GETTIME is a constant to GETTIMEv DATAFILENAMECan't find DATAFILE erasing file  to renaming file changing to directory creating directory vdeleting directory v PLOTFILENAMEPLOTDATAFILENAMEOpening plot file GNUPLOTINITv#FINISHPLOT: plotfile is not definedvpause -1GNUPLOTvPATHGNUPLOT program not found at : Call proc (): Call user procedure : IF: THEN: ELSE: REPEAT: WHILEv00: CURVEv,PLOT statement must be executed before CURVE1Wrong number of dimensions for 2nd or later curvesplot plot  , &3 dimensional CURVE not allowed for: " " using 1:"Too few CURVE expressions. Found  needed at least  axes  title " notitle with  \ set nomultiplotv INTERMPLOT set multiplot set size , set origin v: PLOTpltvPLOTINIT : MULTIPLOTv : PROFILENEXT: PROFILEBEGINFOR loop step size is zero: FOR Can't use  as a FOR variable is wrong type [] for FOR loop variablev: statement block: BREAKv: EXIT : CONTINUEE '  ` 8D   q : G 7 , ! k% ( 9 0  2 4 = 7 @ C c? " } - 0E A +   Y   U f  h  ƹ κ / 7    8      U   T     ^ t   | J  6 ~     ` P F V  @    & " >  n      h 0    d  j  j   x   7  V ( 7    , r 2      Z           E <      Y     ? W      H      u   P      b  M    ! N >     7 0 q  q   x  Q 1    1 y  f  t   % m , ~   J   I              x G    ! n K }  U    R X Q        j ` P R   i   2    8 {    .     d   }  f    :  6 K        &       K     3 transforms parameter p into a new parameter p' as v p' = p (no transformation) p' = p + XB p' = XB/p p <> 0v p' = p/XB XB <> 0 p' = p^XB p' = p^exp(XB)v p' = XB + 1/p p' = exp(XB)/pv pnez p' = 1/[p + exp(XB)] p + exp(XB) <> 0 p' = exp(p + XB)8 0 < p' < INFINITY for NEGINFINITY < (p + XB) < INFINITY p' = p*exp(XB)v NEGINFINITY < p' < INFINITY p' = p*(XB) p' = p*[1 + exp(XB)]& p' = ln[(1 + p + XB)/(1 - p - XB))/2] -1 < p' < 1v, p' = exp[2(p + XB) - 1]/[exp(2(p + XB) + 1]8 p' = 1/[1 + exp(p + XB)] if ALTERNATE_LOGISTIC = FALSEA p' = exp(p + XB)/[1 + exp(p + XB)] if ALTERNATE_LOGISTIC = TRUE1 0 < p' < 1 for NEGINFINITY < (p + XB) < INFINITY( p' = log[exp(p + XB)]/[1 + exp(p + XB)]2where XB is a vector of covariates and parameters. Function (x1, x2, ...)(x)v, returns Procedure , where optional_form is: FORM =  is one ofvD SUMLL -- Takes the log of the likelihood and sums over the data: SUM or SUMMATION -- Sums loglikelihoods over the dataF PROD or PRODUCT -- Takes the product of likelihoods over the data The default is FORM = #A NORMAL hazard model is specified:v PDF NORMAL (t1 t2 t3 t4)/ PARAM mean LOW=0 HIGH=10 START=2 ENDv2 PARAM stdev LOW=0.001 HIGH=2 START=1 END= HAZARD COVAR age PARAM bage LOW=-1 HIGH=1 START=0 END= COVAR sex PARAM bsex LOW=-1 HIGH=1 START=0 END END {pdf}v6A WEIBULL accelerated failure time model is specified: PDF WEIBULL (t1 t2 t3 t4)v8 COVAR age PARAM bage LOW=-1 HIGH=1 START=0 END8 COVAR sex PARAM bsex LOW=-1 HIGH=1 START=0 END END {param mean}' where pdfname is a predefined pdf namev! q - quantile (0 <= q <= 1), left - optional left truncation point. right - optional right truncation point2 parameters are the intrinsic params for pdf% including HAZARD, if allowedPREASSIGN statement , expr END: executes a statement, and then evaluates and returns exprPOSTASSIGN expr, statement END= expr is evaluated (and returned), then statement is executed$INTEGRATE v (expr1, expr2) expr3 END+INTEGRATE v (expr1, expr2, expr4) expr3 ENDv" v is the variable of integration.7 expr1 is evaluated for the lower limit of integration.v7 expr2 is evaluated for the upper limit of integration.v- expr3 is the integrand, and may reference v.? expr4 is convergence criterion, or number of points/iterationsvE INTEGRATE_METHOD = I_TRAP_CLOSED uses closed trapezoidal integrationA INTEGRATE_METHOD = I_TRAP_OPEN uses open trapezoidal integration; INTEGRATE_METHOD = I_SIMPSON uses open simpson integrationvJ INTEGRATE_METHOD = I_AQUAD (default) uses adaptive quadrature integration6 INTEGRATE_METHOD = I_ROMBERG uses Romberg integration3 INTEGRATE_N is the number of iterations (default: v6 INTEGRATE_TOL is the convergence criterion (default: aw̫?:A data array initializes single or multidimensional arrays- :[i TO j] = [, ...]? :[i TO j, ...] = [[, ..., ] [...] ...]v4e.g. i:BOOLEAN[1 TO 4] = [TRUE, FALSE, FALSE, TRUE]7e.g. i:INTEGER[1 TO 2, 1 TO 3] = [[1, 2, 3] [4, 5, 6]]v DERIVATIVE v = expr1, expr2 END&DERIVATIVE v = expr1, expr2, expr3 END(DERIVATIVE (expr4) v = expr1, expr2 END.DERIVATIVE (expr4) v = expr1, expr2, expr3 END& v is the variable of differentiation.8 expr1 is the value at which to evaluate the derivative.; expr2 is the expression for which the derivative is found.v< expr3 (if any) is the largest (initial) value of dx to use.1 otherwise DIFF_DX is used for dx (default:; expr4 (if any) is the order of the derivative to be found.v!FINDMIN v (expr1, expr2) expr END(FINDMIN v (expr1, expr2, expr3) expr END/FINDMIN v (expr1, expr2, expr3, expr4) expr ENDv6FINDMIN v (expr1, expr2, expr3, expr4, expr5) expr END v is variable to search over.+ expr1 is the lowest bounds in v to search.v, expr2 is the highest bounds in v to search.( expr3 is the starting value of v to use$ expr4 is the convergence criterion.+ expr5 is the maximum number of iterations.v' expr is the function (of v) to search.v"FINDZERO v (expr1, expr2) expr END)FINDZERO v (expr1, expr2, expr3) expr END0FINDZERO v (expr1, expr2, expr3, expr4) expr END' v is variable to search for zero over.v$ expr3 is the convergence criterion.+ expr4 is the maximum number of iterations.v2 expr is the function (of v) whose zero is sought.+SUMMATION i (expr1, expr2, expr4) expr3 ENDv$SUMMATION i (expr1, expr2) expr3 END i is the variable of summation.2 expr1 is evaluated for the lower summation limit.2 expr2 is evaluated for the upper summation limit.2 expr3 (may reference i) is summed over the limits+ expr4 is an optional convergence criterionv"PRODUCT i (expr1, expr2) expr3 END)PRODUCT i (expr1, expr2, expr4) expr3 END6 expr3 (may reference i) is multiplied over the limits, expr4 is an optional convergence criterion.1The IF function conditionally returns expressions#IF bexpr1 THEN expr2 ELSE expr3 ENDv:IF bexpr1 THEN expr2 ELSEIF bexpr4 THEN ... ELSE expr3 END7 Evaluates and returns expr2 if boolean bexpe1 is true;v8 otherwise evaluates and returns expr3. The second form2 allows multiple levels of conditional evaluation.LEVEL expr1 THEN optional_form' [BEGIN END [,]]v expr2v' [[,] BEGIN END]v ENDv6 Computes a nested likelihood by evaluating expr2 over9 all observations while expr1 is true. The likelihood is9 returned as a single likelihood when the condition fails#LEVELDELTA expr1 THEN optional_formv+ [BEGIN END [,]]v expr2v+ [[,] BEGIN END]v ENDv9 Computes a nested likelihood while expr1 does not change7 The nested likelihood (expr2) is returned as a single v likelihood when expr1 changes.vDATA PDATA optional_form [BEGIN END [,]]v exprv [[,] BEGIN END]vENDv@ Computes a likelihood over the current data. Expr is evaluatedL over all observations. The sum or product of the (logged) data is computed=Simple functions have 0 or more arguments and return a value.?Arguments are enclosed in parenthesis. E.g. SIN(x), ROOT(16, 2)v=Type mle -h FUNCTIONS for a complete list of simple functionsUser defined functions) FUNCTION : END> FUNCTION (:, . . .): ENDB FUNCTION (VAR :, . . .): ENDA is the formal name of the argument within the procedure* is a type (INTEGER, REAL, etc.)7 the variable RETURN is defined for the return valuev@ VAR passes the variable so it can be modified for the caller1e.g FUNCTION triple(v:REAL):REAL RETURN=v*3 END% PARAM p END: p is a parameter to be estimated. may containF LOW = expr HIGH = expr START = expr TEST = expr FORM = param_form0 covarlist is 0 or more covariates specified as: COVAR expr1 expr27Returns the p-pdf (the density for a given probability)vPPDF pdfname(q) parameters END+PPDF pdfname(q, left, right) parameters ENDv Example: % PPDF NORMAL(0.025, 0, 100) 4, 1 END-Returns the pdf, cdf, sdf, or hazard functionPDF pdf_spec END+ where pdf_spec is a pdf type, for example:v%Returns the quantile density functionQDF pdfname(q) parameters END*QDF pdfname(q, left, right) parameters END$ QDF NORMAL(0.025, 0, 100) 4, 1 END9Returns the p-hazard (the hazard for a given probability)!PHAZARD pdfname(q) parameters END.PHAZARD pdfname(q, left, right) parameters END PHAZARD NORMAL(0.025) 4, 1 ENDReturns the quantile function"QUANTILE pdfname(q) parameters END/QUANTILE pdfname(q, left, right) parameters ENDv Examples: ) QUANTILE NORMAL(0.025, 0, 100) 4, 1 END" QUANTILE WEIBULL(RAND) 10, 2 ENDInformation unavailable for ! gamma(x) is the gamma function4 Phi(x) is the standard cumulative normal function= phi(x) is the standard normal probability density function vwhere z = (t - a)/bvwhere z = (-t - a)/b! psi(x) is the digamma function# psi'(x) is the trigamma functionv/ igamma(x,y) is the incomplete gamma functionv- ibeta(x,y) is the incomplete beta function" BetaF(x,y) is the beta function is rounded to an integer;f(t)=(c/b)*z^(c - 1)/[(1 + z^c)^2]; S(t)=1 - 1/[1 + z^(-c)]v@mean=a + (b*pi/c)*csc(pi/c); mode=a + b*root[(c - 1)/(c + 1), c]Emedian=a + b; var=b^2*(2*pi/c)*csc(2*pi/c) - b^2*[(pi/c)*csc(pi/c)]^2t(q) = a + b*root[q/(1 - q),c]3f(t)=exp(z)/[b*(1 + exp(z))^2]; S(t)=1/[1 + exp(z)]v.mean = mode = median = a; var = (pi^2)*(b^2)/3;f(t)=exp[-(z^2)/2]/sqrt(b*2*pi) = phi(z); S(t) = 1 - Phi(z)vmean=median=mode=m; var=b^2v(f(t)={phi[(t - a)/b] + phi[(t + a)/b]}/b+S(t) = 1 - Phi[(t - a)/b] + Phi[(-t - a)/b]v#Dist for |t| where t ~ normal(a, b)v2f(t)=exp[-(log(t) - a)^2/(2*b^2)]/[t*b*sqrt(2*pi)]"call m=exp(a) and w=exp(b^2) then:>mean=m*exp(0.5b^2); median=m, mode=m/w, variance=w*(w - 1)*m^20f(t)=b*exp[-(z^2)/2]/[sqrt(b*2*pi)*(x^2)*Phi(t)]&S(t) = 1 - Phi(a - b/t)/[Phi(a)*(t^2)]mode=b*[sqrt(a^2 + 8) - a]/42Bivariate normal distribution with five parameters mx - mean of x  sx - sd of x my - mean of y sy - sd of y r - Correlation2, 4, 6, or 8 arguments:x1, y1: gives pdf;x1, y1, x2, y2: if x1<>x2 and y1<>y2 gives rectangular areav; if x1=x2 and y1<>y2 gives plane over y at xv; if x1<>x2 and y1=y2 gives plane over x at yv, if x1=x2 and y1=y2 gives pdf5x1, y1, x2, y2, x3, y3: aslo left truncated at x3, y3>x1, y1, x2, y2, x3, y3, x4, y4: also right truncated at x4, y4 f(t)=h*exp(-t*h); S(t)=exp(-t*h),mode=0; mean=1/h; median=log(2)/h; var=1/h^2f(t)=exp(-z)/b; S(t)=exp(-z)0mode=a; mean=a + b; median=a + b*log(2); var=b^23The uniform/rectangular has no intrinsic parametersv9so that left and right truncation times must be specified:Or, if not specified, t(right) = a = 0 and t(left) = w = 1$f(t)=1/(w - a); S(t)=(w - t)/(w - a))mean=median=(a + b)/2; var=[(b - a)^2]/127Returns 0 if exact failure or interval censored failurev7Returns 1 if right censored or t(close)>=t(right trunc)vh(t)=07Returns 1 if exact failure or interval censored failurev7Returns 0 if right censored or t(close)>=t(right trunc)vAh(t)=a*exp(b*t); S(t)=exp{(a/b)*[1 - exp(b*t)])}; f(t)=h(t)*S(t)= 0+h(t) = p(t)a1 + (1 - p(t))a2 + a3*exp(b3*t)vf(t)=1/[pi*b*{1 + z^2}]vS(t)=0.5 - (1/pi)*arctan(z)v'mode = median = a; moments do not existv?This is the type 1 largest extreme value (Gumbel) distribution:v"f(t) = (1/b)*exp(-z)*exp[-exp(-z)]S(t) = 1 - exp[-exp(-z)]7mean = a+b*0.57721; median = a-b*log[log(2)]; mode = a;vvar = (pi^2)*(b^2)/67This is the type 1 smallest extreme value distribution:v9f(t) = (1/b)*exp(z)*exp[-exp(z)]; S(t) = 1 - exp[-exp(z)]S(t) = 1 - exp[-exp(z)]v;mean = a - b*0.57721; median = a + b*log[log(2)]; mode = a;v6This is the type 2 largest extreme value distribution: f(t) = c*z^(-c - 1)*exp(-z)^(-c)S(t) = 1 - exp[-z^(-c)]v7This is the type 2 smallest extreme value distribution:vS(t) = exp[-z^(-c)]v8f(t) = (b*a^b)/[t^(b + 1)]; S(t) = (a/t)^b; h(t) = b/t@mean = b*a/(b - 1) for b>1; var = b*a/[(b - 2)(b - 1)^2] for b>2mode = a median = a*2^(1/b)v#Stable distributions have 0 < b < 2v6a is the characteristic life ~= 63.2th % in units of aCf(t) = S(t)h(t); S(t) = exp[-(t/a)^b]; h(t) = [b*t^(b - 1)]/(a^b)vHmean = a*gamma[1 + 1/b]; var = (a^2)*(gamma[1 + 2/b] - gamma[1 + 1/b]^2)Jmode = a*(1 - 1/b)^(1/b) for b>1; mode = 0 for b<=1; median = a*log(2)^0.5#h is the underlying constant hazardv/c describes the distribution of h ~ gamma(c, c)v$f(t) = h*c^(c + 1)/(h*t + c)^(c + 1).S(t) = [c/(c + h*t)]^c; h(t) = [b*c/(h*t + c)]*mean hazard = h); Variance in hazard = 1/c a (scale)Af(t) = [t/(a^2)]*exp[-(t^2)/(2*a^2)]; S(t) = exp[-(t^2)/(2*a^2)]h(t) = t/(a^2)Lmean = a*(pi/2)^0.5; var = (2 - pi/2)*a^2; mode = a; median = a*[log(4)^0.5]2Distribution of a series of 2 exponential failures*f(t) = a*b*[exp(-a*t) - exp(-b*t)]/(b - a)*S(t) = [b*exp(-a*t) - a*exp(-b*t)]/(b - a)0mean = 1/a + 1/b ; variance = 1/(a^2) + 1/(b^2)mode = 0= 0; t >= 0 n >= 0v*Right and left truncation is not availableL = Bin(n0, na){[1-S(a)]^(n0-na)}{[S(a)-S(am)]^(na)}/[1-s(am)]-where s(x) = exp(-r*x), and am = ln(nm/n0)/-r6Constraints: all parameters and variables must be >= 0$Right truncation is ignored if d = 06Not enough variables are passed to FDEPLETE. 3 needed.t is an outcome variable, which is zero or onereturns p if outcome = 1 returns 1 - p if outcome = 0 mean = p; var = pq4f(t) = (gamma((v + w)/2)*(v/w)^(v/2)*x^((v - 2)/2))/: (gamma(v/2)*gamma(w/2)*(1 + x*(v/w))^((v + w)/2)),S(t) = 1 - ibeta( 1/(1 + b/(a*x)), a/2, b/2)>mean = b/(b - 2) for b>2; mode = b*(a - 2)/(a*(b - 2)) for a>2-var = 2*b^2*(a + b - 2)/[a*(b - 2)^2*(b - 4)]Gf(t) = gamma((a + 1)/2)/(sqrt(PI*a)*gamma(a/2)*(1 + t*t/a)^((a + 1)/2))v8S(t) = [1 + sign(ibeta(t^2/(a + t^2), 0.5, 0.5*a), t)]/21mean = mode = median = 0; var = a/(a - 2) for a>2Ef(t) = t^(a - 1)*(1 - t)^(b - 1)/BetaF(a,b); S(t) = 1-ibeta(t, a, b)9mean = a/(a + b); mode = (a - 1)/(a + b - 2) for a>1, b>1!var = a*b/[(a + b - 1)*(a + b)^2]Gf(t) = [h^c]t^(c - 1)/[gamma(c)exp(h*t)]; S(t) = igamma(c,h*t)/gamma(c)v>mean = c/h; var = c/(h^2); mode = (c-1)/h for c>=1 otherwise 0>f(t) = [z^(c - 1)]exp(-z)/[b*gamma(c)]; S(t) = 1 - igamma(c, z7mean = a + b*c; var = c*b^2; mode = a+ b*(c-1) for c>=1vBf(t) = {[(ln(t) - a)/b]^(c - 1)}{exp[-(ln(t) - a)/b]}/[b*gamma(c)]"S(t) = 1 - igamma(c, (ln(t) - a)/b 2 or 0 for a <= 2; var = 2a*b^23f(t) = exp[-(t^c)/2]/[b*2^(1 + 1/c)*gamma(1 + 1/c)]v0S(t) = [1 - sign[igamma(1/c, 0.5*z^c)], t - a]/2Cmean = median = mode = a; var = (b^2)*2^(2/c)*gamma(3/c)/gamma(1/c)v-f(t) = (b/t)^(a+1)*[2^(1-a/2)]/[b*gamma(a/2)]#S(t) = 1 - igamma[c/2, 0.5*(b/t)^2]v@mean = gamma[(a-1)/2]*b/[sqrt(2)*gamma(a/2)]; mode = b/sqrt(a+1)var = (b^2)/(a-2) - mean^28f(t) = [z^(c-1)]*exp(-0.5*z^2)*[2^1-c/2)]/[b*gamma(c/2)]S(t) = 1 - igamma[c/2, 0.5*z^2]v,mean = a+sqrt(2)*b*gamma[(c+1)/2]/gamma(c/2)*mode = a+b*sqrt(c-1) for c>1 or a for c> 1var = Kf(t) = (z^2)*exp(-z*2)*4/[sqrt(pi)*b]; S(t) = erf(z)-z*exp(-z^2)*2/sqrt(pi)v8mean = a+2*b/sqrt(pi); median ~= a+1.12531*b; mode = a+bvar = (3/2 - 4/pi)*b^25f(t) = 1/{pi*sqrt[t*(1-t)]}; S(t) = arccos[2t-1]*2/pi#mean = median = 1/2; mode = 0 and 1v var = 1/8*f(t) = [(a+b-t)^(c-1)]*c/b; S(t) = (1-z)^c*mean = a+b/(c+1)); median = a+b-b*2^(-1/c)0mode = a for c>1 or a+b/2 for c=1 or a+b for c<1var = (c*b^2)/[(c+2*)(c+1)^2]"f(t) = (c/b)*z^(c-1); S(t) = 1-z^c)mean = a+b*c/(c+1); median = a+b*2^(-1/c)0mode = a+b for c>1 or a+b/2 for c=1 or a for c<1#f(t) = 1/(1+t)^2 ; S(t) = 1-t/(1-t)v&mean = var = +oo; median = 1; mode = 01f(t) = c*(b^c)/(t-a)^(c+1); S(t) = [(t-a)/b]^(-c)1; median = a+b*2^(1/c); mode = a+bvar = c*(b^2)/[(c-2)(c-1)^2]Kf(t) = exp{-[log(z)^2]/(2*c^2)}/[(t-a)*c*sqrt(2*pi)]; S(t) = 1-Phi(ln(z)/c)v;mean = a+b*exp(0.5*z^2); median = a+b; mode = a+b*exp(-c^2)v!var = (b^2)*exp(c^2)*[exp(c^2)-1]/f(t) = [z^(c-1)]exp(-z^c)*c/b; S(t) = exp(-z^c)v1mean = a+b*gamma(1+1/c); median = a+b*ln(2)^(1/c)0mode = a+b*[(c-1)/c]^(1/c) for c>1 or a for c<=1*var = (b^2)[gamma(1+2/c) - gamma(1+1/c)^2]1 or c for b<=1v"var = (c^2)(a+b-1)b/[(a-2)(a-1)^2]5f(t) = (c^b)*[t^(a - 1)]/[betaf(a,b)*(t + c)^(a + b)]S(t) = iBeta(t/(t - a), a, b)1, 0 a<=0,var = a*(c^2)*(a + b - 1)/[(b - 2)(b - 1)^2]9f(t) = exp[-(t/b)^c]*[t^(a*c - 1)]*c/{[b^(a*c)]*gamma(a)}S(t) = 1 - igamma[a, (t/b)^c] mean = b*gamma(a + 1/c)/gamma(a)4mode = b*(a*c - 1/c)^(1/c) for a*c>1 or 0 for a*c<=15The inverted gamma is a Pearson's type V distributionHf(t) = exp(-b/t)*[(b/t)^(a + 1)]/[b*gamma(a)]; S(t) = 1 - igamma[a, b/t]"mean = b/(a - 1); mode = b/(a + 1)var = (b^2)/[(a - 2)(a - 1)^2]IHORSESHOE family includes symmetric quad, quart, and sextic distributionsDf(t) = (c + 1)(z^c)/(2*b); S(t) = 1 - [1 + z^(c + 1)]/2 for a a or 1 - exp(z)/2 for t <= av&mean = median = mode = a; var = 2*b^2 : (v) v0 <  < +oo0 <=  <= 1-1 <= 1 <=  >= aa >=  <= ata <  < tw >=  + v <=  + 4*-pi < (v)/ < pi - v-oo < #max(0, m-n+n*p) <= t <= min(m, n*p)v < 2*pivUnknown constraints on vdiscrete continuous4 < variables: t(open), t(close), t(left trunc), t(right trunc)#Exact failure when t(open)=t(close)vRange: v8 9 variables: tx(open), ty(open), tx(close), ty(close)F tx(ltrunc), ty(ltrunc), tx(rtrunc), ty(rtrunc) DistributionNo intrinsic parameters:PDF/SDF info unavailable.Covariate effects may be modeled on the hazard2Covariates effects cannot be modeled on the hazard couldn't call PDF v couldn't call SDF v (|  leftt=v rightt=./fd0/./fd1/./.HOME//./v/..//..vDfHfPfXfv SearchRec" E SearchRec"FF`I EEFfEFFF$H $H F  Registers, Registers,+@FFFFFF F FFFFFFFFFF F"F$F&F(F*EEEEEEEE E E E E EEFFF FFFF FileRecLv  E  E G FileRecLFFFh h,iLv TLineEndStr TLineEndStr TextBufGv TextBufGv TextRecPv  E G TextRecPFFFF FFi`I`I `I$`I(i,iLhiLiPv DateTime DateTime FFFFFF /bin/sh-cv= utsnamev  G  G  G  G  G utsname k4k Hk@\k`pkvpUtsNamepUtsName stat` F stat`hFFFF hF hFhFFFF F$F(F,F0F8hF@hFDhFHFLkPpStatpStat dirent G direnthFFEElpDirentvpDirentv dir v dir FFF "%s" at pattern position %d, string position %d.sysconst.snocharmatch^mm in a sequence hh:mm is interpreted as minutes. No longer versions allowed! (Position : %d).sysconst.shhmmerrorMCouldn't match entire pattern string. Input too short at pattern position %d.sysconst.sfullpattern*Pattern mismatch char "%s" at position %d.sysconst.spatterncharmismatchJansysconst.sshortmonthnamejanFebsysconst.sshortmonthnamefebMarsysconst.sshortmonthnamemarAprsysconst.sshortmonthnameaprMaysysconst.sshortmonthnamemayJunsysconst.sshortmonthnamejunJulsysconst.sshortmonthnamejulAugsysconst.sshortmonthnameaugSepsysconst.sshortmonthnamesepOctsysconst.sshortmonthnameoctNovsysconst.sshortmonthnamenovDecsysconst.sshortmonthnamedecJanuarysysconst.slongmonthnamejanFebruaryvsysconst.slongmonthnamefebMarchsysconst.slongmonthnamemarAprilsysconst.slongmonthnameaprMaysysconst.slongmonthnamemayJunevsysconst.slongmonthnamejunJulyvsysconst.slongmonthnamejulAugustsysconst.slongmonthnameaug Septembersysconst.slongmonthnamesepOctobersysconst.slongmonthnameoctNovembervsysconst.slongmonthnamenovDecembervsysconst.slongmonthnamedecMonsysconst.sshortdaynamemonTuesysconst.sshortdaynametueWedsysconst.sshortdaynamewedThusysconst.sshortdaynamethuFrisysconst.sshortdaynamefriSatsysconst.sshortdaynamesatSunsysconst.sshortdaynamesunMondaysysconst.slongdaynamemonvTuesdaysysconst.slongdaynametuev Wednesdaysysconst.slongdaynamewedvThursdayvsysconst.slongdaynamethuvFridaysysconst.slongdaynamefrivSaturdayvsysconst.slongdaynamesatvSundaysysconst.slongdaynamesunv T֌L,,xll3. 2mL00ill$rY 9\DDpxx,  ?, H((dd~WY  T((*r||%aeh@@B 2Dl llD L@((e ``]5%P44wIpp- B0 (MpHH~y$p@ddĂ d+P((2hppUl4 d4U d88݌hg8\\nkp@@Ӎ.^.@@}(c \DDIS||^2"] X00T||2?S d@@ר8 ֚04GW xTTU (d 3 L,,E%gllY nL T44 xxY%~H(4LLch(()> Qs 05J``  p44, "8{;XXc >x(( t/~P,  L\PPSrHSQQL@@H|ppYUfU J@00ɸxddY SxHSD44Exhh9aXP<<=ttb< ^T[  ]H<<ZxllMYZ JF@00ٚ xdd9L )P@@J F  #27v(#vTERMcons(#[?1036lxterm[?1036s[?1036h[?1036rSHIFTCTRL ALT LEFT RIGHTUnicode character Key with scancode Unknown function key : AND Home Up PgUp Left MiddleRight End Down PgDn InsertDelete ;DT]^ghq GI KM#OQ&RS)&qwertyuiopasdfghjklzxcvbnm1234567890-=& !"#$%&,-./012xyz{|}~A a 0B 0b .C .c D d E e !F !f "G "g #H #h I i $J $j %K %k &L &l 2M 2m 1N 1n O o P p Q q R r S s T t U u /V /v W w -X -x Y y ,Z ,z - = 0 x1 y2 z3 {4 |5 }6 ~7 8 9 ;[[A <[[B =[[C >[[D ?[[E ;[11~ <[12~ =[13~ >[14~ ?[15~ @[17~ A[18~ B[19~ C[20~ D[21~ [23~ [24~ ; < = > ? @ A B C D   ;OP <OQ =OR >OS ?Ot @Ou AOv BOl COw DOx Oy Oz [0~ R[2~ S[3~ G[1~ G[7~ G GOH O[4~ O[8~ O OOF I[5~ I Q[6~ Q H P M K HOA POB MOC KOD V[25~ W[26~ X[28~ Y[29~ Z[31~ [[32~ \[33~ ][34~ [23$ [24$ T[11;2~U[12;2~V[13;2~W[14;2~X[15;2~Y[17;2~Z[18;2~[[19;2~\[20;2~][21;2~[23;2~[24;2~TO5P UO5Q VO5R WO5S TO2P UO2Q VO2R WO2S ^[11;5~_[12;5~`[13;5~a[14;5~b[15;5~c[17;5~d[18;5~e[19;5~f[20;5~g[21;5~[23;5~[24;5~^[11^ _[12^ `[13^ a[14^ b[15^ c[17^ d[18^ e[19^ f[20^ g[21^ [23^ [24^ [2;2~ [3;2~ [2;5~ [3;5~ [3$ [2^ [3^ h[[A i[[B j[[C k[[D l[[E h[11~ i[12~ j[13~ k[14~ l[15~ m[17~ n[18~ o[19~ p[20~ q[21~ [23~ [24~ hOP iOQ jOR kOS lOt mOu nOv oOl pOw qOx Oy Oz hO3P iO3Q jO3R kO3S l[15;3~m[17;3~n[18;3~o[19;3~p[20;3~q[21;3~[23;3~[24;3~          [8$  [7$   t s a b tc sd u u[8^ w w[7^     OA OB OC OD [5~ [6~ [4~ [8~ [1~ [7~ [2~ [3~ [?1;0c[?1l [?1h [?1;2c[?7l [?7h 9(( 3 45  ''3 45)0. !"#$%&21/-,+) wstNuvLNHKMPGO  4  4  TKeyRecord TKeyRecordFEE TKeyboardDriverv TKeyboardDriverptx| v Tprocedure Tprocedure PTreeElement PTreeElement TTreeElement TTreeElementG E EE PMouseEventv PMouseEventv TMouseEventv TMouseEventFFFFv TMouseDriver4 TMouseDriver4 GPTX \`dhl p$t(x,|0/dev/...fd winsizev winsizeFFFFv Termios,v E Termios,FFFF F$F([=0C[=1C[=1C[?25h[?0c[?0c[?17;0;127cv[?1c[?7l(B)0(0(B[?7l)0[?12l[?25hv[?12;25h[?12;25h[?25l[?1049hv[?1049lv[?7l(B)0[?25h[?25l ;[1;22;v5;25;v34[?7lv[1@CONSOLEFONT_CPCP437CP850 /dev/ttyvTERM(Kvv8   opn* oooooo aoadopn*><|!_|v^><mn^vPflaaaxuuukkuxkjjjkmvwtqnttmlvwtqnvvwwmmllnnjlaaaaaal{SsTTOdIen=yzxxxVn*Pflaaaxuuxkjkmvwtqnmlvwtqnijlaaay*:&;&e&f&c&`&" %%%B&@&j&k&<&%%!< %!!!!!"!%% #%%%%$%a%b%V%U%c%Q%W%]%\%[%%%4%,%%%<%^%_%Z%T%i%f%`%P%l%g%h%d%e%Y%X%R%S%k%j%% %%%%%%")"a"e"d" #!#H""" %  (,4<DLT\`lt $,4<@Hansi cons eterm gnome konsolelinux rxvt screen vt100 vt220 xterm beterm ""### ###P#### 04261537%@(U%@(B\ <         PVideoMode PVideoMode TVideoMode TVideoModeFFGTVideoModeSelectorTVideoModeSelector PVideoCell PVideoCell TVideoBuf F TVideoBufF PVideoBuf PVideoBuf TVideoDriver, TVideoDriver, '''' '((( ( ($((TErrorHandlerReturnValueerrRetryerrAbort errContinueTErrorHandlerReturnValueerrRetryerrAbort errContinue() )) )( TErrorHandler TErrorHandler Tencodingcp437cp850cp852cp866koi8riso01iso02iso03iso04iso05iso06iso07iso08iso09iso10iso13iso14iso15v Tencodingcp437cp850cp852cp866koi8riso01iso02iso03iso04iso05iso06iso07iso08iso09iso10iso13iso14iso15v* ****"*(*.*4*:*@*F*L*R*X*^*d*j** ***"*(*.*4* :* @* F* L* R*X*^*d*j**       E u     6 [ r    > M f   & @( ' ( P( ( ( ' ' ,' &  ) () k( ( '( ' ' K K S I R S %S S I J MQ O S J S L jL I I S S O S S P #R %S N M oK 7O %S S S I S S Q P S L M aN S S R S wO I %S 6J S  Q S %S S kI nR %S %S S J S S *M RI $K S S L 7P I M S !N N I >L Q S RI S VM %S d f f f f f f f f f f f f f f f f f f f f f f f f f f f f f f d Qe f f }e e d e f 1e -f Yf e f d Gh Ti 2j i yi i h i i h  j 2j h 8i mh 2j 2j 2j 2j i | <    9 >   y ˓  B k Ĝ {    k   +   w  Ρ â   Z  7 }  ,  w w w w w w w D w H k w w w  Ĭ w ߣ  S 0 ~   w w w w w    w v  w w w w }  w w ä w  w w w 7 Z } w w  w w å w w w w w w w w w w w 5  w    w   w % v  ˧ =  w w w w w w w w w w w w w w w w w w w w w w ? w b     Ш w a ' ״ w w w H   H k w w w w w  ӭ w  x  w w G    B y w ݯ w /  8  w w w w i [ u O      w w w w Ȫ w    w w w w w w w w w w w w w w w w w w w w w w ͫ     2 &    X     d                  D  ^ j v        =              ھ       ޺ p   >                           E                              N W  |    M                   w                 E     Կ             J , 8              y  ۹ A       illik =  Sum(illik) = f = Sum(f) = prod(f) = v@"Internal error finding constraints?Ngb@ S Integrate()= v its= Warning:  iterations in S Integrate(v) =vUUUUUUU@UUUUUUU??openT Integrate( = vUUUUUUU?UUUUUUU?UUUUUUU?closedT Integrate(@Romberg Integrate( Prec obtained: @PP?*(뽔?A^*sa@@Adapt Quad Int(v Error est=v # Func calls = . Failed Subintervals = . % failed=v3333333?GzG?DERIVATIVE converged in  evals.vDERIVATIVE quit in vSUM(PRODUCT( Solvevalue(Warning: FINDZERO reached max iterations*Warning FINDMIN reached maximum iterations Solvequantile-Warning: solvequantile reached max iterationsQUANTILE probability"Cannot call QUANTILE function for 8SETRANSFORM must be called from within a MODEL statementCall user-defined FUNCTION v() type Exit user-defined FUNCTION v can't be called with subscriptsMissing subscript, dimension  for, Subscript out of range for v. Found . Valid range is [v to ]Calling boolean func  with file argsv with real argsv with complex args with integer args with string/char args with bool argsvMLEFILEv Bad string identifier type foundoutvpltvCalling STRING func -assigning a STRING with length <> 1 to a CHARBad CHAR identifier type found*CHAR function got a string of length <> 1 Bad file identifier type found*Wrong identifier type, expected an INTEGER@calling ROUND(): out of range of integercalling TRUNC( Bad string "" in STRING2INTvCalling integer func "Unimplemented integration method: INVCHISQ prob is > 0 or < 1vINVCHISQ df is <= 0vAttempted division by zeroINVNORMAL prob is > 0 or < 10Attempted the square root of a negative number: Function MIX, p = Bad ident . Expected REAL type, found @Bad real ident. is type llik= lik= freq= Sllik=vFunc () =  p: dyaydef_ptrv dyaydef_ptrv dyaydef_type dyaydef_type ԡ return_ptr return_ptrTТh>\ n n  n      Y     %     Y   Y , %File , HAZARD  := END  END  ) v ELSEIF  THEN  ELSE  FORM=Warning: the matrix is singularvfffffff DX: param= its= dx= d_llik=Computing dx array for param iteration vComputing COV[,]??@: f(x): f(x+dx)= f(x-dx)=  dx:  f'(x)=v@i= j=v = vComputing COV2[v CI_CONVERGEv CI_MAXITSComputing CI for parameter v Warning:  Interval for param  not bound between v and  did not converge to  in iterationsvCI_CHISQCI_LIMIT_DELTAUpperLower?Too few arguments to VSORT Argument to VSORT  was not an array; it was a . was not the same length as the first argumentArgument 1 to + was not an array or data variable, it was vquantile argument to ? is the wrong length to be converted to a DATAARRAYtype isn't a data variable.  Can't change it to an array.?@@@@@@@?@?df (arg2) in STUDENTTf-value (arg1) of FDISTvdf1 (arg2) in FDISTvdf2 (arg3) in FDISTvX^2 (arg 1) of CHISQdf (arg2) in CHISQINVCHISQ argument@@@@fffffff?@INVNORMAL parametervBIVNORMAL param r@ BIVNORMAL sx BIVNORMAL sy@Bad random seed: ??@@@@@?@@@fffffff@Nr?il7? ףp= ף?-)? ףp= ף??RQ?̌@p= ףp@Q@)\(\@Q@@@@@@@@@@@@@@@@@@@@@@@@ @ @ @ @ @ @D?K4@g=6@7i,(@3!]Ʀ@ yC@8uML?&޿Zho?D?K4@`mĔt@V?ZU@cM9H@ ,!@Btވo@qC?3d3?oʡE@58l@]?w2/?Z:*|A=cN hvEàg4w?+uM$H?e?OA" ?<,:?A ͘l@Q???VgC?W 3}?Ƙ?0&?$@QHh'@!sm @@@Bk$@>>.ü@7|Ub@rFB>@hm=?~3?&iq? Ų?4??-9o?F -L?bB;?E05?6('?Sv+?!wS\?"Hx?2V?R4 ?;$) .t?X䙜?Unexpected end of file v DATAFILENAME reading observation , line v of , field . FREQUENCYFREQ PRINT_OBSPRINT_DATA_STATSNAME   N_VARS PRINT_BASICvTITLEProgram file: MLEFILEvInput data file name:  variables read. PRINT_FIELDS in field of line &Data transformation, bad function typeDropping datafile line v.No data file assigned. Use DATAFILE procedureReading data from ...v Can't have v lines per observation. Max is  fields for line Var : on line DATADELIMITERSOpening DATAFILE for reading INPUT_SKIP$Unexpected end of line reading obs. Reading obs  line  field v-->"Obs , var , (line  col ): "" --> was badvBad value for observation #:  (line v). Can't convert: "v " to a number PRINT_COUNTS lines read from file  Observations kept and v observations dropped. Creating  observations with v variables each... lines created LINE_NUMBN_OBS DROPPED_OBSv TOTAL_OBSMIN_SIGNIFICANTv VCV_WIDTHVariance/covariance matrix:   The Matrix was singularv DIST_T_START DIST_T_ENDDIST_T_N' distributions at mean covariate valuesv DIST_ERR_C=vt S(t) SE[S(t)] f(t) SE[f(t)] h(t) SE[h(t)] PLOTINIT# ( distributions at mean covariate values = DIST_ERR_Cset title "Survival Function"plot "=" using 1:2:3 with errorbars, "" using 1:2 notitle with linespause -1(set title "Probability Density Function"=" using 1:4:5 with errorbars, "" using 1:4 notitle with linesset title "Hazard Function"vH" using 1:6:7 title "HF" with errorbars, "" using 1:6 notitle with linesSolution with  free parametervMETHOD = vMAXITERvMAXEVALSMAXTIMEvConvergence at vEPSILONv  v Reduced PRINT_SHORTvLikelihood CI Results: ( evals)vE Name Form Estimate Lower CI Upper CI@ Results. (v! Name Form EstimateLogLikelihood: v AIC: @ Del(LL): Iterations:  Function evals:  Time: v*Results with estimated standard errors. (M Name Form Estimate Std Error t against paramstartminvmaxvCIlowCIupVARvParam # START is less than the LOW value. v START=v LOW = v% START is greater than the HIGH value HIGH = .LOW.HIGH.START.UCI.LCI.SEvVCVv LOGLIKELIHOOD FREE_PARAMSvDELTA_LL ITERATIONSEVALS VCV_EVALSCI_EVALS INVERT_FLAGv CONVERGE_FLAG METHOD_LOOPv LOW_DEFAULTv HIGH_DEFAULT START_DEFAULTInternal error--TEST was nil- i Freq ilik Ln(lik) EntropySUM Ln(lik) = AIC = AICC = v ( obs)BIC = Mean LN(lik)= Geometric mean lik = Mean entropy = vSURFACE_POINTSFree params = MLEFILEvStart file is PRINT_FREE_PARAMS PRINT_INFOPOWELLDIRECT CGRADIENT1 CGRADIENT2SIMPLEXv ANNEALING!Unimplemented or unknown METHOD: PRINT_PARAMS PRINT_VCVPRINT_SE INFO_METHOD1Computing covariance matrixv PRINT_DISTSv PLOT_DISTS INFO_METHOD2'Computing alternative covariance matrixvPRINT_CI)Computing likelihood confidence intervals PRINT_LLIKSvAICvAICCBICv model selection TOTAL_OBSIC Sample size is Best model is number  with Model LL v$ Delta PR(M) Odds ratio Params * Bayesian Model Average estimatesLParam Param Best model Best model BMA BMA NumberN # name estimate SE estimate SE averaged PRINT_BASICvModel  Run  : vTITLE.trmTermination file is Param + < LOW. Returning a large pseudolikelihoodv?, > HIGH. Returning a large pseudolikelihood ( ll:  del:  P: @In cgradient iteration vMETHOD CGRADIENT1@ Dim  of In direct iteration alpha expansionvbeta contractiongamma extrapolationv Simplex it: ) ll = v d(ll) =  P[v]=In simplex iteration y, ylik Initial llik: -Param Current parameter Trial parameter v! Point rejected as out of bounds Resulting llik: 7Intermediate result after step length adjustment, iter v? Parameter New step length Current parameter Best parameterv)End of temperature reduction cycle, iter ) Temperature: v Max loglik: del LL:  New maxima : vMoves uphill:  Accepted downhill:  Rejected downhill: Out of bounds adjustments: v, Parameter New step length Best parameter Uphill point accepted: vnew optimum found: vDownhill point accepted: Downhill point rejected: In SA. Dim.v cycle v step iteration v?Simulated Annealing over  paramsvSA_TEMPERATURE: SA_COOLING: SA_ADJ_CYCLES: v SA_STEPS: SA_EPS_NUMBER: v MAXEVALS: MAXITER: SA_STEPLENGTH: v SA_STEPLENGTHSA_STEPLENGTH_ADJ: vSA_STEPLENGTH_ADJ RANDOMSEED: Final temperature: vParam Final step length Simulated annealing results:Final step length LogLikelihood: Iterations Evals: Accepted:  Out of bounds: ??@  xPy؅0|~+5005tnPnPIPz7 `+@  > } ? A! AP! W? 0C`?  J NMZPsFPC 2.4.0 [2009/12/22] for i386 - FreeBSDGCC: (GNU) 2.7.2.101.01.shstrtab.text.rodata.data.fpc.bss.comment.note | |  | S@`@ $PaP })P 2d x 8