série de riemann

% 'FormXob.561c40636c4d8953c975efcd6af45b5f': class PDFImageXObject /FlateDecode ] /Height 47 /FormXob.1cb322d4168a0050de0ae884340fcb8f 25 0 R Derivatives Derivative Applications Limits Integrals Integral Applications Riemann Sum Series ODE Multivariable Calculus Laplace Transform Taylor/Maclaurin Series Fourier Series. /Length 698 509.5429 /Width 920 >> endobj Forgot password? 0 Obviously, yes. /FlateDecode ] 260.2323 Gb"0W?*>1t%#*[)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'bXY+6F)e(>8Z9l1CKXO+V>2Ai(TSBd&[S2E2WeMd`d;TM]FoG:Q)V>C.5=dg&c9!P>K$M'E`Pt(05oNpR9tSL:tP9Su!pGG^eP]?;eK!JX[-N"b2u'Bj+Kaqn*IX9GB[8QGVJq^3.,bHHcON*NfbK1aCJVW2005+YoE5I..7r6X"aO#sCT&aN,E;dn?\WL:r9OSfeM#eFc:#AFK.$[CPCUZlRH3#&is-H$Q>GY;ni%Vb=X^+6nf;G9=9ZhpM!jkW6tMu;h93mp?[TW0]!=IP>?Tn_WFDXZFD9@s6dtqK]-7m!c;W!,"^YLWANP$T"$c\X.Cj=P;ga#`ZKl9!]POE;=/fokDu@.4nZp&d@;j0%]5BtKS'Z;t6Mf3=CJpoclf88->@2cXnm:A:'+8utlr-CA:Y@C=m*abNLH>=jkp1AAhN0oa8Z9l1CMK.I;Xcm1;,RG;\BG-i1?1lplI@@\qp^s[eH!oO[JLWhDZbs#5FRTdid:kYm1e%i1^T1gG]P>+j:F[,DD*>p*hRGsN1H!)FjSkX&g!1Ar:(8174knFQP+l\iLe+>;A=EQH[l:n2>QTg/#BP[#*?dfNfQ*,68r`PI9B>0KP-WVRX-iWa)=18lH4B6#'CVkj5)j%p'Od[#MX6@gc`FSl8pa=&QfBg6dU[Tkcuc&Rm3C4>9>s2pqMEpTsr[q$,?=u2jggcA4OVXq*^>B\`?mCcg=RLp\P6tF`Fm)tfZfmBtL1nFKo*10Q8`V09n8Fps\ZZ')Y[U1Hic,Gj[dmE?D(`AbqK"QIm@AP5+(X$,)'iJ[?NW"s0b"#`. /FlateDecode ] /Subtype /Link /ColorSpace /DeviceRGB La série de Riemann de paramètre complexe α converge absolument si Re(α) > 1, et diverge si Re(α) ≤ 1. 324.3469 endobj << /BitsPerComponent 8 La série de Riemann de paramètre complexe α converge absolument si Re(α) > 1, et diverge si Re(α) ≤ 1. /Filter [ /ASCII85Decode /ColorSpace /DeviceRGB endobj Gb"/fm>e5$$jCqVLIP@V.oe/H_$N!!$iXnXnYe?oToM&eF#BXmg?,-([!%H+$9sk_IrrdpNaPFeP!-@*($sRdG1je*qB\T`/8tLh-"io-A8$MkAN.n:;]j+[rn?_NP9CBqaNffJn7Jf$m*3?g".+i%cE]lo5RC6C;8L>$bFD"EO^^0&-VgEGVSU>[ipPDA&-nQq8;;A1.^q+]>O?3L?f235JfT3a/3.dqT"gTd#N^;EadH\rjNUB]fG#Kmba\MVEs[$83N3lP4+^s?k";[^\d.=We^S3Q. /Border [ 0 /Text /Filter [ /ASCII85Decode !#3`IA;9UO)~>endstream /Text 0 ] 527.9469 ] A series is said to be convergent if the sequence S1,S2,S3,…S_{1} , S_{2}, S_{3}, \ldots S1,S2,S3,… satisfies. /Height 100 << /BitsPerComponent 8 /FlateDecode ] endobj /ColorSpace /DeviceRGB /Type /Action /Width 47 >> stream /ColorSpace /DeviceRGB /Height 50 12 0 obj % 'FormXob.99c434df2549998abeb9d1b53a8c8acd': class PDFImageXObject stream /Filter [ /ASCII85Decode /Height 90 stream /Type /XObject /Width 560 >> □_\square□. /ColorSpace /DeviceRGB 0 Through Riemann sums we come up with a formal definition for the definite integral. 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Georg Friedrich Bernhard Riemann (German: [ˈɡeːɔʁk ˈfʁiːdʁɪç ˈbɛʁnhaʁt ˈʁiːman] (); 17 September 1826 – 20 July 1866) was a German mathematician who made contributions to analysis, number theory, and differential geometry.In the field of real analysis, he is mostly known for the first rigorous formulation of the integral, the Riemann integral, and his work on Fourier series. /Height 90 23 0 obj /Subtype /Link /Filter [ /ASCII85Decode /Subtype /Image endobj /Filter [ /ASCII85Decode Sumatoria de una expresión Added Mar 21, 2011 by Harold Suarez in Mathematics Calcula el valor de una sumatoria o serie, gráfica de sumatorias parciales y fórmula de la sumatoria enésima. << /A << /S /URI 715.9469 % 'FormXob.c38f78c89ff906152e05d19b581f3bbb': class PDFImageXObject /Filter [ /ASCII85Decode 512.9469 stream /Length 746 /Height 33 /Subtype /Image /Width 373 >> endobj /Type /XObject Gb"0W?*>1t%#*[)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'd,T+Z@r>)1p`iX'bXY+6F)e(>8Z9l1CKXO+V>2Ai(TSBd&[S2E2WeMd`d;TM]FoG:Q)V>C.5=dg&c9!P>K$M'E`Pt(05oNpR9tSL:tP9Su!pGG^eP]?;eK!JX[-N"b2u'Bj+Kaqn*IX9GB[8QGVJq^3.,bHHcON*NfbK1aCJVW2005+YoE5I..7r6X"aO#sCT&aN,E;dn?\WL:r9OSfeM#eFc:#AFK.$[CPCUZlRH3#&is-H$Q>GY;ni%Vb=X^+6nf;G9=9ZhpM!jkW6tMu;h93mp?[TW0]!=IP>?Tn_WFDXZFD9@s6dtqK]-7m!c;W!,"^YLWANP$T"$c\X.Cj=P;ga#`ZKl9!]POE;=/fokDu@.4nZp&d@;j0%]5BtKS'Z;t6Mf3=CJpoclf88->@2cXnm:A:'+8utlr-CA:Y@C=m*abNLH>=jkp1AAhN0oa8Z9l1CMK.I;Xcm1;,RG;\BG-i1?1lplI@@\qp^s[eH!oO[JLWhDZbs#5FRTdid:kYm1e%i1^T1gG]P>+j:F[,DD*>p*hRGsN1H!)FjSkX&g!1Ar:(8174knFQP+l\iLe+>;A=EQH[l:n2>QTg/#BP[#*?dfNfQ*,68r`PI9B>0KP-WVRX-iWa)=18lH4B6#'CVkj5)j%p'Od[#MX6@gc`FSl8pa=&QfBg6dU[Tkcuc&Rm3C4>9>s2pqMEpTsr[q$,?=u2jggcA4OVXq*^>B\`?mCcg=RLp\P6tF`Fm)tfZfmBtL1nFKo*10Q8`V09n8Fps\ZZ')Y[U1Hic,Gj[dmE?D(`AbqK"QIm@AP5+(X$,)'iJ[?NW"s0b"#`. Különböző tulajdonságai szorosan összefüggenek a prímszámok eloszlásának kérdéseivel. /Length 746 /FormXob.ef915955cd1d900e291dcfbe99b236eb 31 0 R Evaluate the value of the series 1−12+13−14+⋯1-\frac{1}{2} + \frac{1}{3} - \frac{1}{4} + \cdots 1−21+31−41+⋯. /Width 203 >> /Height 87 /Length 3575 endobj /Subtype /Image /Resources << /Font 1 0 R << /BitsPerComponent 8 Log in. 0 50 0 obj << /A << /S /URI /ColorSpace /DeviceRGB /FormXob.92ec843de631dccd713578c1a32ce36a 39 0 R /Length 3356 /FlateDecode ] 324.3469 /FlateDecode ] /Border [ 0 0 ] /Length 2375 << /BitsPerComponent 8 /FormXob.ad1adc6704647f41f65be9e5598dcb9e 38 0 R !a0L%#Q@Y+~>endstream /Subtype /Image 715.9469 ] Publication date 1898 Topics Mathematics Publisher Paris : Gauthier-Villars Collection thomasfisher; universityofottawa; toronto Digitizing sponsor University of Ottawa Contributor Fisher - University of Toronto Language French. 27 0 obj 'd#OJC%]W%WWW>1Gm#JK#b&endstream 17 0 obj /Filter [ /ASCII85Decode << /BitsPerComponent 8 /Type /Action "*2F+OC*f]upP[u/GsS,k7Ce_$k51@rW[g9f?.HaVQhSa*<9aJ_sO)"G!endstream /Subtype /Image /Type /XObject % 'Annot.NUMBER17': class PDFDictionary 527.9469 ] /Subtype /Image 0 ] /Width 353 >> /Rect [ 202.1029 /FlateDecode ] /Type /Action /Contents 110 0 R endobj /XObject << /FormXob.0fc017be651712cdeb36511d34ec81ee 44 0 R /Filter [ /ASCII85Decode /Subtype /Image ]@m$9Y#+>"J=?R#-D[-Hu;Qk8j<40-#QAcOb=Vb^]$Vd==Z9+f/:mtMh_!9AM-LGg69~>endstream << /BitsPerComponent 8 /Height 87 33 0 obj /Filter [ /ASCII85Decode endobj /Width 567 >> /Resources << /Font 1 0 R << /BitsPerComponent 8 << /BitsPerComponent 8 551.6968 ] /Width 567 >> /Subtype /Image /Rotate 0 595.2756 /Subtype /Image % 'FormXob.99c434df2549998abeb9d1b53a8c8acd': class PDFImageXObject Gb"/ggQ$n?$jHJ,O,ipB,nu0q)!Y>LRAX=/e]1T9PdUc]"V-D3=+1]Y%V]Xi%[e]'*2,41r+@A8Al>qrD1e]ul"@HRa2Kq;[peMk\9VL\U'NP(5sCLF9UL3L:@bkAj.t@rq3g'Na2PoJoEtr$bsiBcHfT4?&HDe2!!!!1$icH(8p'CA^n`1*4[S;.G1(_OVU?!AV! /ColorSpace /DeviceRGB Niewenglowski, Exposition de la méthode de Riemann pour la détermination des surfaces minima de contour donné, Annales scientifiques de l’École Normale Supérieure, 2e série … /Type /Action << /BitsPerComponent 8 /Width 50 >> 0 /Width 520 >> /Subtype /Image /Contents 111 0 R Gb"0Rd>ls8$q*tks$m:t]'(?'D-::\8fZ^Z)T:3g'V"OV"TUO6r`X`-B9'h4+?J6@TR+sUJr@C4)]QrOtT1'2&&7Z34U=bY6I,@FP\[)`N?<>[;C!bN0:Mi<0hL!_(h?rg^Ca9\/5(bIKEAeddnN.>&bd39fC'h4+?J6@TR+sUJr@C4)]b\M9#+4G*_+;o`/ntT4DqGbP'&N'f4MR"+BO?,.p`A%8ZW$^"N!]1CnSQ>-R^SYSSm=og^Z=-mmt5DfL0tT&5u^TZ]^>CB"0YQNR_Goob7U]ehL>=2=93^#?G4*pE0VYaTJYHN]f4j,"JYqF#dJk(,-\X,JfKTT:*oKGVe0JNe6Z&RHl\#5Zt\7rY)[T;M7GN?\=$'N4,31O956K]([%+:MAU`*3ZWC=EGHm-Cl. /Width 83 >> Gb"/c_$U/b#XeRjO-\(fBN'h`G#\/^$Y'):7%.kqC.\f`SL:[6ZL&*b?/l,EKO%)3To,mDSkMGNR(qOg=^=>1Y,a8#\A-DandQS?a_nN2V#s_+b~>endstream 358.8569 /ColorSpace /DeviceRGB /Filter [ /ASCII85Decode Denjoy"). << /A << /S /URI stream 0 ] the definite integral! /Height 103 /Type /XObject % 'FormXob.5fc7a8bc08eb1bb96963fef236d966f1': class PDFImageXObject /Rotate 0 /Height 87 /Type /XObject /Type /XObject 19 0 R Definite integrals represent the exact area under a given curve, and Riemann sums are used to approximate those areas. /Width 583 >> << /BitsPerComponent 8 /Width 747 >> /ColorSpace /DeviceRGB /Rect [ 271.4378 La fonction ζ de Riemann est une fonction analytique complexe méromorphe définie, pour tout nombre complexe s tel que Re(s) > 1, par la série de Riemann : = ∑ = ∞ = + + + + ⋯.D'après la théorie des séries de Dirichlet [note 1], on déduit que la fonction ainsi définie est analytique sur son domaine de convergence.La série ne converge pas en s = 1 car on a Gb"0V@?7KJ%#&-hs,TX7>%pDQ,QrpaNVu&5g=]VFHotrC]"RtNz!!!#7LMd(^mK*@gR+Mn]HN=*HMerplNW9'0+c^mL!7Ko;#65l0NdCa+dc7j0eGd;e^]3e;7#;7'+'^A0(O[LG4_#H=T:4*j,tNh_k&7;GG(h]mK&b_>kssn.%>\qa+6pH-\R&*#4$YAa/@eht"7N&W9#DZ57mUqtd*E@ZqPa8I,TZG)%Qrp*)d"``>,:#s@iV&8NB.3"(cD+S^Rt!rTigCA;jB.#pN;&Gj&Acau'i6]NRKB3-q46jC&$J0*j:(!.XSeiQ&NMM=O),$?22HH/NFd1Af?I*dro)]g(=KgHb^OXtN__h7!aUrUm^D?HTn5dJIj%1eJLzzzz!'kq0rs+43pT:>[Ni7]'c[d'I(j->LLf,3/St05E*6#"7&:E2O3dI]LNi9sD'n\/eS5*B?Sthlh%Pak%Vj$j)kD4_#Wu,g=K=%mOjW*sI+ijk*<98!^hHd3[3ChSpI"6uUp`OFT;Dq#]b%Vs@R9#aE`4Lq=b3"MKg4e.K'Qtd?FlM5r11bP!ic7qaQM=8q$e_O/Up^?V0TT?kX-1Ugl4u:1M\)r#;A^)rc,1Fhch!\fp%*2o9cVEm$]C[JSFh(i7X?5nD,S?A9T48F$VX:\,Z>t;[*9/`Dp>=D2sA1RN6?S[L*E2od%pdbai5`'rERs0:+Coa>!b^3?PFb?ffsb^$.5fR\enerCuhK8h^.M`Acm9_t5tcdZ!q:_>WsH]Cqt9=.;a6XqoICOin0^k86hPBeS^FHq.KF9V8'rA`q,":KDl4/^M!8(gQ-uHJb4kNkAtk43)$g4,RuU5Ku8QLAS>29=o,ZV$Obsj#m'=*BRtBl#kOjBQjhMjtl.kj1'4/!U`(^RKi2/olGMYI9G0GeEq53&@ZCXDGYcZ#%^kg2Vac^D4oM8XZ*HN0Z'ndks&XjlHe\0>Zu$4tHgjcl&LMZNrm!%+\gpO2j='&28+WL94RG,qOlO*VTl4>of^W;RDc:iI40_`P4$W^ZO=Bk@l&Zlr]P_B]Qk23"9:QL6nZK!fX?1<6+3r.$60'f+E@9.+#FWo7+8Q5b(]\4e+]*@ZK0U.rnm1CKOhkZMN[0f(Sfrl+"_J"h!bVn=bP[Di>Y@jX`$ur6"K_kWM'Q1u&GMY3p.S/&r`9A*oOolFqP)SueaopYP5pFD'C@mGZ_5-V(cZFbDdTFL(lFGE[LTFnab:!QW4$dG!/RFe.@m041?a:0)B&GHg\Pjc@EdYrH5"P,$iG3R4Strch5R2#,)\V6'R'XthD"Nn3&GF*^?i9:`d\\:XU*A>7oH+GE*Bm?bHeobo/;NdJ"?[>!5^)[s9*K:inD._WFSW"c8"C2s_IeAAiAP8mksr3XqhDJ)1^.6EY88!Lm->;rMocGGd?HV6h^XK28`CQ&2)R-(_BNj=rX3^::GZY4(32$\i:X8J3_Zgd%SD^eDSbDO?l`@]ad`uI*K&dt=AiQ4sJ;W:OaMB6-KnYm\P*'%JkIc9q6Dq.a[\(s/,H>28F!*u@RB]l`^@,mZ&Z)`$3KU!EUX"E1;2WuBZh%spUC8n$\"+@d`TSHCmH'G`k;E`?N%3KPIX@Gu:+PN1!X._,EIqt3KU#[kt$;14FVF"C>=?eh:4fO.&FD:]q&fp@j4F>a\ak]i5cM,oG7#m3X[#O3Qg+t[9X;df<9]E;9a@KgOD+r_! /Type /Action 324.3469 endobj /Length 400 stream Se deﬁne la integral impropia de Riemann de f en a; c como el límite: c a f .x/ dx D lKım t!a c t f .x/ dx (8.8) Supuesto, claro está, que dicho límite exista y sea un número real, en cuyo caso se dice también que la integral de f es convergente en a; c . ]@m$9Y#+>"J=?R#-D[-Hu;Qk8j<40-#QAcOb=Vb^]$Vd==Z9+f/:mtMh_!9AM-LGg69~>endstream /Type /XObject /Height 103 190.12 endobj << /BitsPerComponent 8 16 0 obj 46 0 R ] /FlateDecode ] /ColorSpace /DeviceRGB /Filter [ /ASCII85Decode /Type /Annot >> stream :8o6fF4s?~>endstream 143.2429 /Filter [ /ASCII85Decode The above series is a prototypical Dirichlet series that converges absolutely to an analytic function for s such that σ > 1 and diverges for all other values of s.Riemann showed that the function defined by the series on the half-plane of convergence can be continued analytically to all complex values s ≠ 1.For s = 1, the series is the harmonic series which diverges to +∞, and /Subtype /Image 44 0 obj Bref, laissons tout cela à plus tard. /Filter [ /ASCII85Decode /Text 841.8898 ] stream /Border [ 0 /FlateDecode ] /Rect [ 125.8105 /Type /XObject /Type /XObject 62 0 obj &= -2 \ln(2) \\ << /Annots [ 37 0 R stream % 'Page2': class PDFPage /FlateDecode ] /Filter [ /ASCII85Decode /Type /Annot >> endobj /Length 390 /ColorSpace /DeviceRGB stream /Filter [ /ASCII85Decode /Height 100 /Type /XObject endobj /FormXob.424cecb5f604fdee17dbdaa276ffafa5 43 0 R 56 0 obj Gb"0N5mdT7#Xm).IqWOD7M^Z,g6AXOnZj;oqfQ.\/=cAjcMEQQe]C?#X+lQ'l6Us9bNe.FMT6ZZMOJ39gVWuCb93:s#Wp3DCM9qrA2Plp=!ZNYOSYZMJ6XHGGY5P=I'u)V,2]*~>endstream stream Gb"0Rm>g3T&;B)us$]F.m78I_@oGX@Jf`-%E\O#D@pi!'lhIr?`Tt-I)Sk)l[eo:A#_0$Og@8+pRWJ.VUFVs65+i.=UEo^E>D2Reb>8^'tUO5YtG[9Bm57a_-hKkeZ8s]"=@`(HHm5PBQOM6;L^i4l&hVReO;j7-/mNT8V)VStsi]jt1LGrSoH.;_0;g;*LY.f]%9F`Qiok4sG2O_.201b%B(q,s;_'X?7?@Q;mQ>S&ge8qUrOCXf6f?-$>+,j>4p`oFP5shhL,F4n[1J"(M:71U,fBCnl#td>!tZ36^0mF2l@8\":55VidmT7U)JAWg149Z_WF>T3Y\!1e[*JbK4D@r]CZ*YC*@bEbru:lF`N\s8/&:1uHkKi&L)tWOiE,\j5-?F<6\X9mia'LpF!]"WX!-Tc'a1DYR2tb'4]"Csn$]=$7j5\>5^qo*-`p>Ig,lj6q`I-!gCa61Of"%%2EA^nIah1Ht6+ZB^9;I;%'RrCsYB8Ng#8%;=pq)phNoCb\#lh[Q&J](Xgb`Dr=gGX8[uh(Y;-F-b_ChWoks51WLZgSjH\E&[daOl,'9Ae/7jSeYq7p7.Z;B5qT2@eF#E)N;-9aKNjWg,,IH`mmIk0!dgE#'sgbZA$6"_"2M+D56RQ1ML[Mh8j5n&*UjhPY&H]I]&"(f!o>H"/[_dF4b0Bl0K9F)[kL51d`;3!;fT;&\]91Df+4,YZ.9!J#Yu@%ACjWti76NKi=Z?B!CA^7W4j23JUV"kd@>UH)oB^;Clnu+#M7NF">DpHL;m=dQ! 56 0 obj endobj << /A << /S /URI /Rect [ 125.8105 /Subtype /Image /FlateDecode ] /Subtype /Link Here’s a link to Riemann … /Length 2988 endobj /Type /XObject /Type /XObject 54 0 obj /Filter [ /ASCII85Decode /Type /XObject /Height 90 Riemann series theorem is named after a great German mathematician Bernhard Riemann who contributed a lot to mathematics in the fields of analytical number theory and calculus. /Width 83 >> /ColorSpace /DeviceRGB /ColorSpace /DeviceRGB Have we made any mistake? endobj /Height 23 /FlateDecode ] /FlateDecode ] % 'Annot.NUMBER13': class PDFDictionary << /BitsPerComponent 8 53 0 obj /Height 103 % 'FormXob.fea33bb763dc1c10f6f75ceab4a51840': class PDFImageXObject /ColorSpace /DeviceRGB << /BitsPerComponent 8 /Width 663 >> /Width 920 >> /Length 4175 /Width 1070 >> 59 0 obj /Filter [ /ASCII85Decode !#8RrrJN2W58~>endstream /Type /Annot >> 46 0 R ] endobj /FlateDecode ] /FlateDecode ] /Length 3575 /Length 1900 Gb"0WgQJ?l%KOlRs,X>8LQ8=X.DQ3r"e>0@O_&?3&s/^QWVQ>jz!.[T8"K[Uq!!".Rhp^'BH-5Xa!!(s,kqU?6$31(a<90+=S?2bk!.r>u.q^@4!.Y>f.f]R"G0X+g!!)C+X8i5#)O5e>TX,@5!'is2Ir".R"TSN6oJs?@1]RN+HZ4oF!!$]qC]se=d*C;O!!&[_ZP!WW3#zzzz!!!#?Dtc2kc`qf^!!!"I/3I#p>6+^(:GVdrPPf6^-P?CZi9mJ5H4h:&P(Wi9!'J0C;ie7"!74Br0,8cHU@8RMlDV>5Gmfi9cJ"A]h(e'9AtH,REh$o#_uKdWPQ+p%Aln_UC&FG69,BO(TpIuD\pN3%C3]dZ&@D=XIdII-lE3Xqec.0o8CmdXr]aKsFbR5&/;C]I:TqI4d*Rk(etp,DlL;G'Fika]9*T?Ztf(`,tIce1;8e?hJ]+L=^2M.ohh'&;`D@OKW\p2Y0o#TCeh*#dW*)Z,*aap,\DoVQ=:OQAqHc+P%n__'laI/l(_)-Jd?LlbBmDC^W]H'kBg]`iCQcsh;3a;Ptg#/lGlP=eo.9iUm;RUi(4`)2M(;QU:$s:Saah2Rr&+X%V6ELeCFUj2UcTd8Z6^,*DM,Soqt=?a$nX`AbE)gID"0L4C[rrE:p-)DYPq*!k^O7<847I,'+CV$HHH8h!RO;3+Ye@+BnOeV,TVj6W1]hp[33Hsi0mP-7'UT\^g7_^&qAq%`m1Hn1[Xujlq0_1M=Y.Ae#T!Xd*@"+CgpZM:1H+2rR0a_YDUZ]IDX`]j&72eij9g-(8KBBAL,A(6sT=OE,WOd)CS5EQ,YN`pdN'*-s`YK)a-%Oq8j%@\^;Xj'PA\7Z^$or*f`0)Z'm*F.O`WlXu$3jNcInoAKSmtb/[n+e29CgR+VB0$Z2n-i,^+XfQ'=JF@/.trFns0`f]!a:s_Kt;u-VJ7P1VRs@?pD'FdOo``hQk1%f1)W3=L^JJAnb\'So-#Ai6Nd)_3)OU92o0N77@3Sn[Hj%B^P*H!-XR42VRuhkN>`9"@ir=Za[?\-%1u@]Gm3Y+(8PoE&(pjFl"lKtG#u5#@0S=JSKi1Ug\fj9'ZAWlZm#&5h2E@k-Wl;t,io=WK0stq(tUHqKdm:c%^.Dr=>71LNNB_bl4SNsWgg6PWX3mcc^68clHdqqjT4,.7V7P]Ft(MV$KWd>G&fC">G=05h7IKK[.C]gk7_pJ@NiDL?$,VRY))D5S5e(ncn,GlTX9T]+L>ZE\p-dH'4qa+pmV'j?hLO'\5;S@qM6be_?j6fgSOHQ;kE1K8,_5F>PIp-/>H0:6-Pf%``a)*q7@fL7fHZOVPDqIQpaj4iL7=+E#Cjef[p!0]GlCOM.h7+EAl#MJjjt=$qjP[B7r]N[shOZ,c,VWOQ\lO,_=\bI#*d:?RZK#VJ/U00*n(@p@a0[6nFC0mSK/7.'uPE7OA=H1omb/jDS@Ke?ou;UXQW7lU$qR3,g)EftP)p9'H-G;M:hBO-_q>BF)uhgc*rr\NL)_`p@;#8XZ5rFbSQ;6R[AWK7X'T,oZ965He;]flh0ujqq:290`[@`PG=R#KooP"p`q-S6'$o5-bdY$!#[EY$BBif*fldu"q6E&Is-jePb[&hKB7#8sYV=`_3f@T+B*gQ+%EfnEP]$;GM\OXRZ*^#J^0Co;'&q/*2tX`\[uD2-8h[(B5\Y0:2L+qT-8?jm#ih1N8eK96go*%W%5CnP>'Unue&MCAT;l>"EpT1DBd0(s,nXVTs?H0]/O@h#6Kb6ih+-E`Nge3uKl3b*nfL6*6\sL9B.fMb3"T[\@*.gX^]l1JrYGn[tQYa@"/Y8I.c=+]H6ko]hUZ5MAWmt=OVj=W'$2Vfn;0a@2! 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