tag:blogger.com,1999:blog-39944532534569602032012-03-08T00:17:43.392+01:00Learning by doing. Arts & English for young students.profededibujohttp://www.blogger.com/profile/17751655300757967587noreply@blogger.comBlogger1191100tag:blogger.com,1999:blog-3994453253456960203.post-71905364446067183702012-03-07T22:27:00.001+01:002012-03-07T22:27:39.182+01:00The golden number<span class="Apple-style-span" style="font-family: 'Trebuchet MS', Verdana, Tahoma, Arial, sans-serif; line-height: 24px;">All kinds of artists have used the golden ratio in art throughout the ages. One artist who, I think was influenced by the golden ratio and probably decided to use this concept in much of his art, was</span><span class="Apple-style-span" style="font-family: 'Trebuchet MS', Verdana, Tahoma, Arial, sans-serif; line-height: 24px;"> Leonardo Da Vinci</span><span class="Apple-style-span" style="font-family: 'Trebuchet MS', Verdana, Tahoma, Arial, sans-serif; line-height: 24px;">. Da Vinci's talent as an artist may well have been outweighed by his talents as a mathematician. He incorporated geometry into many of his paintings, with the golden ratio being just one of his many mathematical tools.</span><br /><img border="1" height="300" src="http://mathematicianspictures.com/images_200/200w_MATH_P_DVSEL.jpg" width="200" /><img border="1" height="300" src="http://mathematicianspictures.com/images_200/200w_MATH_P_DVLOU.jpg" width="200" /><br /><br /><br />Ángela Pérez Camblor<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7190536444606718370?l=artspilesenglish.blogspot.com' alt='' /></div>Ángelahttp://www.blogger.com/profile/15524192006130040288noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-75383523403356211502012-03-03T18:26:00.000+01:002012-03-03T18:26:34.178+01:00GEORGE CLOONEY<div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-qhChr9Lym9s/T1JKame6uuI/AAAAAAAAAAM/yY0ii9rRP1g/s1600/images.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://4.bp.blogspot.com/-qhChr9Lym9s/T1JKame6uuI/AAAAAAAAAAM/yY0ii9rRP1g/s1600/images.jpg" /></a></div>George born May 6 1961 is an American actor ,film director , producer , and screenmriter.<br />Clooney is also noted for his political activism and has served as one of the United Nations Messengers of Peace since January 31,2008.<br /><br />He made his acting debut on television in 1978 Clooney gained fame and recognition by portraying Dr.Douglas "Doug".<br /><br />Clooney's humanitarian work includes his advocacy of finding a resolution for the Darfur conflict, raising funds for the 2010 Haiti earthquake, and creating documentaries such as Sand and Sorrow to raise awareness about international crises .<br /><br />He is also a membre of the Council on Foreign Relations.<br />Clooney was married to actress Talia Balsam from 1989 until they divorced in1993 .He has said that he will never marry again.<br /><br />Clooney is one of to have been given the title of "Sexiest Man Alive"twice by People Magazine ; firts in1997 and again in 2006, Clooney was named one of Time magazine,s 100 Most People in the World in 2007,2008 and 2009.On Septembre 21 , 2007 , Clooney and then -girlfriend Sarah Larson were injured in a motorcycle accident in Weehawken , New Jersey.<br /><br />He is a normal man, he had a pet, Max, was a pig. Max died of naturals causes and he also owned two bulldogs. Boths dogs have died.<br />Clooney's main home is in Los Angeles. His villa in Italy is in the village of Laglio, on Lake Como.<br />He is a famous actor and an attractive man. He works in TV in Spain, he is very famous with the coffee. He wins a lot of money.<br /><br /><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7538352340335621150?l=artspilesenglish.blogspot.com' alt='' /></div>jimenahttp://www.blogger.com/profile/06523058231028168930noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-78876276996326055012012-03-02T20:06:00.001+01:002012-03-02T20:07:39.135+01:00Portrait of My Dead Brother.<div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-MvPGj76XjP4/T1EUr3OwiSI/AAAAAAAAADM/FFXnQxHC2HA/s1600/Salvador-Dali-Portrait-of-my-Dead-Brother-1963.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="318" src="http://2.bp.blogspot.com/-MvPGj76XjP4/T1EUr3OwiSI/AAAAAAAAADM/FFXnQxHC2HA/s320/Salvador-Dali-Portrait-of-my-Dead-Brother-1963.jpg" width="320" /></a></div>Salvador Domingo Felipe Jacinto Dalí i Domènech was born on May 11, 1904 in the town of Figures, in the Empordá region close to the French border in Catalonia, Spain. Dalí's older brother, also named Salvador (born October 12, 1901), had died of gastroenteritis nine months earlier, on August 1, 1903. After birth, the painter was named after his dead brother (similarly to Van Gogh).<br /><div>Of his brother, Dalí said,... "<i>(we) resembled each other like two drops of water, but we had different reflections."</i></div><div>In <i> Portrait of My Dead Brother,</i> Dalí emulates the dot pattern seen in half-tone newspaper photographs. The face of the boy is created by a dot matrix, a technique that was widely used in the Pop Art period of the Sixties. </div><div><br /></div><div><br /></div><div><br /></div><div>Beneath the boy is a miniature depiction of Millet´s <i>The Angelus.</i> Dalí believed that trough an X-ray of <i>The Angelus,</i> it would be proved that the basket over with the couple are praying was initially the coffin for a child. Salvador Dalí was fascinated by this work, and wrote and analysis for it.<i> The Tragic Myth of The Angelus of Millet.</i></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7887627699632605501?l=artspilesenglish.blogspot.com' alt='' /></div>Marinahttp://www.blogger.com/profile/09302528566424800834noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-28269410748035876492012-03-01T21:03:00.015+01:002012-03-03T19:32:27.843+01:00M. C. Escher<a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://1.bp.blogspot.com/-YRE5UPe7FzY/T1Jife-He_I/AAAAAAAAAGA/b_4QC-kPgGY/s1600/mc.jpg"><img style="float: right; margin: 0pt 0pt 10px 10px; cursor: pointer; width: 220px; height: 296px;" src="http://1.bp.blogspot.com/-YRE5UPe7FzY/T1Jife-He_I/AAAAAAAAAGA/b_4QC-kPgGY/s320/mc.jpg" alt="" id="BLOGGER_PHOTO_ID_5715739170115648498" border="0" /></a>Maurist Cornelis Escher was a artist very famous. He was from Holland, and he was born in 1898. He did many woodcuts, lithographs, paintings with brilliant images... He could paint many visual effects like depth or volume, and he do imaginary worlds with many optical ilusions and imposible objects. He was like the simetry, and he was an special artist because he didn't have an specific theme to reproduce in his works.<a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://4.bp.blogspot.com/-cvOc5jTQ0pg/T1Jf0y2w0kI/AAAAAAAAAEU/5uLzT4Ayvyg/s1600/escher5.jpeg"><br /></a>I think Escher was amazing, because he used difficult techniques and mathematics in his works.<br />I put here some images, but I recommend you t<a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://4.bp.blogspot.com/-YJ0rDQjBN3M/T1JjD9sQL4I/AAAAAAAAAGk/qMWIaN67DR0/s1600/escher5.jpeg"><img style="float: right; margin: 0pt 0pt 10px 10px; cursor: pointer; width: 245px; height: 206px;" src="http://4.bp.blogspot.com/-YJ0rDQjBN3M/T1JjD9sQL4I/AAAAAAAAAGk/qMWIaN67DR0/s320/escher5.jpeg" alt="" id="BLOGGER_PHOTO_ID_5715739796837511042" border="0" /></a>o visist this page.<a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://3.bp.blogspot.com/-Qc6HVg0K3GE/T1JfdFIGC-I/AAAAAAAAAEI/_QmW0raWeSg/s1600/escher2.jpeg"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 223px; height: 226px;" src="http://3.bp.blogspot.com/-Qc6HVg0K3GE/T1JfdFIGC-I/AAAAAAAAAEI/_QmW0raWeSg/s400/escher2.jpeg" alt="" id="BLOGGER_PHOTO_ID_5715735830283553762" border="0" /></a><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://1.bp.blogspot.com/-RdIZxigy0jk/T1JgxycpLrI/AAAAAAAAAE4/Vewf6wAb3LA/s1600/escher6.jpeg"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 200px; height: 252px;" src="http://1.bp.blogspot.com/-RdIZxigy0jk/T1JgxycpLrI/AAAAAAAAAE4/Vewf6wAb3LA/s320/escher6.jpeg" alt="" id="BLOGGER_PHOTO_ID_5715737285558349490" border="0" /></a><br /><br /><br /><br /><br /><br /><br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://3.bp.blogspot.com/-BUbmUfRiaTY/T1JjDjwU_VI/AAAAAAAAAGY/PiHNUP83mPQ/s1600/escher7.jpeg"><img style="float: right; margin: 0pt 0pt 10px 10px; cursor: pointer; width: 224px; height: 225px;" src="http://3.bp.blogspot.com/-BUbmUfRiaTY/T1JjDjwU_VI/AAAAAAAAAGY/PiHNUP83mPQ/s320/escher7.jpeg" alt="" id="BLOGGER_PHOTO_ID_5715739789875281234" border="0" /></a><br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://3.bp.blogspot.com/-CRu3xiuQYr0/T1JhAkrccjI/AAAAAAAAAFE/yG3jdLzGj3s/s1600/eschr4.jpeg"><img style="float: left; margin: 0pt 10px 10px 0pt; cursor: pointer; width: 238px; height: 212px;" src="http://3.bp.blogspot.com/-CRu3xiuQYr0/T1JhAkrccjI/AAAAAAAAAFE/yG3jdLzGj3s/s320/eschr4.jpeg" alt="" id="BLOGGER_PHOTO_ID_5715737539560370738" border="0" /></a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-2826941074803587649?l=artspilesenglish.blogspot.com' alt='' /></div>eva armindohttp://www.blogger.com/profile/11357570640569520494noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-25493215179906268082012-02-29T00:29:00.000+01:002012-02-29T00:29:40.331+01:00INTERNATIONAL INTERSHIPLa profesora y administradora de este blog declara no tener relación económica o contractual con esta organización.<br /><a href="https://docs.google.com/viewer?a=v&pid=gmail&attid=0.1&thid=135a490954c4c1c9&mt=application/msword&url=https://mail.google.com/mail/u/0/?ui%3D2%26ik%3D4447dc0423%26view%3Datt%26th%3D135a490954c4c1c9%26attid%3D0.1%26disp%3Dsafe%26realattid%3Df_gyy7l1lg0%26zw&sig=AHIEtbRwanOFVlc8Oz1-AVuwCVL1XM-twA&pli=1">https://docs.google.com/viewer?a=v&pid=gmail&attid=0.1&thid=135a490954c4c1c9&mt=application/msword&url=https://mail.google.com/mail/u/0/?ui%3D2%26ik%3D4447dc0423%26view%3Datt%26th%3D135a490954c4c1c9%26attid%3D0.1%26disp%3Dsafe%26realattid%3Df_gyy7l1lg0%26zw&sig=AHIEtbRwanOFVlc8Oz1-AVuwCVL1XM-twA&pli=1</a> <br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/--ulRKjjlq1A/T01i8P8859I/AAAAAAAAAL8/sW9YDqTEokc/s1600/language.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/--ulRKjjlq1A/T01i8P8859I/AAAAAAAAAL8/sW9YDqTEokc/s1600/language.jpg" /></a></div><h2><span lang="ES-CR">INFORMACION IMPORTANTE PARA LAS FAMILIAS </span></h2><div align="left" class="MsoNormal" style="text-align: left;"><br /></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 36.0pt 72.0pt 108.0pt 144.0pt 180.0pt 216.0pt 252.0pt 288.0pt 324.0pt 360.0pt 396.0pt 432.0pt 468.0pt 504.0pt 540.0pt 576.0pt 612.0pt 648.0pt 684.0pt 720.0pt; text-align: justify;"><span style="font-size: 11.0pt; mso-ansi-language: ES; mso-bidi-font-size: 10.0pt;">Les agradecemos mucho el abrir su hogar y su corazón a un joven de los Estados Unidos. Esperamos que esta experiencia sea tan enriquecedora y entretenida para usted como estamos seguros será para su joven huésped. <o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 468.0pt 504.0pt 540.0pt 576.0pt 612.0pt 648.0pt 684.0pt 720.0pt; text-align: justify;"><br /></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 36.0pt 72.0pt 108.0pt 144.0pt 180.0pt 216.0pt 252.0pt 288.0pt 324.0pt 360.0pt 396.0pt 432.0pt 468.0pt 504.0pt 540.0pt 576.0pt 612.0pt 648.0pt 684.0pt 720.0pt; text-align: justify;"><b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Nivel del lenguaje y comunicación: </span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">La mayoría han estudiado español por 2 o 3 años únicamente. Su acento y parte de su vocabulario serán nuevos para ellos, y se sorprenderán de lo rápido que habla. Así como cada familia es diferente, cada estudiante lo es también, y ninguna cantidad de preparación puede cubrir toda situación. Algunos serán extrovertidos, algunos serán más corteses, algunos más abiertos, otros menos aventureros. La experiencia será una aventura de aprendizaje cuando todos pongan de su parte para entender las diferencias y disfrutar lo que descubren! <o:p></o:p></span></div><div align="left" class="MsoNormal" style="text-align: left;"><br /></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 36.0pt 72.0pt 108.0pt 144.0pt 180.0pt 216.0pt 252.0pt 288.0pt 324.0pt 360.0pt 396.0pt 432.0pt 468.0pt 504.0pt 540.0pt 576.0pt 612.0pt 648.0pt 684.0pt 720.0pt; text-align: justify;"><b><span lang="ES-CR" style="font-family: 'Tms Rmn', serif; font-size: 11pt;">El Colegio:</span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;"> Si su estudiante se encuentra con usted mientras está en la escuela, será muy interesante para él o ella acompañarlo. <o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 36.0pt 72.0pt 108.0pt 144.0pt 180.0pt 216.0pt 252.0pt 288.0pt 324.0pt 360.0pt 396.0pt 432.0pt 468.0pt 504.0pt 540.0pt 576.0pt 612.0pt 648.0pt 684.0pt 720.0pt; text-align: justify;"><br /></div><div class="MsoNormal" style="text-align: justify;"><b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Seguros medicos: </span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Si su estudiante se enferma o se ve envuelto en un accidente, por favor haga exactamente lo que haría por su propio hijo. Los participantes en el programa están cubiertos por un seguro médico muy completo. Si necesitan un tratamiento médico menor, deben pagar el costo de la visita médica allí mismo y necesitan un recibo por el monto pagado. Mandarán ese recibo a la nosotros para que se les devuelva el dinero. Por favor contacte al coordinador o su profesor de inmediato. <o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: right 20.0pt left 162.0pt 291.0pt; text-align: justify;"><br /></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: right 20.0pt left 162.0pt 291.0pt; text-align: justify;"><b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">El consumo de alcohol/tobaco/las drogas está estrictamente prohibida. </span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Como participantes del programa de Language and Friendship, todos los estudiantes han firmado un acuerdo en el que se expresa que no consumirán bebidas con contenido alcohólico, ni fumar, ni tomar drogas/marijuan. También está estrictamente regulado en los Estados Unidos. Para los estudiantes de colegio, las consecuencias <u>son severas</u>, Para sus profesores tambien, se pueden prohibir este tipo de viaje si los alumnos no siguen las reglas Es responsabilidad del estudiante rechazar cortésmente el ofrecimiento. Por favor no les ofrezca alcohol. ¡Gracias!<o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: right 20.0pt left 162.0pt 291.0pt; text-align: justify;"><br /></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: right 20.0pt left 162.0pt 291.0pt; text-align: justify;"><b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Manejar </span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">cualquier tipo de vehículo motorizado o montar en moto como pasajero está estrictamente prohibido, para seguridad de los estudiantes <u>y por motivos del seguro</u>. <o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: right 20.0pt left 162.0pt 291.0pt; text-align: justify;"><br /></div><div align="left" class="MsoNormal" style="line-height: 12.0pt; tab-stops: 18.0pt 198.0pt; text-align: left;"><b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Teléfono/internet:</span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;"> Recomendamos que los estudiantes no se ponen en contacto a sus padres y amigos en casa. El contacto frecuente aumenta la posibilidad de nostalgia y frenan la integración con su familia anfitriona. Hay poco tiempo y mucho para descubrir. <o:p></o:p></span></div><div align="left" class="MsoNormal" style="line-height: 12.0pt; tab-stops: 18.0pt 198.0pt; text-align: left;"><br /></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 237.0pt; text-align: justify;"><b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Dinero para gastar: </span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Los estudiantes traen consigo dinero para gastos normales como ir al cine, helados y souvenirs o regalos que quieran llevar de vuelta. Siéntase en confianza de explicarle al estudiante qué espera que pague por sí mismo. <o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 18.0pt 198.0pt;"><br /></div><div class="MsoNormal" style="mso-line-height-alt: 8.0pt; tab-stops: 18.0pt 198.0pt; text-align: justify;"><b><span lang="ES-CR" style="font-family: 'Tms Rmn', serif; font-size: 11pt;">SOPORTE Y AYUDA</span></b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;"><o:p></o:p></span></div><div align="left" class="MsoNormal" style="line-height: 8.0pt; tab-stops: 18.0pt 198.0pt; text-align: left;"><span lang="ES-CR" style="font-size: 2.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;"> <o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 18.0pt 198.0pt; text-align: justify;"><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Todos en Language & Friendship, así como los profesores de idiomas, <u>queremos que cada estudiante y cada familia tengan una experiencia maravillosa</u>. Si llegara a sentirse incómodo con el progreso de su estudiante al integrarse con su familia, le pedimos que converse sobre su preocupación abierta y directamente con el estudiante. Si necesita sugerencias o consejo, por favor siéntase en confianza de contactar al coordinador o al profesor guía en cualquier momento. <o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 18.0pt 198.0pt; text-align: justify;"><br /></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 18.0pt 198.0pt; text-align: justify;"><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">Cuando una experiencia depende de las relaciones humanas, es natural que emerjan situaciones que ameriten atención adicional y diplomacia! Queremos ayudar y estaremos en la mejor disposición de hacer lo necesario para asistirlos.<o:p></o:p></span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 36.0pt 72.0pt 108.0pt 144.0pt 180.0pt 216.0pt 252.0pt 288.0pt 324.0pt 360.0pt 396.0pt 432.0pt 468.0pt 504.0pt 540.0pt 576.0pt 612.0pt 648.0pt 684.0pt 720.0pt; text-align: justify;"><br /></div><div class="MsoBodyText3"><span lang="ES-CR">Estamos sumamente agradecidos con todas nuestras familias anfitrionas! Están ofreciendo una maravillosa oportunidad a estos estudiantes y a su vez contribuyendo con el entendimiento internacional. Esperamos que encuentre que esta experiencia sea de gran provecho para usted y su familia.</span></div><div class="MsoNormal" style="line-height: 12.0pt; tab-stops: 18.0pt 198.0pt;"><b><span lang="ES-CR" style="font-size: 11.0pt; mso-ansi-language: ES-CR; mso-bidi-font-size: 10.0pt;">GRACIAS!<o:p></o:p></span></b></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-2549321517990626808?l=artspilesenglish.blogspot.com' alt='' /></div>Maite profe de Dibujohttp://www.blogger.com/profile/03100012654337052049noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-79821508728059336122012-02-28T20:32:00.001+01:002012-02-28T20:32:53.058+01:00Drawing with dots<iframe src="http://player.vimeo.com/video/33091687?title=0&byline=0&portrait=0" width="711" height="400" frameborder="0" webkitAllowFullScreen mozallowfullscreen allowFullScreen></iframe><p><a href="http://vimeo.com/33091687">The Making of "Hero"</a> from <a href="http://vimeo.com/miguelendara">Miguel Endara</a> on <a href="http://vimeo.com">Vimeo</a>.</p><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7982150872805933612?l=artspilesenglish.blogspot.com' alt='' /></div>Santiago Menguezhttp://www.blogger.com/profile/06091728369277149377noreply@blogger.com2tag:blogger.com,1999:blog-3994453253456960203.post-27757778897368846442012-02-28T19:43:00.000+01:002012-02-29T19:08:55.207+01:00Self-portrait<div>He´s got dark skin. He wear a blue shirt, necktie and a grey jacket. He wear a brown hat on head.</div><div class="separator" style="clear: both; text-align: center;"></div><div>He has blacks eyebrow, a aquiline nose and a sad look. </div><div> </div><div><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-nw4RPxK7b5s/T00O1r8I73I/AAAAAAAAABg/SEIyx9qRr_4/s1600/hopper.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="http://2.bp.blogspot.com/-nw4RPxK7b5s/T00O1r8I73I/AAAAAAAAABg/SEIyx9qRr_4/s320/hopper.jpg" width="256" /></a></div><div>Eduard Hopper, a very important artist of XX century, is the painter of the U.S.A reality. He born on 1882 in New York. His works are a mix of dreams and reality that look into loneliness of contemporary men.</div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-2775777889736884644?l=artspilesenglish.blogspot.com' alt='' /></div>Davidhttp://www.blogger.com/profile/11016710314174452727noreply@blogger.com1tag:blogger.com,1999:blog-3994453253456960203.post-3354062899516540892012-02-26T18:57:00.015+01:002012-02-26T20:41:54.504+01:00OPTICAL ILLUSIONS<span style="font-style: normal; font-variant: normal; line-height: normal; "><span >An optical illusion is an illusion of our sight sense, that makes us perceive the reality wrongly. This illusions are used in some arts, like cinema or paintings. In arts, they're called trompe-l'oeils:</span></span><div><span ><br /></span><div><div style="text-align: center;"><img src="http://3.bp.blogspot.com/-TvzZEHiQEa8/T0qCc1VrIhI/AAAAAAAAAE0/bqx2Iov8osk/s400/480px-Escaping_criticism-by_pere_borrel_del_caso.png" border="0" alt="" id="BLOGGER_PHOTO_ID_5713522509138829842" style="cursor: pointer; width: 320px; height: 400px; " /></div><div><div style="font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><img src="http://1.bp.blogspot.com/-GOIWy2nFmR4/T0qC3VLT6tI/AAAAAAAAAFA/OIqXw1DLsbI/s400/Wallpainting-solingen-germany.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5713522964361898706" style="cursor: pointer; width: 300px; height: 400px; " /></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span ><br /></span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span ><br /></span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span > There are many types of optical illusions. Some of them are:</span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span > - Stereoscopic images: if you cross your eyes lightly, you can mix two similar images to create a 3-dimensions one.</span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><img src="http://1.bp.blogspot.com/-Rmj3l_-ixks/T0qEKdorosI/AAAAAAAAAFM/b2V09BY035A/s400/800px-Stereoscopic_3D_render_from_Blender.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5713524392561713858" style="cursor: pointer; width: 400px; height: 112px; " /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><img src="http://4.bp.blogspot.com/-Nlhr3xYvXOM/T0qFdWK-JhI/AAAAAAAAAFY/HVW9c2kam8w/s400/794px-Tilton_on_the_Hill_gravestone_3D.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5713525816487192082" style="text-align: left; cursor: pointer; width: 400px; height: 302px; " /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: left;font-style: normal; font-variant: normal; line-height: normal; "><span style="font-family: georgia; font-size: large; "> - Autostereogram: if you cross your eyes standing 30 cm in front of these images, you'll see as if it had 3-dimensions relief. In the first one you'll see a heart, in the second one, a shark.</span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><img src="http://2.bp.blogspot.com/-u-45A1PFDjQ/T0qHvb_orQI/AAAAAAAAAF8/719Vi_ftY34/s400/Mh_stereogramm_sis.png" border="0" alt="" id="BLOGGER_PHOTO_ID_5713528326311161090" style="text-align: center; cursor: pointer; width: 400px; height: 300px; " /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><a href="http://2.bp.blogspot.com/-FzxEURancRE/T0qHQXHsfsI/AAAAAAAAAFw/TCQ0ArdIZy0/s1600/Stereogram_Tut_Shark_Bottom_Clear.png" style="font-family: georgia; font-size: large; text-align: left; "><img src="http://2.bp.blogspot.com/-FzxEURancRE/T0qHQXHsfsI/AAAAAAAAAFw/TCQ0ArdIZy0/s400/Stereogram_Tut_Shark_Bottom_Clear.png" border="0" alt="" id="BLOGGER_PHOTO_ID_5713527792426843842" style="cursor: pointer; width: 400px; height: 205px; " /></a></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><span ><br /></span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span style="font-family: georgia; font-size: large; "><br /></span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span style="font-family: georgia; font-size: large; "> - Motion illusions: if you move your head towards and backwards the picture, looking at the point of the centre, you'll see the two circles move.</span></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><img src="http://4.bp.blogspot.com/-hHt-zgGWrfc/T0qIe7IEGSI/AAAAAAAAAGI/dFRSayKzjEw/s400/220px-Revolving_circles.svg.png" border="0" alt="" id="BLOGGER_PHOTO_ID_5713529142121863458" style="cursor: pointer; width: 220px; height: 220px; " /></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span ><br /></span></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span > - Other effects: In the first case, all the lines are pallalel, even though they don't seem to be. In the second image, the two circles are the same size. </span></div></div></div></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span ><br /></span></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><img src="http://1.bp.blogspot.com/-KwJlmictkTE/T0qKC_sd21I/AAAAAAAAAGU/kyb7WgSEdYk/s400/800px-Caf%25C3%25A9_wall.svg.png" border="0" alt="" id="BLOGGER_PHOTO_ID_5713530861335206738" style="cursor: pointer; width: 400px; height: 257px; " /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><br /></div><div style="text-align: center;font-style: normal; font-variant: normal; line-height: normal; "><img src="http://2.bp.blogspot.com/-FfaZkRC1M6o/T0qKYYecR8I/AAAAAAAAAGg/m41h7Y0hJjY/s400/650px-Mond-vergleich.svg.png" border="0" alt="" id="BLOGGER_PHOTO_ID_5713531228764522434" style="text-align: left; cursor: pointer; width: 400px; height: 246px; " /></div><div style="font-style: normal; font-variant: normal; line-height: normal; "><span ><br /></span></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-335406289951654089?l=artspilesenglish.blogspot.com' alt='' /></div>Pelayo Fernandezhttp://www.blogger.com/profile/11317279319877928548noreply@blogger.com1tag:blogger.com,1999:blog-3994453253456960203.post-80573565214582258052012-02-26T13:04:00.007+01:002012-03-01T15:37:12.162+01:00El Greco's portrait<p align="center"><a href="http://1.bp.blogspot.com/-mNZb2i2UqaI/T05Q8l4S5TI/AAAAAAAAAAc/O5mkO8zseno/s1600/El_greco.jpg"><img id="BLOGGER_PHOTO_ID_5714593979070342450" style="float: left; margin: 0px 10px 10px 0px; width: 250px; height: 284px;" alt="" src="http://1.bp.blogspot.com/-mNZb2i2UqaI/T05Q8l4S5TI/AAAAAAAAAAc/O5mkO8zseno/s320/El_greco.jpg" border="0" /></a></p>El Greco was a famous painter of the sixteen and seventeen century. He was born in Creta, Greece, in 1541 and died in 1614, in Toledo, Spain. His real name was Doménikos Theotokópoulos but they call him El Greco. He draws with a quick stroke (he don't stop in details).<br />In this portrait he was more less 55 years old. He has big eyes and a direct look. He has elongated ears and a brown chin. He has a narrow face and the hair is brown. He has small lips and a rosy cheeks. He wears typical clothes of his time. His eyebrows are small and he has a wide forehead. He has a big nose and some freckles.<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8057356521458225805?l=artspilesenglish.blogspot.com' alt='' /></div>Jorge Moraleshttp://www.blogger.com/profile/02375819704691131704noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-28181249622415443872012-02-23T20:02:00.000+01:002012-02-23T20:02:38.029+01:00RIGHT HEMISPHERE OF OUR BRAIN<div class="separator" style="clear: both; text-align: center;"><object width="320" height="266" class="BLOG_video_class" id="BLOG_video-17dc2dfe0fb13e5d" classid="clsid:D27CDB6E-AE6D-11cf-96B8-444553540000" codebase="http://download.macromedia.com/pub/shockwave/cabs/flash/swflash.cab#version=6,0,40,0"><param name="movie" value="http://www.youtube.com/get_player"><param name="bgcolor" value="#FFFFFF"><param name="allowfullscreen" value="true"><param name="flashvars" value="flvurl=http://v10.nonxt4.googlevideo.com/videoplayback?id%3D17dc2dfe0fb13e5d%26itag%3D5%26app%3Dblogger%26ip%3D0.0.0.0%26ipbits%3D0%26expire%3D1333518449%26sparams%3Did,itag,ip,ipbits,expire%26signature%3D6D68912E7C95FE88A0C3CFED6768B2D068116D25.50AEAF26D6379DB56F39E586DE9DEBA85272E4E4%26key%3Dck1&iurl=http://video.google.com/ThumbnailServer2?app%3Dblogger%26contentid%3D17dc2dfe0fb13e5d%26offsetms%3D5000%26itag%3Dw160%26sigh%3DHiDaIXDt0CZ84xmsvftCoshELwY&autoplay=0&ps=blogger"><embed src="http://www.youtube.com/get_player" type="application/x-shockwave-flash"width="320" height="266" bgcolor="#FFFFFF"flashvars="flvurl=http://v10.nonxt4.googlevideo.com/videoplayback?id%3D17dc2dfe0fb13e5d%26itag%3D5%26app%3Dblogger%26ip%3D0.0.0.0%26ipbits%3D0%26expire%3D1333518449%26sparams%3Did,itag,ip,ipbits,expire%26signature%3D6D68912E7C95FE88A0C3CFED6768B2D068116D25.50AEAF26D6379DB56F39E586DE9DEBA85272E4E4%26key%3Dck1&iurl=http://video.google.com/ThumbnailServer2?app%3Dblogger%26contentid%3D17dc2dfe0fb13e5d%26offsetms%3D5000%26itag%3Dw160%26sigh%3DHiDaIXDt0CZ84xmsvftCoshELwY&autoplay=0&ps=blogger"allowFullScreen="true" /></object></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-2818124962241544387?l=artspilesenglish.blogspot.com' alt='' /></div>Maite profe de Dibujohttp://www.blogger.com/profile/03100012654337052049noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-82147940111358931322012-02-23T17:32:00.006+01:002012-02-23T17:58:09.699+01:00SELF PORTRAIT OF PABLO PICASSO<a href="http://3.bp.blogspot.com/-TcULuuT4gAI/T0Zrj85rP6I/AAAAAAAAADU/XhvEpJnjoMI/s1600/192px-Pablo_picasso_1.jpg" onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}"><img style="float:left; margin:0 10px 10px 0;cursor:pointer; cursor:hand;width: 192px; height: 238px;" src="http://3.bp.blogspot.com/-TcULuuT4gAI/T0Zrj85rP6I/AAAAAAAAADU/XhvEpJnjoMI/s320/192px-Pablo_picasso_1.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5712371442753683362" /></a>Pablo Picasso was a very famous painter. He was sculptor too.<div><br /></div><div>In the picture he has a beret and we can´t see the hair. In really, Picasso hadn´t hair. He has very big ears and some wrinkles. His eyes are brown and the tabs are white like his hair. He has a big snub nose. In the forehead has some freckles or grains. His mouth is curved and big. He has got a brow shirt. He hasn´t mustache.</div><div>He has a wide chin and large cheeks.</div><div><br /></div><div><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8214794011135893132?l=artspilesenglish.blogspot.com' alt='' /></div>Pablo Redondohttp://www.blogger.com/profile/01849472769648189071noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-44522849947137100132012-02-23T17:20:00.004+01:002012-02-23T17:44:12.220+01:00NICANOR PIÑOLE<a href="http://1.bp.blogspot.com/-FYn3_cQreY4/T0Zsr0P5UvI/AAAAAAAAABk/co8sBgk97s8/s1600/pinol01g.jpg"><img style="MARGIN: 0px 0px 10px 10px; WIDTH: 218px; FLOAT: right; HEIGHT: 320px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5712372677381542642" border="0" alt="" src="http://1.bp.blogspot.com/-FYn3_cQreY4/T0Zsr0P5UvI/AAAAAAAAABk/co8sBgk97s8/s320/pinol01g.jpg" /></a><br /><br /><div><br />Nicanor has got black eyes and long and black hair. He has mostache. He has got a long neck. Velázquez hasn’t got freckles and he hasn’t wrinkles. He hasn’t beard. He is wearing a suit. </div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-4452284994713710013?l=artspilesenglish.blogspot.com' alt='' /></div>diego artime 1-Ahttp://www.blogger.com/profile/05488697713068795919noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-34836349955947780812012-02-21T18:07:00.000+01:002012-02-21T18:07:45.080+01:00THE GOLDEN NUMBER THE GOLDEN NUMBER<br /><br /><span style="font-size: x-small;">The golden number was dicovered by <span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;">Greek mathematicians and disciples of Pythagoras during the sixth century. It is about and harmonic geometrical figure in wich Greeks found a perfectly balances regulated </span><span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;"> </span><span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;">(with equal sides) pentagon, in wich </span><span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;">inside which they could make a five-armed star called pentacle</span><span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;"> </span><span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;">. </span></span><br /><span style="font-size: x-small;"><span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;"><br /></span></span><br /><span style="font-size: x-small;"><span style="background-color: white; font-family: Verdana, Arial, Helvetica, sans-serif; line-height: 14px; text-align: justify;">When they made the ratios between different parts of the pentacles, the number 1.618 was found by tens of times. </span><span style="background-color: white; font-family: Arial, Helvetica, sans-serif; line-height: 18px; text-align: left;">This irrational number is considered the symbol of the harmony.</span></span><br /><span style="font-size: x-small;"><span style="background-color: white; font-family: Arial, Helvetica, sans-serif; line-height: 18px; text-align: left;">It appears lots of times for example the golden number appears in "La Sagrada Familia" by Miguel Angel.</span></span><br /><a href="http://www.dav.sceu.frba.utn.edu.ar/homovidens/MirtaDiaz/Proyectofinal/Imagenes/wpe9.gif" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" src="http://www.dav.sceu.frba.utn.edu.ar/homovidens/MirtaDiaz/Proyectofinal/Imagenes/wpe9.gif" /></a><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br />AIDA ZAPICO, ALEXANDRA BRANCOVEAN,CANDELA MEGIDO<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-3483634995594778081?l=artspilesenglish.blogspot.com' alt='' /></div>Aiidahttp://www.blogger.com/profile/03883857025888426937noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-81680373549143624592012-02-21T17:34:00.003+01:002012-02-21T17:49:44.418+01:00Velazquez self-portrait<a href="http://2.bp.blogspot.com/-pgknC-7uMA0/T0PIzO10umI/AAAAAAAAAAo/sRykgJWorms/s1600/images.jpg"><img id="BLOGGER_PHOTO_ID_5711629534918654562" style="FLOAT: left; MARGIN: 0px 10px 10px 0px; WIDTH: 193px; CURSOR: hand; HEIGHT: 225px" alt="" src="http://2.bp.blogspot.com/-pgknC-7uMA0/T0PIzO10umI/AAAAAAAAAAo/sRykgJWorms/s320/images.jpg" border="0" /></a><br /><br /><div>In this self-portrait Velazquez has got long curly hair,big and dark eyebrows,black eyes,beard and a big moustache and also has an average size nose and and a very big forehead.</div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8168037354914362459?l=artspilesenglish.blogspot.com' alt='' /></div>Santiago Menguezhttp://www.blogger.com/profile/06091728369277149377noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-73778322079511001102012-02-12T18:19:00.003+01:002012-02-12T18:27:05.121+01:00SELF-PORTRAIT of GOYA<a href="http://4.bp.blogspot.com/-PXi38f6tki0/Tzf12GzmEPI/AAAAAAAAACA/CESl-nApPgo/s1600/300px-Autorretrato_Goya_1815%255B1%255D.jpg"><img id="BLOGGER_PHOTO_ID_5708301362604151026" style="FLOAT: left; MARGIN: 0px 10px 10px 0px; WIDTH: 238px; CURSOR: hand; HEIGHT: 320px" alt="" src="http://4.bp.blogspot.com/-PXi38f6tki0/Tzf12GzmEPI/AAAAAAAAACA/CESl-nApPgo/s320/300px-Autorretrato_Goya_1815%255B1%255D.jpg" border="0" /></a><br /><br /><div></div><br /><div></div><br /><div>In this picture we can look some things like:<br /></div><br /><div>He has got a round head. He has got short, curly and brown hair. His front is wide. His eyes are small and dark. </div><br /><div>He has got big ears; his nose is very big; his frings is dark and his eyebrows are enormous. We cannot see his eyelids.<br />His lips are thick. The mouth is big, we cannot see his teeth, he hasn´t got mustache and his chin is small.<br />He has got a white shirt and a brown jacket.<br /><br /><br />HÉCTOR CORREDOIRAS</div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7377832207951100110?l=artspilesenglish.blogspot.com' alt='' /></div>hectorhttp://www.blogger.com/profile/00862407947285495604noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-31020586139546719912012-02-09T00:24:00.000+01:002012-02-09T00:24:46.184+01:00It´s very funny<a href="http://4.bp.blogspot.com/-KUqzMrEuiCA/TzMEJjWMBaI/AAAAAAAAALg/33cGAWJplDU/s1600/guante.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="383" src="http://4.bp.blogspot.com/-KUqzMrEuiCA/TzMEJjWMBaI/AAAAAAAAALg/33cGAWJplDU/s400/guante.jpg" width="400" /></a>If you have lost a glove , you would create this loving toy!<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-3102058613954671991?l=artspilesenglish.blogspot.com' alt='' /></div>Maite profe de Dibujohttp://www.blogger.com/profile/03100012654337052049noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-4017373147052087322012-02-08T21:17:00.001+01:002012-02-08T21:17:15.719+01:00Juana de ArcoJuana de Arco<br />She has brown hair, blue eyes, white skin, and plane nose. They have a valent expresion.<br /><div class="separator" style="clear: both; text-align: center;"><a href="http://monsignorepuenteochoa.files.wordpress.com/2010/05/portrait_jeanne_darc.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://monsignorepuenteochoa.files.wordpress.com/2010/05/portrait_jeanne_darc.jpg" /></a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-401737314705208732?l=artspilesenglish.blogspot.com' alt='' /></div>Joaquín García Garcíahttp://www.blogger.com/profile/08093442856633148372noreply@blogger.com1tag:blogger.com,1999:blog-3994453253456960203.post-28451076980652451502012-02-08T16:33:00.006+01:002012-02-08T17:01:45.287+01:00leonardo da vinci<a href="http://4.bp.blogspot.com/-NfXZ2FHkCc4/TzKaKP-v9xI/AAAAAAAAABA/9NfTL43NQRk/s1600/da%2Bvinciii.jpg"><img style="float:left; margin:0 10px 10px 0;cursor:pointer; cursor:hand;width: 320px; height: 226px;" src="http://4.bp.blogspot.com/-NfXZ2FHkCc4/TzKaKP-v9xI/AAAAAAAAABA/9NfTL43NQRk/s320/da%2Bvinciii.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5706793178710931218" /></a>Leonardo Da Vinci was very old.He had white beard,mustache and hair.He had brown eyes and big nose<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-2845107698065245150?l=artspilesenglish.blogspot.com' alt='' /></div>miguel cotrinahttp://www.blogger.com/profile/16034396975547853526noreply@blogger.com1tag:blogger.com,1999:blog-3994453253456960203.post-83684948481106565992012-02-07T23:50:00.001+01:002012-02-07T23:51:36.636+01:00AN EXAMPLE FOR ACTIVITY 3<div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-pc2eIskzWZ4/TzGqrOTCg9I/AAAAAAAAALY/T6yzudQqOkw/s1600/activity3.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="310" src="http://4.bp.blogspot.com/-pc2eIskzWZ4/TzGqrOTCg9I/AAAAAAAAALY/T6yzudQqOkw/s400/activity3.jpg" width="400" /></a></div>PUPILS, please, don´t copy the next example . It´s only a guide for you. Read carefully the instructions of your worksheet.<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8368494848110656599?l=artspilesenglish.blogspot.com' alt='' /></div>Maite profe de Dibujohttp://www.blogger.com/profile/03100012654337052049noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-36752789882259609282012-02-06T20:52:00.001+01:002012-03-01T20:47:25.899+01:00Vicent Van Gogh<div class="separator" style="border: medium none; clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/--mYSHIm3zUo/TzAvN3MIOLI/AAAAAAAAAC8/rnikWMBg_x8/s1600/van+goh.2jpeg.jpeg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img sda="true" src="http://4.bp.blogspot.com/--mYSHIm3zUo/TzAvN3MIOLI/AAAAAAAAAC8/rnikWMBg_x8/s1600/van+goh.2jpeg.jpeg" border="0" /></a></div><div class="MsoNormal" style="border: medium none; margin: 0cm 0cm 0pt;"><shapetype coordsize="21600,21600" filled="f" id="_x0000_t75" preferrelative="t" spt="75" path="m@4@5l@4@11@9@11@9@5xe" stroked="f"><stroke joinstyle="miter"></stroke><formulas><f eqn="if lineDrawn pixelLineWidth 0"></f><f eqn="sum @0 1 0"></f><f eqn="sum 0 0 @1"></f><f eqn="prod @2 1 2"></f><f eqn="prod @3 21600 pixelWidth"></f><f eqn="prod @3 21600 pixelHeight"></f><f eqn="sum @0 0 1"></f><f eqn="prod @6 1 2"></f><f eqn="prod @7 21600 pixelWidth"></f><f eqn="sum @8 21600 0"></f><f eqn="prod @7 21600 pixelHeight"></f><f eqn="sum @10 21600 0"></f></formulas><path gradientshapeok="t" connecttype="rect" extrusionok="f"></path><lock aspectratio="t" ext="edit"></lock></shapetype><span lang="EN-GB" style="font-size:100%;">Vicent Van Gogh was a painter of the XIX century. </span><span style="font-size:100%;">He painted many famous pictures, like “The yellow house”, “The sunflowers” or “The starry night”.</span></div><div class="MsoNormal" style="border: medium none; margin: 0cm 0cm 0pt;"><span style="font-size:100%;"><br /></span></div><div class="MsoNormal" style="border: medium none; margin: 0cm 0cm 0pt;"><span style="font-size:100%;"><a href="http://3.bp.blogspot.com/-c7My7rH4Nxo/TzAvHC9dd8I/AAAAAAAAAC0/y7iCM3FxYK0/s1600/van+goh.jpeg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img sda="true" src="http://3.bp.blogspot.com/-c7My7rH4Nxo/TzAvHC9dd8I/AAAAAAAAAC0/y7iCM3FxYK0/s1600/van+goh.jpeg" border="0" /></a><shape id="_x0000_s1027" style="height: 179.25pt; margin-left: 127.5pt; margin-top: 7pt; position: absolute; width: 150pt; z-index: 2;" type="#_x0000_t75"><imagedata title="van goh" src="file:///C:%5CDOCUME%7E1%5CESCUEL%7E1%5CCONFIG%7E1%5CTemp%5Cmsohtml1%5C02%5Cclip_image003.jpg"></imagedata><wrap type="square"></wrap></shape></span><span lang="EN-GB" style="font-size:100%;"><span style=""> </span>Van Gogh had red moustache and red barb. He had red thin hair too, and he had big eyebrows.</span></div><div class="MsoNormal" style="border: medium none; margin: 0cm 0cm 0pt;"><span lang="EN-GB" style="font-size:16pt;"><span style="font-size:100%;">His eyes were small and blue, and his nose was big. He had no a ear, because one night Van Gogh cut it himself. His mouth was small, and his neck too. His face was very sharp.<br />In these self-portraits, he was in blue suit and in yellow jacket of an countryman, with a straw hat .</span><span style=""><br /></span></span></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-3675278988225960928?l=artspilesenglish.blogspot.com' alt='' /></div>eva armindohttp://www.blogger.com/profile/11357570640569520494noreply@blogger.com2tag:blogger.com,1999:blog-3994453253456960203.post-15211020351566966512012-02-05T23:00:00.006+01:002012-02-07T23:15:12.133+01:00Describe features of any portrait<div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-xcpdmTU6SnA/TzGf0K_a_lI/AAAAAAAAALQ/P8QOySdAMYE/s1600/rafael.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="230" src="http://2.bp.blogspot.com/-xcpdmTU6SnA/TzGf0K_a_lI/AAAAAAAAALQ/P8QOySdAMYE/s400/rafael.jpg" width="400" /></a><span style="background-color: white; color: grey; font-family: 'lucida grande', tahoma, verdana, arial, sans-serif; font-size: 11px; line-height: 14px; text-align: left;">From</span><span style="background-color: white; color: grey; font-family: 'lucida grande', tahoma, verdana, arial, sans-serif; font-size: 11px; line-height: 14px; text-align: left;"> </span><a href="http://www.wikipedia.org/" rel="nofollow" style="background-color: white; color: #3b5998; cursor: pointer; font-family: 'lucida grande', tahoma, verdana, arial, sans-serif; font-size: 11px; line-height: 14px; text-align: left; text-decoration: none;" target="_blank">Wikipedia</a><span style="background-color: white; color: grey; font-family: 'lucida grande', tahoma, verdana, arial, sans-serif; font-size: 11px; line-height: 14px; text-align: left;">, the free encyclopaedia</span></div><div style="background-color: white; color: #333333; font-family: 'lucida grande', tahoma, verdana, arial, sans-serif; font-size: 11px; line-height: 14px; margin-bottom: 1em; margin-top: 1em; text-align: left;"><b>Giulia Farnese</b> (1474 – 23 March 1524) was mistress to <a href="http://www.facebook.com/pages/w/132159860152901" style="color: #3b5998; cursor: pointer; text-decoration: none;">Pope Alexander VI</a>. She was known as<b>Giulia la bella</b>, meaning "Julia the beautiful", in Italian. <a href="http://www.facebook.com/pages/w/138772452818417" style="color: #3b5998; cursor: pointer; text-decoration: none;">Lorenzo Pucci</a> described her as "most lovely to behold". <a href="http://www.facebook.com/pages/w/107896549230601" style="color: #3b5998; cursor: pointer;">Cesare Borgia</a>, son of Alexander VI, described her as having "dark colouring, black eyes, round face and a particular ardor"<br /><br />A restoration of the painting in 1934-36 confirmed art historian <a href="http://www.facebook.com/pages/w/215398308504183" style="color: #3b5998; cursor: pointer; text-decoration: none;">Roberto Longhi</a>'s hypothesis that the work was by Raphael, and the removal of heavy repainting revealed the <a href="http://www.facebook.com/pages/w/109492482410694" style="color: #3b5998; cursor: pointer; text-decoration: none;">unicorn</a>, traditionally a symbol of purity in medieval romance, in place of a Saint Catherine's wheel. Later restoration work on the painting in 1959 revealed the image of a dog, even earlier than the unicorn, also a symbol of chastity and conjugal fidelity <br /><br /><br /></div><a href="http://1.bp.blogspot.com/-iEnQjwLBldQ/Ty77zrEeD5I/AAAAAAAAALI/dPA4Eq0Bywg/s1600/ingres.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;">Lady with a unicorn, (Giulia Farnese) by Rafael di Sanzio(1505) </a><a href="http://1.bp.blogspot.com/-iEnQjwLBldQ/Ty77zrEeD5I/AAAAAAAAALI/dPA4Eq0Bywg/s1600/ingres.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><br /></a><a href="http://1.bp.blogspot.com/-iEnQjwLBldQ/Ty77zrEeD5I/AAAAAAAAALI/dPA4Eq0Bywg/s1600/ingres.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="640" src="http://1.bp.blogspot.com/-iEnQjwLBldQ/Ty77zrEeD5I/AAAAAAAAALI/dPA4Eq0Bywg/s640/ingres.jpg" width="489" /></a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-1521102035156696651?l=artspilesenglish.blogspot.com' alt='' /></div>Maite profe de Dibujohttp://www.blogger.com/profile/03100012654337052049noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-1656370844348356762012-02-05T22:52:00.001+01:002012-02-05T22:54:28.968+01:00Describing physical appearance<div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-3Ggn5RSWXDs/Ty738EFeWjI/AAAAAAAAAKw/f6xNU9dvLX8/s1600/physical-appearance.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="640" src="http://3.bp.blogspot.com/-3Ggn5RSWXDs/Ty738EFeWjI/AAAAAAAAAKw/f6xNU9dvLX8/s640/physical-appearance.jpg" width="438" /></a></div><div class="separator" style="clear: both; text-align: center;"></div><div class="" style="clear: both;">Describing People </div><div class="separator" style="clear: both;"> HEIGHT / WEIGHT </div><div class="separator" style="clear: both;">FACE / HAIR CLOTHES / <a href="http://3.bp.blogspot.com/-v15PBqMJJsU/Ty75ssNMrpI/AAAAAAAAAK4/0Dt7X16KKzk/s1600/description.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="148" src="http://3.bp.blogspot.com/-v15PBqMJJsU/Ty75ssNMrpI/AAAAAAAAAK4/0Dt7X16KKzk/s400/description.jpg" width="400" /></a></div><div class="separator" style="clear: both;">Is she </div><div class="separator" style="clear: both;">• obese </div><div class="separator" style="clear: both;">• fat </div><div class="separator" style="clear: both;">• slightly overweight </div><div class="separator" style="clear: both;">• well-built </div><div class="separator" style="clear: both;">• heavily built </div><div class="separator" style="clear: both;">• of average build </div><div class="separator" style="clear: both;">• slightly built </div><div class="separator" style="clear: both;">• slim </div><div class="separator" style="clear: both;">• thin / skinny / bony ?</div><div class="separator" style="clear: both;">Is she </div><div class="separator" style="clear: both;">• tall </div><div class="separator" style="clear: both;">• of medium height </div><div class="separator" style="clear: both;">• shortish </div><div class="separator" style="clear: both;">• short / tiny ?</div><div class="separator" style="clear: both;">Is she </div><div class="separator" style="clear: both;">• curvy ?</div><div class="separator" style="clear: both;">(flat/small-breasted, </div><div class="separator" style="clear: both;">large-breasted) </div><div class="separator" style="clear: both;">Does she have </div><div class="separator" style="clear: both;">• thin waist </div><div class="separator" style="clear: both;">• big hips </div><div class="separator" style="clear: both;">• nice shapely legs </div><div class="separator" style="clear: both;">• firm belly muscles </div><div class="separator" style="clear: both;">• lovely figure ?</div><div class="separator" style="clear: both;">Is she </div><div class="separator" style="clear: both;">• pretty </div><div class="separator" style="clear: both;">• attractive </div><div class="separator" style="clear: both;">• lovely and charming </div><div class="separator" style="clear: both;"><br /></div><div class="separator" style="clear: both;">FACE / HAIR</div><div class="separator" style="clear: both;"></div><div class="separator" style="clear: both;">Is she </div><div class="separator" style="clear: both;">• long-sighted/short-sighted ?</div><div class="separator" style="clear: both;">Is she wearing </div><div class="separator" style="clear: both;">• glasses / contact lenses </div><div class="separator" style="clear: both;">• smart clothes </div><div class="separator" style="clear: both;">• elegant clothes </div><div class="separator" style="clear: both;">• casual clothes </div><div class="separator" style="clear: both;">• shabby clothes </div><div class="separator" style="clear: both;">• jewellery ?</div><br /><div class="separator" style="clear: both;"><br /></div><div class="separator" style="clear: both;"></div><div class="separator" style="clear: both;">Does she have </div><div class="separator" style="clear: both;">• round / oval / square / heart shaped face </div><div class="separator" style="clear: both;">• bushy / thick / thin eyebrows </div><div class="separator" style="clear: both;">• round / almond / narrow / close-set eyes </div><div class="separator" style="clear: both;">• broad / flat / sharp / button / fake nose </div><div class="separator" style="clear: both;">• full / thin / well-defined lips </div><div class="separator" style="clear: both;">• broad smile / charming smile </div><div class="separator" style="clear: both;">• healthy / damaged teeth / (tooth) braces </div><div class="separator" style="clear: both;">• wrinkles / freckles / pimples / smooth skin </div><div class="separator" style="clear: both;">• moustache / beard ?</div><br /><div class="separator" style="clear: both;"></div><div class="separator" style="clear: both;"><a href="http://3.bp.blogspot.com/-i11OwMAxnQU/Ty76Ex3XVVI/AAAAAAAAALA/D9ZLhWNfnM0/s1600/FACE1.gif" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="316" src="http://3.bp.blogspot.com/-i11OwMAxnQU/Ty76Ex3XVVI/AAAAAAAAALA/D9ZLhWNfnM0/s320/FACE1.gif" width="320" /></a><b><i><br /></i></b></div><div class="" style="clear: both;"><b><i>Does she have </i></b></div><div class="" style="clear: both;">• thick / rich / strong / healthy / shiny hair </div><div class="" style="clear: both;">• damaged hair / split ends </div><div class="" style="clear: both;">• thin hair / receding hair </div><div class="" style="clear: both;">• straight / wavy / curly hair </div><div class="" style="clear: both;">• spiky hair </div><div class="separator" style="clear: both;">• fringe </div><div class="" style="clear: both;">• permed hair </div><div class="" style="clear: both;">• coloured / dyed hair </div><div class="" style="clear: both;">• bleached hair / highlights </div><div class="" style="clear: both;">• pigtails / ponytail / braids / bun / dreads </div><div class="" style="clear: both;">• pull your hair back/put your hair up (with </div><div class="separator" style="clear: both;">a clip or an elastic band)</div><div class="separator" style="clear: both;">• long / short / shoulder-length </div><br /><div class="separator" style="clear: both;">•</div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-165637084434835676?l=artspilesenglish.blogspot.com' alt='' /></div>Maite profe de Dibujohttp://www.blogger.com/profile/03100012654337052049noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-51220952377732495772012-02-05T19:32:00.002+01:002012-02-05T19:32:38.425+01:00The Golden Number<div dir="ltr" style="text-align: left;" trbidi="on"><br /><div class="MsoNormal"><span lang="EN-US">The golden number is found in the design andbeauty of nature and also be used to achieve beauty and balance forming a goodproportion. The golden section is also called the divine proportion (generallyin the Renaissance period)<o:p></o:p></span></div><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-O0BQ4RTLVlw/Ty7KqaZiTKI/AAAAAAAAANs/ZwEdJQjIYhM/s1600/leonardo-supper.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="183" src="http://1.bp.blogspot.com/-O0BQ4RTLVlw/Ty7KqaZiTKI/AAAAAAAAANs/ZwEdJQjIYhM/s320/leonardo-supper.jpg" width="320" /></a></div><br /><br /><br /><div class="MsoNormal"><span lang="EN-US">The goldensection was used by Leonardo da vinci. “The last supper” was based on thegolden section, golden rectangles are the most visually and they’re based on amathematical radio.<o:p></o:p></span></div><br /><br /><br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-y_c94Pm3Yfk/Ty7Kr8Oe_rI/AAAAAAAAAN0/W_EV6FaXAK0/s1600/lastsupp.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://2.bp.blogspot.com/-y_c94Pm3Yfk/Ty7Kr8Oe_rI/AAAAAAAAAN0/W_EV6FaXAK0/s1600/lastsupp.jpg" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;">Candela Megido, Alexandra Brancovean, Aida Zapico</div><div class="MsoNormal"><span lang="EN-US"><br /></span></div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-5122095237773249577?l=artspilesenglish.blogspot.com' alt='' /></div>clandelashttp://www.blogger.com/profile/16545168403564318969noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-30370845923638610612012-01-28T11:56:00.003+01:002012-01-28T11:59:51.438+01:00SimilarityI think that the letter V is similar than a Scissors<br /><a href="http://4.bp.blogspot.com/-z9ZESES4J0A/TyPU4zMDooI/AAAAAAAAADQ/Eo_mky8sVIM/s1600/images%2B%25287%2529.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 204px; height: 204px;" src="http://4.bp.blogspot.com/-z9ZESES4J0A/TyPU4zMDooI/AAAAAAAAADQ/Eo_mky8sVIM/s320/images%2B%25287%2529.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702635625459720834" /></a><br /><a href="http://4.bp.blogspot.com/-__8q1hxSyCI/TyPU4_fTjBI/AAAAAAAAADI/yKjrG22gAfY/s1600/images%2B%25286%2529.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 196px; height: 258px;" src="http://4.bp.blogspot.com/-__8q1hxSyCI/TyPU4_fTjBI/AAAAAAAAADI/yKjrG22gAfY/s320/images%2B%25286%2529.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702635628761680914" /></a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-3037084592363861061?l=artspilesenglish.blogspot.com' alt='' /></div>Miguel Garciahttp://www.blogger.com/profile/01788464253840888806noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-6788653549135540522012-01-28T11:54:00.002+01:002012-01-28T11:55:35.933+01:00SimilarityI think that the letter A is similar than a high-heels<a href="http://2.bp.blogspot.com/-r172uk9JsVc/TyPT-yQ1obI/AAAAAAAAADA/R2dXkpPGWNs/s1600/images%2B%25285%2529.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 204px; height: 240px;" src="http://2.bp.blogspot.com/-r172uk9JsVc/TyPT-yQ1obI/AAAAAAAAADA/R2dXkpPGWNs/s320/images%2B%25285%2529.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702634628778926514" /></a><br /><a href="http://1.bp.blogspot.com/-xIUH2ZeK2DU/TyPT-wFQ0oI/AAAAAAAAACw/1Wc_S3LpLIo/s1600/images%2B%25284%2529.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 225px; height: 225px;" src="http://1.bp.blogspot.com/-xIUH2ZeK2DU/TyPT-wFQ0oI/AAAAAAAAACw/1Wc_S3LpLIo/s320/images%2B%25284%2529.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702634628193505922" /></a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-678865354913554052?l=artspilesenglish.blogspot.com' alt='' /></div>Miguel Garciahttp://www.blogger.com/profile/01788464253840888806noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-32993522895670146632012-01-28T11:46:00.003+01:002012-01-28T11:50:44.735+01:00SimilarityI think that a comb is similar than the fire<br /><a href="http://1.bp.blogspot.com/-XwjniF0Ufqs/TyPSgypUyTI/AAAAAAAAACg/PdBGUBXyK3g/s1600/images%2B%25283%2529.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 259px; height: 194px;" src="http://1.bp.blogspot.com/-XwjniF0Ufqs/TyPSgypUyTI/AAAAAAAAACg/PdBGUBXyK3g/s320/images%2B%25283%2529.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702633013973928242" /></a><br /><a href="http://3.bp.blogspot.com/-kke0zEMcqxc/TyPSgv9P0bI/AAAAAAAAACY/5skEW_voPOM/s1600/images%2B%25282%2529.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 225px; height: 225px;" src="http://3.bp.blogspot.com/-kke0zEMcqxc/TyPSgv9P0bI/AAAAAAAAACY/5skEW_voPOM/s320/images%2B%25282%2529.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702633013252182450" /></a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-3299352289567014663?l=artspilesenglish.blogspot.com' alt='' /></div>Miguel Garciahttp://www.blogger.com/profile/01788464253840888806noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-1439069705722353912012-01-28T11:41:00.003+01:002012-01-28T11:45:30.115+01:00SimilarityI think that a clock is similar than a flower<br /><a href="http://3.bp.blogspot.com/-wdGg9O8gJqs/TyPReSGw1iI/AAAAAAAAACI/G1cWd3SR2n4/s1600/images%2B%25281%2529.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 224px; height: 224px;" src="http://3.bp.blogspot.com/-wdGg9O8gJqs/TyPReSGw1iI/AAAAAAAAACI/G1cWd3SR2n4/s320/images%2B%25281%2529.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702631871367665186" /></a><br /><a href="http://4.bp.blogspot.com/-U4jD9Pz34Nw/TyPReDZKicI/AAAAAAAAACA/EB61XjFBqk0/s1600/images.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 229px; height: 220px;" src="http://4.bp.blogspot.com/-U4jD9Pz34Nw/TyPReDZKicI/AAAAAAAAACA/EB61XjFBqk0/s320/images.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5702631867418315202" /></a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-143906970572235391?l=artspilesenglish.blogspot.com' alt='' /></div>Miguel Garciahttp://www.blogger.com/profile/01788464253840888806noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-29818734537983156212012-01-26T16:51:00.004+01:002012-01-26T17:04:16.666+01:00The divine proportion<br /><br />El entierro del señor Orgaz, populary called El Entierro del conde Orgaz is a large painting painted by El Greco (1541-1614). Is and oil painting, done for parish of Santo Tomé, in Toledo, between 1586 and 1588. The painting is preserved in this place and is considered one of the best works of the author and is one of the most admired.<br /><br />In this painting we can see that that the lower part of the painting is based on thedivine proportion, whereas the higher part is based the MysticPentagram and the pentagon which fits in it.<br /><br /><a href="http://3.bp.blogspot.com/-lDFArzVokfY/TyF2kY_-kyI/AAAAAAAAAFY/apCs7fH4TX8/s1600/orgaz2.jpg"><img id="BLOGGER_PHOTO_ID_5701968970785919778" style="DISPLAY: block; MARGIN: 0px auto 10px; WIDTH: 253px; CURSOR: hand; HEIGHT: 320px; TEXT-ALIGN: center" alt="" src="http://3.bp.blogspot.com/-lDFArzVokfY/TyF2kY_-kyI/AAAAAAAAAFY/apCs7fH4TX8/s320/orgaz2.jpg" border="0" /></a><br />Iratxe and Lucía<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-2981873453798315621?l=artspilesenglish.blogspot.com' alt='' /></div>Lucía Gimeno Fernándezhttp://www.blogger.com/profile/11997548339332713794noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-57289958637153351002012-01-20T20:32:00.001+01:002012-01-20T20:37:56.764+01:00The Golden Number<a href="http://3.bp.blogspot.com/-q7br779G1U4/TxnA8kuyrTI/AAAAAAAAAKQ/bIy20BcuY8E/s1600/leda+at%25C3%25B3mica.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="313" src="http://3.bp.blogspot.com/-q7br779G1U4/TxnA8kuyrTI/AAAAAAAAAKQ/bIy20BcuY8E/s320/leda+at%25C3%25B3mica.jpg" width="320" /></a><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;">Dalí painted in 1949 a painting called <i style="mso-bidi-font-style: normal;">Leda atómica. </i>It represent centuries of mathematics and symbolic tradition (especially Pythagoras ‘ideas). It is a drawing based on the golden number, but it is making in a way that is not easy to see. Looking the sketch which Dalí painting on 1947, we can observe that Dalí care about the geometric aspect. Besides, the painting is based in the Pythagoras’ pentagon.</span><br /><br /><br /><br /><br /><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;">Lucía and Iratxe</span><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-5728995863715335100?l=artspilesenglish.blogspot.com' alt='' /></div>Iratxe Estevehttp://www.blogger.com/profile/15404802154736127707noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-8037511429777813662012-01-19T20:29:00.000+01:002012-01-19T20:29:24.990+01:00The Golden Number<div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/-hN2iReg2Nrs/TxhuvFi_C9I/AAAAAAAAAKI/pvw_Xx-ltjg/s1600/la+place+du+nombre+d%2527or.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="http://1.bp.blogspot.com/-hN2iReg2Nrs/TxhuvFi_C9I/AAAAAAAAAKI/pvw_Xx-ltjg/s320/la+place+du+nombre+d%2527or.jpg" width="319" /></a></div><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;">In Montepellier, Spanish postmodern architect Ricardo Bofill, designed "The square of the number Golden". Ricardo Bofill, is one of most important Spanish architects and is highly regarded in the world of the architecture and urbanism. </span><span lang="EN-US" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-US;">Place du Nombre d’Or </span><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;">or</span><span lang="EN-US" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-US;"> Plaza in Montellier, France was built in 1984. </span><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;">Its structure responds to the geometric principles</span><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-US;"> </span><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;">of harmony, based on the rules of the number of gold. The perimeter of the square, of twelve metres thick, is occupied by houses. The floor of the square distributes the apartments in three semicircles, four corners and a gateway to the square. The semicircles consist of 12X12metres square modules distributed according to the geometry of the decagon. The curvature is close which causes an appearance of individual homes that stand out, whereas, there is a continuous internal façade. The houses of the corners and the door of the square are quite different.</span><br /><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;"> </span><br /><span lang="EN-GB" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-GB;">Iratxe and Lucía</span><span lang="EN-US" style="font-family: "Times New Roman","serif"; font-size: 12pt; mso-ansi-language: EN-US;"><o:p></o:p></span><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-803751142977781366?l=artspilesenglish.blogspot.com' alt='' /></div>Iratxe Estevehttp://www.blogger.com/profile/15404802154736127707noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-64346147215682228262012-01-19T16:54:00.005+01:002012-01-19T19:02:18.681+01:00The Golden Number<br /><br />Goya worked on this painting for the Spanish monarchy, in Madrid from the year 1780 until 1783. This picture represents the Royal family, the Kings Charles IV and Maria Luisa are the key figures.<br />In this painting the symmetry is not present, despite the fact that at first see it may seem. The axis of the composition is the child of red (dressed as this color to stand out that role) and is aligned with the painting that is on its back. The proportion that Goya used makes the right side, with respect to the axis, smaller than the left side. This is due to the Golden Number that is a synonym for harmony.<br />To give dynamism to the scene, because as you can see in the image everything seems to be straight lines, we can look at studied line that create the heads and the position of the feet of the people in the painting.<br /><br /><br /><br /><br /><div><br /></div><br /><br /><br /><br /><p><img id="BLOGGER_PHOTO_ID_5699372623437303378" style="DISPLAY: block; MARGIN: 0px auto 10px; WIDTH: 365px; CURSOR: hand; HEIGHT: 257px; TEXT-ALIGN: center" alt="" src="http://4.bp.blogspot.com/-_OwGDjNivEs/Txg9NFaRDlI/AAAAAAAAAFA/UXiHyn9A3YI/s320/untitled.bmp" border="0" /><img id="BLOGGER_PHOTO_ID_5699372934212813122" style="DISPLAY: block; MARGIN: 0px auto 10px; WIDTH: 349px; CURSOR: hand; HEIGHT: 326px; TEXT-ALIGN: center" alt="" src="http://2.bp.blogspot.com/-eig2JjlJb-Y/Txg9fLI7AUI/AAAAAAAAAFM/6gAZhmHrooI/s320/goya.bmp" border="0" /><br /></p>Iratxe and Lucía<br /><br /><br /><br /><p></p><br /><br /><br /><br /><p></p><br /><br /><br /><br /><p><br /></p><br /><br /><br /><br /><div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-6434614721568222826?l=artspilesenglish.blogspot.com' alt='' /></div>Lucía Gimeno Fernándezhttp://www.blogger.com/profile/11997548339332713794noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-70501712958329694892012-01-16T22:07:00.001+01:002012-01-16T22:07:47.286+01:00SImilarity with the knob.<div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-lQbL_I8YU0E/TxSRM9HA2FI/AAAAAAAAACo/BO89tXas9pQ/s1600/kakuke.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="237" src="http://2.bp.blogspot.com/-lQbL_I8YU0E/TxSRM9HA2FI/AAAAAAAAACo/BO89tXas9pQ/s320/kakuke.png" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-Wf2dtNtanR0/TxSRUUFIQ7I/AAAAAAAAACw/guZNZTUZg9Q/s1600/pomo_puerta_20.gran.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="240" src="http://4.bp.blogspot.com/-Wf2dtNtanR0/TxSRUUFIQ7I/AAAAAAAAACw/guZNZTUZg9Q/s320/pomo_puerta_20.gran.jpg" width="320" /></a></div>I think that the knob of the door i similar that the exercise weights.<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7050171295832969489?l=artspilesenglish.blogspot.com' alt='' /></div>Marinahttp://www.blogger.com/profile/09302528566424800834noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-40371255426854374022012-01-16T21:49:00.000+01:002012-01-16T21:49:08.125+01:00Similarity with the whaleI think that modern submarines are usually whale-shaped.<br /><br /><a href="http://1.bp.blogspot.com/-oqfycoVWJdo/TxSL0uTPazI/AAAAAAAAACg/xQN2lMHpgms/s1600/submarine.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" src="http://1.bp.blogspot.com/-oqfycoVWJdo/TxSL0uTPazI/AAAAAAAAACg/xQN2lMHpgms/s1600/submarine.jpg" /></a><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><a href="http://1.bp.blogspot.com/-a6GLECCI_HU/TxSLukFrYYI/AAAAAAAAACY/aptnisJDuuk/s1600/ballena1.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="149" src="http://1.bp.blogspot.com/-a6GLECCI_HU/TxSLukFrYYI/AAAAAAAAACY/aptnisJDuuk/s320/ballena1.jpg" width="320" /></a><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-4037125542685437402?l=artspilesenglish.blogspot.com' alt='' /></div>Marinahttp://www.blogger.com/profile/09302528566424800834noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-60687128506148964892012-01-15T18:43:00.002+01:002012-01-15T18:46:18.159+01:00DIVINE PROPORTION IN TORONTOThe CN Tower in Toronto, the tallest tower and freestanding structure in the world, has contains the golden ratio in its design. The ratio of observation deck at 342 meters to the total height of 553.33 is 0.618 or phi, the reciprocal of Phi!<br /><br /><br /><br /><br /><br /><p></p><br /><p><img style="TEXT-ALIGN: center; MARGIN: 0px auto 10px; WIDTH: 102px; DISPLAY: block; HEIGHT: 320px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5697916285420004146" border="0" alt="" src="http://1.bp.blogspot.com/-zDfwi7gubho/TxMQrDhfYzI/AAAAAAAAACE/qBCnTpggR-g/s320/TRALLALA.bmp" /><br /><br />MARÍA CARRACEDO DE VEGA Y PILAR SUAREZ 3ºB</p><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-6068712850614896489?l=artspilesenglish.blogspot.com' alt='' /></div>Maríahttp://www.blogger.com/profile/02383057001947561016noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-59593073589759562002012-01-15T18:39:00.003+01:002012-01-15T18:43:02.355+01:00DIVINE PROPORTION IN TAJ MAHAL<div>Renaissance artists of the 1500's in the time of Leonardo Da Vinci knew it as the Divine Proportion. In India, it was used in the construction of the Taj Mahal, which was completed in 1648.</div><br /><img style="TEXT-ALIGN: center; MARGIN: 0px auto 10px; WIDTH: 164px; DISPLAY: block; HEIGHT: 150px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5697915353781816434" border="0" alt="" src="http://1.bp.blogspot.com/-V_kkBRBJNmQ/TxMP005ozHI/AAAAAAAAAB4/UXkhL7p1hT0/s320/PIRIPIRIII.bmp" />MARIA CARRACEDO Y PILAR SUAREZ 3ºB<br /><br /><div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-5959307358975956200?l=artspilesenglish.blogspot.com' alt='' /></div>Maríahttp://www.blogger.com/profile/02383057001947561016noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-50920551639515243992012-01-15T18:26:00.002+01:002012-01-15T18:36:24.526+01:00PHI IN PYRAMIDESPhi , the Golden Section, has been used by mankind for centuries in architecture<br />Its use started as early as with the Egyptians in the design of the pyramids. When the basic phi relationships are used to create a right triangle, it forms the dimensions of the <a href="http://www.goldennumber.net/architecture.htm">great pyramids</a> of Egypt, with the geometry shown below creating an angle of 51.83 degrees, the cosine of which is phi, or 0.618.<br /><br /><br /><p>MARÍA CARRACEDO Y PILAR SUÁREZ 3ºB<img style="TEXT-ALIGN: center; MARGIN: 0px auto 10px; WIDTH: 140px; DISPLAY: block; HEIGHT: 106px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5697913458835230754" border="0" alt="" src="http://2.bp.blogspot.com/-RSPVEqWWnTQ/TxMOGhrKkCI/AAAAAAAAABs/Me-7dwqu5js/s320/chuchuuuu.gif" /></p><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-5092055163951524399?l=artspilesenglish.blogspot.com' alt='' /></div>Maríahttp://www.blogger.com/profile/02383057001947561016noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-65973618581419624382012-01-15T17:03:00.001+01:002012-01-15T17:08:31.161+01:00<h2 style="background-color: white; color: #cc0000; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif; text-align: center;">Fibonacci's Rabbits</h2><div style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">The original problem that Fibonacci investigated (in the year 1202) was about how fast rabbits could breed in ideal circumstances.</div><div style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;"><img align="left" alt="Fluffy bunnies" height="161" hspace="20" src="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/manyrab.gif" width="225" /></div><div style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">Suppose a newly-born pair of rabbits, one male, one female, are put in a field. Rabbits are able to mate at the age of one month so that at the end of its second month a female can produce another pair of rabbits. Suppose that our rabbits <b>never die</b> and that the female <b>always</b> produces one new pair (one male, one female) <b>every month</b> from the second month on. The puzzle that Fibonacci posed was...</div><div style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">How many pairs will there be in one year?</div><ol style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;"><li>At the end of the first month, they mate, but there is still one only 1 pair.</li><li>At the end of the second month the female produces a new pair, so now there are 2 pairs of rabbits in the field.</li><li>At the end of the third month, the original female produces a second pair, making 3 pairs in all in the field.</li><li>At the end of the fourth month, the original female has produced yet another new pair, the female born two months ago produces her first pair also, making 5 pairs.</li></ol><div align="center" style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;"><img alt="Fluffy bunnies family tree" height="371" hspace="15" src="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/fibrab.gif" width="442" /><br /><a href="http://www.blogger.com/post-edit.g?blogID=3994453253456960203&postID=6597361858141962438&from=pencil" name="fibwhy"></a><br />The number of pairs of rabbits in the field at the start of each month is 1, 1, 2, 3, 5, 8, 13, 21, 34, ...</div><div style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">Can you see how the series is formed and how it continues? If not, look at <a href="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/fibseries.html" style="color: navy;">the answer</a>!</div><div style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">The <a href="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/fibtable.html" style="color: navy;">first 300 Fibonacci numbers</a> are here and some questions for you to answer.</div><div style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">Now can you see <b>why</b> this is the answer to our Rabbits problem? If not, <a href="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/rabserieswhy.html" style="color: navy;">here's why.</a><br />Another view of the Rabbit's Family Tree:</div><table style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;"><tbody><tr><td align="right" valign="top"><a href="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/rabtreenb.gif" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img alt="another view of same tree" border="0" height="304" src="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/rabtreenb.gif" width="430" /></a><img alt="Multiples-of-Phi family tree" height="338" src="http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/rabtreealtnb.gif" width="521" /></td><td align="center" valign="top"><br /></td><td align="left" valign="top"></td></tr></tbody></table><span style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">Both diagrams above represent the same information. Rabbits have been numbered to enable comparisons and to count them, as follows:</span><br /><ul style="background-color: white; font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif; margin-left: 0px;"><li>All the rabbits born in the same month are of the same generation and are on the same level in the tree.</li><li>The rabbits have been uniquely numbered so that in the same generation the new rabbits are numbered in the order of their parent's number. Thus 5, 6 and 7 are the children of 0, 1 and 2 respectively.</li><li>The rabbits labelled with a Fibonacci number are the children of the original rabbit (0) at the top of the tree.</li><li>There are a Fibonacci number of new rabbits in each generation, marked with a dot.</li><li>There are a Fibonacci number of rabbits in total from the top down to any single generation.</li></ul><div><span style="font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;"><br /></span></div><div><span style="font-family: Verdana, 'Trebuchet MS', Lucida, Arial, Helvetica, sans-serif;">Alexandra Brancovean, Candela Megido, Aida Zapico</span></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-6597361858141962438?l=artspilesenglish.blogspot.com' alt='' /></div>Alexandra Brancoveanhttp://www.blogger.com/profile/11772781012673775064noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-75719976725744483442012-01-15T12:57:00.003+01:002012-01-15T13:00:04.408+01:00similarity<a href="http://2.bp.blogspot.com/-SGhSZ6lqwW0/TxK_MARxqvI/AAAAAAAAAFM/jyiZjQfyhXU/s1600/zapato%2Bde%2Btacon.jpg"><img style="width: 229px; height: 220px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697826691530992370" border="0" alt="" src="http://2.bp.blogspot.com/-SGhSZ6lqwW0/TxK_MARxqvI/AAAAAAAAAFM/jyiZjQfyhXU/s320/zapato%2Bde%2Btacon.jpg" /></a><br /><div><a href="http://4.bp.blogspot.com/-J2G0UXGy82s/TxK_MESjrMI/AAAAAAAAAFE/vXdHApH5eyk/s1600/escalera%2Bde%2Bavion%2B1.jpg"><img style="width: 253px; height: 320px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697826692608011458" border="0" alt="" src="http://4.bp.blogspot.com/-J2G0UXGy82s/TxK_MESjrMI/AAAAAAAAAFE/vXdHApH5eyk/s320/escalera%2Bde%2Bavion%2B1.jpg" /></a><br /><div>I think that a ladder plane is similar to a high heels.</div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7571997672574448344?l=artspilesenglish.blogspot.com' alt='' /></div>David Hompanerahttp://www.blogger.com/profile/12661783400315343370noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-48341880273708531712012-01-15T12:51:00.002+01:002012-01-15T12:55:27.708+01:00similarity<a href="http://1.bp.blogspot.com/-HZ6K9qy4C9Q/TxK-AT87dwI/AAAAAAAAAE0/JXtgLVtFiu0/s1600/peine%2Bejemplo.jpg"><img style="width: 200px; height: 200px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697825391142205186" border="0" alt="" src="http://1.bp.blogspot.com/-HZ6K9qy4C9Q/TxK-AT87dwI/AAAAAAAAAE0/JXtgLVtFiu0/s320/peine%2Bejemplo.jpg" /></a><br /><div><a href="http://1.bp.blogspot.com/-4pYPObKuEIw/TxK-AImkFlI/AAAAAAAAAEs/UfxWWVps9m0/s1600/cepillo%2Bde%2Bdientes.jpg"><img style="width: 320px; height: 198px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697825388095608402" border="0" alt="" src="http://1.bp.blogspot.com/-4pYPObKuEIw/TxK-AImkFlI/AAAAAAAAAEs/UfxWWVps9m0/s320/cepillo%2Bde%2Bdientes.jpg" /></a><br /><div>I think that a toothbrush is similar to a comb.</div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-4834188027370853171?l=artspilesenglish.blogspot.com' alt='' /></div>David Hompanerahttp://www.blogger.com/profile/12661783400315343370noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-13289976883128807472012-01-15T12:06:00.001+01:002012-01-15T12:09:32.530+01:00similarity<a href="http://1.bp.blogspot.com/-xtT7SgLDJxo/TxKzajASA9I/AAAAAAAAADw/T7KxwyFygZg/s1600/luna%2Bejemplo.jpg"><img style="width: 320px; height: 240px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697813747231491026" border="0" alt="" src="http://1.bp.blogspot.com/-xtT7SgLDJxo/TxKzajASA9I/AAAAAAAAADw/T7KxwyFygZg/s320/luna%2Bejemplo.jpg" /></a><br /><div><a href="http://1.bp.blogspot.com/-OChO4S-ZlGk/TxKzaY3zLFI/AAAAAAAAADk/sGmjFBJRTqg/s1600/boomerang.jpg"><img style="width: 300px; height: 302px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697813744511560786" border="0" alt="" src="http://1.bp.blogspot.com/-OChO4S-ZlGk/TxKzaY3zLFI/AAAAAAAAADk/sGmjFBJRTqg/s320/boomerang.jpg" /></a><br /><div>I think that a boomerang is similar to the moon.</div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-1328997688312880747?l=artspilesenglish.blogspot.com' alt='' /></div>David Hompanerahttp://www.blogger.com/profile/12661783400315343370noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-2223683373125638302012-01-15T11:42:00.006+01:002012-01-15T11:50:04.677+01:00similarity<a href="http://2.bp.blogspot.com/-mIQro-3XTno/TxKuwZ8oM5I/AAAAAAAAADU/UAwHs_1PwLQ/s1600/reloj%2Bejemplo.jpg"><img style="width: 198px; height: 255px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697808625199231890" border="0" alt="" src="http://2.bp.blogspot.com/-mIQro-3XTno/TxKuwZ8oM5I/AAAAAAAAADU/UAwHs_1PwLQ/s320/reloj%2Bejemplo.jpg" /></a><br /><div><a href="http://1.bp.blogspot.com/-YBCl8Cx0q-k/TxKuwLEcybI/AAAAAAAAADM/Vc-R3bnub_Q/s1600/plato%2Bpara%2Bsubir.jpg"><img style="width: 320px; height: 279px; cursor: pointer;" id="BLOGGER_PHOTO_ID_5697808621205506482" border="0" alt="" src="http://1.bp.blogspot.com/-YBCl8Cx0q-k/TxKuwLEcybI/AAAAAAAAADM/Vc-R3bnub_Q/s320/plato%2Bpara%2Bsubir.jpg" /></a><br /><div>I think that a clock is similar to a dish<br /> </div><div></div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-222368337312563830?l=artspilesenglish.blogspot.com' alt='' /></div>David Hompanerahttp://www.blogger.com/profile/12661783400315343370noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-58917828710823871612012-01-13T17:27:00.011+01:002012-01-13T17:51:58.669+01:00The Golden Number in nature and architecture.The Golden Number (also called Phi) is an important number. It is present in nature proportions such as in shells or in pine cones.<br /><br /><a href="http://4.bp.blogspot.com/-Bqc1ZgwUoaY/TxBdf7RC-bI/AAAAAAAAADs/FRa21uAGj5s/s1600/images.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 236px; height: 214px;" src="http://4.bp.blogspot.com/-Bqc1ZgwUoaY/TxBdf7RC-bI/AAAAAAAAADs/FRa21uAGj5s/s320/images.jpg" alt="" id="BLOGGER_PHOTO_ID_5697156331690195378" border="0" /></a><br /><br />Greeks first used this number in buildings because they thought it was the beautiness number so, if the buildings proportions were based on Phi number, the construction would be beautyful as well. Buildings such as in the Partenon.<br /><br /><br /><a href="http://2.bp.blogspot.com/-VaglCD8JNl0/TxBduYXu18I/AAAAAAAAAD8/ho_3z0lgpbY/s1600/partenon.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 240px; height: 149px;" src="http://2.bp.blogspot.com/-VaglCD8JNl0/TxBduYXu18I/AAAAAAAAAD8/ho_3z0lgpbY/s320/partenon.jpg" alt="" id="BLOGGER_PHOTO_ID_5697156580021032898" border="0" /></a><br />Since Greeks, Phi number became more used in other countrys in architecture (As in Eiffel thower) but also in paintings as in "A Venus Birth" or in "La Gioconda"<br /><br /><br /><a href="http://2.bp.blogspot.com/-x7VhI73OoZg/TxBgrlNpFlI/AAAAAAAAAFA/etXp6o1JRIM/s1600/torre.gif"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 194px; height: 320px;" src="http://2.bp.blogspot.com/-x7VhI73OoZg/TxBgrlNpFlI/AAAAAAAAAFA/etXp6o1JRIM/s320/torre.gif" alt="" id="BLOGGER_PHOTO_ID_5697159830463649362" border="0" /></a> EIFFEL TOWER<br /><br /><br /><a href="http://1.bp.blogspot.com/-NI2jM1tffi8/TxBfzQNNvpI/AAAAAAAAAEc/NN7umK2t-2g/s1600/prop_au_011.jpg"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 307px; height: 320px;" src="http://1.bp.blogspot.com/-NI2jM1tffi8/TxBfzQNNvpI/AAAAAAAAAEc/NN7umK2t-2g/s320/prop_au_011.jpg" alt="" id="BLOGGER_PHOTO_ID_5697158862752038546" border="0" /></a><br /> THE BIRTH OF A VENUS<br /><br /><a href="http://3.bp.blogspot.com/-yBdCoYntURk/TxBfzi7q9gI/AAAAAAAAAEo/oSkhYQSlwSY/s1600/mona%2Blisa%2B1.png"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 205px; height: 320px;" src="http://3.bp.blogspot.com/-yBdCoYntURk/TxBfzi7q9gI/AAAAAAAAAEo/oSkhYQSlwSY/s320/mona%2Blisa%2B1.png" alt="" id="BLOGGER_PHOTO_ID_5697158867778729474" border="0" /></a><br /> LA GIOCONDA<br /><br /><br /> ILLÁN RIESTRA NAVA 3ºA<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-5891782871082387161?l=artspilesenglish.blogspot.com' alt='' /></div>898 (ILLÁN)http://www.blogger.com/profile/14206982829543282461noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-76039052579339155342012-01-12T20:32:00.018+01:002012-01-13T19:05:10.206+01:00A special number: Phi<div><p class="MsoNormal" style="margin-bottom: 0.0001pt; text-align: justify; "><span lang="EN-US" style="font-size: 13.5pt; "><span>Among all rectangles, there is one which is more beautiful for the people. It´s an special rectangle. If you divide the longest side by the shortest side you obtain <span >1,6180339</span>... and if you cut a square whose side is equal to the small side of the rectangle we obtain a rectangle similar to the original. This rectangle is used by designers, engineers, painters... to do a lot of things: credit cards snuff packages, buildings, pictures, etc.</span><o:p></o:p></span></p><a href="http://upload.wikimedia.org/wikipedia/commons/thumb/d/d8/Euclides._Rect%C3%A1ngulo_%C3%A1ureo_.svg/265px-Euclides._Rect%C3%A1ngulo_%C3%A1ureo_.svg.png"><img src="http://upload.wikimedia.org/wikipedia/commons/thumb/d/d8/Euclides._Rect%C3%A1ngulo_%C3%A1ureo_.svg/265px-Euclides._Rect%C3%A1ngulo_%C3%A1ureo_.svg.png" border="0" alt="" style="cursor: pointer; width: 265px; height: 200px; " /></a></div><div style="text-align: justify;"><br /></div><div style="text-align: justify;">Examples:</div><div style="text-align: justify;"><br /></div><div style="text-align: justify;">THE VENUS OF MILO </div><div style="text-align: justify;">Venus´s navel divides the segment of the total height as the golden ratio.</div><div style="text-align: justify;"><br /></div><div style="text-align: justify;"><a href="http://3.bp.blogspot.com/-QnBUUGijWmo/Tw89mHkJ94I/AAAAAAAAAU8/Tok0K0cxx-s/s1600/venus-de-milo.jpg" style="text-align: left; "><img src="http://3.bp.blogspot.com/-QnBUUGijWmo/Tw89mHkJ94I/AAAAAAAAAU8/Tok0K0cxx-s/s200/venus-de-milo.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5696839778721986434" style="cursor: pointer; width: 150px; height: 200px; " /></a></div><div style="color: rgb(255, 0, 0); text-align: justify; "><br /></div><div style="text-align: justify; ">SNUFF PACKAGES / CREDIT CARDS</div><div style="text-align: justify; ">Snuff packages has got the golden proportion and credit cards, too.</div><div style="text-align: justify; "><a href="http://1.bp.blogspot.com/-afUlBO7GpAQ/TxBntNKixeI/AAAAAAAAAVI/10VaMghG7is/s1600/caja%2Btabaco-%2Bproporcion%2Baurea.jpg" style="text-align: left; "><img src="http://1.bp.blogspot.com/-afUlBO7GpAQ/TxBntNKixeI/AAAAAAAAAVI/10VaMghG7is/s200/caja%2Btabaco-%2Bproporcion%2Baurea.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5697167554949334498" style="cursor: pointer; width: 200px; height: 140px; " /></a></div><div style="text-align: justify; "><br /></div><div style="text-align: justify; ">DURERO´S SPIRAL</div><div style="text-align: justify; ">It´s a spiral embedded in golden rectangles.</div><div style="text-align: justify; "><a href="http://simetria.dim.uchile.cl/matematico/imagenes/recta2.JPG" style="text-align: left; "><img src="http://simetria.dim.uchile.cl/matematico/imagenes/recta2.JPG" border="0" alt="" style="cursor: pointer; width: 467px; height: 292px; " /></a></div><div style="text-align: justify; "><br /></div><div style="text-align: justify; ">NOTRE-DAME</div><div style="text-align: justify; ">The façade of the Notre-Dame has got the golden proportion, because number Phi is related to the divinity.</div><div style="text-align: justify; "><img src="http://arquimedes.matem.unam.mx/PUEMAC/PUEMAC_2008/aurea/imagenes/notredame.jpg" /> </div><div style="color: rgb(255, 0, 0); text-align: justify; "><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-7603905257933915534?l=artspilesenglish.blogspot.com' alt='' /></div>Aitor del Riverohttp://www.blogger.com/profile/03705783330927904568noreply@blogger.com2tag:blogger.com,1999:blog-3994453253456960203.post-87021175055654959802012-01-11T20:51:00.011+01:002012-01-11T21:59:50.482+01:00THE GOLDEN PROPORTION<span style="font-size:85%;">The positive solution of the ecuation <strong>x(x-1)-1=0</strong> is <strong>1,6180339887...</strong> This number is called phi, or the Golden Number and it's very very special.<br /></span><br /><div><span style="font-size:85%;"></span></div><br /><div><span style="font-size:85%;">In the environment, lots of things are made related to this number, due to the beauty of the proportion this number makes. Along the history, many cultures have discovered this number and they have tried to reproduce it in the art, so it's very common to see it in paintings, sculptures, buildings,...</span></div><br /><br /><div><span style="font-size:85%;">There are many examples of this proportion. One of it it's the <strong>Keops Pyramid</strong>. Phi appears there not once, but many times. For example, the height of one face divided into the half of the side of the base, it's exactly 1,6180339887...</span></div><br /><img style="TEXT-ALIGN: center; MARGIN: 0px auto 10px; WIDTH: 192px; DISPLAY: block; HEIGHT: 144px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5696472156167240946" border="0" alt="" src="http://2.bp.blogspot.com/-p-GWYFLe5k8/Tw3vPq1AfPI/AAAAAAAAABw/5m8BOefBp4g/s320/images.jpg" /><br /><img style="TEXT-ALIGN: center; MARGIN: 0px auto 10px; WIDTH: 209px; DISPLAY: block; HEIGHT: 168px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5696471927546260002" border="0" alt="" src="http://2.bp.blogspot.com/-0oAMbn0k7Go/Tw3vCXJhKiI/AAAAAAAAABk/jAenDBb7y6c/s320/imagesCA8DBQ21.jpg" /><br /><br /><br /><div><span style="font-size:85%;">Another example is the famous <strong>New York building of United Nations</strong>. It's divided into three golden rectangles (which proportion is phi).</span></div><br /><br /><img style="TEXT-ALIGN: center; MARGIN: 0px auto 10px; WIDTH: 118px; DISPLAY: block; HEIGHT: 165px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5696474424219330514" border="0" alt="" src="http://2.bp.blogspot.com/-TQzszhYn6j4/Tw3xTr-w59I/AAAAAAAAAB8/8wxInbhvvIU/s320/imagesCAHAQWYI.jpg" /><br /><br /><br /><p><span style="font-size:85%;">The last example is in the <strong>Sandro Boticcelli's painting <em>El Nacimiento de Venus</em></strong>. The body of Venus takes exactly the golden proportion, but as well, the total dimensions of the painting forms a golden rectangle.<br /><br /></p></span><img style="TEXT-ALIGN: center; MARGIN: 0px auto 10px; WIDTH: 261px; DISPLAY: block; HEIGHT: 151px; CURSOR: hand" id="BLOGGER_PHOTO_ID_5696478467546090562" border="0" alt="" src="http://3.bp.blogspot.com/-2F1FDWqcYOc/Tw30_Ci_DEI/AAAAAAAAACI/gENKNpFzFMU/s320/imagesCAHE3GZH.jpg" /><br /><br /><br /><br /><br /><div align="right">Pelayo Fernández Arias 3ºA<br /><br /></div><br /><br /><p align="center"><a href="http://2.bp.blogspot.com/-DFYpHRRK3wM/Tw3uAwOnC2I/AAAAAAAAABY/3zadQoHQGAE/s1600/images.jpg"></a></p><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8702117505565495980?l=artspilesenglish.blogspot.com' alt='' /></div>Pelayo Fernandezhttp://www.blogger.com/profile/11317279319877928548noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-80596085656547359332012-01-11T20:01:00.003+01:002012-01-11T20:15:23.260+01:00similarity<a href="http://4.bp.blogspot.com/-d0cvMkkfOH8/Tw3fau1u1YI/AAAAAAAAACo/jA7ga5t-wiE/s1600/pico%2Bcigue%25C3%25B1a.bmp"><img id="BLOGGER_PHOTO_ID_5696454754036536706" style="DISPLAY: block; MARGIN: 0px auto 10px; WIDTH: 240px; CURSOR: hand; HEIGHT: 320px; TEXT-ALIGN: center" alt="" src="http://4.bp.blogspot.com/-d0cvMkkfOH8/Tw3fau1u1YI/AAAAAAAAACo/jA7ga5t-wiE/s320/pico%2Bcigue%25C3%25B1a.bmp" border="0" /></a><br /><br /><div><a href="http://2.bp.blogspot.com/-ePUT_H4VTUw/Tw3fagv0HbI/AAAAAAAAACc/Gj3PJle1iKs/s1600/tijeras.jpg"><img id="BLOGGER_PHOTO_ID_5696454750253620658" style="DISPLAY: block; MARGIN: 0px auto 10px; WIDTH: 305px; CURSOR: hand; HEIGHT: 165px; TEXT-ALIGN: center" alt="" src="http://2.bp.blogspot.com/-ePUT_H4VTUw/Tw3fagv0HbI/AAAAAAAAACc/Gj3PJle1iKs/s320/tijeras.jpg" border="0" /></a><br /><br /><br /><br /><div><br /><div>I think that a scissors are similar to stork beats.</div><br /><div><br /><br /><br /><br /><br /><br /><br /><br /></div><br /><div></div></div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8059608565654735933?l=artspilesenglish.blogspot.com' alt='' /></div>David Hompanerahttp://www.blogger.com/profile/12661783400315343370noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-84456014307645012302012-01-11T19:46:00.004+01:002012-01-11T20:19:02.235+01:00<a href="http://4.bp.blogspot.com/-q0ZPQ1klm-Q/Tw3btuye7VI/AAAAAAAAAA0/RGNv0d5Fdjo/s1600/411687015_3eb1b4ab58.jpg"><img id="BLOGGER_PHOTO_ID_5696450682393914706" style="FLOAT: left; MARGIN: 0px 10px 10px 0px; WIDTH: 274px; CURSOR: hand; HEIGHT: 320px" alt="" src="http://4.bp.blogspot.com/-q0ZPQ1klm-Q/Tw3btuye7VI/AAAAAAAAAA0/RGNv0d5Fdjo/s320/411687015_3eb1b4ab58.jpg" border="0" /></a><br /><br /><br /><div>Diego de Velazquez used the golden section to represent the Meninas, one of his best known works.</div><br /><br /><div>He used it to differentiate the bottom, with characters, and the top, with gloom and darkness.</div><br /><br /><div></div><br /><div></div><br /><div></div><br /><div></div><br /><div></div><br /><div></div><br /><div></div><br /><div></div><br /><div></div><br /><div></div><br /><div>Pilar Suarez de Cepeda y Maria Carracedo</div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8445601430764501230?l=artspilesenglish.blogspot.com' alt='' /></div>Pilarhttp://www.blogger.com/profile/06433916853297660197noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-26776202044464899972012-01-09T21:32:00.007+01:002012-01-09T21:49:26.370+01:00Similarity with the moon<a href="http://1.bp.blogspot.com/-vvSdhavFPPM/TwtStGabGeI/AAAAAAAAABA/oTYNh6z2dWg/s1600/luna-creciente%2Bforma%2Bde%2BC.jpg" onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 300px; height: 300px;" src="http://1.bp.blogspot.com/-vvSdhavFPPM/TwtStGabGeI/AAAAAAAAABA/oTYNh6z2dWg/s320/luna-creciente%2Bforma%2Bde%2BC.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5695737088509155810" /></a><br /><a href="http://2.bp.blogspot.com/-XE9i2Btja6w/TwtSHdpHDBI/AAAAAAAAAA0/3ErH0NzSXcU/s1600/cheshire-cat-3.jpg" onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}"><img style="display:block; margin:0px auto 10px; text-align:center;cursor:pointer; cursor:hand;width: 320px; height: 256px;" src="http://2.bp.blogspot.com/-XE9i2Btja6w/TwtSHdpHDBI/AAAAAAAAAA0/3ErH0NzSXcU/s320/cheshire-cat-3.jpg" border="0" alt="" id="BLOGGER_PHOTO_ID_5695736441909742610" /></a>I think that the Cheshire Cat´s smile is similar than the crescent moon.<br /><br /><br /><div><br /><br /><div><br /></div><div><br /></div><div><br /></div><div><br /></div><div><br /></div><div><br /></div></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-2677620204446489997?l=artspilesenglish.blogspot.com' alt='' /></div>Marinahttp://www.blogger.com/profile/09302528566424800834noreply@blogger.com1tag:blogger.com,1999:blog-3994453253456960203.post-84078956875367839002012-01-09T19:04:00.004+01:002012-01-09T19:23:33.278+01:00Similarity with the Moon<br /><br /><br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" style="color: rgb(0, 0, 0);" href="http://3.bp.blogspot.com/-AMzf10245TI/TwstcrMbsmI/AAAAAAAAABQ/DmTBlau4eyo/s1600/luna.jpeg"><img style="display: block; margin: 0px auto 10px; text-align: center; cursor: pointer; width: 259px; height: 255px;" src="http://3.bp.blogspot.com/-AMzf10245TI/TwstcrMbsmI/AAAAAAAAABQ/DmTBlau4eyo/s400/luna.jpeg" alt="" id="BLOGGER_PHOTO_ID_5695696124394582626" border="0" /></a><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://1.bp.blogspot.com/-AyhDqb3OiFg/TwstcgR9t0I/AAAAAAAAABY/RGjWUoO-UvU/s1600/monoculo.jpeg"><br /></a> I think that the moon is similar to a monocle<br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://3.bp.blogspot.com/-AMzf10245TI/TwstcrMbsmI/AAAAAAAAABQ/DmTBlau4eyo/s1600/luna.jpeg"><br /></a><br /><br /><a onblur="try {parent.deselectBloggerImageGracefully();} catch(e) {}" href="http://3.bp.blogspot.com/-_weZuSJgQRA/TwswJ2EOe0I/AAAAAAAAAB0/Zrr-mteHJcU/s1600/monoculo.jpeg"><img style="display: block; margin: 0px auto 10px; text-align: center; cursor: pointer; width: 160px; height: 219px;" src="http://3.bp.blogspot.com/-_weZuSJgQRA/TwswJ2EOe0I/AAAAAAAAAB0/Zrr-mteHJcU/s320/monoculo.jpeg" alt="" id="BLOGGER_PHOTO_ID_5695699099430320962" border="0" /></a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/3994453253456960203-8407895687536783900?l=artspilesenglish.blogspot.com' alt='' /></div>Miguel Garciahttp://www.blogger.com/profile/01788464253840888806noreply@blogger.com0tag:blogger.com,1999:blog-3994453253456960203.post-81274358141998226882012-01-04T22:16:00.002+01:002012-01-04T22:29:54.699+01:00Un lugar para soñar.The last film I've saw was "Un lugar para soñar" it was published this last days of christmas on cinemas. I am not use to going to the cinema but this film was a exception because when I saw the trairler on TV I really like it. I wasn't mistaken. I went to cinema to see it once it was rainning a lot . When I go out of the cinema I was enthusiatic I had enjoy the film a lot because it is not an usual tipe of film. It had different topics as family, frindly, love.... I'd recommend it to everyone who loves simply but brilliant films at he same time. Here there is a simply summary:<br />A man who had recently lost his wife have to look after his two children. To do it he decided to move to a countrysida place far from the city (where he had many remembers of his wife).This new house was perfect at first sight but there was a problem, this house was an old zoo too. So with the help of all the family and some zookepers and despites many problems, he finally get the zoo and make it famous again.<br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><img alt="" 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Xz+K/xRV2z848P8D6/u+CA9ShVASj901j3tP1jQceFL0QuebvsgO9Jpu1e8lTr9IbpTsbNIzwKck3EOILJiTiaHPj3ypFQyJjXS3oBjk+uB2CdYnpm1WjNzWd//bHA5cd60OVJAxaCTwYVvX0ISAGeGwS90koyZrVpT41CVxw0em9ly9ZLFmbOeiuz4dIKxKvPfiB+3cAsHy4Ne5daPBk57iE+NH0rZhmCVaVRuk2tfuWLNO0k56dUZUOVRiUfjac2lZKvNMo9b2P54aM/Q+KGNI9bXb1i7YElXQmuknM9PvqPjzrW7k06NUktH37Tl77mDyYlP//3yDc/wO1OV0to98Khr17++G2ZrxbBZYgt61qz/ZVnyh7du3jpS5csGZ3kbDlY78pC2DdponHDvqoe37Y7XTV7Brye3/8efP3l2QBcqZkz1wmbpzEepcx/nOdNKmtavn49f8kbf4MTEOY93XfAyn3SL20QjLNkdskdhfZOof/O69leSWqrhfrjT+PJVG25Z19lpVtoV/dsL2p7mxHTJZbVSB9Cjih2GxTZJ7QBiCKgMdEKyGxItyipe9Hfu1o+6ej4dX/Dxjp/euzWiVjijeNNHnWc8vJUvj7NqPawUIwVnRUH66s0fLz8AOwzrXy56/61ukDA/f6tn9KhrN9LFsSXDxpf/vHzNiBUv2k+Fe75x1dqX03u+ecmKZ9gRwSpHQSkq16KSyGKtS6ss6XXmnfvuNe/luosuZ5Z+cmPbd67cwImlWMHggZPWiyv2GEfduOL/u+jDl2kpa1tJBQvQ/tGi8MWvpTnn0267Nlj97O3MyCd9VhoZglH55RPMX17P9JpWFlTu29R1yh1bOVVN2d41H3Wedi+dVhpJ07n4tdz5L0d2T4yf+jj1pxeZLgcnkfWrB8LXvZvrrRXTmp2QjCzSb3k/d/nf+ZxqZ6CWkVFGRjkZZyWUkVFGVnIyqZROqRhc65sEz1yUb2H6+KmH+I+auZQ/JWHLXhZ/Gc2nZeuJoNRjuB7D0ySMq/WE1mjpObyEcbVKaqp+WZW0o1o1Bsxeo3zN0p5zn02ktIkup7Zlv/ulq1d83Kv1lyduWTf8f/1x9c/vC//85jX3btzVU6xvK1jfvrHt/QxK2OU4qsagxsFiFJbjoBI3Dx1/8+aHt+3usiZyXvGBtu0/uW0jp31Ka+UT72q7Y8P+nFtjoPOT2+hLX+u89p3OY27ctHq3yVvltQeVr129/tgb1/zo9q1nPp5sL4xToPr9O1fcHR7IOp9TUpnHThSM0SMmDcyYUjth4dpHNm5PGuMxs3rJq8J5j0djxXoEGJRYZw118faR/3XFmjV79axpz3+f//7CTfdt6/v2NR8/w+yhjFI7LnZIRhQ1opK+uaAffeO2F2KDnD6Rcg795f3kLx6kUroZkowfLGz/5s0rT7or+rO7N63Y7dGK1zHi0LDWAew2uRSRi2FkR6RqGLlLdugrtyuCge5fv/Ond6+lVUuwjes/6f6XP6392b2R46/fcPeW3Um3vO5A8evXrrzq/dSfX8qcdi+96aAeM4tv74D/dumGu1bu/q8n1p/76DZBm2grGDmj+uun6f/nd+//+dVMrFTaKhc7AIyMlnjVCElazi4v2rDn369d991rlodx4znmwNfmf3LU9ctX7NMS1hiTV7Jm9dJXhD9/GHskuuPERWHKwYJire4GR81fuWk3TqmgLQ//Tu96OzH4SU6MFdSYMfa7J+krX6Oz6md9avW+bZkTbt+QwEanXb16ae7MB6MpbCeM6uVvsycsWvbXdbu/c+Pqp9r3JzS1EyhnPs1+6ao1Jy1sP37B+jfictYzV+zat2xwvyApMRHHCzAjoyzAWYCzQE0DNSMrGVnJguaiRZes+ZPG2cAtPcHNMeRyLkv9keRXQHBr2zxWqbVsK/PrpdGAfv4YYqAvYUJrpNRGSm2ktTHSSKmNpFL3mZmUTnpYJR62DGDwZyncGHQ+u+zd9FmPhXusTzud0ub93r/MX7pmu9tfnrhpVfeP7o4s21FdmtU3jdSyyniH6B51w9o3kgfTxWIMuAlsCfBTTq0lsccpY8ffvPrx9n05/dOeYv2+dcPH3bKeNz+lzfIp97YtXLczY1co0TzxdvpL8zd8+6Llq/bYGa1MK6U1o+7Xrg79LTK0eBi8O4Ci0KRU55gF6xZt3Z8yP+fFYqggh9Qih72Q6DBy/ce3b/7rxqGY8mnKsf74Svq8JyJJq8TKKis6cav2Wmf+369Yu2lU7La9i1/r+5+Xb/pvv3t50baRHs/bLNptaqlDVjqkGiMX2yTzuzesfSHWmzK0uFO9YnHvL/7KCobXBtxjbl552/q+D4ZHPhyQQ7JNyRYjNiKjXhgoEaBF5UoHMCmxHhKtdmRx2Mm51TtWdv/snjZBqaWssSsX9x5/37b3hw4s6R5ZccCkxGrooHfMteu/fPnqr162br1U4QsV3sRvD+H/vGnZV+Z//L1bQyG7KshOG3DjavnNPvD/Xrz+wx0oZVU3gzKlanShHpK0MPCSbvHcZ9hLl2QvepG97PXO0+8N37N54JR7tj7JH+AMN6UZa3fZ/3bBh1d8kLt//fb/9ptlL3Xu7SrW122HX7lo9ert2pBjb9sj/+HJzT+6e9t/XraqbdQUXPOc57j576Q6NSeO4H1bh06+fXNMslLYueGjrrMe2JpU5KSl3/ha4j+vXvXfz/ngwY3bE4YdltwcAGc/QF/yCrWuD6/sGmnbBfkRJMhGJu8wo4gZRUIBJSWckZWMpCUlNSmpCVFJSmpabNo4GRg10sjJatCxWfemkcy2ZbfarHGPjCRkROwzj0zGfBVbdloGDSQjWyQk+vn4HvrMFRUnDay0xMMY+iyGD2Xsz69Y2vvLx8PD1Yk2aezsx8JnPxZOap9m9crC5b1nPxLK1erD1UZcL6XhxJZR++sL1r7bZXdWJmKgygKHVT7nFZeHdU6fOOG2bQ9t3dUzfmj5sHLUX5bds3EwbtU4o3HyHVvvXLcj69Vo7P7k1vb76X1n3R26cXEmqY/xennNAfiN61cv2eX2VytJ06HzKO56N6/Y/v3r1q7YacQcW7DGl+4pbhpBEexF5OLxi0L3bhqKWZYAiu/16f9+4Yon6ELMLWedifUj5ol3b7rohRhvVJJG8YKXkue/mblmRf+Ji8K0XKKVSgfQKaBF5RoHyxtGlG/esO7lBE4Zyt9z+pfmr3qwbZdg1rcolWNv3vhq8sBw9fOUcihacCjZiYoeDWxaVmnJoeVSSLYp0WWRHYIWC2u8OnH9yu2n3LONQ2bOdq9anD3nqWiuVs6aNq1aDCht3Ot99/pNT6Twj29bu3BtKmtNsKq9uFf5xu3LnuTVo2/Y/Bi/PWuW22WLguUlw9LXrlm1ep9KScUQNCLACIl1BlpRaHeg4g9v3fxcbOdHA/C///6d425ZH3Pc3zzCXf9ed84rpg3voldSx9yw+s8vUX98ijrtLuHku0JJfYxXjbMeFU57dDOvlDN2JeNWz3kq9fMHYglY7itaf3yF+cU9bf2G21meuPDl5DkPbhUkpUsr3rS456z7tyV1NWtW579I//HN7K0fDp9+57po3qWhllW0nz+w9Y5VmUF3LKOZLMIskDokkJB0tqCz+antMpMbR9V4ARMSopIqKKmCQsTwd9KQzTS5Sc26JZyTkM+kUTDY6Q8ONgL6wYwI0wXk0yrhrCeSgpvUfAljSi2pNCXM6OMtHvqXSX0soTVmS1Z9A8u+hHG1zhgmD6u99sQ1H3X96/wPf/lg+Hs3fXzaI8zGvJ3G1V5n4pYVuS9dvOLXDwqn395+x4aBHqvRBtx/v37TyTdt+9Wi9UvTOG5VwpoRsRQOO7zinnLHJ99bsO2Uv7Z/4y8rrl46TBtVQdUE7bOTFrTdvW5nwq2EleIxN218idq1tmD9z0vWPrRtNOaWth40vv6X5SfdHj79/sRvH+a27LdZpRzRxi/+e+Koa5ad/Sz/m7vDp98T3SJpUeRwauV7t666d+OeuGG3g2pMtx7pGPzKFetOfyj6+2eoo6/d+Oun6YjshWGJsbyLXopf/AQj1MAP7tzy++eTPPIooPKSTklFSrTbsfvVGzb9eMHGUx+IfPUvK2/7ZDfrOBTAIal08k3bjrlp/S/u7/jlw5s+GkKs7lCSF5GLIeC1gzol2gyu0rIWEQGl1N+Oib99ZOOXrlty+8adgloSjMpVK/v+7wuXnvsge8Yt4dvX74w7xvK8+h9XbHyvb3hpr/SVS1Y9z42kvNLybuk/LlvfIaqPd+z88vyPPuoeZVBdUOz3uvNfv2z1iu06p5g0MKMyasPjUQlyqrpyh/uV+SuX9R7oKY+f8kjstnVD28eql76VO/ORbdmiu3xw5F8v/XjxLq3HKWZLn24d1b58zfIXqF3drrNhv37Sg+3HXr/qt6/ET7kzesqd61buyad1LY7EDfv1Hy/oOP4B6rcPbj76unWvdIKUJnWq3g3v9p5xb7ugltK2df5LzO+fjnV5zvH3rr/kSS4p20nsnPsw89WrV571UPTniza+IeSTkkoXNO6gzRZ0Lq/zo0osr8TyijCKhbwaK2hCcw83IiRGmyQLkJDKw3QBZUSYFWFOQl0iyoqQkBGhL1WQ7Aw5WwzMiDCVxz7z/LIkh1qOO0ztSiEEV/YEpRZT68Quollaqflk1LpPWgsyRmyMKbWUWksq1aRSTeBKEA6X4tqYgA9t3m2/Hdvzd3p45SAQjE9jWjmmVXmtsWmv+W5i30vh4dfo/R93GwmjTknlFT3yK6Hht9i9W/bYMbXBK0UOl2JqnZYrq/rlN5jhN9ntG3dqGXuCheWYWo8U3I/7Dq7fo7LqWBjUPug8sOWgxWmN5QOj76Z30LgeAbW34nteZXa8EBn+O79jW8GNYC+CPVYfX9yVf3hd+rFN8ZXDclguUrjYUTCX9e5dvxtGQSksVqKgyBu19XvUJzZ1PbAyuSR3gFE8FpssshnofDJ4cPngCKPUtozar/L9HQWTxi6LXBZ4PKqE896yHvGl6MCb8R0b9iqsVoogPQT09rz1YefoK6Hhp6nhF7kdG/bZFKqERIcGLiO7jOzSkhUtGCxyI7JD4+pHg+ChDamX+X0UqoRhKYSqy7fjl/idz0aGXqR3L+5WWaXaUbDfTe/YtF/jtPEPcns/yOyjYWPTAfxuZigk27RSeic9+FHfXgoXo8jbdED9oHNHW8GIIi8kWlHgkj9pVNy4Fy7p3Nkh6ozirdsx2j6icNhbvwMs69orKLV126XFmWEOeyxyaWAzuPJx375PhvZHoR03G2HJeyu244FP2Feovigo8Xo5AlUKqBz22g+aT29KPrlR2LQbcbBISTotG6sHDi7r3MNIFU62V/ftXdmzO6GUtu6W3ue72/eAGHCX5+Q36e0vt/e8TvWuHyzwwGFEnS4oTF5h8krLHgCuoPKiyosqV1C4gsIVEC9iQkyEsTyI5UEiD0i8yuRROi8HIxiJloSUiHya9pJ2HpMAS0jmMSEuKTERx0Qcl5R5glIPrL/X5pKwZXldUGpkQpjUm7EuKF6QlFoLephSm1GRGDiTuFbkUYmH1YT+adaeSFoTMWNc0Bsxtc6AEo9rCX08Y0+knYmEOZGyJzhc4nE1oX+asSZSxoSgjLGoyGGP/F/ncTWhj2ediawzEdfGyFYbBpRiap3XGpxaD0klCtV4/VBE9nitHjcbnFqhUZlVaoJ2SNA+ixkTYZmcaXRCshlFJRrXY8YEq45xWqNDcjoki1XKYcmmUTkie2HJ6xD1KLYEc4zXJjh1gtcarGoLqheVdF4pCnqNwaUILEZAidfHoqBIoyIDHRZaPPIEtcRrVcEci+uVhFFnlWpb3t5WcMOwElGrjNmImZ9FQInC5SjyQs3jvG4YeJGCQ8kOBb0OUY9Al9XrlFJljENh2WzLq2FgUbjIG7WEMy7otYRR57AX08qM4tFKKQLdKCrxWr2j4LBahcLNQ4ysVmHUclvBiECXwkViZgGYHEoAACAASURBVLtokm00IcmIACsiO7xWjUI7LJsUcshjaWDH1DqPqwz0YlpVUEsscgXVo4HJK2Ua2LzistikgckrxZhaT1sTCX1MUEsRSaGhwiA1KqsCLpICHgscWm7ubhOgKUCXFR1G1OPY5WSTlQxWMmLATmKPGlE4ZPPYSegejy0e6hzQonmZlTGRMKjipIfKdNCkhDgm4lgeEJ0yIs7kUSaP0gUlPZtUQabCaR7H8sjPeIPERCwUUFPCmNqY1cPgzszggp5f3vQNTOpjKXV2Cf3YmFKDkOJN07rpt2pZs5zSSgml1FztUOuCWuGVYlxp8LBKNqbySllQSxz2BLUkqBUOl1hU5FCFRUUauAx0BNUTNIdXXBa5DPQY6LGoyKIii1wWFTlc4pXmMSgKlihUiYASq5QjskNjl1WLYdmMAIvBJfKbnsGlCLAo5NDYDcsmBT1WKdO4GoFFsrErCu2I7DC4FJEdFrkUMjpk3CEZFKowSoPGLg0VSrYY6FCyFZZsGhVpVAwDJ4o8GpUZ6NGAnMQzKKBRQKOxKUgeL3uMbLPIjSKnA5htwG5DDg3MqKR3iGqHrIWg1QbsbbLTjosRuRiW3IjshIHVJiodskarTruk0sClZIvsJuOxGcN6HKtJrAjIoGVV0Bwamx2yFoF2GFgdkjHrZvF20eyQLEYth2R724gWkZ2wbDZ3kwI3Cm1G8SjU3MUWEQ0GOjRweaUcEQ0a2DGtSAOTkg0amLRk8dgRFIuSEQ0whwxK0hnZZrFJAZWFOgMVBios1ClJIRvBGVFlJMRIgBZlRkKspFF5lcpjRlQZUY2MQEZUeUmPHoT0KKaAGJVEGsi0KNMiZCQlMgpocZqEUzbmFTaPfYiHQQnJXJFMDtMFlMrDoGx+EkuYEiyPhFEojMJYHgmjODZ5jJhkws18uICmJPQLJ/7+suC2abJX05cwuE8toU0ryWS1RnbWeKhVfSFbfJuVGDCT2Evr1bRWTyrVmFKJq+W4Wk6gegLXkoo/mSzFlJKguM3tOLjEQIfDXlyvxLQqAz1KNlhkC2qJ6Eo85JUirxQ57LGoyECPRkUKev65xIjshUSLQg6nlRjFI5skKdmIaWUauFHJnhS4SMkGjYpR4LJKmVE88uNIQS8K3Khk0tikkBGGRgQWKViikMNig5KdmFZlUZGSLRq7FHIo5EShTf5iDHQYaPHYiakep1gU0HjZiyGPlQwWGjTUI0CjVScEjXBeoYEZAUYUOVHFbZetEHQi2OsQ3ZDktYs2hYsUcjpENQKMsKxHRY+Wi1HJZqAjQFuQjRS2U1BPIiup2AnVpqFOISuCzLaCRmE3LNlR4JKTEyGx+SsjIjvkPRokBY1COyQZNHYjwKKxG4U2jV1KtijZYpFL/ssz0GKgFddLlGxEJV3QHAYZvGpz0GWhRcsaJSmCYgmKRUkKh0wWqQzQOGRQksqIqoAMDmgC0qg8FpDBAYWREC8rTAFGRwAnapysR0cRK2mMqFJ5zOQVehTzks7KmBYxK6t0QWFEnZNtumCwokMXFD8pDTJbMFS4QjNXjImYlE/9PNPXjMDnIYFImBCV1gGjipBXZ2PymL+ozfOrJs11gsl9ni0bzaaql0ptZlE0rY1ltGpGq2b12qwEVSQ2TmantWAumlJrZEwS1eKoSqxrVnFgKY7KpDOu1uNKI640BFSLqePNjaxqhVfKLCqysCwodWImCYAkZW1uB4cO2XPMK2UOl8hZVQ6XOFRlQJlDVUGpM6BEA7cZOYFDZmsCqvGwysEyB4s88nilSH7xRyWbBi6rlKPQppDDK2UWuRRyKOgRt1nkMtAiDtPAJnlyRNRYZHPYYaDFIpeEDlpyWFDiYFkA5Q6sU6oXASVGrtNyhZaLjOJEoMqAEgVL7aLd3Pwtm0SADsmKQDcCiyHRCUtuFBQpyaMkj0gVEi0aFWNKKY6LaVxOSm5SNuPAjEOHxw6J8xQudkgWGdlRMMOSTUGPeEhUDIkWCfgkUyD7tps5ArAjohERDfJNUbIhqB5RkVdtTrEYZDDIoIDGAo8FHo+8mOoJik0ONAmKTcsqA3QGmAJ0eeCwksFKGiurMeQQ0xhRZfIKOfLL5DVWVqkCogqIlVVaxKyo8LJGjUIqr1N5nRFNRjTpgkEXNCqv0oXJJ4iqPy2c8VqNaRI2CzYFlXg4pVZBjQVelsGPYn4Us3ncHDwDImGsoBGIgbGCRh5CxswLLiRMRUVc5ZUygZyKIAcjYkrFr4hOBsDxJrO5lzPqOa1GyOq1oIckbKaVWgpXCaQ/iWpppZFRx9LaWFKpJ3DT/IRSSmtkib/GwyoP6wn1s6T2eUz5lEN1Ig+PqwwoM6DM4wYLKyysTD91UeVxjcNTGSwDvYC6FVquMKDKwhoLKxyqkvxWwGVKdHlU4WGVkUocLHOwHFMqHLJ5haS4RQaUWFQMSzaFHFryoqLLwjKnVijoUXLTLjJNJUkpiRIcdqKSzkKDkg3yS4FHFUYq8VI5Jpcp1aMVj0XFOConYJkXXR44AnR5VGFAKSJ7NCpHgUvJFodsuqCFgN4hGQwuReRiR8GhQDUqV6KiR2Gd1Swam4xisdjkgZVAbgI4admJiyYnGgmlxCKXkh0Gl0KiE5bsjoIZkR1WKYdEqz1vkEjYfMkFcMlBCvK9sIgk/E5UMnmlyCI7KukssnnsMMggIZ3FJgmDzdMVqMQCj1SSaKl5Bp+ctBAUl5xL5GSblSweWHRBo2WDEXVONjnZZESdtFnJIEaFDwJGVHlg0KOYTPYE2WLyGj2K6YLCSAoHFFbGtCj7ErZ4OP2QlMIVlGB22pStgAh8HhJ5Woxl85jYGHyTDRGs5ShW4LJZEOJFdZ6/qNDi4Uz9YkolqVSDEmbUpoQ5/ZAv26x06vVOvZ4LpqxalZBWKz4ZrZpWGilc94ulgRNSRQGXWeAJuBxTySmqOgsrCXWMhEQOVATUTJUFXI0rjRiuC7jaPFGFSjyqcKDS1AZ6Ai4zsssCj4PFpF5noCcoZPNqRVDqHKrScnP2yECPwyXyA+dLy2NHwEVGdkmlh0MVBnoMLpHHUs0DeCZD3vUAXRL0GGgJistjh9T6SEBggEmDZq4bQ14M2DHZyI5KudHR7tF9fSO7+kd394wc6Nxf6BeNNDDjwOSBxcDm8SIW2Sy0KGR1iHpEdqLAD4YujV0OmZxicYrFq3ZMdRKKk0RWTNYTkpFTvBgwWcngkM0jj4MuJdqsWqSQQ2IdSZhJ0aU5lcUujcmsu0QDm0Xu5K8Vh0XN00w8dsjpXkFxBcUlx3zJySZy2Xz5BXBIEYVDNiXpDLQYYFKSziGTQyYtGyy0eOyw0OCxRctapIAZoLOSRuUxK2mREShAk8wJSTpK3kxDjUI6jzhJ5WWNFiEtQkZCtAiDEgbz0mmBUVRYUWEKmClMTRGnAmMB8XnYqp84SWBW6bf9uitRLlCGnXZrXnCFPbigF3SPmDCZMTaXATPqNAmJZpOyzS5hp17P6WNNDyclbEWtp9RaUi2ntEpCL8XVckwpCWqJ/B0EXI7rlbhe4ZViXK/EtGJcLcfValytx3BdQDUBV3nkCYo7ebC4SP43c9DlUUnw34IDy3G1yqNSTKlwsMgCT1C9ZtkGVVhYnsxvSTbrscjmVZtXbZI9crjEYyemlFhQiuE6LZcYUGZhmYIeCy0OkvhgsdhgMTlFbjHIEDRHUNzmIVfUPJDOAoeDLoc9BjoU0ASkxRBiCvld2+N7dyT2DAkDuVB/LjzQy3f38IM7sn0Id0IchwoDdApZFHaJJwy0eMVlYFObCDDCUI0qKlfwBFCOo7IAXV4yY8BOIjuL3RTUY7Iag0ZcsQTF5rHDQkuANhGPyEYhh1E8f9ZHbGTVYlA830OSfBLBgsfqBcUlPXG1zAKHU0xOMWmoU0DjFIvFJotNTrEYaLHY5BSTApgUbBigk4MdLNbImcPmaWBSuZEMKq+S2MiIOpPX6FGVLei8rLFiUzCSiLKSQRcMX79ZJ4e+h8RApoBbEtQWJ6fpJyqs2BoYfQmbdyWVk9SW8f6YeS3bXALxsBqQsFkOTWgNMpfz6y5+2tmpjwWY00Yffw4ZNDCr1/yQmNGqk5NGsgNu9iUNf8lkkrq/v3xyK1w5yPRNAk14VBKQf4yjwsIKmZjF5DKPSv4wDhb9SaYA3RjyYsgTcJHAI49HHvmBa5o/CY+dOHbj2OWx0wKLIAutOKjSqBLWShkJHNzbVxgM7YkvHQy92rflyfQn92fXPJhe92RX+K1U6O1ufvNIYV8/0nlUYmGZg24MuAng8aLLQZdS7A5sbwMGoxZpWUtgiwUOi1wKuyxyY8hJIjsNrQTUk8iOQyuGLPLXmDJn8ldDK8hugQT2mf2Elm/T19L/D8JjJ4acGHIEaAvQDr72goUGiYccMnls8dji0JzvxaBljZanpnwtwa0ZIQvqrNXRGcsVc04RW+aKM5NPP9a1MNPelqSXF9V5ZLOLv/kzqcwqYSUoYUatk1qoP/fr1OstBh4+OyUSTivbTF4GJQys9Y/Nua44fSOOX7MJzG/LLVF9Vg/9N+VwqMKjSgxW4qAUB6U49OLQS6BiHHox4BLi0EuAAKjoE4fOrCShm4RuAjgJMK0/ZVY4XKKVUkxWd4zuze/PaPujB+jXd217JrPintXPXrj8qd+vfv7CtS/8KbXy/q51f+NWPZTseGv3/t4uEQqgSONqBLoMMkKKE5LNKDQFXOQkl5GLDCjRqMjJOgsNFpscMhPQSkMri52U6qShTTxsUWUufLs47AQ9nEtCbrqHwedwgX7fwxYJfYiBLRK2eEjSVAJdUMisr8W0wxh4GAmDSSaJWmRO+IUSBn07fKcgafOy2jipgjR3mU3tvZ62ncVPRJsBUGvk9LGsPpVtzpp8durVw6eps8lZDqamvodzLWkkNEKjhcA+8qr/LfgE9+jEUZkQELIYx0ViWlqenSz0MsBNy05adtLQzSAvg7w0dDPA9fszwPWH5YCdA3YG2Blgp2XLh83bcWhlEB7eN7Cd/dgcWGEPfgSizyfeWvDmLWc+dsVPrz77azf/5ruPXHb84rt+1b3kjtzy2za+fFk/9fZQP9+5f28iDzqR2o1AVwH0YSsNLVqyyNomrxQp0RQgiSdmAlsZZGeRncVuRvWy0ElDEgwdHjvcJIeRKugVN6NnZuibeZdDtv+FZtwyfWaGxJlyNt3zXZ18gWJw7jerhC3V0bkknG39UJ1VwmYVdA4DW5Tz7wqSNiUhmaQR/DUDMitrMn1J3Q+DsykXdK/aqVe7jFoQv79Tr85qb06r5bRKTqv4+WpwN9yszNwG4J/kmGxPWwWZ+r7UckIp+SSx3/YSipfEXhK6LVLlZJeQlZxO4JFbxLQcKmahl0FeZtK0FnLA7oQOITepYgbYaVAcRIU9g6ldzKoD6XesoQ+7lt8bW3LnB4vOvvt337ni9G+ef9xXfvODL1156n8+cP631jz4y8gLV4ZevDy7/L7chqf7mKUDqc1D6Y4cs2E7vXww1T68e7BLEuNYZYAmKLYAbQaXGMVjFCeO7Sx2upCTRXZOcYmEiRkSzsVcpv1DEs71hQ4bhM2gcr6QQQODEvohscn01PTIJWwpk7ZUU2aq9YXp6Kx3m3PCoIRZfwuoVg8WLdNqxd8RmgvoR+jW6j16o4lR8+k16y0E784dISu+hzmt5i9jHJmEARtxPYXraaX5HfkLISml3EISl5K4lEJeEnsppZhSiinFTWEng5wsdLK4SKJcFjbJADcnu1noZKGTAXYWOlnsEjLIIWqRWyTWNcdAJwudHHJzyM1CJ4OaJIC350APTm/YtfU1NLiU/fDW5686dfEjF7x6+4+fvvaHi87/5hN/OfGBC7737BXH/v26779/+w/bnp7fv/KBkfALuzc/umPN/QMrFuWW3rNv66vsu5ete+ZCZsn9Q/yq7X18166+1KgkiCaLigwu0djlkJ1BTie0c8DKYSsD7BSwfAn5uU0L5o0x1JzcBi/9dpAjkXaaioeV8AsD41QknExQg1r6yxJTk8DJd0n5k8YZr4qafU44l1Gk9EKqsgQB6ALQW0oy/rBpkbBTH8tpjRxJLwNbXtJqKa2WpqZnk9O2oDzdWr1bq8/qW69ZJfRZDZ+5hOzWqz6darlLq+S0iu9nVq1n59iYmlHrwV8T0+ScTcIkqqRxeVayuJgmKG5acbPYzSG3C7k5xfMdIwo1oxl2ssjOIjuHnU7F7VTcHHYyyE4Dk3RmkZ2BVhqYGWj5I3PYySluTnGz2CH06I1udk3/umd2028fYF/86M4zn7/sx2ue+cNTf/nO85d/Z9mdp3xy1ymbHzgz9Lf/2vTQ2Z/cdUr7s+ft2nj/ri2PyvTz+9Yu2rni5sK2vyYWX7P+qf9iX7ss9+5NvUtuy61YlGt7OZvYOLCjL52X0kBNYCuGnBTystDJAaMLG8RAko4SZ2Z1aUo26MShk0DuDGyfOLR8Zn2IAO25LG2pY7WkqbPWbA4voe8hCYnT/t2LwD+DQST0V/AC7/CefRbntwVJC8LLCkEA6nR0XtZ8D6dcDc4JfQlJWWUqKqrlSarBSNVlNLqMRrc51muM9RpjxKg+q9FvBqkFaMwK+ZRvph88p2ycnE+Sv15Wrc7KzIjdPMmBG02UGiGNq2lczeLiFzFlYDd0O7HXib3mJfa6oUvogU4PdLqh0w2dHuT6dE92ttAJ7U5odyGnG7tEWuLtAaQwnzzGvrVghHlPePf6d6/53uIbf7rtiV9vfewP6x88r+OJP3y44KQ1d5+29IYT1t555sZ7fhV6+lfbnvivkc33WcLze1bf0bvk6q7Fl6feuzTzzlW7Vt2z7bELFt96wpI7frLxmfOod27qXvdMV47q293bLeUzUCPfYBpaGWwmJ53xA1oCuXH4f05CYM9aoCL9LTHzsGlt61yRlExnSkhe7D0zWSUqzvqafd/Jljea8qLm2xKEl7WWAChIWkzWY7I+w70pCX0P/SDph0fSObuEOX2MGOhnhn70Iwb2meN95ngwys00sM+o9hnVuSTst8cIQRVbnAwkq6058NRGnFYt602UMSJhGld9DzNKLYO8Wd3LoWIOTXlIrOtBXjd2u3FTsF7k9iK3H7r90B0A7gBw+4BDaHYibwA5/dDuA1YfsAaQ4192ylYXsLuATaTtxV4PcruQs7+H3frmlcKLVxQ2vJJYcv2aB05dd/vpq+/6+YaHz/p40c/fu/XUV68+/oXLfvj8n7772uXfbXvkl+9ef+Jrf/7G5ntOjj9/XvL1i7Y9do7w/O/2fHjV4McXxV674PWrj1228IyPF52x+oGzws9fEnv9+uTGV3tSm/r29nVJcha7aVxMIjupmEnsJJAdQ00JE8glc+CgVNMFm11C8pyZHsaA7XsYHB+Xp/qDSxRzB8bWVYoWCYlvxMAYsjhl2kj/4/5bvXlJb3nHKRf4d9SIgYKkz6IfYUYiGpP1ODBiUCP4+k3GRi2YoMagEYOGbybpmRdc3+syxv12zqjnjPpk/bPSqVeJGH3GWJ8x1m+O95vjQ+YYYXiyMWSODRqNoQCDAVoiYb/Z8AcP6HXST9QlKnYZtZxRzeqVjFGZWQdqrnBMXyyZQq1nlFoO13K41qnUCTlcy+FKE6UUpAsWu2CxazIA9iCvB3k9yO1Rij1KsXkJnT7gEP36oU0gpvkMS9owtAZxsQ97fdjpw04PtruxuwPa/UjvhE6vXumU0cDe/fu6YplVDybeuTr7/vW5d6/bsXzRioVnb33wkuf+ePzCn/7Hi/OPWXHn6R8u+OmS63/6xK++8ehZ33z87G98dM3pr1z0k3t//m/P/PZby2469YNrj33vmmOEF38/uOSK+JPnRh/7BfP872OvX9v+3JVtz81n/35lz4cLd299dXfo5cHkup1DmZ79+xKqnVJ0DlVSSlHAZQ6X4thNQT0rm2lQTKJ6EtlJZCegRRr+JSHY2byF7ASyk9jxIT1paJNVkBZ8S31pyQvwY8jyEaDpE+yfa0xwpH/px8bmJdR5qAvIEJBB2hzQWFnlgEYaBEZSCDNjXUzW46JGPhiUijzNnwQGBePhVBgUgB6TdZK7xmQ9aOa86YvsYy0S5gwS/aYKLX3meL853m82BqyxWSUMdg4HzGyJhCR4tijaZzUGjGrTQ31qutipV7vUGuEI1jkqOa3SpdY6lapPDlc6p1FqgehHcs6mfgH8ADgInWHobEfuMLR8tiObsAM7O6C9AzvDijOE7e3IJAxhu0+y+9XSgGb27x4+MJDdza3l318Ue+Mq7qVLOt+9puPJ8zNvXPP8Rd954tdHvXLxcS9ccOz7N5zw8a0nLb/t5DfmH/23c7702kXff+eyH314zYlP/e7op37z7Wd++61XL/zuqxd+56U/fG3tXaetuPXE1y/99vtXnvryJSe+d8MvXvzz9578wzeeufBby277Wfrd63eu/etQ6FUxuywurE+ISpfqZYGaREYCmknokppTBrhJ6Caxl8KOL0wKO4Qksv1KErHrCPHt9QUOShgIm2YwlfU7W+Q8ElFnytkkoF9QyKA5RJgWfAMJxCtiVEye/BScdjnXM/0JZKuEXUajpUTZvGzq1+jy9bMaxD3CoD0+bI0P241hu7HdagxZdR/S2cQaH7THyUdaPJxpYI/V8PNY4qFPj1YN1m+69WqXVunSKsRMUiKa1j9Jt1rpUso+3ajUCva6sRcw0O3FXu9kHOuH9iB0BqFDHNuF3d2Kt1ct7lGcPYqzV3X3qu4+zduvFwkHzOp+s7Rf9w5o7n7V2qeY+xR7L7Z2GrWdirtz/8DBzs37Nr86sPTmrvcvEV7449Z7z0g8d+GqhT9lnvlD7IU/vXLxt1+78OjX//i9VbeetOKmH22972cb7/zpmltOWnf7z1becmLo4bOX3XTGyxce89L533nzku+/d9lxL5//zY+uPWHpNce/fOEx9//sa7ce+2/P/vboxdce/9qfjn714u8/f/53N957/PZlt9Jv3ND14bXd7c9ntm/vkq0sMlOKnoFGp2x1AS8LKgngJZGdVg1fvBR2SI3Kr1T5FeBpNsrWzPWYtGy1eDgzJLbE2BSYnZlyziJqgJZb/mVTuUkPSTuGzTgySYroM9OiGDTiwPA1I5dxYEyWZDTiJOkMPiEGjWZInExlW8o5RMh5pNDiqxic+wUN9M2ZNLDh6zeTFgmHrXFfXR8SHgf0um8gkbDPqvVZU1PKAaM6oNcH9HpQyGlaqpVutdKjVX261VK3WupSiqTh00vA5QBFHz8AEv0GsTukOkOqsxNbO7G1G9t7FGef5h3UiiNGcdQs5Y1S3igVzHLBLItWRbKrhFG7UjCLsuXJVqlglvNmJW9W8kZpxHBH9w8fTK7q++Sv6bev3LXi6qGlf1l33y9XXv1D4dH/2nbvaZvuOU1efw/7+G9WXnfcpgUnb73np+yjp/e9ekH66V93LDptxXXHvjP/qLa/nvbRtSe8esE3tt111taFZ6y67vgVVx+39qYT1i846ZMbTnrjom+9c/H3Ppx//Ad/+v6qG0545fffefbcY5decVTiuQu7P75/y2O/jL56WZJZ3XfwYEIfj6vlFPJywMoBOwNLCVRMIqtT1X3HfOualSrFCxaK/WFzrYsG42HQuqDks9rYwpHr94USxrDp49s4l37+BI804kCLAy0mqwLQ48BIykZSNhKSnpD0mDylZVNOMPXY4FqFn9wKkiZIiiApMVmNyeq8ZpFzErLc161NW2/oM+r9ZmPQrAUD3Xarsd2q75hkpzVG2GGPTRPSGh+2pmaPJIQO2uMkWZ05V+y3a31Wtc+q+vFwwKgOGNVBvdno1ys+fVq5T6020cpButVSz2Sb6Efa/bjSj0sz6cVeH/b6sDeI3WHF2a66u1Rnt+Ye0NyDujeieUQ52SoBuwzsMjBLwCxBq0xAdoUgOxVoFbHtQauaN2sjZiNvVkZVU9o3tI/7YPuquwaW3bh/7cLd71y36qpTHz3jayvnfyPzt1/tfusy4fFf7njvcmnFTenHzxUeOD3+7FlgzbXmxpt3vHbRtttO3HLrKZ9c+6O1C05IPvZb6r4z9r19dfLhc7csOI67/7TkY+ekHz+Hf+As9v5Tt976g47bT95yy8ncA+duu+Ps18//wSvnfT1618+G3r+5842rNz58Xm7D07nkpgxwE2gsrTSaSzKqR/bQ9CB3pn6+hLP2B6UK0mJyWnEno+sUKWz7BOeTwTLPzJ7DSzhlLzDjgcsYNOLI9PGVa4av6TlnTNb9QgvRz5cwDrQk0BKympK1lKyloJ5s3jWmHhUQ25fQj4SzSBiscAaLk80eo07wDdxuNXZY9Z12Y6fd2G012WPW9lpje62xPfbYbqtB7hI5myqadYLv8A6zQS4HzRp5+LBZ327Uh+36kFUjDJpVcnfQrA0Z1UG9MqhXBrTygFbuV0v9aqlPK03Z2KTUr5eD9GmlPq3Ur5b6lGKfUhxQytNQS4QhpTSklIaxt1Nxd2vuXt07YBQPmiXJKMtmRTYrwC5Dp+LLNheqV9XsomoRCRsFqyqrqji6S06s7P7oph0rr5Pb79v19lWbLj7plR997Y1zjkncd3Lf078UP7ice/DU1BNnFZZePvTKeam//fzAyqvKzL1737uo447j1lx5dOT2n2+68YRNNx/f//wFgy/+Ye+b8/ufP7/76d/seWt+4aPr8KpbpKUL9r9z3b63r8x/eEXH3Se9/YevRhadGb33Z29e8OPUwuOGn/2vPe9f37904a5tT/RteXqoL9FVMHpwOaOVE4qTVqwctjqh040qZC10JrMaSOzyBQsmsTNlJsOCEgZJqm5SdROKQ4hjm3AkkZP4FmTm3QQ0E9AMxqvJHu0LSUGdyJYETeuSkpqRtKysZ6BBehJQJ5Y2mSqW6r6Nfjoak3XfwDjQ5s25hBDAE7TDOwAAIABJREFU1287Uc4e22OP7bPH99mNfXbjAMEaJ+yzx4mNRMgdZmOH2dhu1H2Gzfp2q7HDbIbKpthmY485ttca32/V95tj+82xvdbYHrOx22rsMuu7jMZ2s7bdrA0b1SG9MjSp4oBWHpgMlQNGZTrVfr0yoDXpV8uEmfoRtivlnUpxt1bep5cPGKW8VRatkmSXkV0jYKd6JCC3qphF1Sgiswrtmmpaen5Q7tucb/vbjrV3qPxj+5Zfv+nGnyz93bdXX3hc9p7fbn/27L2v/lZ+/1LqzmMHX/jV7jfPH3rlV7ve+g0M3Vlk7+9/7TebFxxN33587K6ftd94LH3n8d3Pngc+vl5cev3I4uv2vX+DuPwuZeMjZvuTVvtzNfYdfctzRtsTYM0i5sFfPXfm/4jcfurGBWeGr/uWtvza4XcuG932WJ55ZdfGh3ZF3hjoiw+MHuhUizGllIZWN9C7odOp1HOouTRKVkendvnMIWFLgjoVObGTm9yQEIQol1Fdgh8SW5z0I+QsMRNZSTR78TYBraRsJmUzOKskPWlopYCZAibJJEmbHCiZFaIcsS4N9Aw00kD3ycpNcqDZ3yJhHGiTHgZyXSkYDBUy7IslJJM3knzusMd2NN0b3+8cOuiMjbjjI+74qDM+6oyP2IdG7EO+h/vs8b3O+F5nfJfRIOzU6zv1KRV9CYmBu82xA9ahEetT2T4k24ck+zPR+jRvf/r/c/ae31Gc6d4uf8E565y137PP2XtP2J4Z2+MwzgFHnI0TxglwABxwwgYMmGyyydHkHCUQkkBCOafOSVJL6m61UufKOVeHOh+e7lJ1S/LMu9e6lld1ddF84fLvfu4n1BCRDOLqIK6CyO3FJaCiTi4qhQJ098CFGxHcEO+Gxm0EWarjTTD9CdaPcEGMGwVVJcnHKC5GiHFSipNSnmkEP5WECVpJEAKCcxDGQziLJkYS7pvBis2RqqWpvgtw3abeg+/Zd77dvOP1ho1P3f7iL20r7g7ue3nkwMz67+4M7H1t9Pg77l3PRi++Bzf8LHf9gtxY1Lb20ZYf/9Hyw/1N39/dsvSurq0zxs7PHzv3JVm2Bi3dhNzcAd/cjVcfwRoPU63HqZazRP0ppe0EWbauYtHTh565o+Sre0+98289RxfiDev85StCTQeb9y/oubbWVLnb4W62RLF2SLbFOXcMt8WoLlgG+lkSTIGE+oK7AvSuMlhINP4xQQEJO2NEZ4wABpoSlO6VLiFQa6KuRmknqjhVQuoSguGoLmFnFDfSEcE6Ilh7GAUpNxGjcp1RtDOKmiKoKYJ2RKDOKGyOIeCU7uxZ+lG4PSeh0a6WCJzX9QkjQMKWCKq72hpFpoFc0kNJH/X1ErKXVLyk0keoXlzpI9QBPOUj0kFcHiKUYVIdoZKjlKIzTCeHKDVIJHVAQoIyFcQjCDeAHxMDuBTE5SAuDuHiEC6OEXKIVCKUbCRMSoBRXBrCxQDK96OCF+U9qODBQRGrF66CG+N0PBjnRllQwboRwYnwTlh0wiKIQU+c64Y4kH69cdobI4MQNYwwYzgfJcRYvnJZuygxQYkQyRtJEBwAoliY5mCagxg6QSbHEA7jNAIdJHtqR26u8V/4gurci91e3PL93dc+uHvfk388+9wdpfPuqVl4z8CKh4cPPh868lLb0nsG97wytm+Gf/fz0fJvsNuLidovqbZfwpfmdPzw97ZvH7Esuav956f7D80avfglfGsdXb+Tqd1D3N5D1h6hGk+zLWeI9ktY+3m8+TjedISsOxQ9s7j6k/9u+O7x6wv/UbV0RnrkIlS2PNF0uHzdC9Vb3mg58LG7Ype122SJ4fYEbkPoLoR3IZQtkV2foGMBK05zHgJLrTksCQb4VkDuj9NGdU2x3Hq9GGFcTGuKjS8hAiv+9N8xCgmW+2VthEhATtFcJoOdIoZfsMSyy9a7YgRYt2TEFEH1WOuKQKYonCNhiiZMwLcYot8ff8b4B8NIWyTRHjXkoR6Dhmw0Dh312GyJwNNAg6QHz3ZKste42ksoXlLtI7IM4KqPSPrJFDBwlMwzcISUh0l5iFCCuGpADuJikFR0BvXalZBzMssjpDxCysDAMKXGKQUQI2UjY4Q4RsjDhDRIyD5c8hJyDy4BujGxG+c9GNeNZunBeC/GejHWi/I9GA+KWJCE3RDXC/G9EN8Pcz6Y98GsH2b9cLbVGcGFGCkVSJjTL89AlBIQks/BohSH0TxG8wjJIwwP0yxNCeSYK9J5xF+ymGzcQtSvtG97tvXzu8889e+HHvx/S175i23xw/Zl/+he9XDk1Bv9O562rno0ev794f3PDe16Knz9E6Ty62jJnGjl97GLHzrXP9q14kn7msf7Ds/Bbq1nGvZQzYeppiNEw2Gi/hDVcpLtPM91nCfaL2Gt5/DGY2T9b0TtQfjqz93rXoCOz2/96ekrXz0kda2RzIdCtzc7j3x0YfFDZetesVz62elqdiGME2EcMG2BWVuCtMKMBaL1hXXjK+wMZWqehPkPWyDaApHmBKE7XDi81EWd6n4O8IMFEpoSlC6hnpC5B/J+B7hn+F8JrmM1YInh5ihmjmJANh3w0hhdvAImStgRgfSho64ckDB/hKn3b7IGtsXQab2YWgiR9JIpXT9QVfpINUAqg5Q6SiaBgWO0OkopIVIZI+QxAkgIkk0N4uoQoQwR0hAhAUvHaBU8P5KzboSURyklTKlhSo2QaoSSo7QSpRVdwgIVQR6GSGWElIOk4ifkflzsw4ReXOjFBS/Ke1G+D+F9KOdDOT/GBzDWj7EBXPBjvA8VBhC+H+Zy4vF+RAhiwggmjuLCGC6M4UIEF0AGxnLFZ4IQIFLMJ6sfSgk4JWKkgJECRnIYyeEUT9ACQQsUzaIEyzISHe+DnMWxlu2x+vV011b/pTe7Nz3Z/PG9157775tv3GP/9jHX4jt7193j2fRo5NQbPRsfc26YPnj6zeCBp+AjM0KXZ4WL5yaufBA4N3v4yKu+Xc/atz3n2zcrUbJC6DgrW4tZczHReRFvPU22HmdM52jLRd50key4TLWex2t/I2oO4dUHsdJfokc/wU591v/r29a9s7Dyj5n2XWjH3ujlL2o2vVC6+jnziUU9pjIPhFsRzpYg7ShjRzkbwgIPp8KWyAPc1PWzwhTADjHGUB0XeILbuTHn5OXopGNLvb41PgPEs8YJa5ywJUh7IbiOI26EdMRJewwzYoui5kjCHEnoNeekHhol7IpAYNzYHob18SRIPKOB2clGwyRhSwSd5sNSA3iqH0sCQM3ZT6YH8JSPSPqIpJ9QA6QSIJUhSh6ms0YBecKUGiIlwCgljVLKCKEO48oIoY4Q6iiljNHyVFJFSDVKJWOMmqDVBJ0NQON1wfNRQsrzEBcDuODHxH5U6EcFP8YHUD6ICUO4OIpLo7g0gnOjuDBGiKO4MIxygyg7iPKDKD+MCsOoMIrxIUKMElKUAMpJQL8EJQOM7iGEiJIScE+HpPgCKJqnaJ5mOJRgGZzFA1WJzt8Iy6+c81CibV209APXysfK3rrjyjP/WfvRnfafH+hffU/frw/79z5GnH7LvfLBvh0zYlfeHznyXOTw84HDz4+dfosr+iR47PXh/TMiR151754xeGhepGgV0Xaet5XS9jLCVEx1XmK6LjDmi7TlItd1gem8yrRewCsPElUHiJpDcOnGyOmFwb3vJs58TtYsQSu/ipV+jdqPDJ+c039+YdX6Ge373nfcPuQYGTIjgi1BOmHShLC6h0ZsCGuHGNBnBtghxg4xjgQDLuwQY4coB0w7YNqJME6EccK0A6btEGVL0PoztgRthyjjR70KnagfGEyO16j5X00ofQkgmwMiAM7E7+GeAlccd8YwRxS2xxF7HLHGUEsUMUdgYzmaRxgBY0U9GztDcHsY7ogg7VGkLTwuoa5fwe7exjFo2iCeHMSTAUz14aoPV/1EUidApkADJkgqQ5Q8QkujjKzrF84fvEVoJUzJIVIBhCk1QitRRs3+m6YVgP6v3Gid8auppM2qS8lhUhojxGFCGML5ICYMYkIQF4cJaYyQQ4QYJqUoIcVIOUqIINmihBgihDGcH8OFECFGcDGCi1FCMnRcpAQhxXMGQiRAREkpCyWglJDLPQGnRJwS8w3kgIEUzROERLAkHg3ifaWk7RTu3C72HaEsO2LnP6p+7y9FL/yp6p2/upY/4t81fezXJ4L7XogceSK8bbpl6X3hU7OwK7ODB58ZPvSie/3DvZseG9v1gn//i4M7nhra9aR725NDB+ZGrqxBG4/y1mLWXsJYijnzFd50kTVdZkxXmK5LVOcVuuU8fns/VXUQqzqUKPklfHZR+PQXoVPzaPMWsuHnRMk8zLq359i84JUvHQffN+95x3Rhhc3ZboUZO0Q5IcwE83aUsSG0DaH1TAMfx+1CGBfCOGE6C8IA97IPoBTAjbL6Y7kHWAfMGu/oKlogWq8/QahOvDblywlGfSD6bAnSAVFOmHbCpAuaBA9EumAc4IHymCAh6owhjijshDBHArXHMOChJYpMlFAfHJoiqDkCmyOoXqPmUhGdaODEY2amgfYjYNBAkEgamp/ySLaklI3ugQIySstxSo7ScpRWIpQcIcfLyxij6PoZMWppQIJoKU7JRmK5jAJO6t2aMULMIYdIKUxKESorapyQx+2iZOCh7mSu2swjRohGAxFCBvphlJwnHimSpFE/DqAbSNE8QbIUjeFjHmGgmHQeI/qOpwfP0I3L7UueqHntr6XP/LH14zvjB1+M/jaDOPZm4sjb8SPP9m15MnFmLnfz8/CJF0PHXgwfmdm39in3snu9ax/Dij8fO/xq/6YHvFufHto9K3RuOVK7VzBfEB3XeGuxZCkSui5znZeZzqus6TLRfoloPkPUHCKrD0KV++EbW6ALP6JXl0FXFyqh60Lb2kTZx2j19yNly+0H3x2+tMhzZI75xCJL8xVXLOFCWRdCmFHOjjK6hzp2dFw/N8oCwbKgrC6nbqATpdwo7UZpF0K5EAo8CZ5xw9k/qEelHWKsMGOBSL2aNf7VerlbMETMZSBhhygnrP9FWdwwNamNQEgjxgx0xVEgoTOGuBOYK446Y5gtigIPgXKgRp0C1BRB9SQEEuqz/9k1bmNgz34WsGljGiggh3EFdFwMyCOUAtDHdRE6adQvTilxSk7QSoJWctpk40v/CmJU8ADEqDqJyfRLMBLEZn/N8INZorQcpeUIJUUoKUyKgBAlgtzT/0ajWrloHTfZoLQcp+QEqcQJGQD0gykFJQESTskErWTFI8cNpEiepoQJ+rE0w9EMR7MQjUH0UKvSfw73HBDGKtSe40NHnm+bc0ftK39pfvPvlh8f4krnJM6+ptUuip14bWDb9OFrX6qm7XTp/PD5lxLnZ47tnBHc+Kx10Z3eTdPVtm34jfmje58ObHkusHlG4Og3cNVevvMcby3mLEWSpUjoush1XmK7igTTFaL9EtZyhqz/Da8+mKg4gJX+GjvxXWD3bLZlrYbVK61rItfeDp9+Q2jf6P5trvfEJ67jH9uOzbdX7u8eHXRjnAuhLLDBqFzE5fSjXEhWLYAHoT0InROSMj7gQqjct1k9nDAJ3HPDlBum3DBjSMhs0k7EiTAFEpoTFGjPgJAENXDOedKNknk2GtybqhzVPdQlBB66oogzhjhzQ0RrDAUNG0sUskQhXTwQkuYIDErTrjDSHobbQlB2ZBhGC1ZyN4TGN/XruxmnGZucY7Q6mmOElkD9Cb4KU2qYSkXodC79sgbqEiYYKUEr+QM8BWJlo3swmwRAjAozKsyoQD+IlceZkJmAiQYCYrgUwyU9/XTBsnblJ2p2+mGyohemFACQEKfkiRIC/QAEw+uQLKfDUgkBH2L9N9Se87zvtBqvhRpX2Vf8uePjP5e/+of6t+7s3/0q3/KlXP+51PRl9OIr5IXPkqFznPsAWjQ3eu2VoaNPjW140vTt39yL/zF04FXOvIdpWEJefMe34dnA5unxS8vx2t+ErsuMqYjuusqZr3BdF1jTZd5+je+6TJmu4u3nyMYjWM1B+PYhrGTH0J4Fvo3PY12/ZuLlZN3KkVOPBw8+BxXNGbn6o/vY3J6zX/acWmi//ovL57ajnBvjnLhQ4JL+sUBC4JhRs/wHSDdCeFDSg9DAQADIKBBToC4FFtkQejweIcrIxO6rGaLNEG2BaCvM2BDahbIujHZhk0horE4dEOVMTIKeh6446k5gAFccdUWBh5gjjttjmC2OWROYJY5aY7AlCoE8BAYCCTvDiexcRQhqHUu0hqHWMNQamrCdwrCJUd/XPy1vOm58vKeCfqaxBwPqzBijRGlZLxEhSgUURKKefggtA1BGQRlF/wgzYg45Dy4bnsYfgZjkVAPFvJLV0FmJT0UuJ/XKEyFEhBBRXEZxGSMloB9J6uQMpAWQeAzDMQxDMDRNswIt8qzAcDQtkKxAMjQuEVEO6lXDpXTv6TTapg4ehc681L/4ntq3/1j98n9ZZt2VuDwvaV7MuzfS1tVk1YcK7ErB5YRjFVOzADr6et/y+52L7ur59qHAmmewo6+kbAc58x62ZlFg21uJ4lVk/W6+/YxkvsyZr5JdVwjTVc5yjbcUSearQtd1tuMS2XIWazyFNBxDKveRpVuGDn/h3/cmWjo/3bUueuUt/56He9c/2LP9yZEz8/0n3zcfm9N9aZH1+Kch8zVfHLVRGTvFegjag1FumPIgtAujHRjtAtOthhIUVKTZOzCXm4w1LGOCOQ/CumFG/6gvitDtsk9AT0VQlJph0gQRelvVEqOMUw7jVqO0B2M8GKMncC5sx4V3QaTxOi8SYcplCEM9IfXAdMVxVxwHXVNrDLUmMGsCs0QRSxg2hyCgoikKg75oaxgCi7zHd9Mbjtk30hRC9Ip0WnYgp0+OGzws0M8oYYTKZk6Czkqol5E6IP3+mYTyVBLmo046UMyrMPMl/H1y3ZesgQghooSIEqJBQjFfP4GieTpnIMMwJMswDCMyAs9yLEuzPMXxJMsQHDrIJUyi/3rSXyQMnWdsayKHXzTN+VPLK3+pe/WPgaWPsw0rVe8vSc9+0botNVyiCn4tXiE0/xw98aZr1b2OJX/xrrzPu+KBgY1PRy7MY20ntdFLVPEX0NXVvOmi5CqjnFW0s4KyXGfMl3lbkeQoEexlgv0ma75Od1yhWs/hTafR+hPQrX1o6daR498Gds1MnJ0NX/54YM8TnvX3dq96tOOnu3t3vj589r2BC59bj8/3nP3GXbFrcKTbCeMOjHdgrAtl3SjbjfMegnXjlAujXSivi/c7GC3NXgMDcyt4J/ZXwYDQCjO2BGmHKGNDyIJQZpgsmNuwxikwNTKeyRjTjbO6hwUZrkei0ckCCQs8BDihbCp64hioUe1xxBZHgITWGGqOwJZwtigFErbltlnkRd8UEjaOwUDCxjF4GsgcoKJeahYsW9F7HjFSjrJKhMlWhnmhNwGYURE2+bsSTjAwJ6HRw1z1+HsS/uv66QbClKL3P5GcgRgp5OlHSdmJB4N+DEMxDMVwNMfSEscKHM9xDMtTAk8JNC5gPXy0hu++nO69iJp/hio+7F/zWMPrf+x87W99X9yJnn2Pde0XezZl+q9qoWsabmPRZrZtV2zXTP9PDwysfDC49uHAqvt9qx8Z2PksVb+at/9Gtf0Cn/1WcZXzvmbWdpu2lzG2G4K9WLIXKfYiwVrEWq+x9nLOeoNqv0w0niEbTuN1J+O39iOl20Pnlge3vxb/7dXI3pedK+/q/O5vnd891Ln03q7lDw4cesV/+hPXsQW+az95b27oM18eGPP146ITF1yo4MbEbkzsxmkPRrlxxo0JHoyblKmENIwtsxLaENaGZA0E18a5EFBeZq9hxoqwVoS1wIxefOpYYcYKjwdgN87qEuoeTpTQGIZGCQuyUZdQNxAAJLTHEUscBRKCKhQY2BXJDgIn7uud9IRFcPii/hKbafo/91z/Q5l00lzHKCHoi+YklCBaAiLpFwirTC3hRMBAUb8wTF2QCli2AshfUDZZBhKTtED12YiCGQiMlFBCxHGeIARj/5OiBZoSGIbT9WMZimNpjiU5lmQ5kmNJiaMljuU4juMYkSMlGhYwmzx2TfGckiz70NqFiQsv2Rfd1fH23T1f/ZU89arQvoxz7Uz7DmuhW/LQCab7ED/4G3RpXmjNQ6G1j4a2PBtc/cjAygfDu2diV+bxNcu4mm9Dh2bSdXtSg2ZioCnVU6O6rouOa5ztOussEzyVvLuCc9xk7eWS/TrTdh6vPUrWnMBrjkO3DkClO6JX1wa2zgzteCq+9TnX4jvrP/tr+Ud/d65+ovbzPzo2T+/Z+/rAqc+sx+cHy1eariwb7qn1hcJ9OONBhW5cdaGCB2M8KOHBGA8udqNMN8r0YKwOuDOVkC6U1RundpQbB+EBNpizwZwV4Swwa4FZMBuZXSqQkxB4aBmfsaT0bq0uYUEGGq+NQoLaFaDPJTogwjiDn9+5KZTQkUB1CW3xnIcxUItCbeHsTsKmyPj5F42hQgmN53+PS4iwCtCmoAKcUkJGNUoIWjIQOy6eEYRVgHu6fvrHKQwErZpskP4PJAQplyCkqREShJAtQUlJn/0jSI4guax+JEeRHE3xDC1wDMsxLMfSOUiBIQWG5FhSYAmJJSWO5lmO5xiJQyUiLCRapMBJxbWL7/yFvvVZ7MB09+d/8cz7R2zHA6J9jeY/LFvXpAaviI5t8VsfMvYteN03wd1PjG28f+zX6T3rHupecc/ojufxKwu4sh/w8u+pKx+Sx+Yl+yrEYTPbXy/7GjlPJd99W+ytFXtrRXclZ73BdhUx7Rfpht+I23vQsp3krX145WG4fH+8ZHv8+oahXe95Vz84tOYx9+J7Kuf87fwbf2td8kjNV3dUf3uPe+tzA0ff7b/4lfm3ebZjC3ur9gf62gKxkDeOeHHFhQrdONuNkd0Y5caEAgN1pkpIV85DF8o6MNaB8UBC/QKgy2ZDWHDHNuHahrDGmRLwm3oM/g8kdMLjc/q2+DjZ6f446UxQjkS2U+qOocZydKKEnVG4PZzQt9WDE2vqxsYPVjQyybnDY/A0hFWAhzoF1aBOjAGo+txgglaycZeTDWNVjFV104z8roSqoR0qTtIgJRVj0OWH2/gKT+MyFyDbRGBcgHEBIUSE5FGCzxpICATJkhQH9AMGghJU109gdICHrEDjEotLPMWznMTRCpNQ8EE5Wiv37GK7VnBda/GiOSPrHxz46u7+L++Nn3xd9u6Ueo8I1rWiaSd18QWi/CPNe3R009PBlfcMr7q37+f7+1b/I7H9ae7MbPrGV2jJCqHrAFmyTGo8oAba+HBXKtCO+ZvVgXrefg2vOxi98vPQkc+DBz4ePvTp6G/zg0cWjRxbFDq1GC5aD9/4NXFjR6x4U6JofeL4IseKB10/PNC99OGbH915ZuZfr318h33d86UL76z/8e+WrU8PXljYvP3Njl2zWw4vdFbv9fXU9wd7fATnxsQeiu8l6B6c9qACUK4X53SyeYjzYOGuB+OM10YJcyryDiy70QxcG210YMDVvD+iKzcOlleFFtSiBUIWSGhEj0FbgrQlcovdjELGMHsMy44PwUQFEE9fdBrFLFHMHMWyo0GwXymGNkbzjhv+V5iGsTLKSAgt6joBjFMLcXYciElCTDKRHfIpKKfinKJD8CrOKRgrg59FGelfkFA1SgiSMC8G/zUJp1jtWQjQDxgIJMzN/uUMpBiKYmiaBfYZ3Msi0rRI0wLNCzQBJBQ4XuJohQ4rWK8auiU5V2LNPwi2nfCFd0NrHvB//Y/RpfewZV9rni1M2xqmfQVX+hFz6AGuawtS9qPvu7sT6x6O/vKIb8UDiV9f4E+9zxV/QZQv4zt+S/fehKv3yT3lyqCJHTVnAmbVd1tu+w0pWTv62/zBX2cGNjw7sPqJ3hWPuZY95F7zQt/G13w7ZodOfpsoWo+UbItcWh85tzL+29fWFU80Lrjb/sMj1XP/fu61v56f/Qfz2lfMm164/c2dtT/cW7Xiceue2Y1bZzbtea/txJc9dQf63DVBAvPgoocSe3DKi9HdKOfF6D6c6SdYQB/OAHoIAbhnxINxOSU4j2FrC2CCnFn39O0vus/daEHAMh4sWxVPdO/3JSyYKQEe2hN4wZYRazx3cmwMt8Zwe4wAWPXF33ECGJhdHxPD2qNIaxgCBjbF0IYYWh9FwXHDk+bexGCcZrBFmlRC4F6MywKzKYhJgqYLxqoEnyKFJCkkCV7VL4CQORX/uYQFE/e6luPikYoRfYY9Tsh6dQqCLk+2ydB3PwAJCUIAwz/gng5DsSzNsDQzqYEiTYuUKNCEwuIST4kCp/C0Qo/JqFsOFovmr/HmZUn3KaLoXXrHU4GvH8Y2PyyWzxdMq4XaeWzpLOjUE/SJV/j+U4kLs8I7pyNHnkscfTFy4FXq4md81VLBtJtxnlb8JbKlnDKfS/VXysMWLmAVvK1y7Q70yuLYma+jJ76MHP0ysGuOa8NM+5qX7Gte8C5/fGDN0/2bXh07sgC6uhor2xY5t2r02A++LR+3L36sZNYfmuff3fTpfRdeuePiu3+6Mu8ey7bnO9dMvzznDxc/ueP2qqdMB96t2/aa+bd5rpIVXvOVYSzmwXk3KXRjpBejvSgPDBwgOYBuYw/BGUNJj6aCEaPBz5wqeB4g4sAf1yNXT9punC8YlBaUoOP64QyYNnSiFPgvYFIJbXHMuPEKrDgH2y+ymzByZzeD/VxdMQJIaI6gpjCiS9gUSugHSWUPO42gxoOGwUmnTWFUP4YDXIOb0yYpHTkV5VRQWGKsqmsJcwrMZWtOnEvqEHxKV5EUkqSoAAhBJgQZpxUDSZ28SjVXEkOsjLDJPC0pNSse6BsZFqCBO1MlHkZKGClNlJAgBIIQcJzHCRaMA7P1J81mM5BkGIoMoFK8AAAgAElEQVTmaUZgWJGeUIXShEDjAo0LbFSh6CSLqQIl8LTMYxkmlEbqtL7LvGkpWfuh2L6d7PgqcWx6dPl9yPZnmPpvuJqF2sW3uJPPJnbfl7r6drxkdvCXJwf3vMJemI3vf5bc/7pS/QvjuaoE6rSeGq2vSXJWkPYyfrCZGzEz/lbWcxNrOsaUHoYvb/QdWuDY8kbXqhn2NS+Zlz/nWPmCa/ULwS0z48e+ihVthyuPsJW7E+eXDOz/zL3h6bbvHyp//08l7/x/TV/cUzbnz+ff+q+rH953fcHd7i1vty1/6sonf770+V9bd86q2vq69cynvrLl7tr9gyOeACN0E3IfKQ0QjB+nfCTrI1k/xfkpzk/yPoIbwNkBnO3DOYCxUvUS/Hj/plDRwtgE9OB0D04X1Lr55W5WUSBt4ZwElmM89GjjlKa+2FWftXdBtAuiQS2a2+WUdc8UJ/XD1EHZaYliBRugumJYZxQFG/bBUYjjxyjmn+ymfwUOd2uN4/oRb6CRM4mExjHe+EdORXgVFZJGCYF+U0mYhVNITiEYtQCgZcHfgrDKhOo052F+LTrpdgcjYN5vKgkJQu/E5FWhFMUwFM0BCSlKoCign5iFyIFJHCwzmMpSioCrEp0SKAXrVeO1mdFbrPVbpvR9qWZxyrmRufoBsfl+fOf0ZMMXStEs8cyL3OHHiePT5Zsfwodf9n19V3THDGjPU9Cep5jLC1PWY8rwbXm4Lt1fnfQ1ST2VvLtM9dfJA3Wis0TuOM3c3BLe9+HAtpmONTMsK55vWfzMrU8fvjz7r+Wf3u9e84J/65vY1VVcx0XOUsLUHY6e+a5v5/v2lU9blsxoXPh06Xv3VMy927T0yebvHiudd8+VuX8smvenjp+ftm15qfKnR+s2vdx1+CPX+YWjVRv62i8MjPl8FOcl+D5SGMBZXUIfyfoIDgAk7Cf4foIvkNAwYiwcuf2LEuoYnmGnkhDkam7dDJ23Si43gTm+4hymgX4A0IwBBzRPxBIjjRsRdcxRDGy374ziHVG8LZx3aGIehlMV9TOmCk5nm2ZsqICeilFC3Q2UUzE+ifFJjJXB2M8IqEKzCLJRQlpIUrxKcgrBylkYlWSTRht1FTFWn9xXEVrVl5LBlAKRIkxJRn5/7PdPJMxvhOoSMhTN0sy4gRQFrJNpQqYJmcEACouqHCYx8RTHyzySkok0T/CJrlSiRolWS57lWt1CoXK+5j+tuTdqN2Yx556VSt9Uzj4vHH+K3fMQdf5FvmaucPhV5KdH4yv/MbbyjsSeZ6X6rar3ZnqsRQ7Wyv5aebBZ6q+Wessz3luqrYipPYBeXRHc86F/46veNS83fzn9wst3HXz0v3fe9x8Hn/zD9fceav7mwb4d75FVuyVvneRvFbouxs5+37P+ZevSZzsWP9mw6PHSufdd++Ce4g/usK56wr3xkdZlD5bN/+PNr/5Wufj+hrVPN2150X163vCNxWN12/rdVd3RiI9kAwTdT7BegveRrI/ifBTno3i9Is0hDJAC8LBvCv2yEhKsh5jkfrYEnULCHozvwbISTjX8K5AwNw5kjBgl1D10JqjsbsM4rQMWAxjfF2KK4wBzggAXIAaBhOCwDHBs1MSzpNpiuP4VIHtcIriO4W0xfJquX6GEnIpyqlFCADBwPPfyARIWeAhKU5yXwEARjBhJNmlUUcc4hjRKqG/kw2gRo0VwjZD8VGO/gqUwOtn5wKyB4xIC/bKDQIoSKEqmSZkmx8WjMYVGFBpRaEihIZlBZAZSBUbisaSApOiQnGjNINUqXJ90b5WbFormNdrQuVRgs+ZZma59izn1JH/iSWnvI8yW+7nLr0o1c9izr8HbH4eW/B1Z9Tf+1Lua+6Ic6NCGOrRAgxpo5v0NyWCTFmhIdVfQrWfQil142Ub48tLopZ/6D33ZsPT1Y6/edez5v55+4S+XX/3TtTf/o2nRw8NHvua6LghDpmTEpXbfip1Z4lz2ROPXTxZ/ePeF2fccff3u7U/855FX/nTlg/+0rn7Qv+MVy9rHGn+6//YP/6hc9uClr++4/cvTthOfDdTu6fPb3CjtI9kRghjA2X5KDtC8nxb8tOCj+HxEH5GVUI/EcRuJPICHEzXLQjC9BDNZnPI5D8clnNgU1QeWhpYM+zsS6kUpOOcyqx84bT1OOxJs3pJxg4ddCbwrMS6hKYKbInhXGOuIoR2xvBNrsncimE5HFO+MEVlvY2hHDO2MY51xbBrOJQvmFYztGaOBIAknNZASU5SYmrwcncxDjJVBmaqj52Te/w5oOZd7SsGe2v+ZhDgu4jgPYtBoIEUxLM3wNMXTlEBRAk1IFCHTpMJQCm3UD1FoSKUhlYYkOiFzhCyiskCrLJQiPBmkNRkvVeO1Ws9+vPOH5PBZpXsb1bZYsywnTzwu//qwsOuR1K7HxE33KxdfVas/YC+9wpx/Edn6BL/ncalonuYrToZtmaBJ87XIgy2Kvzk91JkZ7lIHmnjnLclVlvHeynjL0901KWd5ynIVKd89cuJnx4aPOpa82PL9490bZ0cub2Dt5XLEnYYHMoNtaPEm17JnK796ctXd//eC/+v/nP9v/2vJX/996xP/cfy1O0++clfbkgd8+15x73yhfvmjN7+/99bP97Xuf3OgdK279UJ/aLibUv0kP0qSPoIboBU/xRklHCA5HyVmIQQdo43efHrJLN4JXwFynZ5xk8EBJbqEoBnzTyU0hGTeSjp9q7G+RjxbiOa/7yD70pEEM0FC0ighCMOuGAbe99gZQnPBiIL7Oh1RHNCVvxG5K4bpYk8Do7uJEo4vecnVornhn6pbB8TTr7N3ppbQOIFhnNgo8BCA0wpGyRhl2NqXu85jQtYVFKK6fgQhEYQE+jEUaZCQYmiaLTBQonCFIlSaVBlcZXBjBgIJFRqSBVIQE4rIpJl4hujUoDpp7FI6Xpfy7hIG9mljl9Pt32i3v9FKP2LW3cMuvYv+4Q5uw33ChnuTp2ak6+bIRTO1m+9T52ayR5+hzr2p2PZrkWZtuDUdbBaHWrRRU2bUmhxzqGOO9JhVi9jSY2ZusDPVb5M8zaqnSrHdkNov0zUn8PJ96I2dRMlWtuV8MtCZhrzJRJ8WdnGNZ13r32lZOXPb9D8fnfnS5//+b4v+8H+se/B/XZz9yL6n7ij9+I6m5febtzzVt3+We/frfWdm917/vrd6n7ff4kOxfjrpJ/khkvVR4gAtBQjaT/KgH+MjON06PykarwGgQNUtBR/7ckyoZrPkCt284hZICE4wmVDl5s1PenA+OwWid1xzcyHZrVgoCzZnFWzUGH+nXZyyGs7O0c+eyvfQEIlZzfS3UGYN1B8okFYvaEFNOz7hESem6U1O3cNco1KEWBFhJYSVUE4uqEJ/R0JKUvMQx+cw9NkLnEtivAIYn2NkZYKVjTbijAT6NxglY5Sqk9vyp6CkAmYaJqKfwjQ+HU8IJCGQBJfbkcTnClGWpTmepgSaEGhCpkmZJlSaBCgsrrC4wqIqA4ABSRaTRVSQUImnMkxYwzuSkRI1dEXDGtje7SnfwaR9s3jrQ/nCm8y+R6Vf7iE3PUisuDPx4x/ptXclT72otc4Xqufyxe/LpbP5w48z+x7liz/Ruo9r/Tc0f3V6uEELmbSYK4P0p+CeVMSeCVlSIzZx0Jr0t6gD9bL3puy+IdmvS5ZiuukUVndIMl9VBpq0WHcG7k3DfRoxpAXaote2encvLP/ymZIFzxx5/e59L/z3wRf+UPrxA1dm/6lozp2tq5+oXXF/3U+PuXe9NnhlnrN0md9U7EMx0P/0k3yAkvop2UfxQZICd3KIOgFcGCRy15Rk+Mr4PD+hji0kl7Tj3ub6PUIOvVXzexK6MLpAQqOKuod6JIKt/WBywniS1cQTcbLHT4FToaLZoMu+GTaK5z7myWZOECaIMEEE8HD8ZnzcQFuCnGacbAAe5hZSSzAnGSU0ejhRQv2ClpMAXULwLcGrxm4qKmQlRDnZmI2FkZhr3oBWjY4+VtTXnRWA5E5kyjdQMOwJzErI0hzH8KD/KbGUwlBJjk6xdJolUwyRkxAHzZgkiyVZJMkiSZaQpaiosAKLpekRDWmXRs9oiZJk4KIydEzz78y0fqPULOSKn8mcfSl54rFU5QdaybvSqr8xW+6VTr2gtS9KBtapNd9o196Wd9yf2vAXetuDyfLFStvhpP2qNnArNdahxh0pvC+F9WbiVi1k0obNWsCqBs2pwS6xp0FyNYjmarmrkm28Irdd5nsq5FGrHPWkoW6NGEhhQ+mwU+u9hV1ci5xbi55dg5xayV5cM7Dtg4avH735yV0X3ruzfvmj9T8/1PDT47373hy4NNdVuS7i7/DxGR/BDeJ0gJL6KNVLKj6CG6XZIUoMkkKQFIKkZGSQEAcJMUhKAWocP5l9eJDgBwm+QMjJoQU/LfhpCaCr6CXEAglzM5P5ywMmk9DooXGzsnGgOH6wVYIBmCHGDDEgD22JcUWzzdLcQpls5Zk7HDU7VswB3AP6GW/qHgIJwXqdaUCJiSrmxmaysR1KCklKzExOLvpA8UlJKiUplKTkDRezkQj+RsU4p69LSLFJklHJCa0aMHUBDAR5iJMqTqpgPnAyhMkOpNCPYxKBigwtsrTAMaLIUiJLSSwlc3SSY5Ick2LpJEMlOXocnsyByzKtiERSQNLssEY60vGazNh1bfRqMnxTQyo0/ynNu10wfatUfaJULki6Nmj925XbH6dOT+c3/50rmZ8ZOiWYtqR6f9Yuvc5suI9dfQ+/+RHp8Gta8VepynWa6bDmq9VCznSiX0v0aDFPOtaTDnm0UZs6bFL9HWp/m+pulKyVXHsRUX+Sbj6htZ8QnSWpiFNDBzXcn6b6JcitjNjkjsvh4u2Ja9vxst3ojZ2RS+t7dn9WNO/uax/e3/HTjM61j1ave6p+wwzHibmjJYuG/M4gpwYYGdSZg4Q4RArDhDBMCKMUOMtLGqPlMVoeoaVhShymxBFSMDJKiYAhUhgihSDBBwl+0IBRvAAlBCjgnhCgsx/1OM2GJC4NYGIfJuiDwz5M6MOECQYKE8+enTQJx1UE63VgcIbV+D5GsHLVCqWssGSGaEuCscU5R4xzRgnLaMgU8HUMBVpG/a0j/q7RuC0smBJ0MxLripPmBNUZIaxxwg5jZgixQKQ5zprjdFeMMCcoK8yAI5UtEGmBUWsCM8VxcwKzoOg0UkgXeJjfL52YgZNLSEvpiRUpLSf1+4ZpjOzYsmBtDeB/V0Kw/Q8wpYSGjRG50yiyG+RZSuQYkWN4IKHM0QrP/DMJ8SSPSzyWlPCUCCfpYJJwpKD6dKRUCxdliBopVqLFrmiB3bL7J63z22TNAq1nbbLsbeLUdPrEQ/KxB7WGT5Jt33CX3lSvvyyeeFo4+TR9+AnpwNPq4RnSmXekiiViy65U783UqCmZ6NXgHg3ypBLdqahbG7Okhs3Jwfakt1lxVontV6nqo/D1rYmi9djltXJvtRjtT8Z8GhbUyEEt7tL8jZrpYrRoM3RtO3Jjd7z4V6JsR+LcssrP/1H+xd3t655x7H2u7eDb7ce/ajj2uf/msuCId5BVgISDhDhESMOUCNwLUSJg9J8BbBzKJ5ei49mYUy6LXgP7SXG860PxPlzqx8XcsHDcw7yiVB8QTr1E7p86mZOQscCMBWatKGlBCBOEZSWM07ZIuD3Y3dJd09TX1RDwNgz7OkIRW4y2xTmQchaINsUoO8Q4ENKaQGwJ0hqnwRYNsEwHTEjaEqQNwm0xyhZHbHHMHmemTTBkfNiGc0ndwImFaCGyRskaJadJKUVKKUpOAxg56+ekEk5UceK8RW7GIs9AXUKSUQlaMaqYQ8yT0LA3l6L5/BjkdQkVnlEFNsWzee5NiMEkj6sckpawJB+TCb+K29NwQyp6Qx09pyZK2LFzWvRiyrtD867TzN+Jpe+qTfPV4pf4kreEig+l0re1jgVK3ZxU8azk1deEqzPFsreF0veU4rnyiTek46+lby9J2Y4ne0tSYx1ppEdDuzXEnUG9aahHizu0sD0z3KV662VrCVd3BLm6Pnz066Hd88JHlmohe0qKJYk+DXLIwxbOU83WHqWvbYieXY4Wb4FL9iRK99MV+4mra22rXm5c8VjHrzO7z37WXb7J1XTN56gebDk5DBGDtBygQKkpDFMiONorTI2fLaLbGKLEMC0ZPwLGSGGMFEZIcYQUQVoaCRqEDJL5EubKUR8pAwn7aX6AkAYIyUuIPYQA1qnqMxZ5k5A475naRn1hqtHMbB5iJFjdBo5dtSIs2FplQVErilsg0pJg7HHaFgl3DNtre2832g81eMrr+231gb7W0SFLFHImGEectkC4BaLNcdoKM3aYsEG4E6YdCcYJoU4IdSOEG9F3MNKOOOkcS1hGeyyjvc4xeBotpXVJ8ubc81XRDQTPTyQnoUZKmQIJJ3hYKKHRw4kSGtfWgB6pDk7JRgn1ffG6hxQlUZSU3Z5LSTQt04xAM4IuIYhBjmGlXAyqApviGaN+KZ5J8UxKoICBKYHIIqIyMybifUnMqiF1mbHzsn9PJnBYGz2q9eziGn/UrCu02gXK1TeUG29rztVa307NuVm9PT99+8NU7Rytfr5cOSddO5+9NEtrXqnZ9im3V2qXPsnc+D7tPK35bmoRUwbt1dBuDe1OY31puE9LuFMjdtXfIbgq+LZzxM1fodM/RPd/Orz57d6NbwjNh2Xrefb6amjnB8ObZ8EnF+EXvwrv+WB07zz0wmq0ZDd08whcfpAo2T5y6KuutU917Jk9cGtzf+OF4Gh4NBIectUFsXE9QAaGKTlCK2ADd4yUdBXBRYSSwnSWAhULsnGY0hGHKXFogo1+mvfTQoCRgYT9lNhPiQOM4CPlPlLyUlIvKXYbPJxkMQDw8J9trSoMSYxwYaQTpZwI48Cyx67aUM4MMXaEt8KMNYGZwiMdw/amgYqbtlNVpo11ztNN3toWX0fboMsSGnMkUEcCtcGQDcItEO2AWTtEOSCwZ59zwTgQzwWRLhh3I4QHIl0x2jnkae0vauu76BzqmDZukaHXYlSloCPKSulJmUrCyX4/rdfA4HqqkrjAQyO6hwStAAlBFaof0ASgKAXoBwxkGIVhRZYRGVo0GigwLDBQ4RmFpxXe4F7OQIAuYVKkVRGVmVGV7Ndwu5a4rQWPJL3rUvY1mm+LZl2lVH+tmVcolZ8lr81Wrr+Vav820/KddnuBVvKWUvy61rU43b1Osf+sVS+gTr+hNWzUeotky7FM9c9K6WLNckjzVWlhaxruS0PdGtyTQfpTid502KkOWeX+Zs5yjaw9jFxdFz+6KLJnbmT7bGjvXO7yCvLqz9DBBdGVz4cXPRBZOX1084zenx5zLpseOrgQu7YdqTiGVZ2kq44OnVrl+GW66/jcnroDg+66MYIciAwNB7uGGTxICkO6gbSky1Zw8t1ECSdVMZRfo46Qgj6YzNo4LmGuMUMpPlIGHg5khZS9lOSlpB4ym4dg2nDijMWEnRyT72/Mq1ExMishSrkw2g4T1gTiQDAbLLhQwQ4TXaHhZr+twVvT0F1SYz1X3rmn2nywyXG4vftkZ98t63CfLQaZYwlTJGiKhGwQ7kQ4cDidG6Z6YNYFg1cScU4Ic8TCjuiYMxZ2R+LuQG1rz44m92pb/9Fpk2RaNhWBHuP6gW85OTUptKTRkqbLNmVgiikwhtT1M1LgIc5NnopGJtaiuoE5CZVxAxmFYyWWyZIbDXIiyxgNBKgCk4NKirQqUKpIAJISCSRMipE0F9Sobi1WowWPaP2/aN7Ncs+ajHWlUv210riYqVqoVnyiVc9LNXyhVH6qXJ+l3nyHv/WB1rtF9e9QLKuVa7PFknmZ1s1aT5EWKEs5D/F1K7X6dVr/7UzIkoa8WqJbS3i0RE8y5EwFO1KBVsVdwbWexW5sjp/5IXxwwdjuudG98+BzP4uNxxVvlRCoF8wX8HPLIzvnRvd/nNj7Xnjne9HDn4eOL01c24VVnaTrz0Vv7LOued59amG/vSo04gtAaDARCYZ8oywN3BilxBCVjbu8QyJzO0t1D41HURqZ1EZj50bPxiGSH9KbNKToJ2QgYXZYmBUy62EvKRqmDfUVbVMy7qHePi1QkWD1pTYuGLeExjpHAvZo0IUQbpS0J2IdQz21ntpq67UmZ3Gzo/i26WxVx/a6jsUNXd+3OA9ZAjZbON4+Fq7zdjQOuLrCUXBSowujXQjjhhlw/pUbppyxkGXE3jnYbB1qcwxbXAMXu7rXtzm/63QunwZqxalUMY76wFe8lJoUTs4YgjEJ4ORJbdRoSZtKRVxIYfx4q1avTskcBUISv0uBhCyrsozIsTLHyjwj86zEs4LE8RKXHQSqLGXwkFR4UhUoIGFSpA0S4kmJTCloUomlpKjGDWmoWQsXZUYOaP7DnHdbxrlBq1sq1y8RGn8Qb30mlH6gmjYkLVvVzjWC+Sep/UfN/UvKtlwr/1Cr+V7rWJ00bVMdp7VAeXLgqmTam27amO69qYVMGtyjxR1a1KqFrWqwI9lfp7pKhbYzTMUO9OwS6OgXsQOfDO/+MHH8S7h2G2+/JvrapOGO1EA133gUKV4bL14WO/0jev5H+MS3I4e+Qoo2YzcPolVH4aqjzl9mOY5/jeJIGGZHYHIMQsKYEGIzozkDQQzGSCl7mgElR2k5t7F73MOpJJx0DBma0L/RK9UhSsxNeyjgtQugTerDs2HYT8l9pNRHSl5i/B0kvbjQA47D0ZlKxfwR43iHBuecuOBC2W6UccUSHQFvs9dsGrQ5EpAHJTwJ2DTUW+u4eav9SK35QLN1f615X037ytqWz2rbFzbaD5n9VmtopD3Ye9t+q8bd0jUSdECYHc3NUiKMC8YcUcgZHnWMWLt811u6D3d0H7b0nrJ4tnQ4lrZavmzt/HxcwoL4KpBQvz+1hFl0/Tg5yclJ45gw91Pa73iICylcSBklBB6Sk3mYJ6fBPT0PcxIqBgkllpF0CQVOlHlOEXhgYIGEMkfoBhokxJISrkl4WkVUJa7IibQEaYwvjdQlYxe1kSupkdMZ+6+ZimVa/SqtbU3m9lfclXeU2x9l2pZq9k2pvm1a91a1c7XYuVQrm6e0bU61b1VNuyTPaS1YpfnrNcdluWt/svt6erRNS7i1iCkz0pwMNskDNWp3mWo+x9fs4YrXYEc+Rw9+nNg3J7DzvdjJr8iWo6nuZtXrUN31gqmYrr/A1pxkKnaMXt4YufBz4uyP0WPfYJdXoze2E7cPwZW/9ex8r/PwnL7ISISRR+AYhCdCdHoQV0cpcYzOFqJxSo7T2SNForQYY6QYI8VZOcZIUVaKMGKYFnTfgI06eSpOMWLMm95g5GFaGaLkIUodppPgTXsBSvLhUoGHuRcBZd/TnpMw+yroqSJx/J15+S0cOyY4MN4Fcx6UdEVCLb22BldDZ3+zPQJ5ErQ3wTjGgg2um2WtW2+1LKls+6ay5Zuq5gX1bQsaLStbu69Yh3ocYz5ToK3OVd7Q02wJB10I4cBYJ56V0J0I2UYCloDD4qvs7D3Q6ljValnWYVnZalvU1PlFQ8unza3zpglKSpDTvJTixKSeYKyUnign0IlX0pw8uYe/g9FPgNFt0FMlxCQhJo19IH2LsHGtaUGBCiw1BKYMoGkVACRkKJWlkxyTojmZ5WSOlXlOEThR5gVVYFVhvBwF9adOKneRlMiUTKVkKiUTSYVIK2RG4TIyrsnxFD+SZoYyTK+Ct2VCF7XQJc17ImXZozZvEqqXKXWL042LleYftO7NWqxMHbyabv5ealygWFZrdT9ozT+q1h209bDSc1Ybupkeqs3030ybj6c9lzV/tTZq0cYsmaEmzV+V9laonirVXsq3ncDLNiAnFkG73xpe/8TA+mfDBxdQ5XvlW/u4SxvYkyuo/V9T+xbhu78YWfd+ZPO8+Oll8NXVwZ2fEKcWozc2hEu2k2XHuw/OMu98q6fqCEyicUEYIqhRWg3havat4JQQp8U4LSaY3MnojDQpsRxRNmsmAPRU9YGiQUgBUKAimAgBR04P09IwrQQZJchkX0o7QCjg1WD9lOol5F5M7iVFgD6bD6pTD8L3YGKv/s48TOzGxB5cmmoOw0lQDpjzoLIbJa2xsTa/vcFxo8V+wjbgcodGuyHEFQ+39DdWmU7UmnbXdGyp6vii3vxpo2Vho2Nbm7fWOhR0DgVsA10dvdWtvVWWYLcrjjhQxIHR3ZjYA8OeCGH2t7S79nXYV1kcK1q6vqxu+LCpaU5T65z6xrfq6l5ranx3GjCQl1KCnBbkNK9ovKJxckZf+AJglBTAaCD4I4KcFg3Xv+OhUULjL9NyklKSpKyS8iQrcoCWYD8Umdt+MZ6Q+RJSrAIAI0CGUWhapmmZZRSOVTlWZTmZ5WSeUwRWkTlJl1AV2NzFuIQKTxZImFbotEKmVDKjUprKazKZlmNpIZRmRzV2IEV1JfGqNFylDl9P9V3QbIeSDRvUW4uFa5/x1z9O1n2tdG4RmjYkqz7PtH6t2ddqjT9kKr/UOrckbYdTrjNa/7V0sFrz38o4zqTcl9IDt7WhDm3ElB5sSA9UpnpvKe6KlPOy2H6UrdhInPxidOXLlnfvbn/jr97Pp4cWTY9+91T42+nDXz8a/u6J0a8eGV7wQPybJ8aWvja843303KKhHbNCez+Er/0Elf8SvbCma/0M09ZXvNUHvIO9vtAYShIRnAxRLJAQ6Gc8Gf1flHDcQ1qJ0IresCmQMETxE6pTUfdwmJaGaSnIKIO0DEpT/f18/ZTaRypeIjtE1AtUg4ripBJONYHRTXJuhPegghulnQhmGRts6amos+9v9hSbgl3OSNAR6e/0VTU7j7ZYdzV07WjoXNpk+q62Y1FN5y+tPTdsQYcjYLX2N7Z4LtXbz3b01jnGAtZYyAERHoR1JyLWYWe79+1IcNUAACAASURBVHyD+ae61vl1zXNvVb9TUvbS7aq3a+tm1dTNrKx6tbLqnWl6DHJikpcyvJRhpTQjpnIlZSEFBko5ZCUjGT6KUgqQ++W8khUIyckp3W2gIpjcn9hQpcQULSQBFK9SvEpxKaONJJskuax+NKfSXFY2HTAO5FhZl1DkcxLyfM7AQgnHk1AkkhKZVuiMymRUJqXQGZXRkkJaIdNyPCVEND6mCUMp2paMN2tIuwZ1amMNadcltWlX5vYqrWyxdOkD7cbH6dLPlaJP1aIP5Nufqi0/ZBq/48/PVm4t0Tr3au5TWt81bbBC85Wl3eeSrouZvop0sDUdbE37atJ95amectV9U3JcVM1npJot0OG53QsfaXz2vxue/E/r639yfPS34SXPIlveiW17F9v5UWT1zMCi6T1z7hv8+InBlTNi+94e3Pzy8O4PE1eWwjdWxy/80LN7tn3ri76KbQl4ZGBocDA4MBYLhZBYGGcjBGeUUA/DSYkZPDTmYfZoTMZYlwoRCuinM+7hGJHzkJFHGXmYloYocZCWg3RykFJz3Rq1n9IpHCjmkL2E3GswEEjYTQgTPfTgfDcheDAuuycDF10w1hFornMdrrLtb+2/aQqazYOtHd7zzbaN9W0/VTUsrW74pqHtu5qmRTcbFtd07Wh2nenquWrtK2px7q/sWFdvPmTy1luCHkck5o6h1tH+lp4rtZZfqlo+rqx7u7L67Rvlr165+tz1operK1+/XT2ztOKt62UfTlNUDfiTsysDmNxAJa0nHhDPQFpHklM6vzN6NGK0cVxIYxSLKiOmAHk26uT0ozmV4RWOl43wnMxzMsdKPKfwnCLwqsgrCi8rgggkTIpcUuQmSpgWSb0jqkuYVpmMymhJKaMySRlKiwlNQDQxpNJuLdKhxc0a6tRQZ3qsQem9KHbuYmtWqWVfZCq+TZd+oV37JHXpXeHK21Llp5m2pZlbC5XK71KtWzTXSc17NdN3PdVbrPVeSXsup/tKM/7ajL8201eR7ilJeq4l3SViT5loPsfeWg8d/mBo9TOBH54bWvZqaPXr0Y3vySe+z1xZxZz+MXHwi5Ff5+D7P/Mue77ynv+n9rX/snxzv2/TzMiRb6ErGxLFa0ZPfN5/6rPA4Vl9l1fDscE4Q0VxKI4mYpFoGGeNSagn3lQSJvIlNJBt3uTGh0KEEmKUECZ5gNFDMMUfokSwLG6UkUEeDlEikDBAZuctDB7Kk3qoX2QnM/KZeDYcOGu8h+A8BOsiRDfKWse8LX3lTa7LHd6K9r6qlu4LTdZfalvm36x+t6xiVkn5OxXVH1XUzLlW8X7R7bm3mr9vsv7S5dndaFpf0fh5bduSTudvNl9VT9jfHQm19pmq2neV139XWfd+VfU7lZVvV1S8U3p9ZtGF124UvXDz5hsVNZ/crl8yTZJTOXPSQMWpqkpj9Bn1UxVNVTSjhPlCZpmqUp3USWPhOvHmRBVz+skMrwDG9RMUXlAEXslJKAu8InKqJKgKr04lod6MyUhUUiL1WlSXMK3QWkrKJPm0QmRkVJNITUwodK+GmFOILUW5U3xPmrFrWGtmrCTZfyZp2qZ0bBcb1mWqf0xf+yB1+Y3krU9SHSu09qVi3fdS6/qU80iy+7zqPKc6z2W6L2ndl9I9xem+0kx/WbrnWtp1Jem4lHRcYq1X6bo95KXvsMPvJ3a/Gv/tHer6ymTDcb7hhFR7PFlxWLywhTqwBN60QNr99djSN6qf+lvD23d2fvPg6P65yKW1WOnOeNFq06ZX2/a93Xf8w0DlnlAoEMZJmOVhSqJpWdcPHCk0lXuTlqlTSRijBB1dQoOKBT2bvMFhtiilpACp+CnFTylAvJyTU0qoDxp1jB6ON2xQtgeVenDJQ9BOgvJgnDMat/i7O7trOnrLm1wnazo3VDZ+Xlb55rUbL1wvnXGj/OVrZa8X33jzQtFL56/OKL39XkPH4mbT6rqmpeVVs29Vv3u78Zu6rl+tA9WeIUebu6qiYU1Z5WdVNe/WVs+qqHirtm52bfW7pVdnXr/84q2yWTUNi1pMm6cpSlJVU4qaUtSMomZAjolSsqCqNLiXlpU0eFhVxgF3JlIQj4KS4uUkLyf/qY0TJZxURYZPMnxSd4/hFVZQeUE1GggkBB5KggpQhaQqJFVBSQpSUhCAhEmRVQUG6JeSmJTEaDKdVrIAAzMKl1a5lEJrKUlLSZkUnVEpTWY1EZUZf4Z0a2SPRveqiFMca1MGqzL9ZdpAadJ3Weu9oDhPqKbtYsk8rfiDVNVXUutSuW2J3LI0+f8Td59fbWXZouj9H7zxzhv3nM7VXdVduRzJOUcDzgnnKtvlclU5g03OOQiEQASBAEkIRM45gzE52YAxJpgklNPOe6/3QSBkbFf3OffcczXmqCEL2f5SP88159przb5gMJ4FpgvBeB4YyyXG88FILjGSh4+xydECaiiXfJaN9aajfQy4g4bU+KlYV8VJx9doXhu8m3B/NpgdAFPtaHcZUstS5kaoGE+VyXeliT9txlx/43duI+bcywiXN+kXRYJAWWXkHPN606MjQ8nHx/NuvOjlrW6tb4ikmyL1uhK81V3l/G78tsaPVInoqgLV9lf1Ea7KVKsyzcp7oZt1p3WoRbggh+dlyJx8O2blmHYrXx+h9pGaKSm806fZe4xYGx/LiuMSzZgIHd2CRiXyYalsTCwfW93ofzHe9qygeYBR3x9c1XKjrOpkSfFRLteRW+RUWubM4Tnm5jtlZdkwM8z4Re4NTTfqmn4ur7hSVOzE49vzBF7cqisN3THPxni9w9l1zT9V1p5uaT7W0nysuta1sfloc5NHhcC5nO9WUepVVXe1tdtvH4ZhCIJAEAQhMILiGE6iGIGguDbLwe+mPhQD2/xwoC8Q3/n8A4G8nxsJDUr80wz5HlFchXwgKyo1mDZ0CLXqdnMghGkgDNJsBwLhCITvCMRxCCMghIAgAlYTsBqHlDikfBehlESl2/wwBYWqKFRF4WoKVwMCBQQMSDXAlQCFACIj1AtAuQiUC0A+D9ZHwZtuMN1ADgvASAn6shKM5pETbGKSqa6+SVbdpDqeoF2/wm0PQacP2R1EDqWTY7nUUDoYzcQn8sFQDjGYiQ6mE4OZ5DMm2cPAOpOQrni8LQKt8pVkX1lPuyDi3YW66cSLeuxlPzFbS42Xgi6mvOCRJPV7ccKFtfAT0gTvpdTrUtaPc4kn59K8JeX+6zyfngCHXj/ToXjP1zXRaytT6zKpaGtzXShdUVOrEKbriO5ZiH6sMaM9+PaBH8n3Cty+HlauXpOr1+TQxxAuy+FFuX4yRHWd0lkFMqtAtPlwRoLotvW1yVC7la+9nGpSotbdqTEuUekj3JMVxyWacTEyuqUZl6jGpIoxkXRoebp1pKymI7S2K6Cm876g5lJJybHKsmOlZV7FZZ7Fxc6FHKecPKf0dKt0mkkhy7Gs7HRxxXlOgTubZcHjupZVXRTUXa5o/rm5y7+zx6ex9XJD47H2Vo/2Vq/GZo+GZte6OufKUpeKYtfSEqfyiuNNbbf3KZVyiUQkFAq3trbkSgWEwAiGIhiqz2aPKwwHOAZwDOgjxPDd2IPwfYd7Ssft3PiRDPkuwvfaRdCuQ6UG06U+tQZTazANhGsD0uCQBochAoUxHCJ2BBJahCQMk4jmgwgpWPJBhIDQAAIFJAIoDSA0AIUBpgLImgYVofAmqVmhxNNAOEitdqEL9fhiAzpZB7rTwFAmmC9A2h9TbU/BYAze8zPR9gR0PgHtQcQzBjGci/engtF0fKoADGUSz9PQARrxPA30MahuGtYeh3TEIE3hSHWwjP9AUekDdafCo+XYy1Z0tgEdr4UGeOK6BInAX8K5L2L9vJF5W8x6ICx6vJn381La9bW8n0WCwDnGzZpbRyZCnabTvQfyQ4Sry2vrW6vLs5sq2aIa3VQq3q8AtevS30b4vsPtZ9x2EOpuSd9BuNehFqF2U3FRDmtPSy3I4QUFsqDAtAjn5IjW4axiu2uqv0Dd6ZdqdAh1d2FMSLeT3p7VqfYExrgY3tEIjwm3+hc6a57FlTTcEjTcKam9k887k892qix3q2s8Xt14qrjYsZBrl5Vrk84wzUw1Kcyx5XLt87i2BSxbJsMgj+VWVnWjtP4Kv/p8Vd3l5tazre3ejc0eTQ0uzQ2ezS0n6xo9yspdKgVeVWVughKb4hKHytrT+xY3JodeVA5O1U7MN82+6V3dfCVXr8MaLSSAogDFwE56JHEcoAiJoRSK4jhOoiiOwASOAQQmCRwQOMCJ7UB2AiYArHuP6y1TYXJPwBABQ4R2MQzBOAQTGgjfba6i5AdDV8Gqdr6sDc07gUEwrgWv/UcBhTEUxlAYwWEEhyEchggEJhANgaoJWKHdDyRROYWqSFym5Qe0/FANiWlwTEORyE6ggMIoEiVJnCRxEoUoVEVBQlS+iEjmgOwlEA5RC61gtJAYYIKeRDCWhPWEg2kaGI6H258S7aGgN4roSyBHcsgJDvwsneiLAP1Pif44vCcG7QjB2kPIrnCiMwJpCUNaIrCOaE1rpKYtAe3PBlOVYL4de92rnutFX1RphrhQV6ayJkZaEijiPlovuC8seijm+6/zHy8U3t8o8t9iP+x7at3wy/7BKNeFwh9e9FS8ebu+IhZtqjQbUkQsR99q3h2IoBvyo8Q/thbd/fK72XJvGpRD2xuPMvWaVLUmVemvUd9K1bsgFciKAtHtbej6NAsy7Vb+dszKdm/Q0HVoXsjRKZV0QqyaEqrHV1eeLQwMLA2MC9+OCaFJiXpaKnshVU5I0FExPCqWTm0Kp1Y2htaXJ6WyCQk6KobGZOKprZXhuY6W3sjiypOFJR4FRafzCy/k5p3kFx+tqzteV32cm++SmW6amWmanW2ey7LlcNwKCp0KOPbZmQ4MulV2tiOXf7yk7BSf78nne9ZUn2luO9PUcq6m5mRl5dH6OtfaGufyEqfSIteacjdBkQOf61BR4bXv+XRpdVdQebtvdVdA52D67JtesXwRxQBOEjixndlwgsIIHEFxFAPbi0+E1GZCFCEJHOAYIAlAErsIUfIDof0D9TPknsBQSq+zul2R/kb/RoV8dH9S+3t1ArUIEXTnL0JwDMExBCUQlEDgndAQqJpElB9DCDA1wCAKh0gCJgmYIlGtQEARAJAAkAAAksAADgNURkLruHIZqN4AyRR420dNVmBD+WRnCjqQpOmKBrNZYJJODcVRz5LAUAo5nAYm88FMGTmSA7cFqut+xOvv43V30ZpfsNqfyYb7eP1DpPYxUvMEaYlAOxKxZznYWCk204S/6cSXevCVXurNc2K2G5ts0vSXqNpzlQ0MSXm8uCRaKIjaEDxdL763wbk7FnOs6cHhwUiHwSjXlwU3N172yjWoUKXeUEJCOSZRIstylVAOaWci6E/1ESo/WhN+LBPqTOr4aRPgukytdagtDnWh/+TNNkIZsixDdGeIF+Twa+kuwlcKeE6O6I7h6xxOyFWTEmhiUzq0NNPzqr1rruHZ4vOR1Vcj6yuTG5vTYvmUVDMh14xL5YNrS92zw12vXwytL46L5VMybFKmmtxcG3xV39T/iFdxgiM4yik5VcA9l8Py4PJcKirdKspc87LtMtNN2SwrNssmK9M6J8s+N8exsMApJ8uRmW6dk+PA5XoUF3sV8d25HOeS4qMV1a5VNZ41NV519Z7NzUcbGpxra5zrqz2b6j3qa45WV7rX15/Y1zzAyK64QC9yySzzrOzwm3zdtC6ZhyCAETBBkQQJcAIQJMBJAiNwDAcYCrTqtlMfBggckAQgSUC8GyhJ6QKjtj/ECQrDSQwn93Ru3m/kIOj23iP0m7WiDuGe2Gks4e8I3Gkm4SiBowSOYu/+MwBpEeq3YXYRYmqAqQEOg50ESJGoPr/dF0kAAgKojIJEQPUWiGeo1SFsthWeKCP6cjXP0uGeFOoVmxxLw4aTiJEMfDgdG2YSkwVgrgK84BK90UjjPbzEmyg+j/PPkSUXqNKruOA6zP8eKb6pqXqgaQzV9GVoJsrguTZ0+Rm1Pgw2R4i3Y9DCM3ihH53vgKbqFL2ForqUrcp4YTV9s9RPzL89FuPSeP9Qu7/xSJzTeLLXeOHPwoURkRIRyqF1ufZSSdWqWq1FuGc2yZYK+/AwyXfT5vuVpF561KzJ1esKjRbhNsUdn/oIV2TbJxj1EW6XiDJUWyLqqkRdofhCDuvapC8VxAuxcnR1+fniYOfL6uYxTucUr/9V1/Cbycm1t9OSrUm5ckKueb6+3DbX3Trd3/t6eGJjbUaGv5BqxldXns9VNz2/V9X0g6DWu6TyQiHvfFa2R26uA5fryOE45OfYsrOtuWyH3Eyr5DijhGgjWrxZFsM+O92OmW6dk2Wfl+fI5bkW8d14PCcez4lXbMcvcaysPNrUfKKt43hr69HWVs+O9hOtrZ5NLZ4NTZ71Tcf2tQ4mphd7xeSYxuWZ5VVdah9ijM3VLq29kau2UBzRicIJiqQASW2bxHCAE4Cktn+EExTxHsKPhfb7+llRH55+r1Xn8F+Jdzctd2rRnSSnTbMYRmj/i6MEgeEEhuuaSyQKkShEYpo9vdC9mRCHAYkASo8f9Q5ACgBAUoDEAAGTiJJQC0nJArE+hr3px2aawGgpMZIPhlhgvgAfTKZG4sEwHelLQAdT0TEWOVUMXgjACBP0RVEV1/ESb6jwpIbtpcn1VLM8VdnHVdknFYXnFIIb6oYgZCCLmqmnlvqJ5WF4eRhbG4SW+9WvOpTTjaqxCvVznrQ9faMmXliVtMV/NJ/oPvjUZCzS6SXdayrN41mU3VhZiGRjflOm2ZLCm3J8S4GLFIpNCNqeSqKl+N7ll+/HXop6m/t6IKHdkGs25NsUN+QaXarUCdyZGL0Xoc6hluKcHNnjcEYOT8uglzLVrAKakUIvtmQv1peezTQ39CfX9fm1j+f2TleMvH42vjo/KZJPybBxqXRwfaZ7pr9npnX4zfjslnhWJHuxuT6+1NM5Ed/S86S6+VZ5zTU+/3J+3ml23tHCApfCfDdOnj2X7cBlOzCSTSMDDoQ9ORgdaJgcZc5IssxItcrMsMnKtmLn2/NLXPl8Jy7XPi/fJifXksOxq6o+Wt/oUdfg1tjg3tR4tK7BtabBtbLGrbzKbV9F110axz6SaRHBNExgW2aXneU33WkfZM7MD4qkazCCaZeXGL4tkATbhHQIMZz8GELy3fggSG3BqQ0MJ/X3PHaSJEAxgCLUB+NjDvcudDFCPwiMfBchvC0QU+32YP4pQorYI1CLkKK2LQIcoWAFUKxS4lmwMQoWO8FUFTWWD54zyTG6psWf6PInO0M1jb5EXyQYYWJjHGq6hJwoIIboVNtTrO4eXPYDzPdGCk5rsj3kac7iZDsxw0WS4SlleasE97D2BGqUR8w14Qtd6KsWZKoeGa6Ce4sVTbniGoaojr5VnyytDJ1OON5++6uO2/unI48u5FycZ1/oj3edas6RK0RiDSGSIUIFJdXgMpVySwPrBgTtQai7/XlPvM/yQ6vWXYSbim2HulhXaPQQ6jmUwkvS7UWp7oab7W6NDH0lhedluw7nlOiMHH4h1UyJ10c3F8fWX4+uvBx78/zZlKCxN6y286f6vrDm5zE9E+yR+cHJdcmMDJ9VQNNi6dD8aNckv3uycOJN79z64ustydzafP+Lkvb+wKqmH8qqzwnKLpQUny/hH+cVuXF5rtwCR36hMyfPgRZrEuKzP/TRwWg/o/hg48QoE3qCBZNuzcwwz2VbFxU78XgObLZVdrY9g2GelWnJ47qUlLiVlLgISp3Kyp0E5Y58gQOP78jhOe4rrLqYkGUXRnOMoNvFZFom5Vlnlx6t7vDtGxYsro7KVWIUI3BiOxMiKAmhSjWkQjBU61AL6bftfZDi7i8JiiAo/V/qWq/vd1nfjz0P6OwubvXqzD0CdxHiegLfQSijMNlvIKRIhCJxQBEURXwUIQUogqRQDaXepGSvybXn6OtmMFGMjuRQfTSkLwKu/oWq/4mqugOV3ySbH4HBRDCWB6aLwRQHG2YS/TFoRzDa+Iio/Ykou4oVnlIz3SU0u614V1Gc02as42aCqzD9lIh7W1ofqOyM17QlyGsitni+wrwHm7n3xdynivJwcUXYi7hjnfcOdd75ZsjHeibuxEyW94uC78fYP61O94nUqk0VLJYhEhWQaBCZSilS43sm2+lo7bmp/f0r2z8e8KYC0saGXCNUqDeVat0nOpPvHxfeXppqOzTvOZyXIdp16ZwcmZNDrxTwS5l6SqwYfjvfv/C8f765+yW3bYzR3B9R1XqvovlORatPZduvjb1hzyYrJ5dfzYols2LJ9PrW5MJI73hS2+CDgUn69ELn67XVudWlZ9P19V0P+VWnCortCgod+UXu5eWeJWVOJaXOZSUe5QLPwjynxCijgAffBN7dH/b4UKTPoQi/I3EhJikJ5mmp5rksm6Ii58JC++xsc2a6fVqqOTPDkp3nWMB2LSxw4XFdiosdOcWOBRz7/AKHfLbDvtySM0nZtuGJDpEpjnEZjrRc57zKY9WdDzsHmS/fNL3dnN6SrMoUYpVGDqNquVK2vDbzdn1BqZbpysUPCqQoQFEAkNsJA+x8Qu0UhxS161D3I92HuoLztxs5263ad5ed2/D0Q48fjpM4TpI4QeIESWB7EBKokkTlOwhlJCr/WE1IUigFMGp7UbrDD+ykRgoACpAkSeEQ0AiBfAGIR4nVTjBbjk/lEQNJSE8wWnET55+jSq5RpVfxqptUmz8YoJEjOdRYNvGcRj6LxjoC4YZ7SOUPMN8bLjgBZ3uqM9xkSW7SRBdxrONGpNVSsNl8iNmrcKv5KPvX0U4r8S6LMfZvou3WaF7SnKsrqZc6H9g2/fD3/oeH+n0NZ+I9Zugn+pLcX5Y9nW9kQuItoRpZV8NSBSSHwZZSLVUqRAry/VvwdqZ0IR+M3761fUuFbKkQ7cWZWnJbyg843FTsbk6+lUNv5ZD+qajtoxhSWN/ha+k2wnnZNsJZmWZaohxdXRlcHH8+X9cxRmvs963p/FVQ/1N548OqtsCKloe17Y87BlOfz9SPL4+NL48Nz/dPvKroG3/UPnCu5/nd55P0yddN00uDgzMtdR1PeBWnsvLN0tKP5LJsS0uPlpQ6F5U6FfPd+UVuuVm2iVFGob6HQx4cCnt4MPTht8H3Dwc/PhgVdCQ5zig7y4rLcc7LtWVmmKUkW9BTzJgZliyWYz7bo7DQo4jvXlLqyi12yS9wYOfZ57Ls9zHYNim5BvGZZsk5Nsk5dgnZNhlFDpxq78beqOdT+cNTtWNT3TOvxhZX5taFS0tvXw2Pd0zNPJfIhQRFfhChjtN2xbSDcPt/Tmp7EQu0JSZJAZKiCHI3dBoJQOzsOupqxY+FzqFWoP4e5h5+OE4SBKVDCHBMh5BA1R9DCHAlwNQA1wAcBgRMkQgA+E5sN2Z0CLdlUoCiKEChABUD1RKQT5DCXrBQhc4WEIPJWF8wVXkDyT+OFJynBFegYm9N1U94ZwT+LAkMJIPnsVR3AN72iGj8har+ASs+B7OPqbPd5WnOkhSrrUTr9Rirt2GWy/6mS76Gbx8eevtg/5t7R+YfHHztd+RNmOm475GW619WnPqC4/K3nltfDj81nI53mmeemMxwf555fKk9ZXOiSyqUvVWiIpSQKzRiFbqlUiohjUgBpCr43fu+dme/fjA+Pj1h+8bad0INbSk1Oof6OLWL1XWFZs/jbzqHuifatDEv2Xao7ZTOK5FXCvilVPlKqpndXJtc7u0bZ7YNBDT2PqhsfljXEdbSR2vsjqzvfNrYG9A2zOibqh54Wdc3yekaCusYuNLc5dXUfqGp+1b3WPTofOXIq/bOgYTqptv5PBc63TQzw6GIeyw/3zmLZZeZZcHMtEhLNafFWSRFWCcGW8UGmEQ9ORR8z9Dv7oEgn+9iIw4zMyzz2Q452dbpDFNakmka3Tg7yzI/37mId7JUcK6i8mRltRe/zLWQ68DOs2dl2uxLYDjE0i2TmNbJGbaJDLuYZOvoZAsGy4VbdaWq1beq/Sm/6XFlW8rAROfUq8H+0eKmHvbEXJdEJSQoclsaASgEUAT5vqu9wPRC/8sfBakXWjza0Hf1MZbab+rg7f52jNQVhNpnDigMpjAYYOrtjfjdglBGYTKAywEuB7gS4BpAQIBEAIkBEgMkpcduT2cGUAAQAJCAIAg1hYhJaB3IXhGyEUrSRb4uRp4lU72RUO1PMN8bL7qCF1/BBJeJimug9mfQFoD3xMADqVR/POgOB60+ZN0vePmPEO+KIvO4ONluM85mI8xi/anRuo/Rio/hgq/hnM+RBT/TmaeHpn1MO64Y5lt/zjj8Cf3gHzl2/6j0+K73h6+f+RiPxjvPs07NZnnNcG5sDPFUkmWRWCqWyKQyhVyhkSlhmRKWqmCpCt15A0vem1awZ4TBnpT4wfypZSZUwkKVZksNbamhd2pOvdhQIms7oTsV9VaJrqqwt0p0WYkuKZAlBaLdx1+UI693TjzNy6B5GTQn3455JTYnkU6vTQ285HYMB7b2/dTScaerx6/zeU73ELu1P7WuO7C+O6RjILN/RDA8XdE/HNE58H1zt3tNg2tFzammtpt9w0HPJ5OfjwZ09f1aWXuGlWfFYlnyuK5ZTPvYKMO4SANarGlKjGlqtAk9xjQ5yjQ+zDg+zDjikVHYoyNBPt/FRhtkZVrnMC0zUizpceYpCeaZTIvsPCsO/2Rlzb26usd1DT9UNxwTFB3lFdqxcqyZGc77UrOc4+lWcakWkYkmIdGm/mGGvv4HgsONoumWqXkeGdxzuaW/VrUx+seaByfbWns4bf3Fs4sjakhBkIAgCJLAtP0JfVe/zey/Frq6UUtr1yEGPhzv8/swQuS3Ee5Q3MmEBAwIFBAooFBdJnynMtxBSAKChFhlwQAAIABJREFUoiAKF5PQW0o9D6QvgXgIbLWBlTJqLAMMxIKmhxqeNyb4ESu7hZTfgCu+J2p/ppp8yK4waiABe55EPI+jnkVRfWFkZyDe7AOX/SDPPyNOctgMN19+YrD46OD8o0MzPodnfA7P+xkN3TYptPl9ltGfIj/9f5K++fdily9L3f9ad/qzxkuf9wTsn2R6TdDPTDNPvBDcly9NrIlQqUwhkyulSpVMBclViEyNyNTaGQTQTuwF9kGEH/yRWIXu9Gx2EWodfhwhtKGEdA5XVciqSqsR1YbWoQ6h7uFS3flDbczJiFcS9ezG0vBsdduzoNqWi/XN57t6b/cO0/pGUrsGY1v6fZv7fDufx/WPZAxOZg5PhPYO/dDWe6y++aig7Ghx+bG6lmutfQ+6Bu509t9sar9QVulaInAUCNyzMq2jIg7EhRnHhxnHhhjGBh6JDTwSF2QUF2KSFGGRFGwR/vRwqP+BlGQLbQ5MTTBJjjJOibNgpllmZ9vyS840NN1raXtU33S9otazsvo4j2+fzbJIZ9jti4o3j4g1joo3DYs2DgozeRpg/NDngK//Ib+YI3FM+3TOeX5dSP9Y5dzy8IuFgf7RhuGprtWtJRQjSBJQJAAkRZE4APgehNvvKfDfhZDUKyP1Hepjez/e4aftAOGUVqB2LaqPcNvhhxDurkgJWBskUAOAAIBQACUpdLc4JAmKxAkcBoQKkFKArlKqGUIyTK33EktNxJtSsMwnJ9JAbwRofIDwLmAVP2O1d5G6u0jdr1jdPazhIdnqB7qDob54bCCRGEzGB5Px50lEXyRc/0BVfFXBcBPF226EWayHmi+HW74Jt1iMsHoTbtlxzjDf9K9Zh/9B+/ovqQf+UGj3SYXXJw3n/tpx7bv+cMNJptdLxskxxtHXzRkaObyhJmQqtVytkathmRqWaxDJTmjToDYTvp8M/3WE+je4i5SISAVpQ/tNfYRak7r2qT7CHYfwew7hvf3SnZhTaF5JVPMbb8fnmtt6Q8prTpdXubW0nG3pudfS/ail59fmnputfT92DjzsGnjSOfCws+92U/vZhpajFZVu+fm27ALb4gr3ioZT1U0nGlpPt7SfbGrxbGo5VlfjlcuyiY3ZH+lvFP7UIOrpkVg/w+gnR6J8D8f4G8YHmSSHm0YFHo4JM8jOdODyXHNZtukplknRpkmRJrRY05QEs1yWe0Xl1frGG1W150vKPSpqTnB4jswMc3qS5b4nT48Eh5pEx1pFRFmGhFoGh1gEh5pExpjHZ7jnl94qqfGrbUsdmWp6/XZq5s3wwHjj2Mv+t+sLSrUKggkUASQBAAlInCJJknr3tbd5v+f1kVXoR5epei+SJEmSxHEcw7D3O5/6OPX57bRk3ikIAY4AHKFwaDsNvodQ/8FRgGmf24YBAWsbMwDgFInsPECDUCQCcA2JynFYTMJCgK4DaBFIJ7G1fmKxjnhZBGbzqPlMbDSaaLxP8LwhlgcmuEnW3sUbH+CtvmTrE6zJF2vxITr9yM5o0JMA+pPxgRR8gE70xqN1j9RFVxQZ7mKaoyjRcSvJcZPm8jbZeZXmshxn3+D1ZaH5pwl//33SF3/NNvycZ//3Sq9/lLr/pen0354FmM9mnJ1nnhjNOb06UQXBhFgpVUCoAkLlGkQKaQOVwKgERrUpUaZGtFcZyPZeCf1hkB+K3cujxSpUrIZ1IVJtt2eECrW2RNxSajZVex1qKWoRrqoQ7bp0ZWdRuiTdjj33888qhS9Fqy/eTo/MVnb0h1RUny0udi0r8SitPF5df7a5/VJb9+W27osdvZfbey41tZ9taD5eWeMiKHVgs6zSaMbMDEsOz5Fb4sArtSupdKiud2lq8ejsON3SdJpT6JRCM4oKMAz3ORj5xCDO3yj6yZGoJ4cSggyTwkySo4yTY0xo8aasbIcSgWcx/2h2pkNynGliqHF00JFw/4PJseYFbHdBqVdJ+TFeyVEu34OV7UBPsEgMN9/34P4hfz/T0FDzgACjJ0+PBAYbRcWa0dKsi6pvtvfHt3QnVzVGtPVmDU/U9A0L6jtoTV1Z/SOlswv9K+uzm8JVlUqz/dgaSf5zeB9H+E8XsTp++hRxHP/tTPh+bAvcRrgj8OMIdwXiyh2EGkBotjMfRVAkSuFqCldShIwiZAAVUvAGrlwmFItAPg9kM2Brklwbwl4VERNZYCadnEmixsPw+tuKdGeIboWxT1GlV/Ga20TTA6rtKdnqh7cHEl3BoD0UdEWC3nhiIBkfSMF7YpC6+yqutzzLS8JwF9FdhXS3NcbRlTS39XSvxXjHarfP8oz+mvLlp5F/+X3iV7/nO39eeezzhjPf1J78U9NPX86kHn+VeW2+PvTN63oZLEZUmBahAkJlMCqFEBmMbl8vsj1fGd1zZlp/Wsmeayl/Mz6KcE9oOzQ7DnfrQ+3VUju5EdMd2F/+0IM1i3JkViGZFq6MLw4PvuR3DwY2tF0qLfcoKnTj8R1r6o51dl/q7r3S1nm+peN4c7tXU5tnfZNLRZVTUZFjdoZVYowRLd4sJ8sxn+3A5lpz+baCUoe6mqOtzaeb6s8W849mMW0Twk2i/A7GBBgkh5olhRgnhRjSo0zSYk2ZqVY5DAcGzYqZbl3Ec+NyXJjp1rREi+Qo49gQw/CnhxKjTHKYtgWFjrwS96ISr5xsq9RE09iQI7H+Bvv8fIwCA0wDA42fPDn4xO9QSLhRbKIJLcOsoPRMfZtfWc3jXJ53UcXNqqaQktonWbwL7LIfuVV3q1pDugezX8y1C0VvNJBCo1F9EOE/ZbkneZLkP2/Y7PnwY7uRH1yXkiTQCdRHSGKafwkhrqRw5Y5D7UYKCnANwOWAkAB8k0LXSOg1BS9QyllcMokJR4jNESAcAaJh8k0RPp0J5tLQ6SgwHQ46flGk22M0C5TpDIpOI8UX4LLreN1dvPER2RZIdAXjrU/xdn+iOwx7FoMOJKI94eq6X+X8izLWSUn2cUn28c2sY+s5JzeyToiyzyzEOJY5fJH65R9jP/lb4H/8r7gv/q369NfNV75uuvxF67Vv2+59O5ls+yr/4mpP1ubK5KZUrFLCOoRahzIYlSKoFNkdJrkH4Z6pQXsQ6s/bevcLu8tRrUDtrFjd6lQXuupROw5M3+HaOz0bVOtQ/8bhRb14LUdfieUvVmbHXlUOTEV3DfzY1H6hovJkVdXxpqbTnV3e3d3Xu7svt3eebGnzam493tzmVl3jUVbqxStwZdCs4iPNaXFWmWl2rFxbdp4dr9ChXOBWV32ytupUeYlXYYFLRrJVQrhBQohBaoQ5PdIsLdo0Pd48I8GMlWGfx3ROT7bKYtjyClxzsq3TUs0zMxxymQ6MJKuECFNarHlGqk1WpnV+gSOH78ZimdOTTRKjTFJiLPfFJ9gkJFpHx5iFRhiHR5rFJtok0i2TGCap2TYszqn0LI9EunkGyzGn8CQj1ys+wzY51yMh2yUp2z2/9Me+YfbK+phUtqFSKT64BP0Xc+M7i9j/DEJtrfjhRwLeqwZ3asJ3EFIYrEVIIsrt0B3efReh1iG1EwCXUZiUxEQUsgmwDYBtAPQtCS8TqpdA/RKopgjxILbZjW92UqIuIO4Cm9XkWz5YYkHTcdRsNBh4rMr3QBPMILodKDyGck5C3DOo4Bpa8SPR8ABreYK3PkXbfLEOf6wvHHsWg3aHaervKwTfS/JOi3NPSdnnhHlnRIXewrxzoqxzL4OsCs3/mvLVXyL/9NeIv/wp5dDvai983nHry+brn9ae/kf/w+8Gw/aPJlsvCH7WzLSpxUIpJNo+fvmuQxmM6uZqSf41hPr8PkRxbybcHtj8bmIUqSCRcncnQ+twU4Wuq9D3Na4q0D3dGl2huCiH38ixNzJ4QSicWR4YmcnuH33aNXCnse371pZrra3nWlrOdnZc7+u70dZxqqHJs7n5XHOrV2XlsZJiryKeGyvHLiXeMiHKghZrwqDbpKdZZzIsCli2Ap5LueBoucCTx3UpyHGhx5vFBB+OCzJIDjdNi7FgJttk0+1Y6Y6ZqXa0WNPMVFtOrlNWunl6qmkey4XDccti2tLiTWmx5rQYS1q8GTPdOjfPNr/AMT/vREHeBU7+hX1pGTb0dOv4RNOoWJPYRNtkulNyhkNiumUy0zolwzoy9nBIxHfRCYejEgxC44xD4i2C4i0C40yeRh9OzDze3E1/vTgokQpx7F/19k8d/hcaNh8MAHZ3/9+tCQkSJ7SPb+vS4B6EOw73IqQwhQ4hia+Q6BIOv8HhNyS8CJC3FLRMqBcJxRRQTQHlCCntIURtpLiRFNcTohogbCQl1ZSQh87TwUIymAjGyy+i8RayeEs81xPL94ILjhO886TgGlX7C95wD29+gjf4oI0+WFsQ0RmGtgTB1ffVxTcUnIvyQm95obcw//wW5+JWnrc48+zYY2OW0X8kffG7oP/4XdAf/51h/Mf6i182X/tH+42vnl07NPjr33ruftF597uR6C/HWW4b07UyRKO9gkD5Xj7UDZaU7tysJdfgCjX+MYQfvEldb7TBzrgRbddHO7D53dA6FKthnUOheje0pxnfdYitKbEVFbaiwpb1HSqRNwp4XiZZkqmXRLLXqzPjM2W9QzGdz/wa2u81NV1raDpT33iyte1KW/vV8ioXvsCutu5sdY0Hl+OWxbTPzjZns23yslwyUuzpiabJCeaJ8SaJsYfTU4wKc22KeY4CvnNhoS0725kWaxIZcCAmwIAWbsmIt89KccihO+QzXTOSbOPDDFPjTFkMGybdJD3VNDfTMbfAPj3DLDHeICnGLCHCIi7CjJZkmplpmpXtzuf/WFn1RFDxaF9Suk1UvGlgsEFIiEl8rHVsnFVUrFl0gkVcsmVElLn/E8OnjwyC/YyCA48EBRmER5qFhJg98TfyCTwYy7CvagmaW+hXKBQEsfOgCLnzxJY2L/5vwdzDdCc+XkN+bDdS+36bH4Zr0yCBw9o0uO0QlROokkCVGKrGULX2+TWAy0lyjYCXKY0YYCskukRAmyQ8A6ApDJrC1NM4NI5B/Rg0D7AFoHpLqAZJWSchbQOKQSAZBtIRIK4FkhZ0K1ktK6O2uEDEJTbzsbd0YjEctF8no63hIENVkgXCdtZkORPc02r+BaTqGqi5gdTdRatuETU3QeOvRON9tO5XuOy6hndWxTkv5Z6TcL2l+d6SwotizsX19ONjv+zP3f9Z6oE/Bf75/438/ef0b//YeOnzxovfdV/7dvDXb8YffNt7+7Oh4C9epBrPZpotVLpLR2K2lBoYIdUQkKkgBEKVEBAipBiHdDPtZDCmvQxWO2ZLb9Yyrr8E1Z88qT94S38W5fZQkw9OUNdR/ED3FRMpMS3FLQ26odkuEXfuIMbeypFVBbyqglYU6mWVZkmFzsugeZHo9eb6/PrLmcXG4cnU3ueP27p+qm++UVN9rqL8VGX5+XLBhYqyM8XFrrks20L28VK+czHXLYtpm8Gw4nFdBCUe+XkuuZku2UznlGSL1CRDNsuGw3HgcBz4fJcinisr3TE51joh0pae4JBBs8mhO+TTT7BTLuRkHs1IcYwONIwPNk6LsUqOMqXFmqYmmjPpdilxZrEhR2IDj6REmqfGmtETzDMZVqwMV3bhKS73Sjnn9j5GtmNsklVgsJHfU6PAQOOQEKOQcKPQKKOA0EN+focf3j1476f9vg8OB/sbhIQYhUeYBIcZ+gcZPw01iGXYlzf5zrxuV6kU1PYDMTgFMJIkd5IiTgH0v0/hDsY9Pdh/ba//P4UQxzTkdiaUEugsAU1T6nkAj+PQMKYex9WdpLIZU7UCpBuXT+KaFkzdTapHAPScVLZS0hog7gKSPkrUCURNpLABiJ4BcTEpKQCSQiCqAAouvkGjVrPAxG0o2waJMNdEmEDJNoo0B5R1jGCfBeU/aCq/R2rvoFU3yKobeM0tqPqOouymlHdBwj4mzz8jLjwj4XpLOd5SziUJ95Iw89TU/YOFR75I+eI/oj7598g/fZbw1b8Xe/6+4fznXZf/MXz360mfr0affrWQtl/INVvlWr0uMZ6rcdkYD1Ep5VIYKFEgRTVKCIUhQgRr9BHKoHcQ6u5i1i8C9yD8UOwMNYG0HaDdSbL68dsItbGuQnUO11X4mhJflROrCmznnkXkjQyd3ViZXBwZfVU99DKtd9invfeH2sYLfMGJwgKnfLYTt+BkUeFFAd+7qNAlK8OMlWlXXepWXuzOYTsW5DuUlblXVLiXFruU8j3ys9wYNCt6kkVelhOXfTSf5cTOcczOsMlm2DKSrOiJthkpzjnpbjkMj5zUU7kpF1gZ7llpLrGhRpEBh2JDDBPCjVLjzVPjzRJjjGPDDSMDDkX5HU4ON2cm2+Vk2LOyHVjZDllZDoxUR2ay277UdNu4RKvgYOPHj47cv3fQ1+dIWIRpbIJ5UKhBgL/Jw18N7vzw3YPb+4P9TKIjzSOjzMKjjEMjzYMizCKSbfLLbgxN8sXSZQzVPgJKbD/GpTtGAKD/doR7KX7kQZz3Hx54HyGJQu8h3E6DJC7T1nsEMkVBE0A9CeB+Euom1H2kqp6QFQNRKVA2Amkzrqwg5f2kfBzArxBVDbbJI7cqSHERJWnAt7i4kAW2BGCrihBXAnkVIWoDqkZ8MwFshYLl83C5s8rviMrvCB5rg6c5E+nuWNpRknsJrr5FVN8iKn8gq25glTdUZTdkxdckXG9J/ml5wVkx55ys6JKcd0nKubTFubiVdXLy4aHs7/6U/vkfUv7xx9A//zH54B+K3f7Qeu7vw7c/f/lk/4uIr6aiDyylH9nIM1/juKwU2yzy7ZdrLVee/6yQvd3CgZwESgiFNCQEAQWEvT/t/L3JeYTeUC1c+sHBlbuT0sntn24Pb8Y+GB/aBcH3INRfl64qVWtKbFVOrMjgFal0SbK+LF5/KxHPrU6PzNX0TcR2j/7cMeDd2n2upu5UUZFHXo51UaFLRdm5ytLrlWUXBXxXDttSwHNpqT5ZW3airMirlO9RLjjK5zrk51oXsu0zaba0aJOkaGMm3S4n3YWZYk+Ps44PM6bHmzFplpl061ymG4d9voB1KZtxNivtTCbdMZvhmhxtEe53INjnm7hQg8xUu+w0+8QY45gQw0h/g6inhtGBRvQEq7wsJ3aeY3aGVWqcaXyYYWKkxb6MTKdkml14uPnDB4du3/r6wcNDkdFWyam24ZFmQYEWj34xunPt219vfBvgaxweYhoUZOAfeNgv0MQ3wPRJiGEcw7mqJWh2oU0sWVOrlRoNTOCAJEkMI7RnfwHA/w8h/IBGvS1E7ev9HxHEBxCSmIZA1cQOQmJ7LSql0HUCXiaRVwB+BTQvgGYIqJ4D1QhQdpGSCmKNAYR8IK5CZUVAXgeUXQBawBTN1GY9EDfjEh6Q9hCiGlJSQGzlAmENJa0G8iZM1Uaoi8lNBrEeTr19APcdRfwOKvwPoTEWSJwlnmIPpztrco+jRZeIimtExTW84nuk/HtN2ffq0uuq4quKootqnresyFsuuKrkXxFzLgo55zeZxyce7M888HvOgX9kf/1p0lefsO2+qvL8osP7r0vhR0Ssg0KBwarAZJV7aK3AeIlntsQ/sFJoMcsxeCswWOq+LhG9kSO4CgNyBIMgoH+P1rbGdx1qKerVfnsFbl/crAdYb37zbyHUOdRf975bJWK6e9/eKmXranhNia1IZAvChZnVwZmV7tdr/a+WO0dncvvGfDqfX2zrOd3Seqa29lS5wLO82LO26lhD07mG5iutbVdbWs7WVnvUV55oqjhXUXSCxz7KYR3NzXROS7akxZqmxpsz4y3T482z0qw4bFdOnnsO3YkeZZMUbJUUZpaRYJHNsGazjhbzrhUX/ZSXeyktzS2dZpeV5pSebJsQYRoVfIgWa57HdGFnutCizaICDKKfGMY8NQl/dCg28AgzxYaVaRcfYRD18EDk/cOJIRb7crI86GkOcfHWfn4GP//87aNHBtGxNjS6Q1SURZCf2b2fDt65/s2D2/uDfU2C/I18Hu5/8PCQj4+Rr6/p4ydHAsINM/JONbTHDE2UzS10r6zOyWSSza2FxZWJTeGyRgPrasX/iwh1X9PuK+5BqO3KvIdQQWIiElkhoNc4/JqCFyj1OFANEcpRUjUOVM8JSTW6Gkuth1GKArUiDohSgaSSVHVT8hogLQbiTkzMBbIWXNJKSutwEZsSF+Cbcdg6i5B1QxI2kPEICQ2XMMBKGJFoIPP7Gg03VYYZSWKMoHQ7dYYzlnscLzmPCS7DgitK/iUl/5Km+LKaf0lRdFFTdFFW5C0ruaIouizhegs554WZx6YeHcw5/Lvcrz5J/+xPbONPi6y+rHb88tkPn6kLrDUtRlCfl7zvtLjFTFRnvlplvlj25SrPeJFr9oZju8w3Xm4+rtgYVaIKDYVuYagaJdTou0PvPkJRb6lJSjXke962E+m20u1PPorw3QG12/lWrMJFanz37OJ2PoQ3lNC6QqXNjW9lsoXNVy/edIzO8EdessZnCocmk/qGHrb3XGlqOltXfbpc4FnMcSovOlpTebyx9XJr192uvift3b/U1l4sLz5dzjvNL/AsZLnmZDimJlhFBRmGPzWI8jdNizbNSbEuKXKrrj4hKPHISbdLCbdIfGqRFGTDiLVmZdhz2V6lxT/U1T4sK/s+M8cxM80+M82eleGay3TLSnPKTnPIzXBmptjQIixi/QxjfQ3jfIxD734X/nh/cpRpUrRxyKNv/W98E3LrQPQTw33J8bZpdNt0pkN8kvVTPwMfX8PwSItkml1Cgl1okOmDn/ffu/mV/4ND4f5mAb6G937+7pc7B5/4Ggf4mz/xNXrqfzA83oTBOlFQ8qugzqfneeHMfGffcEF9e+LoVJ1UtkGS5G8T+j+kUT8N6r6wByGOQe8iVOoQEpiUQNdJeAGHXhLoLIW8xFXdpKodV/WSyl6g7CKkXGrxOnj1IxCzIUkStelPSqNhTStQD1OiCCAqwERJhLSQkraRkgpsi4ELGYS4khDnAWUXIsoBknJ8KwcWh4GNR2S548a9v6B3D+JRtrIEcyjRDE4yR1luKO8MWnJJU3xZxr2gKDynKDgtKzglyT+jKDwn4Z6X8C/JuBelvIsinreEdep1kInA+tP0L//I+PzPFZaf5f/930oO/Hns/leycjNozB6Zuoa8uCsfchZ3Wa3XOC2VmaxV2G0KjN6Umi+Xmq2XHlht91ILR2QYpAQAwkgIIzXo7s1a21ekQ5j+Jei60E+JewXCu4N9pLu7IB9FqHOo39TRjsrbPk6lRrUHozaU0IYM25DDqzLVqky1KhEvrE6OvijuHorreR7a88y/vfvXpqbvayu8qwSnS7hunDzbwhzbEp5HU9vDgdHcoQlB1wCjtt6Xy7lWmHe6iHtCUHKsiOeWmWYTHXQk+MH+sIeHE4KOpCdb8fnHKqrPcoo805KtovwORz44GPPYLDHINJNmy87y5BZcaqi9W99wu5Dnnp1mn8Vw4OR5lnDOFOR4Zqc7ZtHtM5Kt6FE2ySHmcU8Noh4fjHp8MDnMIiPZOTHKKtT3YNh906iH5lG+h/fFhJoy6Db5HNecfOfIGHMf30MBQYYxsebJNIe4GKtQP4OgxwcjAgzCA4we3zt4+4evf771XeATo7BA0wAfEz9fg8CQAyExR6KT7aLSLLO5NysaQ/NLb+UUfd87yJNI1/devvI/SHHPey1CgtjdJNyDkMRUJKbZvnANkZDIKgHPEdAkhU4BeJxQ1lKqKkJZSygqgLKMkCZSr64TE5fBVjQuooOlYHL1Hi4rAlIOvnQXvKVTwgRiKx2IW8gtFrmZCFYzEEUPJenAhU3YVhwQBlJCJir0Ays/gemLm08+lx3/G/6LORJph8RYQDGmGoatpuAEXHxZI7gu53krCk4q87zkecfEuSflBedkRd7S4ss7CM9L2adXIqzq3b9J/uoPKZ//qdnyk9pP/1fZF396FXJY3W2NLpxDFo6B5Vvw3Gn1mI203UbYYLXVaidqstloOrjWZitqcpE2mKw/v6YUzaEapQ6hzuF7d6KTH0T4vsAPInyn4NSPvTkW15/fLFJuIxSpUaES3pBr1iWaZfHmovjtilS8IYfXxGsvXtd0DUW09dxp7/61qfmnqoqLFYJTVaXHqsuOVwq8itmO+XlulbW+g1P1LxbGR160t/WwSitCiji/lJXerqq5UlF5kp3jGBdqEP7oQNwTo9Qos5z0o2Vlt2oaH5dW/JyTeSo+1CzG90Do3e9i/A6lJ9pk092YaR7c/AulJZfy2R7MFJvMNLsC1lFO/rGcTDcm3Y6ZYsukWTMSXOmxdtGBhtH+h1KirQuyT5cW38xnX81IOcnKuJWT/kNKtOu++AirtFTrvEKH3ELH+GRz/0CDgCDDyCiThERbeopTWpIDLcYyOdoiKsjowc/7b1772vf+kdhI88RoyzA/i+CnlsEhBoHh3wVGHvSLORgQYxND94xh2Gdxrw5P1CgUMoLYe/D8v67rI/GfMkmS5PsIdXUgiWm2TxUiEgJ+S8AzBDwBNJNANUrIBEBRQiqKcSkbyFi4yA8XhsNLV1FJPClLAnO/gHFP8rU3OXEUeXUKLCRQq9Ho+j1qk4GtBVDrT8C6PyHrA9JmZC2I2vJFV2+QkjxMlA7eJIK1WyjdWub6N7nTP5Q3j8iDjBXRppoka1nOUU3RRU3ZDUXRRVXBSXWepzLPS55/Ssm5oBJcUZRek/IuSrjeQs5Zce7J1SibjhOHYr/6feQn/1+XxZ+nj3xV9pffjft/jU25gDUG+uY49eYWMnMPnfZC+q0V7VbCLitZzxlpr6eiz0Xc5yl7dlrZ5yAZ/l4legnjlA6hBtlGqD+VYI9DGQTeGWX5kRS3sxZF9eeL/CsIpRpSNz5dH+GmdGtJPDsvmliULK1JVevirZnF+u6R0I7+m50are3+AAAgAElEQVR9d5oabwiKTxTznKvL3Vobz3Y0XynnuLOynYrKfukZrRyaHX023dM/VtvVz2tuYDY0RFZW3+YXnWLSbaMCD0f5GjBC7TJpjoW5FxsaQjt70lvaU0qK7jHinRIDD8T5HUiLMmdnuLGZXmmJzowUtxymZ2a6KzPVKj3FmslwyMl0ycpwyk53ZKbY0OPNMtK80miucREmidGmOZlHy0q+b2jwrah5Ulsd3N6Z3dSSxmXf3hcTepCeZElLtKKl2MYlWoRGHY5PMU9l2mTm2Oaw7QoKndhsJ2aGQ0SI8S8/fnnnxjfhESaZOY5ZuTYJyQbRMWbh4eZBQQZBId8FB5sGh1gFhJlE0CzYpT8MjAukMuHOpjm1c+rnf+61Jw3qGjMUqb04DsUxBMcgHIMwVIOhGgIRU7iYhGEShjFoAVHPQ3A7Ao2RqkZC3UeoWklpDZDVAnkbEJcRYn9q6SL5+ji+fB4XFwERE3t9lXh9WtluIOswRrttkVYbst8FTJ2Cps9B8zfJdR+wGQCW/MHmI0rIVAt9KHEQWEtB1++B2cuadmvV2c811l+8df+DytNMeXk/7H9ImeoIc09qKi5ISs/JBBeUPG9Fobeae1Va/ZOq7EeYc11TcFVWcFHCvSTKObsc5zh29jDjwGc+n/2x4uAnG9Z/b/v7J89/+hpfuUNuxuPrsdTCI3KZib+5qpy7oRlxVnQ6I8Ousl4H9YAXPHJK+dxdOeisGnKBRt3l8mmIACoIoBqgghEYIWCIkqH4brfm3WlZexsz7wrcg02/ttxt4UCE7k/QCRRrMG1sF4caYkuDb6o0myrNlkp7o5R0SfJ2fvPNm82NtS3J6ubMi4X8vom7vYOXu3uvNDddKirwzE6zL8o72lB9tqvtYm3ZSW6uJ5d9uabGt6M7vrMnvaUjt7u3vKu3oqklvaL0cR7zWFKkSajvgUg/k/R4j7yscwLundoK36bmoMa2yOqaaD73HjPNgx5tmUNzKMr1Ks4/xs50zWE4sxhuWWluuemnczO86PE26XFWuYmOjCjbxAjb2ChbeqIXPd4tMdKSFmvOynAtyD9eVHKptvled39h71hVXRc9n3NlX1yECS3RJiHOMjbOIi7JLCnVksmyz2bb5RU4c4vdS8u8ivjuLJZjUrxFwJNDTx8ZREWbZrGc8godGUzb+Hjb8DDrwEDjwKDDgYFHAoPMAsJMImhWBWU/jkxVSKSbxK67nePn2kP3/5cQkiT5MYQkipAIgUJrOPwG04xQmllC3YcrG3A4lxDnU8oASl6BKSoxeTC+lYpLCsDmU2LqJLnpj0kisPWHxOYdMH+LmrABz93BM09QZoFmf40xv4IyviJZRoDnoG4yh2otQKc1GLpKjbuCcTcwfgq8ctaMO4ABZ5DvJr11QO30d8jhr1K3QxsuX4svfAP52hFpp6GCC6qSS8ryS/KKS/LqK8rK68qSywrueWnReVHJOWnJWVmu12q02YT3dwVGf4j82781ffs7pdP+Zwe+Hr33JVi4DmSBxMYDfPECvHAdnj+jmT0HTTgo+63VYzaKYRvlqINixFY2bKaaMNNMmEOTNvLFh7BiRIMCiFDCMKzCSSmKq6BdhHt6nr+N8IPLzt9A+E4PVjs0VoNI1JgUpsQwKVRjQjUmUpNbckKoRN9Kt+Y3Z2bejr1aGZxbqh9/mdA7fLtv4FJ3z6XmhnPcPOd0mllepn2V4GRny9X6qpO8AveCvBOlxT9UVd0vrXhSWh5V15jZ0sFpbmXU1wXyC6+kJzhEBRhG+pmkRrvmZp4tzL1ckH+NK7hT3hhV155X28wsKvHPZ3pk0hxzGS4lhSfLi86WFJ7m5Z4syDrOY93ksq6kRjvGPDWgBZrSgs3iQkxjoy0YiUeTIm3iw4wZceasVHtmin12hkeZ4Fp7T2LHszRB+eO0BId9CTG2CXE2MTFWMbHmSalWGVn22Xm2eWw7brE7t9idX+pRWuZVIvAsYLunJtvERppHhBnSki0yMqxTaJbhocZ+Pkb+TwxDg4yDQwwCAgwCQ40jEq3yBTcHJ4rWN19BkBrDEB2DPW/+ZxDq14ckSe60RncRah0iMMBxBQ5Lcc08ru4EyhGgKgOSFiDOJ+RZmLwGiGqBJJaQJ1DSZqDgk8IYdOY4WKdjqmz1ZgBYeQqWbxMvneEZJzDrQXZZI+VHCO4hhP6FIuRT6aNPpL5/Vj34RPXgL5InX0rD/4bS96MF+/FaA3LEnBh10Ly+QUze1DwyVzp8JXL5h9LlC5nVt2KbryXO32nOmSK/OEERJ2SZFyX871U1txXVNyQV17dqrm3WXhWVe4tZnqsRJi8vfN7t+pdW8y8XLP8hs/mu7btPp/3/BmZOAdGv+PKP6OsL0Et7zcvz5Mw54uV5dPyUcuKYZvok/PIk9MINnXMhXjkiL+yhKUfFkJly9pZKsqwkSJRQqVFCjAIlqtwzYvl/H+EHp1Du/cNhQgqhUg0uhSkxBLbUpEhNilXklgIVKch1mXhhY3RqsWpijjU+Ezc07tP7/MZA/5WerosNNcc4ebbZ6eYFOU6VgvMdzT82NlwqLz5dwjlTVnSppOgql3urpNS/sS2toZ3R0JzY1BhSXfZLfuZxWpR1jL9h9FOT5FA7WqQ9Pdkpl32ltC6mube4tY9X3ZRYXHg2J90lJ92lpPBkteBSBf+CoPBcScF5bs41Xs4VRrRb+N3D8Q8NGWE2qTH2dJprRopzSqwVPcY0K9EqI848MeRwUoRFTtpRHv9SseB6Bs0t1ufQvthoy7Awk8gos9gES1qqNZ1hy2BYsrIdCnnuOWw7Nse+rMKzruFMTe3Z4qJjeSyXhDjLmGjDuFijmGjDoIBD/k8OhYUYxcWYR0eaBQQcDggyDI00ycw/09ITM/GienV9QqHcIikUAF0C/E+eePpvQgh0yfAjCFFERWBSAt0kNGu4cgionhGKCkraQiqKCNkvYJMJZDxCUgpLI1HZHXQjFIhoqpnbYOMeUFRim1HU8jV86S6YPUG+sgPzLtiEPTHqCPrsiTJjhPad6unfoR8/p258g139Wn3jM83dL7HQ/VDmp3CVCVg8B6/4AhkdIEmowEpi86nM5e9Cl2+Ejl8L7b+S2n0rt/5ObP6NyOo7mYuh4ri5/IqN5rYL4nsMjTqP0C5BKd5I7Cn5k/+ft/uKqirbFkbt0327rd32/+2euKt2lWUi55yTiKgIkhEBJeecc845SEaCSM5Zco6KiCKShbUIK6eZ57gPWG537V37/KfdU5vWH+YC5nr7Wh+j9xF0WU+VTy1EGPfUUH2ZHclrI0p/pr+QApt3sS+2+CcHbNsFWdPlr5vj68bwxhN8wxbbdsO3nJFNW8G6EfbxPryhz1vTF7x5AK/ep08rsbayWVwaHwABD/AxNguD/rsIGQLk++dvHy+rrL+ZZP5aev39qqkAo/Hxcy56wRWccZhUBpVKP/tyvv35y9j6dvnK++jlt54Ly45zM/YzE48nR62Geh+0vdJtbtBvazLp6XSYGguaGA0d6fcf6nYf7HTpbnnW1urRNxQ9tVg0Mp3aMxTV0xPU3uLcUG1WWaiXk6CQECIS5yWdFCBVmKJVX+3U0ZncP1wyPJYxOBLY3Wnb0mTe1Gja2mjW8tK0qda4qda4qdaktuJBdcmDkrQ7KQHymYGKFcl3n2cZFeebPS/SrSjRq3quW1mgXpAilxYpnhYlkxYpn5WsmJkkFx8qmRamdiUjUz0xSSE1QzkjWy07RyMnWz0rXSU/R7Oi+nZ5lc6LhtvN7fe7eky6ekzaWo3qam8X5N1OSpBPTVHIylTNSFfOyVYtLtIuLdXKytCKjpANDZWMipUpLNVv63UemkpYXq+jnn+CYBb4OhAlyb93TOAfivD7j5cIL1dvf48QQwUkzkIEVJj3EeVv4rxVwN1FWeMYuwcwKnB2KsFoAqwGkhYNKAngNAOnRYGzYuIgHNAbwEUScfyMOM/Eqdb4xzvg3R3wzgBf1yfe6aOL6uiALKiXQnNu8sPFeD7CLCdRjvcv7CAxdqoYv/MmOLAE5yWA1w5o2TgtHUzpQ+aiPFVlnobohf5V5u3rHF0hrqYwW02UpyPF05OlqYkylKRZKrJ0FalzNYkzDXG6rhRHX4ajI3l+R+pC+xe+shRHUXTsT//6+uHPYFYTWVHBdwzIT/fJbTt8+Y5gXQ9e0uSsGkDvtfnrVvA7C97qPca8qmBNhbOkwFlUYy/qwJsOnKXb/DUz1n4jB+LyeQBHOByU+O8OR/9bCL+Pv8mcgM5DaQKYJoAv+NA5l0Vh7u1R1vZOZrYPht9/blzfzFhdD1hecVyYs5uZejI6ZDnx2mpi1Hxk0Hiw91Ff5+PBXve56dj52czF2eSFyYjpEd/X/a6D/W6jk0HTizGTSxF9I37dvR7trQ5NjabN9fdqy3WKs5Wy49Qy41Vqii17OuJ7ewo7u9L6+gNfDz/rH7Du67fq6bHq6jRvazVpfWXU+sqo/dXDhhd3y4v0y3LuZ0aqpwTIFsZrlmbfKy00qXpxt7HRuKnxYV3V3eIc9dwUxewk5cRwmfQQmRg/4ehA+eL8p1dystUzMlVz87TyirRy87Syc7TSUlRTE5XzitTLq/TqXho2tRm1tD5oaX3Q8PLO8xKVtCSVmAip9GTV/Bzt7AzVvBzV4kKN58Ua6SmakWHSIYES0dGyBSXaDe3GXcNuE4vpH3fGLhi7GHa5iJQAACNJ/J+QC3+vMPNdGvwrhADhIvwtmLuJ8BdQ7ijJ2kBYbThnADBeYcxSmO6HHLsQFw6AVQ+YmfiRHu8sGBzaEkc+MN0LPfUEp16A6gbvP0G3DYgtQ+KdPljXJxbUiVEl0KXIqxTlJYlyQm6yvcQ4Adc4wZK8VDFBpyjYMyHo2TitEDrNAsx88OaOIE/o3EKUrS/G0LxOV7vB1BRj6Emf60hdaElyNKUhTWmWhhxHU56lLs1Rk2apS9I1JWlaEqcaohdKYlx1IUxenCJ1q+VP/zLveR1f1aKNSMJLWti6BvJOn7egx1vWECxocZY1ee+lmAt6/NW7gpXbrClF/oICd1FJsKLNmdc7X9PnfjBF3xix1yzZZzN8BEB8wOf95Ua6/1Zh5m/jm8DfXEH5ew4ZfMDgYwwBTIcQhgChcRhfLj58PBzb2m/Z3K7Z+FDwbiPp7Xrgyor74pzT3LTjxKj9zKT93IzdzJTt1Lj962GXkUG/6an4xcWM5eWkpcWwhTm/mWm3qSnXqXm3yUXniXn30UnP0Qmf4deu/QPWg4Pm/T2mna3GNbVG5RUPuzpDF5daZhd6+kcLuweC+gedunsfdfeY9fVbDQza9PdZdXeZ9fZYDA5YdzZZNVRZNr5wKss1SwiSTY2ULM3Xrn/xsKnNvK3TqrXDsrnJvLb6QXWpYVXx/fx07ewg1XhvqbRY/aaOuCsJcQpJCYoZmer5BTp5BZrZORrpGWppKcppWUq5hRrPy3VrG+41NRk1NRk1NBiWl2ulJinGREilJqqkJanHRsrEx0gnxcslxcvFxyhGhUmHB8nERinn5mtUv7zdNmA/Ope09LZ572iZy2Pg+GUORAEgyH92+/C/RogLThHuJ5w/T7CXUWYXyWpEL3IBowyheYLzdEArwRkJOO0ZOA4GFBfB2WPAnAC78eCjLWCV47RMct8APYwCp6nk9m1iQweZUcYmFPHX8ni/LOhUwhrk0bxrcOKf+aG3BME/QEE3QcYNvE2UeKNKcGNhVhzBSMN349HFO4J2eahMEk6TRNzkWI9u0TWvslRuMNVFzzTFvmiJHuuKn2qJ03QkLzTFmZoSfA0pvrokX12SrSLGURFjqQmxZX/eEP2l7toPn3OksDUtZq88o1dJMKfOnlO9mFbjTGrxFnR4C1rsFQ3BWwPojSGyepc1qcaaVGNOa8JvHnGXTE9X1NhvHmFv7RhLmucfKyCMZCIonw2+R/h9/P9B+Ht3M39bMceCMQaf+NreEOAMPmBwBRT67u7x7Ke9+o2t4vX3KRsbUetvA5eXvBfmvRbnfWfn3GbnXOfmHKenHSYnHMdfe4wOB0xPxc8vJM4uREzO+s4u+Cws+88tek/PO49OPR58bfN63Hl2PnBm3nd00v71uOXgsFV/n83LpoeVVQ+6uyNXVjqX1/smlooHJ0L6Bj16es27us26uy37+mz7+5/09lr39NsMjNj2d9g11T9tafavr/PIStfPTFasKNFrrH/U3GrZ0mzRUG/SWP+o/oVJbcXD2jLj59n66YHKCV4ymTF36psCroQHyYQFS8THymVkqqZlKSUmS6ekyWdkKSelKiSlyaWmyxeV6JRX6ZeX61RX69fVGRblayXEyMVHK0SHKUQESyfGqCTFqsdGKEWGSsVEyEaFKsaEqaQmKxU8V27seDw0mbT0rm57b5pGP+Hz+QjKJwHyt/c3/HMQ4jiOYdjvI6QgvPcYb4lgjZD0RkBrxan++KkDdvoEnCcDSilCeYxSPAA9E5xXEKd+8IknsetNnsQCig95ch8wcghqHkGxJtbvkW8MkXltsKwDVtT4ryWgXgnQK0fWS/MLbvGSpaAEUX6EJJRxQ9AiC7/RQPc9gaAdnGYASjln/Tb+Uoyd9xMolOLVSOLP5Yl4aa6LEN3sGvv+LZ7eLYHqdYGKKF9dnKkuylQXZ6qLM5RF6CpiF0oiDKVrVKWfGUo/rkj+XHHzh5MKGd6MKqtZkdUpiy/pQXM69CVF7oQWf1URXtBkzj3krKkyF1R5S9rsWU3mtPrphBpv7RFr2Rz+4M6el8HfuJ4vuu+9CcQgARPFed9dC/nfQvi3LYpLhL93x9a3YCNfgynAv2785xN0LmBySRr74uT8/ee9pvcfC9++i1l/F/RmzW9x3nd+LmB5KWR6zmN63m123nliwn54yG5wwOX1kP/sTOLMXNTYpP/AqMvYjPfMYsjkTMDrcee+fsuenkeDg/aTE97jU25DY9Z9w486ekzb2iwaqg1KcrXrKpwHe/PGJovHF+PH5vxGXnsODth0d1m0tJi1tlj29DkMjjj2Ddt39Vt3NptWlj2qqHaubwqoqX1WXWFWW2VWV2FeV2NcXXG/uEC3tECvrPBOWb5BWe6d3AS15EDZGHeRhACFzMwHV0IDZQP9xMNDJJMSFFNSlZOS5VNSFbNyVDMzVGIi5aJCVOLD1GNDFRJiZYqKNOob71VV6qQkKkQEy0eFKibHyudmKOdnaibHqCTESyfGy8VGy8ZEykVHy6dmqNa+MhmcdF5YLfn4uf+E8v6CdszjMwkS+dZl//WEMoIk8T+6WvN9JrzcS3GJEEX4CAKhKErw1wnuBMZpw7mvMfYExm4iaI3oWQzvRJs4MiNOjPHzSOgsGdBy4GNj5Ogpsu9MUOPBTgTJySUp8STVCTtyBCchgBIDDj2hN4ZgTRdMqcFt4qBDmmwVx+vEuKU3kTJJXp4IK+s6XidBDsqj43LY9n2cVQ9oyeCzPTl1By2TYWX8mZ8qxs4SgZ9L4y/ksTo5tFyKn36LH3UDDbuFeF7jOF6jWd+8MBFimYgwTW7Sja5yH96EH/759LEI1+qX2avXc279+8cSIbhdhtGswe2WZvZIsQZkOaNqnNeazCE19rAKMqHGnJA9H1GijWsyZtTpc2rsJQP2ohF9/h5txY679gzeDGOOW/E2X7JQhIsCDIK/EkJwNvKttUAyIPJvNyV9je9kfj8J/F7a3942+bfpkYEQDIikCwimAGdDEINLv2AentI+7x2Nvv9UsvImcHnec2HKe2bUa3rUZ24icG7Gb3HBc3nBZer1k8FW64E2p7GR0LHp2Lnp6MnxwIkpn5k5//nF4Ikp794B+75B277Ox4O9tv3dFgO9Fn29Fn29lh0dFnUvjV6U6uanKRdn6zXVPhnu85uYDBqd9ByaeDY2aP964HF/t0VPh2lnu0VXj13foEtXn2tZ5e28DI2yvIcdrSF9I0V9Y9UdPXHlJffz0nXz07UL0rSyE9XSY1Wy4jVzUrUzElXTQpQS/GQSg2TTwpWuRAYrhgbIRIUrpCSqpSQpJ8TJp6eqFBfqZ+UqJcbLRYcphPvLBngIhwQIZ2dq1Nc9qii9k5mqnhCtnJGiXpyrXZCtlpagEBcumxAnm5yoHBspFxwgHhosmpiiWFpt8LLVpGvQf3wud2t3/IJ2LBDAl9YIDCeIb2dXE99R+acgxNHLiyi+lkZRGEVRjL+JcRZRxjDOHMT4LwjWCOD0AmYBYDTiZwnoiSugRCAnT/HTJECrBOe15EUO8SUe27BAGfUks4qg2guOVeHjQGjbEv10D3mrDFbkwIwc0icJdUoKOqRAkzRUI4rXShMvZEG9NGiTQ3qkBCNS2KY24HSCkzxo1ZQYUsULZXgJN5E4GSzmJpx0i5d1i1cihtXJgSZVpEqOmS/CiRXmRNyEIsWhQFGu+58Env8bCfsRSZHAn8tjMUJn1j82Cf2UI/e/6DXy7Bfix7WylBpxRrsMq0/utFv8qFPspF+aOiJLGZFi9CrQOmVpneLsflH2kDR9WIU+pcFaVeMtqjM2XLm7edRRfdpKGF3AZyIAEnAu70jmoMQlwl9ng3/ZyvSb+H7e+P048zfM/jFCLowzUfLr3mI+xuRBFyzaycX+8en2wZeZdx9K5xZ9JyecR/udh7odh3qfDfc5To64zE46L845TY/ZD3baDPW4jY9FTMwmTEz6TU77zs2HLC5FLy7GzcyED494DAw/Gxl62tdl2dVm0ttl2t3+qKPNvK3FvKHWuKJQqyBd5Xn27foK0/ZGu75up+Eh59EJl4nhp5OjTydG7UcGbXp7rPr7nwwOOLW22Vbk382KVitJftDZHD42Wb/wdmR8qq660j01SiUxXC49SiErVjk5TC4pXDEnWaco+25R0t30SI2UMNXEMKUrYf4qgd6yof6ycZHKSbGqyfEqacka2Rm62XmKGenKCTGKkYEyIb6ikUESyTEqWam6hXm6xQW6xQXaVaX6tZX38jO1IwNlAtwlAn0lwwLkAr2lfdzE/L3FIyJkUtJV0nNU8ituN/d6rW40nNE+QQgMIwSPx2FzT/kC9qXDb8XSPzQZ/hbhXwqkv7bsuQc4cwdnDuPMJpz1EueUE8x69LyApLUC5ih0HA2O3AHVFaEWgItJkpILDm3xAytyVRsc2iLHZoASBijxYOcuQQkkDp3R90bIrBoYVwL9CniTBN4oCdeJQ/Xi0CsppEmSaJMme2SwQRmwoI5uiAFWPjgJIddug2EFkC3JDb3FC5Bih9/ihd+Ew28gUTeRZCHsuQz2UoXfqgLViCIF4rzEq8yIf4MjbiKhCuxgGWa8BK3JEgxEnSU/XvfUfJuue1KrfFEtsV+r8KXbkPHakD6kcdwmftIsymyXpzfLHVYJUeulTpsUvzTKnfaqc6aNmJMmtKl7jDkd9ooj/e0D+hvbz70yZ+89BBifhwMMhy53V1w6uXT4j/fyfmsG/h6/30uGv6HIxggm8nVAy+LDdDbrlE49uTj8cvxu48OLheXwqUmf0X7voR63wZ6nPV3Wr7ttxwafzs64z856TYx5TE8Gz80nTc2lTc46T8+7La4ELC1HrCzFrizFzs74j405jww97eo072g36euy7G63aG8ya20wqy659zxTMz9N9XmOdnm+flmBXk2pYXPdo57WxwM9j0eH7MeG7Yb6rHs7zfq7bbrbrGor75Un6+SHqz5PNHhZ5tzRkTG90Duz0FVfH50Wph7jI5UYJJsRqZASKpMarpSXfKckyyQv3iA1UjM+WDk6UP5KkIeij5Okn6tEuL9sfJRaepJOepJOQrRqdpZKZrpGQrRyaIBUdIhMSqxycpRyZIB0arx8WZFOXbVuTYVWWZFuWpymv5u0i63oU2shJ1tR5ydiHo6S/h5yQX6y4WHyMXGKSdlyNU3mAxNRbz60Ui+2qeeHn/fXdw+WqadHAojz/UD0n4MQx3EMQ3AMwlAYQ9BLhAjChjlbGG8M4zQCVgfJbsF5+QS9i6BVYIwIwWkU4DQDSg70xRWn+5JngWAvijh0BCepyJouuWVL0kNgWjR84QCOPcCRJ9hzINbuQuPy2KAM2iXJqxcS1IkJXohirTLkgBI+IIcPyhBD0uiwNJhTJbY0oPNw6MAcXdbAu2R5cdfoAT8yvIS43kJs9xscj5t8b2GenxAnRIgfJwqnSYIScfKFEr9OTdBsDlbKiNNV1sEYZ70c/fAa5h9hF5+/jJSwNhqhz70Xi+WsrV705D20O0hfyzh5/ZTSZ0TvMTp9dXunTHmzQuSkQ2+3XXu7X4Uyq30+b8BefChYMqa99+W89WFMm+y0qnHWszEOn4tAHAHgITgXxri/Tg6/5cNfF47+Ni6HrP+A3z8A+f1vOCjOgr+OhDkQyhII6Fw2ncM4PT3Y3uldf5+3vJw0P504PxU7OxXwetjpdeeTkV7niYnw+YXE+YXEldW0t+s58yuZcyvus0vOc8suc0seCwu+i4t+U5NO/f2mvT1WPd2W3V0WXR2WrY2PGmsevigyzEtSy45Xzk1ULsxQLcxUyU1VKEpXqczTayw3elVn3Nli0dFi2vrKqK3RuK3BpL70bkGKyvM4lbIEjfIUzcJ0ncJ8q5a2pP7+3Ooq74xgtRgPyVhv8bRQmfRIuYJk7ZIMo7xEo9RQtdRwtZRI9aRw5Su+zjKuT4TcHYSDPKXiw1VSE3SS4zQiQ+SiQmXjIlXDAhR83UWjQ2TyM3RyUzWjg8VDfaWSY+VzMxRyMmQzkuUSo5RCvGXcHYSdntxydRDzcBD3d5UJ8JQL8JIKD5GNi1NJTlfLLzUoqTGubXEdnS1eWu9cWOtdXu/b2//I5tC+7xn+0xCiKIxifAyFURjBEBRD+RB0gXI/oKwVhPkKZ3Tg9F74vA1n5hH0IpxZAM6TBF+soIN4QGnGjzzwA2NyzwXbj8CPXOBZPUBp+T4AACAASURBVPDBEzDHSUYMdOqGn4bAm4/Alim5dpucUQWv5Yh2CaxeEtTJow1ScJM01C0FDUghQ1LoiCQ6KoVPy4MjL5xdhB67429MyB5NdvwNdsTPgggR2PcG0+2nC6cf6c5XGS7XWc7XeW43YC9hVrAYK1KIbH0KvoygEAdAKOAxMfYJ5/hQAG2xYTaDx4N5XIAAEhEgCISQ5yhCRThH6PkuSv0EHy2zdgZOP7ykzGXw1ktOpyP3XtucTJudzj9mrLjSV90ZHyxZn4qpsx57TQqMMRP2QTefRDgE4CMoD8Z43zm8bLL/3mKXvzMD/Pr6fw8hG8E4EMoWIL92Mr6emMpgMI4oq9u77ZubdW9WK969LVpfS5ubCRvpdhkbjJyfe76yWre8XLK2lv1uI29tPXt+KWp63n9y1nlyzn5qxm5i4klf36NXDbqtr+53dZp3dZp3tFk2NzyqKblbkqadE62UGatYmKpeXaz/ovR2ZZF2Zb52Tb7+y+dGzfWWve32Xa027U0WXc1WLysflKRp5kQrFsYrl6ZoFCcrZSdIZSarlhZZVpfZ52cZpAcrxXnLJAXIpUfIZ8TI5Ser5ybpxwdpxnpKJAfKpobJp4UrXAn2VHK3F/F4KhQRIJcUq5mWqJ0QrRwaIOHnLO7vLO3hIO72VDQqRKmswLCq2DA7RSnITcHXSSzESyIxSi4nTSU/Uz0zWTU6RCLYTyIiWDYiQDbMTzrYW8zPUzjYTywiVCo2Rj0+USkuVTEpW6OoyqZzMGV2uWnl7cDu/nsW+4IE6K9I/mkISRQToBgfQwUIhGIITqB8WEBFOWs49zXGbgasWcBeJRnDgNEMmMV8dhZ5ngJOQwA1kzj2wnb1wZ4VOHEBW0b8XQ1sSQ2sWuLUcHCRAmil8IkTcmiF71nCb++iM+rkoDzWIIw+FyILJfFaSUGdmKBDCoypgClVckwem5Al55XgjQcILRM99ECX7oFBFX6qkCBBGKRLI5lSUKo4L/om2/9nlsdPTKcfmPZ/Ytv/meb0My33PvauHkAXGA5QgJMEjHO4gHbCO5jHTg9RPhPDeQAlAEIHgEZ8vQgLxQmYIAgSAIyA+Rgb4zFw9gXnZJN1OMP7Msvdn2HsDFI/vmQflNF2K6hzLgfdDw9HdY434hAU52CoAMX4CHpJ8ev8ELosdRJ/N34LDMb+S4S/x/KvpojfCq1c+ILxhXK+vnc482Gr58OH+o13pUuLeaMj8UsLLz5+HN/aer22Wrkwn7y8nLS2mr68XDI/nzI55T8x6Tg6ajvQa9HW9KC2Uru+Wrf1lVFXm3lf5+OOZquKgtu58UpZkfKZ0QoVube7mq2H+xwGumzbG82bKo2bKx51N9uNDbqPDLoMDTj2ddrVlNzLjlXKDFfMilbJjlHPjFLMiJXKiFfISdQuSNPNTVPKT1TLiVcvzbhbXXS/JFsjJ1khNUIhwlMq3lsiOUAqNUQ6I1zuSmyYdrCvfIifTGyEUnKcWlqSelKccniIZJCTlJuNqIPpracWQn7uMulJWhXFdytKbidH6Pg6Sno5iMWFqOZn6DzP183PVE+Klo8Kk0yIlI8JlY3wlwryEPN1FfL1EPH3Egvxlw4LlomOVYhJVkrLvfuqI2zpTcfW56Wj448s9tnlirbvfv6oBuI3hNhXhFwUEyAQTiKAQLmQ4BhjzgPWOs7pw7mvCeZ7hF2DnRXg1EjWeSbgVQvOrUlqHE51hw/1sF0DaEsabD0QULygDRtyUQU9dUfZ5iymH0HPAlQLcv8RvnkPmlODh6WQdnFBtShSIQvqpJFaCbhJGu9TwvrluD1iglFJsKyMbcgQDD9szwSaVCHaJFlRV7nhQmisCD9ZDE6T4KeK8ZJEkARRfvBNtutVruNVTpE+dygNpm7gJJcEfIDyCD6HFHAJ/imHSQHMUwHlDYpTcAAACXASubwp5PLODEAigEQIhCXgHnP5VA7vTCCgofAFxD0XMC5gJkXA2uLRDtlHs7x3Raz1Bsb7IdZeJyB4JAIuBfIRlI/81znt9wT+47f+7thVgAA+DC41shH8a8MDwdgClMnnMrj0M9rhzsHsxoeW9Xcv371pXVpr+bg9e3D0fvvz6+WlvMkxv8nRgNnJuLXV6pXVwqmZiLFRj6EB+54O8+aGuzXlGg3l2q9eGLQ0GLU3mb18YVScpZ4dK5ceLpERJVuWp9vbZjs57jk57j7Y49BSb9pYZdz20myg+8nw4LOhgadtLZbFOVopETJJwVIpQTJpwSopISqXV1MUpuhUFRvWVd+ur7pbV/6wuc6mq8WuucG4ulQnL1UlIUg2wU8m3lcyIVAqK1rlSkKUTnykZnyUWkSwdJC/SHSkdGK8YlSEVOAzMRfzW3bGwvamwg7WN3w9RNKSVCpKbhdkaAZ7irvYCPk7S8eEyCdGyUUFS/u5iYQGSIX7SwV5SQR5SAa4Sns7Svi5yAZ4KAd5iYYGyESEK8fEa2QVGrf1xr55N3B4+OmEus1knWI4BL4riv5xK9r+AUIS40GCI4zVDRhvMeY4n9UKcZsQ5iuclo5T3QH9DaCPQ/RCcNENU7OI80Rk2xas3gGrKsSODbmui03II18egxMfgpJMMooRahx2HA0oUeT6E2hEA2mX4j7/BSsVFRReh8pFoToJtE2B6FFE+mWQCTmwqgo2dAnKU3JblxzTAXXqzMAbvKBbPP9r7AAhfrAQP+A6EnwDCRdihQkxoqXRbD3eZKpgo4fkXZAkDvEucNYRyaGg3DMuygUEg+RdkIx9+GQeY1MxEmCAxGE+jgkIAJEAIwBJYDiJCADMAdgpcnFAUD5ghxOcrR7B4QxB30W5X8D5Do99yjh6d7o9yvw8fbbdxWIcwcxzAYTwYISPoDwYueR0ueHw14ni38bfS4MQ+o8F/h2HAsAVEFyY/DoRhTEGjDIR7Nt5cDQWe/do5e1m27v3HZ8/zex8Wd+n7nw+3Hj7rmVyMmyo78lgt/Pr/vDp6azZ+dSxiZDXIx6vh10Geqw7mu811Ki21Oi/qtJ/Ua5XUaJTkq9Zkq1Rnq1ZmqaaG69QmqvT8tKsv+/p4IBjR7tNffWDmlKDVy8MOpqMe3ss+vpsXr00KshWTYuVSwmTTvQVSgmQTQlRSQ2Tz4lVqSs1Hep9NjT8eLjfprPdpr3ZvqPNvrvTqqvV+EXpnex45Vhf2UhvifhAufwUvSspKYZ5uQ8zknWjA+X9XIT93ESiQhWjwuW8nW8+Nb/6xOjaM2MRN0tRHzuRYHfx5AiV7DiVpGANb3uZZ2Y3fJxuhflJ+jhLPLMQc34s4mEn5mEn4mx9w81WxNdR0t9FIshDLMBN1t9LLChIIilVr7DU6sVL79HJip3dNyfU7RPqDpN1+nV5N/EHjki/nxAiGIpi/MvZIIzyMYwgUQjmfcS5nYA2jdOfk4xOkjEqoDXgzBeAVkqcZIGLJsCaEpzmEnuJ4CyCpKbzd/WQWVnwVhu8teafRWCfFbFTX4QeQ1Ke4BQ7cF5CnNhh4yqgV0rQJkYr10SrhZEqOdClBbXIQG3ScLsM3CXD6xJHRqTBe0vizJvzTgudVcEa5Rie4lz3G5DPv/J8xGH3q7j3DY6PEMf3Kifwzxfpt6GhfHRvEQhOAcHDCT7CY5C8C5x3xuN8IWlHCGWT+XkaPl6GKW/R0/cwdQOivgUsCgkxSZyFkkwcEAAlAC6AAIHgVAF7l2DtIsdvsON3gHVEcM947FOSsck63+ZQtknWCQZzeRwKdL6Nnx2xL3YRHoOA+SQigGGYTwAIAAGEsBGcCRMsBHAgQgBh0NfmHvjH+e03Y04+TPAgnAfhlw9/VZj5m3cvKdIhhCnAuTDO5LGOKB8/bs9+2l442FvfPtrc/LTw9l3b/FzCSP/ToR7bsX6nsX6n14M+QwPuo2P+M7NxY2OhAwMO/T0mLY26DTX3GqqN68ofVhTceZ6lXpGnVfNcv6bkTnW2enm2ZlXRncYXj+pqjEqf364oM6ouN217YdXZbNrTY9zTY/yy5l5uskZarEpOqmZWtEpqsHhehHRpslZFnnHLK6fX477jsx6ji896h+yaXpo1VN1vrjPoePWgoeZBQZ5+aphstLdkce6Tl92ZV3JzLGqqnmWl3Qv0lQkNUEmOM0hPMoyJVg9yk3OxEXK2vhXkKhMbqBjmLen99IbvM9HkMLm4IKVQD1kfJ+EAd6EwP2lfZ6knJrceG11/YnzN1vjnxw9/crS85eUg4eskEeIlGeQp5+cpGhQkkZSsm11gnFts+bI1em29f2d/5fPe6peTLQ6X/j+4Af+/RIgROIYLMAS9RIiiOIEIBJxNHn0a468TjB5A68LZ0wS7GlCLMao7oLpB54nQmTN2Gk+wmokTI7BugZ74ox8eg2FFbNUWfIojVo3AaTjv3AcwKuBjHe4XI2zPlVjVByOaeLcIUqvIKxLhVkjTy0W4LyWhFhl2rQi3UQIMq4LXSvjmXYISy3+nDQ2r8IrlWc7XISdhruOPTM//4Hlc5zgL0Zz/zI28xa24x5zIJM/eExhJABIFMAn4iICNCrgIl4qxt7iMbe7ZGnaxxN0f4++NowejzNVK5nw648s8xqNBMBdBAILycfIUOttBtubZE9Vni70Y54KPoDgAGMwGKB2h73MutgCXSvAuBMxd/GieMdtInW2GKCsE7Ri92GJfbDLZX1iMI9aXbd4FRYBiAhjiwhgLIiAccLgwj49wIIz1f4Dwm7rL+B7h9w5/DyETBpflHzafR2OeHlM/7B5Mb30aWFwtm5stmptJm53ymxxzmBpzmp3wHB91HR6wHuyzHBl2mZ2KmBgLHB50GBm06u0w7m1z6mt37Wt2ba22qi7Uq8hVr8hXq8hXK8tRqyi401Bh1fbK9VXds6pSq1e1jgPtAcM9PgNdLh3NVg01D4pytJJjFFKiVTJiNTPjtPLiNQrjVEszdBurLbq6XIbH3MdnPaYWHAcG7BqqjUtzdQozlYpzVavKHjY3uVYUOxakWjfXx07Otl5JijEqzHuckWocF3snN9umqty1INcmOkwrxEnN214qyEMyI1G1ssSgMFMn3EfKx07Ux/FGuI9ESpRicpRiZIC0v5uks42Y6Z2fTG//Yn3vpu3DG9b3f7Z9eM3B9Kb7E+FIf4WYMLWwQOmwYKnoGLWUdP2ENJ3854+HJ/LXPwxufBz7tLNIOd3lC9i/7nL45yHEUewSIQ7zBZxNwP0EaN0orQVjTyCMIpheSbBe4xchGMWMPHEE553IeSlyaEUeeoLjPLDrgG3dxeZUaY034E0d8F4dO4oALH/83BtQfMGXVHCUQW7ZEvNaaKs4t1CRnnEDLpZiFQgJaiR4NeJok7ygRV7Qq8TokUI272MnQfimOZh4AD+XZT29xnMQYTsJ0zyEmM5XmU9/uAiSoFXa0OeLeWerAHBJgGGXB7ryjtHzbeL8E/S+l9mXgG71YJRllLYPU7aRrVnWfBNnpZH9vpW10opud4GL97xPI/tdsRf96Vu1AV0umquFwfD7McChkigTY+3hp2942+PgZA2wKSj7AMXZXPo++XmUt9LE/TB4svDyZOEVcbbOPdtl0U+5XDaPTUMZR8dvxi6OdzAU5kE4i0fwIBLGAIePfl9N+Q3Cb9igv47fIhT8+pYA+97kt++8RMjiw0wuj86knV5sf94fXtuonBwPHBsJnB4PWpjxmp92nZ8LnJuLHJ8Omxx5Nthn2dfzeHjQa6DPdXDAdmL0ycSIXX+321C350ind98rx1dlRtU5WiUpSnlxMsU5WnUV5l0tPqP9sYM9ER0tngPd/jPjMVNz/oO97k01ttXFZtkZd2LCFaP8ZeM8ZVKiNPMSdAsSNZ7naDe/Muvqe9I9YDs48nRoxLKv17qxxqQ4SzszQT4tTrG00KSvM7irJ7O2Orj9VeLYaPUV72dyIT7qqQn3iovsSkuci/Ic0uIeBrjJellLez6RiAiQK8jTra9/8KLqflaiVpi7jJe9SFSgTF6aZkGGdlSAvKO1kIXhL0baf36oddXy7s3HD25aGV4zv3vV8v5Pzo+F4sM0c9PvpcSrR4UrBAfJxcSqxiQrJmbq1LV6zS43vN3s295dOqHu8AWsP3Q2+Ff9CYxAMcG34SiK4gTKh3ibBP8A5r2BON0EYxZltiHnGeA8hjwPB+dexGkEOKsE1AJw7I1R3MCFK3nwgLeuga2rgTFFMGSAvr2N7dhhDEdw/gzQ66BDS8HOI2L7Ljwrzq6/CpWLCkrEmMWSUI0CVCt3UXSLXynDqZS8qBHidcqQW1Y4xRt+a4qMGvIqJJmOv7Dsf2G43OQ9EWLY/TstVITXFoRsjwIuFQAYJxGCRGASx1A+cf4JPVrg7U+wlquPG3332qNpc9Wc7THe/hJ6uAoOF9kfhs7edfNPlnkfutmLz5GZ/NMK11Zr4fFoc/5sEb7ZvzP4nD5f97YhfKcpHJ4povZnf2rN2HqZxFqoB4x17pf3GPMLQXBxksuhbgqob+HzXYiyT9/a4FOPCQIgEMo8Pno/N0Q72cdwwOaTfATwYYLDhfjIV2y/id/Yg6G/xG80Xjq8jN/kxkuEDIhkQiiTzz9nXlDODg6P33zaHXz7vnZ1NWdtpeDtSubyYuTsTODiYtra2+rltbqV2Zzx12HDw76vR8OGR8KGhj1HxxxGRmz6+2y622za6q1elRnX5OiXpWoWJ6gXxKrmp2pVF5o0VTu0N7n1drn39bsPvfaamA4cmnFuabasKjCue/60usIlLdkoylsu6plwtI98SohKQbJmbblhe7tpW9ejtnbjng7z7gHjrm6z+ur7+WnqaVFyGdHKJZkPGiscG18GV1c5NzV5DQzGXHlmdsPLQSI5Ur8g0zwx0jDYQ83vmayLxTX7+1ftTX4J9pLNyzYor7hXWXGvIEsnOkja31k2LkQ5NVYxMULR30XKxuimse7PRjo/mOlfM7/zs8Xdn0zv/Gh+9yfLe1efWd0K91POSLmTFKseESzv5yUZGiIbESsZm6JUVm83Nlu+uf2aev6JzTnHcMHXE2j+gCnhP0aIYQSJCWD+B4i5gPDeI5wZlNNMsJoBsxKcFuDn7oDZhpzWYUee4EsAcZ4g2H+E7toIqJngIJFYu4ssK0A1CrSaW2DnIXRiA6gpyGkkQokhDgPAB1108A6rRoL9XJWWJUNLuElLvUXLvMEqEOWVy8DNaoxOBd6UBvnZiqRE8t+oMoaUoCplwvsqZPsDw+4HttW/sOO0zvviuF8WcYgNYAyQAAIAIKQARdgYF4eZAGby6dus7Z7j4VjWdAW5O8zeGWXtT7I+DmLbQ9BmN2+jm7nZC22NUEeLtjoSWHNVM9muZVZKL1zvFj9VybYQr3dWSzG8UeV6O9FIIkTnx1wryQ8NUYctaSslIbyNXsHFpoD6Ht6ZYW4O8w4/wycfBNT3tOOPTMo+9/QYhQk2AZh7a3vvl1EU58GABwMWF4ZgXABhf1cgHyZghIQREoHJ7wV+j1AA4YK/dvgXlt9nQgRlIxgbgs6Zp0fUjf0vC3uHM3t7U/tH03v74x8/NS8spY1NRi8ul33+PL63v/rxfd/SSuXi2vO1t02ra62Ly6WTc8FD47ZD/RYdTcYNlfeqcvVK01RLUlRLkjWLkzRzIhUL4tWK0rSqSgzaWq36h52HJwPHFhIGJuLq657lJ9+tKrBtbw6vfu6eFKQdZX8r0kU8wUc6O0a5qtiwvs64slK/pkKnp+lh5+Cj5naj8lLdzAT51HCZnEjFghjN/GidtBitvBzdukaTrv6nV5ythcO9lVMib0f7q3vZSTqbCTmb3nB59LPjo+t2xtcC3ZXysx6VlBgXFdzJzdZKjJOND9VJitQK9BRztr3qYHHDxui6zYNrj42u2ptes3v0s4PZLw4WN55aCNtZCDlY3fJylgzxVwzykw7wkvDzkArwkQgMFolPU61rdplaqN07WuYLGMTXGjqG4zjxB6TDv0WI4dB3mRC9zIQka5FgNMGcVxCnmzxvAPQaglVLXCQJmNWAlgAoMeiJK3lsgxx5E6dF+EkSsmJGvjXnrpuRS9rs3D/TG/WwY3PizJFPdwXMHnASCS3fwYY0eC+F2aWK9PybrAJ5VoEMI1ecWyRzmn7jvEiY1SwFVu6SRy4kNQhaVWH1yfGfS/Ec/vPc9F/Pn4mcFVkh6+0ISsMABgBKIAIBh4Kxt4iLecDbAqw9zpsR2lTZ6VgiYyiBUhl+0pEGv2s/Xe/gfu5jrtacj+UwZ8o4K68Y42m8tzXQVO3HQvfZZNv1It+uQD1f5avesn9KM5R2vPm/7ER+tJIUVvrf/5eD9L80eGrVOKv7Kv5rsYnIcobN5+aYD41hB83R7Ilq9uLLk5k6wcECk7LJph/Rzw+px58FAgZgHBx/2kBhhMPHIRQIIBzFwGWF5lLj5QME4zBCfAsE/m3AEA5D+Ld/vnxXAP0Vwm8OORDGRGAWjLIhiME7p9I+HJ+unlDXqScf9ijrO4fL77f6ZhbzhicSl1bqd/YWD442338cXHvfvrkzsnf44eDw887u2Jt3WdML7qMDDu2N5i+eG1bl335RePtFoV55tmZ+olJWsHRqoFhOjGxtiX5/l/3goO/ASOzUbPHcbFd/Z255nn15vk1HU1BrfVBBnFGsi0TkM5E4D4mUUIWC7AcVFU+yc+7npKm9rNBr6TStqbtbnKeRHa+YFSmfH6VcGKWUHSKTFS5XUaLT2P6ga9DqSlSYQXaqeWq0oe9TGSdTIUdjISejGy4m1+0e3rQ0/NnVRiIl6m5e1v28HL2Cwtt5hXqleSbZyXd8XcTtzX+xM73hYHHDx1E81Fsm2FMiwE0kyEM8wF3K11nG/amUs52I21NRN2cJD2dRb1dxf1cZHzexwEDx3CKTvuHYtY0+yuk2iqK/Zj+MJMk/KBNeHvF0uZUJxQCGIRiC4yiGYAIURXGEJ+C+I3lDAt4qzH0NmGMko5M8yQPHbsRZMEqNJejRyIk/OEgA1C7iPBM/SQH7rsSaNvnWEvscDN7c4w6K0zKE+e9MwXkwYNYhFG/Onj7xIQQsG3BqpNl5wtRUYWqc6GmCECXhBjNTnF0kTa+W5gwogQ0DnOKDHjnzp7RZXWrsCgm6vwQtzgBpjUVp6yQQIAAgMBeQfBwIMN4hoC8S9A3u+3JoPHAn6+6nhDsHOQ8Pcx6thxksZ1lvVzqed/p96QqmTecw5gqOeqKOOnxZ3TGUvswvPfGnTdELcRbdvprdwdbxD+QtRH6yk/jF+Of/bXzjBzPJmzo//D/20v8Zc0fI5Ma/W0v9Z5ShcKubRpub8lCUYYuX6lS4yUTWk40XkUdt2QctmezVHsH5toB3yqMdHn9YPjv4jMIIBBMoBmAIF0CYACG/5/RNIIKSCEr+HsXvHcIIcfnwG4SXDjkQdrmglC1AWHw2nXVyTt+hnm0cH6982hvb+jyx+aF/eaVmZr5sbb378/7bz4cf1z+ObmxNHp58OLugUKifdvY6llfjx8ddhnvtm2qMS7P0itO1q/LvNJYb15eZVOQbFidopAVLZ0coNBTeG2hx6G1xbmlw62wLfd1fMTpU2PoqrKbcsb7S5WW50/O0h8kBimF2opGuYqmRmrU1Pn39ha+ak4oKLIuy1V+UG1UUGuQkqSWHSKcGy+ZFKxcnqj5PUqrK0njVaNjS87Czz+JKbX1QdbVXavxDd1tJ+wc37AxvPDH8xe7BLzb3hS0Mrj1+cNPPSSYqRCkuWiE1XSMrT68wSy81VivQXc7PWdHHSdbzmWhkgHRWklp+mm5qrGJ8mGy4v4y/m7Sno4yznchT2xvP7MWc7G+52At5PRP3cZOIjVFvbvFZeVt1eLLC4V6QBABfrxO8PB3xD0cIIwSKwhiCExiO4hCGYQTKF3DfYbQWlFUO2Nsk4z18Hoefh4OzOuQimqD4A2oK/uUpfO4C6C94J5bwtinYtyP2TLBtLe6CHj6mD80ocBpvnlRKkTRfjJEMqDnYkYNg30OwakQvkWQkip6nip3Ei50kCF+kizIzxblFMqwaKWxMA1lSRyhOgk8B0JgavUP9vF6bWXybORjDPZsFJIdA2QDjAowNcA6CsCHeBc6jktuDuy3BvIE4Vm/uSW/mRp3Tm+x7n1NN93Lt9/IdqC98t8u82T2ZlJaE48bQ05bA097EnRL7/efu6zl2K/GPGmwUc40lsx6JhxhKW4r/v7aKP5hK/ssjiX81/On/9lQRdpO9duf6zy6yP3uo/uSk/nOsqVL4fWV/fdlwA6Hi+2JDPneWEiyGI81WSkJ2eyppm6sIX3C2v0k/OWIx2DgGIAF2qYiPgktRl3FpDEVIFCEvHf5din955dc//QOELASwYIwDoWw+zGJz6QzKCfXN7v7g/l737vbQ7qfXW5u979Z7Pm0vfaHsH50dHXzZPjrZO6dTKKfb27vdq28SR0ed+jofN9fdqSzSzktSyYpVzk/VeVFs3vLCsbXO82WxZWHineLE282lpiMt9j0vLWqKbpfl3a4oNe/s9O/tja6t9sxPfZQTq58eqRblKxrxTCbEUTQl1qCzO2v1/czym7GuzviiPP28OJ3ilNsZkSpRXhKxvtIZkUr5iUolGUoN5brNHYYvuwxb24yutLXGVpd7p8ca+TvKuJrfcLj3s6XWn210r1vevW59/5en5jdcH9/ytBf1c5EO9pIN95eNDJFJjldJjFWICVcM9JZ1trsV4C6RFqeZm6aYGqsQ4iXh9VTY/Ymwk80tRysRe1PhJ4+u25sKOz+R8HIR8/cTT0zRbe0I394ZYNK+4DAfoCSOAhInSAIhAfo/uGLm+4Oefr3dHsNxHIURBCVhjIejGEEABAc4RBDsRYTZjXFKiIs26Cwao4QBajZOzRbQssBFN/bFBT9+jJx4AmoUcWiFftHAKFb47hN80wB+fxdev02sqyJ98kdJP4A5bcCwIhiY/gAAIABJREFUwemv4CN/7qoqtqpzUSklyJY4Sbm+FyV+FHL9NELoKEaYUabI75DHZ1SgN6rkvjt32wbffHzaqn7WZkgdTyRoOwBgGEIHMBNgJECYgLbGmK/C1ltgzjFtqYK5WCtYajzpSFvPdviQbj7hozzoJPPKWb7PU2Mq8Pakj+a0n/bbBLOd524fS9zeJ5svRBoux5ksxZl3eOjmGYvF699Mvi/hpXHTUf5HL00h/zvST+R+Nhb5NwvpnyzlrjpJ/emZ9M9PZH4xFvnxzs1/uyv0b48k/8NO5Rd/rV/STGRKHVRfeWhMRD3cqY08nnh5tjrJOjnkcCEeh4swGSQCcAgj+QIMAb9x9bcIf6Px20cUIS9f/IYTgr/uKr7czfhrlZXkQSQXJjkQyuRzaUzKMfXD/uHKwdHHY+r7/aP5rc8Tuwer1PPDcwadxuKecxkMBkyjXnw5mHy3mTs159fbY99cb15falBdqFuap1mQrlKYqVVVYtxa7zTUE9JT71WVZ12Zb93V6DnRHzrU4t5aaVmZoVOefbe+yr7plW912bPcKJ0kD8lET/EEX7lob+kID7GUUI3G6tDZhb71rYXxuYbKFz6ZKfoZMTppgSrxLpKxzmKJ3tJpkYpFWXovaw06Ou63dN5t7nx4JT/7SUGGdXr0vRAXeS9LIReTm/Z3f7E1uOFkIezlIOXzTMrR8padyXUH05tPzW88s7rm7SoaE66cFKUaHazo6yLpYHHN0fq6j7NYhJ9ssIec+xPxZ+ZCT81vPLO65WIr6mQtamty7anlTS9HMX9PcV8f8chI1apal4XVkr3dxYuzbSbtC412zOVeEDgEwP9kJvw9hDiKoRiAUT6OYjiOwjiGQiyENUTQuyFmJ+Csg9N64tQPnFVB56HgrA45DiPPssFJPPTZAByHoWcl8JdQsOMJDt3AjiP8wRi8MyDfGvBGNS4qxTn9t0m2N8ZIRZivoMMMMKd3XiJxnCv+IUL4U9j1zwE/stMkWSUyghZ5XqcUe0iat6gBHXvCn6x5oxqsYWvexzZAuwAIweVTST4DAAyirHC2erDdIWSjHTqYRLmfsP3hi6nC07agvWyrfhvxugc3i+5fL7IULTcWLTb8pfLhtdbHIuNeKkuht5cj7k75aU/5qA07Kwy5KHY9VWiwlq4wly40kcx7KJllqpBuLBt/VyJKXyxUV9RN6eoTyX+zk/oPV/Xrrpo3nTSEbeR+spD6k6PKdW8tYR8tofj74glmMo2ed7u99WucVJoDH7bFuJ69mzp8O8FiMbgYweFwIL4ARhEII/noH4Lw0uG3VgdXQHAggi1AWQIBk007p+1TT7fOL76c0/aOjt9s7y4dftm6oNPoHAGLj9F40AWLdnT8ZmOzbeVt1drbqvn5jMFer5YGo9oK3bry23Xld148N6wqethYad/XGtBa61JR8Lihyn10IGV8KOXVC4/6cvuXlY9f5BpWFJhUlNhWFFjnx+gle0vHe0omBCimhiqnhyqmhChlJxrVVAX1DRW/HittbY4ryjHOjNdLDlWJ9RaP8hBKDpXKS1WpKNJrbrrf2W3U2Wfc3mN2JT5MMz3GICvqbpSHiq+NuI+1hJe1hNdjqRB3+cQQ7Rh/dSdLEZv7Nx4/ELK6d9XS8Ecnm1sh3nLRgUohXtLeT8WdLEUcTG/ZP7rhbCXqbCXh8EjU/pGQs7Wwj7NEsJdsoIe0h4Okm72Qr4togJeEn5e4v790UqpeRa11e2/o2GT+2puO3f0lBuMIxyAAAP4/ekj39wgvx6I4jmMIiqAkjPIxBMUJGCYEKEKF2W0IfZpgtaKMl4A7D9jP4VMzcJJKnjeQlCfkSQZKycLOSkh6AXJQSe4HEB/M8J0Q8nMI8s4WzBlgS/qCZXVyQkEwrYsyMgElgzzLBOee6KgUJV/y/LkoNUJ6J0L0IEz4LEWUViZ6XneT2yHN6lXkzxoQpxHg0+OL/oe89y04lwcQEiAMDnaA4hi4WOK+q8ZPZjnbU+jBLHm+SJtJo7RH0Tqjv9R4vkl+1OUoX20qlqt/M/u2WNUj2TozqU5bmREn2VkPhWk3uQVv1UU/rRU/7SV/7cUA3TF39b5nKt3O2h3Oeq8ctLq9DTvcDV456zY46r54qlNkrZr+QDrpnpSX7i0XlZ88Na8H6In469wM1BOKvCsRaySVbCpV7KBR4ajVH27e4mP4pix8Z6CyNMr1XX/V5vwwBgCdD8MQH0EwHgb4KPn9IPPvDkd/D+Hfrdn87aJTHvSXlW5sAcLicZlsGp1BObs4oJxt7R6sftpZPjz+fMZk0ngQXYBdcAWnjOO9L7NvNjvevh/ZP9w4PJh5s1oxPOTW3GjeWPug/eWj9pdmTTVm9WVmDWXWZbl3yvONWho8Brtj25rCn+fblxU8ri61rc02Ksl8UJprVlVoVZpsmBmomOgrlxyskhmtkB+nmh2hFOcnFxOompdh0fDCr6k2uLzANDv5TlbK/Zw0o4zk2wU5evU1Bq1Ndzu7TDv7jLv6TVo6Ta+kRmlkRGqlhepGuykHPJEKeiYX4qwY7KoQ7aeaHKYb4aPiYHrLwuCarZHoE+ObT4yvudmKRfurp0bpxQSq+jiKO1sLPzMVcjARsje9Zmdyw87klqOFsK+TRFSQfFy4fESgpJ+rlJu9kIeDqI+rlI+HuL+fZHi0bGKGWm6FctVLq+HR7L2DZQGfBf6APuHfR4jCCErCKISjBI7jCAlj6CnMbsFZ9QinGeEO4MxB8uIlQYsHFxEEJRpwF8mjGHDkSZy1oyepxAc7ctcEp7Zz3lixZgxYQ9rMV/LMXmnmmAzUL8ueVEIZsYCVLth9DLbNmf0yB3miZ8lC2x5/+uAlSo2U34u+ya1VYDXKoj1avD4t/vQdjOZDrNy7mI1EeCwMBThMR7ELgJ0BytjFbDHG3BfAfJKzhR9288dS54NuFxvLlj262ex4q99HocJCPEHzRpTK9dTbojm612pNxAYfy0w+Fl92kl31UnkXfvdDotlGzMMP8aY7abY7GfZb6c8+Zrl/zPX9mB/wMdf3XYbHRrbPh4Lgd3lBC6lek4muE4nuVc5GifdkonSFUo2ksswVEk0kYo3EE8xk4ozFsh/JVDjrVrvpz2V4/X+03WdUW2e2MP58fe+9a+6kTYqT2Inj3nHBNbbjGse9Vwym9w6m92owvYoOEh1RhAQIIdRF7wL1XkBCvR6V8//gTCYzc+9d83/XfZ+1P2hp6ZvW7zxn72effbpiX9MQVct9kAL/B0RIhppJc4Cg0Wi2mexWK2gx2/9YC/1HZv8Vwv+5cGoy/+NR4e/tqXoLqLfYdSZApdOrNGqxlC6ULHH401zRvETBU2iVcoNeYTYqjeYNlVyyweQI59hCukyxub4hYDIJBFx6f09QN8ylr+0FquslqutVR939qsIrlVnHa/MvNFfdb6lxqSlzqSx60VLr3Vbn21LqVl/qUl/+qqH0eXXmr4Vvz+aGnswMc36XfKQ0/VRpyrnsCOd43yNJIafyUn6peP+gMOdSyfvHbbAEFKqsG57V1h7YBX/aO3Czp+9xT/+9XsSD1o57H5VkXM2Lv5gecib6zdFI16MJAT/FB5+J8DseH3I2Kfx8bNBpr+d7n97a9vrBHj/XQyFeR2JDzqXFXM5Oup4YeTrEa5+vy06fl3t9XhzyfLbL9cHO1/d3ej7dF+J5KC78eFz4scjAgwEeOz2e7/J6ftjvtVOg94Ho6CM57y5U1txt7nrWg4igUGEyGccGWEG7AwTt4F+fbPrfRfj7lCebzWa3mQGr3WI1262gFQAtdtBqVpmUAw5lv9XQadGS7coZm7zZJk8B19Md0mijJN2wWQ3KK0HuLZAXASqH1plBxtnrxunL6r6DKthRTd1JFcxZ3XLCCj1pJp4F1JEO84hRkuVgvJGPnFLWn1BmH2Wl7l/y3C2Nc5Jm7FXXOq9XH+EV7xA17dUTLpjkCUpyqIU14gABC6B12FQWLc/KGQfXUKBVBoIaUIrTYQvJ6Xerft3itXdbnPO27J+3QR7uLry5I9r5u7DjP0Q4b0m9vLXpzi7k62NU33Mz/mdZ8TcFWc95BR7MQh92qS+z2Jtd6i+EhIsa4kRNyWJojqj1nbAxS9CQyapJ4zbmijvLeK0l9KZ8TmuJuLNioTRpOO4NzPdWzesLxU+c3z06WvTi1LvHJ9IfHi54cqLB43p/hs8CNK8vPXi2p2y4Lj/rrhOpOgt02A0ACJhAqxn8UAD7X0EI/FcI9Ra71gR8cKi3gAYzqDXZVXrzptYoV0jW5RyZnLG+ydnUylUGncJo+jAuUakxK7UGhVolVasUGsOGXMJmUScnirDoxJH+0MFO94HWVwOtr9vrn9eW3msuulPz/lZD+bPWJv/O1ujujhT0YMnYUCW8I721OaoB4lFd+KA09XJB9Km88KNZwYey447nJR7Pjz+WFeGUEnA0yf9EctjxtNjj79KuNNQEYDCNEzOjY2T4wEghHBHa2f2stfNxV98D1NALOPzZRzX598vSb2ZHXIx0PRL86kCc/+m44DPhfkdDvI7EhDinvD0XGXDU/eVOr9d7IgJPJMf+lJ5wLSX2akbi9bSES7ERJyJDDocHHonwOx7odsjt4e6Xt3e53Nvl8WRvwJtDQR6HAt4cCPTc5flir/uTIx5PD/p77ktJdK6uvgvv9SOQIQuLAwLekk6rtlttHxD+7/bN/APC35bVBFjtgM30ASFgB21mk1mJtipxoHLEvNkJGqZsqka9+LZDFmSTFdgkheB6rFEcCsirDeJWqyjLRHtknHxtwv+shB2Wlu+TlzjRU/ZOeX3Hf7tDPegMGhpA5QgoSzct/crv2KeAnGfH/cgM2b/kvn0t6GtZ1k5+/l4j9Ky6+YAC7qSj3DAwG5QMrEO/AZi0dsDg0DL0LKSVM2Yx602KNfVwMjXmQuOjo0mHP/He9afAc3uyL36fdXlv4sVD7k7bXzltDTn/fe7V7/tcTuDdnefDrzFS79OznvBL3PmlPvzyIGFFOL8hilMbyawO49TF8puSeNAsfls+t/U9v6WACy3gwop57WXCnhopolkyCBMMNEsGW+To1g1kI70xl5wbhoh41ub9a4//7SqPKzkPj717dBTidQ0W+5pUk4l6HzvXXgxqBMgM74z7R1WSVTMIGswgYHForeZ/UeD/HUKD2a42A2ozoDV96Kqxa38be2NXa4wqlUqxKVYohZuqDaXWoNLZlAZQpXOodTatAVAbzAqdVamziKX05ZVuEjEFjQpBdLn3trzsbnjZ2+KD6IhGwVMQXRm9nRlIZCmB3D41PzI1Nz4zT6FQ8WhMZU93UkOde03ZPcj761XZl8pTzxUnnirNuFGcfSkvwzk73ul90tnytOt5iRfTYp2L3z3paI0fxTbhJlH42RHiTO8IphgKDa1vftLe+WRw4GVv57OPagtfFibfSgo8E/B8r/ejHX4v9/m57vN23RvidzA57kxe1qW05DNvI47FRp1KS7xckHs3K/3O+3dPm+qCmhv889/dTow7mRBzKiPlclL4eb9Xh13u7Xp1d6fbox0+Lnv83fYHuh8M89vv77bf8/l+96d7/T33JSecLi+/2dHlhiNW0RnoTTnHbNKB9v9XJ4T/cEf6oTBjARyAzWS32gAAABygAzABagwo7zdpIDYt1iFvtcljbLJmQBFsk4ZZ1iGgtNvKLwWlRC0zEVgMAxlvgTUIMHJe1+8kbTm0XnJwPnhbz09fDVz8Rth0FjQhHRuxoPCJY/6pEn7O0HyLG7uX/Xr/su8OztvtmlJnbu4hafkBeeOPqqHL5qU4gI+3WTbsoM5iVIEmg01E1S60gPI1kxjHqvbrvv1d2oUDbw5+733gi7CT29LOfB5xdl/QsW1Bx77xPvaVx/EtMRd3Vt87PPjq+ErMDWbGY26RG6fCV9QYwasN40FCRbXhvPpoQWMMrz6G1xDPa0zmNmXw2/L5rQU8WCG3tVDUWSGEV3O7qgR9DRIUlNfXKBxul4x2ycd719Gd/L7albqcyfcR03khlLLYvoinJa/O5Lw63Zvqg4Nk0pCNY0WJk8PtGioy/8WFvvIYq1VjAUDA4tDaLf8Kv39GaDLb/liSMZtsf0T4IQP80Hyjsdj+gNCq/TB/0eTQ6exKtWpDwZWs06TrzI1NiUqtVevMKoNBYzBrDGa13iRX60US4dIyAotN6u12hdbdrS+90lB6vaP2GbI7anw4n0KoI4zXkkjtc4s4GnOZJeAxRXwGnzGxQMaMFQ8i4uFdnj3tT7vbnvS0PmtvfNwCudtc9rCx+mFV+Z3iwqv1Fbc7Gp7VV9wpfn+lrtIF3h0/MgYZn+yfWCbM0nAYHKyhPrm23qUF+qwD+qC5+tePGss8s2JuRHgcDX19KMrraJTv8WBPp0Avp+jwo5lpZ/Nyz6UmH01OOJGW+nN25q2i90/Ky17X1waiEDmDA6mlpU8Tk86kpZ4vLroLKXqcEHrO//Uh31f7gtwPRAQcjAo6/DbEKTroeGTA0RDvg76ue/zf7IkMOZyaerKs/Gor3IM8VSIQErVamd3qcNh+e5rp/zVCuxW02kCrw2S3mS2A3uIA7IDOrBoCN0k2TZlZXmtVvQOlPaCICMob9bIwkzwL3BgAJTUmpoty9REoGFUvRGhIzzdbryiHnGSI06qaY9LMHaO39zUe+Xaz84zN2ObQdNs3UkCe6ybiiKj06FrMt8u+O5YD9zGidzKT9jOzT67l7lhv3qXHvnaw4IBeBpqMVv2GzSq16MQW2aSJ12UUwNnZ91pu/CXm5JevD3wScOq7yDO7Es58H3L2x1fOn/if+iHwyM6AI9sjzn6fevV76HMnkv/1hZS7a7nPOaXe3OoQcVM0ryGCUxfCqQvi10Xwa6M41eH82reChkR+Q6oQliuC5QtgecKOAg4sn9NWKOqtFvZCeL01UlSzbBguHu6VjSM3iMMbBIRkFMaCF6+1Zgm7KtaRFQ1+V989O1Ef7wJLC1zrrplrKVlGQZfh7T1xPvA01xV8H2gF7UaHzmL6v0D42zH93yO0/PUE//eu7g8I1cCHSqlVb7Z+8Kk02TaNdpVOL1cKhdJZthDH4ROFkoV1OU+ukMrU/HXlxqZSu6nRShWyVcYEHlfSB/dob3zcUHED8v485P0FKORhX2fwQF/yACIXNZiOwVTNzI7SmTSOgM/iM+icScosfHg4bRT9FovxGxt5PTLyBo3xGxr27et/A2+539Ph2tbh2wz1gnd5jgx6DPS87Gh/0tPhOjQUiyVCSDNI0sw4cQqNxsJa27JbYUEdrW/aGh80ll/7qKU6uiDzRWz4+fdpj1ogEVWFvqnxN95GOCdGH0mLPxkbdiQi4EB06NGUhAvFhY/qa980t7xthb3thSdBocHvcu8lJpxLTfkpP/9aYdGtzLSzcXHH4xLOJiWeyY4/9i7eOTX2TFrkyeSw4zF+hyK99kX5H4gLd0pJdM7MOpOXd7m11XeSWs/nUuUyrloh16s1Rq3OotcABpXVrLHbANAO2u32v44n/cdlBx3/4hThP9ZmrFa73WYCAJvNClocJqvVDhpAi3rYpILZdDCrPB7caHCo8wFZvEOaY1W2qem+Dp7PJuERuBKjnbquIl42YC+pBs7oh64qBg4LIYdU3ed1qKMz6Tu7z362AX0KWtoduiwDPwhg3rHi7ygrj6xGbKW4bSW4bRMlHuMnHxKW7ZbUHNJ1H1VjguziKcDisBl5dkBuMG9aNtmgmg8qZiQVLrX3DsSf2eKx/2P/o99En94Rd25n8Kmtbke/cjuy5fWRr18e/MLj8NcpF3c2PHEe8rtEiv5lPuXpco4btzJIUB/Jq4/kNkRz6qNEzXHCprec2nBmdQi7JoJT95bXlMCHpglas4Sdxby2Il5HsaCznNtZxuuuFPXVSAYahMhGCaZTiu+XU9Ay8ogQOyAc7eajWvlI6MYkeqYxO/f2fmj4056c4OGKxAUEbJ3QK1wcR2bHLKOgi0S0kc+z2AxmK/gPfWr/7d2mxQFYHFYABKzgH1n+rc9GD5qNoMlsN1gAPWDWA2adxaSzmDRWrd5kMxjsOrNeA5jUFlBpsCv1Wrl8U7I+yxX1sFgwFrObyehisDo5PDif28XnY9ela2IpfZE2iCcVjgzFIXpD4J0BXbCXzZVXm4ovNxXdbK18BYf6wRrdakt+ba51Gx4um54dn5qfnF8kLiz1UKnFaGzkODEET/LDYn3HMVEkYvo4Lg6J9kX2BY8go0dG4ofRseixGCwuahQTiuj3QfUEDvcHoVFvCeNlFFIPjtAzjIUgxnL68XEDmOQBVHxz0+uP2huii3JfFmS/RPUVLE4O4NDN7dDk8lKPtMTLcZFnooJPRgadTIj6+V3Gg9oq366OmJ6uOFhLeCs0rKUpuLbas6bqTS3kTWO9V2tjaHu9H7TOr6UpFNYc0tXo39ng11QT0ALxaKp601DqWl/q0lD2uqHsVUPl88aqF/WQ+63N7gO9cbixshlqx8rcIGN5hLEyxFwmchkUEX9evSkCLCaH7X/hSd+/QwiAdofFChgBADTbrHbQBjqsJh3ZJs6wbOQ7VKUOSSrILwI3WszMBN2Ur3ElyEhy2Ri8JOq8vN55llW7R95ycrPsqLT5hLR1n6zmoKH/nAa5X9pwYvzx1+K2OxZTpkORC8oqQUGaHHVjveTgWvC+SY+jZM+DKxE7lqJ2s98fEtX9uNl7zk6rBVR00KQwqthWwGDX8B2qNbOGs4Etw3nsyz7/ne/ef/dx+jL0zPaosztjzu7ycvra5cjXLw5uub/rs4d7/uLp9G3cuR8hD4+hAq7gIq6To28vZrzgVQQJaiP4DVG8+mhWbQS/4a2gMYZTG86ChLNrIrj1MR8QCtuyRV0lgo4iQVepsLuM313B764U9kJEfXViZJN0tFOC7V0noRTU0Q3yyDoRIcJ0ycfh8slhOakHFvKwxPVSa7L7ZEcJuaNmvheiES2gSzNwsCKdhM2aIDlAo9UGAta/c2UBHB++sQKgFQA/HAb+0eHvP/7w4fddFAAAAADMgMVgMWuNBo1Oq9ZqtFqtSqPUqI16nVVvtmoBu8oMKrTqdSVDJMKz2I2LK+kLi6m0pbyVpZy5+dTZuZTp6fSFhRIGo21ltY1AKkGjM8axOcTxQsJ4DnYkCt76sLHsYm3B1dYal77O4LYWb0jJr9AG1yFkBg5Xix6tGUaXEIi5ZGoSeTKKQA0Yw7thsZ5EfDSJlIQnxmBwgWPoICwmfHw8Fo2JGED69va59fW8gre/6Gp+3Nn8tKvNZ2Q4f2JqYGIGOUapGSZloalpxKkyIqGkozXso5Zq3/yMJ+VF/pPkbgZtcpI8QsR3oocq6qtDqkt8m6qC2mvD4c1xw705uOFSCq52GltDHi6fGK2eGm+YwTfNEqCzhNZ5UvsKpZs10Uknw5aoHctTXfSpNsZ0+8p09/JE+xK1bXWyY3Wyg0ZpWyY20wjNq8SWFUrlLK50Clsxi69ZJDUvkVsWiI0LhLp5EnSO3DpD7WTS8FqVBLTZQSsI2ux2G+Cw/U873/9g9e8buEGbDbDZtHY7aLaBAGhxgAaddgmUF4LSfPt6oUUKBbgRptWXyokr8mEn9ehjEfzBRseh1eJv19vvMGp2rNfsFRbvEtXu2+w4boCdF9QcUMGP6nsvceJ2ytG3QG2eQ1kObpSZVvy4bUflkMtL4XuIL7eOux6YCdzGSDkiKT+n7t6nwrx0SIg6w4Z1cxFUrTlMKsem0KTlmNbx6zUe3fd3Jp3aGnp8S/SlfWEXdgU6bw103vrG6ZvXx7bf2/XF7V1/eXxgi+vhb8Kdt1bcdRr0uzQafIkUdWs56xWnLIBdGcSrDefWRbEg4bz6aF59NLsmglkd9gEhvynpA0JBR5Gws1jYXSbqKRf0VAp6qvg9VaK+OjGieX2kQ4rpluEH5RS0cnJUOTmyTkRIMJ1SYq9+BUeoSkv+dV/Oq9P4ljwWfhDfXqYQL03D62m4HrWMzZkhq7ViBwja7KDNDlpt4AeQVttv39htoM36m8M/hgUAPwRgBf/42QxYTGbAZAb0RoNaJZfLuBvSNYWEJuZTpYI5hYyl1ig0RkBtsCrUAomMwGZAV5ayp6dCZyciabNptLmkuamIKUoAkeBLJgZOTkRNUhOIhFQquWRhrm1lcWBxvn6SnDXQ/bqh6npd+a0emM8oKhmFTB7oCEUPxpDGM/HjWajB+F54MBIZhCeEU6ZD8GTvQdTjQeQz7FgAER9NpkTjyaEknB8G7TOC8hnofd0KvQttvAFruNEMuQErv95UdRPW9GZouGB2cXiBhsVNN46Qs4cISXhqLmoosary6Uc5b2/EB/9ckO2CHa0lE+EjKBgR303Gt+KHq6dxjSukFhq+kY5v4s10i5eH+EtDPGqXYLJ3fQG1uYrdWMYIZ4YEU8Pri+NSGnlzaVQ2OyBZHt1gEDZXhuWLCPnSsHRhWLY4Il/Frq9gBLNI4QxyYwGjWSMqlkeEs338abhwFi5Z7BPNd3MnWnjUFs58M3MGNkdpnpvskvIXzDqVWas1aRUWg9ZmNjg+zO3+6yCMf3GP/Lv2URsIWI02m97hcJhtdrMNtDksBjPbKCsE5WVGaZhR1KJlhsspd7SEZ2bygw3sOSXykBF/RIq8YBhzM04/tMwECbuPyKBnl8v3iGoOGhBnN7oPi5uOsJN2aCjuNkMaIAk0890AdpJ58rmu4fSU5xb8mx1Yl11zQXsEOcf5RU6qzoOGqSSjYskMGCy0LnBz1aoVAnKRwSiyMFpmw8++u7A9+sS2txf2BJ3d8cZpi/fxb3ydt7k5bbu348tb2z+9vesvj/Z/7XHsu9TL+6Avz44GXSOGXydG3lxIf76a50Ev9OZUhfBqw1mQcE5tJLsmggUJ/x0hrzGR15IqaM3iteULOwtFXSXrmoiRAAAgAElEQVSinnJRb7UQXi2A14j766WI5vWh9nV0l2ysV4Yf3CAPKahDcgpqk9i/TuqWL+DFxMHsB0ejr33fkh3Cm0DzZsclojUdd9kgW1MpxHIeSypl2+12u+M3df8Qdttv8U8UwX8OKwCarA6zxWo0GzQasXx9UcxH8xgwFq16aTp7aaaAvgoTSqY2VHKVTq/cpEtFw3xWE33l3dJswvJsOn0+f20+Y3k6Zo4SRhr3xI264kZdiZgACj55frqGvgJfWRlYmK+mkHJRiFB4h19vZ/gIIp2Er6BSIBPE6klKKZWYRRhPGB2O6ocHdHf5IhBB4+N+aLR7W9tdGOwuYsB1HBtApYYRCP4ErMfokBuq93UP7EFLzTVYzbW22l8by681FV5vqbjX3e43jM4lTXZMLvTjJhoGx3IG0UkIZHRT08u8nLMfvXU/GfHmWErkpaZqf1hjdGPt276uPGRvIXW0SbiI5FPbmaO1HEyNgACTzw9KZpFsbC1nvI5PaBRToEJSIx1dQUdXCIgNglkkj9DMxEAEkz3yJbSE2CYcKhehygXoYuF45fpEk3CihUVuZJIaeNSW9YVO8RSMQ6xnEarZpAr+RBWfUs4Yy2ON5bGpVaLFDuZs5wylmbWGVckFOoVEr+TolDKDdtNm0YN2AHTY/vo2i/8fOeFvDh12q03/4aTeajc7HCDoAK3WVZM0G1C2aIS++tU7wOprYO25ae6mefGofdXPTPMD5q+Da69Aab6Z98a07KpduaXHnpMPn1UNnFEhLgihxwQNh8X5e3RzbqCqEFQibEp/w7IrgPcUVp2eCNw24b6D6LZzNWw/M2n/ctIPgsZ9+pU6i05q1/BN/TF6Jces41o3eSb5khSZWHJtR+D+vwQd+y7szC6Xg18/2vVnT+etrk5b7u747MqW/7y97c/3dn7+6vCWkLM/Zl/fX//wWN+bM2P+55HeP5Gibs2mPFnJfcOtCOZWh9IrQ5jVYczqsL8ijOI1xPMaE7nNKTxoBr8tX9RVJO4uFfWUS+DVol6IuLdOimiUDTRLB6BSVLtkpFs8Bpfi+2VEhIyClBMHJPgOyTTGxJyrC7wTd+OH2sQ3tFG4WsLWaDftWoVNt2GzASalSqvaAP8bgTY7aP/7sNkcVqsdAGz/JULAAgJWO2CzGE0qtYohk4wL2FD6Yu78xNspQtAkMWRhOpvDGpStMzc3hQrZlITbx2VV0VdzV5ZTV5dy6cuFa4vpy7NRc5PBJIwPCe1BRvsS0SGEkRgqPnNmqnBuroRKyZygZlPJ+ZPkiilyA5XYOEVpmpuCLi9B5xcqyeRkIj6aQorDjsUhkW+HhuLHMSEjyIBW6Iv21ufIQffxcR8KOQA37oUZdsWg3Ef73sCbHjaXX2uvud1Z/6ip7F5d3g1Y1YPBPh8UKnpgKHVkvBgzXtSPTO/qiGlu9CkrvJ2Tevajt+4nojyc3vo6pUSeSo+7kJ1yq7rEuxkSQRiEiBYG2ON1DEQBb7CYhSwW4ps54y28sSYBromDqeFiqrmYShri/Up/LnukkEdpYw6XrCELhZNd8qVh3mgNHZrAqA+nNYQyOuL5I0VcHIRLaeZSGhmEKg65mkus4hIreKRyJraAMZq9NpxKG4hjDacsj+TwJptZ022ThCraEkK5wdUpJNpNukrGUSuEJq3CZtHaLUaH3fIvdnv/sUBqt9stVqPdYbRZQcBqd4Bm0A6Cpg2TcsAkDQIVzXZWOLjoYVm6oZ46Zpq+YaW/UPECQZG3hX8JENwEhW8Azm2A/tA89ZOFeh2Yvw6Qf1IgD5lHT/PrdzDSv9fMB4PGHlCebOG56dYeGKnn+XlHZnwPoF5tRT/fvhL843zIj/Ox2xn1znL6oM1oNix2iItdzAaRQT5v04lMXAwt785b5+9d9n0ddWG399Hvnu76y51tf3p1eMv93Z9c++bfH+z6+v72T5/s/cL9xNbgM9sTf/qh4vaBzlfOPa9PdL06Nhp4eSL23lKGC6PIh1UawKgIZFSFfsgGWZDw3xFyGlO5LemC9jxh13tRV5Gwu0TUXSmEV4t76yR99ZKBJlFvkxDRIkK2itGd0vE+Cb5fRkRKCYMSfJd0cki3Mjlenpj+8PB735t4WOWmiO0AQYte7bDozDa7UW8wapRWiwOw2q02h80O2h3gh13RanNYbQ6bzfGBn8Px9w4/lGf+4R7VbLcCoNXiMBn1OpVItbGsEI2LGV3shVr6bB5tOoM+VyRg9slEEzIRRchBCNag9NXq5eX3S0vvVmnl9JVy2mLO/FTsJCkci/LADwdQMFGk0RgMInio13Nk0B2L9hjHhExPpC8vVtGWYMvzHfMzLbNTdfMz1fNLhbPzGSRKOI7oT6ZGUigJeEISgZg6gY8dG44ehIeih8KJhHAS0Y9E9CNgfcaGPEYHPAZbXaClt2vzrsIq7rfXuTaUvyjLugop+qWn9UlH69OGuocwqEdnewC02QdS9qS84NfCrJ+zE8599Nb/WFzA8Xj/o3F+Tkkhzulxl/OzHpUUuo8NVgrm4GxsFQ2eyYBnMPve8UarOdgGEbV3cw4lofYICDARoYU9Ur2GKKYPlvCwDZyhEt5YlXwFs8micseb16Cxq1U+K7VBzNYkHqqCj2uTzaI25ge5pBYesZZHrJVOtWzOt/EIVfShd6sDKUs90WxkAg2dzqPUMyZhVFzZyuKAWi7WKNaVsjXVOlMpY6kVfL1aqtdsmIwah90COmx2u/2DsX8RIQCY7Q6LzQba7CAIWkGryqJA6QV51o33Nm60nnbSQfeyMR5a5h86GK8B2VO7rALcLHRwXUH2G1DgZ15+biLd1KFvq4cuyoacNMgTOuRFTe9pUePB1dQdRnaMVTUIyKtBCRxkxojaThJDdpO895K9jo283r0YuGs+eN9i6gEZwke1sQraQP1wErvA12Zk6UQUQMW2LDTQYp39Dn/zctcXkT/verH70/vf/fnG1/9xf9df7u769P6ez58d/PbZvm8e79vyZP9XLge/CHH+JvvK7vJbB0p/2QN3PY4JukKKujUV/2gh02W1wJtVFcyChLJrIji1kSxIOLM6glMXy6mPZ9Unc5ozuLAcXmsuv/09v72Q117K66oQdEME3RB+byMP3iAYaBYgWoRDbbKxXvF4rww/KCGOSIm9UkK3aga3ThqsCb6d9vg4uiZXLmKYLHqbTW+zqM0Oh8lkAi1Ghw20ADbAav8d4e8O7f+0GX5w+CF+2xUBGwDYLBar2QwARpNJp9ap1zWbfLV8VSmd2hQQN3ljEkYHf6WKs1jOX4UJWT1sRjNjBcJbbeCudTBp9XRaPYMGoy81Ls0UzJCTqdh4DMJ3bDCCNJpBxWaODobCYU+6m28joHfHhjymSDFz0znTk/nT0++nZ95NTWXMTqXPzbydnQmnTvgTiN5EShB1MppKiSYRI8jYYAwyDD0YQ8AmkUmRRLw/HuOLQXqhER4DHa9bKx9Asq9WZl5uLHkMq/VoqvErz79ZkHmx7N2lkqxzeUmnClJ/yk+9kJ9+8X36ufeZx8tyTxemnP0oOe5UctSp1LCfUoLPZUZdeZd0KzP1flbm46G+UvZsN49Yu9STSutMZg/kCMYhAkILewImW4DzJ6BsQoN4okVMqmdjKuioIiG6UTxSLca3rNNIUuYMl9TF7s3iwSKYbcHcvmQ+upyNbRZN96/P93PwtezxcjauWkRtXJ+CcsbKVlHZa4NJK/BQxkDI6kgif6KWO9M6Q65eW0ZpFQq9UqtV8LRy5qaUvillKmRsuYyrVW0AFoPdZv6tGe2/HxHl+PsFgqDdbrdawQ+9OYBu1bie75Am2GQ5RmYyKM4DBC/1tJ9BcZRtMxaUJYLyTDP7pXLmOrDsuT5xQTHxQDZ6j9/5E7fyLA2yS9F+UlB/TAE7was6QEs5YuHlWU1DDmWjQ5yomXm0WHxyOXnbfNhuzJs9CNcf8S7bqT77ppJ3GChlBkBvNxsUTe7rtXFmPRPUcu1CqmE4fDXu9Iudn0Uc+cL10MdPd/z5+c6vHu346u6Oz+/s/OT1iR/u7/jkzvYvf/3x81s7P3/t9G342V1RJ7em/LS94qFzv/tJTNAVfMh1QsSt6cQntPdeHEjo7wiZ1WH0yjAmJJpZE8OoTWQ1pjGb0plNGayWHDY0j9lSwG0r5XZUctorWJ01PHiDaBAqGGgWIKBidLd4DC7FISRE9Dp5QEHsVE+hFbNEWMLrtAeHJmHlJo0QsOvNwCYAKI2gzWo3gxadw2b/I0IH+DeH/2DvnzX+jhAAbGYzoFOuyTdmJRKiUDTC5/WymW1sRrOADePRoeylstXpXPpMEX25dHkxm7b4TsRsEjLgPDqUx4Bx6e1ri3XL0/kL1LQ5Yip1LHkCmzdHrl2YrCGPJSO736CgL8bbPQloH8p4CAkficNHEKkR5IkQItGPTPKfIfjNkP2pJB88zhOPDyCTwgi4gNEhN2Tv075ON2RfKHooEj3ih0F7jAy6D3S+6YI+gtXebyi4UZlxqSztUmXe3fpq95amMGi9Z2HW7czon1IDTyT7OyX5H47z3ZcUejgt4kxO3LGqnJ8qMi9+lBV7NSv2ak7M1bTwC1nRl9OjrsQG/ZQR88toW4FoDsGndrCwtZzxasZouZgClVA6BJgmAbaei60S4usllDbeWBNjuJKNLueR2rikFsZ4rWwGvjGLFFPgHGwTB1PNGC3nE+qFpEY+oZaLr+TgKri4WjG5VUCCsscrOWMFHEwuayiTNZTNRefwRrNpuHLeXDN7vmWaWE+bR2oVHItWYdGodGqpVi1Ub7LkomWFcFm/wTOqxFq1SK0WmUybdrsBdFh+G1Tzwd5/Z9IKgg67w261gia71QGqpkySWFBaC3IDLOIIkywfVIWDkjQDN8a60W9V4y2MJM3SE+XULTP5lgh+jtN2Zr3q55XwveL3RwTZTtyCw8LCveLSfdSwPfiYveBmh003BK6X6Di+mrVn6rFLwqoT89HHx57vRrvuIgZtxz7eSi98ZuRN6YybNu2cDOIuQxVYdEyzQeEglluHgwcCT7l8/59xZ7bd/+Gzp3u+cDuy5eWezx7v+Mz18A8Pdn954/v/vP79N9e2fvps75f+Tlv9nbb6O38feerbkht7Wx8cHHQ/hw64RI67t1zgSa8OZdRHs5oSuDVhLEg4CxK5WhbGhLzlNiSxahM59cnsmkRufRq7MYvR9I7e9J7fUc5pLeG2lfLgdWIEVNDfwu1rEiCgImSrcBAmG+mQjsP5RKSSMKKewCvWZkZLY7NvHcBUpJrMaodDbzWrbCYNaDXbLQBod/x+Zfxr/ey3C6DD8XvV1PG3RNFhtznsdhtgs4JWG2gGTDqDVKdl69WrOsW8QoSV8tqFjHzeShxnLoJODVmjBNOpIZyJt8yJSBo5eG0igj4Rv0bO5k/VSOfaJXMw0Wwrg9zIn2tnTDUsTVSuzlctzxbPz9esrSE47CkOe2purptMeD9JypinpE7NJpEo8eO4OPxYNH44AIdyxQ69wo68xKP9KGPBM7hIKi6cgA8mUkKwWN8++MuOmkctlTfbmx/193r19/ugUMFjw0no/qy2Nr/GqnsVaWfL4i7UZd+pyr/XAHFvh8VAmyLLi55lJpxOjzyWFnQ8Pfh0esjxzMjDmREnUkOc3kU5Fyec/Sgh9GJK5KXUiEsxAScjvJ3CvA+F+hyKjzrb35HJWoRzF3vZM13ixX7+dJ9wDsWbQjLwDStjNbRxCGeylTfdScM3LmNqmcQW7uQgg9w9j21cJbcxJ3tZVDib2s6fbGNR2riT3ZyJDiaxhTZetYKtZBKbhNPdgulWBhGyiiumE0pZJAhvspk/C+PONjMo9cJFGHsROkdppi9hlBtcvWrdpN80GxQ6nVSj4m1uMDelTPU6V63gq5V8lUKqVW2YdGqb1QT+3etlbH/958Hfwu5w2OwAaLHZAAdotYKgA7CCahQozbCJwwGmC6ipMurj9FwfkJMAyie1rEzt2h39zFOAHqubuLeBvsaA7V8u3ckoPzId/MNC7jZ69n5G7lFWxu6V5J3Qq7u7Xuy0SxL1yihQ2wNKMw2061rqT7yKgxSvH3Be32Jf7MX77SX7bhH3RK3TUWalGFRPSysfGZZgtvU1tWwJnCwHqCmDPj8lO3/hdfDbX778t2e7v/A+tvXF7s/vbfv4+d7vbn3/2ZUt//7L5/9274dP3jh94+207eW+r18e+Mrz0BdJp7bVXN/e/eI4LuzX5Rw3XmUIty6K15TAaojn1L3l1sewa2NYtbGs2nh6TQKrPpXTmM6qSWbVpzEbc4RdFbyuCnZHBbejkttRKeprkAzCRAiYcBAmHe6SDLULEFAREibEdIiIg+u4wU0qVsGYpg1UVLlfRJfEajTrAKC2WdR2s9ZhMdotZofdarMBvyP8413Ih/in3e/D+a0BMFsAi8NkMui0PKWCvCHulHArNriFYnoGbymaMxvMmvBfJbkvE14skh4s413XCD708RAuIV06U6NYGZAzxoXLWNlkj4TaxSN1CCY6OeSWVVzlEq6IMVHGnINyVpAi9qRcsshlYWammhZnmrmrvay1fha9d362dmwkDtXjPoZ4RcS4E7Ee+FEv3LAPftiPNBZCwoficcHDSE9429O2+oeNVbc7ml+h+t+OoFKHh1LHMcUThPYRVGVPa0z5u1sF8adbix51Qlxbar3bW6Obat0riu/mp519n3wqN+5kVvSp7NhTxRkXM+LOxfgfjPc5kBl47KMwH+cInxORvs7R/s4xgadiQk7FhJ1JjLnY3BBNJdQuTEAXia0rlK758dYZTMv0aPM0uhDfmzvem0cZLiUPFWH7csd6cnF9hZSBajy8ANOdM9qTNdb7DtOdg+t/R0LkEPryiX2F5IFiysB7Qm8mHp5OHXw3O1K2NFYwM5xFGUybHMqeGStZINTMU+pmyNWruEoauWyeWDyBq2Ysjylk3M0NvlrJ1SjX1ZsihYK3uSnUqOU67aZOLVUp2Bo5V7XOVsl5Bu26xbhpsWhsdgMImv/2BtLfETpA0O6wgQBoAx0gaAHtdgsAbLaCG3kWqRvArwPlbVZ5qJHtAvLcDcvuyonLthk389RDMfqSbi50E/2zrOuYBH6aVbJ3Ju3H+fcHVrO3r6XtWQhzGnE5kLjty+ZHO0BFBqipt8kKbFw/zfQNxdhVRuERsscOrNvB0ef7CB4/TiY68XsClcwBq0ZsX4ZpEKGKBRgoXdKKCXp8mmG+ajrhfvn171/s+ubet3922fe1p9PWJz9+euPr/7j3w5e/fPvJtW//88GWPz3e9fnzA18+3vnJ/R/+9OrAX4KOf/nu4o+tT48Mep2fSHzMLgngVIVxIVHCxiRuXSKnKZFZH0erjmI1JLIbUuh1yazGNGZ9GqshnQPNZUPfi/sg/B4Ip6dagmziwesE8DrRQItwACochEmHO0TIVl5/sxDRIhxqFeL7hGM96xNjcua0dnm0I+YZtvytViuzWdQOq95m0VvNOrvFaLOarDaTzQbY7VbHf7H+5tDh+JAaWAEAMBs3jHqZySAz6YV65axK0i3hZvHWAnkzXtyZ1/yZl7xZF+60J2vCnzkZxpqO5E3lrS/Xb9KRSgZexSApV4fEM430saxVTCVjvJ6BbeLgO9ZnUMrFUS6hk4ltXRotXsHV0Kdg7JXW1ZWamZmChflK+iqMs4oRckdXV1qwI2+RPa9wKJdJgv8kKRSP8cUOeWMQ3lhUAGYkEDng1dfxfLDtGRL+GtH9eqg3FIvKxgwVIhH5Y5j6uZmx+RkykdDT0RoPKXjQV+uKavJvqfSogbjXVT6vKnlUmH2jIPNKYeb5wszz+ekXi7J+ycu6lhZzNjHweLznkY+i/I+GehyK8j2eG/9rxbsX1YWvKwpcCrOfFGW8aCoN7KiJ7ITEdEJiW8tCGwo86t6/qst5WZ78pDTlWUnq48LkO6XpdysyHpSmPixLuFMcf6Mq83ZV5u2K9JvFib+UJv9alvxrZdrNipQ71an3azMf1mTcqcu41ZTzAPrueXvh046ip50lT7rKX/VVe/TX+fY3eSNg3qgmfxTUGwHzRsMTVqd7N/iLUv6CTDSlFLP0Cr5WwVErBTrtptGg1qvFCvHSpnhRLlpUSle1Co5mU6DXyABAC4KAw2H7fTP8kAt+yEwcViNoAx020ALqQDto3OywrxcaxXG2jXIrM9O+FKybuqafvKckHzbOnDcvvLSSft0gXTTNP9HgHqz3nZC0OWuHr2r6L/Ihp5hp+9fi90z77G28tsP/00/ggadAe5NNVWQVPXVw/Sw0V/3opfmkA2j3LUSP3SOvdxI8d1NiTvFbve3r84b1OWCizjhbaF3rNwoJOj7aQEqwMlC80udJJ7988PXHj7//9OWuL9wPf/ts91fXv/yPX77+5MpXf77+3ScPd351f/eXD3Z+6rLj49AjX+bd2tvmfooafWM27cV8lgu9yJdXE8mCRDIh0YKmJEFjCr0ufrUmlgaJY9QnrdYkrtYkMupS2Y0Z9IYMen0WoyVP0FPJ7arg9FSLkU38/gZxf6MUCRUjYSJk6weEAkSLdKhNOtzBH+sUYXrkU+OytSkTexoW64YuDLJaFA6r9oNAq1ljs+mtgMFmNdntVrvd+nd/wV9z8g8IP7z1wPHXp8wMep5Ws6JRTumUVIN8SCWskDIi+Iuv+dSHXOpD3tRT/qyncDFWtlIip3eqWGg5n7zJp6i41E06TjY/JJqEiye7xFNtchpaxyZpmATZ/JCAChdN9HDxLXxii5TUQBsqnuxPnx5NXplOWZiKnqGEz1KiF2eLVmll8wsZ+HH/MdRL0qgbdTyQio8iYN/iRiLQ/YHDfSHDiLDBHq/B9ldj8JfjI14kjB8JHY4fShhDpCB6k1GoIhIFTqNNLtKoeHI3rCmso+LVYJ0PrOpNZeXTloaQTlhiW3NCc31wY61LW+Oz+vJ7xZk3ijKvFqZczYw8H+t7/KPsmJ9Swk5lRPxUnHq7+t3D2sJnkOInhdk3UiLOp0Scy0u6UZ79pCL7VUnG4/zEaxnRJxP9Tr71Opbgfyou4Hhc4OG0yGOZ0SeSQw/HeOyI896dHXUiL/Z0dtSJ5KCDsV77Yjz2xfvuiPfeHeuxN9Zjb5z7rtg3P8a/2ZPkcSjR+2hm4LG8sOOF0c6lcWfKE87UZJ6DFV5ufH+jpfg6tOImAuY9iytjLyJYS8i1xX4ubVjCRIsZI0IOTiRcEAuXpfwpER0jYZKkXKpCtLApoclFjE2ZwKxTOQCT3fFhaI31t7wDBB0gCDjsIGgGHVbQYbGBZtAGWhR14EahTZBipt/Szj6wLzy1Tp5X487b6S7axWfamV8sE5eMKw91C48kmPMazBXtyK+q8bPs9qMi6DH2+z289/uWove33v4hbMvHyKiTgDbfpskCxR4gJ8C8+ITXfBLrv2/cay/V58To6x/H3hyaDN+vIFdYVEI1GwPyp+VjCXpKnY6P1jH6dJO5IGdsPvGy54+fPPr2z4++/fOjbX9+vX/Ls91fXf7s3y599h9Xv/74162f3N3x2cM9f/E48GXG6e2tD08Qo2/R8p/LIN7CmhAeJJQFCeU2RHMb4+m1Mey6OHZdAr0uca02gdmQzKxLotck8Vuy2LUp/MaMtZrk5cp4RmOmoKNI1FMuhFeJ+2tFiDopolE21CIabBYNQqXD7ZKhNtFgs2y4dWOkhz8EE6M75aRR8QLVyFvpygzFlYUAJokDUAEGjc2iBwCtw6G32w0gaP3rRdD2Tw5/R/i3ZbfbLWaJVrOoUuDUshG1uFXBThUsurEnHnMm73EnXwtn3q6vVKrZ/TohTiec0Iom9ZJpnXBCL5ww8KkaNknFmtJwF/SCNcUSRjKLZOHbmePQ1aGq5YHCybZUTHXYLCyP3l/GGq5aQmQvDiXNosKnkf6Tg14UvPfsZPDUZCCV4Dkx7j6B9SKNBZHxMVRSMXk8b2QgCdkbP4bOxKGTRnp9RjufjSLc8ENuONSbcYTPGDJwcMB3YCB6BF0wMdM/RyNSpgfboG+bih8P1Lp1N/hCm/0GBgrGxlrwuO7hkWo4PAY1EDDQ7tZSdr8m/Wph/PnMyHNpUec/ykv4OTX0VGLg8YSg4wlhx7KTzuZn/pSRejwp9mRCjFN+7pVaiGtjbWBzTUhNqXte5s3YoNOhPgeiQo+kJ50vLbxbW/m0KO96ZvKJrMRLJbkPmqu82hr9WyBvCjJuhHsdivQ5mhH3U17KL3lJv2bHXcuO+Tne/2jgy51+z3b4P98f/uZgvO/B7IjjpckXIVk3movu9DW8GIR59je79DW/HO7yoY6mLlEq5si1U4S6SXwJGZ2BH0xcIFey6ENM+jiTNsye716ZgS3Pta8t9jBXBhkrQ3wmYVO6oFMydBqRySCzWjYBQGm1amx2g91htDuMFhC02G020OhwgDb9ukkSC3KjTbRfzdPXDFPOlpVLBvpD3dojG/eBg+cCit9aaE8dLBdQlKmdOq8hXTDOuxnJ16WjZ5VjP8kHD67DnViFTuMB20udv6QmOoPmOMtmuFkcaOddtcyf4LSdWc3ew4jfgfM6gnU7SHDdxal/atcwTXohqOaDkjlFX7AClWJhjdr5I2Z6xya+rPLS1947vrq79U8Pvv347jd/erzjs/s/fHbp0/9z46tP7m777O73Hz/f/Z9uBz+Ndv6m6dZhasA1br4Lu8ydXvKGXerNLvdbrfBn1IRzmhIYdbGrkOi1qihWfTKnPplTn7xYFE7O8J7I9B2Jfo6NfTWVGzCbH7xcEjlbELJUHsNoTGdDc5nQd7yeClFfDb+vlt9fJx1plaFhYmSTZKhRhmoTDNbJhqFyTO/6DF7LXMJUZ6ILXDXyJRBQWI1au8UIAFqbTWuzGkEH+PcIbf9QnvmndNFhs2lNRr5GOaeRElUimIwRzYDqM+8AACAASURBVFt4yZ16IZgLkS5nqZhtev64QTSpFZLV/PFNPlrHmdJyZ3XCJSV/fp1Bkq1ipPO9AipURmlbRZQv9xZKsHX0njx8adjoO7+x937owqC5llRGX9FCR85yT85MZwKpJRhb70UY8JzEBk/ggigYHwraE4/yxKACcWNxsxOdc1NtJFzNOKZ6gtxMIVag4KFddY+6mp92Nj3obnmEgnthh4OHkb4IRNDwUPI4sZk81Y0YKquqfFP1/mZ37euuer+Opgg4PAc5XDeG78MSuwfRBShU9ECnezvkIfTd3dLEy1nRZ3OSLn+U+vZ0lN/hxNCz75Julb172ljt1dLo1woNaK71rYW41tW9aWuLGBzIx4xAejoyivJd46N+Dg05HJdwrKr66Rgmi0Iq6+oMryh/1NuTMUlpWZrrX10emJ6o64JFJL39uTjn/iiqYIJQT8XWEYbLsKiclmrvhNBzgW4HfF8dCHLbGxt8pCz3JqI9FIfKJGEKZknVi5M1k/gSEjqTMByHG4nCYxImCAVzlIapiXL8cDK6K3SBVCYTkmXSFbFgQcQicRkI2kLn8lw7baFzZb5jbb6TudTDXOoRMXBSHlkhmlFI5pWyRe0m3aTlWvR8vUFtMegdNjXoAAEdDVCkgYIoHe2GmeEC8t6A4mijvAhU19hZL0DufR3P28KOt0rTHaxYkOdt49ywrQSAkgDb7GUl4ZQGd0lJvCmHH+eV7kQ82DkRcwxQhFqUsaDinWX1pZZ4U9L1C7dg/5T/d1jPPSiXH+ciTyhnoTaD3KgXO0xSA6VchXir6Q1RT3TYN5dBychc/qugH/9P5Ikd93745M6WP9395k8Pfvj0wfbPb3z95ztbP3/ww6dPfvz49a6/vNrzWdjxr1oeHp0Nv8bLf8EqfL2Q6ULPfkbPc6UVeDIrQjh1b1k1bxnVUWvl4ZzaBDYkbjrXDxF8u/7pycanJ6vvHYG9OAt9eRbudaXb4xLs1dm+wBuY+JdTeYFzpVGMtgJBb4WgHyJA1MpGmtfRLZKhBslQAx9eyYa/l/aVbSAbNdMjGvocZxyGK30m4uJA+4bdrHUAJgBQW60au80MWsEPdbA/IPxHdY6/tTFZ7Xar1W4zW+RGDVMvn1aJW6XsOMlqmJyWpWa16vgDBiFWK8Btskc3GENKJlrDGddI5pVcqnJtXDLVIyC0SKgwMQXKwdXT+irYgxD+UPVaZy6uNBCd69YTd7fG+8w71xN14b8MF3iS66Nove9mOtInO1KWB3NI7bGU3lh8b8hYj/tIz0tEm8tgdxAem7swPbS2hFleHF5cwKzQiLPTAyMDOZ2NXm117q11nr3tkbiRQjK+DDuagR5OxgznYMbqBpF5DXX+ZQUvIEUvOxv82ut8mso9IBU+XV2548SBWdrE1NIollAH74qB1Xq0V7pWZN7OjDyXHn7mo7TEs7ERJ6uKXHFDRSvTcNo8cml2iEnH85ZHZslNCHhGX3fWBLF1bXEEg6wqyHqTFH01Ieb0u3cXuzoCVxY6uWujo8hiaH0gidgmFc9LhMtCziRtvqe/Kz4z4XJ3sw97ZUwunBXRCexFJHuhfaQ3ITPuUrDn3jD3vRFeu1Ijj7TXudCmK8RsJJeB4TKIAg6Bsza2ttgzSXo/0Ovb0+mBw2YuL8DojP7FScgUOpcz36lXcoxGo8UEWHUag5wrZS+ImJMK/pxSOCPnkkR0DGthQLSCkK6hZPQRIQ3JXUYKVtEyFl7OJ6v4ZLNkTS+lKRWrm+tEs7wV3Ci1SYoAeZRdXm9RdVjVvXZpkYPno6c/NQtLjTyYhpWmXI6Wz15VLTzR0iNl1PNynLNq6LIc9YsMd2MTdU4JdZoK3b6Wfxo0doJajEMarV95rJt0kbSeY2YdwHvtmvD/fsj9U25rgIm/5NCsOxw2lWDIiInS4nLouVeAxR4QNKnmq1EvTrjt+STA6ZsXu76++83Hd7d+fH/7p/d/+OzaF/9+7fN/u7/1T15O39z99utfv/nE/dBXdY+OkYIvrCReX0u9s5b0iJ76aC3j2do7N2ZJILMijF4WRi8LoxUGLeYHjMc9r7h7OP3MlswzWyB3DjU/ce53vzzoe23Q90rHy5PtLs4Ivyvd3lewCS+WS8JpzdmC3goxskaAqBEO1goQNfyBKuEghAcvWoUlLlZHL1YlMvsgLPyAahFBqXnCWUN+QAhYDBaLym7XgQ7gf0L4h6NDh81ut9psVovNajFb7CaL3Khn6pRUlaRRxk1WsAqMnBEVc0jJxCiYOAUTu8keVbMxehbRQJ9SzraJyE0iClRIhompbevTPQICjD5UtYZ6P9eTsdiVQWmIQRf4YYuCUZmeiJQ3YwWhEzVx1Lq3g++9iU0Ji4jiNUw9DVMnwkHpo6Xk3qjRDpeBlgctlXdbG/yw6LKFWQydRmAxKRzeklDCZTBmKXjoaF86eiADO1I8N9XLWptZWyFPktvHR8vRg0V9ffnQpuCGald4cwyiPWd0ILu/NRiSf7sk52F/V/bsPJ4jlbAk4qkFEhJZMwDP64QFl+U+TAo6neBz9KOUpONpyWcG4Mk8OkUuXBOw8PSlYcHa3LponrtGxqHqED25S7N9Is7iNLGvotAjPvL826AzGclnuzp9VlfgIu4Ebri0oy5oZrJzQ8JkrRLJ+BJUT2Rx5o3kyHM90Fghe0bKn1icacUgk1HwoMbKR0mRp4PeOAV77o3yP5CZeHSwN4SzOiITTLOX4LSJega1ib08wGGOLM43YFFRI/DgaVIFi4nls8hrSwP0hW722ohKwQYsegdoAQC1SS2RCaalPLJCNKeT0fSKlQ3RtJgzvSlhGTQyrZyvEC2IVgeFq33rPIKMv6DgUVUMrJTZJ+TCtWutoOglwL9m4b0BpN4G2Qu7atysIemE5bqFx0rir3Kyi3XipgZ/gQ131pCvGqlP+T2PtJgn3I7T/x9bdxUVd7PlDz8zZ84cP+dxjyfEgBghBEIgCcFCIAnBJTgEd3d3t8bd3Rp3927a3b2bRps2fv+LZ2bWO2ve27r/rKratfe3eM0akPzbx4NatOF7nDZlWPg9+oAecAw6EZSKWF8AYqwU+YUzpk0seTRpf2XB+dZu3APubBFA2JKcHEgkQjFj9ZTeT+52YrbHiw9RAH6w3eV12J1vPe9e8nv8q+Wlb8yvf2Wh8OPbX/9lefu3dz//0+inf5he/eHDtV9efPOnd1d/8nxwrUT35ozLE0iEwV78J1iC2V6CFTrbCVvoDs91QeS5IrNd9xJsobG2YFutUq3r2RqXQEbKg56GY4Ef15Od4HleyPoYUlM8siRwI/HzSozlcoz1RpoLojiA2JhB7C7GDlQx5lqp4ArBGGivPJxQG0vuLd+sjJlIMB31ezXq82YxzQvZVLBYYU+BdUtkUilAkx+eyc7ZZ5ITQCwHgFMAkAPnMuD/3gn/O132XA6cy+QSkfD0iHZ2RBQdIQ6Fa0L+6D6zZZ9SdURqPiL081DgQ+zEAWVOgOsQIgZ5mPlD0iRnrY41m0eZraTNVxMmyyizFczFGtxIwV5XCrI7bb0pbq40aKM2cr7Ed7HMf7HMf6nIdzbToyXcojXKcqs9hbLUvD1WhV3oRI014UZqqUv1tK0e1GzNWmfYRJ1dTdGHCpDj8HDS3lofAjoG2ZtCYVcJRAgasw6Fz65s9W+sj+zuLqLQewQCjkTG4vGQ7a2JcXBTU21IS2No/0D6zELD8nr/4kLTYFd4Va5eaY5hT1f06hYYRyEQqMS1zbmRqc7Jpb7RsYKaCs+sKP0o18cXYmPUExNegocymKRtNmV3balusCd5YaqajFul4jZXp1pHB/LhO8NsKhKyNlRe4Bzs+czz80O/L0oV5Xa7Wz100tbcBKi5wnt9pY1HxxLQy2PD6aA862h/1Sh/tZ6WcAp+jU7Y3Fjo6m+Lqy2zSol+GuBxy8dJMdD9flzQs6JMvdmxRAp2hoiemRtLb691HGl1W5nNxiL7UbCmxYnw+dEgDLSJQ4ewadsE9AQeNkjGTAv5BPHZkUwuOjsT8GhIHHIMi+olYIbJmCkKbpKEGafiZgV8tFy6LzvbPxFgWcRZHnVZJMSfHbMPhAQRF0IlrOJxU1JGK0D0kBNM5MS3AOuLlGQHkLMEsEzetj19QJPfoYWtUNnN0lxLUh72ubqRrAhJU54JvMKu1kJmKmPyVFAFTxm1Twgt93FFSv0mV1DNRuID77PDSICxAFAjTpAvmUNv16IezzrdmHe8SKzUpyzknLIREonwTEgHmDtSRMfZZvUpbgIABLvNgY5X/+iu+Jun9i3jS3+1vPHDZ8VfTS79S/f7P+n/8Ld3v35l9Mu/DH/5p9ZX//n0H/+m+/O3Dgo/Fb+5Meuquhn8Chr7Hhb/aS/RApPlgM13g2U57KbZbyZYLYSYzPq/bbXXqLd6PPjl1VaKHb0pmtqeTOnOwXflUjuycbXxWFAYLMtzN9V5L8t1J8sNVuQDL4+gd+VSB4rpo5WsiRr+eOVmgR+s2JdSGTARrN1iq9Ruo9LjolVkolbnYzzf8IW0VQIAklMJW352IpHyJdJTQCYG5Ge/CwT+f2ozsv/pZJLLzsQiztEB5li4d7Q/v88eY1O6+OTWI2qbENvChbUJEH1HpFHuRhUfOsTHT9K36hFDaWhwGmo4jzQNIs9UkKZBpOny1eYYSEcSrCNxrzW+L/rTarH3YpHHQrHHWrX/ZnVQV9THApsnUbq3grUup5k/mSwOWKiLJ0zV7Lan14V87E+xny72RQ5lE2cLVrqDe0otW0ptwJ1hS5PV8zN1swstW5BxOGIVBd8kkVAUKhYBH9veHllZHdnYnITBl1CYpZ3tsbmZts7WxI6WhLHhwpXl1uWVttmp4oF235p8vaKMV7UVTsPg/IXVjtnZloG+sv7e8oX5nvWNqamxqtpi96TA5xfiE5/FJ2j098YRUUsE5OLIQEpZoXVvaygaNk3Db6zPtP8PQvjWSGWJs6/LYwfTOw7mV/OyrXY2Bmhk6PJcY1t92OZKO5eO5jFhkPW6umKnEI+HEX4qg53RVMLqPgvFwGxCltsG2v3T4p6G+d6JClCJ9LufHKEByn+3NJ1Jx6+S0fNz46kd9fbDrW6r0zlYeD9mr3V5MnZlOoaMHhCwcGzaNhkzTYCPkNAzfA5WdHogk56engp45C30Xi8a0U7Cj1OJyxT8LAExQEL2MVlrYjFfenbA5yLImCkOZUt0xBSJuDweRUjfOeBtHrHxZ9RM5ra2nJ4CsOtkqETigBa14xm8XHk59cZY8I/jgWp9/ndW41XnIq8thyt3WvzaZHSjTu9Wt811sPvtucDr20mP4AlqnFYVZplq7fNv4e3agLRDzEsCeHEHSPsjmNnhoiEqWw0Rc3XbV4XZZU+ZKweEbPkx9/gQe0IalsDrhLBJ4Igj40IWo4yjHn7neP0Hqxs/BKh87/dQ4dP1719+9e/6P/5F97u/fLj6o873f9P46k9P/vpvT/7xR52fv7W+9n2J7q15d7V1/xfQ6Hfw2A+7iZ8QabbITHtIsvVWouVmgtVqnPlavMVWmvl2lj2m0p/SFMPqTqE1R1PrQrBlHrBst4WIjwshJuNeOkuhJqhM5+00u90sJ1ixL74qFFMVhqpPJA+UM4crNgt9lhItlhNtliNejji9GHR/PRZsOOJvXO/yZCrXHDnte35KFctOxJJjsfjgXHoMyA/lMsn/Qfh/a6QyufzkTEQ/PIAfCLYOOENCRv8BdeCEOnyEG+BC2wV7bSJcP3O1ULBVx4OCWbtNqP5Q8mg2ZaGMt1ZLmq0gzYIwo4Ww/gz0UCa6NwXRHj9b4D4aaw5OtFwu8VyvCVirCZrId6vzN4zQuxH1WjHr49Po1wqlzjrlXkaD6W7bDVGFzs+afA1HEiymS75AhnPxi1VbPXGLbaGbk1mbCy2ri63rm0Mo7CqZDKdT8FwOi8PhoBHDCwv14xOg2bn6+YWmifGq8bHq+enG6fHa4b6izuaUxprwhhq/xhq3irwP2ZFqicFPMuL1QKWOVRXuhXnWaQkmxdmu44OlG9sruzsTg12JeSmGF/KLtTLzNPr6w3CoKSp+ZWw4PS/DpLnGHQ4ZoeCWlyfr+7tSfx/tQ0NHGqrdQn1Uvtjed7O9U5xrD90ao5MRO2u94N4s2E4viwJjkra2lqtAOXZe9ncC3BX7O0Ip+BUBE0ZBzewsV/e1eCVHqYb7KUb6P06LfZweq1qep7M0ncYkbnJIMBy0F75aiVitx+4OkFBzWPjg9mr53kYVlTDHphHopHUyZpqMmiCiptkM+PExTyY9PT0S8EireHg/mTAl4OJOhPwDNo6CHsVBGmm02dNj1ukRj0ldxcH6WISlAx6ay4Fz6FNs3KSAjTjmwU+YPme4CIA5xIF+orc/ZXXf38m/j2swFo47nG2aABhfAOcH8JOlVDsA/ZE39gxZqjzkfr3gxTcpijcajS5P+d2ExSizQI8IaQq9Jhc5M47AUQvA7RZTQ08w7gApiD2hgsm7A49Q3A2+w+hw4UF7AQEBOGOeHWLk+C45sk12RJOITwDe3mqsZujTn+xv/OT35GLi6xtOD37W++mrV9/858cr3+v+8PfXP3yl/KcLSn++oPyXf3vw5wva3//L4vI3+S+vzbg82QjQ3IsxQid9gqVaItKtYSnWuwnm0BQbeLYjosAdU+YNK/JBFfsQK4LwJX7QdNcRH6PKTyrJWldeXv1B+6e/W93+2Vnh6wiVHzs/ay6GGK9HvV9JtFmLNd9MsILk+eFbCtgj9ZjahE43zSFfw9kA3dUgc1ShP7E9EteRgmiKmy1w3+15R4e1AYDoRHIkkRwCUiEgFZ4DEuBc8n8Q/i+NcrlULhNJxbzTY+KxEH7InRJQh48o4FPSmAA1uI/sP0T3CSDN+ytFB8gh8lIRfiSONV8k2KjnrNRjJjMRw9mslRrcWN5aUzi8K36rLnSnJqgn6n2zj/5Utst0sedSTchgtqvfq6vuT37xUL3orXopQutWwpt7CfpKGebPCp3f9CbY1QXoxb5VrPDRXWuMRs9UMbf7qKsdG8P5kIUqPGKSTtlh8QhcIfvgSHB8sn94xKWziLCd/nFw8WB/+uRE3hg4t68nfag/d2K0ZHKidmyotL0+pjzfsSjnQ1bSq7gAlXBXpWAHpRDnxxFe6knh2gUZ+unJOolx+nW1AZPzbatrHQPdSbkpRhdA1fp5JVpdPX4YxBiduDY+kpGZrFtdZgXd6aMRFpcmK9ubw1cWahjkDQxsqLnOIzrsSVTA83A/tfICu521fiYZjtgdnQZXwLf7WaQ9xO5oR2NIfPArT7vbod4P+zuC6aQtGnFuZjSzpsQ2M0E7JvhxfLBaTMDT9NhnqdFPirNezI1FUbGLXDKSgpgk7PRhoe14eD8eNU7BzVMJc1T8Ap26SadBaaQVBnGBRVggo+cZ1N2jI6ZUenR8wGNg5vGwQQZ58WifJjk+PhWQmbhJIqyVRV2WHHHFQjabNIeHNjHRQ2zSDJU4hod18mgz+/t84eH6KccfoEXIMLasqevE5iuHyy+lGHeAnS/Bu59gHeScLzJelJzTfEqK4qzaCeaMyO1qjFZNdueLnVyVTrNr7Va/jdnchsUo7YRcHLW7LYLaSQ6iAX43wE0+JViL0BanCzr0ilvL7vd3QlUQlVZcGuxceiiRCMWs9ZPJMMpYDiA9BM7FgBA56vPY9d63Lg9u+qtd9X30wyeFf77+7u8fLn9nf/s3k4vfqP/rL7f/+Ic7f/rjjT9cePy3P7z+6Rt7hZ/zX16bdVXdi3iDSvxAyrSBp1khM2zgqTawNBtkthO60A1b6o0G+SCzXbcT7Sf8TAre3HP85T91/njB6Nu/2t2+9vjXrw1uX44weZlo+Mzv3nfpGhe7rJ722z4d8tCZ8noz72+4HP15PT8a21KKrU2rMFMJefKL461v7W9+nWqksljkxZmp4sy2onqjtlo0ocN+ZwK4RCY6E3MB6f65+OT8/PRcLgbOJcC55P+8VUjP/2f2RS49l57KzviSY8YRb1dIXTgiTxwSwVzkgAAzfIDpZ201CGFd3I0q9EAAc66QvdlBmMymT+bCR7PZi+XQ7oTFmoDt5ojdprDNKt/JNBuQ89Pe8A/jGQ5zpV5zpd4JJop2N/4U9PRyst6jXLOneaYPSz6ppOnfKTB7lm32tNRRq9RBPURHIcX2eWnQu45kO8RA/gFiArfRuzVTBV1rY9B2jk6EhyLpoUhyLD7iHTLwVPjOWu/UWOnYSMboSGpvV9zQQNbURDF4OLeuPqSlMbK/PXm0P627NaQo2ywx5EWCv3qMx+OQz8qBNvfjfZ9XF9vU1rgWl7s1diSMTJZOT1cNdiYXppteKAO9z8593dzkhYKOUvErY8Op2Rm69dXm2xtdTMrS5mJta1PA/EwpnbSOggw3Vnslxb3KTbXISTIuybVcnmlgELcQO8NjfUXbK50sMgS61Vtf5ZoU/irK92li5POR3nASeg2PBHe1+seEqAR53okJeJoa8SohWDPaTz0xSL0wXXsGHE7CjDOJq/DN5mVw9tS4z9Js9M5aCR45yCCtUgmrJOICmTxDxs8yiAsc0hIZM0slbwoPyBKJ8HCfQ8fOoqA9ePQIi7LKZ0K49CUyegi/18em7EgOOCI+lYUdxW2WE3cqyXstFGQ7mz5/doiTnUrkwkWAEg9QkkSEz2LUO4Dqf4D3PONHnFHDAVooQCvgQqI5kDj2gCW+WRVVpUxpUIUV3UeVqzL6HnHGVciFT9Zi7rcb3h21vbPidXvG57qUpAccZkn5/ic0yzO8xynM+HBci5x3Z8VXccT5IX0gSHRAB854ouN9MRdytJwlIi4B5xLggECba+530vF+cPPjpW+tb/zieOvrDz/+3fiXfznc+sFL8Rd3xUs63/5d6Y9/VPzLn+798d9V//YfOj9+46DwS5721VlX1b0oA3jCR1y6NTLDBpVhj8iwQ2Y7ofNdUQXuiAJ3WJ7rToRhj8393Be/xj7+Ie7p5Sy9R3X2+j3e5j1BH3oDTYcCPvW7G9V/UmsyVe231+63f9FtrTbsqDnh/noh3Go1LWCnOJFQnzsX5x7z+v7bKz8++e6Pr7/9o/Odb6czPLlTlZttn3aatSAdJuTNIuD8RCxinUsEgFQil+6fy8W/OzwHJP8b4f+s/D7jJAGkonPR/uk+TsTcOiaM7aP7uOh+LnqQj+w5hHfyIe2k8Wj6VDZ/vQ42kIwZz8BNpTEmCpDdMVNFzrtNIeiO6MVit56Id5VOTysdVIdDDXvCDTYrvownm+eb3KmzeDrk82ExwW0h3WE7z20h0Xoy0mIwzKwnyHQo0qzF802c3rVAneve2hdjDa8lfrjdluxEXmlBTYOWR9OQ2910Boon3BccHvAPuQweCUeBba91TozmgQeThvpj21ui+nszwOCC7p7UomLr4kKnnvaM1YXulfmusaHi1lrforR3SUFPIlyUIuwfJnppFaSYNdSHDI2B1rbH17fBm2sjM6OVdSDXC0WFJhkZWpUVjtCtPipubX6mtKric3ubx97OCJu6sbva2NrkNzNZRCNu4mEL4N6s5oaQgfb01pqg8gK76dFSCnYOttEF7sqGLPcxCVvbq01Vpdbxoc+i/VUTI58PdYeSMetU3OzceH5lgW1h+ru8JIOUCK1of9XQLyoJgRql2XpLU3F03ASNMLk6n97X4thco9PV9GG0x215KnFzuXRrtQYJ7SKgBwnoCTJmmomdI6KmqcRl/j7mTMw9EDCp+CkkpBsD6yNhxsnoITyiDQ1tI8BH+WyC+IR3xMNRMYPo9QL0Wg52o5yO6tpnYs7POIAUENHBxwhrCSlATKuXkBJO0Y6n1BQJt/SUkC7Y9DrctOOOmyJr7mHL72MKFXfiH+7GPdiOfjDjfRuSorSXqUjMf0xvfDzv/0vNy2tV2j9PBSgATHcpJ/SIa3lOyweYRWfQd9SmR9uhylOuCjMhioKthvND1AljCjhjio/PANEJIAdEQpIM28xd6c79+ODV13/9dPlfVne/sr17+fPt77zv/xbx+JfEp79EPb748ae/q/35P9T/8Vf1v/1R/W//pvfTNw43fyzTv7Xh/xKZYIxMtcBl2eNynLC5TogcJ2S+CzzfbS/XBZ7jCk13XIw2nwt6N+vzZtnnzXqAwW6MGT7Pi14VQW3NITdmwgojF2Ndx/0t+l30+xy1h91f91irDjo+H/N6sxxttZ7usZrus1sUi6rO6vP5WGSplvFBLVjjltPtr2L0lHaawmbqDdYbX8AatCCDpsAJVS7mS8V8uUwEnAn/vwh/b+L9L4eA5L/j8+TncjEgPwWkQrmIe8rfPSJPcSBt3J1WIWZYgAFzoe2C7VreQhZ6OIq7WoceTMT2h1Fn8jY6QrYqXCczLZZKnTAdEfP5n3ujjBq8tascn3Z4v+70eTGV8mm7whMcY9LrpbMaZ0+qi6F1ZVF7svGtSbimBHxrCrwhCVIXv1sZsV0e2OH1KkzrUpS+Uq3ve9CXN+k2Ku1xVoTRot2RlJ0pEAY6QaXskiibFPo6jbFLpEA212p6usOaGtx7OoOHBzKmxisnJ6p7+3LbWqM625Mmx+t3dhbQWAQWt7221NBe652fZpQcpBXn8iTR42lKyCtQicfsdDMGtYmnoklEzNpiX1Od/4X62k9Fha9A5ZYby+10wjYaNjI7lb+2VE5AL3Oou9vLDU31vhPgAip+h0tG4aBjCOgwandqfrSkrvzL5FAeFj4MWWuaGciDrgzScRvLc6CcdN0gzzvh3g+SojQHOoOpuHU2eZsAG4OtNuwsFAy0eKZFvwj+ci/U61584OPyXN21uSQadhwN65kY8m+oMKgt1Kkv0Gkrf9vfYjHYZT8JDoGuV5L2BomYcSJqgo6eIaKmqcRFAR91KmIL+TQyHoyF9zPxnjbZugAAIABJREFU8zzSOhkxgtxtwOy1s8hLh4cciUjA5yKIyAHkRgFyJQOzXsbBjMiEFJlYKALE7P1mESNbTM6SU6LOdtUBegHAauZsWrOHzAntt2jD97ANyoQSZWjy/eXQi/MB11bDr+7GPhpyuQXPfLqXcw+WpoQC3WSAHo47qcRf+6nmvaKMYgUc2Mn4hVJGlJhkwp3TIFUrUjPVtiNuU2tMD0kw4ORIImLJzw6Bc+AckEqlB2f7q/sNthWumuFql92VLkfe/TpC8ZegBxfDnlxOfH6tSOdm/dvbmc9+c7v+relv33+8+OPLv/5B8x9/MPjpa7tr39UYK+2FGyDiTeDJFvA0K0y6AzrbCZbjCCtwgxW47eW6onLdkVnuu2lu0DQPWIY3NNV7K8F9K8ltJ9MLkuezl+61Eeu0EeuyFG477mMyFWAyGWA46KENdtIc93g9G2I8H/lxNcl2Pd1jNTsYXV+Irsse9tXZjXPcyfzSE/a+wfPNWNLrhQL1hWp1aMWz7Y4HYtY2cH4qEQmlciEgPv7fCKX/y+F/IZTK5Sfnsn25hC0+JnGJwzxkx+Fe8zGsU4ga2UeN8HdbWIuFu3UO5LF03GgsYjCGNJlJ6A6Zz/i02egKqXLbqnAdjH/bEarT6KPV6vu6zPZRmdWjRk+tTZD3WoVvf/TH0UgzckMCuTeXMFpMHm2ijtVTRmtx4GrafDtxop4110QdLSXWRoCsNSyufaV3+dswE9XmkHft4SY9SY5brUkrHdnwpU4cEgzZbYJCGtHoQQR8bHklp6/fr6XZqa8naG6qbGejb3t7aHGlY22xH7oFRqIX8FQ4lcekMMkwyPTyJAg8kN5dGVQS+S7F83G0p2J6jF5/Wxp0eRRDRlPplJXlofq6wAsri6CerojKCqf52TwacYZGWCVhFgmoaTpxjYSemh7JAxU4dzdFYCB9DNI6FQ+h4ncouOW1xZq2Or/eFr+lifSZobTh9qSFyVrIRiu4LzEhUtfL6Z6f273kyOdNlZY7a+0E2BgBNoHZ6UVu1k72R6VGv/RxuBPo8jTK73F+uubkoC8RVgNZKmqv+1yUrVGRp1WRp1ldoNlY9rKt+h24xwu6AiLAh3CwXgp6nIlfpGPnSegpHmvr5JjE5RLpmGkSZpTPhR0KaQzKGgbRSkINHjMJIsmB9GxfyNojwbpw0Fo8vBUPaaWjOs9YrJMz5vn5+SGzTIIMOEfYCaFGIpI9wCwE8LHCDfOjHTsxzIm57nK87MKaMuSP6zEGjPAN6rhiZWT2/fnYe2N+t5f9bu8EK2OS7xMyb60GKEbf+CXf5GeAbirnuEu44TKGL4B1Fy6/J+S8QMTe3El8xFssYmFmANExcLwPyHgy6akUAM4OURJsFzTSvNFLv8zyme+9n5LeXEpWu5So9mvCo+tRar+2v7+dp3W7UvtqvMp3Tnd/Dlb8zuSbf2j/7Y/Pvvqr081vez/e2Q56AU+2gCaYI5LeITPtUVmf91Kt91Jt4ZlOsGw3RL43LN8HlfsFkeOJzPdHFQUjC8KQBWGI/FBoZsBOivdOivdmgudKlMt8qP1KlONylO2Il9Gom/acn8GMn+FShNlKksNq2pft7EBceRJhqGa7JHE61B5Z4MDqzqIN1zeGv24JVe0MVx0LuTYSo3hK2zwFjkRiLiA9EEuFgPQQkBwD0jNA/nsgkPz3bRA4l55LRIBcAshl5+JTQCw8P8Lv0xb5qE7eXicf0i5AtR/genmQFv5SAarFcaPJmTgagxqMo41mkDqiphM+Qsvdtis85lJMWrweN395PJ3wsc3zZZWtarHpvWq7h/0Bb5bqvBbyPk8Gvp1K/UzszSJ1F5Km6qlj9eSxOvJkA22+nbnSx1obYq4OMlcHyVOVu5VBlbbPPv76p7e/fOupcach7BO4zG2pJRI6ULk5WLI9lTYPjpgFB28tJ0JWc9ZXY8BDPkP9nsPDfhNjqdtb/Vj0FhYLIZEQLBZJIBBwOBwybQ+B6l9dq11ZbITszK4utDSXemUEa6V4qyb7aJQnmYPbo9dXpiHIjZmFtjqQ3wXYbuNgX1Rhvllbs//aYg1sqw+62bWxXLc2Vz09nF1d5JQU/qokw2y8N3F1tmptvmV1vm19sWFsMKm21K6q0Ky60Lo43bwy16m7PqKrPrgi1zo+RCvM80mgs2Kou3Je3OvmSru+Zr/exoD2Ss/GYrvipLdhbg98rW/5fb4X5aOYHa/aVP5+vMtvpNW7ocSkPEejPFu9PF29MutFTe7LquyXXTUWG7OJqK2yrbVsFLSOjh9jERYo2Dk2ffPokMAXEOioJRph+VBIPjs+4DORBHQ/ATEgoGFEZ0LJKUfI2CLBuujoXh5pnI7upyBa9hkrYglLLD445/aJEE78FSOAFAWwBw/4CdKDaelhq5hTJmAUibDh54JGGcMboCUClFQp5ZMYY3cCc9jf0eXNWLP6jRhNqpTKm+iM2yM2Cun3funzegTQnaQ8H4BdIt9vO6Qa8cEaiCw1WPj30FRl5mKFkLZ5Jtk/kwPyc0ACSCQyEUBeJha/r9K/7vn4+8/X/pGgcq1K727p82spT34LeXwxR+Vaker30Q9+6nmv2Gqk5HP/RpjKDf1//OvZn/5T5e9/9VK6NGz1aCdIG5Zkjky2Rqe+30u1hqfbQpIt91JtYRmOe1muiHxvZJE/ttAPWeCHLAxAF4fBC8NgBWGI/DB4XigqPxySEbCTFrCe6L0R/2U72Wsl+vNMsNlsqOlUwLsxH4OZkPfz0ZYrKc5rqV+2Mv128kKpvWWQ6pTVbHdie8H+KrjYT63G9VJr1KOZjJsL+U8Ji5HAOU9+LpSesc9Pj88lB4DsCJCdnEuPz6WncpkIAEQAcAbITgH56fn5qUx2LBcLgTPWGR/Cxo7sIzs50CYerEWA6ODuNnLXS4iDoSvFpsT+EPJQFLYvZgPk1hHwvMPn6Xqu5VCMXov38wYP1aEo3cl444EQg1wThVILxYFA3dGId+v1PuPxH0c8dddLfPD9ufSBMhy4ijZeTxmvI0820GZbmEtd7OU+5kofc6WPOd/GHClB1ETlmKm/v/zP99e/8n1zp9DXcKjACzZYiJoALfbEDTa7tdc6Tg/Hrk7nzM9ET4DDJ0ZDBga8e3uDZmerUMh5Cm2HSkcJ9pkHR4csFgeJWp1dKB8aSpwYzdraGlycrWyr8ixJ1C+OfVMSa1gS974s0ayxJLCrMbGtKrQmw/pCf2soKN8qOlg1PuxFabZNS4V/S6VvQ7lrc4VLdb5VesSLGJ+HqaEaZekfGkpdmit8utujB7oi2+tcKws/1OSbFKXop4ZoFSe+byxyqMmzLEzUSw3VSA3UTPTViPN8khGsWZquWZWrV5z4KiNEPdbzfpTrvUjHe5EOSnE+SlmRT0pTNGtzddvLP3ZXfeqsNO6oNKzL0yxNVitP1gIlvyyMfVqbrQ1usZzssO/rtJ4dDYNv1VAxEzTcEpsGORDg+VwcHbPIoqyfHDEkosMDLpaCBxPQg3zG3umpQHxE51PXybABDnHulAPlk2ZJsCYWcVZ0enB6RAEEVUcQU+LcPTk9SiZIkHOSRJxEOXsE4HaIiDYAKUyM0z7BG/AI2mKqlZRhBnCjAF7pOSHqcMWRDdbZXzIRTukxWtTWIu8nKf1QZnELYCQCx/0ALfSYHb9PccDWqGylqsH8n2AztGH1HgCfLJWdis8B4FwOAEcSKR9gLOIzdTKf/+Sp+L31b1+Xat9p0blXo3U9T+Vy9JMfB98/AFso1Rnf2XJ9sOmp4XX3u6CHv9pf++nVP7969Jc/BTy6Om7/dCfkJSTeFJlsjUo3gyRbQ1OsIMnW8HR7ZLYLItcDXeSHB4Xiy4LQJYHo4hBUSTiiJAJWGI4oikCVRMELIqG5YajiOHhBNDQrZCfNbznacSPecSnSejb402zwx4Vg05mgD2txtgsxNlMR5iuxdqiqROZYA2OuCTPUegZdmSl1Goh7sNGgu9ush+3VhfW8PECDALFQJhYCZ/viU75UzJdJBDIJ/1y2D5wfAvIDmVgInAnPZUKpTCCR8mViluQQe0Rb4KF79/ea6BvlR7gO9mYdc6GANRm1WvYR0+JJaA2YTDOFVn/pC3tV56w4GvlyOtGo/otq2rtbIIcnvSFvJhPfN7o9TX97eTjUcDnNZiDccL3iS5/P60l/o73acGxfDn2wnDBUSRqpJg5XEcHV1Il62kwzfa6VMd/BXOhkzfdSx+o4Y+Xrxf4hr25qfHXB6PrX5oo/+Ogo5Hu9hA1kw0fzJ1q9e+tc54Yyt2arV6aLVmeKV2ZyJ8CRI8PRS0u1MMQ0lriKJ++xeeT9AwGDQduDzYNHs9vbg0aGEiYnqsFDWS21XxqKLHsrHMcbffrLXMpj36X6qCT5aKT4aJZHGF6I99eM9VMLcbsX6q6YGPS8OPl9ecbHypz31TkfylMMs8I104OfpQU+Sw3SyInWz4szKs6xqCiwLM40yk98WZL6Oi9GKyVQvSDGsCbHrCLTuCjpTU6kVla4dmbwq/SgF7kRr1qKLIcbPDpL7SpTjHLCNDP8n2b6P80OfJYT/qQoVqMy9XVDrl57qWFfhfFQjSm43rKt6FVF8rPKRK3a1NdViWr16WqdhdpteZotlQbD7Y4b02kkaCcdM82hbB3xcIc8Apuyymfvik5YktOjIz6ZQVyg4maEbOTRseDkgM6hrpFRE1zq7pmQvs/cpWC7GfjJw32CWMiUstNOkGYnKHOAm3vMiwEEtSJSuJhaLuOkijGuADsSwBkD1DKAkSGGv5Mh3smx/qxFN3SHNrrpAaHtBaz1AbpZjdSkeNjzeNz/Zqf/DYDuKuFHAqyUM4IzQCoUjpjBsu9u+FxfC1WYD9FkLPcDRzz5uVh2Lj6TiOQnpNN10EqAarrW5VClX77c+rXWQKFdT7H42S/1mgqd72/QMz/Q4o2nrB9u2V5Dh78Mf/JT5OMfE1UvOV39Vf+rP8Q+/m3K7gk0XAcS+3EvwQqabgVNsoYkWu0mWP5+HEVkuyILfHDlQXhQKLY0BF0Whi6PRJZFIcui0WUxGFAMvCgKWhCFqkhBVaRA8yN3MwN2U70QGV6rIWZDji8HPmuNu+pOeRgsBpnNR1guJztCcjwoTVnE/grWai9re06E2EL3pswW6iyVqi+Wv4R3qMObn6H69Y8J3YDsUCzjnkuP5ZIDmYQvk3DPpbxzieBcsi8XCwDJoVwskEjZYilDdIgT0tf46CEBooO3UcrcLKOtl3HXyxijMfA6a1SDLazeqT/85XaJw1y6aXeAxlCY9kqWWbG1Yozu5SgdhWLbp13Bb4Yi9Ystblc7PF7OsAVHvh2Jfbea79jlpLGd7AhrisUM5VMGQdSRWuJIBWEYRBgGEYeryOAa8lgtdaKeMtXAmukkjDexpxpYQ3nd4ZY6P/+n0Y2fbJUvW97+Lsrkbn+mM368eKk9DNzkvTCUBVtuR28No7fAW/NNE0Opk6MZO5vdWPQ6FgvBkaBUJoonpHB4ZDxuZWmpdmI8d3G2cmGuY3aqaqgntq/ZZ6Y3eHMkZr7JtynFJMP7UfjnO/6Wt1M8NS6kBGunh71MCX6eGPAsNUSzIF6/IEG3KOlNcYJBVtirWM8nkS6PAu0V/azvhTg/DndTiwrUSAh9ER+sHuX1IMJNMdT5ToTrg7Qg7bx4g8Qg9Tj/JymhGqkhWjHeqtFej9PCNFpKnef6osEt/rXZn7JCteI9H8a4Kyd6P0oNeJQW8KQw8kVtml5T7pv6LO3GrDetuUaN2doVierVKZrNOa/bcl+2Zmu2ZGg2pb5oL9IbrPs01+e5M5eMWK8gwPq45GUebYdJWuQydg+F1NMD/gmPzqft8Wl7p/v0U9H+6TGTx4QwKGv7XKLoSCjk4xiUKTqhj8vZlPDpxzQvMfk1QK8DBJ1nApCIaS+i+QJs0Dk7Vs5dAFiJYn6GjOp3iAk9g5uKtvRok6+JYE1qvzauVZM0/BhXpU6oV6a1PTgaVme1PUfUKB1uaAF0R4DfCrAC+PPaxJ6nk74KW6G3oPGKG7lmtL05QMyTyoVS+SFwQJFBu/DljsNWDxK1bkY8uuSj+FOd0ZU+/Xu1Ly5uOr9GhWuQMwygX9RH3yqO6P02/1k1Q+VKvtqVWsN7Wc+uB935Z4XO1UVnNXicETzZAp5kB8tyQmU47CXb7CZYQlNs4JlOsEznvVx3VKEvtiwYUx6KAUWgK6KwlXG4qnhsZRwGFIOvTECUJ6AqUwn1uejyxL2cYEiyx2KQWaPxnYb3dzts1QZdXk/5mmwmOG1mee1VRpKbkzjgKuZYLXeqhbMxJiTu8Hd7eqKe9YcpzWUrL5eq7NVro5u1MUMGUs7k6fm+RCSQiASy/7YnFfHORfuA5BAQH0lFPOkZXXKKP2Jv8/GTAngXf7uWuZTOWC7irJXCuvwI7a74BvudErPJDP3pzPeEZt/pROMuX40WH7UmrxcRr6/6PL0YpHk12fhus7dWnZtKq6fGRKzJaJRRf/Cb2XSL6TjTPtcXqOIAdGcacbSMCq6ijNZRJmpIY1XEkQrSEIg0UE4YKMMPlROGQQRwBX6skTHVyhoohVcnfnl+5/k3/+H98qGVwvcOyj92xlhB22J3uhKbciwGGvzmhopha8PYnZndxZ6x/uyR/rTNlQ4ydodJwREIUAxuhUxeI+DXoLtjmxu9kJ1xLHKbgIXB96anxop624JHWn2n2vxGqpxb002KQ3RT3J8EW98Jc3p8ISfKIC/mbVrI6zgfjWhPtThf9QiPRxEeDyI91CLcnwU7qXhbKdu/u2atf8XR5Ja72X0P27s+n5WDXR4HOd73sb3tbXMr1PVhQoBmSrhOkNtDH4c7QW73wzxVA10f+jsrRvk8KM3+0NPo2lBmkR6pGeamHGh/z8dKIfjz3TCne9HuDzKDNUDJb6rSdIpjnmUFPc4MVM0Pf5QdrFwY+agmTaM1X7s1R7s6Xh0UqQ6Ke1SfrdEB0hvpsF+aiIVtVhORgwT4CBbRh0OPEAmzNNIKg7jExM9zqCtC3t7RAUXIx/EY2zzW1tEhSXy6f3rIEHC22KSFAy5WKmCdMRIlNBuAXiBjN4v2k8/ZlgDbDmDGSRkB5/sVEnalXBAlIlucc7JOsZYyxAfRtvHR5mvRpsHBquHRjp5800iy/eF02+x45y2At5GjPxzDteR4l1O2+z7N5Wz7Oa1HZ9hVYfaLwkqoCmur9+yAK5PwT08FEgHlDNKCLTafclepMbnt++BnL+VfHe/8E/TmyvRbxVH96/s59sw8fWiA0rbb42X7ZwNvrw0YKXToKrbpKfTaKI5YqnZaPph119wN0ttLNN1LtoLGWm0n26EznWEpttAk671UW0SWMzLHDZHrgSr0RZf4Y0Gh2MpwTGUkvibu94gnDCgCXxWPq0rA1aVT2goJ1Wmw7KD1CJuOT48bP9zp99CaiTVfTnXayfHBV8ViGxMJPZmM4WLWSOX+eKVgsp6/NcJBLp8g5voS9YaC784n35/NeLpZ/XIb9BBaqUBadJaIUOdSnuyMJxXxZGf7crFQdrYvO9uXnfHlp0K5iC07JYgEkAPyzBFu8HCvibVSyFhM4a0UEodiUK0ulHan2WTd6SQ9SJU1vtN3s8Sux1+zwvZeh/+rPOsHwVpXAjUU/NR/CtH+aTjaZD3HvsNLazBYfyBEdyRSHxxn1O3zcirEBFUVThzMJ4FBjMlG0nQjebqBMl5HGqkmDZQTekuwPQXY3kJ8fzF2uAA/WkMeaaT1V1G7i0qcjZT/cMHo5g/JH15Y3/ou01p1tcpvpy1urjmoNte8uy50fqIWtgmGLPeN9Wf3tEaMDxXurg9h9hY2lwaW5xp31jtg2yM762DE3jyVihVwD48Ojgm4neH+3OIcq7wkg7Jkw+o045oko9oYk8KAF5l+6nmxhhfi/F7E+70McXnma/foi6WSh8U9F9Obzh8VHD/e8rBW8nVU8bBRtjG+ZqZ/yUzvmtXb2zZGVx0+KHhYKHpZK/va3Q9yexTu8yTS/0m0n0boFxV/Z+UvNnc9rJW87R962yt5f74b/OVharRWUrhaoNtdb9s7Ptb3PUxve1vc9ba+HeamnBqkVpL0uiHvXU3m29wI9QRvpRTvuyneihkBD3Mjn4BS1WszXpTFPSsKUy2MfNCQ96q33nxyMHBnpZyEGWVRlyn4WRpulIgZx6FHcahB7F4Pfq+XjB4m40cZpGUWfoWBm2NTF/a524f7BJGQdMjZ45G3DngoKW//nDV2TsuRcH3l3HoZv1zKDJMyYiS8OLGwSMxOOxPOA7xUQFB6TIoDmCUAKekc6wwQ3c6QvscwdwBvI6ZZAPR8gFEppntLSF9ESM8TlDEPoivYMjrDexwu6VIatAe87vXaKOILLbGT+aTJhhMmRiQBxEImazwDk6G3GaTRaHbjy/2fLa9/a3/r26Snl6GuL5Y+3uTlfsBFv9qxV9hxfbjwWXng7aUxi7vYeNNZD7VJJ6VF9xdzvq82wt5C4yy2Uq1haXaoeGtY6mdYij0k0QaSaLWXbIPMcELmuMFz3FFF3qhiPzwoGFcRhq0Mx1VH46uicZVR2MpwXEUkvioeX59GasrGVMQhsv3WQkx7TZXnA002U51QNeHsnuz97pz9tkx2axq3L5c5VsYdBnFHigXzrcJdMH9rVg5fm690mki8t5rxfKNAa6fm1WrpLWy1GqxJlbeTBMjpgJwNSPnyU55UJJCLhXIxXyrmSEVcmYgqOYAeUWf2UT1CSANnvYA2m0iZy+ItZhB7vLENdqt5RjNphlsl1shaF1ijx1CUbv3n++1uzzp8tCtc1GL0rnqp/BBpcKk3ymghy7bRRS1N97dOT+2RcIPBsDcDoTrDgW9289zRzbHEwXzKcDl9qpGw0EKabiRN1P8PQnxPIa63ED9QiBssIgyUEfpA5P4KTGt6R4jZi68vKP3t31PM1aMMlGON7oyk2cC7YpdawlsKHXobfOem6pC706id6fmx8t6WqIH2xJkR0OJ4/VhX5nB7wvxoMWxtGA9fZ9LR+4fcw1PR/oEQgVxpb41PjtGN9HuYEqJemviuKt28MeljQ8LbriK74faIC85mCi5mdy0Nrpm9uWqme9nS4JqlwTUL/as27687mN1y/6zsbHPX3vyWzcdbHw2umby5aqZ7+fO7W44mdxxNbnlYKwV7qIT6qPi43/G2Uwhxux/m/tjT6p6jyS1HkztO7287f1Rw/HTX1+lRoOsDD8ubTiY3XT8oOr9T+GJ618dOMcLzYXKISkGiVleFNbjZvaXQLC9avTDiWVGUVmH0q6ww9axwleL4p2UJqiVxqvU5+lNd7jsLacjtRhJmVsjBiU/Yp0c0CZ9+wqEJWVg+fZdDWGRjFliEJSp+gYEGs1DTDOQ4EztMJYzS8Asc4hYHu8zAjVLJo3w69JRRLmJ9ETPS5LwqOT8LYGXJ91PPOO3n+x1iQSHArD/nF53SXMTcJhkLzyeXHJATxcwCITNWRCkCKMESho+E7iujhZ9hbY62DY5X9E83XnKmnnP6Ncktr2C19xei7+brKjWZ34QUGC6nGiB7o+RCphgAzgXwvRInaIjaoo9amZHil4e/fPjtOyeFS5+++sOmv9aa021K6huIzZON9/eXLR/PfVKaeHd7zOoho8prM/b9zpfXa/76c4F6iyFGW0n2q2mf91LskbHmqBQ7RJoDLMUenmqHSLNHZTqjct1/R4gp8cWDgvGV4biqCFxVBKYiDFMRRqiKoFRHk2oTKM0ZxMYMfFU8Nj9gNdCk31QJEuXArI6nNacupbo322g3mjxu/qTaYK4ym+zEmaykTZfRx+p4C73stUkZYmOrxq0v9s5GkSqkVH2p8OlO9XNM/QNSvTah/RmDNHuyDwdkHEB+IBcL5WKBTMqWSugnx5RTIeKQPr+P6eXt1tEXc8lTcbS5GMF2Na7PD1HzCVryaSnTGNPktpRnulX8ebfapcP3eburWsvnx22ezyqcHoa9/LbaWWM807o95E2Ni0qSzk/1DmqzcRYLyZZjUfrzyabQXEdKUxShJx3Xm8scrSFP1uNW2igLrZTpJupYHWWoijxQTuwrJvQXEwaLcINl+J5CyiAI11tI6smaTHUwvflP5b//zU39xzTrx1lWql1RH1drvNfa4iabYvubveZnugjIHSYBjd4eXZooWxgpWp+sXZuom+iI7an266uLnR9uRmwtM6gYjpDCO+Vy9tlo/PIoOKM0/2NG7IvCJP2aXJuaHMeyeMOOfIvJzrDJsfwL9nq3jTV+favxi+mba+b6V60Mrzq8u+ZqfM3q3S1r49u27287fLr72fSO1btb719fefviN3OdK44m95xN7tq/ve78XsHD4p6L+S1H02u27244frzjYqbo/EnJ3uS2hf5VM93LVobXHT9c8bFT9LVVdjVRcDC86fj2huv7617WClFuD3OjtItSdKoLPw53BM4NxY11BLVX2jeWvW0rM2nKMyqO0kjzVcwKvF8Sq1aerNFcbTg1FITebaXhFzh0yIEQd3LKEov3JRLh2Zng9Ix/dMTmC0g8LnKfA+OztwVsxAEHJWQjBUw4nw7lkjaZuGU6dp6FGmKiwDQcmEXtEjFqAFoxwCySCsvE3EIZOxPgpQLcaeCgRb5fCnAbzhmpgBAuZMce4cMBToEc7y2hOsqIn8Vkq1NCoJxqA+A/y5CmANIZwHyWQB3E0A+8GUN0qxqmXn3YXynnxRWQscJi0ktIiYWIBpdIzgBAcrBYQa12XIt/O+X9pOj9Tf+nv9n9+g87ZQX1r/6jQV+ZEvkGmWEACzbqeX294/WVzlc3m5/fqTdURpW6EEocVjxfLocYzgforoYab0eb7yXYQOOtYSm2e8k28ERreLIVLMUakWGHyHKEZTnBsl1Q+Z54UCCuPAgPCiZWhhIrw/GgUEKNkUOKAAAgAElEQVR5KBEURqiK/P1fCnxDIgoUjikKgia5dFs+mwx8I6gPQabYFb34sUzr1yln7QlHrc4P9yfDDTgdsZgKX1ZzFA9cxl3pP9wZXCn16fL9eT5Vczbz0XK+Ir5BF1/9ZqdYGV71hNatxujTYYDtDvcK5cJt+fnZqWhfJsUDxzQhdVdABvMQVaylPBI4jrGYxtutoc7Gr+cZbOcaQ2qt0bUOEJD9TJIecixptdi63edpt5dGpaVSi5cWyPlJq+/LgRD9Mqu79VYP651fJOpcnkqzWa/4MhJhtJJpt5D3mTaYJZhvps61oCaqidPVlLFKBriaOlzJnG6gTtQThqoog7W0oTrSYBVlvJ4wXk6YrCeMNxD7isntyWsF3o4qFx99/efPir/mWT6rctcYSjVbqfTebg5b6ogBd6bMjTWh9maZdASZDEegNhDIFcTe7OZK/2RPcXtdRHN1aHdj+vhA9fpCO3prio3FsCk4Kg66udpbXxOUnvQ2L/VtabZJeY5JebRRfbrJcN2XpYG0C9a6N02e/2rw7Edj7YtWbxXcLJQ9LZRcTG580rvxUfeKqd5li7fXLY1umOpdNX556Z32JWv9K07vbzuZ3LLWu2yte9XG4Prvm6e53hUrw+tWhtfN9a6Y6V421bn46c0lS/0b7uZ3vW2UPMzuOhnddHyr4P7hrp/1vWBnpcwwrcqsdw0lH9qqbUa7/GcGoqa6gsdavIbbrDsr39dm6xXHvcgOeZQT+giUpFaf+7KlXHu41XZ3KYeE7KNgZ1jUHQEXdyykHwqpJ0dM6dm+9Gz/9Jh1tE895OEETLiAizkSEsWnTMkx41RIORYQjvdxx/vYI9bmIR3Go29wGGOnzAaAmQ0w0k5Y8XJWK8DPlbDd5cxKMTf9mBMF8EAyZiDAaZIxAyV0N4AeAlBDAKLLGdZUjrOQk6IlOG8x8dMx1vYYE3FG9T0k2vNRVifojwDagTX+ajRaIeLhTwnqN+qcHkLKvjAx64D8mI9bPYL3ilar9rKs+j/fr/50L0nrtv21P7+98a3ed1/73PmBkWnBini1X+sLC3rf/eF2q97lWvXfch79WGFyG5FhsxmssxyktxxiuBVluhtrCY233o6zhCRawVJsYQlWiBRrZLodMtMenukAzXCAZbtgCj3RJb7oEl9MaQC2LBBTGoApDsQUB2JLgn6v1mBrYwj1iaiyMESeHzrTayPcctJefdJBY9JJc9ZLdzfBGlfohS/3w1cFksq8l+KtkEW+zMZoem8Wa7bleKtvMMEWZH2rxEIB5KgAjn22mPJkK0cRVfYQDXq6l6mBK34EybmCarjNmjE4Q5cCR0yZBJCKcEes9X30EG2+mDGdwJqLZ6zkMneroG0OuxW2+AZ7eLnVSpnZUpIBtD0EPxIzk/6+2+95i4sKyPxel9/r7mC9zoDXeR9v1n5+2O2vk2dws8XnFaIpaCHXejLtQ4fb03rzZ21O+qORjrs1KfjBCtpkA2UERBwoIPbk4vsKiCPlJHAlaaCCMlRFBdeQRmvok3XEsQbKWDN1qBzfHL9bGhCqc0/tq/9wefhb6nvlBu8Xo+mWs8Wuc+WeW/0Z24v1S3NtkO0JKhUp2GfyBSwej0Ilw2A7k/PgyumRwtW5pu0V8MrMwMxY48xY/dps79by0NZy11hfWlmWRVzQs9SwF2WpxpVZ70FJhlXpBj01DnP9sRc+v1WwNVT4pHPF5OVv5vrXnT8puZspOb9XsDC48VHn8vtXF03fXPmoc9lY+6Kx1qWPr69Zvb302fi6reE181cXP764aKzxq7HGRWPNqxZ61y30rpu9uWr6+vInnSvmutesDG7aGt12/nDH+eMth3c37fWvOxje/GKqGOjwINz9fnr4c1CWYXWRcU2xSUOZRUu5TW+V41izR3/9p+YSw5qcN7W5ulVZryszNJsKdHqr37bkv2kuMhjv9Nyez93baEJDh8n4eQZlhU7Z4XPQ/5XpdMYTn7BFB9RDHo7DQgsFxLNTtuSMJzphnx4zz07ZohPGiRAnPhCcHlEO+NADeruUEgXQAsQMH4CbKeN4AtwUKTtKxA2Rcasl7AQZI17KCZezfc94wTJa+BEtRkYOPSJ5ysjhclqmjBoNkEoBqpeYYHOM/3CC8ZNREsQEr0OIg2jLDNeiA7K6F/r4mtnP/9bsayJEr4gERBYcDBzhJKSlzUzLAcdH7VaqmS9uhWr/Zq7wlerf/6H+5wvQcFNOvBGz2OGoKgAa/2E35u1OoF6z/p1ohb+thhpvhL9aDHizGKC3Gmq8EfEBGm+9E28FTbKGpdjuJVjBUmzhqTbwdFtomt1umv1ehhMq3wNd7IMp8cWU+GJLAjDF/ugiv98R4ioi8VXRxLo4fE3MXkHAVqrbbrILLNl5O9Jsxkt36ovOtK/BQvgHSIYjrMB9M8sRX+yFKw2m1caTa6MZvenMiXLRRk+Js77xxX853f8uSPXHajOlcd8Hy3EPu71vZ7//ze/J5VDVb3KNr3T5Ka9kXEPW3D3cTQXO6ML9PQEZzF2v5kxmsibCaNMx7LVS2kYJsdMJ0ewJLbWAgsxnU/WWC61oEzmIrsDpFOMuX41Gx4dVVopDIQbdQW+yTa41uT4bDHrT7KVZ76CGawnbrnIfTzCcSTWZDtVdjrIf9ntXbKoU//JK1jvVgSDH3cIoUmMqoSkO0RCz15yE7soi9hVSh8opIyDcYAl9sII6Uk8dbaaNVBHbU+DV4Qn/jyez/moDQaB12k5nZ2dnd7YzOzMdqZc6xV0iuLu7BAgEJ7iEGIEkJMQdd3cvWqC4QwjuXmhLveX9MO+9c75/4Tv33nONZID/AcAUrmFNHhSGalUnW3TToA0kj4GylKXpxrnZLvHi8P7Bxpu3Z2dnZ6cnh9ub8zOTPYPdpVMjtVurw/vbC+vLU6LZnsnx5pGBuu6W3NoStDDdkZ6kS0QASZHaeUTnOmFgGc83n+5anR3UWYkB+Nk89reXdrd4ZKVz3ULrLxu9m07Gd9xN7zmbPrQ3lLDVv2OpfcNY808D1d/NQDds9R7YG9y0079lo3XDQvOaudpfRsp/GCr+aax2yxJy01r79t/Y6Nyx05NwMJBwNLznZCDhoHfLUfeWk85NZ5073hb3w9yfxvhLoSLkyFgQjQChESD0NC06FsLGagnwBkw0kInVyKJpl+eaVuSZFAsMyvnGtVlWhRRDQSqohG/V1RgzPsCdn6xamm9ZXWrb2Ro/OVp4/3bn46ejDx+OPn46+vj+4N3Z9stD8fHB4pvT9Q/v9t+d7b59s3P2evPkeOX45crbVy+/fDp8/3b/9U77u43wzxveX/fg54eI8y3++R758xH841Hg5332+W7Op8OY84PYL5vU88PKD+v8N7v0V9vOn3Y5X7YIHze8zrcyPu0S325g3q0lftkMOl8P+7wQ/VUUer4Z8GbS+vWA7ijnPlr3xxiwfDnav42WsDH7/PPZ+tnR+tu14Wk+rDsS0gTV4ZvJIQ1u+0hfVbly5RHgQir48Ste0EyU1liU3lSy5TLV/U1h+C4jcCjSYSMDPo0x6wmF9Ibq9EcYDkSajifa/52EUzjnKYzTFMZpEu04iXWYTnGZTHGZTHWfIXgvMOBiZuAiK2SRFSJmBi/QQxaZYUuscBEralWYuJaFnGdGTBADRjBeLxJchhNcnyc7difY9iXav0iyH8O4LJD9lqgBonTfGarfZi56tzR9qzhlvQy5U5f68pkwwVBB+/ovXio3/eWvpujdLfR8nO/9JEn/VpzJYyFSO9VdNtrylofqFYyhRA387qRQ7USU+v7l5MlC0WpL3EZD+Epj2Gob6tUof6UFPZvpPMywHGE4v6Bb9hPMNlrxM7kh02XRjTG6BX5KHIeHlcHgTpQV3fY+31WqE2XVmWicC1XspnsuFES2ocy7sFbPEMb9ONdZDnyeBx8kuVaF6lIMHiMe/oRSvFHtYzaKc5+mB42xQyeFMUtFuKUivKgQt1JBWq+krlazluv4yzWMhWL8TBYyQVdG698XIsB3MSb3ikMhxZF6PXSfJrJXfzlxdb5n72D5+OXO2/dnHz5+Pjs7OzzcXBD1Dw5UjvQ3Tk90ihcGlpbH1zdm9vYXDw5WdrcW5yeeVeQnZiANOUjDbKxtNsa5mAprzk1sLI4tEwbX5kS2FCYB/OweB7hIe1k/tNa7Zqnzp4PxbWezOy7md13NH7pZPHK3lHQwemAC/MtQ7Q8LyC17gwd2BvcsIbdMNa+Za1yzBN4w17hmpv6XGfC6ucY1S+B1G8gtO+07/xedW3Y6t+x17tpo3bDTuu6odctB56a3xf1wL6nEEDlUtAwJq04jgLg0nWy2AT9dixyvhA6SRMFl02LkM2nA2nKThirTinz9Ur5ROc+ilKtfxNGuK7EZ7IlbmsvfXOnYXh3Y3Rg5Pph/83rt/YeD9x9fvv9w+v7D6bsPx2fvDl8fiw+2p452Z968XHx7uvz2dOnsZOHV8czxifj0ZPn9u/VPH99+Oln4sIP9vOF5vh32ZTvs617Y16O4T3voTzvp5/uc8928r3vMT+ve53sxHzfh50f0j5tR77dSv24hv2xHfN1Kff/S5+0e9/Nx/sed3DcbhI+7/PcH5M+zdkeTbm8WsJ9FKae9sDFewEp98efNwdP+yvfLE+dvT0925s9P58XVKUOJup2huvlOyklat6Ayv1v89ovkP7598i2gG+H0Rhg8Ggyejrdeovrt5oceFoS/ykvYZYaMJVt1wjV7Q3UGo0wGo83HEuyGE2zHUU5zae7TqR4zeNcpnPM01nEO7zaX5j6T5jlL8hbTAhbp8CVG4BLj/0UiM3iRGTZLD1sRxK3yYmcygiYIsPEU70Gky4sEp6Fk1/4E+zG02xzJb4ECE2XApsk+szTYDBu+UohaLk5drSCslyH3qtDHzawg4GN3pd+8NH51ULgSYnCT5q/I8ddMtnhI9ZUeKHJ5O5D3so/bKnDxV7sisH7ch5LcqNM8mRPuD2Ys1IcuNoZudOIOX2Rstyc9z7DrIphMZpjN5Ps+QxkvlEdO54TOFgaP5kVkuskUB6jyXJ50oS3LgjS4jo+6UdY9WNsyH7l2tMVkeWQLwa4r0ao52DDLSoHpoEGwlky1kqS7qpcEGTeEmfGtZGPlfomS+S3P8klPjOUEFSYSRK/mIec5kdOMiOXMxNUSnLgkbaWWuVzPWqqhLpSS4/UULP68graQTta7URQILorQ6SC7dTD9Z9uFu2sTr89O3rx9/e7du7O3py9fbq0sDfT35ra3UsdHmxdE/bNzL2bmBheXZra2145f7p+eHEyNNuXwgvExEFKktgBlk01w5KY6ZWbAs1meggy3XJp7NsUZ4GVzD+4q5evwxNHkpqvF3QBXmQAPaS+HB27mEp5Wj3zspF1NH1mAbxir/2kOumGldcsMcttE84ap5jVbrTuOevcc9O7YaN2whly3Bt+ygdx20JVw0r9vr3vbVvvm39jr3raFXLPTuu6gc9PF4K6PzcMIb+m4ENmUJHkaAcTK0BKwdXMFenw6MD1ZDhX8CBkgiwmVZKcqVxfqN1WZVBbolQj1SwSmFZmGVXmmrbWug73RsxMZi7M5C7PFy6LKtcVnu5svjg/nTl9tnr07fPf+1d98eLV6vDOztz62vzm6vz50sDlwuvvizcHg6fHIycHIq+Op16933h6vnW0K360HnO8knG9jPx14nx/UfNrlfdpHnR9Q3+2GfjxK+LJLOD8pfLeKPD+pP99L/rJX8WEj8uMW8Xyf8GbL7+wo9Pyo+ny18NW04+GIw14fZm/Q9bVIeL4nOt8SfZh69mm84+vK0MuV9s/Lfe8n+89EMy+Xnh9v9K+0Z68z3DoR6jTT+xgtiSD56273/9C88p8/AADTu/9bpkftkPxESS5rGfBVYZBY6LclCFwkeU9hnLoCNbuDQP0R+oPR5mNIu5FEu3GU0zTObTL1/3o4g3OaTXGeTXWbSfOcJ/uIKL5iKkxM9xfTAsS0gL/bqZgZvMCOXOZGLdBDZki+U6ne4ziPEazbGM5rGu8zm+a3TIGLSbBZgreYCltiwudpsCmq304ZZquaKC5J3alJO67GblYRfCEP/HRvwY3vRVo/xXkoJFk/sr3/b+AVgLvy/9IiZQYK4/f6il5OF7LCtZIhNyqgsmPpsstNdjsdsbs9xPUe0t4L5k4Xqo9p3JoEnuO5iXKhPUSjQa6/uBLZSbTabcfXoSyy3OWzvOTLw8EdWKssT6mmaP0+nG1NhFZtoOpsfmAfy6sRa1kXrEPTvBEi+ZO/5FV/tfs2938zvXnF8c6PSI3bRc6qFZ6aAmuZPLNHLXDdQZzbNDN4lhk2ToSN4bwGk10HKQFLhdjtetZGA+fgWfZSJSsE+NT9yQ2CrXyK0b2yYK1ShF5LmkMX23++I/t4d/H45Gj/YHt/f31rY3pmoqGxlpQjDCrJD2prZ4jFPevrsyurC5ub64eHhzu7q9MzPWUlaFSCbqjvo0ioTFKQKipCISpUCZVgRaXA2BQ4nwxl420AIZ4yCF/FEE85mNOTMB/FJAQkPkwDDn3qbinhZi7hbvHA2fiBBfiGsfofppp/mWr+YQq+bg65Ya1928lAwsXovqP+XRutGxbAP23AN61BN+y0bjvq3nHQuf23dU56t50M7jjp33TUu+Gkf9PN+K6v7aNQb6mYIGkSTpFN1eaydHkcCJ+nyWWo0olqFJRaWpRcSoRUerx0ZrpmqUCnMs+wqtCwosiwjK9XJjCsK7ZrrXXvaPbqbvPpaoF1tcD7niUM96VNTwjXlhoPD0ZenS6evVn/8G7/y4ejd2+2Xh0uHm6Pb6/0bC22bi837q817a/XnWx0vdwcPTwaPT5YPFl99nYj4fww+cu+75fjqLc71E97gi/7hE97gef7/POD6ndH+a/3Mz8cCl5vs85Pit4fYL/sZX0+JpxvIL6sJX7ajjtZ0Tvtd1rJ02yPvdEXr7Y3IjzfGP2yMf1po//jSter8frd3ryXL3Lezbd9FA2+fNH2cqzhcL5jr69gRRDY4K+I1byOAt6OVr7mIfOn/s8/Sv/zh+8BAKdHd6aIIStE+DrJT0zxEzPhi1SoOM1lPtV1ONqgNwTSE6I9EGU8mmQ7nGA7nGj3ItF29O/+iXedxjrOYBymME5TeNe5dOg82Wchw09MhS3QYGJawAIDvsCALzCCFrlR8/TgyTTvGYL3LMl7KtVzjuw7T4PPMoJFjJBVdtgyxV+U4iHCuM0mO84m2otTvRbI0L0K3EY1Zb0k9agC20uHu2jddjV4FGqtiHWS43srlMCAVAs5rydXVf91yQFyFR0s312TtDRcsTNekeqmhDe72oOTE5dqHHaHHAxQ1rszNjpxMyXQjjTtCYbDZo5fH9ulHWu81Yzvz4DOlSHE5XEFwSr5UBWeh0wX0b4ZZVwXrd2FMutKtigOVJtm+4wLA9rRFgNE+2aEdrGTPM1ahu+m1Z4eH2OqYfHgV4vr/wqV/JVnKNkIBbUFarfCtLtirEbIPvPCyEl6YE+CQ52ftsDsMVb7XrqxbKqRPNNV7zktVlRCidaVgsr8lWIpTbZ6WhmqXxKh24Cxei6Az3ZkHewsbm4tLSyMLoh6x0cqaiswDLJTGsaQT7ctq0gaH6teWRpdWZ1c25jd2VmaX3heUUPGJBvDvO572t3wdXgS4PooyPdOZIRKeiosM49SkE/LE6CzGQEAXLReQrBmhI8CwlcRE61LxppjEnTD4LJQuwduFnddTCWcjR/Y6t611r5to3PLRueWndEtB+PbTsYSzoZ37XVvW0OuW2heM1X7w0ztD2Pl38zV/7TXvuWgc9NR95ab8V1Ps/ue5g88zSRcjW456d90MbwNtX4Q6i0VGyKLT5bOIKoxqGAeD5ydC8nJBGVydPg0fVaKCiVRHh8hhY+QYqJUirk6taUGVeWQqizNEp5mbb5Jc4Vlc7Vpa51xQ4VRRa5BeYFmdalRa4Pni77k+Zms9ZWGvc3e4/2R09Ods7O9t2+2Xp2IX+6P7K4/21isWROVrs5kHotbj9fG9486T16K326L3u+QvhzEnR8QPu/mfj6o/3qc9XWP/XEX/m4n6PM+/fNR98dDwvnBs/NDxrutmPN9+PsdxPlh8IejlNcryN3W2I5o1VLLq0SlnwhGkJd9RZ9XJr6K+z/Pdnxd7Hwvbn032fm5t/aoBHnSm/1mffTjQs+Xya43403bnbRRTmAtFEg3kGXaKKAMHwY8/cvg158efPvN9QuX/gEAGP5yqTvS9oDst0H2X8oIXiT5LBNdlinuk4lmfWFavaE6A1HGQ/FWL+KsR5Lsh5D2I1iXCbzbdIrLDNppGm3/t4SzJO85oqco3Xshw28hw2+B6i+iByww4CJ6wCIPMUcNGEtxmydBxRSfhQy/NU7oMidEzEOI2GEzJN9JlMtssvNMnO1EuMlMlIU4xnYF5zyb4bdTQVnPTz0sw9eluOgp/2gPvuWr/xBt+6QAJteXoDuTbvwCb4rSeeBy90qclVQRI2CwI/PlasdEMync6I90+0f9GTJrTa6iJoS4FbnehhAVe0xy3eYyvUeIlnVIvcUm3GJOSA/ZZaocOZrtXxmiRjC82ZpsNcb3rU3Ur0YAe7GWZYGqk0zvqfzw3hTHSbrXFMFhhuIwz/eZovoNUwKG0oLKEdZ8uD7eSh4HeczUlyl2UasMUB2Itx8n+s4JEKK82D6CV4W/Vo6dNE3rOlLpbrTU9ZAHvwc++SMK+CATbhYBvuuv8CvGTJJo/rgqxLA8Qq80Rnc4L3xjuHxva3Frd25iqn3wRUlzA0HA8iLjjOhpJvk8l9pqfMeznL6+isGRir4XJd29ZU2tQhY3GBkFivCX8nd9CrWRh9o/DQ2QTMPZZvHwwlJObglXKEjiMn0A+HjjuGCNUG+pxGDl9CT9tASDmECNAHdZd6t77lb3PG0eeNk+9LS+72p218VUwt30npPpbXeLB+6m9zzM7rsYSdjp3LDVvmmsftVQ6Vdjld8tNG9aAm9ZgG84md72cb4Pdbvj5/YA7v4U5vTUw+y+s+FdT4s7oZ4PkeFS2HglEl6JyVDLytQpLNYvrdAqqwCXlukW5WllMTWoKIXUCBlitBw/VbUsU6u+TK+21KCsUKu6TLe5waSt0ayxxrimRK80G1TMARexQVW5et3NjuMvgiaH4qaHSQtTmRtLrYdbL04PZo72514eil6diI4ORzc2ujZmi7fEjSeHU8cv1169Pv50tvd+p/V8n/v+gP/xkPBlj/LpIP7LvuDDXuz5Hud8L/Z8r+DzHuHNTtTXl/RPe9mfj6gf9gkfj2LfzTv0Jki0udwfDNdfy4rdGyr+dDr75WDuw3TXV1Hbp6WeV7NdH+c73ky3vp9tf9mau1GIejtT83Gl9+PC2PHE0H5X+UpuYmeKY2OQVjlUQWh4D6F8B3TlH3LfXvjjEuCXCxd/uADQu/pTqbvRFt13lw095kccFWPWq3ELOLt+hE5HoGZXEOR5uNFQjNVwrM1wvN1Iot0k2nkS7TiNtp/BOMzgnKZTXGZT3ebSveZJXgtkqJjit0D2FVNhSzT4AtV/hRY8k+Y5T/Zc5MCXMyNWhJHHBYlLZD8x0mo2yXIywVqc6rFK9l5MdZlJtlxNc5ghuIrx1itk15mC2O0S3HoNJifeRkni3yZPrsE176VbSua6y1UFaXYkW45S3KaZXhzbJyFKvyc7PW0rCtwRPz/eHMpLM/OR/CnX9/FcqeVGB2GpHbPUAJvJgg+QLHrxxpWBanNFYfP1CR0sr9GsoJXKxD6KB9Xybk2CxUx1wiDNpdJHrQFt/yzD9kWG7XhmxHhO0ATXe5zsMEl2mheGrFZiVmqJs2WYmezYKT5ikh74AudcDQOXeau3RZm3RFp0Ip3nc9KW6/KWGwSdWJd86/tVrooCJxWhmXSmtXyRu15zhE0v2qEyzMZP+paz5M9I7QfpVjJFgeCKSK2SWANxS8b6ZNOyeHhxaWRwoLKxJi1f6M+k2JJJ1my2T2FJQmUdva6BXF+HKSgO4+X6c3PhGWzP1HR7DMkelawfHawY6i8fBleOR2iS020FhYjsQgIvOymDGUSiQAGJIeBwL9lAl0exforocFB0gFKAm6SvyxO4u7S/i3SAqwzcTc7P4ambuYSL6R13i3seNhI+jo9gTk9D3OQCnaW9bR96Wj1wML5po3vDSuuGFeiGheZ1K9ANV7N7/q5PA72ehnhLh0ClgjwkYfZPPMzuu5rdhbs9SoiQS0Eq0zLU+TxgZhaksFi7pkGnqVW/udW0qdGkutw4h62VkayYGiVFQcoKaSpFWZpVJfrVZfqNdSbtLRZtzebNdab15YZleZBCFqiACSwT6rRUWvV1eo4OhAz3xfa2xwz3omfGKcsLgtWlgu2NhtOjwTfH86e7ooPF9m1x++nBzKvXG2/e7n58t/3hoPfTnuDjAfHLHvXrPuH8IP18v+LzIevzQcaH3fjz7cQv27g3x5FfXz37cFrw5TjlfDPp/XDARJJik9eTVRb8y3De+daL85eL50eir5tDX8X97+bb3o+Xvxko/Sjqezvb/mas5s3Es/1nueulxFfjjUdLo29nX7wcaNx9lr8sQPQjbWtg6sUOirGgR8o/XJK9DLj3/be/AS58DwDcAgAsfwRkWzwZTzTdoPi8LkLuFcfNoa37EbrtAert/prdobovosxeRFkMRlsOxduMIe0mk20nkDbTaNu/X3sR0XMu3WuW5ClK9/5bQhHFV0wLEDMDxZzIKbLfljBMRIGOYZz7osx7AnRGgg16oMB2L9ByesAg3u9Dd95hR858LfNwsOJNM683zvy5v+a6MGq9FLVenox0UL39n8sWD34NB9/LsHic7SJdGaDeEmv8HGszTHKcY0M5rqA4Iwl+rOrzquSN6Y61wRJqAKjQ9+FMgeF2e7A3yuAAACAASURBVMpGG3qp0rsl0fAZUq88WLEjzXq9Km6yMGysMHylASUuji4OBleFay/Xp8wWIMpDNcqDIH0Ety6S9TDPY7IgaobpMZZqM55iLWb5rBfGrVamrNdRdluYmw3U5Yq0qezECV7MMDNihBk1xU94QUdMsEKXy2iH/fX7fRVFYaYUnetMw0c4XUmY1O+Ot/4Dl71PsQJ1opzmuHHhqg8d7l2J0fyLZCWZ7w9qSDRrJjhO16dOPM/s7sppbWeWlqEyhSG0DPd0ogOL5ZWZG5pdhBBkIVhMHybDhU5zJFMdUtLtk7GWaKxVKs0Nn2qelKCdlGSExVpg0Ca4VGsCC8bgh2Wwg0g0XzLVFxDvr+5v/8jV+LqXxZ0AxydwV8lwX7mkSGBcsEaQp6y33SMv20feNk88LO97WN3ztr0f4PEkFCoT6a8YH6wWCVOAuz8J85GN8FcI8pbzc3rqbHLXCnzNEnjd0fAe1FbS30ka7i4d6P44yPNesKdkgLOMj4NUkLdUQrQiMVVVKNQuKNLJzAPlFwGrGyCNLTrNzUZNTYb1NUaFWTrMVNXU+KfpybJ8qlq+UKswG1xWoF1XbdjcYNLcYNJSb9ZUZVJVpFvM0c6jAwtYkKp8o2f1tiP9vmODQT3t0K4mp6Fe2MxYzMI0fkXE212pO1x7vise2J5rWp+pOdwcO3u9/ebd5of3259Oxt8d5H7e43/Zyfi4HfllB/Nxj/TxMPfTQfmH/cIvm8hPe3Gfjyhv93PeHeV/2Uw5add/HqPRZSe5z4s9H6/5sPb848H014OlT8ujH1a7zxc6X852no1WrhUkHrRw3y70Hk21vZ569nqk4bQpbyYTfTJWdSbqeTPWdtqRJ+JEDqKciz0VueaSAfI3NH76p+w/LkhcunDrwjf/BVz+C3BR9RKAoHn7GQzUBgO2B4MbfOR6grW6AsGdgeB2f812f1BnsHZPqMGLKLPBOMvhBMuxRIvxJMsplNVMioOI4LJI9lrI8J4ney9k+CxR/ebJPtMkr9kM32VOyCw7eCMndpmLwOncN/oPQO0iQPObi063bnr/9m+PX76Llb0Df/grywGS5WfG8zOheukVh3pi9O8JwTfWSH5bpXF7xWgHZYlr//ze+dEVtP4jtrVkrqNUBVS5Fg5qQuh3I80nKUGTHO/iMBW0+R2cj1IxG34w31RFDxS4/jZXYLDTkrRWFzPCtqyNANeFqteFa8wWhyxVRIsqYpaa0HNlMfVxJnm+qtN54Qt12F6MdUmQ+gsOrCfVoZ9gN5UN7yO6Pg9UG4wAT+Ns1oThW+X49Traeh1tq5Gx1szYaueuN7KWaxiicupsCXm+LGO6lCzKT1ipZu301R+NNpfGu1JNnpINpDN9rIIMlNR+/qfqP3/Q/e83NAf553iYm8RvjhK/JGpfZznLCzyVW7EOL4Sh/ZXJz59RCksShDm+dI4HRxDAzQrjZIZnF8XnlMQxMgPTSPYJ8Vqx0WoYjG4ayRpLtEel2uKJjjiqJxpvGYfUR6XZkRieeJIdLs0eT/NLozmnpDuiU2xweAcACq4RbP/E3eimo941D3OJQDfp+FA1fJIuJlo7xFvWxfyOvdENF/O7Pg5PgjylI/0VEQGKiADFyACFKLhisPdTmPv98EC5xGhNZKxmXJhagJuUi+kdB8M7TgYSjkZ3nYwlvKwl/V0ehvs9ioRLhfnI+nvKhAY+TUyUp7M0C0sNSyoNMvNAmXkahaUaRYUaeTmapYVapfk6eVwtVpoaBa3AwKsIqKBcDiSHr1mUA6ks1aurNmyoNW6pN2utNW+oMK7K1i1kgfIZoDKhTn2pcVez7UCnS98z56Eu99nh8NU54uYCf3uxcHe5dH0+VzzGm31BnRuhbIpaT/eW37xeeXe2++F0+dV+6dej/PNj/vkO+XyX93GP9OVY8OFQ+OGIdb6HPn/FPd/LOj9inR+zT4cd2kMlqi0eLjE9P4+WfF0Z+rw+8Wlv4nxt+NPMs/fL7R9E3a/mu04nmk7qaYucoLPhspOF528mG09GWt4OtRwUpKzxw18OFB73lxyUEUTssOZwM6rBTZKeBEz2utbVHxW+/+Y+AHDv4rdXAZeuAi7KfXsp+vHvlQ7KrXCtFrhmj59KZwDkbyfbYBpdQZCeMJ3uUO3+SIP+aJOhWJPhOOOxBNOJZPMZjM18muMi2UNMhYqp0CU6bIkOmyd7T5O85qh+K/zQlayIZW7gFN61zgeSZa2KUrkXcPvn0Ae/46RvEORvpSvepKvepirfZGjcT1O45f5vgMtv/3K9+wMJIjGWYLMi9NsSYFQf/PEbABAm9z+q+VOhtVSuzdNSV/kSN4Vaf2BHtPFQmudiZshaUXgL2pHkJZNLdNwdq6ZGQfJgf44JIXPFAdv1sT1Eo5oQzdpQjZF0p6mC4OnisKWGpJG8kAleYKGvWgfWbrkW2UnwqA8FTXD8u7m+VTHgXqxlEVSt2OJhn6fMdLTBEs1nJT9pvZ6505G/21mw3Z6505m505m90Za50Zq90Zy1Us9fqmYulFPmC5JX63gb3dUn0x3jeanNMS5VITYjrCR2uLud9A3d366oXQKQreUFHgbg7wBWt38m2Urx3BVZLlKVccb9OYiuCkxnO72kGp9fEiHICy2oRJU2kvNqiTnVaVllGHZ+LFPgi001jY5Vi00EY4gWBIY7ieVFZnnjqe5JGGNEAiSeYI2hOaMJlniiA4kJI7HdUymOqBQzNNoEgA8FRnvKBTk89bF67Gv7OMRTLiZIOQmhmhQODPOR97K772J+x8v2YZCnbFywBjpKKzZEIxymGOIjE+EnH+onEwR9EhEkGxelikxST4xViwiSh7s/9XeWgto+djW762R8y8XsQaCHZEywTEyodHigFCJUJgkpTyArC3K0C8p1c0sgvExNgRCUmQnkMlSpqao8soYwHcQjaDIxqkyMMjdVTZCuIUhXy2ED84Sg0nydimKdimKdyhLd2lKDuhKj2nztciG4mAMu42tX5erUF+s1lhu11Vj0t7lP9ketTFN3FguO1ssON/M3FzMWphMn+xGzw1HiUc6mqPVor+/s5crZ0frxVsuHw6Ivh3lf9qhfj+Le7iZ9PiZ8PRKcHzWeb8W+PSS9O0R92Uz4PBXXHv241PjJHE7n1Qjn3eqzL7tz5weLX7aGPk+3nDYL3/dlvxUPnk02vB6rfz/SspGXLBYEnfZkvp3tOJh6cTrSeP68ZIUIf1mS/KYvf6OOvZGFqA/UE5g9YJo/hT65anDtf5Dff5b69pu7gIu3Llz8DQCQ/Oai3/Ur+WbynQjT7iiT4VCdniCddj9gs7das49qBxzUHazVGQzpQ+j3IfT7Iw0Gow1G4ozGEkwmURYzKXbzaY6zJHdxhvcKw2+Z7iuiQOco3mImfD0zYik3bj0zQkxym02yXMU6LCfbzkTqjwVrvAg1Ggo1Hgo0GIEbjASZjofZT0S5DYa5TiRARWzUAj9lBOe4lQXrxIX9+t+Lhn/+g6BzR2AtxzJ6zDV8WGAtVWgv0+AH7o4xH06zXRDG79UQ9utTBzPhXZlhovqMvHjFFqzCeJ7JbAlssza6PgFU6KfQkWzaR3Ts50OX6uJnCsMHKB5tyTZZcI3lkthBqleun+YgxXU+J6I4FFIZoprrJk1U/rXDTnbMX1OEslkVhG1Up2915u/1Ve31V+wPlG/3lG91l211le52lG40567UcleqWUsV1KUSwkZd1n5f08lU10o9f4Ac2omFtuJhTVj/kih7oZ9ppOrNTE8drKE6+IfvTG5foTqqcN0U8mFKNUiTgeK43kZ6Y6OgviWvtolbUU+vaOOUP+PmNlIF1cTMSkJudTq/JIrChaKI5kiCGZ7lTM7xz8j3J2dD0+huiRj9KCQ4gWSWTLHBEc3TMxwpTB8KP4jChhIotmkEMwA6SCUGKofwUvh74MFcJEO8paMD5CP9lUO8ZQPcJAM9pCL85OOC1WJD1KKDVEJ9FYOh8hF+ivEh6vHhqrGhivGRyklx6sko9aREtegI+fBAmchAeQRcIdRPJgj6NNBLOipIIS5cPjpCEhkvRyCqMzgQThaYnwMR5Glws1XZfE0+V4fHAFJSlHExCniENDFGnpygQEUqMtBK3FQ1XpoqL02ZR1YT0tXy+eCiTFCBUD2Xq1bIB5VnaVdmapQLwSVcSBEbXC7Uqs7RqcvXbyg0ris0elbp+OJZ8PQgam2OvLtC2VrGLM9Hi8cjF8dCp3ujpvuwG2LB6d7zsz3x6fbAy038+730873y8yPhp928T4ekD7vIz7vRX/Zhp6cx54fpr/t0+hMUGbI/9cJUt8swr/tLPi32f9ya/Lg/9X579Hxp4F0jX0z3fzdU9X6+42yq5XSg7qyvTCwMm2PBzrrzX88/fzPVediSvcNBLKVC3/Xmb3Xn7ZSlDSbZ94cZNQUZ+T/5Te2fALWffpD57ttbly7dBACuAgAPLl7wunaFp/e4xgfSiTAdCDHsCAC2+Kg2Q1UavZWbfVRb/dTbAjSfR+g9j9Drj9AfijEcjTceSzCZRJrPYGxmUuym05yWKJ6rNN9FKlRE8Vqg+S6yA9aEocsFWBEvcoYCG8O6juM8/v4qVuhwMTdiNTNqQ4jY4Idt8UPX2IFiqq+YClunwZf5qFeNhSJhxH5xOMXX6sfLgHjZ37OsZfMd1Yige6kq1zm6D7JNHtZ4anSGGY/g3eb5UYuFSYcN9L16ykotSlQaVRKp+pypv1jttVYfPZHllw2VqgzR6MJb9dFcRVXRo5kBrfHmvUm2VbHGzRmufXSvch/17nTXmcLIYjio2lOpPRTEMb3L07nd6aU6EACcxdqv5CC26smHPYVH/VX7fWV7/aX7Q83bz2v2eqoOuyr224v22gp3WvKX64QrVfTNxry9582HYx27vWVTWcmT/NguWvAwOWycGTLFixxhhHWmwKBPbqn+4xtXhVtJug/YLnKlwWpdVNexutSOJl5Da2Fta1l1c0lla2FZW2ZeE01YT+DXpgpqCLl1FH5NMqcMwcgLoBf404uDKEVwQi4UL3RJY7skpxnEp2ihqFZYhi2RYU3numZwoWReOJUHJ7NcyXRrQIyfdIyfbEKIeihUzstOAupw39/5caD7k1AvRbi7dJDn05ggRUwMGB2rFR2kEugl7ef8KNBDKhqujERoICPVkqKUk+NVsSgNHB6IQmvExyvGRsnHxygiE1RRSepIpCoOo4JKUo6LVoiPkSUSVDh8LY4QQuNq0NjqDJ4KR6DO5YLYNCCdqERGyadFK+IR0mkxMuQkeTpGkZGqxElT+f8Iyeq5bGCRQKtIAC7kahawgUVscBFLrYgFLGSAC+igIhawjAeuFOpW8HUreZDqLN2mIvOuWqeRbr+FsfD1GcTaTPj6TMzySOh8b8BUL2x5OulwvfBks+1ko/n1Mvrddtj5HufLIf3zUdHX49wv+4LzPdzbrfBPJ5hPU+EDOIkQiZ9Qj+8ORoBXs2Jf1VI+9RR9nu883x1+PdfxfqrzfKptvTBluzDx7VjN8XD1m/6qN0PNJ33lw0SftXTP103p++0FK2WkZapHP8Jsr4Rw2MrbaeLP4d1mYszP8pHtkZ4mv/4o9S1A+h+XfwEAfgcAfrlw6TbggseNn7kGj+ugmj0I095g3a5AYDNUqdFLocFTsQmq0gbTeBYA7gjS6g3Xfx6mOxhtMBZnMpZgOpFkPoWymsLaTac4iEluS2QPcbqniOy5kOGzyIAtcwPXcpLE3IglJnyW5D2OcxvHe06leq7SYGJ24IowYkkYvpoft1aUcFCD3a/GbJYlvK7CHVSln7YXrlYRT6pQwTpSDy4C0pQk8m2VSly1MSp3ox/9SlK5wQTeKrKVqffV6kt2FGfGrhcTZjgR84LQvXrSfhthJidwLNNuutB7oTS8CW0hcJFsjtLpxlnO5gb1Ul0qETq1QdqdCVZtaNsemhfPU6EzwXI8F14eYyGwl3oWqFnhrcAzf5hvJ10PB/YFgqfxdkuCwLWihN0aymlr5nFH9l6XcPdZ/mFHzlELb7M8XZyHWywhr9TwFmsz15r4ux3lW89bNkc6Xo4/W67mLlXQxTX01RLKYilBXJa+Xkcb4cc53P2f5j8vuTz9I07rdpanSnkI+DnTr78ytbqKWtEgLKzjFjVm5TXws+vo3Eo8qwLFrUHxqpGCWhSnIZ5bE8kuC2SXwxmlAaR8X0K2R6rQCctzwdItktINEjMs0ExbAtOaxHLEsdzTuIFkHozK8WJy3QDxgfLYSA1iskFssIqf68MQb9kIH4VwL9kAZxk/5yeBnk/iQhUx8ZrIKM0If4UAD+kQb+kwH9nYQMXEMOXECMXkWEVssioep45P1cJggcnJKkikMgqlnJKigSdo4gnq6VT5FLwyMkERhVQkp6sxueoZTNW0dJV0qgaNrcoVArlcSAZJkYKTYuDkWFgNRoo6A6/KJKhwyKpcigqHrMoiqrKI6n/30jwGqFioU5mtX5GlV8QG51HV86jq2WSNApp2KUevmA0qZmuW8bRKOVo1HJ0ajk4NX68hx6iz0mq801087LsyDlsaD1seDF8dClkZDlyfjttdpG4tcDdFnPdixPvlwPM94od98tejjs+HzZ8POB+30edb2K8rmPVCO88/rt0FALT+++9MnZ9FwTpzVJNVTuBeDe31YMnXibp3Ey2vF3rfzPesZUUfVGHevig6GWs7Hu06HGp53y6YCwfuEK32CqO2SlBrXJ+ROPA2O+xVnWC+CDOHc+r1UnmXn7TNw0Mf3b4PADwAAH6//M3PFy78F3D5BuAbu99/YOpKNPuoP48w6A/X6wpQb/NTbfVVqXOXr3CSqnVXbPHVeBYI6Q7W6Q7WGYjQH4kxGo01Ho03GU+ynEy2nsTYzuIdRQQXUZqbON1TRPES0/2WuYGLNP9VJmyJ7CYiuk6neswSfRcp8MV0vzWW/zLDf4UbKmaFrGVFb2RGr3BDtjPDN4swm/Wp2y2C7XbBbl6C24P/mf3nf/FPbwtMpUpcdZFK94Jv/4ST+Std6fdMo4eVbup9SW4zbPhBKWU41W2IaLdRnrLbSj/sYCyVwMYzobN5oTl+qjkuck1h4FGKS1e6Q76vYomvqsBV9hnWfoDgVuarWRduMMKBtRKtU3Tv5TnLF0AlC32VeLaSpb7K9VG63XCNkSTTKYrzLNNvWRC1np28UohbKcdvFCcvZUWMk9x7kVbDBI+1QtRWHVNczV5q5uw9r9wd7twY6z2cfL7dUbXZXLTSmr/eXLjaVrDaXjJfx50pSXF98ov+T985SPw3GvQn016qMdbkBSd0oDqjozO7qIFW0kzh1BBY5SncqlReVQq3KplbHcesCqdXBJPKYJRSH0q+e0aBBznfOy3LHS9wRjGsomi2yUyrOLJhNNEkiWaNoVmiqNYJdGc00y2V7UHheHKEfgBUjDKdaMRMN0mKUgmGSodD5WP9laJ9ZeAu8j72D6H2d4M8n0YFqCBgSmF+cgi4QkKYeny4cmK0anKCZlICKClODZ2knIpTScWBsSi15GQVHE49Ba+Oxihi0HJpqSo4ghIyRiEOLoeOUUvPAJF4qhSuElcIYgmV+Lnq2fnagmwIi63KoCsxGcospgpXCOTxgXweWMDRFLDVhSx1PlWDSVDjEeQFJMVcmnoJV6tcoFvG1ylkAbMzVPLImvkUYDFdq5ytU8KGFLPAZVztCoFOjVCvRqhfLdCty9XrqDTra7Ae6/RYGUesiLCbs+E709Hbc9E7c9FH07Ev55I/7BSf75Be76V93kn/vEc6P8J93kN9eMk9P2n4tB73ptuCZflA9sLlXwEXrwIAype/gd29UQC+02En3+sutZBq/bqVeDqWczbb+Gq0+01f5SzNdb8o8vVg2cvZpuOpzo9jHSIOYj5afyk7+E0pfjc/bRxjNYPU2yhELdHDX0QY1Vs+HPUCZmo9Nf7x+zuAb36/ALh6EfDDBcA/ARd/u3jB9Y8f6Vr3Gtw1noUb9YUbdPmpd/ioNnsq1LvK1bnIVjlLVzvL1bsrtfqqPPNX7wkG9yN0h2IMR+KMx5PMp1BWE2iraZztXJrzAsltgeIhzvBeovks033nyZ4LGd4iCnSW5DlN8poj+4rogWJm8CInaEUYsSKMWOUjVvhhC0yYiOq9xPJZz0OslSTv1TFOWzmT/Fjdf122+uG/aNlrNCO5XAf1NM17Hr//2/fW7xF//TdL51Gum+xwlOcUL3a9OrUP6ToY6yDihO80pe83U/YaUhaKg8vitLBGEpkuqv1o61GSXa6XXHmMIdFaLkn7dn2sZX2MDcNZppdi95zqkOuqQbV5mOciVeYpUxkOrArTagjWeoY0qw/R6wyATEXpz6DMJ9Mc5zOgayx/cYb7bKpTXwi4y1u52V9rlBF91F+zN1C/1la805G/31ex09e4PdixP/L8dOrFZk/d/vPa7f6a3YHWrd7qvc6ciSyky72fzK7/aPHgf+Hq13musi0pji/yYgcrcP1dmRXtWXk16dxqLKsCyaqMY1VFMipDaBUBlFIfQoEbscAtJds+RWhLyHEk5zsTcxxwXMtkphEywyghXT8mTSuWoJ2Qrp9EMksiWiNJ9skkJzTFCUt1SWN5AKhICAOrR8XoJCPUQr2l4U6SwS6S4W5P/BykvW3ve1jf9La74+v00NfpcaCHVHSgEi4RmIICYVEaGDQIi9FOTtBMjFHCIFUwGHUkUjkpWRmDU8OnAbF4NRRaCYNVQeOVYxFyYdCn0SEyeJIaRajBygVn5etlF2pl5oOzCnSz8nR5PDCTqc7jgrKzdDOzIEKBFp8HFnKB2XxQQRYkT6AlYECEZHU+STUzXT07Qz2XppnPAOXRgdkZ6jkk9RySeiEVWMKAFDOAxQxgMRtUyoVU8XXqsgzqco3ay8yH2xzHu92m+6Ar4+E7S5iX6/FHS3Hbs0m7ovjXm0mfDzjnp1XnBzVni8SzGdfzfdyn3aTz4+j3x7VfT0beDnqUwO8YXgY8AACufwe4dvnSDQDgBgAg8Q3A7c+fWA9uVKv+NRqssFcYddZd+H6o4rS/+mU9eYbkspOP2KpLfT9UcdqavZgTOxoBWisO2SpFb5UTx3EOPd6K64yANYrXAMwo+Pol8ysA6cuAqwDAVcDlXy9+8/dZ/x3gwq8XL7hdu8I2kmzyBLaHGfaHGfT4a3bDNNqgyo3uCnUuspVOUuUOklVOsg2eis1QlY4AYE8opC9CZzDaYDzRdBpjNY2znUmxm0t1EJGcxenuCxQPEdl9Pt1tjuQuInuKKFARBSqm+y8zg5bYoWJm8LIwbC0rcjM3ZisvdisneokbKGL4LHNh24Vx25X4w0b22bPMhgR30CWA+T//HfvwKgMiXWinydCTcf7xsul335l/eylF8U6Fo3JfhOsUO3q5CDWQ4NIbbrOcFbdZRxQVJ29WIIdYULLj0ySdm8X+4IFU62oEsD7WnO6uHKz0V5zW7ZIQQ5KlLMNJ4QXdvTRKj2j4gG4rmen0pNxXsTvNrh1rWx2qM5Du2o9xbPJSHYCpjUTpjiZbDSdZ9UebDCaa9ESbDiRYTeBdepPsn+Oga0WEvVrWajllIR8rLiGu1HK32op2uisP+quXmzN3uguPJjv2R3sOhtq2nmV2UULcH/zm8uh3L4U/o4DXabaP2gjuz/Pi+iuwPR3c0mZmdjWGWR5DK4mglYZSS/0pxVBKiVd6kRsh3zk11xGbaYPhW2IFFqlZloQsqxS+CYqln0QxTEjXi0nTiiNoJxD14tOMY3CmURjTGJxFHN4qkWCDpToD+Cg9ejyIGKmaBJcPcnjkbXHPx/pegMNDb5sn3rb3ofZ3fR3vedlJeNhI+Dk/QsAUEuMU8Th1XIoaGq2Cw0KQ8RpxCCVUvCYaq4rCqCAxysl4NXSaBjpFDY1VxeE1krEq8TGKiECp6HAZLEk5I1OTnQcS5mkLC8DcHCAnE8gWgGlMjYwMFQYDyOVCuBwNDkOdTVfjMtWy+ZpFeVoF2TpCNiiHBhGSNfkkdQFRXUBUzSJr5FJBuVRQbrpabrpaQYZmMQNYRNcspKkXMzRLWaBKHqQ2U782x7CjwnKix31+CCoa8ludCNtbSDjaTDhYjdgXJR2vIF/vpn88Kj7bo71ZTz+d8tpoVXq3iPi0k/5lL+b9EebTJvtDu0uc0n9BgO+VLn8j+w1A5fI/ZAHfPAJcvA4A3AEAZAH/srj8Y9Ltn/sCgO+r0W+6ck76mt7012xnIiYTQWs89+2C2KMy3GpB4liY3iLNfasEtZyXOJRo3WwjMx+tOxanVqgvC74EuAIAXABcvgy4/CPg4hUA4D+Ab368APgn4OL/LgKcrv2UaaPc4qPdFmowEKzXGwDs8tdogyo3ecjXuchWOTwttXtcave4ykm21lWhGarSDtN4BtfoDgENROqOxhuPI83GkWZjyRaTGOtZvP0cwXEm1X4qxXY6xWE6zWWG4DpL8hRRfBfp8GVmkJgZPM+GL3KCl3mha8KIFX7YLM1vmuK1wPRdz43eKE/ZrWefNgkIpirgCxcsvv9P2J1faaqPih0gWeYqLj9/p3zhG0nAJY8bP5cYy7YGWI5nhByWE0eTvfoQ9itZSWvVhOk85HJefDvOLVTlV4zB/ZYE03aUfnOyKd1VOUDlaoDCNYzpkxy4LlLvYRYMMsKBUV0UMJCbmR7KeR7yNWHaIxzYAMOnOtpolOs/lObe6KM2EADsD4U8C9TsgEM64KD+GKM+tMMEI0SUjxynhz0Lt2p0h9Q4qJTaKlX7ardHWI0QYNOMiAlm5CQ/doSF2KwibA/W7Q52Hgy2rjdziqJsXSX+5yP5V6T2LbyhBMfx6QAv9EU5dqAW31SfVtxAyK6IZpQEU4v8KQXQ9Hw3Yq4TIdchLccen2WLFViheWZIplEiQw/F0k8RGOF5Bhi2VhJZv9YhiAAAIABJREFUN4GkHZMKikmFJKTpJKQaxWKNYtGmsRizOKx5UpplCtUekIk1ZCVACAi1OB8ZP9sH3lYPoHaPoHYP/Bwl4a6SEb6yMXClCD95uPvTQA8phL98TIwcHq9JIGqm4NXRaLX4aOUYhEJyvHoaWYOYASZQIakUEJaomYxXRaeo4YkgDF4djVZDI9WwOFUiQz0jS42Zo87N0eDlqrOz1Bg8tQymMoWmTGWoM5maDIYGk6rCyFBlU9X5LPW8LGBJgVZRnlYmVzOPAcmhgbKpwGwqMCcDmEcHFrIghSxIIRWYT9EoomuWMcEldGAxTbOUASxjgiq44GqBblWmXlup2VSPx9K43/JEwNpUyOFiwv5GzOZi4KE49P1m8pe9kvPDhnfrwdtDEe8mY/baDI4mo86P6z7v0D/vYs9HQ/sJWh53vre/fs3op3+Y/uey5T9+0AFcUAMA1AAXZC/9+/F3Pzz89qIUAOB9/afuaIuzitjTBvpJC3OVE9juIyNOtTssTlzNT1gvw41H2fUHQLZ5EUs0754gnVygRJ/zk0bXv6KlrsteAvx08fI3l767fAHwwwXAvwCAf10A/Pfixe8Bl368ALD588dsR/U2mF5HqOEAXKc3EPS3hM2eCo3ucnUu0lUOTyrsnhRZPSm1lapykq33UGiGKrXD1HqCQQMROkMxBkMxBkNxhmNJplNoy2mczRTWegJtOY62mcLZz6a6zKS5zxC95jN8xbSAJUagiOq3QIMtUP3FtIAFGmyO4iOi+i1zgjfyEzcrSbv17NWCdI8bV7QBF02//T7gr98yFO4JzOXzrJT9bv/6FwDwPwDA8ucfSq2VOxH24wT4QR5uIMp5ItlnIw+7VUtZKMIu5WNGWIgQ1as8b43GBJOycM3qGMN43dv+ytfiDaVYUFC6o1yC/oPqeMsukkuC3h28vgTfRV7oJteUaD7MD5osiHlG9pjKDR9n+jXAgV2BwH6Ebm+k7mCU0XCc+WCC1RQtcFKQMJKNGc9GT2QEdYYY1bqqVDop5elJVNnKdcG02mDgZl/gs2D9zjDjdXrQUh19q6V4szFno5ZMd9PwfHg1SOEWyV6aavUoB6o4Whg/WEcaaibUV6PKmnCZpYG0fF9Krhcx0yVNaIfn26TwrLAcCzTLHMk0TaQbxVF0YtLBSVQtNFMHy9JBM8BJZO1EIjgGpxmJ1ojBQGJRurEogwSMaQLGFJligSVZkxiOAFayHiUeiEeoxvnLh3pIh3gphvmq+HtJBbhJhkCl4kIVMbHAxHCNcF+5MF+Z6ECFmBgVHA5EImmlpgIxyarIBGU0UiUFq0pnazO4unS+HpWrR2Zp48lATKoKJkUVi1dLSdMgkoBUJpiZBWLnafIKNLOLIZmFIG6OBpOvSueqMrnqfAGILwBxuBpsqjqbqs5ngrL54MJcSFmRTnG+do4AnMcBFXLAxTytEr52CVerhAsp5UJKOOBiGqgwQ7OYBiplgErowDIasIIBrmJplXNAVXydaoFee7H5VI/H2mTA2jR8dSpwawaxuuC3OBV0OAf/vBb7cUHweY621aa73KBx2m/67rn1ybD11zX0+XHe2/3YsyYVptUN1+s/uT36y+7Ov5xv/2b9x1Wj337Q+AFg8O8frf77D4ef/+l49Qe3uz9BH/+CAv/ZHim/km62SjbdJNtPR5h2uWtsZyKWS5GzOQn9KPsmB8nFZOs1gmWTNzDs5k81liqlDnJ6V396AgDcuQC4AgBcAgAuXgZ8cwnwPeDCvy9c+P7Ct/8CACyv/iB0UG0PNOyKNBsIMhgM1+0NBHX4qbVBlVu9lVq8FBvd5eqcpIqtJYutJUttJSsdZWrd5Bq9FNr8VLsDNHtDwM9DIX0R2oPR+iNxRmNJpn9n40iSxTjKegpnP53iNIV3nSZ4zlF8RBmwmTTPmTTPmRT3KazrNM5tJs1rgQJbZYdsF2L26hgnHdnD5FiDiwCDC5f1AZe8rv5CkrxGB9+ptFCC373680XAXwBAhMT1Rm/tgSS3hYzQubSgrhCbeVLIRh72oJYqzkUtFxG3qigCGITnq8z3lC8L1mqMtybbS0XoPAzTksgK0Q8G/hYBudVJcq9K0A9X+4Pnosy2k+K5yvaQ3UczwxcqMSM5iOn8qHGmd2MI5Hm08TDGeiLVYTTZpj/Gco4aMF+EXKwmz1QxRDWMuUL0EMWvK86uIcCo0UWt1kmpyl62yOpRlcPTRjelFne1BaSLWBCxloNeykreKEYnGz30l7sRC3mcDYdkeytXRRuIGtK7Kgn99Sk97YSaVpyw2JeeAyUL3FLZdlimJZZpjmNZYBgWaLp5ItUkjqwfS9COJUISSJAkCgRFAaMo4EQiODENFIPViESqhcerhUWrh0UBI2O0YxJ1kVgTHMEineYASInXRCKU4kPlYgMVYwLVYkOA0aEa4UFKwTCpyBBZTLwaHglMilJBwGUQcJmYULn4aBVkvHoKBpiKAWFRGsRUCI2uS2dr0ZlaZCqYSNZMp4GpLD0yVQuLV0tCyqMxypgUZSJFncmH8PJ1+AU6mYXa2cW6WQXabKE6k6/OFYKEmRC+AMTjanDYahyGJocOErC1cwU6BdlaxblaRf+HaLf+ajvhor2/SO3pWDsz7dRbSnEoLkmIh+Du7sXd3UKAJMQ9IUAI7k6x4u5OS0vdxupe3h/mvveuddb5D/Y6+3z2OZXoKiFKwoPXCJBNIpPmcmyTENPIRzTw4HUcaA0VWlUKlpAhdRRoHQVaT4U105GtTHQzB9nKw7TxTfslNov9nvcWbjxcCb+7FHJ/NfL2suf9ldRP94u/309/OR70sMNmga2+W2WwwgU9qr9+r1ZntxFy8C/v7Yu+p60WLLPfU7WupoCVUuAXovXPRRheDdW/Eq5/KtrgFNFGjm5zmWOnWB9gIPa7TrZWIJqpsVEXh3zVd9IxW4mmfbZXV9NNnlZE3aOGT2RgumzlV6Mg68nQUjMldQBwOnfG5txPioDMdQAASUupHAKOywKADABISR8FDh8FgMOA7FEAcDr3s8DJYCTKciLNYS7eajHZcjoWPRoOHboBGgw0HAgwuOmv2+2t2eqh3eR6vd5JrdFRrclZtdVNo9NLu8dXrz/QYDDYaCgMMhoFm4hFTiViZlNM59PMFzOtFzNt57Ns57MdFvJcl/GeG8SATXLQNilomxS0Vey/UeizgffdIgbdpkfuseP3K3KedbE+zzT0pYVYAFL2R37AAoD7z7+WKp3vdQZPeZt6njh+RRqAHZLhG6kNhZstFQbdoyUMRthNJLpvUuP2q/L+bCrZYsbfriz4u5dVHoHG2V6kuao0x5gt0CN5wfqRULko+CVOOMJf+6d4+NWbhS41cZA02KXqEITAVas8yGiOH7lQlrBel71UnbYpSRvNt+2Kgs/kOU/hXZbIPmMZ9mJ3g+5454m8G+uk5Duc/IeVxL3ygk12ylJJ+FC8c2cgqsXPuD0EMZRoOZ3tOJ5o2RcMnY2zXClw3SUF3OfG7nAT4yEXo8FXM81Va+OxrWmWQwTPhxOimzWFPZWJ86PkroGi6pYYblUIo9yfwHbBMewKmfY4ln0+wzafYZtNMc+mmGWTTbNKMdlEdBYRkU1A5BCRGUWQzGJYOg6emg1LSDGOjDGKiDCMioLEJULTs7B5OMtiogNALDTFZUKzEvTTY/VTI42SwgyTIgySYvSz0kBFODiVjCET0LgcSE46OC8TjMsC4XKg+emg/HRQfjokPxNGKsEy2KZMPoZEQODyjTIzdXJzDYqLYUVF0IJcUE6mfl62YV6+QRHJiMKFc8rQHCGKLUCyBUgOH0ljQmhMKIeD5HIRXA6Uwwbz2RAuG85mwgVsVKUALSlDSUSIagFKwjcRc2ASHqKxzKRJhK3noerYiFo2rIYFraHAq0jGEiKkphRaS4LWkqANFEQzFdPGRrWw0K1sbLfQbLzFfmvM99588M6U3860786k15+b+d+e8D7dTX40hHjcZbQjMbzfajTHuL7G1JylqI3gFd6v5X15Jn7RbN3qd5HvqcwKVC67cZ3toSwMVK8KA7XFgOoSUZ1J2O5YtYn86+0x+vnQS3HXfg//9UT8+ZM5cqco2n9wMZczVY6KzK88KnLaiEcup2Hr0EqDLlrtLqoBcj/JA4AKIKsjDYCBw2ZSh+xkZJDS0vLSwP8AAACkD8kclQEAGSnZ4wDgc/UPgb3erUiLiXTHuRTbpRSruQSzyWjkaKjxUJDRYJDBYJDBgJ9ut79+u7d2q5tGo6Nag4Nqg4Nqi5Nmm4t2h7tml7dWr5/uQJDhUBhkJBL632CcSzWfTTGbSbGYSrGaybBdyHNdJ/j/50W3qTe2yYH/5wGKGXGHn7gnSrtfmfu8l/dprr7cz8ZO+ojT4R9MpQALmSMFVy+M+5o224BRUtJagLTPiSN1Zppj8bbrpRHz6d7NrrC5nIAtTuJ+VfaDstQ1nN++KPlxNa7ISpXnr9OSiOpMt51hhddnWUUYX00xVy721PNU/zVcX74yElUZZoAzVeV6aPNc1Guj4ItlMdPsqKWqtOWa9CVe1FAc/GYkYibPdYESsMEJH0i2zdT5w/kkUKhygaWvIIKqN9iA+gJtbsV5TKR4jiW7TCU4j6e4LhYFrtEjl0qDRzIcBqKwo9HYyQSb5Vzn25TgxnCrUO0LKWbqGZbyDSkWo7TAGWHU47nqmW7moCR1c5I5Ok5v68vhS0LY4iCKwL2Y41DEscOxbHJpFrk0i1yqSSHLAs+2LKBhswmIzGLj7BJoDgGWiYdm4uEZ+bDUTHhSMjQ6GhwZDoqKgMTHw1JTUdk5WFyhFcBlOlOJlvhseFacYVKobsINndQIvZwkIzweQaVi2RxLKhldXAgjFaFpJDMyAU0ogBSk62cm6KTF6KTFGuZmQotKYCUUED4PnpsB+r9JfU4mKDvNMCfdqCDbOD/fqJBgVEyFkGhQEgVGosBIVGMCCVRCAJcUGxUX6RNLDFhUYyEXKeIjmUxjOhXCocNEXFQFD17BMa5gwiqYqHIGvJKFrOFj6/mmtRxUNQNezYDX0GD1dFQ1GVZNhFUTYdUEaA0RVk9CNJJRLUxEMx3dyjTt5JvdqrVeH/LYnfJbH/GY7bW8Pxl58Jjy9bng9Z2kfxdNvq/avJ60eL9q+mHc5fWw2X6v3m6l3otB0y93vF4KdGazNFer0PPtiJ32gLVKnwGy7iQH2Y/XEQRqSXyVq82vloOuMq6fK1Y7SwepiEx1Kw0vFsspJPx+xuHH40aHTlj/eGwg2GA6XrPZUzdV7g+y3rkyrKrbT0dRh49jpY75Hpf1PflT9OnfE3/9LeSHExaHj8sD0kcAAJAGpABARubQL9JSoaqXBXa6Q+Fmo2n2c6l2SylWC0kWcwnYqSjkSAhkJBQ8HgoZCwEPhUH6bxj1+ul3eOg0OanX26rW26o32l9vdlJtcVZrc7/e6aXZ46vTG6h/M9hgIMToVhRsNAYxHm8ylogdSzKfyrBfxntvUYI3mKHr1OBNWtBtdtg9Qex+RdKDmuxHTYWP6/DPe3n/jlbgTfVtgEP2UkdtDkmbAIfCT52gaJ71+RXQAWTQ0j9lq51v9NIfTrSfyPZqdIV0+2L36El3q7J3ypKWi/yX0l12qD5dUdYsJ6POZIveXLO2TIsxdkgP1feGweVwyMUUc2V3lVO+KhcFwfDKMCOSlTbbXUPsrduTabNWlTTPidmozV6UpPbkOg2FG92KgI+l2S3RgldYYQv4gPFUf76zCS/CsTc3oC3CQmCmyocoCAyu1UKVhh0MRgPNZ+Kct4iRW8y4CZzPYIrNaKLFcARyKNpuIsX6VqpNtMYfHkqncx310i0vt6RZTwkjZyvit4b52xNVsy0Fy0OU4SFaRW0Co8yHUe5NLXMj8B2LubYFLPNsKiabislnoghCC4rIGs80ySYaZxSDsksgOQRYdjE8Ew9PzTFOSAHHxxvHRIGjwyGxkdDkZFRqKio9HZObZwaIOI7UYtOiLERuIjg9yiA1WjcjQS8vE0yiIKg0NINiQiiA56SA8tON8XnQwjxDXJ5xfhYkNxWcEW+YGquTmaKPyzcqxIOL8ca4XFBeukFOikFemlF+Oig/C1SQCyrONyoqAOFxIFwhiEgyptJhFDqEyQTTSTBioWFRni4Rr88gG5dxMeUiTLkIVcHHMslgOsGQT4dW8TCVHFQFE1bOgP7HQiVMeD0P08TH1rERNUxYHRvRwsfUs+A1VGg1CVxLgtaTELUEWAsZ3Uw3qSVB2lmoNiait8x8qsVt4abnaLvtUoPVu33cxz+TPux7ftsO+rAZ8H638PV+3JcV17cbfl/uJn3dC/13LuDVjOvHac93Y5D7Vdf/Hr7xZNj/6Yj3Is9uOMeoL0ujOVSz0leh3ePaoNWlNvjlPiuFpRua4xGQIT99kYOOGKFEUr2co6Rw4/Qpm2PHMrTOD/vJS+yu2574weTocZcfZX2O/S/1jysFF89mXvqVcPkP6uWzpVfO553/w/+nn9RkpGQBQAaQBaQOSQMycoeABP0r5Y66fVHWU5musym2C0kWi8nmc4km41Gw8SjjiWj4SDhkJMx4JBI6EGLUf8OoJ0CvzUur0VWt1kFFYqtYZ6XUbK/eYKdWa6vS4KDe4Hy9yV2708+oN9CwPwQyHAUbiIIOxSHG0yxmcx3XST47jLBdZvgeL/pJZebDiuyH1fgHzcWPOokP++jPBrhvekRZGtfcZWWcj/zP7tiPFsARLHAMJSODOCRrAhwOPv6LCKre7QUeS7Tr8kCUW2hMpnve5mTd5eF2yEl9AfAhH612ExU+WqE5FN6fbNIVi25JtGnMd6krcggyuBSgfyXJSsvk9M/BmvLV0SblQcZkOyVJuHF1LGZGEL9Sk71amzPLj54s9enPtOz21+kNMhpPtloq8V2k31jiRC8z48cLQm4me60KCrZ7RbenmrvLCm/i4yptjFmq51igK/VY3ZsesKlE275oy/FEy7F4eHeIYW+IXns0JtZQHnLskLv8WbIriOSqUR2HGq9MmBZEbjZmbI2Q+zsKelpyx/sIlYIQtsCTyXOnsB2pHCcKz6mYZZ1PN8exLUqF5hSROa3cjMAxKSAjcCRkUSkaXwovKMXkFsPTco0TUo1i4wyjo41iY40TE1HpKaisdHRWBqKwAAtwaZaEPBgu3bgwDZ6fbJyTBM5PhxQXoInFSGIxklgEK8wGZ8brZSUZ5GUa5Wbq4vKNcDkQXCakIMMYlwnB50MIxdASAphMglOISDIBScTB8DmgogLjkkLjwgIQLheEyzUsxkMIRCiFimCy0QwWksWCs2kIJgXGIEOZFCiPiagQmlRXYiWVmAo+lkODMkkgPgVazkJUspDlDLiQalxJhdWw0A18k0YBtlHw/3L59gqzFj6mkYOso8Mb6YgmGqquFNFQimyiYZpoqHYWqokK7eKYjtQ6jrc4jrXZ/LWY9eUp5eOL3I97YV93vd9ve7/eDn2/m/zlQdTn+74f7wa8u5Pz9k7hx22fDwt+f65Yv10w/zgX82jGe6PZaLPCbqHS61G983Su4mqQ2pDDtZ4b6Olkw41Uhe141Xn3833Wcj1uOgMWlzqRF2tgCmKDC3SlU3i5P6hqlwuun4y9eApnoMpAqwvAqmKNC2K1P4SaymylS5yr58mXT+Mungk7eUL78KEj0oAUIAsAsocAQONH2UyIQq0nZCjeYT7PZynTZTnVejnVcinFYjoONRENnYxBjEVCxyPhY9Hw0SjYSCRsKAzSE2DQ6qnZ7K7R6KLRYKfWaK9ea60qtlCsslSqtFISWytX26m1uGu1eWn1BBreDAUNRhgPRMFvxWOW8py3GKF3y+L2xUm3Jcl7tVmPWvCPG3Avm4qeDLCeDXDXWdmxF34N/+Vnv59POBw5bit1xFrqmNWho+bSh5wPH8tVvChGKw0GINo8kAy9K7X2Bgv53ru0iN3SqAYnCFH3Ih18TYTV6vTUX0lG7WRhtzPMFjKsBgoc6nF2tqonnPVOZfsY2l47eUPrTH0cjO2jSffWFkdCp5khD7oIW415E6yIfpzbWL5TdwysN1B/INR4LMl8och7iRGyzI3Z4KWsMJLXUjwWk3znC5J22sWbi31PHkzNt7OnmBldYS4UjHbEhV8y5E812OmPRqIn4i0Go6yGElAMBwO7M/8zPX3U//rZNKRydYx5TTxiri5/uipusz3vyXTVeCuhWRLV05UiFIbSuW5kplMxxaqIbEGkWxFZNiS2NYltTRPZMittuRI7Rrk1kYEtJmNIDCyFbUZmmRWVovNw0IxMcEoKKCXJODUJlpaMTEuB5WShcPkmVIotUMG1pZUgS3FIcoFJSRYSnwkvzIIX5SDwWSh8NpRciKAUwUtyoSX5MFIxklgEo5DgpSVwAh5KKoRSiCgmDcNkoOlMBJON4nGxfJ45jYwsKgCVFBmXEhGFeHBxAbwwD0wiwKk0JJUOpzEQVAq0lGTMZyFFPJMKgbmIZyLgIER8ZGUZqlwIF7FNeDQEmwzlkMB8srGIjqikI8up8Eo6vJZr0ijA1nHR1SxYFcO4imFcw4Y38lH/YdJ6FryJjWzmYBrpiEY64j8RNlMRLTR0OxPbxTMbrrG6Nx1y8Kz6+1/Ur4+53+5kf7sd/Wm7+MNd3++3k9/cSfiwn/bpXsmne1mf76Z9eZD+6QHuw53cz7vx/+wlv5m/8deI67MRz8c9Lg/rTLcT5XpdLi+WuN1j2d8t0ttMuz4feG7JX3k61mEuFDLpdGbK+vd5K7lVc/kFE4UemHyD0aVW/Z+HnODjITbdN0xuxjgMOYO7dC7UK6lUql0WK1/kK1+kKV6J+f03LSngKAAAgCwAAD8AAOz0z4VotZYAxGiyyxLOfyXPYy3bYSndZiHVYjYBMxWLnI5D/df/o6Bj0YjRKPh/R20dPjotHtfb3HSanbXr7TWqrVUkVspia+UKS8UyM3mR+dVKK/laR6VWT41uf90uP52eAIOxaNRgltN0gddmachtXtwdScZ+C/52Td7datzDDvLrQaHIFRn3+49ZZ/+IP3PG6/iPLoeOOcse9f/xZMjJ36N++5VmIN/hZlCGUihWuyAEXxwIxkymOG7m+/W4g4lqp8qQBsMRwUspVmvxiPV46FIiaiXVbDff+jbB/VaGU4SRksm5o6GYa3ZXj6XA5KqCYeWhyNpUizGq75o4fqEsbpgS2Jhs1ZVgPpNt3+Wv3xdkNBQOG0swmy/yWGGFLXFiV3nJW7z02dyY2eTQheigpcSIldKs/R7xxkjtw52hR6N1g5xMuzM/BP9xXOykMZhmM1UUNJbt2p1k63HhF+yvR4MNzoUYnI4yvEx00q+JR6y2lmwPkFa7SI/Hau+NVvY1xdc1hpZVh9MFHmSOE5FuW0S2INAs6Vw7ttCBybdjVjpwxI5lNY7CKkemwJrOs+KIbMpqHMvEDkyuZSkFU1KCLsxDFuQg8jNR2amwnAwYLhdJLDLlshyAukpHIdOcQzGlFmFKcuHF2YiCDOOsJIP0WP3cFANqMVzIMuUxTLh0LIdpyqKj2QwMk4ailsLoFASfgxUKzHg8NJeL4glNhCILocCcRoYX4QxLiowJBERhIQSXA83NMijGgyg0GIOFpDEQpUQYsQQmYGPKuNhyvrmAbcKmwTl0mJCNEHERfDqSR0MIaUghBcEvhYnIiEoaWkzHlFOhVUykhIWqYsD+q2oWrJaDqOchW8pMWkXYJgG6VYBpE5q0CjAtfHQbx7SFgWqiIdpYZm0M0zYGerLJ4eN+1qenuK/PCQcvMg/2wz/dCXx/N+vjfsb3vbgPD1I/3Q39fp958IB8cMf744PE94/pH28HHWxnPNnI/Hc76X2vwz2SwV6u/lTo1Y4IlcVqv4cSz4c4460YjdvRimvpkDl29gaXvEeLv0O8sZfptB8Ov+2tfScStp9hvhCgtRTnsE5IWw93nXXQm0lyXot3HwHLdWqfb9GSa9a8UqstL9S4lnjqN00AOAIAgNQhWQD4FQCsL/5GMNVoD8GMpbgu5fst53mu5TjPp1rNp5jPp5jNJmEXkk1nEzAz8ejZJOxsEnYiFjUZhx6JhPXfMLoZDOr01e300W/z1Glx12px12p20252025wvi6xVa6yU5bYq1TaXKu0lqtzUm52UWtz0+r1NWwN1huJQq6mOe4S/NfoN7arEh80Fz5tIT4U5LQGW8WfPcpSlmMrXss890fQj8dDTp4I+Pnn0B9/Sfn9j4STJ6iGSu2eqEK134qUT7c7avb7wVaSXIa9oeWG5+rRGmtJ0evZhVsJfjtRlvfjobfj9VdjtDZTQA+LrfYJjqt4W5K1ahpWJdX0csUNA3GATkuC6SDBvQ/nNFjsPkkP7M51Kg8waI9E9YXBuv31ewJB/SGQkXjMIt5jjRmxyIpd5iRu8FI2uJnTGUErsUF3MxN2C9NHMiKaorwm8uPbMm9UBzkwkZp9AcjBZJM5RvgoKWgUZxNtdAV6RNZB7rdch+thoFMZJmopyMtMb71+SsDeLdbWsPDusPj5XM1wWw6X5yuS3KBz3WhcZxrXicqxp/HsOOVOZRJXfqUjR+xYVu0grnWsrnWSVDtLal2qm11rO1waWz0ltS6iSgcO35pCMSUWm5TgMPhsBC4XgS9AkEowPLYt0NXkWV9hX8m34tPN6QQUBY8szjHOTdHLTdIvyTESMNG1VVbVlRblfCyfa8JlI1l0JIuBYDORAoFJVZVlVZUln49iMo3ZXBMu35TNMqGWIkpL4IRiGA5nXFAAzc8B5+ca4IsMqXQYl4/lsDFkEpxMQLKpKEYpnEqAkYuNiQVGpXgjFhkmYGLK6GgBFVlGRZVRUUISXECElRHhZUS4qBRaQYGLaUgJA1nNRFUzUbUsZAMX08THdIotuiVWXVXm3RKz3lqzm/Xm/Q0W/RKb3nLzNo7yrhT8AAAgAElEQVRJG9u8hYHt4Zmv93l/uZfx9WnM1+cxnx6Gfr8f+vVu0YeHvM9POW/2or48F366k/N1L/T7febXh/hP96Leb2W+2Q38Z9Tqz36ff3pcHxRABmEKTYanpxMMn3fl36v3vputupeocSdB/VGR2b3y7P0q4qOKwnti/oNa4QMR8REt4m6RzX2603NJ1oNKznYlZ7U0dd3FYNvkwmwAaCvNYxijfgt+tR8k3613qdngapnG5ewzvxtJ/QdIZQ9JA2cBwPHCKaKJekswaiTJeT7HdynXYzHDcTbVejHdZiXbZjXLZjnDai7ZdDYBM5dqNptiOhGPnohHj8YghiKMhyOhfTcMuwN1O/21uwJ0uwP1ugP1egINuwINmr00m7wN2gNAbf5G7X76Hf4GzZ669S7X65w0W9wuDgdpjYZDp9OtZgrtF4nuC3nuA0FYMew6UfkUXfFsi766WFk+78yvqed/jz11IurUb0mnThdfkUv+9fe4U6dDfv0pXf7XVnvDFgdQvweyx0a7Dnq2y0J+xBO+FhexnpCzFBu6muS3neGwmYzdzXfeIYVuk4Pv0X2e0QK2GUE38e4VCVbx4Mv5COXOeLOuVOPWJNO+LPvxYq/6SERVgNHNeLMyW+V6V+0uP0h3gNFwFGIR577GjFrhJq0JU9cFyXP88CXKjdlE1zFv86VQj/2C1Aes4ttcwiY5/XZ+4nqS53ym41i+yzo7fI7ox3HW0ZIGYD/9L1D3IsnLIBJyvthFNxFxJg58oSLEeFqcvDsquDtRfXeyaqSziM3w4bF9aTRHGsOBwXVmCV3YIkd+paNA7CCstK+UONZUOzTU2DZJbFtqHNsaXZvbnJs6HNo6fOqb3cQ1Dtwy61IquqgIXoJHluBQRfmw4gI4mYAWcOyA4U7/tjrnhiqHukp7SZltGcuCSUIzSpB8urlYYNFYa9PcZFtfZyOuMK8QmlQITYQcrJBvWl5uWltr3dhqX19vKxJh2GwYhYpg0FF0GpJJQ7EZWBIBXpBnWFAAIZOQlFIElYZkcTB8oTmHjSETYRQSnEaEk/BgAg5MLISQcBAyHsouRQkZZiIGhkuEMotArEIjRoERPdeAnmvAzDXkFIKEJdCKUoSYgqqiIivJ8EoyvIaGqmOj2kRm3RKrgQabsQ6HmQHnxRHXpVG3qU7nmzUWbUKTdr5FKxvbxcfuT944eJR+8Dz72zPCx8fRBw/zvt8TfHxK/vRk6P0D8ZenlZ+eDXx+kPNpL+31E8HbO4Uf54I/Lec+Kdd8WKpz0/la3vlfiJd/3cI5vR7LvM/xu5NruJuv+zBffb8Y/Uyc94wW+zhWfy9W82EC9mEa/Gmu0aMs3ecpKi9j5B7n2r7q6XrZ2fQwyWrP/vSG89Up9+t3slynPSCTRhdvwS73gy/2IpUkunLFl8+jjx45DgCAlKyMNHARkLL//SQeoVQXALuV6DSX4bGU67GY7byU5bCa67ie57CaY7uaZbOSab2aZfN/Iodk06lEk9EYxEg0/FYUbDgS2h9q0HdDrzfEoDfM6GYEpD8K3h8F7w4Fd0eiB+LNbyVbjqfbj2XY30qxHc92nS/0Xy316Y22pJtpck11GhzA3Y7gDlN9iY5SrbZStZ6iWP1Ki6Zik7YKXfEc/trZ/MtnU879ln3uDFFOjqSgGHPitJf0MYKW0kSY1XiQHU/vCl/j7C17ozEX0Ki78ZiP6ZiX9XwcdC3H/wE5+05B1F5J2CN+ysOyzMe8tGfCzOc1pGetLfea2/hhbhR3je5kRHesqchff5rg05tu0xSF6oozrXDTISIvldlrt3oadvjqD0VClwrdtjkJW6KszfKMVWHiKi16nho6VeQ1k2w35YMcsYVO+zqsJIbt5sbPxfmOJbssU6OmiWFLZL/GKCzmlx+UASmT0ydSsAoEd+0EuBIryBhnf8372m8FqGv1aear7bmP5+ofLrfPj9D5DG8W0YNKsiWXWtPodlyeo1DoUC60reRbVXLN6wTWTTyLJgaylgRtoKBaeBbtYuu2epuWeue6GsdykRWdhSkiQPNxoMJCKLEYXYJDFBUYk4qRbLolMNzl29Hg3Fxr31Ln1FLvXC+2r+JbVgutG2ucWpqcm1vs6+qtJBKr8jILIcdExMWU8yzLBGZisUV9s21zu2NDi51EYlUmwDLoCCYNwWWjKwTmFQJzBhVeSoBQyUgux4TJRrM4GDbXhMXBsJgYBhXJZmDoFBiNCKUR4UwSmklCc8hoPg0roJvySDBmEYiJAzFxIHquATXbgJZlQMsyoGfrc/NBfBxEiIeUl8AqCLDyEmgFAVbHwLTwzDrLzW61OKyMet1eCthfD7y75rs65j3YYtkuNukSW3WUWXTwUc+XIw6ep39+FPb1L9r3l23fHos+3s18cz/x/QvOwd+jH/bz3r2kfXok/nAn/+/70W92iB/Hvf+ts7odo8YA/Y6UlnY7LD2XiP46U3S3IekO1+kBx+MRz+0B1/9uDf15ZeH9GJX9kLPPoxXup2v+VaDzCq/zJEP7r3jdN6GqT7NdX0xN/DN280UC8qnPlbt+Wrsuqk8zHbaTHVdMLk1h5adMFacc9RohSqVXL5j/7+hxAACkDwHSwEVAxuL48SzQVbEPaCjeYSbVdTHHba3Aa63AY73QdS3PYS3Xbi3Xbj3HbgfnvJZrv5xls5pjt5BuMZWImU4yGYtFjMbAhyIg/WHgvnBwfxR8ONF0LM1qNN1mKNmiP8lyNNtxCu8xS/CdLPKZIAQtc+K3yzOfdPKzzI0NAcDx0HGSsupNLHLcGj1sjmjRVROpXixXOd+ie61K7WKZ5hWi/GmWshxJ4QJNWYGlolgHB5UqKSSdOF0gd6kSpV4JVqOqnh9xs5zxdpxwMb9lbzTqqrEcrrOXANqNd3ycFnM/3vNenMHzAt1XDOvnDK+nougX4uRnVaQXrZy/B0Ur4rzeQjtBgEZPlt0kyVcSAmmLw7ZGYPOMzuAML1LgytX2mi2e2jdDQXO5jtuchJ3yvI2KjFVRwiwzcpEWtVAUOp3uMxphN+iN7LW83o1S6MGAhn3MbpOj16jRs4UB3UkOdhePKUjLKgCA+cXfs60VSK4aqShVZhCsKsHES/5MgPzJYmuFm0Uue/2sl5s923OiSq4vk+xEJdnSybZsmm0Z07aKZVNLM6snopsIqLpCZH0epDpZSxylUhWrWZNh2FiCbGWaNAqs6wRWIo4pk4Yik5DFeOOiAmMCHl6SDyvMBhfnQSnFGGDyZvBwl29Xi0tro0Nbk3NrvWOD2Laxyq6pwbm11bm20bqswlQoMOOysMxSOKvUmE3FsOjIsjKTmgarhhbb+mbbmhqbCpGlgG/K56LFItOGGtsasaWQg+ZxMOUiK4HAhMlGsTgYOgNdSobRaUg+B1sptCgTmAnYGDYNQSdCKcVgCh5EwYNKcYa0AiMmHlJWiqqgmohIGEERglcI4xQY8wugwkI4rwDMyTMqK4RWlsDLi6BCHFhMhEsoiAY2YrDJenPK9+FW6NM7IQ+2/HYXAqcGHHobLLqrrfskNjcrTf/ZjP58L+rgKf3LX40f/xp+/4B78Cj14Bn703Pa55et355JPu8Efb1Hffe0/PWO/+eFtL8aXcf8TvGUz6nLHFEAALapysHN4r+7M190F7xsJNypyn0sSH3cWv5ksOd5I3k/B/UnTv+ZwO5FGeRvhslfOcb/pOr8E3vtzxvn/ynxfDU9+bqz5mGMwYvgay+DNZ54y+1lujzkEv/OCl53VF921Fj2hjRCFEqvnLX439H/AQAgcxiQAi4Bh9Cysql6F4UehgOxdpNJTnOZzuuFPhtF3ptF7hsFTls4py2c00au/XaB0zbedTXXfqPAaTHLaibVdDbN7FYMbCjKeDAM2h8G6wuDDcaZTmY6zhS4TxW4j+U4jxe4LpD8FqmBU6UBwyW+k8zI7dqC3caSFx2iMLCWCgAYS8sG/XSEp3auE67Yh1UbMoU2gNW5Kqclmherrl+kX/uNp3apUl2hGqTBU1chXT7XitEbssdQ5OUKzp/LOXdCqKI+6uE47GPXYQPvtwTPOIN3I4z2UrR3QxGbkbarqaGb+JRHxODnBfDXBMgblulTjtnHSrdP5cGvasJedYo+je//eWtkSpg8zQypiUdXhIBbY03LXPXzDM4WG14lGCoJsEp1zmrtvpq3kszW6NHbotzNysytqtRdXvIqLWqOFDxZ5DeB8xnL8+yOsxlMcp7E+ayUxY9zQm/ibfsyzUI1L2gBAORHGQUZAP7b8QzTK0wfrUSYYraNKjcM7n3tfKDK+bjrv1HsFEZY4Q/nap6st3Y1JnL5tjyWm4jvWclzEzPsJESzmhzjuhS9xkTtmkRQdZRWVaBilY9Cjb+qJERLEq9fm2lURUJUUTHlFAyXgmFTsaV4GC7LEJdhVJBplJumX5ABLslDAMvT8bO3wsf6/PtanDvr7drq7Rur7Ruq7VsaHJvrHZrrnBqq7cUVlmUCLI+DYDHBLDKMR0eKK8ybmm1b2qzb2qy6O216Omza263b2uw6Ohw6Ox1bW63r6syqqswlVXZino2QgeFSoXwGiknGlOJhTDJKwMOWCzACDoJGApfkgQpSoHnxkIIko5J0QyYeUkZFVbFNxQyUhIUppyC5xZCyUlQlDV1GgvFxRoI8Q2EOVJSLEOVBBbmg8gJwNRFRR4f3VJuvT/g+2Ax7sBX4aCvw7mrg4ojbaJfNQAt2uMVqqsXpw17Ol/3kjy87vz+vff+0+cuf7FePij4+7Tt4Xv7tMfn9X+0HDxNf7aUdPGp6f7v0Lx5o0OuKw6+/XZD6UVEKiP35h0+8iANJ4N8syNMy5HOKyrM89XvZei8lufeHxu9OrbyebHpTF/KGj/5UgnmVB/4zXu2vWJ2n0TrPolWekZ3eLt/82Ex/kgJ+Gn7tUbjukxC9hzd0/8GHvRWyHpckb6QGzvkY3USdI8qf0QZkZQEAkJIFZA79DABaR4Aw1fNltkY9EZiRVLvJZNe1bI/bxKDbpf6bRa638a57BLfNEuf5YscNvPMOwX2zyGUN57iUbT2dgp38z5fGIAbCIYPRiPFki6ksh7kir1mCz0iB60ix+3Sp7xwlcIroP0YMWuKlrVfi77fxHvYICpWvmEoDWsBRE+DHmN9/q9K9fBN2uQdxTaKrINJU5qlcrFS+WKkoJ9FUqIUrioxU6PIXGAo/16PkhxysmkEo1rVLAv1LPY4G07Z6w9CLgxi5KQ+1nRiN/Wi9NQ/4vJv6RiBoN8Z0n5T9uLLuOSf9DRn9lo39zDL/UJf3dbT7w2j7l6mWt+Otb241fRmrfdbTPslMrApB1/ipCx3kiHAlPFi+0ECBAL/KNVdtcNEeDIGtFLjvcmPXKrLW6ks2ynO2KrJXeclL9Oh5Ysh0gc9Mgdd8gecCxW+eHDBd4teb4ZICVYIdkoIcO4Q8Kat39JDBMSDUSI7ui8jAKqUhFTMxal6KP0bqnolQOZui9XuVj95Obeb+LHd8IGugNaGpPqBJ4tXMc6jDw6sStaqjr9eEX68N06qK0BGHa1eFqleFqotD1KoitGqi9aujDerjYA2poPoiuJCKoZMxZDy0MB2cn4zKSwHnJBnlpYCIeWhgbSZhfjR8ejBwpNtrqNOjv9Ozo8mlpc6pqc6+sdauqdaxuc6prsa+RmIrEVuKK8wrBSZ1YovuDseBAdfhW65jE65TU24TY87jY26D/c5dXXa9vY43+53a2qyqJaZVlRblXAsRBytgIfkMNJ2EIuKMycUwBhnKLIXTiRBSgUFhhkFOrH56mHZ2tA4h1YBXiixnmIpZpmVUpIiMEBChzHwDVgGIiwcLCMZCgpEAb8jLA3FzwbxsEDdDX1wM6RKYDjXYjHdZr046313zubfhub/ufmfFe2XcY+qm41in1US7w0ST05+riQeP0j+/oB88K/v8NOfr33Nfn/YePL/18dXUu/38D8/YBw/av+6RXt0ufDufOBFyzfr3H44DwAkAsD0ErKVBD9rinlMN79e6PKtx+qc6+s8K3xfVyW9aC/9tznrZRX0z2fGqnfqSbP0mXf7v+OsvozSexyg/Cbv8Jkr9FSn0n6mp9w2Mp4movyJUn4SpPQq8th+gfjsCtpNs+m9p/D+UjI0Iy1uYq2TFi1cAQAYAAGnpQwAASANnZKX8r/7GsVRrD4SPxFqPpdrPZbqsFvltUQI3iT7bJZ67xe7bRI8dqs9Gscs20X2r2HUD77ySazufbjmTYjaRgBmORYzEY8aTzSYzbKZyHCcL3WeIvnOUwKlSvwVa8Dw1aIoUNEuLXBFlrVQWPuwpm2rm+J274PPLr16/HPb78bib9P9yLvzRAb/aAT1XqXSBJyfPUjxfoXup3ki52Uiz1lBdqKJIOX+Jp3y6x0RhwAQt0YRXaKv2mCv3W2n3wa/eNL607KW5G6G+4a8z66g5YndpwVtzM0j5Yfj157mejyq4T1raX7eUvWlM+djG/DDW+2lu4G0f6X174uvO1Lcdqd9bIt73pv/Vz5ukFdT6wKpttOhIRZLpFZyxYr7BBRL0stBcqclN91as+QoxaEuYcqc2/34zdasKvyku3Ksn3akp2hTlrLKT5ygxU+SwJU70OCk4CXbF7IS005VT2NM/wn87piVzCPzDYRfFX3NtNIjOmjmm12INL0TqXArVuOh77dd47fN5xudb06x3+4j9dcnVHI/KMpcqtl01yaIiFcwLUeX5K/N8FIW+yuJwbUmkdk20dm2MTmOCQVMyuC7OSByhUx6qU5Og11AIE5HRTBKSVgwtzgZlpUDy04wKM0EluVBasQkwNRAwNRAwPRg4NeA/PRg4ORAw2O3d2+7Z2ujUVGffVOvYVOtYV2UrEVvXVts01ju0N9nc7HYaveUxNuE6OeO6sOg2v+A8OmIxNOjQ0WZZV41pqjfr6LCrrzcXCpA8Dua/KILPQrOpqNIiaFGOIbEATCkGM0qQ9BIYHW9MLYASM6AFCYb4RL3SDBC1yJhPRlWwsOV0dAUNUU5GcApBjBwDXhGkjmPSWmnWIETXsJFiCkKENxbkGdaQ4DerbOb73FfGXDdmnXeWnG+vuO4uOu4suKxPus0NOM30OEy2OQ7X2O3cCvj8IOnr8/wvL1s+PEg9+If3/dXE55f1H5+KvjyRfL4jeHOf8P1F06sWv1shys7Hj/4kDchKHb0CAI3Wuu97w1+XGn3oZ31b7vt7ufH7IP7dYMg/na5/1pi+LcO+YmFf0C3/5Ab8zY17m6H5LE77ebTGm0TVt0lq/yTqvsR5fe2sfVNX+iQB/jpc60WY+uNAuadhKrcDVe6HX7sdjnqUF7odbT9pokySO/sjAAAAAEhLHQYAQPowAABGJ44UQeRbPEE9EZjRBKvxVLu5Avdlgt8qwW+tyHeryGenxGeX5LND8twiuG8TPbaK3VYLHBdzbGdTzWdSzMYSsePJZmOplhMZdjMF7vMEv3nqjRVO5DQ5cJoUMFMaPEMOXeImrovz16uJz4drGsgFvwMA/NgPGVd/patfCvjfD25HjzDVL7caXSlXvMRRuEZTucDV+qPWUL5BX52jJC+UP8O4eqlS99xNk0sdEF2JvkkzBjbkqN6PlRsxVV5y19gOU11wUxpBKA0hrkw4X7odKPckzuBhjPp+JvqJmPZn361/B0f/HZ/4MD/2bqrpTVfet6bgbw3+n9rjvnSnH3SlfWuN+NAe+66bvVtW2BQMqbJTZKCvEDCqBJhiMUSODJdjmyjVuOgPxVkvFvtv0SN2Kgv2agh36qlbddTtetpeC/t2E32jumRHQlrgpyRj5MxPS1ufP+GkcMr8/I/oP36G/HRCEwCszv8UD7+Ct1ciOCmnQi8nGl4LVrwcqHYuSOVsmNJPokDDRUnyYE1Ke1VAg8SjSeBSV2wpjNJneigz3a6x3BU4fsrlYRr1CYZNaeCmNHBrJrQ1A16fBKmK0RcGa1bHaDcXIupolmU0c24prLQQnJcHKc41IuGMGUSUkGkJjPV6zw4HrY6Hr46HL46Fzg4Hj/X5Dvd6d7S4Ntc7NNY4NFTbS8otJRXmzU0Ofb3eo8PeE2PeU5Oek5OuU9MO83NOExNWXV3g5npslQjBZ0OFXGS5AMNnIRmlcBoBxWLA+Fw0n4VhkhHEAnBxriGDABfQTcq5pkImmkdD8KhoLglDyTcmZoLIOWBaMZRLQUl45vVl5o1C8zqOaTkZwS0ESRjIgRaHiUHXoZs2/R3WfY3WrQKTmlJQZQm8mWsy2ua0Num9s+C1veC+Ne+2Ped2e8lpZ95zZdhtttd5tMl+SGK31O3+5k7cpxfMz//0vX1c/uVpwed/Rj7/Xf397o2DJ/y3z+s+7PA/boY/oBnnXD1pBhy9IHtUFgDsTx57LUz4LAz8pzr9YGfx073VPxfK3oxHfLgV/LHN5VU59jUX86pY+9+0y+9JkPeSwL8qyf9SXV5mKj2PUXwdq/4qWv5Jvvnrgaq/aoufpEH+DtV45Kdz2+vq41Dle4GqzwOV7wYobkdh9+Pt16y0Cy78IX0IkAKkAUAaAAAZaQCQAn6RlnaQO0e31ekIgw2HIcaSzGeyHBdxnvM4j0Wc5ybB7w45YI/st0vx2SJ53iZ7bxM9NvAuy3n202nm02nmU2nWE+nW46k2k9lOc0Xey9SQZWbkAitygR45UeI/XRoyTQmfZyeulOdt1FGe3aqpSoyWlgGOAgD4sHSO0kWK8mW/o7JBP5ykq8gXXTlfqnCBo3KBr3amDqTcBteWaCpwlX/lKF8U6V1oQ19rhEFqYdbdjk69zmb9FldXvbR2Q9QmHC60G14eNJKft7i67atxL0b5YeT1++HqD4r9njfX/tkqedXM+DZ68+Pq0vcR5qca74PmqO9dOQe9Od86Ej40Rb1rTP5WG3LQEP2mtXCFlFTtBBKYytOx6lSMeglUoQh0tQR0hYaQr3HRH4w0XchyWiy5sctN3SnLWS/L26kh7tSXbtYQbjeWPukoI7jBHeWOWZ457K1+3k/7opfmOYsLP1pc/EMNAMBHZUP1LuPtVOnu6kWWSpnG8t6Xf/e9dtr78olojZOiUNBNbkCHOORmc3BXo1dXhXtzkTk/WJPposBxV+b6qwhCNcWxui2Z8NYsREO6cWMGtDkTWZ8KrUmCVEcb1MfpdeHNBsr92ip9xExzFhlGJCNpBBS5CM4oRZbzrIGl8bCN2ZidubitmdiVycjZ4eDhLs+eVufGavvqcktxmXl1hVWN2LK53m6gz3NmMnRuJmhuJnBxzn9x3mdx3mNxwW1i3LarE14nQVYKYWUcOJcOoxENaSQwnQQrxcPoZP0yLqaMa8ogwSjF4DIWpq3OubfVq7vTtqXRqrrCpJxnImCi2aUIBgHOJmEEdHQZC1MjNGmrtuyqt+6stm4uM5Mw0J0S8+lh98U518lJ68kx29lRl7EOu24xuoGFaeahRtrstuf8H2yG7K8H7q347S567y667sx5rwx7THXYD9ZaDdc5znV7PFkL+/hCfPBs4MufbZ+fVX/5s+Hgn+GD+5wPe9Hvn3d+eUx+WmNMhJ6FSR22lpa+LHP0BADUWSgedId9Zdq+X278tDbw9uHO2yXx56nwd4Oeb1qd3oiwb2ngd0SjVyXGr0qN37Ngb6tufO4ofl1PfVoc8DJF70mG5j1a8Mvu5hdi8otc7OMb6jtu2huuSvfDje+Fwe77XHseennNT30rBLxkphF1+hdAFpABZGUAWRlpAJAGZADgMHDo5LEf7HTlyjxBN28YD4bBpxMtljKdlvPdVvFemyTfHbLvbarvHj1wl+J3hxawQ/bdIriv4Bxn0i1m0i1GUyzG06ymsx1n893mirxXGeEb/PglTvQ8LWKSGPyfCBe5yasV+duN9Jdj9RRfRykpAJCSlQFkrwFA4vlTOVcu+R4/6XLomPPhQ/GnTnAVrlSry9UYX2tBqrbpK/I0rvAUFMqvK7djYS1o81pj1JCzy3x4wp0Ej60bemNWFxp0/ugAXVqyUt11Ub7rL7cXb3A3We95ruefVMozfvFrodd3ofMHSfyHudHPw+x3LfEHQ/jvvbj3tSFvK5w+VDi/a0381hL5rtL+lcjp74rwqQz7SpfrAisFKlqJBFcogVzDGVwp1L9Ehl4R26j3BcLGYkxn0hzmctyWS4LXGTHLjJjb5Vn/9DB6csLNTkhHGSl7qf4WoHUq0lghyeR6hPEVR8VfzM78qCsFmP/+YyZWneGlz3DTwplcjVA74Xn2p5BrJ/Fml+tzLbqq/Rokbm0Sj9Zqu84y+0Y8ShCiwfdVEodoVkRqieN1mjJhbfmY5jxMXQaiPgfdlIOpS4dXJYGbUmEt6bAhqvNia9psT0a3xKeMaUopRdEIWFIhnEpA8JlmwMZs1PZC/PpMzPpMzOZswtJExHCvd0ezfbXIWshGCVjIqnKzlgbbmz2uE2M+87NBk5P+87NB6yth2+uh68uBy/O+s5PutwZsO1rQzXWYxmrTKhGKxzQq58MlIqyQjeLSwbXlNmKeFYMA4VDAXc0OS5OhK9Ohg/3WXW1WNZUmZRykgIUs4yAr+FiJ0LK+3KKx0qyt1my4y2FqyG2i3220y6W/yXH8puvanO/GsvvcjPXCnP3mktfatOfskP2tVuvRDuulUbd7G8GPdkMf7QTvb/jtLLpvzrpvTfutjXhNdtoON1pPtnsu9fvvLd74so8/eNpw8Ij/9S/ep1d13142fH3W9e0x+eBBzscHta97EpPlT16X+uHaYdmjAHD9f8CfOfYfmJZvOzK/Ljcc7I4d7K98vDv2us//3U3nv5vN/62EfmAYfKMbf+NhP3HMDvi237hW70X273qKPk72v+9ueikq+rue+Wmw6zGb9DTLZttHZcFWbsND5XG829O0oJ0QhcchClsBKis+quNYVdtffwGkAFlARhaQkQUAQM02Dd4AACAASURBVAqQkpKRAWQB4NAvJ0+4GCpIvKF94ZjRGPOZJOulLIfVIrdVoscqwWuT5LtLDdyhBNyhBexS/DaJXmt45/kcm9ksq/E0q/E0q5kcp4VCz/linzVmxKYwbpEdNUePWmREzVHDZ8hha8L09YqC7Tryw26Rh54SIAUAR/4HAEdkAOACANj+ciLh7FlbmWPGUlImsoczzpyv1bjaAb5cbXCeo3COp3KpQlG+7rpKFwbUitBvBF2ecDbcSwy5lxI6YmnYrHmmXf/srK3quovitpf8fqTaowzYPi7+GTH3L6LLa6LhAQ1xwHX4KAn4OD3weWng/Rjne0f0l3Krf/kWb2v8vnfGf22Pfd8e//Fm7r/t2U8q/R4yHXoCQXWu6gIrDbqJEhF2rdBQLl/vUp72OZzuGSr8aoOzVo+/8WAYcizWbDLFbrUk8B4/ZY0eE6R6GioL+CtfDNO/GAk5H4dSzHc05ISZxmLkvDXPmP1xAnxU1vHSiSwTVaqbLsVZo8jscoLOpUS9M7xg3U6+W1O9R1WVdYPIobXKtrvCvrXURJKoUxOr1ZRsUJekV5ui35iF7Cyy6CLZdhDt2gn2zTgrSRqqPB7SnIm8WWI5L468M0K7M8ub7U5vFrizCGbkQgy5EMEmm4jYlsDqTMTWYvzGbOzmbMLOUsryTOzooH93m3NthV0Z20TAQtaJLfq6XSbGfGZnfGZnvCYmvednAzbXwnbXQlfn/ObG3cdvOQ312XW1mbQ3YVvqLKpFaBEXXCVC1FWZlvOQlSx4Dc+inGHKI8NqReixfuf1hYDlGe+Rm7ZdjVZijgmfgqjmm3XU2XY32XfU2/Q02t/qdpkedl2f99lZCVxf8F+Z9Z8f91ubC95aDtpa9VpbcFqbd9lc8tpc9FmfdVsdd1ub9Lq9GLS/Eb6/Eb63Fri76L0x67I547c7H357LnRtxGtlyGdlOHRzMmpvJfLd1o0vz9O/77O/vOB8/nv83XPmh5f4g79rDx6XfljJeSTyTrp28jcAOHYYOAbIhCmePuBavMJBvo6wP6+Nf1lu/bLQeLC/+mVz8utM2bcx/pd+0ruW+A91Nw5qQ75X+nytdP5S4fShzPK12PdjG/5Tb+W/w71vxkaeSwT/sLOfZmG3fdWWHa/sByg/TfV+XpS9l2a3ewO05ae14KHYZKyoePSwFCArJQVIyUjLAMBhqUOAFABIATJSsoD0kV9O/uxupCvwhbZHmA/FmI/Gm89k2y/i3ZaLfbZIwesE702S7ybJd7PUe5PotVrkslrotJRvv5TnOJNtP5vjMI9zWyjxWaYGLzHCZug3ZmmRM7Tw6dKQWUr4Cjdlozx3t5a8JCoyOPsbAACAzLEjACAFAICs9G9SMuBDMj6nz1n/csIIAOwOHSPIX+iGKTfoyxGvnGEq/CpQuVSldbEJfKULpTRsLbfgo7YaBO3G6NSqqbXryM/aXN31Vtl0l9+NAD/EBbwqTX5WGPoiy/gDTv2AhfnExbwTOh90sj8vLhzce/B9qv011+UDzfBLvceX4Zx3gznvuzIPZnoP9tYOtja/9jY9IgaupTvVeCBqXLR5lkpUpHwJ5BrOSC5H51KqxplE9dMp6qfwoMt0pHy1vUaLl2F3uEVjqGWa8RX73444/vGLzakfAzQvBOifiTe5lmyuXOgGIvoYhoEveF8/Z33xpOmp427yJ5MQcmQ3PXGAXnWURVWCbTvZpa/GS1JlLy63aRI5tkuce6pcOtkWzYXQ9nxYe7ZxfapBUzqkJd+ki2AzwPQc5Ph1070a8fbVmWYVSYiGPOSk0GevD/dste7ZZuvOGGOiMaFdGFxGtxPSLauF9k1VTsD8RNj2YuLWQtLmfPL6bOL0SGh/t0dro121yEbIwghYyHqJeX+vy/Skz9yc18yMy/yi38py4PZ6yNZy0PyE+9iAfX+3dWeLWXebVVeLTWudjaTMRMiClnNh5Twkl27MwmszcQbMAkgFA9PXYjs37rY67z4/6Tje69xaYckuhNJywXVci1vtbrc67Ttr0b0NVtMDrquzPrtrfjvrPhtLXuvLgRvLIetL4RuLgVvL3lsL7mszrsuTLgsTzvOTjrcXAncXgu6uRj3YSNxfi7+9FL67ELS7ELgxc2NvMfrBatydheC9hcjNyaidubi9tdiHGyHf70YfvOz78Gf9wYu673+NfHxeevAo/sPf5M+L4X8Va6Wp/u/0kSOywKH/SQFNGLmDIsg7vufBnOjNpOj7PPXznPDD5sTBP8++/vnP1/31bzsjB3env94df7tQ+a4v7XOD55satwOJ77cK73e17u9bIl/3Vn6ZHH3VxnrF9H+Qorbtp7zupPIwWH4vDn03P+9uTs7jdL/dYNiClzpb89IRADgifQyQBgBZ4DBw/P/fDQGp/7wpcEzqp4t+2v8fZ28ZFcfWte2uNiC2oztCQhISCBrc3d3dtXF3b6Bxd3eXhoamadzdJUhCEiRuO8lOCN5Q3w/yyHjP9zznPWeONUZXdddYVT/q6nuudc9VdT3DQKjdVbXPXXHYX20iXH8KazIXYT0TZfgkzmwx1ngp3nQ53vhJrP5yvOFCtO5smNY0RmMCozmN1Z+NN59JsppJs5vPdprL8xhLsZ9Itp9Jd55OdZ3PDVyriGvDOl9GwM8ACgAoKWCAAgAYFQwAJEBRcgFgevmyPgVKGgD9q2dTuO5Xc9AV0d7Lfkydwfowi+12vfC9CV2Jl+46z90Vpwz4CDwPWngfjilxLRuzrpndXLdieh/m+DYz632Q4Ycg0e0w9oNEwf1claNCo/06zM9J0tGz0YO58b8J5X8VuEMNPlBnPNSddtQadjDVDL1f/7U+DY03fCt0eZVquZETXuesijPhLtVgKVBmTpdiihKgC+Wj9+d+6MF214HlvhPjTU+GSykSD5LE7nsyX3Zivq51i8qC9o4Z3S25SxRqd69Y892zl6RGi9y0EX6A0WCNNxGyF75rxHLDkvOhJs1FK7abvpIPqm35htLRW/3ZM8SQxlLNhird2lKD2gLVxjL91nKDtkLNjkyl3gzljjhZfLAoMVymM0W7I1W3I8OkM9uClGbaFK9Xj1WrwSjhY2QW65w+Tef83Or5ut6zNV7yrDNhqT22A+/QVGXaUmfU1WIJhntNZ4cdV8Y8nk14LA7ZDZH0iXUa1cWqRbkyZYVK1WUauGqddoLh+LDFwpzl3Kzh0rzlyrzp4oz+3LjJ5IDNUJtzH8Glr8l1qNlzjBjQh/dqLjOrL9GoK1cqy5fKTBRMChJMDOJOwXLXFMiOdFkujrvOjrpPDroPtwcRiq0zgkQTXXhKw+Tb80zbS02rMhRri8V7iZrTwwZzY/pLs8Yr86YLUybTI4ZTgwbTwwbzk8ZTIzqj/ZqDHZq9zRoj7YarE3Zr0/Ybiw6vVhzWF23Wpq1ezNi9mHZYHrZ7Om7/atHj/VPPl/MOy+OWTydt1+edX606fn1mA72Kgj7G/XoVePIZB32pPfrg/etNArSZ/i1HKY7jj5sABsAZDgB/bnb32J/lZ0viyXQxNJkKjeXtzhDJX14dfn4BLbceruAOFkuh6SpoZQj6sAGtD/3owu41Wx3Uue42WB40mEE41z1i8slU//5A3a9M+beuj9648T3XZX6u/3DVU/IVxuGVv+dre/ElF9lJC2XJq1cpwGn59jkkDPzHOHtfi4cp34iP4CDd46E57Kc/Eqg7Ea4/E2s8H2M+FWk1EW09l2I7n2S6EKm9HK4+G6azEG04F2UwFaE7FW04FW82nWi9kOo4n+E6mWA7leA4keY5les3ku42leGdoisKEBSwUw2EwwAMCWAABoMBAAAC3AIIUeQFRdh5BYC0uX4lneVBBdOd8kd381iZCllpW/gZRjQkn7jwThqwdQvREES4Z7VFnuk83DKiWbZ4+CLY8UdB7Ys4yw+u934FsO5Eix9myEEZCt+znQ+6q/cHCnYafP5Os95ub9xfGDsezST3eR20ekBd+eQXT6CNeWg46VeZ6VYY36t0py0cocdXq9aQrdqQvUCVKUX6YZzow0gB2lCee6E896L5aLDiD4rV2Vqt2UKlHipcv+jKS+vAeN2a8Tqa/rr21TPKl1F+SvxGfHd0OC/7aD6Ot5RMt5UOVGQ0ZP7DhJ3akPGWGf0Vb+572SY8gxlWW10ZS23J+BKj+kqVujK1xiL1hiodYpVRd4XpUInxWKFOZ5IMPkK8I1F9qMS4v9CEmKyPi9KrCdepCdepj9SuwaqR4hSWiSFfn+K33wx+e9mxOVHyrD/7zVTZ09Gcic6wvjbX3g470FSrOthuNj/gsjjoPNVt0UPQJdRoVBQoleQrVBSr1JRrNFRrtTbpjAyYPplHP12xfTJvsjBlMDduMjWIHu/2mOqOnOyIH8CHzZAyFjpz5jvTJ9oiR0ie/a02LTW6lYWKZanK+XEyefGyTaXGUz1BTyeSlsbS5gdTl4Zy+uoCc4NVwizYo2248oKlyuLl8mNFSrOECTUKfSSN0V6tuTHDxUmTqUGD4S7toVbNfqLqUJtGb4tid5NiT7NKJ06pv0ljptdsdcLu5bzDy3m7Z9PWz6fRG/OOz6fsVydsVsbRL+ecXj/xfDHttDyCfjZhvzHntjHn92XJa29dh7wRDH3NP/las/sh/uRj4fGPmp9LDn9nMkQznqeBAQAHihcufHeX3S1wPn42erhQD41nHi00Qpuj0Prw4dN2aA53sFC+P192NF20P1dN3lyE3q6fLBEPO/1Oap32cabbeAsywXW3P/dktm+vLmo7U+uNL/e6B/cbB74ljTtPrR5veau+9TV+asm+ZC5UJMNzHw5QAAAYADCK/8IgHIEC4JwKy6MyfR6SvRjJXbHHW23QT2fEX34uTGsx0mA6XGcqXGc+1mgx1ngqTHsaq7sQZzyfYDIdZzgVbzKdaDmdhJ7LcJpItJ+Is5hJtJ9J9R5LcR+MtyYEmxowUgMA/w0hAADAAfxf14IA4A8EjBYG5wEwPSRVOM3tEm6mTFbaXPoH2ax3S4Tu9MmwvjBlJgo+qHh0n8D1cEaT8an5/VcuQpvBJlvpyd+rCW/yA9+Eo78mqO1kKR6liZ4kC+1W++y1p+1XaH8LYv6VqguNtUCvXv6aqCITw06Gan8+fwZ9+nKy0LlTYfc2WmzDn+NTBvp9XfV4lA/OjKfSkDNfjTlDniFZ+lG8GF2syIN4CYY0KboCfa4eV4VxX0VXzj8NGam9hR44Md+0Z6N2ZKE2vX1R/eoZ08f3lB9dE7931kqKxV+HC2vE7y3/yPjxVQOW6wZMf9qw3/Dmpy625MEHyY3muz1pievB2dRXqlUVqeCKNeorNVqq9Ptr0ZP1dtOV5n2ZKq0xMj3JGlNV5qPlVsRUg7Iw1Xx/hbIQ1bpIjbpw1fZEhWUS5usL4t6nsZ8vSZtDuU+7Ul9Plr1balqfKV0ejV8cwYCyfKmWWu1+ovlom+VQq3Fns24LThtXpVlXqV1fpY2v1SI0aHaSdMaHzVeeOLx45vJ0xWxuwmhmGL04GrI4mDrTmTfVVjRNKp4lVMy0lM2RSpZ6CleGs54Mxk11YYZafYab/btrPLuqfIebo5/0FawMlS/0VMx0lC73VU80pZVFmIeZ8wUaskY5cqcGCaRjefNThSvzJfGVsh14lbEunel+4/Fuw9E2/UGCVk+DaneDaluNAqlavrdRdahZbZykOTdgvjphtzbtuDphszRqtTZj+2rZdWvJZW0GvTRm8XTCYX3Gc23c4+mwy9qo2/qk14uxqE+zkfvrzntbzod/RRx97D3+2nT8qWHvU8POXNznGOYUjiuPAKBEIN3u3t4NtTsYbYQ+bxws4cmzZfsvR6CtUWihFlqqg+ZryIuFRwsVhzP5PyZi9xfaoK0PJ683dmfLIELkCSFkpyPhaKB4d7Fvb6LjS5TOugf3O3/eV75cLz0E53RYVnQfbbrybLiKPbV+tKzLZfngFuWp9gA4QML/M4OnSw1RlBR/yDLRZ2lzk+wkSW6q7W6Kg75qw4HqYyEas2FaC1idqRDNUYzORJTRVLThQpLFkxSr2STz6USLyUSL8USryRS7kXj0WJTxTLzdeJz7aJRDT7AeVoOfFgn+nX8YDAaHI3/nxAjE6QAVBQNXAGACQOf8hQhGhgLmB+nMNJls9yr4aTql7q8a0Jfeo65h4297TD+lxvoUzfvG1+pLUvKXwrK/S6r+zk74WZz5E1/wq8L3R6Tkz0Slg8agX6Xog1DWvWgBcqMjNFECPX9GXlk4nGo7evn05NN76MOXA2LK31GSrwM5P2HF9/Os/6pOXM3MarIVrTbhLdJmy1VjyVRkSpN7lKnIVKDJVm8i0OQkNhqs3eWuqnMDHiTPFSrH6MhwzZ7tpj3TDfT9q+a013Vpr0tRX3oAB9w3zpsK3vBWZPKUoLdmv4XmoHbhp4lQZk5SZyw2Y6t24CJhtWfqQ/oa7RqrNOrKNHClmvXlqoRKvYFG+7kWj9l6x/5sHVKUdHu0zGiRwXQVerDMtjndpDZeryFBrzlWpzZEri1BbpEY8ulF686Hkb+XG160xT0hxG6MlH1eGfi4THwxlvOkNxLkpoqWZknXFyuR6rTbG3WIdRoEnHZLg15Lg0ErXq+jVbu/R3d8xHBhxmL1id3zVaelRaPZMbPpAY/lkbQXE/VznbUj+NK59rrFtorp5qKJpoJZUtFSd9lqf+nKQNlSX8mT7oK59ty5tsLZ9tK5jrKZtpJxQt4IPnuOVDbemFkZZR9mIeSnzxaG5or3482IEMiOEy5MkajIkcSXynfh1AZbdEdbjcbbTAYJWl04tY46teZyxaZS2a4G5dE29dkenYUBs6Vhy6Vhy8Vhi8Vhi6dT6Ncrbm+fur2Ys18Zs1sdc3sxEbwxHr4+hn05HPasP3htMGqjL+X7csjRu9Dd92nQ12Xo+6ftT/HQl1poteFjlGSeELU4BaABqDja+z8SAw9nWvfnCUcz5eQV/PGbmb2VzqP52pPlhpP5quO5/OO5cvJc0f449mg8B1pdOHr718H6GjS3AM0unMxMQ5Njh7NTv7pb30U4bqEfraFp1+0frvmKb3rpjSo+XLZmWLPneGlF2yFPz3iGAgEAgAE4jAIgAQyG+E8IwuAUcACDwRAAdpbzAVOEmli9hXCru2Kbl16br3Z7gFZvsM5YsO54sO5YqO4oVnccazAdazobbz6dYD6VYDERbzkRbz2VaDeSYDEYZjQaYd2PseoNMq60llW8d/EMACgYAAAOkJQwAJAAwGAIAEMBAAAMifpdUnf6A6ABQPrc2TRamlzOB4Ws9yvZ7xJkHi5YsOXT3MAL8AxLXFkwollzYNp0k/wcYfAlSeNTtOz3IInPiQY/2wm7NfW7Ka6/Ku3INejdEAFysPBeswXUHUmeJey+2TzeeHky33uwOgBtTh2NDXxJMnzn8/h9pDA53xSqdf1R5fGqMKndTb7BSrTKmK9Uj7NAkzVfnbFEh7XGhKfFTrTbR3Ica5CtJSxzBqSbSCRosAXwPXRlp3Fivmnz4LL9o5tWzDR6zDRMZ8BtBFCng3tK0/tJMrly3vXivRstz1jjINXoLlloyFpuztjsJTdR7tWDsyHU6RBxBvhqzcYKlcZy7d4Gu9mOgIUW3/ESq+4E5fZIqcFsrdka2xm8Z3+1a3uxfUeeNSlZvyFUrj1Fcakj/Mt628+tng9jBU9q/efqQtcHir8sD32Ya14gxY9Ue4LMOKG8ZJGyHKmGcuXmavWGKlV8rUZzvRapWaenQ3d8xHB+xvjJvNHCrNHinOnyAnp+xnBxwmG6N3isNXmus3qxu3GCWD5FLFvoKJ1qyR9vyploypsmlC601Sx11j/pqJtpLZxszh/H5w/X5Q7XZw/jMnpqYntqYyab80dxqVWx9uHWooFGnBgrrmh3npRg/tRQwawoocJEsapMqcYiOWKZclet1mCTYVejKqlWqalSqa5YtrZImlSrMNiqNtalNtGpszBosjJq/XTcZnXC5sWs49tVr7erXmsT7ivDHqtDQc9HYl9NpL+ZzH3RnzJLCJ/CY6YbwpbafXc2kg8/FUDf2o7/Gjz51rX3PvfzuM/baLZi4bvGN+DcCJB2n3onOwyarYV648gTeYdP26Fn7SdPGo9Xm/YW64/mqo5ni46mSo5nyqDRBKg//GS28WDz9c/V6e3n6zvPnvyaqNrriNoj+P6o9fmQEfDeW2LNlv2V9aM1Z563AfqDio+WrJif23GuGT3EPL6EBIDydC4UQQngp379f8pHAQwASgBgAAXgV29cu+0gzl5jIUF0VmtyUSJ6qbb7aXf56IwEGU1hjcbDNSYjjaejTaejTSeijMcjjUYijAfDjAZDTQaiDPtCzHsCLTr89OvsFbyFme8jADiFEEYJqC4jEAjk6fkQFAAACoBEASSAwwAcDuBIAOBIAM4BIHf+bAIdTSUTbRnXvTrh+1NGrMWM1Hje+8Oy9xaMWNcsONeMWT66cH0L5t6N4CBjuA7TxHZxyX/ll/7KD92tMThM5N31ZtovUN3p9DrsTDlanf2xvvpraQBaqCf3JP6Ni/+UEfwmQPRLvOzPclOo3gOqd/9eovcp16HPV63FUarZVhxnKVRhyFVhxFlnzoVH87e5ik1i1QbDDOwe06pco8yxFA+WvBco8MD18W1XFmp7ussOj666ct614aJRoDsvdJfCUvh6qA5PuDqPnyh9oOj9TAPuzgidtijVNj81vD0vwUN2psKnu9GWUKPV3mhAbNBqLNeoL1Jvr7We6Qh52hnxpNF3NM+kO16hN1V9otx6ptF7BOfVW+nakWfVHKeBC5bpztR8MRD3bb3l3XztTH1IT6rlSJH3i96Cr0sdr0ZLhyu8iakGIC9OrDxbpq5IHlemgCtTwlWoEeo1Who1u0na40NGywtWq0tm87N6YyOq44PqM2MG89OmC2NuT4YTJ0g5I03FM+3VU23FY825Y01Fo025Ey35U61FU8SyGVLFHKlskpA3hEvsrYrrrojrKo8fqE0dqE1uK8a2l4aP4LOHcImV8XZRdpKBptzBFhzRLjwpgfwZGOHMMOHcSOGSRPGqDMn6XBlCiXJnjTapVglfoVhXLFuZL11TINtYrkCqVeqoV+xtVJvtNX02Yft8yn5t2nFr0fvdU8yrpaDnI0FPB0KeDUQ+H0jaHMl7NVq83JExUBnakoEmZlm35/m8nUne+4zdf1e/+zkT+jaw96l+ezHwZxpHnw6rx4OrcmeoEmgvb6e5Qgv1UE/owUTpydYYNFcFLZaR56uOFyuPn9RC8yXHU0Unk2XQcNpJX/jJVDn5+TPy82d7z1b2JwhHbaHHBL/jBpe9Qr1vCVbf09zehOiumjAtGdx75yH1xIBzQv3BczTXkiGHwi0UgMMpAQLAYQCOBDCA+G8QohAAUCJOaUAB8Mflc38a87OUmokRnOQ7POQ7PRR7/HW7/PW6/TTGQrVHQ41HwwyHMfqnbTDEoD/IoC/AoDtYuzsETfQxa3JTiVZiE/vz4h8ABmCntsRFcOkeAklF8XtYiIIBgAIUAMABHAAYAgUoKAHqVLqpAJC5eC7k3p/l3Pfr+ekG1OmbBelb+O72S9EtGLHO6zBPK954aUb71otzO050N0H0KNPwe5zn+2T//So3KFPlwIdlN0F4m2QFkWL3xmoP15ah2a7DsezdFq/tOOUfcbZfM/x30/VOGp2P27yPcM571Xbf89S+ZCiPY3TbXWXbXGRaHaUb0cJ4GxGCvWirk1i/v9JspH6lvZzoeUpj5jslDtJOHFfc2K/7c9C6s95yYrjmwnTNm4vanedmrJEgIcG2LNKoMFA3zkwsQP5RsOzdAjuBwVyrtmzT/ljzdm+JviCNJw2hPU1OhGr9rnoTYoNOU5lebb4mqcJyojXgaXfc87bI6XLHnlTNtliVvmzj0UrXkVrfvnJ3UqY5DqtSHyTdW2Dysi/27UzxZAO2BqtX7KPYmoReJiRsDRUvNMd0ZFrhY9RAUYJ0bZ4CvlShoUyhtli+oVy5tVG7k6g90m84N2m5smi9vGg2PaE93Kvc16Ew2K062KvV32o10xO31F8931U33VYx0pw7gs8ebSqbaCma6yid7yybai2ZaCkaa84dwCX3VMa2l0R0lEb2VMYP49J6K+Kbs0PaiyJHmgoHcRk1yW5xzkpBZnzBFhwJHnz54eKFEdK5oaI5YUIlcWLVGTIN+QpNJUot5arNpcoNhfIVmdIlKZIlKZJlqVIVqZJV6dLNhXIDDboz3ebLIzbPJl235kPeLMWuz0RvDsU+741a6oiYJ0bOExMWWlOG62Kbs/xLQvXygvRLsBaTTcn771OP37eSPzb+/BBy9KUd2szdLZB44cmWxHfb8tL1wFtU7yN1d2bryO1h+7M46P0itFALzZUdTRedzFcczVWRZ/PIU3nHE4VHw6nksXxoafj4xRr0Yok8WU8mBh/VmJMbvY+IAT9yFD96caz5qn5Lsv6E0XpqzDCjT7tqITQu92gNzUZUZH9w5p/mPABwOPx05z8EAgAAR53SAoefh4OzFIizsAs0mlyPo3Skq9EyeLQ4yUOF5KtN9FDr8Vbpxxj0hej3BGl3BWh2+mu1+2q0eWuSvDTbPXWbvY0qndRStfkMGK7fRMARMCQ4zT8v0SKp2QHiHxCe8gZHgN+zpAAJ4EiApAQwSgCQgAIFAxxUwIv6Si47C1HxQacUK57v7og8w6IZw7Dyo2HpO5toxrf+Qj8z1H9mqP9I8fw7yuNXvi25VPcwUPS7F/d+lT65KwQiRR/OtJIXB6ChzONyw7/8GD8FyG+3VkCTHVAr9pjou9vksldjtldpsZOj/z1L8UmscZe7dJuLVJuLTLO9BNFJut1drstLsdNXsctdOViGhQkGrHjoGv01PAXvevPcDua868V60/0xtQ/nXV/2W26s2Z6HRwAAIABJREFUV2JVWXoSrAdLvRriLFPR4rFarBlGj6s9JUYK7cdw3k0RWgQvoeEI7VVCZCfevaXCrKvGmlhj3FRqWpun01xs0l/nPk+MWCFGTVa69WQZNUcotcRpk9LMiRloQqo1Lka/KlihIVShLcdiBuczVedbH2uU7Cye6CBeHqLdnenUk+fVkmSNi9JritIGpYmytTnyjSVyTZVKjRUq+ErVzmbdoS6DmXHr+SmrhRnLuSmTuQmDsQGtvg6l7lZFYpNMQ5lma6XXKCHvSQ9+obt+tLlgqrVojFA81pI31Z430Zo3gMvtq8nprUnvqorvr8rsLk/uqUjqrUrqr0pszg6qSnAnFYSNNFeNt5SQiiLyMBaxjjKRNnxp3kIlkZKlkbJ5ISK5YUIVSVL4AhViuQahTKWhWK65QAWXq1yeIl0QI5YbKZoZJpwdKlIYIVmVIt1coNTXoLc4YL8+6/9mMebtk/TNmcwXPdFPWkLHan27il1J+W6t+T4NaV5FkbY5no7pHmZp3lbNmZidt4mHH+Kgj13kTzXHH3C/Xnjv46S/xfMMopli6O/YnEOsBChALzuOeuOh5Xbo1czBQvPuXD20XHu4UHs0U06eTjuZyj2ezNkfTzqebYOevz14sX48Pr7fkb7b7Pmr1mi/Dg21Y/arLL8HKbwwf7jkyP06Qv+Vu8yECcuGh9aSpuCS5cNIllvnTvGiAAgAYDAYDKD+C4QADjt9LjAAKACQgOI8oLoOKG6Bs3RsNAyBcgL1NnI4R5l6V0WSj2a3h1qbv3abvybJT4Pkp9HqrUb0Uid6qbd6a7a5GBXbyGeaibhz3Ra8gKQAAMDhKBiAo86ibnNQPRAEcCqKUyYBCgUAAsDhMICAAxQMUAA4BUBSAEABB2fhAAlQVAAww4Hb1fvFHH82SdHXCNCMKtHOm99vl2Tok2D64MbxJZz/IFtrJ9Xge6r7rzz0YYXJdqL4bjDTr1ThE4LTcb3vYWfE0Uz5YWfAdprcF3fmX1g5aLTm+N27n1svoYHsQ7znfr39Ya3OdpHWbobJTqHRizSrbg+pVgfxViepZnuJVmeZDi+lXn/1Vi/FEh1ewwd/0AJgynWvI8I4VJbdhf16MMctf87bfjy0ATx04bz00cKPAvhuxaowYrSZogw4ozVYc/Q5Gx1F65yEmrEaw2VeI2UOPVjpsVjdJy0RhBrn2lyT1mIbYqUloQJdl6/fkKffWmA1UOY5WunXlWfbmKRVH6xQFaRYHqxeEqhRHKBe4KOQ7y5WEyBbHavTmmaMj9HIdhePtRGOc5BKd5Eu8JTLcJFLc5Qs9lZqxOqD2hz51grNLpwBqV6zDadOalQmNasM9erPjJhPDhkM92tPjBlOT5gOD+j2dSt1d0iTcIp1hWpNJc6DzdmTbVVznbULnTXTpOL++oQhXMJQfXRXaRAhx7sx3bsuxbc+LYhUGN1XndxbFddZiiXmBhaHWuX5Gbem+QzVpw635JKqEuuygksjbDI85bP9xIojxMrCZYpCxYuwohUJkvg8pdZytdZylaZiOUKRfEuxQk2WdGmSRG6kaEagQB5GuDBUuCSev71cc4xouzwQtDGR+GYu7+1s2bPB3IXWqIESB2KCfi1GryLcrDTaMjPQMNXDtMDPKdvLItPbuCLG7eR1C/Qhde9N2PHnF9DH+sOX0Z9wBm8j+D5iuKol6Z3P3yhR44QWu6HhMvLW8snbFWixAlooPZgtPlko2VmohBaLjmaKD+cI0Iu5o6135I2NkzHcYXUgRHDYIfn8avAgV5kdN9rv1Xj/VZb8LlBt0eDqsj7tcy+tLUehJVP2dUfhNlWBi2fOUcIQiNPn359CCIOB/+xRnB75D+MADhBnEJRXUedug7PUAJy5cYbCVpKzzE4d76DQ6CxT5yrV5KZM8NQmeGq2uMq3uyjh3TQavfXxziqVtpIp+nxeIgwy187ePO0TDqcAAFxhu8Qkfp6aAcAp4P+4kNNqAQQAF2Gw63DEVQAuA3AJgIsAXAfgTxjiIkD8AcA9AJT/uIB5eD/70YNWSbo1E7ouiVutIix/ecn8ihb+GiVyFC/zq8AcaozYzzPcx7L8Hcy+Xarxd5c3eappf7KIXGfzM1z8mzvdz2K9nWcdx2+3TrY+Hm+u7EziD8pNT/LVdgvNdktdPtemf2gm/qzIHgnQJNhztzpJNTvKkTxl273lCc7KtVYSfuKMEtQoOjiQoL7QiNVv8NN35Lzuy3fbn/e2Pwd1jDBdogRjvDR9uPidJHXGMGm6CDmGeGXmDF2OSjthnKs43lNsIFJtosRpINN6ssh1sMC1Msa4MMq4Mgldk4CuSrKsTLQoizYujjAojTAsDtcvCtHJD9TMDtDM9FPN9FPN8ldL91FMcpdJ9pBN91HMDlDNDlDP8FVJcJWLsBULsxIJtRTGWAiFWQhF20okuchneqsBUrXiAEFvtMOov0WnvVGtpV6BiFPsJWkNdOj1kjQ6WhV7u9SHB/QH+3QHezUH+1T7SGp1RYoV6UadVZETLQVjzQWTxMLZ9pLOkuCSKIu8YJ2cQK0ML5V4Z4VYJ9VMXxNcenB/TUp/VXx9mmdeqFGyh2Kqh2wFVrelwLOzKqy9JrqjIrIp3b0gUDXHX7wgTLgoSLg4VKQqQRKfI99aotJWqdZZo91epdldo0koUaxMFytJFC2JkyiIEC0KEynFitRlyg43Wi31Bz4fjV4bSlwdSHs6kDNLSumvxhDTnIp9dNMcNDI9TDP8rJI9zBNcLWI8TbOCzdK8ndsrPPbfRhy88jp+n/3jXcHPdSz0V9enWtd1v8fbWWJjdgwxd67EcdMd4H1+NcdBnz4dfXx9tFC9P5kBzZcczOGhhcqT2Sry017ozTPow9b+2zdH6yu7vaU/S3UO6k1/tQUdtYUc1Znvlantltr8JDV/yQnddOVa1rsza8C76cjzzJzxA5ojgo+aEoH8jR/4L+j9K2D/7twBOIBTwpGXEJRXEQBQwGEIAP5AUfA/umcnK5hurlTtoNqClmhwVax2UCJ4alc7y9fbSuIsZfJMJdN1+UJk2XTvXWWEgfO/e6QE56+deSh04QEv4tItAEPCYf9GOwyBAOACANcA7E8ArsPADQT8BgJ5HQb+hIFrcPh1BOoaADcBoKMAjFTA9s6tVlXmQTXaUr67n7EO38IVDhJE9uOFd+qT9mZ6ftbF7ofr7WaHHA01QUuT0Mtvh3jvH+GC22GiUI0T9LT1+P0GebYTGi7en5/9tfJip6fuJzHzW2fN3lDXt+6uD7iKrwW+C1iTNmdZopM00VmixVWyxUWmxloiXZXVU4BO5jolPQBCFykijXgaw80aQs0wEizurLcwnLSxvPSpYkwJ4vRJCgwpmqwY0XuBgjRh4g+j5ekS1B4Uo7l6IjWns61mC2ynyl07850KIw3SfdVzArSzA7XTAzSyggzS/XXTfbRTPDWS3dWS3dVSXFWTXVTSvFQzfNSz/DSz/DTTvFWS3BUS3eSTPRSTPeRTPBWSPRRjnaQjbMTDrEQwFkLBZkJhViJYtFikrUSsowzowauOdxjODliMdhh1NWo2VyniKxRb69R7iTo9rZrtLUrdbWqDPXoj/YbjwwZTI3rD3Ro1hVLpGPHaFNvh2vgRXNJoc8YUKbch0TrCWijIiB1rwR1myh1kyB1sxJvsrFge6zFUmzLWmFKZ6BjrJhflwJ/qJVgQIl6WoNmYh+6uDRnGxeBTnVNcpRNd+LL9BYqChMsihJuz5Lqr1PtxWoONekONRn11BqRKlcYC2aoM8Ypk0apUyZok6YpoifJIseY87akWz9WB6JW+xOnW+DF87DAupqsc05LvjU/1zve1iLJWiLBVSPDUSfU1j3HWj/AyiXa0LYtEb804QR8DjzdtyFvBJ5+rTj62/VhLe1Nv/TpK4lUwz1Mf1lr5S2nsD45KDfdJsdDnjydf3h2u9uzNlEFz5eR5/MF8yfHzHujLG+j73wcfPuxsbR4/XT5orzko098vUd+rR0PtweR2zEG9zW6R4VdiwbfKsq1ghU1nljnVRyu6dM9ceJ9Ycche/1fi+bsw5f89/jFnAwMADoPBkTA4JQBUp3TCAAAwBIAjkADGfP2msbBEhrFMrZ1iBVqywFqq3lWlHi1RbCKUrisRpcBtzUQjfuH8n7/teSSguEb5SOAGsyDFNVqAOHf69b8gBHAYAGcAuAaHU8Ph1ADcAYAagD8BuAnAHQCjRaDuwSn+BLDLcPAHAvwJYFoXKZNYb0Ux3O6x0P0cIrsfx/ElQXKvo/pkfOCgOnM/zfOwpeLk+XNoc2N3dvIow/8wGwMNEqD1tf23X4/WV056Y44aTMlNBUcjk+Shwd3JsW/T81+72j6UxX5IMvySprWVaNfvY0Rwlm11FSXYizeiJYuNeOMVGD14aFWun+eBUQhQIT0VWaKsRHL91dvi7RL1+Z1YLgZz3UgQu58s9SBe9m66JkOoAF2YEG2EJG2KJmsJWoQYqDqYYDKcbDSfbzuca1MXb5IaoJ7io5Hho53qqZLlr5HkrpHkrpHqpZ3oph7roBTvpJLgqJzkrJzgopzioZ7urZXioZ7gohjnJB/rKBfrKBfrJB3vIhvnLBNtLxVhI45FS4RZiWEsRMKtxbFoCSxaIspOGgwRDSY6zWb7rEdaTTrrtAjlqvgSlZYKrT6C5lCnzlC35kiv9tig4cyo6dy46eyowXifLrFCOQsjXBSuScp17ysPGW2MG2yMr4s1jbDiDzXjDjPl9tdl8dd9HGTAleggXYBFd5dHDtcn1KQ4xXvKxboJ5gSJlGBFSmMlalI0iYWO7QXeOQG6fnqPg40Zk1x4cr0FSjDC+AyZ3irVYbzmBMlwrMW4u1qbWK5EKJJvyJEpSxQsTxDGpck0pCg2pWt0ldlPEUPn2uJH6mM6S8NJhZiWvKDqFLfSeMuSKOeicOcsf6NoZ/kIR5VYF4N4N5MIe9M8b6uVVm3yhjO0EQZtOh9t6EBv8g4+kXbWM3b6Yt8kyWwG024EcPYY0WQy3ficYQaNZu2+GIDeT0OvN042lqBp3OFc2c+1buj7JrTz8+Svz9D710cvn588WYRGB7bxLjv5igeFekd1bnttYYck98Mc7e1Ujw+FOWue8m992NZtOBbV7i97K5FsJG4DxL9E8N8Y/K9Awn/bFDAA+11TdrrqCQVgcAQAyFPTH04BwDk47Cr7Q/o4Y7VKG5lGB5lyQ8FSc+kEXcFAKRZ3AQbVqxfZkBR/wuBIAACc4iwN63VOlUvUDwHqPID9nij6nY7Cf7v4KACuIhA0COR9AKMF4B4AdwGgRcDuwcBdAGgBeAhQjwAlPaCiRSHpABABSH4YUL2KGrB4/CuY40eM4m6V7XaS6fc4g4NyF2is5vjl0v7iwG5N8K801Z+EoN3N/r1vnw7ffIEWO8kkH3KV1WGOHrnah1wfuTtE+j4++rUi7Huc4n4M//cU6S9Z6JlwqxZXeaKzBN5KrMZMNE+PNU6B2YOHVvvOn2LnL7ICYMlPG6TNHo/mzwlSacuyL/VVybIUilGgx4rewQrezFRk8mS9HyRIm6jCmGPIlWPAm6LNnq7DUmLN3hmmXeMqXeYqXeKjnO2rmuypHOckH2crF+8qH+0oFeUgGWotjLURjXWSjLIXi3YQj3GQPaUu2l4mwkbyFDAsWiLSViLSViLCRjzcWjTMSizcWjzMSizUUjTIXCjEUiTEUiQMLQ6mu62nu62nui0GCHqd9ert1Wqt5SqkCvX+Zs3JboOpft2xPu2xXr3xPsOxLr1+ompnvWpjvnJWsEi2r3QJRrMm3qKtyKe9JKg21jzBSSbaVtxPn9NOntZF+ZG/HmeCg0xBhDk+27u1MLAuzSkfq5cVpFASpVAVL1+TJF0SIVWKVSsK0cFaiTgr0Xlr0UdZsqc48uX7idYnynQUKw3gNKZIBhNEo+4q9Y5y1dZi5aZcpeok0apEkcYMhdZc/f5yx9HG0OmWuMGaaFyab1GEc1GEc0mMS0GEXVqgcUaQdQ7GvhDrVIBxjnEwD0drFUSYd5UbvBoygLZ8oK1U8ku/vWfoo03Pvc28w08V0HbHbn/0ij/LZiTDkhvttDFLFvutSR9NaDr/x3Tx4UIx9PoN9Nc2tLF4sNl1/Pkt9PcX8vs1aGMaert29Gx1e3Zmb26K3N8AVdiSC/TIRcYHdRZHXfb75er78apvMqOeualvWDNs+nGs2jx+7qTaZyNPAyhhCPhvCftfCuE/IfwnseD322MAgMPgSBgMgQJIKgQlHA4HKARAXrpz81aYjnyNiWyOFm+KlmioHJeH1CMDhpsyF6joYOAWEnERABiK6tIjzj/+ZIdRnAEwJABw2L/9E8ARqNM9GACX4LC7SBQjEsmCQrJSIB4A8AgJf0AJ7iDAHQR4gILRwxD0AM4AACOSihGgmGCwx3Dgw3Rl0pQNytYgY3l3khWPKs2hVgw0RTiY69tuit2Nlj+otCZ3BO1OZJM3Z6H3r8iThdv1xvu5yvvFCuR6veMas53Osu2h7u0Kz5+pijuJyvvZqj/zjV+kmPb5qba7KjehZcpNBPL0WOIUGP2Eac2YaRRprrEhgNglWIwWV5YJe7K1YK6LdGWgRneK/WiGe42jWqwEc4wgvQs7tek9KheOa1FyDKkaj7M0WTPU6Au1mVNUmeNl7pcashO9ZNsjdTvT7RribVJc1THWAiFW/KFowTBr/nC0QLgNXxiaN9ZZNNJOHGsjGo4WCbMWDrMWxlgKYiwFQ62EMBZCGAuhEHPBEHPBEHPh0xZsJvTPDYyFCJjusZzsMh0l6fU2qnbVK3fVKLcUyzcVyHZUqg0R9IeJOr14zZ4Gnd4Go7Yq7boc2ZxwgSRvHqz140g0d7Qtf5y9aJa/Rj7GMNVdKdhYwEuX21qGXpfvlrnYPU919mRnxZIoq5okx4oEm4pEq4oE0/I47Yo4tcpYxepYqcJA4Wwv0URHET8DVhe1B746DFgT9mQb/gJfyfpYBWKucm+lxniT4RjeoKdCnVSo1JQpX58sW58sQ8hWbC/U7at0msRHTOCThmvjW3KCczF2sS4GsS5G6QHWBVjnNB+7cCe9SDedRG+jvEDbroLgjdGoz8+Ddt75Qh9doTd55K3sk88Z25vRx5/Koe+9+x969j5mfWozXQ8TfuHLteD0cNSYIZfzbokSPTSafjRdtN0TdLI6dfz9O7Tza/f7JvR25XBzZm+JcDJXD72Y2n/+8u/Fp9/mlvbmpg7asL/qbA+K9Q/z1Y5wVofVpuQi40/p4auhTi/QQnNWD1aduV45yC+a8kmco/x33fs9K/Pf4/+GKxwGkAB26ukBgKQEiMuUFOepAAwBABwJ4Ofu/Xk3UF0xTUsiTIrFQ4jelO2aMs0liXMIdgpwB4DbcKrL126hrtMgwPnTzv/HZcD+iSAA5+Gwu0gUCxLFRoFkP4tkoqRgpEAyUSEYKGB0CECHAA8BoIOBewjARIVgAyhhOBU3HPAD4Hr/7JwHH4QV3212OujyOuhO/DHdd0AqhTLNdkuMdrozoIlCaKzs+OVTaOPlQVvCTrH+fq7arwrLPYIDuc7msLXgoJ/4o9bj70Lt7RwDcpHxTr72+yztOazmWJhZl49OvYNkhQVfhjYHVo7OgYtGl+GS+DWE0vVzxZYy3d5KXR4KI+F6PVgdYqjGXJ7LSoFXji53vMRDX6Gbzmw37BnvuLBSR8s8qDTlrDHkqtDgyJVnKlBlqDJmq7dgJ7mJLWTYbrbErfdmk3J8SrEW8c4KoZaigSZ8gaa8GEtBrI1oOFog1IoPY8kbaiUQaiWAseQPNucNNufFmAmEmguGmguGWQidNoyZQIgpf5CpYJCpYKCJQLCZEJjqtpjoNBts1umoUe2qVm8rUa9JkS2JkaxNVG7J1yEUaDRkqzblG5IKrXHpJnkYxURn4XAL7mBjjii0YKQ1n68us6cGs7cWu6cas50MnaX4Qz2eW2qsl7U5rjnI0sdbSxVFWNUmOxTHmOZFaJUn6NakaFcmKBaGi5VixEoChIu8RZIdeIKMGQOMmSIsOROtedMd+Qt8xasi5PApKl2lekO1pn2Vhm2FWm15yvhUhapo6YZkha4i/aE6uzE8Zhyf0lUc3ZDqXxTulOpjEeWoG2anHe9hmotxyQ/2SPJCe5nKpQboL3eFH24lQJ+x++/9jz6UHm7En2xk/P0q+PAT4fhT+8HHxMPPJTufOqGPhV/aHNcw/Gsu9E/d2bqMGDLZb6NvwbeJUdBU4UG7E/Sk4/DvtydfPmyvj0HLjQcrRPJiDXm+9nh9jrz56uTJ4sHgwLeFhcOpgb3x7sPOvJ0q991y25MqS6jV6+/C9JdpyW/CnBZspJ86Kr7x014wY1W+cg4BAAoGh4PTtPJ/AeH/kMR/xW/5Os1IUf8sxIYDGOwMQFy4e+WKoyCLrwCtowCtIf0N2et/SF1ASZ5FMcMRNFduXrlFC1BnTovl4L8HgL/7/6204HdvlHBwG4FgRiLYKOHsZ2HMZ5APYYABBhgAYACACQAmGGBGwpiQgBnAmAGSE4XkQAEeKpQEAP40536mqB01WW432u315P8YajkoDYPybPeHU/anyw6msvfHiw9fLh8vdB+Um//KU9ov1yfjvPbxbgeV6ANC3l5v0/dKx+1SrYMKo6Nyi195Gp9TFJ7HaT3NdByJte4I1G5ykim3Eikw4U7X4guWeWjGfEWP5lqaFneTvUiK9MNsFaY6tGizi1S+EVuNnXC84r0UNbpAgeuREkxeHPctaC54sFzOVmHAmfHU6rPWGXE2W/O3OgrjLbkr9ZlqrTiHYvXeksL3nnUfPO/9tdLxaqiitySkMtY601/bz/gUP75T/EIs+ILN+YPM+AJNeTFmAhgzgVBzgTALwdMWai6AMeMPsxAKtxQOtxSORIuB/iajbpxeU5FiRbJ4WYJUAVYqwYU/0oYv2pY3w0c8O1iyIEyxIc2qu8iPlONTgbXOclNOcVJMc1MpCNDO8lYMNGSzk7lrJ0FrK3YbLXrXXOieLucNdZarmqyX7cVp48xECsOtiXm+NSnWOVjlskTVhizN2lSFnFDeogDhymDxykCxbDeeKDuWeBfuDE/RXHfRfC+hYj+xUoxkY7LaQLnVOM6xr9yyNVe/M0+tI0erKUmtLVNntBY90+I3io8kFUVVxfqm+VhEOerGuOhFO+mFoDUwaO0ED6uCEJtkb5u8cJ830zXQ17ydl/bHbyKhD417b6MPthyg15i9N0m772uP37ceffCG3uf9elcKfR79SnRYcLnzLkRs1v7BgCFrBNNFATj8fW041J9AbrOAFonQ/sfdtWlothhabiA/7YFWu6DnvcefX+y/nDvoKT2qjvlJyDrpatwfHdqbGPo+MLbdPnjYXvnXXMOr8oJXcXkvIyNeYAMX3WxX/Yz7DBgZUBQoAKOCIyngCCSA/SvLhP9HFE9xhf0Lwn8NEREw+G+9QiIAHAkAihJQIACAIeAIGJwKAHlmag/hh7ZMN7Qe3JW5dkWF+rIyCiF24TI1zQOAuIAASHBaJfp7jIo47Rzxj6EmgMNOn7hxEwAWFJLrHJLvMhXneQpGFIyJEkWPoniIQD6ionpIibyPhDFTULGjzjympOA8BxeiRHABhCCcUglOkSZw82OIILnY6YRQt1MUt1dmf9yPPZ7Oh0YydwYC93sj9odJu4TMgzz1o1JDCOd4QLA5aDA5KDPc7iw7nB4m40OgGuujOrfdCvPtbI33URLrMUqbRU7jqXY9WBOim0qLj2KLm0ynp1YVWiRGiU396rkoBaZsAwb1q2esH95wZrjpyXQ9kP1mOP8djOCddHUuP5ZrMRJ0MVL0AVx3rW9f8GO9gbMQ6HDmqLJgqDFj6XAUmQjRnoo27AtWGAyVXcvQX+8r+ThZv7PafvCic+cpkbzV+ddCXUOqfZAZD8aSH2MpGGjK62/MHWDMG2jCF2DMG2TME2TME2jEfboRbMIbbMIdYsqDtRCOsBSJsBSJshYDxeGK2QGSKR7CcU6CYZbcAUZsvnrsvnrs/vpsoab8sfaSWf4aVTGWuBT7uiT7ijh0YbBerr9mMUa3MdmqNFw33FLIVvaBjcxDaylaSwlaEyFaPe57Wuy31VivmovShpmL5YfZteQF4TIdC6JVq9IUCIWK+FzZunQpXIocLlmpIko2L0Asy0co11+0OFi8PEyyLES6MFC4NFwCn6oxVOs03x40TvDpwzkM1xsNVBn0lRsM1aAniYGzbUkD1UkNKaG5IVaRdrqB5jL+JvJRDsaRjoYYW6NAa81Qe4vKSKfPS6nQX/iT1+FH70J3PkQevA87fht7sJG2+z55d912fxN7vOG5/znt4K92aCsa2nL7iFfdSBbcjOZbsGYcN37s/fDSeRiYjkRD/T47A8HQUjv54yZ5a+p4Mg9awu0tEQ9eL0BfNw/Wx/dHig7w3jv5OjupSnvFRr+qzX7g3H7WhpPLIvfqs3dWl7byMl55abxGc74OdZ73tlo25ymRZqZCABQMUMJglDAYFQCnb8v+B2r/T1X8H9L3vwrU6QcMUFIg6a9eln9wx4jptiXjDX26Mxp0t1WvXBO8dPbqXaHT4/5j2Tj4XSQAAwDA4JQAdh8geC5Q8N1ACFyjYj8LZz9PwUSBpIPDHiERdCjEQySMFQXYKOEcZ5DcZyl4qRD8lAgBFJwfDlQQIJ+dYdxE4W2I4zGulLw6e7y5TF6fPBxL3G3E7pPKoen5/cGKnyTvw87w3Ta3HZLrSYP7cYP30WgJeWN1b23+YKwO6izYbo7+uwqzUxHyozr4RaH7SqEHyVupzoSj0ZqnCs1GdBCoMeFBP7qsd+tmrjG7+pWL0ufO+gvRFutxZCoxJMk9ChVi9malSVelc2a6GSx4N1v1QbwwtTv9PQcmGqzEXZK1WKcrb6sdZ5MlR7uT0ATLbUaMAAAgAElEQVRGdSZaeyBUcTpJ53NL0lpHwmZb2PZE0c+54i9D8T8WazdGyiKseCNN+SKM+f11Wfz0HvuoPfZTZ/VUpvNRZfZSZ/HUeOyuxeahze6l/dhPhy1YjxNrwBVrJhBrJhBnLgiwaC6MOQfGnBNjzh1kzBVgyBVqLhiFloyxEcdaCGEthJKcZHP8NPICtPMCtItC9PMCNIoxumXhBnVxFlWRxmluiv56HF6arC6qDLaydKbC9/W4aXQ4b2uyXzMXuxdiIpwZaN6Q4V2f4VASr1mXo95eqdtTZzSIMx+oM+ws12nJ12hIU6qKl61OkMGlyTWmyzalKTakyRBylLorDabb3VeHQ+f7Akbb3SdanaZanGdbPZ90hq0Opj/pL+6pTimNDsgOsIt1tAgw1XTXF4yw107wQMd56/tbasa56b2Z9jn5GrH/PvPgtSv0ueD4Aw56U3X8tuxwPYm8WXH0Env4rhr6GHvytQb6qxb6krX9LvLzkNVKKOuU86MJe9ZalYfSVykRALR7akId7nvdwdCTbujL673N0b35Ymi+CtocI39+ebQ5eTRdcdyXcEzw2S03gZKUDhNkTlJlj3O1jvIMTrI0twsc9ie6XsX6Ljnwv7Rheeppu4xxe2LOUSRKdwb+e00CBfiNIuq/GfX/fyAEMAA/dS0AHAnARQC4r18y5mYxZ7mu++iOxu0/pW9e/vO+CBwGAAyBQPznk8PAPyFEAhg1QHCepxC5QSl28wLPRQrO8xRs5yiZKVHMVBRMlCgGFIIFCViQgJ0Kwf/HWdEr50UvnBE7Ryn9x1nh8xTW126EUl8a1ec5bgw+XGqA1mahpys7W7PQ5jPo7cuTjUVoogbqxkLdWKg9mtwfDfVFHHVF7k82QVuvoLfvj16u7S8v/5yf3p5c+jW68n1w+DU+dzXHtdVRuMtZeNBPodVVGG/JmypPZ3j3D41rZ6LkH8ieO+vISO3C8EeCOGOpHnuiErU39w1/XuosLQZXltt+PNQVRpwZsrQ+LPdtH1F7c13JlHnY5sDb5yHaZs/f4Sg47Cc7Ea46FKrUH6a0lGH3rj3qfU/ik3yH1/V+70hRnzqSjiYri4PVsMZckaZ8GGNuDw16Z8WHrvKP3BVZXZTpnZXonZUZnZUZXVWY3FWY/TUeY7Q5w/RZwg1Yw/RZIozYAMaMP9iEN9RcIBItFmEtGmElnuAon+6hkeWllu6unOAgE2Mjnuggneoin+oim+oim+Qsnuevmh+gURyiUx5mlOevHmsjGm0tHGrK76312Faa3kTgrgHPHR2O62bCNAF6fFmBpvUpHvVp9uVJOg35Wl11hqNtNtPdLuPtFj0N+t31Bt21hoRi9aYiZWKZMqFUgVSm3Fqq2FGjOtRsNNvjujIctDgQON/nP98b9KQnbKUvfrU/Y2W4ZKG/ilSRkoVxT/ExSvE2j3Y29bOQDLRSSvRwTPGxj3aznGtzh77kHr3J23ube/jaF3qb8etV0MGG0+Fr7MGGH/ljHPlV/NHnKuhjKfQNf/wBB33GQV9nvo0HP4uiX/XmHTDjjBeivQwoYAg4wU0FItmf9AcfrQycfHl38HoBWh8kvxyF/tqA3i2T5+qhsWxoIueoN5LcYHdYoP93othesuheltpugc5BocqPAov9ztrvkRbLbizP7ZmXPNAvYzxfOPAmcN6g/H17AwQAKBiggsMpEXDkP6tn/j8D93+N35OkcIACMBQA8AuUZzho6SxZ6XTv31SjPi93+8o1OlEKGOrUlvjvECIAOM1+/wCAiQIufvWs7L1rYjcv8Fyg4LlAxYyEsaDgrGdQ7Oep2CjhbJRwdioEzzmU0MUzQmcpBCjhImdQYmcQcoDK+fIfYwbch80OO7MxR6M50FwFebID2ngKffu2uzV9NF56OJC6M5S035u2PZQHDWOhnihoqutk/f3u1pu9zZVfaxO706PkoYGvLQ1r9dlPaiJXcp2INjx4w4fNjvxN1lyFagxxCqwKV6jQLJdcHl8TQiKjhR5myrNY/3kuVZEpUpba8t5VH657mVocnmy0TgzXKk34CtUYw3npXVhoPNiuRnBTl2kxdTuKttnwtdly97gJT4Qrzyfqj0dpTsdqvihxeN+dvJRtvpSsv9kQuppv/6kyEBetleosFGXBF27M763G7KXB7KzE4CjP4qrG4KxC76rC4K7G5K3GHKjFhtXjjNDljNBnDtNhCNdljDfjBJHWEmHmIlhLsRhb6Rhb6Th72XQPtYJA/eIwk4ooyxKMcYaXaqqrQrqHQrKTZAxaKNZeMMNTNttHpShQpzREP9tLOcFeLNFOONZOLNCAy1mJwUL0nhH/bT3uG2bCNP66vFl+ptVxTtXxViVxGtWZSi0Vah2NOh14XXy5WnW+XG2hQkOpSm2hAq5UvqVGtaVGuaVOhVCj0NmgNkgwGsRbDtTZjjW4LbUFrg7HPR1KWu5JnWpJHWhI68Vl4fOiM0Ncop2NU3yt4r2swx3M/SyVMGjdCHvT1hJ76EM69DZ4fysf+kKC3maT38T8Wg+F3gcerDnub6EPPzccvy0nfymAPkaefKne/z+0nWVUXMu2tmutNhqHBHf3hm6gcXd398bd3d2doCFAIIIkSJBAEuJuxF1wCNlJ9k6CNqzvB9n7nHPHPfve7457GTXWgD/VTY9+albNd863vuUin5t35ormh+2flevfDZWetuYPFuLaz0Z0B2ojfZ5b02mbH24jX39DPs0i8+/2fl9Dvv+2Mzuzea9361bHzzud3y/Vbp/N+NEV+Xu9w2a91Y9mp5+dXki381abw9aR0LUMo/cphI/xpDep3s8THWd8FTw40CgI/ivvuJ+hwcIoLICxf2VVoH+VI/4/8ftzAhRAoQAKC0NYAHAARY9j5jLi43Pk43QXYTLj52QSVYMBZt/Y4t9PBsHQX+kZGA2AAAS0GWlNBQ+aCrJrHqTXZmck0aGJtCgFPHqfQBIdVpEep0iL1mCm1TvIqMdMZ8BMr8vEqgFQXgzYXgWe5z4q83k236tcN9q9kaMRG2crNmZub94ZoY4l746lbV3I2p6K25jK3xwLWB9PRR5dRz583Hp8Gbl2dG+0cKc7/nOx3as0/ectlEfHkh42hE1FGpzyJA5FqvU4iDeaiCdrSekwYLOMRSgiB8kAxAgxtzsSPdkZKUIMKZrC7lxseXpCzU6ScQQRLy76WgupTgepUi2xeAWBOAJHDom/UpO/101pyEfpjJ/8WKDC5RSDmTLnu6UuN4vNbxfZvT6Rsjae8+FoxM/L1Y+PBL445H+60K4pQbsiTL3QXaXARTXWQiLRXjrKQizORirOUiLRRjLVXirHjVAVotYSq90YpV7tT6rwla8NVDocowMqI8xKQ4xKQvTLwgz3n03Jtt35nidrIk43xA7URR4rpRzJdWtKs62NNa2I1CsL16qNMWpMtDyc5tie5tiUYHkoxrAyRCPbWznWRirYSNhXi89Hk99LnTdATyjDXaUhwaunMLSnyLe9wLKzwuB4s87xdu2uNo2jzXpHGrTa69U7W3R6j5qMnra9MOFyacp1csJhcszu4oTj1VG30Xab48Um47XuT/qSXl6ufnmh5sFQxURLZldpbFthTEtORFW8b2aQc26EXVaIQ05IQG6oV4q3VUuW37e3RXvL2dsfoqgrpdsrDXsfe7YXEn7MRyKLFOR95s77qt3Va7vLh6mfm5Cl7J3Vjs21amSlGfmQ+eawzutay/tBosPGvAQazP7yn6QrigzG/zFdsbH2bu/rCvL+7tbjy8jCE+TTu73Pc7tLz5F3l6kz/ds3mqjXandPJyHd4UiLz3qzx49Wzx9Nnn9Uu65km75PVPqYSHwfp/Qy2fxpgNJ5WylJCAAIDf15+IN+tctCWADjIBQaAAwEMBBAwf8DDmEIQu2PXyijAIAABGAY0MBoZoBlEaZjseBm9xE9qMvFjRFQADAGoDHYv5kS+usBAAoFAGCHAJmBTo+LyVSQXYuNTouNToUJp8KEU6bHEjBAngalSI9TYsASaVFqzLT6bEy6LHS6TLTadDh1WiCBAaaALgXPekyR62OUwnq5BtJI/v2E9/rV07vXjiNnEncn8jeuVFDPZyP9CT8HwzautCJvn+09PPe9L3Gj2vb3VM2FWMK7ELHHceSPXUkvegpvFoWcjbLo8FDq8pJtMuSu1BUNlBNUw4FyBwU3TlZjBmy0NEOTh5ifGLcJI86Vn9lfhOOQvUS9pXC8gqAv38F8baFuN9kaA7FkRf4YWY4MBcFsRd4GQ6kTTgqDXoRTHlJngkjTSYa3ChzOp+lOhKtfz7b8OJR3pzH447Hwh0eCHjcG3GnP6My2LwlTqvQnlroqZDkSos2EE61FUq0kM+1k81zkijwItaHKJ4tMJlqdxw/b95Wbnygx6a+wGKm3B02pDo0p9i3pTk2pDpXRZiVhhnWJVkdy3Xpro0daU0Zak/pqwk+UBxwv8+8p9unIc29Lt29Ns2tKtj4Ub9WUYNmR4Xgy36053iTBXi7IUICiy0fREQgyEAk2FA03E8/2Um9M8jlWFNaT73s4y7K9SL+7Tvdku0Ffl/HYgN2ZPpvB4xZn+qwuTbnfvR748Hbww9vB9+8GP7gT9PhO4IOLAWNHbI/mG0xUe7w8nfVi+tCTsepr3QXHCiNKI10yA6yzA2zy/G1S/S2SKQbpwTYpFMcMP/eSSNdn51ORz41bs227H/P2Fru3F48ii83UxWJkeXr7Q9H2csnOXCF1uYf6oYX6uWtvsRv5NIZ8bdz9fBZ5ffpVs+utFKF7PqKZ8jz74QkNgCYbIzLRjsyMU79/pq6+3n7Wu/v0JPJkGHl7EVl8vPt5jvrpPfXt1Z2bHZuTRX8Mem91ev6sdP5abvWl0nS5wuFLbdBqget8hvpckup8ktbrVP2FaPXjhlIsMAbAMAwgGED7IfGfOcQCgAUAC0MY6G9ypX8LIcBAAAMwv3aSGAiGIBSMwqHQeAjgaFG06gdZ7HmZpVh5IU5pgEYBFAr978+c+w33f/6BAhCgh4AYDqdxAG8mxGHMf1CbnZ7MiCbRwiqMNMr0WBIdlkiLUmbEkZlodDiYjLgP6B5gMGRj0mZhV6anYYaBDAB5vBzXXcS/1eohExTq+azNR6Mba2vbawvUtze3XpzfengCmarYPZu9O5aOXGhCLpz+1lHwPt3wRaDUfSeR1/4yX1LJSwVGH9tjHnVk3KsLm86wbLQXOeIi024mWqgh6MDHoksP8kwVHA6whMtyp6tJRSqx6+IY1QCTPhbk6IgMBKrVm8rEE3lCxHgz1AR63OUaTMUzyYKx8lypCgKJcvwZRN56Q/FjdrLH7MX73KRHw9QelLjcyrLqd5brdxC7WxPypD32ea3zrSrPq6Vuz/q67gy31aTZ1YYRq71FC93lM11IqVbiWXaSpe4Kdf4qh8JUjiRrDtfZXOr1ujzkPXHc+cxR+5Euu5EuO9CV79NTROmvDO2rCGnNcC2PNKuIMm9Isj9S4N9bEdFfFXW8NLivMnysKX6yLXm8OWG0MWawLuxYiW9rml1TklVHhuPxfI/aKONwU0lfLT6KjkCwoWiEmVSkhWSkhXi2l2pdnFtnln9bintdrOmhFN22Ar3uOvOBIy5n+z3P9ntO9LtdGPa5NR368HrMg2vRdy9H3L4cdf9qxP3L4XemIqaOBQw1+l89nvH2fOPzC0du9Veero6vT/TK9LeMczOIddZLdTdN9XZI9rXNDnFP8rFJ87OYOBK4s5S5+T57+9MhZLlud2Fgb2WQOtuwMVuFfB3bXWzf+9y3t9y0u9a0uxC1s3RsZ65oa6kFWW3f/jr4/mzw2yMOl/3FRyzFjbhZ9mMQCoI5Mbg7ZbnI86vIt5XNtze3H3UjLweQ52eQV2epL6a239zYXZtFvizvvbuH3B3YvVq7O5j7vSXhcwVlrdhyNtdoPt9sMUVlNl71XaLqfJL26zTztzH6SWLMAGAADDAA2hcn/iHZA4AGEObPbA0WhuC/y9b8JwQCAO8TCEPYfdUPDVCoX2IGDADAQDAANCKMdHqcrFzsEhgWif0oCaMw/25SzH5XE2p/afrVVMECAzIj1kKEx0lOxFSQXYeDgYiHlOmxKoy0JDq0Ah5WYsAqM+I02OgNuVh1DzDosdFbH2DSpqMRxGJkASqGlXZc/eBsiPzGyaC9x5PIh+dbX1a2//iK/P4F+bK89/oOcqFx/ZTvt0bz1QLdj8kmb2IsP8RZzKdYz2f7rOXZ/6y0/lLrOH8k4UFXyvXWwMk0o3YLkQ4nQoeVZIm+pAUrPlie00OI3ZKeNpHAbA7R6kJAG6Y3xjOXW8qdCFDodBVvdyAkKLL5i3AlKwscdZXpsJPJVROKJ/IkKPBEyvBFirHnKvK2GEt2WIh324sN+pMeFDg8KHIcC1DpMBEYCtZ82hzwoNz5SobF8+bQ6a6W6ZHRaxOnW1JsqikSxX4KOV7KxV6KpX6E+lCVwzE6XfF6R1P1eotNTx2yOdViO9juNNBqP9Bq39tkA47keHfl+/WWh54oCT2U5JLjp5/moZnlo1scZFIcZFIaYlYbY9eW5tGTTxkoDztTFzvVnn72cPLIocgTJZ5Hsh2akqwaYi3SXRQD9EQ81XgC9ERCjcUjLSQjzCXCzUQzPZSrou1bkj1rIu2KKNpFgar5IYqFMWpV6Qb1uXoNefotxUZHa6x7W10GO72GunxPd/oMtvsMd3gNdbgPdVKGjkSMdWVdH258dOHYo8mOibb8hiTvTD+LRE/jCGe9MFudGAeDeDfzDIpDCsUixc/hUKbLt7f5yFo5Mlfx+1IZ8rlz4+Ph7/MF24txyOqpnd+GtlYad5b7dpYHtr4MUOeLkaU6ZDZwayUHWRv/udj3rtPrcqbmOXexcmV+DoDFAxoMQO2bTUQoSlOv9SIrT7efXUGentl7Or31cnJr9vbWm6vI87PIwgPk628ba193lhY33q18v3t37fyVpd7J3470LNeXzpdGL6dYrMRovktTeR+r9j7D5UmcjTsHFgAMCg3wAIUB/8Tfvr0SgLAA7HOI+asy+38EIRpgYAgHAAYADArComHMrwMojGdEQdL0tHTs0nQsUvv6/t+0E+P2J0btO/OjIYCBIEADgBwWaHMyWYrz6HMz63MzK9Gj1ZhpNVgZ5WkgAg4o0KHksECRAa3HxaLLRq/FQmPEhFLHYwQBRIJwviwHjyoprmRn7D69src8u/f60sadzp2rR5HL3dSLAz/6Or6UOn2JlF2LJa3lqvxWqbvVYLtXa/mz2uRHi+/P7oQfffl75wd2rl57M3D4YrVfN0W1kCRapc/fZiFZZChtx8kUq8qjBUHOXAcP28rWmkoWmfDUuMh2BquPp2gd9RA77qnWZE1I1+D0FWRPJYsc9yCe8lEr1BKNJ3LFynEGiHMFCLEkSrPV6Ym3m0l0Won1eshcSTF50UwZiVCrNxHpsuO/mG90p8b3TDC5P1K9pz67o73//MT9ayeaynwJub5yhUGqJf6EgkDZsmD5mmDFumClumClqlCl0ghSSQypIpxcEU6ujdGoiVYHRf4G+RS9wgCj/ACjBDeNAHN5b0MZX1MFf1NFf3MliqVSoI1KhLN2rJtOirdRZaxbb3XUcFPCYGPUqdrQ3ir/tiznXH+dEBNxN3U+VzVeX22RYGOJSAvJKEuJeBuZbA+1qli7qnjXkjDbvADdfD+NdHeNeDfdOB+9FF/NdH+drCDd3FCDwgjDkmjjsljTsljTihiLqjir6njrmiS7juLAwba0cyfLro823hutG6hPLIpwCrZUC7ZUC7RUDbLRCnMwCPMwjvMyTfOzygm2ezBdiXw/Rl3MRt4nbs2l7c4nUlcPby6fpy71/VjI2/tSgSy2Ur/d2lyu3pvL3pvN31usX1/IoS4PUT8PfbpbPlOg8DhU7LSVnAwMAGZfucahAAYLAzoInAo1RuYv7b6a3H018ePFBPXl9Obzoa13p5DZ68j379trX5C1T3/Mze++Wf357PnK0LlvzSc/V5e9qyhZqCmczbafjdWZjVF6G6f/uthrIVY1WZ4LgiCA3o9N0N+c+v5btWz//geFYkKhGACMBxiafcc01K9ibBgLAIAZ6ARUMKw8AIYg1N/qH9Cv6hl4/wHQAIZgGLABSJWW1oyP2UKWw0lGQJ+FQZEWS2bAyeIxMjRoOVqsFBYm4FHqB+h12Rh1DtLpMKC1cDgyQFswMKZKyvdZur8pr/h98uROc9RWletWje/m4cQfDZT1IhNqhfl6i8Pm0cDN/sD1kfCd0SRkMGb7pPePY64/+vy+n4xCTkcgl1p3n9/87eLFq+WePX5KSVJsaZK8LeZShfpipnzsaWoSumi0AQ7nLnEwnihUqC9fbirX7Eg85qtyzFupx12x1VYqXUM4UpY7lcjT60I6H6rVYiOZpMAeI3EwSJAzSJgjQoozi8xfqy/aZSV5ykN2lKLwuMTtfLZZh6vwUTOpwUCly3k2F9L1xmL1K2P9a7Nb2pp7z01OHWvIS/GULg0j5gaK5vrL5/rL5wUo5PsrZPvIZnrJZnnLZfsQsn0Usn0Usrzl8/2VgJuGiKu6sJOakIOKkI0yv5USvw1Z0FZdzF5NzEFL3FlXyllf2tVQ1s1AxtdUIc5VryHNras4oK8q+HRd2Ona4K4Cz+Igg1BTCXcNfmcVbg81PoqecIiRWIixSJS5ZIaranmUbVWce2mkU3GYaVmocaa3frSTdqiTepSzdoyrbpy7boK7XpKnXoqPXpqfQZqfQaqPZgZFJ9NfNyfIoCrJ8URNzHhX3kRP0YWeop6y2DRfsyALspuutI8Zyc+CHOqoF+6qHulsmB1kemOgGPnasv6xnLqYSP2QTF0e2lkapM6OIrP9yOeW3eUj2yuH11faNz61bazUIyvle/NRm4tZ68uX1le7f38b/eaw061s9TNOAt4iLDgUDGAAABoFABqNBRAAEDpQ8gD10TDy8uLus/PIsxHk8RjyZhL58HTr2/fNlRVk7snmq6nd20eRmRHq/ZurfS0fsuw+RJA/xunMpRjOR+t+DJNbjJWcSzF8k2S6FKvRqstPBwAM0/5fQwjDtCgUHYSlR9EwAjTNXyz9ghDLyiCsAmgP/mrL+DsIwV8QQv+kWDIAIEdLY8TDZCvH7UISNuRiJTPgyMw4eTxWGoeSxWNk8RgFOowKM16VmUaNEaNLD+ng8aoovDpAuWJpSzl5xzVkn3ipfCvT3zge/ONiE/XlHeTdk817vdtXy5DLBcj51O2z6RvjGVsT6dTxFOpw8u5IKjKRs3U+HTmfuTWRv3m1bfv65ce16ZORVo3m0j0e4t1u0hnqnKbcDAGidMY4WAfQ6aBBoBB9mARDPIGhyV7mbKxRh6v0MS+5diexTHXBKBnOFAXOLnuZ6UjtUwEa5YbiaQSOWCm+MFHOMAn2VAW+Si3hI5YSpzxkxwMVrqaa3q/2PO4j06ordtpP+WKGTX+IYn+IVritSX5seXpKZXVF053JkcZMxyxf6fwg2cJgxfxAYmEgqSCAmOMrl+klvQ9hlrf8/sijKAI9Cc79YSDFbSzLY64gYKEsaEkWslcTcdIUdzOQ9TJR8DYlepnIU8xJkU5auQH6VXFWh7NcT5RRTlUGded7FgfrhZiIuqrxuihzuanweGrweqrxuJE5fTT5YywIxRE2NYm+5TEeJZE2lVE2uf4Wsa76Ya66MW4mse6msR7G8e7GCR5GiV5GyT4mKb6maX76aX766b76mf76RREWXSWhZ7vyzhzOPFGemB9qH2mv5WtC9DJR8LUghzhoR3kaJ7jYZAVZPj5XjaycRZZKt97k7i0nI8vNfywm/ljqXZ9v3F7IXl9tRT6N7awWbyyfQdauIGs9O8u1W4sVyOfhnbVBZO3C5svemwmil2K0YgkHWAAAaNwveQ0GKIBGA4CG6A3pwO9XTiKf3/14cx151Is8HkHeXEd+rG3/Prfz/jzyamD3cuXm6cjPHeHfjrevthW/yzSYT1SdS9N4ESf7PkbxY4T8uyiV+RzfN+Fa8zFq1zxkpbAwAHT/lxDuHwIxEISHsUwoHCuMZQEoWgDQMIAgGI0CAEPPyyahBbCMEAQA/PdC4S8I/0PfFRoAbgxQZcCaCzBZy/Hq8TGpMGGUmNGyOEgUAuIoII1DKdBhlBlxZEasGiOGcAAo0eG0sPSGKLwPA1OFmOCkhfRypt7GKQpyq2b7evf2zT7k2TT19cz20ws/rxZt3SrcvlxGnS7fvZi3czFnZ7p4d7ocmS7ZnchHprJ3T4X87IvZOd/3ui5tKki/3kz8uBep3phE4WM0PcBQYS1VaCSQpSada8Df7aMwFqt/2Emqw1X2pJ9yp4tsl6vcMU/FIk2hFCJPrppgp4PUhRjN8/HGHY5KFRqCyQS+cHH2YOEDMZJc+coCTYaiJ52kxgIVLqcZPm7w6/OVb9IS7vNUvphi3e0lXW9H0JeW9LENzE6riY3I62k4Mnk0PzeIWBCkUBCkkB9AyA8gFAQQc/0IWd4yOb5yuX6EHF9iji8x20chj6IINIUPqAuyaAixGkhymMvz2ioLumqLUUzlQ62Uw6zJcc7aKd5GqT7GSZ56ca5aca5aqR4qWV7qpaEGLan2XbnubemOxYG6EeZiPlpCFD3hICNRP10hJyKHhQSDndwBio5IXrBlTSKlJMorP9S6OMImi2KZ6GEe62MW52kU72UU72UU722Q4GOY6GuQ6meU5m+YGWiW7mec7muQHWBcEGzWmR944WjhWGtmVZxXlIO2lyHBx0zJ31rLx1wtmWKTG+HSnhM1e79u77dju8u1yELOzoeEncWUneXOnU+je2tXd+bqNj74/5gNR5av7K317n69g3yI+7pc+HPlBrJyDFk98ePTALLy5NXJqEuRAn32snJ0tADANCg8DOH+rBDB4QFEDyA9LKPQNpAAACAASURBVJgf6UY2P2+vPUdeT/58fQH5bQFZe4pcavitIeRhuMUNM7kpXa4hDe5edalBA/IVZ/WHEQbXA3UuOUl9DJR9FqM/V5S8Wlv9IsbkY4LSs1B1CzY8hPqVHf0byP6nEP5SKQCAAYSFMMwAcwBNy42j44AgPAQw+1tKWg5JHhl9ANHAENjPtfzXc/7yetp/cxgAYHoIEDCQJTeLs6KgpQynPjudMhOagEdJwEAUApIYSJ4WrcyIU2PBaxyg0zlAq01PJ4/B8kNAFAbmOCiLh2bMgH82TWXrhBNyJhUZKUIms5G7vciLB9s3OjamS/emSpGpQuRs5tZE+sbZvK3x7I3hxO2TEXtdjltN1r+1xX85efhdRfSoD7nZTrHZVrJITSpHTUIbBcqsZY/5y+eQ+WosBXp9ZQYCid0eMv0U5cMO0t3uxGPupOMeijV6IvlqgiV6Yl2O0udi1C6lGJ/wVG4yEMpR5o+T4QgVZYsU40gn8FZpCfY4SJ4NUbySqf+w1nsyRqvdWHLQV+VCnPlAAKnaXlmOh0dRQtnLOaQkv7Uyp268pyo/glwQKF8YpJAfQPjrl1yKbIG/QmEAMY9CzPVTyPYh5PopADM5NjM5Ngs5NmsFTmcyn7eOcJiFbIq7ao6Pbj7FoDLCqinJpSXNozHZtSbWvjTCMttHLd5BLslZvjzcsDHJpiHBqjhQJ85WOtJSLtlZMctbNcaG4KLIZSLCYCXF4qsllOVvWpMYUBzpnRVkXRBqneFrkehhHu9tFuupF+elH+9tEO+tl+Stn+yrl0rRTw8wzAqwyAowy/I3zgs0KQq16CkOne7KH6iKS/cx9zYguGhL+piSKZY6Ec5m8Z7m7SWRnx8dR75OIL8N/pwt31sqQJYbtuabt1ZG198k7M1l7awcpq6NrS9X7K41ra/4782mIstlyOro7mrdxkLH1teTP9YqFq6HTefqz6RpJRA5aAAEIJju14VEAEAwwGABDJgAUIHB/OnO3ZVn1IVb27Ovd5bfIstv5oqir1lLDihyDiuKDepIDOgJjBoSxqzFhu2khh1JY36KI95qpy3lzxgL3IizflRW9LGm+k2O/8dk8ock41yyEOpfCrL/FyGE/wEhhAIoGgjDAtAHMbR89Ez8aBwzBOMAgDF41oPimvwEIwhgYAgAgMZAfytRQBiAotln9ZclKYYOoGnQABIEwJCJzlmW111Z2F6Uw5CTQfUAA5EeK42DZGjQBDqMIiNWhRlPZsQSGIAWM50SGi0OgAJAebJw1kgInTOS+hxD2m7To46E7k2m/D7s/m0sHZm5svn02s549uZg2NaA99ZA0M/B2J+jCZtjUVvDwT8HQjabjNfb/b+PD/84M7FQlj3opDEUYFluyN1oKTYYputykM5P5GB/kGaGHH+2IleblUSzlXins3yvj2qXq1y7g+iAL+FMsGKToXixhkipjmirlchEuMq1TLN+X3KzoUCxhlCKAneUFFe0BE+qLG8Jmb/dQmw8SPlKjuHtUo+raUaH9Hj7PBSG/FU63SVClfn4WJmVpORMdMwzEovL8w5N9LWWJWoXBxNKwxRLQkmlYYqlYYrFIaSiQIXiIGJx0K8Nah5FvjCQBGJsCLG28iEmkl4aAl6afEEGIrE20uluijneaoX+2uWhxvWx1i3JjofTXTvzvDvzfKujzZKc5eMdZMvDDVtS7ZuSbSsijJJdFFKclAv9tSsjDNLdyO6qAkbCTOYSLD5aQtl+RtUJfgVhHun+FtmB5mneZgkeJtEeBgkeJomexsmeJineJqk+pqk+xul+ppn+ppkUk7xgy8Jgi8Igs6po+77yqOH65Np4l2ALso2SgIO6qKse0d9CJ8bZqDze7vWVBupq+eZC+/fZ6p9zjVtLmTuLNT/nDiGfR/YWmvZmU7c+NOyunNhe8t9eTPm+mIEsFW7PHqGulu8tZSBz7Rtr3dvfXzwfCbgZLtvrRBTHAjQAAEJhYIAGAKCwaPDLCpsNRhMh8L6thPp+av3V8N7XP5DPs+9KQi+qHbikxnNRX/S8ueSEE2HaR/FSkMGFSM2pWO1LyZZX02wupphPJNkOxjmd9jfoCbYYj3C4leB5L1jxXbrlCQcN+j8rY/5XIfwHgfv+2RCaDsayADQrwHFg6blROFYA0wEIwPTstMKaTELKf74BzN9EQgjAAEULcEwAQu/XuwIIA+EPAjQjBOPYAUqdkc5VmidAQ8JZhseInZ5IjybgUZIYIEODVmDAqbDSa7IxqrLiNTgx+hzMJCxGCoKVUfRB7AKtBKHL5oJv0xQ3Wq2oA4Gb5zN/3jy0fm8cefN6690r5MaFnxd6vk+1b10a3Lt2ae/6FPXq0O6l039MHt4ZKlm/0PHz+dPta2cXSguG7I1vJnkc99AYDSGPRCoVaEmZMeOOU7Sy5PmTpNiq9fhOeqoe81DqD1Dvp6i02oocdZIa9CY2GIqUaomV60k2mQkP+hOvppuNhWsfthAs0RDIJPEkKPDFEwQyFIQLlPga9AT63eUHQpV6fDUuxus3GHD2ehJGA9VPBCrbibPTw4AkKWFjaK6prOXrFnq6u70pz6qAIlYeoVgeoVgRSS6PUC4NIe2P4iCFwkBSUZBiYSCpJEQZdOd6tKY45frqBRlKeqoLeGkI+OuLhJlJxthKJzrJJzuRMj1Ui4MMmlKdBqojxw+nnij2LQnRy6NotGc691cF9VUGtmU55gVqZLirFAZoVIRrZ3up+mqLmYiymIgyuqvypnvqVMZ65oe6pvub5QSaZ/iap/mYJ3gbZ/hYZfhYZVGssv2tcylWeQGWBUHWxaF2eQGmxWGW5RE2FZHWLWkevWWRLek+8a4azhqSDuqiNmrCLrqEAGu17GCjp+fykM8d2wvZ1I9Nu/MVe/MD6/NNe2u920tdu4ttyHLR5nzM7x9it5ZadhePIaunkNXG3bnazaUje/MpyFwAstqy++3c99c99+pM70YR/SW5cQCgMDCA0PsNOxBAQwDQA8AIw9wALQ3AZKTz1sezu29OIR8erhbEXNbgvGsp8irA4G263cN8u2d5zq+LvV4UeTwrpDwuDH5YEHw/J+hOru/lPJ+J3NCLWZRzGXZnEq2nolwmgvUvRRpkKInRwOj/bQjhf4YQhtEQRAehGQCaCWBZAJYFYFlROFYAMwI0jDogiBHRQrNLQ/tXc8N/W7YG0ADLCNOzAxT+TwhpUPQ8MC0HwDChAUoABYzZab0VBe1kuQ05mcgseCI9WhIDpLBAjnafQ1oyE402J50aI04aBSTQsAqG0Z9dsEySZ9CU56G/2Fa9HTKWQ709vv1mFplbQD6+QJ7fpz59vPPy+earF1svnu88frBz9+Lm1TPr06eQm1PIzO3tF4++Pbr3ebzuXqz3mLPho9yQS3GWg/4SpwKlO52Jpmxwi4tKKoEnQYa7w0nydKBqX4Di2QSD0UidDkfZNgvJLku5Wn2RPBXBMh3JNgvJE25SFxINLqaYH3eTq9YRzVLiSSTyJioIZiuKFJEFKjX5jzkQqs1F4mXZh/zVOmwlut1kO+1lauwkyQdZ2RjohNg4yBIEJRlZOyuP5srazlKv8kCJ0jBieYRiRaRSeTipNIRUEa5cGUEuDSHtb1ALgxSKQ0igK9ejId423U0ryFDGQ0PURUXQTU3QV08s2EI83EY61EIiwlo2zVO9KsGhtzZ68mjOubaE5nSH+iTrwbqwK8cyrx7PGm4Iq0+yzPJUyaeolIVp5PmqBxvJWkiyGYswOStxprqqVcV5lsd5F0Y6lEbZFYc7FUe45IfblUe4lEc6VUa71MS41MS41MY5NyS6NaV4NKd6tqR5HMn07srx6y0LP1kaURZhG2JFctch2KuJuehJuxvKRTiq3zidg3xq//Em4fvbCGTu0PabLGTh0M/Z47ur48jK4Pr7gM2lht0vLchyKzJXtz5bsj3XjKye2PitYXs2bfND4e5q0fZq5ebH5ueDlCu5WictRXhRgBYAgMIACI2CaQDAYcC+LAYzooAQCiUHwFFb9fUPl5Dn/T+bk55Z87/M9/4yXPfHtc7f7p78dKNn9VzT74NNC+OF747lvT2c87Ql+V5D9O2KyBv5Ibfzw6ayo89nuI7nB1zODjyfHzSV4uosIvDPFjP/RxCi0cwwmhmgmSBaFoBnBlhmDP4ghGEGWDQdvyy9jAnELvWrehXG/G19HAaiYUUx8QAsA/jV9EsDMfJjGAUAHQfA0rCigA4z1oskYEvkM+E9oMPNSmbBS2LAXxyqsNKqHqDTYmdRoaNRwABZALQAbTw3oU5CbtiE+CLc53tn8+7dezuvXlBfXtq7O7B1+fD36YqNO6eQtzPI3Kv1RxPfL9VuncvZnUjdHo3enMj9cXdy581b5MGzP4Yqz/nqnfMyeFacNuij3eMoMBmpMRhIthWGqqwlG22IKYrszTbi/QGqozE6p8PJZ+N0OpzEW0yEeqzlKnSEEmTZ85SF2s2lexzEz8bo3si2Ox2gcshAJovEHSl1MEKSLZnAk6vIV6HB32NHLDeU9Odi7HEmDVM0zkYbdtjJpGpxKbLz8LJzSvIKih7g01MjO9p51pXUtxd5VQfLlkcoVkYpV0WTy8NJZWHEqijl6ijV8jCl0jClsnDlklDF0jAlUOCvG2kj528o4Wcg5aMn5akt7qklFGggEWQiGWwqFWIuGWYpGW0nk0PRbM92m2iJnzycdazY70iu08Xu9MeTrQ/Hm6/3Fpwsdi/0V87yJBf66xZQtCLMpGxk2IyFGJ2IHOlu5Joop5bUgO7C0N7qqL6KuFPVyaeq4gZrE4fqkobrk4cbkvbHyKHEM41JZ9tSR1tTR1pTpruyL3SkH831TffSo5gS3QzFPHWVnXTlg/Rl7/RStpdL9z4UbL/P/LpQtrnUsz7fRV2c3Fm+hnx6srHQt7FwaO1d5/qH5L2VOuTDUWRtBFlM2F6q2Vyp+fntzuZK34/Fsr13zVurZ9/0UkaCJK0OMvz6okP7az6E/jMRjwFAAMaqAgYVFMgzEEWejyNXqj/mGS1c7t95ewtZfbm79Hxrbmbr/e315xe+3Bv6euPk2sWjC2NNHwaqXx0teNKcdrcq+lZp2K3CuCtFAZcKKFM5IRcLgu7kehdakfG/OtbhfY8mPAoFAAaF+o/mv/t1bTD499fEAAADFATQAKD3NXoIxkIwDkbRACwzwLICGjaIlgdm5IcZeVEMXCgGDghLS88vS6PggGfl+vP/BvuWpxAAAI1GA4CCsADHBAAGDQEIYCA6DjSbBMCzAQDQEAAwFjDxoA4IAhYBQMsGA5QkA9ZVVsBPUcRCmFmXm0WZmUYMBlI0KEkMJEcDk5lo1Fjw+hwsmgeYSLSwHAyUAY03l3IB0abfIfRBSv1aQ+7OQAJ1Iot6oYQ6lUU9m4pcyN+72oQ8Gd9bXdl7Or0zXUidzt+byN6aLqCez/h5OmXvQhMyM/VtqOeMu+XdGK/7ZTGToYbjMZqTYcSJYHKgNK+3NNvpCNVSVb5DZhL9fgp9vsROJ5kTXrLttuJtljKDFKVmQ+kMMmsqmafRSKHTSmwkQPFWrtVwuFyDmXCBKn+iLF+QMFuQKGeCvGCpGv9xe9EGExk/DsZWF9njXtIDbmoNNuKhehJEEWE5UT4RTn4FYWEDZWlXa6uclPyumoyKGImSWEJVonJtvEplBLk6XKU2Uq0mWr0qWq0iWqUqRr0yQq0yXANEWsp4avG7qfP56osHm8kFm8v6G4oFGopQdMUC9CVCjKUjLGSjrGRTXMi1MTZ9pSEjzfG9Vf7dJW7TxzKeXmh/dqn77pnagerg4mDVHG/VshCD8lCDGGsZGxk2QyFGZyWeGHtCTYxLb1nihaMFd4er7g03PBxumhlueDjSMHPm0MyZ+pkz9Q9H6h4MV98fqnowXD0zUvVotG7mTO39oarJ5sTaGJtoO2VvQzlnY3kXspiHntJgp9X2b8Ubi9XIbNePlSPUpT5kbWR7eXBj+czX5cb1xY71d+V775N3P/cgy6eR1SnqctnO1/yd+VBk7STy+Sb18znqUiuycgFZvfL5UdnnPsscXW62v67C/NWyDv1pDYFigTFCACjRM6hCoEhLGrl35Et3BPX2YWTlMfLbS+TTi+3l5zsrL7bmH6y/vvL96dnv9wa/3ez/7VL3ykTL7EDly47cR40p92ti71Qk3qoIu1oQeCE//Fxe4I0cz74oZ0kWPA6FBhAaoNBYGGAAQME4AND/oVh0H0L0fxtCCMYC6C8IGSEaVoiOA2bkhxj5IUZ+wMgDM3LDGFospzhO3h7PzAn+9B3e/wQgAO/LFWgUHtAeAACH3s9T0XPieOVgZr5feVQYAxh5aHlkYE5xwMgDAIYXDcyF2YNUJe3E2SxEuDTZGSRRQIYGLYvHkBhwKsx4ZQaMIh1KmR5LwqMUUEAZYH045AuJZn3WHte8bWfTzX+2WG6eCt2ezN09X7Q7XY5ca6PeaN55OLC5sLjz/vnOnY6t6/W7lyt3rlVsT+Qjo2m7Y2nfB7NelAePuqk/y/V52hBzNszwTKTmCEVuLFApmiRgdhDu9FJoM5cr1eTv91MaoCgedZUZDlEeCVQ76qhQa8je6aTcZCmWR+IoIPE1m4qc9lWYitGZStRut5cu1xbNIgmHibEHCLNHiHPnk3n7XOTabGT8uBjq7WVPU4gnnRTLzMXDTUmGZDJJQkSIg1NVWtpSW9nV2jI7Nb+/rbw2VbE+Q60pS/tQskZlpFJ5mNJ+oUx5BLkqWrUySrUslFwZqgYizAk+WkLuGvw++qJBZlIhFjJ+BkKe2rxeagK+msIhRhLRlrLRVtJxtnIFFJ2WZMe++tDTjSGn6vwvHM+YOd/29HL37ZGa3pqQkmD1ogDthjjLhnjTJEd5O3l2QyFGe3muKHu58kiH7uLoc11Z986UPxypezRy6PFwzcxI1aMz1Y9Hax6P1jwZq30yVr0/no9UvZxoeDHZdH+gtK/EP9tTM9BExkNP2kFVwlOdMNDuurdWubXUsv7p9M7CWeT3+9QP7Zvv8r6/i9xeqN5dGkI+TW8vtW8vlux8mtlbOrK9VLy7XLv7bWB7uRX5PLK5VIOsVu98Kdpdbvv8MvthK6k/jCSKoUMB+B9bvj9h3O/x48JgpdBAiQZviGdKURD6NpD+szd5a21md3lmZ/XJxtLTrdVXu59f7yw92fhw8+eryz9nxv+4f+br9YG1C91Loy3ve8ueHc6eOZR8qzrudmX49cLQ8wWRkwWBF7M9bhSF+SqLoQHYrx7F7DOExgKAhv8pSQn9tyHcVx0ggAHQLwgBigZgGQGeFabnRDEJAGYBwCwAsQiiDwoBFA18UJhGwYGGiePXq+y/Kgztt0+hAEBhGQAzN4Dp9tsIYWYeJnFVGm5JgMahAIBROIiBi1aAhONXgDjEAJqREQDlA7SBGjJO0hxWIhy6nMwEHJDFomQwMAEHK9FhVOgxygwoZXoskQZNgoEWRBfILV9E0O7Q0b1sLvkuTOZHjcZWv9/WuRzqpbKdqzVbN1qQaxXItZqtN4/2lpb2Hg1tXq1FLpXtTqYhIzG7/T7rnU7LFS6X/PQmvHXnGhNetMScCdQ+E6Y3HqI6EapaZCxjygjq7eQ7bIk5JJ4eN9KZUM3RMLXz8drnonRHg3SOOknVO8idCdIsVeLIkOFstpQd8CBMRWhfSbca8FGuMxArVBWNkeQKFuEM4D+YSuDqsJMZCVGjCDAV6IlOhGiddFVJ1BVy1yUGuXjqKynJCPJqyMtbaqm72ZrlpOedOd7ekKtTn6HamKlRk6BcEqpQGkIqC1Xcz82UhSqVBZFKAkhlAYog2lLBX0/MU0vQW0fY10DMz0DCQ1PQSZnXVYnbS50/1Fg80YGQ6kLMcFcqC9FvS3U8VuF/uj6kt8J3+FDk9cGy+5ON1waKesopub7KBRTNuhjzygi9WDtpZyUuc4mDtnJckTYyBYFmTcnefRUh59ripo+kXO7IuNKZdrUr/erR1Gvdadd70m8ez7x1IutOb86d3pz7J3Lu9ubf7s0/35rYnGSXYEf01Zd0UhezkBbqKnRGfh9D5k/sfKze+za8udC+tXQUWexB5oupsxHIfM7Pt2W/vyv48SFvd6GL+v78xseGjdUS6lr37uca6lI0stz+Y6Vze7Z6Y7VmZ6Fg5VL65XgZV0UuCAWwgO5fvvUQAABgIcAAQbwQUKIF5kxsxkz0zrzoSxluG5davs3PrC88oH56vr36YnPl5dbKy62FJxvv7/x4efXH0wu/Pzj7+cbg6sXjK5Mdc4N1LzrzHhxKuV4Tc6si7FZJxHRR9LmS8Au5Xtfy/dt9LRj3L5b4M+UIAwhA6H/um4B+Ke7wr03yf2bNBkHQr3Tofv8TjAMQFsB4gKIFOAZAwwLTc0KM/IBZELAIodhE0OzCAMKiD4owk92xDGz/EglR6L8ghPEsgF0EoJl+7ZmZuRmltPH8RICmRQEAAQzAs6J4SVghMppfHtBzYQGWHwO8yBKe8tz24lxm/GyqrHgSA04ej1XAo1WZ8DoHGbXZadUP0JPwGCUYZYBmCOWUKhSXbVGSvGgi9pwi9aVI6+cx742JNOrFot3rFVs3qnems5GpjM2HkzuLK9szZzculCPnsqg9nst5mq+SZT+kkN9GmQ2aKo8FWi505z9vTen3VW2ykux0kBqiENtdVWwOonN0JTqdiSlSnBW6gie9iWej1acTtaeiNEeDNXo9Cc1+6uPJlkfcVFMJXJXagmd8lcYCla5n2ExF6jQYiRarCSfJcUdJ8gYIcsRJcVbqC49HqkbKckbKHOiwlWqzJYbpSmvJCptq6FtrGegqyxuqqpppaLjZmqQlpo/09hwqsqpKJtYkK5VFyRcEy5SEKpSEkooC5YuDFIr95Yv95UsDFMqDSCDRnhRiJOatxe+qxueiJuCqJuqsLOxAEnBW5PNUFwgxkUx0ks/yVikO1m1IsO7M9uwp8T1Z4teaatuW7jjUEHHpRNa5zvij+Y7p7sR4O0Kyk0KcnaS/AZ8rmcdBgddNhT/CXCLP2/BQnPOJAs+x+sCppshzzTHTh6MvHYm92B6zPy4dib3cEXelM/5KZ/y1jvjLncnTR5KHakKrIkwiLWW8dMRsVYRiAxX/eFNNXT7782PH7mr99/kEZD57Y7F9czFjayl7Z6F5d7F3c75hYzZh4zlla8ZxY7H6+9sQZD5xd7Vna/Xw5m+pe2uJyNLhzeWjyPKJP57nvesLHQshCTFjARr8eU07gP70TYIAoIcABwqWQgNjZqweHd6Kl9GGB+MuxPDweAl19sH2/KO91efby8+3ll5Ql17uLj2nzs6sv7q5/uLq74/Of741snr55MpU58JI0+tjRTMt6TcaYu/VRN0si7pemXC5PPpyUcB0pteVDIqmECcOAAhGwxDAQn9th/9lQYABhP5z/NcQwthfntwwHkLTwXgWiPYAxMAFMwkAZkGIVRg+KAyYeQGEpeWW4tLxR9Md+JfMD4xB/ypbBzA9O8wvC2gO/MrcMPEyyunTiqkDGtb9DwrCMAJOAo2IKk5YGbAKwRhGJgBsZQUDVIRdZHmtRDjUD9Ip0KFIDDhFepwaM732AQYdLno9TlZ1RgZVLM4Ey+jPxJsrwN+qxDdlKvrIW/JTtsZGh+vuYDQykY5MpO6MJ34fT0TGE3fv9iGLS8iz69vTFeuD0WuFGnOB8s8pUvfcZKctiUNO6tcKvD/2579qTe90IRRrcDVaiJzwkD4VqBUkwRYkwd5sK5kmw12uLTwaqnM2Wn0omDQepjoWqjrkr1xiK3co1PBEumuBoVSBIvsZH8WxENKlZMMbmeZHbKXL1AUySTzxBP4wUd54Gd48VZ5TfnKlprIxBM5DFpJZ2iKm0gLy4kLq8sp2uuaOFoZ2JsaWWrp2pjqhASFDJ4931AXWpyvXpJBKYwhFkXLlUaSycFJhkFxxMKE8hFQZplQdQa6JVAFJDnLBRoKeGrxOZG4nZX5nFWEXFWEXFUFnsoCHpmCQqXi8MyHTl1wSrncoxbYr36st36kz36UpyaI+zqQjx/F0nf9IfUBHplWqC5GiI+CpxuOpwemhzuWuKuChKuyvJ5ZoT8r3MaoJt+7ItB2t973UGX2xM/ZiV/SVo7FXjsZe7U641pN4/VjSjePJt06m3u5Nu9WbdrM/40Z/ztm2+IYEq0gbOXcdUXs1sbND0ciPjs3PI8ja8R/zkd9ns/fedG9+bFyfL0RWjiBLp7fmGn+8q9z8WLb9unD7aSwy27o9l4WsTiFrc7tzE3vzh3dXwqm/1VEXS9bn2r+9KXnWbp6kyI6GAMABDMD+BwhRALBBQBSD0qSnd2LDW8hymnHTOnAxGh7ADBeGIYszO7MzewtPqIvPkJWXe8svqHNPtj88+Pn69s+XN74/vfTl7sTKlf7lc53zw42vT5Q87ch+0JL8+FDS9Yro2/XJV8uiL5eEXSwIuJkXmGmjwwLAfj8h+ldEQu1ba/8HAjEQjIHgfwfhP5on9iGEaACKHkIzABoWQHsQZuSFmQQgFiH0QRGYVQDQsgGAYeKVFTIJR9Ow/PN5GKDwGID9BSEzD05cFUXPsx8nIRb+A4qWzARjiIkXADQEodB4JpidQCuiQiOmAjilAJ4TB4C+MEeopoSrHK+VCJv6QbwcDZCjRcvTokl0WDIDTokeJjPglWhwKmiUCZrOh/5griBXhwrvGX3RO3bicxHyX4p01hstqW2Om4ftvraafTnqsnnca2skC3lwAXkwiUyX7QyEfctQXImS/y1V+7G38gktseuJ7h9P5c2OFH3syhmgaByxJwz4qZxwJwz4EDPUBT34WLu9lUrUxYvVBft9yX1+ssc9ZaaiNKei1EeClGudiKUUg6HqqCMhxkUqXEfMhMdCSNPxmnfyrQb8VKp1hXKUORNluSLEeRPlmWW6NwAAIABJREFU+LNUePq8iK2OpEhp5mprQoCSoAz7ASV5GRNNXQ8LJy9XewdrCzMtHWMNFS8Xj4HunqFjhc05qjUppNI4Qlm8QmU8uTJGqTySWBlJqo1VrY1VPZSs0ZiiCTLc5KMsxAL1Rb11RNw1BNw0+T20uHwNeHxN+INthBK9JXPD5YvjFCuS1JvzTI9VO3fXuww0eg1UeR7NczicaXO82O1UhU97mm2KM9FLnd+ByOmsxOmmwuOtIeanIxpiIprupVEUYFYZYdGWYTXWRrkznHp/POfeRNbMRO6js3lPJouenSt5fr705XTl60vVby7XvLlS8epq7aurDQ/Gy46V+iW4KLvpiNuqi90eTtz40IH8NrX9OnnjtSeyeGb3Vfnnu77bH0ups0Vb75N/vo+izvUiqzd3l65tzA5uzdWtf0zf+VDxfa1zfa12Z+UWsnh0e6Vg66038nlw/engWJKuChMOAgBgcSjwq50VBeD9q6pxAPDCEAmL02NhceKmNZBgceRhduJlMzuA74lzQRbubM/ep8492ll4vLf8jLr8fGvh0fbi4+35Rz9e3fjj+eUvDyZXrw4sn+ucO3PobW/Zi87cJ21pM/VJtxsSbjUm3iqPvlEWc6Uy6nJB4OlYJyLTfjoUhgGEBih43wH7z5rSf4YQC/4LCAGEgWAcBOEBjAcoehjDCPBsgI4LxSQAMQpAjALYAyIYFj5AwwIBLD2XlJhZJArH/A8IIQDQtH8tSagDggwKhlhW4f0TMsTEy0q0OkCyRrGJABQWABjG0aHYpOiElfDiqih+ImAWxACcIjtjgIqwF0nAXoZbn5dJngEtT4+VxaMU6DAqzHRabAxqzPRqDLRatDgzHN6Pia1IjPcImWvMWPq2ney7ALnlFOLXcp2NJqvtTseN407bJz03Tvr/OB6yca5j8+bk+uWWzfE8ap3vu2TllRy9d7EGJwxkn5Qlfz7XtjxRv3CipJ+i02wl1k9RHqSoHneVKNAXNGdEHfEglmgIZRE5etzkh4KVen1IoyEqExHKoyHkQ/aS0aoiPSlefam2jbaEQ/rCAx6EyRiNq7km04mmLRYSRercafKcsVI8CXI8OWp8jSbi/b6qhbpC2abShsLsklyCeppqTlYWAS6+fl7u1lam+qpkAxUVVxvH9vq6K2NH2/LVqlLkS+Nkq5KValJUq+OVauKU6uPJNXHkmjhyS6Z2R5EhKA/STHVWiDCTohiIe+sI+psIxLtIFIaTqtM1mwp0jjeYDndaD3aY97YYDndaT5/yuXY+/tZk0rX++JHGgK5Cp54StxPF3nUxFnH2sl4ags6KAk6K3M5KPD6a4kGGkmFWYikeasVhlg3JTl3FjpPdwQ/P5764Vflmpu7j/UOzDxrnZ5oXZtoWZtrmH7YuzLQvzLTPP2j6cLfx/b3Dr641DTdHp3lpuGiJWqkIt6eRXw0Zj1Wrf5zwuttpuHDe648rDis3jalzCdSFlJ3Zxo2Fjs21Ez9Wa37OHdpdqNteqNpdGkFWTv74fXrjU8/Wp8t7Syf/WClFlvJ+fx32ots230Ichwa/7sFEg78ghAEKAIAHQAgGajhaXU5GR4mDVvzsXvxsptwMZnhcpYc+Mntle/b+zuLMzsJj6vLTndVn26vPNpef/P7x3vqbW99fXPnyYPLT9f7VC0eXx5s/9pe/6Mp+0Zp5rzr+YXvG7aaER9WJd6uTL1XFXy4Ju5Xt464gTAMAgDAYFBYNUBgIxv5nEP7ynvnvQkgHUPQoDAvEwINiEkAxCwF6PkDLg2bmxzJzAywTBLA0B0VFTSNgLNOvKLjftoii/wtCDIfYAVULWnbxX+o8Iw8r0eog2R7PK4OioQcAhrB4FKsYnl+eTlwFK6IMHRTDYhikmWjc5Lk8FQXsZbl0eRllaYEcPUaGBpahgYn0WFUmPAmPU6Gj0cRjDFAoX0bWChnhDnX+USvh++4yc1HEL/laPxvtd3vCkMEM6mQecj57+1LVzvlS5NFF6uzS72/uf5+ZQkZ7vh/J/pjj/Dre9ISp5NOK+K/nO75dODLbXTYabtpqJdJHIQ0HaR93FD7soezIzVhtLdpkTsgmcbbbS46Gq46G6p0N1xoLI/Z5yx7zIYSLHMw1lO9JMO4K1C1RFeh1Ip7yJ01nGtwtdOx0IlTqCeSQ+ZIJAomyPAXqfIcMZEYD1avNxHzlWeTY6JSllPU01VxsLAPdKRRfPxtrMz1VRTN1HSdz29LszDvTQ12lOrXppMokhdoMtbo09coEpepYxbo45fIoUnkcqTVft7fOGhREKOSGyCf5yIXaSwbZiSeHyB8qU+/t0R0+Yzo+YXN+yunaZd+b1wKnJlwnRp1uXA24fzfp6YOcOxczx7oijpZ5dua7HMm0rQjTjLOW9tHkd1Hid1Dkd1Ti8dIWCjQUCTORSHFWLAg0a83xGu8OvTAcfO1s1KNrWe8flr1/Uvv+Se3sk4bFF63zT5rmH9UvPW1ceFz38WHLh4cNb+7WvLpWfaYpOtld011XwklPMsha6UKrWWe0SJw2l7Ug3lYUl2zDUxHO/7TbZPuhN/IqbPN12sbHtD9mo7fnC5H57o3lAWR1Ym0pZ3u+c2d14sfX28jyBLLUiCy1rN2OPpsqq8WJAXgUCmBwAAA02Peu3t+L0gAgCAAJA7Q5aKzFWFzE2TwkORxF2a24GM0Z0cmG8huvz27M392de4jMPkQWnm4tPKKuvdhcerw5d3/z/f3vL69+fTTx2+3BT5dOzg63zp+qfXU0/9HhjIfNqTMtaY+a0x81p9+sir1VHXe1IupyDuWwuz4jAHSAAex31UIA98tL6R9JUhQE70uF6H8o+3+Z//55fPxzR4qCafbPhCgcM6DjQTHxoek5IPxBgGcD9LwwgwCg4Ub/P7bOKj6qcw3331prXOLJJBl3yUgmoxnJTNzd3QWS4BAXSCCBOEFChBjuHtwdireUQnFpSwstUKSyOReh3fuc38nd3OVi/vO98jzPCwBiS3X3yQIIHj05hkGwAMIAjAPA2H3pkd28XEy5BLp8ckyFYJxtPMNdvdNIHAMgOCEAhUKhgB0L7SrE8A1YtgnvLgckNzeybSrLNtXTPUPFDKbbqkmwJx5W4DECNBDjEBkOSLCImkC04PEWAKIwhEomdaWMucvKPxGluF3s/WOd5eOylI9jM/+eWPTxyMI/jnT/eXHjH3cufn729PPzZ3/fu/nHrRMfL+357czBp1u2P+ldti5Y9U1H+cuzm384ufnRmpY9M4PbreK+COnqJM8tBV57SvWlQrspas7ENF2b0b3TzNlWqJ8o0+zJUR4qMW0tVK1Nl3QG8mYr7ZcnSFenKuZrnPtChHsKTcdmWi8vTtgzy7o8mN1qZNbpGBVK14UaRq8/Z0ehvD1eq3ZxFbk5Gfi8cJ1/VERkZnJyflp6UkRkmNU33NcvIy5+cUPj5VOnB7rie+uUK2q9uip0HdWa3mrdsgrj4lny7iptT7V2datly4ow0DJNs3iGfkGpblaGrDxVuKhCu2kk+PDe8MMTsccOJh0/mHL2eM75kwWH96Xs2xpzeHfS+eOll07OPrVn5u7VxeOtqasb4lfOC28pMMyNk+ZbWSlaaqKGlmpgZJroGUZarg9nRrTnoqLI1c25BzaWntpfdHhv5vF9uVfPTLt7fcnDm10Pb/Q8vrHsyfXex1d6Hl/peXix8/tLHfcuLrlzruXm0ZatPVPmphgy/DxSA2W5Qcra3Ijvjs7Z0qgp9WL42jqIAJYLANce21IqfXEy8sPN/L8frvn8877f71b/fTvlw/2Kv1/s+/h8w9+vdv/xy3fvfln/6ceBD0+aP7/c8uFa16Z5BioAAAIYAAgACwH0/0JIhoEIg/JxwEfxnHI0nDwvRprYNUnklsx1jXUmlqiZL06vef/44qeHl/+8f+Xzs1t//3D70w/ffHx+4+Ojqx++v/z7d2fefn3k1cVdPx3f9GT34IMtXd+MNtwYqL3aV3W1r+rqiqrrfTWXls491z3rVPu0c4tK9sxJVbvZYQAageBJYy0Wmvx3/qss/Xdfj/7fm4H/PwhhCIPAuMmKFMHaARIdZcdA27rBJBdAcIFtaBgHDiDSEQBQdjQ3cyaAMF9CFmEMAGgI7wRIrgAABAY4lp7mV2zH0YJJUQHGiSgLcvVOI/PNgOQCATQMoyAHDuwqwPANGI4B4yYBdgxHAjmRZZehpuZ58xM9qD4uJK0tzouM9cChhBhIjgcSLCLHYAxYjBWFicaRZrm7dvIo41q3XVbq5UzR19MVTxb4fOpP+7xl2u97K/48PPD5yr7Pd7/6fO/mH9eOvzux7t2Bnje7ml9v6v9leOBxY90mX+n1Bfm/n9v66uTGR2NNByrjugMFzXqXdj/qUDxne5GqwYcTS7fbXabvCxF2WzibcrUbMgXDkfS9edpdU/UTpYbRFM2iAF53tHBNtrbF6LYsgLsj13CwzHhufuSx2pB1Kcp2C7tWS69V01r17OUBgm158qYwmZhMkjLdLB6SaGNQcnxcRnxCelx8anRMtH9guMU3LSa2ubrm/LHjg13p3dWKvnp1T5V3W6Wqp8art1rfXasbXRK0vjtsdatleLEVNBbKa/NlFRmy4mhuTih9Xr5H7wLDYLdhdKllfJnv2NKA8d6g8Z7AwSU+y5t0Kxd6D3X4jfeEruuJ2didsqE9Y7w5ZeXc6NYi38pERUkQN9NAy7GwpoSIc63sBC9KsopeGipfVBLT15ixazzvzNH8U0fSD+yJOXEw7taFirvXGu9eabx7qfH7S03fX1hw/9z8e2ca7pypv32m7taJ2kt7q9YvyZmdpM8KkmeGKnOCVWkRisV1/t8dS9paJy5W0XW2tgxAAhCKCAMvd7irXP7zhdLP38//69vKX68lfn428tdPt/7zrO2vZ7v//OnKp6c9n34888fbb97da366KacynIMDAAAUjIAvDeE/X20IAEcIyPFIoAspXuSaq2YWqBlpHpQEgUsChxLhgE2gEW9v7Prj+ZUPjy5/enDljyc3//7h9qfnX//14tafT2+8f/DVu7tnfr997PWl3T+f3PJk9+C9zR131jffGqq/3l9zta/q8vKKq33Vl5dXnO+ZfaZzxrnW4pMtU4qNnigAUDAyaZ9CJlPY/se8BwMIgQEC/xP9BP6ZxEDI/4xVvkAII7jJnhBgbQGJhtixUHY0mOQCcA4I2Q3nxIPJTAgAnAPN1Zg6qduGAIARHEBwKBt3DEUIEAwMIBLPRPcvcRCaJrfzENYR7xFANaW7eIYCBxYM4SEIgRw4kKsAxzMQBD54hgLjJrK1cYzjOCXJndO9GMkyui+FqLXBSLGQBAvxUcADA0RY2AON0mJQJhQ6FGdT7kpt5zPWavkHfXjnIgVX89WP5pje1lnftcW9GZv5/tSGD19NvLly/OeLR38+uevVwTW/7Fz+Yl3r45XV37fX3Jo3dWe09lBZ5I/7Bn49MvZ9X9XRuszxdNVQtMfmTO3mbPmOAtXSOIUfGb2hQDcap1ysp65JVe4p1e7OVe4vNhye5bs2RTKUqOiMkCwO4WzONy4N4rUZ3dckKPYUKI/OtV5sit5f6rs0SNDkzWr25nSYhMt9+etTRQtCPcR2JE8hy9dLFmH0jQ4LigsLiQ4MSAgLjfT1DTIYEsPD6mbPOn344HjvzCWzFcsq5V0V3m2Vqr4m9aomfV+LZcuKyPU9Icvr9SsavMGiqfrZyaLcQEai3j1aTUkxM4uiROVJkqocSV2BvD7PsyLdY0YCryyGVRbDmhbHmp3CrsjgLyj2GqgL39aVs7U9d6gmsas8pCFDPT1SVBTAnhHlUZWimRoqile6RktcC4MkC4ujOysSBzsjJ3YknTqWcWBP1O7tAWePpl89V3jldOHlo4VXjhZ/dajw6qHC60eKLx8subC/6Mzu4sPrSwbq42bEa7KC5JkhqrxIU1qIZ2qYbPn8qCtb4kdmiOIFjlQAcCgAAWCLRgQEUB/t9mxv6OdHZf950v750ejvjze9fdjz4cWe//zy5POP4/95Mf7zi62vrk07tcDT6ELGYKEvtjrov2m7CAyIEKCjIb09IYrlmKWgl5uFxd6cVCkljucUy6aEOxODSOBw0/S/X1x7//DCpydXPjy++sezW3+9+ObzD9/+9ezmh8dX33539u3tE79+NfH69M5ne4fvbWx/uHnxd6NNXw/W3xiovdpX/dWKysvLKy4snXO+a9ap1qLjrcWr0iPIqC8+PQyE/nL64f9qCwEaApPJof9UpP9aJf5RukzqRSEsghAhFBmgbQHWHhCpkA0DtqMDIgWgyADniLVjAhIdghCCE8NVF/+PjRCGUHgEQ0Rs6ViWGmDtAAD2Qh+a/1QnmT9AoWEIQFhHnMjCsGQxDYmImxCCiBCEoF1ECNMDzdLgRWYMS4Fyk2BtnIKZzpkqaq6Ona8XhrMdra42SgIixSNiHKIgwB4EtJyI1RLRejTKgiJkOrjMo7ou4LL7ZaIBMWNA7jbs5Xg0RvastfjNzuVvL+z4/cbhX2+e+uX6qVdfHX19ZuKnw1vvbxt7sn3JvTVtDwcXX19Yfqw29/Zw6+N1nd+0TTvdUjqe7Tkc67G32LqrQLs2Wbw0VhjiSG6PEPUGcxfrqevTdYdnW8/OCzw+PWBnsXZDmnRturovQbkogD2erumPkizUOg9FyXbnKg+U6a8siDo+L3gwRtpqZrV4c9qNgmVWwViCoDtR5c2meMn5fjplpNknwKwLs1qCTMZQszlAr/fVaGICAiqnlZ84MLFjuKO7xtRXr1xabWqvUg93eK/rDdiyOnHXYMzIEktvrbanWgcasvWlkR4p3vQ4L2qCmp6oYSR7szN8eCXBvBlRHrOiFaUhonwrq9CPUx4umh0rnxElLg3lzowRtk21bGjJ2NKWM1Qbv3x2ZNtUS02qakaUqDZNvajAZ06sMllDCxO45PjyFhREtM6Mba3y6eu2bFoTsWE0eGSVz44NQQd2Ru/fFj2xKWrvhohd4yF7xkMPbIjYtyZq52jYtqHI9UtjO2YElEUrMwKkaYGeWUGS3GBtQZR/YWzQ0nlR2xf7VUYwPdHAHtg4A8DCAxmR5IXGTQ+gfLsv/M8HyR+fV396vPrPnw7//fLMuyf7f/m25o8HU/98eeHJmYbl2Uo7QAAIjAAAARgBAA2wkzSiIeAIASEOsbraJAop+WpWqZGfq6IlihzD6TYhFLtAR5IFA/ozIv9+cvnt3VO/P7z0/tGVP57dmCTwz6c3/nhy8+3359/dOf3rtUO/Xz74y5H199e1fTNQdX984Z2RBV+vbri5uuHKquorK6u+WlF5vmvW6fbSw825B2dnC50wKABQXyJgUND/QIj6n6h8NJgMMfz/QAggBAAUBGMhFBFC2wCMHcA5AiIV2DKBHQuQXAGMBygS2pYKSDQAoQlODCeviH8sxSiAIkAoPN5FaCcPgRzZAMCOIjM9oNRJHgwgFIAAQNujuHqqKZ1jycSwlACQAICBHQcwRMBZDLM1CF0KuYgxTnQr3S1d6VZsFpZaZXFCShjLSe+Al+MRMQZWklBCDCTGwBoCyguF8oKwVjQxAoYsaCQUjYmFQLk7aXdh7Ie9a/9z89T7u+fff33247eXfv/24vvbZ95fO/D23LafDo893NX/7c5l3+3o/37Tyht9zec6Kk4unnuxfe611um3+hp3TvNfFS3ZmmecKDFvSJb0J4mTGPbVPpw1GdoWrVuHL3tbsepQuWmi0Lx3im5HnnpjjmZFnMfiQE5ftHw8WdVpYQzHeO3IUuzJ8zxb5X+2IXxznneXP7dFx+j04S8PEK+JF/Rn6Cx8V4WI46v1ivQx+hs0AXp9oLe3r0plUSr91OooP7+q6dOO7993eOuG5Y2h3VWyzip973zdlv6A7UPh20bj13RZBxcZemu1nRVqkGlkpes5KRpmujejwJ9TEsKZEsotjxTOjZdXp2iqktUzImXlocJZUdLaFHVTjqEiTjM93KMshFeXpu6viB5rSByojBqsih6qje4o869P1yzMM3WWBtam6TIMzFCBQ7YPszYrqHlqdEO5sWGuZ0eTsXuRT8d8Tc8ibV+Hub/L0t9l6Ws3rGzTDXYbRpabRnuNqzp0K5cYlzX6zi/yLo3yzA6UpwcrikI9CmNURbHWuWmB9bn+K+uDdi0LX1lsCfXAemCAJwbr7UjQOGP0Tk5xIrutTYrn3zZ+frnhj5fr3j0Y+fx82V9Ptv5+Z+Hb70cf7S3L1NDwCBZAaBRAwKQ0eVL2BQEMBCgASLFQgLtNgtglW+leqGEmSxyjObbBzgQzCWsgYzUImK4Sf7h99OP9M2/un/nw+Ks/n137z9Obnx5f+/P5zb8e3/z46Oq7+xd+/fr4p1snP5ze+WB40cmazG9W1X4/1nxrqP7WcOPN1Q3XB+uurao51znzZFv50fl5p+pzw0XOGABgCIMA8OV4LoAmm0A09IVAPIBwAKC/vNzwpGf3/4EQQBgIRQZYe4B1mGwCIXs27MiHbGkARQIwFiG6ABs6gDB4e5q9h98/xS0awAQA0IgD38YrDsNSAgjlLDRyImZRNNEAhQMQgHAOKK7OWRfP9ssli30Ayg5AaNieh+bKIBcPNFuL4XgCZwlE4WhdXRM9HKdYxOX+sliBczDd1uRC9CQiIjSkIMB8FBDCQIWDFBiUAMaIAUoOgAgBngAU8mlfLan4fO3oh68vvX1w69WDy7/ev/Hr/Ruv71x+c/PEm/M7Xh0efbl31dOdK57vHH62Y/WTTau+Heq4uaL5Ykf1tRWNX6+af6Ov+XBt6iIro8lAGY2X7i82HJgROENFiXfH7psZ1hcobDexJ6abt+TIlwXS+qNoW9LlI0nCjhDm4gBuRwBvJFHeYaG2GVmbU+Q7M+XHphsuNIcfqghaFSlerKd2WHkrQyQbEsVjWbpgkYuMx/TXq8PNhhCr2cfLy1el0kskRpksQKuNCQiomz3r1KEDZw8fGVic2jpL2FWjHmr32bYqaKTDp3O+V1+Tur9Z31Xl2VurB5ESl1i5e4qakWdhz4jm1WXKFxXp2qf4ds8IXTorvLMsqDnPVJ+hrU33qstQzs9R1aV5VScr5sSKq5Lk7VN8e2cELZ3hv7o2emtH1tj8pI6pAZ0lAX1zYhbmW/OsvHCxXYaRVp0W2FQcXVNinlssqZkhb5qrXjBXWTtN0ThLuaBStbBG3Vzj2das6ltq6l9mWtmh71yk6lygXVzhXZOjKY3yzAtRZIcq80MNJXGBUxK8K1ItCwp8ltb6Dy+O3L86bHOnz7xoTy0R5UclWahEH3dCCJ0cz3ZtyvT8Zm/Yh8eb/359/v3D7e+ejbz+vurHU0kH62Q0LIBhgJoUW0IAoGCATH4EeAgwIaAnYyI4Dqme7rka2kx/aZqnezTbPsyR5GtH0tsSFTAIIqLv7u7//PjC2/un3j++8OnJ5T8fX/nj6dU/n1//+9HNj4+uvntw8be7Z//89sz7E9u/X1l/oCT8eGPB3ZEF1/trrg/W3RyZf2Oo/mpf9dmOGccWTz/RWHC8MXOuVY4DAMBoBAAYhr+8hP8QiAEADyA8gAgQjPsHwi/zmv8HQoAGKDKEcwAEF4hIQdvQEQc+7CRCOTAhDAnAaIjgCGwZAEXA2LqS+MYv7yqMA2gygDAoZ7GTJddFEwYglC1bw4uaR9HGATQOwAiK6Izj62w8I5jWbEevYBjnAsEYyI6L4khxbjIUW0UUatDuCpgu0lAZ2V7UGf7SuSGqNAUtlGnrT7XX2uMVJJzKBuNJxitxKB0BpcRj6QiGAqGYCBAgIIgMX+2o+Hxtz4fbx9/eufz7txf//v78T7eO/Hr7xLubx99e2P1q/8jzDV3P1nc/3rD02frup+s6nqxtfzTefre/+d7Awgdru+5t6r0z0n63f9H2suhmP06Dxm4ojLGn0NSf6GEhgMEU5UCIpFXP3pCnnJhm3Fds3T/V+3Cpz9Z8r5Vxou5waZsfZyBGvCyI06RyXxcnm8hRHS7TnWoKOtUctTlH3+vPajHRlgYL1ycKtpf4ZHsLdEJhuNkU7esTGejnq1IZpFKdUGSSygJ1uoSQkMZ5cy+cOHbi0LGx5VM6q5UDrcbxHvPaTp/BRcbu+Z7Di80DCw09NZ6Di8wgXGgbLrRPVLqVBPKrkuQthfqeaSG906MHahJG56ePzk8frE1aWRHTPT1oyRSfJVN8lpRq2kv1zXnqunR5U452Ub53W5FhsCJ834rCnd2FK+dELSuPGK9L7SoNLQrkRUntUjRutekhLaWJNYWm8izu3GJR/Qxl0xxV5VRZZbmidqaifp68vlLS0aYdGfZfPWJZ1mnoWKRZMl/bPMd7boZqSrgiL0SRHabIiNHnR2pmJZuqclUtZZqhhtDNqyJHh40n9oSPLTIHU4Gfg43FzcaPSYoRuGR5uCYKKQUa6mhd6h8/bfv7+Yo/f9z84eX1F/tq2iLYEIwBEBoDJg/cYmAIwJMRowCQEUiIRiwOpFiJW7qWlqel52vZsSKHSIZNhIONrw3Zi4SXoYAOgN0t0z4/Pvf+/snfH53/9PDinw8v/f3i2odnX/3n0c33D756/f25t/cvfPr23OuDG77vqT5WGL5xSuSdwYZrq6qvrKq+Mdx4baD2qxWV5zpnHl8y6/T8omPNGSuTAogAAhAKgf87jPkXwi8EAoiMoAgQ/K/TCoKQLyOl/0KIBSgyhHWEiBRAckWRaZADDzgJYQcmjCUCgAJYG2DLgDAkFNkFy9J+6TDRRITghMKSsG4yZvgMYXAOQHBEmpwbOddVlwCwZADDGDIFx9dgRAFupgwXbSSK4AoACuskRNgeBDc5cPXAsBQIRQGoQjWVmSxxLNCxyq3iDCUjiEbycSF4kdFeZKyCAKvIBE8soscjKjKBgqDxANijAB1As/SSX3ef0VIhAAAgAElEQVQufXttx9Pvjv1y7/ybqwfendvx9ujgrwf6f9zW/cN487NVFY+XTXuwfMad5TO+Hqp+tH7+neGqO6tr7w00PB5Z9GBtx/N9I083r3w0uvzJeOvltum7pgRtS1dsTPTcnKeIodkvCWIOhEjme1LHMjwuzo86NiN0R55yV656bbqkN5qzJFDQYmb1RQrGE5UdZsFgCG9/rvbAFPWhGp9zi2OOzQ1Zl6Rstbq3WhhDodS9pT6zgtVGoSjCZI71t4YF+oWZTEYPqdFDavVUBun1yeHh8yvmXTl7+uL5r3aurVveZBzuNI11Gwaa9f0LDCsXqQcXGXvrvJY3qFe3mkG0Bz1BSc3zZZVFcKvSpDUZnvVZ+upUfWueuXtq4EBF4kh9+nBD6mBt4sp54X2VoWMNqaP1Cf2V4YuLDfOztIuLfLrL/ZfPDtzeWb6zJ2/5XL+eaUGrq5P6KqLmxssTVe4pBtfKNJ/F5YlVuZayNMm8Eo/62arGefrKEllFsbRxhrp5rmfnAs/RFeYNQ/7rB/2Geg197fqeRn3jFFVZjEdhsKwwWJHr75ET7jklRjk3Xb9oql9/Y/CGHt8dQ5Y946F7hmJrc6VBPGIw29WPZh8tcY8Qu4QIXaJ59uFMpzSl45oFxofHpn1+seXj1YF9naE+THe7L187FEBQAIbBP3MZAGBngNKRMGEsQq6aXm4R5fvwis3CJLFTNMM2xIXoQ8Z5oWEZGuFBYH6A1x9PTr+7febjvbMfHx37dO/ipyff/vH8yoenN/98+NX7u+c/PLzy+tqh59t7vm6ecqIwZldRxJW+eReH517vr/l2xaJvhhq/Gph3safuzOLpJxcUn6gvGC8Ot0MjKDBZaAIAAwChsYCAAwCHABsA7AGMQQABADwE/q9tIYRMZsP9u6+HITyCtkcI7oBEQ2zpkA0D2HOBPRdg7SAAIBQeduQiZApCcia48tEQQAMAcE6A6Ia4ehB4RkHYNFZcBdpJTLRz5IRMd9LFA4IrADBiS8fxNXiJ2U2f6G4tgGgKDADAjY1yk9q4ewFXJUagBGwJ7CqTU9mpAudcNb3Qys81cRIlbmEMZ70tXmmLkWGBioRWE7Getjg5GmJ/+flAaSHsSIrfz4c7f7u4+e3Z3a+OD/+yZdGPQ3Xft+d+XRV3eVrIhTnh1xck327O+KY29d6C7AdtxfeXTf+2b9bXK2fdXVX1cKjpwdqO+ztW3N+28snmZS/Wdb8YbTlZlbIuXbUj23Mi13OqhFHsSdtT6rPYQF3uL5so1m4qlI9GssdieZtS5euSlG0WZouV1+rLH0tSD4Rye62cLcnyoyWaE/PMlzoSLnem7y7zGQylL7XQu630nQWe85PUJpEwTKsLt/rEW01hJqNeIvb2kBhl0mCjMS0qqn3B/CunT505f+LolrG+hfrRXuNgp7a/2djXqF25SL+yWd9Zo1jRpBtcbAY5Rta0YElDiq6t0LqsPKijyLwwS1ebKJ8bL6hIkNSkqhoy9c155pZ8S1uhdcWM0I3NydvbUtc3Ra+YZW0r8u4psw7XhA9WBg3VJI41xnSWG1oLjStnR/dXxVQle6Voqcl6tzkJxuYpUbUFPpXFioU1qvaFusVNuqY5ytpyafNc9ZIabXeTeqjHOLLcNLrCPLbKZ6jHuHSBpr5EOiWKmxvAyw8SFQQLC8IUs1I0tdma5RX+axYH7O4P29gZXJMjTtc5R3DJfi7EVAkrReycKCDEsbBpAvsQN2aC2DWEgQtj2k4PpO9oM+9ut1SEsTgQsAUACyZT3VEIhMLACBoANDwJIdrqbJMkdSn1Ec4KkBVaBcVmYZrMPYHvHEl18HMkq7AoDzSKDUAsg/zjma3v7579cPfs7/eOfrh//q9H37x7+tWH5zc+3Dv39tbJD7fP/3Z+z5N1iy9WpU9kB+8sCLk1UH95xazLS0q+6a64s2z27c7SszUFR2tydjcUH6woWJ3lH+5OjHInC4jAFgASAAAANAqPBgAFARKAHQEKC75AiPkXwskopy9Cn/9mHCJoe4REBbZMQKYDEg3Yc2FHPkx0ggAMEBxkz4JsKIDgiHJif1HDYB0ByRXnLreT+DL8ivjJtY5cAwpPYgeXMfxzEFs6gBC0PZMkNuKlFldNvLu1AGGqUQAAVyaGrrBjaxCmBsNTwAwxcPHgOLonsh2LvHkFFl6ahhrDdwqmOmjIaA880NhidHZ4FQEjI6HlaIjzZbmCkqFwvbHe347PfLmv/dX6xc+Xld2riTlTaB4O4DexiNNIUB4WLrfD93nxjmVYrswK/b6t6MHyafeH5z0cqX46XP9o9fwH4y0Pt/e8mBj5Yefgo/H2R6ubzjZmbcjWbkiT7s72rDawY50JO6YYlwXyFus4W7Pl+2f5Hi0zrU/1WJcoGYoSdvpzm83sBUbmSKKmP5zXbmGvS5DvyJIfmKa7sCTh2rKcs80Je6Ya1yV7jsVLD5RpW9MNPmJBsMrLqlX7KjyMMqlRJvXXqAN12nCLJTUycnnbkuvnzp48dfTSwV2jXcHDPfrhpdr+Zu+VDZoVzfruWk1ntaq3Qd/boAcNaZ5thT59syLXNqTvWFK0eWHOusbU0erYFfMiu6YHNeWbKpKVs2JkM0JFcyLEC9P0q+YGbm6J39waN1wTvLTcOjAvbEtL2khtWPsUS/c0n+Zsr4pYSV2qZlG+eXqkKFnjlqKllkeq5+cHN5Zal9R5r1kdsnlz+MiYb2+rvnGOZFGVpq3Wu61O3dOs6W3R9HeaBrp1A13ey5o088tkM5L4xeHckgh+abRoZoK6Ml3VOlU/1GDZ2x8+MRhZHskwuxEDKQSrI1mBQcmxQEUG3k6w0RHr40j2c8OGMImhLJtQpm0U1yHZwyFN4hhDJ2nscDwsRIGBLQBEAJEBQgIwAUAECAAAKChcENUpVUop0LFKDNwsb2aujp3i4RrDcgh0JhrIOCkK5iMwAwAhBI501v7n6aU3t0++/+7k7w/P/Pnw6tunVz88u/ruzuk3149/vHHm3Yltj/prT8+I2pftf7ggYntJ0qYU//1J3pfKIq6Whp9PNW71k+/WMVcpeRvUwhEBdZ9KfMaqu+SrW8pgBtkSyJOKOgTCIgAHYDuAkAEgAUCEABaCvhShEDTJIQr8b1GKg9D2sA0DOHK+QGjHQjkLUTauEIQAGA1Irmh7OkR0RjlxIQhBAAB4Z5SNO4Eqc1OF0X0L5TkLmepogMIyfQtYwUVoBw4AMMqOQZb64KUWF1Us3beQIDAhEAbYuSN0OYHphWJpgLsYduUDJ7GLPSWKYZer5eaZOVlaegzfKYRm7+tm7+1EVNugNXY4JQ7lQUAUGJj3JeIfJYAxCxTMs+X+P/QUPVqcf3V2xGYLdwGV0MRj9RuMK83mVk9Fm1SyzIO/3s/z/LT4b7pmvtjQ8tOe7vsbFn071HB/rPXl/qH3F7e/OrHplwPjD8c7v11Re6Yxe1uRz2iCaCya2xXOCyegBpIlvSHsBUrGtlzVwXnBJ+b47C7Sb81SDUYJl4dJFvny6r1pfdHylRH8hUbGSJx8Y4rHriL1sfqQ8+1JV5ZmXViSfHCaeU+x8cgMfUuqTs+iWaQik0pukom8PSQmucyi9AzUaWODAnITE8dX9R3ft/fY0YM3Tx/ZuDJ5qNtruFs1sNB7YKFhaaO6u1bXU6fvqdN31+rAkmLzirkRI42pWzpLJgbm7RusOjzWcGLjwku7V53c1LlvqH7NkuLuWRF16Zo5seLqeMnCfNVAdfCmxQnrF8UPVEWMNyZtbcsaqolsKdQtzFHXJimn+nMKrIypQbwsIzXBi5KqoZaFKWuz/GqKdN3NhoMTKecv5e0/Gje6Iqh+lqSqVFpX7lVb5jl/lnLBbM+OWt3Shdr+JeblTcbmaV4VmdLp8R5lMaLSGP7sROXcFHlrmWFZpW5jt8+6dl9/DpChbSQ2MAePcoYQewA7odDOEEyF0UwU0YuIUpNxFjc7PzoxjOsUyqBEMlwjGU4WCtHgTFLYYAU4DBOC3ABwAbATGnaEAARBzmhMGNM1U+FaYOBMMQmLfPjpnvQkkWsUy97fiWSwxYsxKBYMu0EQFYDKEMN/7p/59faJD3fP/v79qfcPL3x4evPDvXPvvj7x7utTH66f/vXAmnsdZSdLgg5mB6zy8ZjqYNdLdztvFj3O9XuRHXgnQL7Hk72RzxpicpfzaNOxNnlYmzAC4YjWa0zObmKzeAgAMECjJi+HImQIsQeADEEkGPq3Iv0XQuRfqQGEAAgD0PaQDQN2FiCOXNiWCWyZiJMAtnEHAAUACuAd0I4sQKQgTjwIQlAAAJwDwDkijhx7WaCrIdMjcwHbJwsgOKYpgx02FecqAgCg7BhkuS9eanH2jGT4FdnKAiEUESY4oxleaKYcxVbBbmKMiwByFDs40yLZLolS9xw9szzQI0vDjhG4hrIpOnuM2gatdyRqSDiFDVpNxEqwaBgBMITBARBGRDVJqevDjF3ekiJ3ZI6H65XVS369dPLjjTO/Xdn/w6Wtry9veX187PnEwPNjI2+Obvxwbueb8zt+PLb+1Yktny4f+HDl8KtL+1+d3vZiYvTR+p7rPfOO1KTvKgsZTZKPxIoGE3jpFFJLIHc8TdGspq9OUO6daT0ww3vPVOPeEsNoknxllKwlQFhrZLb4sXvDhLVelE4Luy+ItTZBODHdfGZR7JWe9Cs96RcWhJ2sDD45z9SSqjNy6FYp36CU6CQ8tYBvlEktSs9gb31MoH9hWsq2NeM71687fvjQzbPHNw2VrO5Rjfeq13T5bFwR2rfI1Nug76pRt1cql9brwLJpYcNViWub07f1FO8ZmrN/TcOp3Uu/Obfp+0tHvj23+8apdRf3L923Zs7a7tT++SFLK83ts3Td87yHmgOGmoJ6Knx65vmuqAlYWmmuz/IoC2UX+/GzDcwMnXuWNyNV656ipWYZmTOiVDVZ1rk5qtYazcTulAsXivcfTFzVHjQ9l5cbyyiM55emeszMls3IEM/NlS+crWqvNiyapanIkcxIlJTHSqZGCYsieaXRwukJ4tnpsvoSRcc8z7755gSdMwtAWPBleIgDwA4AZwAEKFiGRosxMAsAEUKQE7FGd7wPDQlkkkJYTkF0YgTfKZTjaKGQNSSMHI8IsDAVBegIDEPABobDmK7ZSvciE6/YwM/3Zmer2ake1CiWo8WBpLHB89CIGwQ5QpAjBOkc8E8Prf/06MK722c+3Dnx5snZTw+ufbx54u3No+9un3lz/ehPO1fcaco5k+d/IMm3RkjPhTEbGex73qLHUernUbrH/p6HVdx1TO4ammA5zanM0U0JsA4wepjLH+a7r6KxvCYlMpO37CEUCcGQAbCDYRsYJsD/bQthGJ6M0/6/IETZApI77MxDUUQoezawoUNOfNiODmA0ADBAEdDOHMiWhrgIAYRGIBjgHQHaFpDcbSR+Lvp0cXojN6gMYMnuqlhGWDmWIkRggLZnkz0D8FKrozycYc138AoHKDsE64Dl6GCaGMWSYxmeaGc+sOWSnBkBDOdIgXO60q3MT5zuRQtn24dzKVZXG70D3uBM1pKxMhKixiNiDGpySwnBKBsAnDCIMwAcANrTI94eWfuf5yc/fH/6zVcH317c/+bqoZ8vT/x6dsfr4+ueTvQ/n1j7/NCGH49v+fnsztcX9v1ydu+LU7ufnNz5w8ntT/eOPtmy8kLH7H0VKbtnRo8kqzekadenScv49qUS1/0zA3v8uG1W8d4Z3ofn+m4pUG/IUgzECLqDeQssnFojs8FM709SNenobQbmYIhgbYx4V67XicrAE/Wh5xbGXmmNOFkZfHi6rj5Gbhaw/JVCb0+hF5eh4nPMCmmgThtltUQH+JVkpm9fOz7U23Nw146bF87t27RgqFs9uNhj2QLP0W6//iXmgVbTiiZdb6N6uN0KVk0LH5wbMT4/fktnxp7+Kcc31p3b0/7t2bHbl3fcurj+xsWB6+c7zh+rPrp36sGt2bvGEsaWBqxo0Q60ew93m/taDT3z1csWqoe7zYvKFDn+bilaaoaekWNk5JrYOSZOjpmZa6HNilHXZPrOSlNXlXj2dQaPDkR3tfnOKfZKDafFWd0T/ZnpwZycMHZOGDs/kleWLJqZLi5P4hWE0nIDGflBvPwgXk4QOz+YWRTJywtllyWK5+WK2ucZiiNFHAjQIBwTjeGT0FI7lNoZ8acR43iUGIajhQ55kVFSPFaIBjIi8LLD+rjZ+TFJ4Ry7SJ5DjNA5gm0fSCGY7NCeBIiLBlwIhiFAgEEI3SndwzlHy8jwoqXLKXk6XpLINcjdVktESbAIDQBHCLKFIBwArgBsrC///Pzim29OvL996s2jM79/c/rDjePvbh5/d+f0b1f3/bip7V59xrnsoDV+mjQSYbaNwzFPyc8R6h9TzI9jdI8jdfs13DEubRWPvprhWOZEkEOACoN2J5cRd2qnG9sDAAQALIDQAIJhFA5GEQCwhyA7GCZC/67sAQRBEIyC/gdCGMIChAQILpA9C3IRI44cQKQCBy7swAQIDgAAIDTKhYd25mGocgBhUDACCE4ARYaIFDtpgLMuTZhaL0lsROxcKbJAQUIlgSqDIQDbMkmKQKzU4igLoVvynHVxgOgGo21wXD1w5kAUHpbtBTtyAZmNd2QG8ajZenGpr7gi3GuKryhRQYsWUiM4Lr5UBx83e70tXkZCNASUHDd5+AMNsBiAwDAE6ACsmJb3+dapv68ee3nvzKtvDr67cujN2UO/fXXit+unX58/8OuJ7b8e3/Tq8Nqf9o8+27v6+f6Rl0fX/3Ri88uT2348tePFyR0vj2/9ce/I6SWzds5L2TsvsS9W2e7L3pSmWejDinbEby4yD8ZKGjWcdZmiPWWm9dmKwTjuUJyoP0bWFiSuM7Gq9O5LYzyXBop7/fgb4rWbk5RbUz0mitV7SrSHZvodrzTvLTXtKlJPD+AZBEyrnKeT8TRsllbEN8okfmplpMUnJtB/dknR5tHh9gWNO9evvXHh4uFdq/oWqwdb5MsXqIY6LCPdfn0L9SubdSubdcPtFtA9z7iyzm9dZ9zGnsSNvcl7Rwt2rc4/uL7s5IF5Z47MPX1s2pkTRcePZO3dEbd9U9T2DVGb1oZtGA/ctC5w59aInVuitqwP3bYpdO/OyFUtxpJYZqqJkWtlF/gxC6ysKYH8Yn9mSQh7dpyqMs1aFqvOj+RNSRUVp0oyorkxVlqEiRptYsT6sOJ8qElWanogKydEkBPCyQllZQW5Z/q6pfvQMizMdF9Ghh89359eGMIqCGEVRvCKo9nzMjxKwgS+LNsgd/sgd3IY0yZe7BjNs4/m2afK6TkaXoG3KE7oZHXHmlzIRidblQ1aYwcMzmirG8HqhouRUFJktBiWQ6gb2deZZHAiCiclywgIojqkixxzvVm5OnaehpXpxY7iOlqd8CoCSoxFu0GQLQThAYQA2AaAbIPk01e7fv/m5G/fnX/33al314++u33m7e2Tb2+feH1q09O+yq+nRe6LMVSw3DJgYoeb21dm/pssw2/FYc/SzA9jNIdV7DUM5nIGa5TBK7UjSyEcFYBaJ3onW1BGoVEAAABGAQiBAQQhGACTIGAHgB0MkWAI8z8QAvifcAwAQxCCgrEwTAJoe4jsBlOkiCMHEF2BHRt2YEMYwheRrC0T5y4isDQAwkIQAnCOAMZDeCdnVSTVlClIbvDM6Sa5c+04Bn5iDZGuRAAAZDpREYiVWhykwVSfLFdTEsqJB2PJBI4BdmACBwaep4NchMBBgLVjmpmUJE9urpo5xcwr8uGneDEj+C4hDAeru63Rhay3xcvJKDUeUeBxKOTLzhMPIAcAChTsZ/v639/a/+H80bfXr766fuLVxYO/nN/3+trh19cOvTq/95eTO58f3/zLgdFX+0d+2rf6+cTQD4fW/HJ625sLE28uTLy8eODNhYlfj2+6OdS0pyZrT0XKYKqpRunUbeF0BAnCHfAd4eI1qYoGHWMohre3zPfgLL+N2Z5jieLeUF6rv6BCQ52rdm0PlS4PFbcYqStDxGvipJtTxRNFyt35XttyvHbky7Zka3YUG4r9hAYPnsmDrRIw1DSaksvSS4RWL0WEjzEhNLhhzqx1g/1LGuv3blr31YWLR/Zu6pmvWr1QNdxuWdnm3bNA2duoXjZfs2y+ZkWTDvQv9103HL1/e8HG4ZSVSwKGuoJWLTauWe63f0fkiYNxRw9GHD4YOjERuGG9cf24ZdfW6GNHC86fm3rkSPr+/UkHD6YcPpx28lTmiVMpG4eCq4sVZXGK2YnKiiRZRbxiQZZhfpa6PltVk2msSvefEqmJN9FDNU4BSker3MXX0ylYS4vQM6OM9DgfaoofNTuUlxsqzAkRZAQwMgOouYGM3ABOth8nO5CTH8orDxVPCWZPDWOXRQuLwzhTI7klwaJwgUuo0CZa5hQtdokTuUfxXBM96Cle1FQ1JVfuliWjxfNdorkuIUyywQnS2+EsTlSru62ZQggXuETznCJoNgkct3Cai8EWr8TiMWgIBYDZmZjIIWfrGNkaZrYnLUvFCWPaGmwQDxRgw8ARABIAWAiCETQOwAI8eLCl64/vzry6f+X9zeMfbx19/d2513dO/nb94Mu9Q9/Nzz+b7D2kF4QCMI/gtpnHfh6j+FRqflUc/CLD/DBCfk7B3shhDLFoy92oNc6OMkCmA7DQwa2T6WTF4bEAANSXq50QhOABQoKAPQD2EESGICz8z0GIL3+TilMYghA0gkNBBAixhfBOsKsM7cwDBAqwoQN7JoQhTe4hgQ2dRJfZCI0ARUAQNIR3AjAeITjZyoLdjRnMmEppzlIHlpjgruQm1NpzdQgAkA2D5BmCk1kdpMFupgyKKRnrKgEoApapQ9szYTs6XqAHFAFw4AOsq9LJJlpMKzEK5gRJC0zcaAklmGUfQrM3U0hGF7LZyUbtSNAS0Qo8DoMACMCTMiB3DK5UKftxYuTtjZ2/Xdj+y/UDv57d9/r0nh9P73x5adev57f/dmzDz0fGHxwaeL5v5Nmuoef7Rn4+tunlmR0/nt398/mDv14+/ub68Z/P7v5wbvevB8eOLizZOSd557TYrhBpq5a12I8Xz7Bb5C/alKNqMtH6w4Q7ik17ykw7C7SjCaJOP0ZXiKTGmzlbSWmycldECBcZqd2B/NEk+eZ0yZ58+e5c5YZkyeZ00Zokzw3Z6jQtTSvm6iVMTy5VQ6WpBdzJlzDGz5IVH9vWWL962dIFlfN2rR2+evHK9QtnB9qsffXKwcXmgS5zb7Oyt0HfU6ednJGCPbvSDx7I2LsneWR1aHOtumG6srNGu2VlyPF9mfv3hGzZYhoaNg0N+6zbZNq7L+rCuTnXbq6++U3vidOl23YE7trrd+RY3JkzhZcuzT0wUdDXFtw9N2i0IW11fUpfbeLwwpzRloKVcxIWFQZUp5uKQ2WxWmqwh7Mf196P4xiodAnRUGJN9BQLK8WHmulLKwhiTQnlFAVySoJ5paGCsjB+eSh/eoRgTpS4IlZSnyCvSZDNjeJXxotnRfNnRkuT1awQAS1W6h4ucIqX0+Jk1CiRc7oXo8RHVGzgp3m6pyupWWpGgodzmpIZKXC2UIghLBczhWB0xAZSbcOZTjE8t0i2iy+FaLBDKTCADCEoAMkc8MkS5xwtK0vDzvOilSjpCSKqxhaWIoALk+1giACAHQAAATgAAYDtTE74886+VyfXvjq9+ZfvLry9e+rDreM/nN30Yn3zrTkR5zONS0XUGBjucre/7iN5n2R6VxL7vCj05zzj8zj1CZVwLY/Zx+T1cl1bXGw8YZiFgBY313YKyw1gMNCXMQoKQAiAMTCCAwAPATwECDDAT15jmTT3fjEffnkJYQQHoYgAZQsQW9iBDTGkiDMbRttg7NxgWyYARBQEELQ9nu3tKPcHGDwgUoADC41gAJnpoowQBhQwoisUuUvJUqstTcaKnUn28AcIgNA2tkJfjNSf6GFwUkc66VOwXD3AMQBHg2V644jugKtFsTTASQlc2HK2RzTPMVvLmRuinOknyjQII8Qu/lwXi5uNtz3e6uagssd6kdEeBLQNAACCIRgANLAFII3BuDtY9frCmp9O73x7YPTpvuEfd654MrHsx4ODP02MPdk1+nJr39MtbU+3LX26benzHct+2Nv/YmLkxeGNP57c+fLcgd8uHHtxcscvx9a/3tl3ccn0HRWpO+bEjCarV0cIuwP5BVzbIilj/VT1cl9+f4B4S6Fia67nrhLv9RleK6IEXWHiBhN7jpo6T8PsiZTMN9DafXmrY6Sb02QTxerNmdKxeNH6VK9t6eKRPO8kHUfPo6p5PBGNpmS4Kjl0b6nAR+kRbjbkJcd3NS9Y0bZ4XumU8b5ll0+dvnH96trBmcOtkoElpt4O3apF3j0Nqs5ar85ar85aNTh2IPXgnoSNYyE9reaKYo+yZEZdAWes1bitL3BDn35Vl+eCKvnCBtX6daEXzxXdubXg629bTp6au7o/ZlGjtrPFe83qsP17Ui+eKzl3dObO4dxtPYUH++dMrJq7a9XMgyM1B0caNi8pbS+PqkgzFYZIYjSuITKHYLF9hNwlWuGSoHHLNLJyfVh5PowiC2NqAGtaEHdGKGdOpGBetKAqWlgbK6yPFzcmShamyBuTPeYny+qSJY1pHtUpkvJwfrjYJlREiZNR42TUJCUz0ZOeruEUGIU5OnaBgZfvzc3WMFPkrmlKaoaKGSN0jhZRIgWUUJ6TyRnjS8EHU21ieJRYvmso097siPbCAjsAIQCIbbAxXLskqUuKwq1Iy8qU0n3tsWZHtBAN6ADtBKEJaOhLAAUMbCHQbpR87qt6u2LO3+e2frx76dWtI+8vH355cOOLwYZHMyOuJfksYdPTSbY7WdSfYvR/Ffm/nRryU4Hlt2ztD9GeX2k9NuABVJsAACAASURBVFGd1zI4/e72rfZkL4D3hLC9TM4MZzubyXcOBSAIIJMuJwienD9NcogHEOYfCCdXhf8fCNG2EJkK3IWICw9C28FEJ5SNOwB4CAYICo9j62j6GIAiAoIz2pmDweCALZcsDef5FVH8S9R5vS7aaLyLUJJSS+abAQwAQrIT+REVwTiht6Mqgu6b76wMBkQ6WerDNiW7s1U2Cj8CX+8sDrCXGQV8WZyQkqlglliFU4zsNB03QuxicbPxdsTp7XAWNzsFGfEkIlIixgFMepmxAIUmAZQCQB0x6ntr5v6wdf6Dvmn32/K/b0h/2Fn00+C8Z2tqX+xqfTZafX907r2h6ufrm19uWfx8U+vzzW0/7F720/6hHw+MvT62+eXhsRfbur/pmXNwbsquiuQdc+JWxiqWBbCXBosKeXZJNJuxAlWvH2+pD2dDrmxXkWZXiff6LFV/nKQnXFxvZE1XuMzworeHCWvULs16xlCUbE2SaFeeYkee17pk6fpUr82pwsFc7wQN2yCgq7hcIZUqodireEwfhcRf6xlpMeUkxi5tWdhSWz2ruLCrufHo3v1f37qxb+uivibRymbdik7j4GJTV52yq07VWate0WwCe9fEjfcGtsxTzsyUFEWJCkLYM2NZ3TOVQ9Xa/lrVkpnKqfHCwgRB10LrxI6cEwembduS3NVqzU/mRprdkgJYZRkeLVX6gaX+63sT1nUkb+nK398/Z2Kocv9I7bH1C4+tWbR7WUX3zITKdHNRuCzJSI/TUGLVLgka1zQNNcubWWDiFJq5xT6cEgt7qi93WqBwThivIlJYEcmvjOBXRQqqonjVkby6GGFtnKQqWlgdI6iNF9Yme0yPEISJbMMl1AQFLcWLmSCnxnq4pKmZxb7SDC07S8/N9GJmeNFSFW6FZt5UX480JTXdi5Eko8ZLqaEc+zCWnR8FG0QlhtBsIzhOgVSygYylorEYABhYKJJplyZzSZA4pPDt4ljOIRQ7gwOGDQAdQPYAg8dhAISgAUYAwLpw6YeGtI91Ga9H6958d/KXu6fe3Dzx9vzEy8Nb7qyuvTU76Gi4fraD21Si7UWD8k1x2McZIb9PCfqY5/t7uuZhpPS8RXY01nwiI+FQYvBGP2O0k0sUQPdRuWFEDDJ5bv5foxUEAQAwAEZPcgggLAShIRj+dz34X48vDMEYgBAAigyh7QDWHjhzYIoI4J0BmozG2UMw9ks36SR2905E2bgjZDeI7AYADBx4ZM8Yhm8xO2SKd+FSln8+3kXMjalyE1shBACI4CTxs9dEYwV6W0UI3TffVRWFENxJIi3bL5foIsEK9MCRR6RpUVydE18axnBO5VPyLcISCzfFix4tcQ+lOxgpRAvF1o/m6EVGKQiQBw7lAACAERSAEAhGA4QBYbwBWBjE/XrltI8H+l9u73gy1vz9WPOtrhnHG1IvtWUfmRJwtiLm9qo5D8fq7o/U3Fw5+9uhmhfbO3/Z3/fzRN/TzZ33Rhuud5Qcnxmzsyho1+y4HXPiVmcZewO4A9GaOSp2jBN+vMB7dbS8y8jekOO5vVC9JU+1NkPRHyfpDBHUG1kzFG5zNNy2UGGtzr1R7T4UJRtPFG7Lle0r0Y0miNYly7dlSAbzTFFKto5Lk9Ld+W5uMncnbwnfTyUPNWkTgvynZqR2L5w/LT+3JDO9qXLOjrUbr1y8cPpQ/6omeW+jumeRdkWTrqdBs2yBvqtOs6LZBKrzvErj+fFG52CZU4SCnqjlpXvTpwSyqxOE8xIEpeH8GDUjWEHJCGXOyVdUFqsKkvhxVlez2EbHsjHynPzEzpFaSqo/oyJd3DHNOt6UtrO3fPdAxYGxxhOblpza0DbRX7u8Mq0+J6A8WpXhw0vWMdL09DQ9PcObnm1iZRmZWUZmjpmdY2bn+nAK/ART/LhlgYLSAP5Uf05ZIK88gFcewJsZIpoXKpodxK8Ml8wJ4VdGSsqCJUEcBx+aY7SEEid3jRDYx0ic46SUdA0rRc3I1PMLvAWFRn6enlVg4pZYBZkaWrLCJUvDjPVwDefY5Wh4mV7saJ5TgBs+kusY4E4w2eK5WAwWAAoKxPLdp5r4RSbuVB0vXegeTHVQkhBPLCQEaHsYTQbAA4BZUt5unfcVq+TnKOWTorA/zm77+eGNX7499/ONE7+e3/Z6Z/+99im3801jMkEqwPcwGY+CFR+mBL6bGvS2MPptWerPjfnPB6t+3t338szIqysHfji79d3J9TfWdWzOiVwo4FAn7fIYDAAoBMCYyY02BFAAQf+zksEAgPr3uuh/IQT/ZK79Y2hCcMDGFXIRAhINQAQUjEVg7KRMHHLiunqnoB24EN4Fa+uOIGhgx8TLwxlBUyiGFFFiPStiJsZVzo6ppogMAMAAYG14Rnt1DEFstvMMZfgVUPVJKJIbli5h+BUAIpMoMgAHFspRhHANBLHch+KQzHbOMQtLA4TZWlaslBbNdDS5EszORKu7vcoGPQmhC4wAGMJ+Uc6gCQD42pNPLW369PWZT3ev/3n7wttvzr65c+b9pUNP9o1/vbF739zsOyML351a++b42qd7Vz3YseyXo2s+Xdr55uzWZwdGHmxYfKN3xqmqhD0Fli05PtumhGwqDRkv9m8x0bqDZI1mSQgJ6oqR9UdJWnW0rQXe24rUa9Olw4milZGCrlBhS4B4lvL/0PaeUW2d677vO+dUBwkkoYp6RQJJqCKBJETvvfdeDe64gxu2KS5U040xzTQbTDPuPU7iOMWJ49hOXJLYcZKVus7e+55zxt33A85K9rp7nLvvGfe+Y37Q0IepOTTe33yf+n+4a9Sc/YGSOjNvhzejI9xjMFE2V+x9ab19IF4yGC89k6vqzPMLVnL1AracRpUyGFoBy6ZWBBk0MXZLTnzkrrVrGmq3Z8ZF5SYlbK0qHz3ed2Vl6e718YFDfp27Dc113sf3+xyv923f6/MWwmAJzY/nbHLHaRkYM4fkENNCJNQIGTXKgxKpJAfKXC1cFxOH6Cdw8pc6OyTOVhHVh0sysPE+XGczj2hkORlZRAuXkmmm7Mo0nNiZMn20fK6nZnl43/XJ5hsTzXMdm1s2pezMCVifaM7z90jRcVJ1nCyjINOHlWVmZ5iY6UZGlpmdaWFnWtg5Vm6xH7fUxl+9KhyiygDhmkDR+hDp5lDRlnDZrmiPmjDxzjiv8gCJP5ugJeHivFgp3twIMSlJSU9VMZJUzEQVO0ntnmMQFPtJS2ySSoe80iEvsghyDe6FZkG2np/ixcxQu2eouRlqbjALH+LuFCtxC2a6KLBoHACuMBQuYBboOSV24fZQfbXdK0XGsZFJ3ghGDBAiACYSfL8i5b/XJE4ymZEADEtZz9en/+v9C7+++Pi3zz78/sNLr671fTey99PNsbdiPJvFojSU85iY9T+TdP9SFfJdbdYPPft/OT/+4/2l7+4t/XRj+c2N0VfX557dPPPswsC3y52vxg9OFcdGSFn4twcgggYYZBUxBEAARr31E/+QIf1HZuIvgjSrxWsAIcBoZxjBAhwZUASAzAcwEQEwDKMAgkEBAAgMijYWS/eE8Sw0kY0AgHGhY8VmpjWZ5psmTKiRp+8lKvy5MTVEkRGBsQDGEgRGF12sk9Luoglm23N5fjkENwGKxvWIrgIUGdnTCkjuAEuHuHq0Uq+luaUK3JK13GJ/SblVnKQSxHBdgvhkG83JznQxkXFaZ0SFRTFRCHjr+QIAY10gqDbW9+/vr/y3b57+9PXHv31y+/fHt/722eXf713+5dH977/89MH06M/vXvr7+4v/9uHKv3586fcPV35+b/nNrblX18+8vnH2zYWTXw4duFmbNZHnO5ptmSoJOl0ePFIetNNI3aai77Mrkmi4xgj16TxDo0UwnKm9sDFwrsIynuPdGS0+6ODVB8jW67jlKu5uu2ivTbZdy2oJkQ0le8yVaC9u9B9M8eiP4k1mex1KNlrETL2AI3OjiNyoWgHLz0saoFPFOfwKkmObdm3ft3lDalRYWnR4WXZq96Ej52dn3r917kRTyPFd2qO7vDv3mdr2mA7VeDZv13bus4EQMcPMxOsYGA0d1jJhPROxsDFWd4Kfu3OAhGITkX24JBPHxcgimphEM4Pky6NauGQTx8nExZq4WCMba2DhzO7EJC1tW7Kud3PMxKGC2Y51S4O7r55uvD7ZPNex8fC6uM2pvuvjfUqDPdN17jl69zX+so0hkk2h0o0hko2h4o1hkk3h0s0Rsi1RHrUx0rpY2Z54j32Jyvpkr4Op6kNpmoZ076ZcVWuRrq3Q0FFs6l4TsDZUbGMhHhhgYTmn+8hStfxEBS1NzU7xYqZ6cxNV7smetGw9N9/MXxfiVRWoqPCXrQ32KvYV5Rp4BSZxmhcrSUpLV3GiBK7+NLQ/Ex/Jo2mdcAQA0AAEcRh5OvccC6vMR5xt4YaRED8sXo0liDE4KgAFcvd/b6z82zr/RQ+hJwyyKPgf5vv/5+uHPz2+/veHV36/cuabyQNPDpfczbHNmcWVTvgUABY8hf9tQ/ZPw/tf3hv/9rOLr+8sf3/p7HcXT7++MPrmTP93p/ufz/Q+GD3ydLL16+mjN2pzzxaGJ6l5Lm/b/dEQADAKAjBYlUVc1V9D/qw7/08ghAB61TOEERwMYWFnGiDzAZoKARSAIYBgMDAAiDNVHeEqNEJELsAxCAAoBTz/0GiFNZJlyxHErlPmNFFN0eyQcrIqcDX0iuEoiZpIJ6XdWeVgWDOEtkIcSwHQBI+oMjxHRZL7AZI7hCLCDA+U1CQgu8UL3OKUzGwLt0DPivfgxMtpgTxXCxnrQ8bpXRCdM+KJAay3hQYogIYAjGaiQV9xyH+/e/bHT+/+/fH11w/u/vb83q8fX/rx0rlfXz/5l3//9dV7V18sj/98c/LVpZGvL4y8ujb1/a25N7fmvr819+OduV9vzX053HxxS9qJTGN/un40zzZREjhWHtQcJtmscKvzEabQ8FuMwrMVpmOBshPJqsV19tly80imqj1SuN+Xsccm2qATVGqE28zcPVZ5nUnQFa0ay9LOlhkubLCP52pHEqRnC7S7Y3Q6LtOTQReRiEIqxSDm+HpKgo3qhEBbYVJsU+3W7WvKs2IiE8OCMuPDGjdvnxkZfOf64tCR2N7duq56c9tu3eEd3g1b1Mdqjcd2+YDSQI94FcMhJJpYWF+uk4WLs/OdQiTkBBUtxSiI8mJbhSQTh2hkEX3cXczuRF8+ySp09RO6moUuZhHRh0cwsDA+bFyMhlEV4dlYZD2xPW76cOlif+2NqcO3Z1svDdS1bEhcE60pC1GsCZNvivI4lGUaWB82vDl8pCZibGvUaE3YqY3Bw5uCTm8LP7MzenJHxOSOiLO7YxfqkxYPJC8dTFluTFs4mDx/MGbpUMLKoeQrh7Nm9yZtjVYkqpkmNxwHgGAJK9MkS/ZkpXmxkhX0LJ0gx0eS7yMstIjzzfxyu6zQLCjxE68LVJX7eRSZpYU+kny9INOLE81ziRXRYsQ0Pze0g07Q4RESCoYACOCxK+3SkkBRoZ6frmemC6h2Z6IEAAEKIQAQxab+UpP686aEb4PM2wigIdT0r8/v//Tog58fXP7t9tjPZ49/07X93trEiw7vSaWwHA02selPdlb/cGP6hzvzb27M/XT17Jvz468ujby4PPDVUtuzxf5Hk21PZzs/P9v50emjH5+qv7gr63SuZSQ/wp9HRAAACAZezcVDAEL+lH76Q5HjnyH8I3mIQKvxVASPBgiMJgCSO4RjA4AD0B/Scgie6hVIEuqAM8eVqypKTsgPNu+pLs3LyWXbithBReqcZrIxRhhYQNFFrdKLYsudVOF4DyteaaH4JPJ883BCI4BQAnsqgaN0FvkAkjsCoWBnJuKudyVTw4WUFAUn18LL8nKNl7ETvFjRHuwQLtXOdDG74XzdnDQEFGu1eQsFEAAgBMYDsCVY9cv5gd/uLf/b+wu/3rvztwe3fvvg8s9LM7+/eP/xl1c+m+/+eqnn1ULPi3PdXy8OvL48/v31mZ9uz/16d+GXO7O/X5t60rdveX38cLHfyUK/kXzbdFno5NrI7nTDIX9FY4CiUOxWIqNNlWs7whT9iZ7LmwLnq62nc7XD6eqOKI/6AHmFFztT4FapJG/y5u7Q89sjvEYyNPOVPpdqAmbLfM9kq84WGjaHqtXuDCGRxCPgpTSaSS6wekqCjer4AN+S1IS9m9duLC7IjI5ICglMjrRvzi1oO7R3YXZ0qjvn5H7jyUZb9wFzS52hbY+5Y5/v4e0GUBbATtZQAvnORhrBxqH68ymhUnqimlcZyC+xieO8mHa+k8mdYHR3NroTvOnA5E6w8EkmvouR52rik/UckoFJNHNcQxTUXBtvR5JXe1XQ+IH88ydq3z3X/uHF3ncnm/t25VVHq/Jt3LXh4gPZ3idrAhcOxS80Ji80Jp9vTl44FHtmd9jZvaEXm+Kut6QsNKfMNyWvtGRe6cy72JZ9oTXrfGvmuebk2f3R07URs3UxZ3ZGH87R5xsYxf6aBLVSjIPEaBAipKaouSW+8nQVO1FOT1IyM7zZOUZOmb+s0uFRbpdVOzwLDMIiozRHxy+1yNIUrGQZPV5EjRXRIgWUBAXXj4rVE1BkPAYA2JvknCAnpRop+VpuhoIW7e5sIGI8ABBDAIvGuQNwPlr37zsz/0dx2G0D7V5zze9ffvjTx1e/eXTjze2zXy+3fDt3+Jtzx744vuuDgxvvtu14Ptvz6r1zr25Mfn1t8tnF4W8vnfx6se/r+YEX5058PT/wbLbj8XTbpycOfti163ZT5ZXNaTMFYSeLQhdyAkrMYgwCAIxGo/CrjRJ/yIP+0fL7H+Ty/1K4ttojAqEhGAtgZywACIIAIgPC8wBMWm2VQiAUAGg8T0uRGgCJTxZq+xv3F9mUMR7M9DCHMLCaZsnwzmzi+mfyfFIIXuGo1XAOTYBThmBlZieVhWlLE/uX4iS+EIzimmOcOQoXqRUQuSgAIDQJkJQYV0ogj5QiZ5c4pOU+rBydIkbDiJAywgV0K93JRMH40Zw1BBQDhmAAAQRFACgYYACAfci4Kw1VP78z8vriqd8vD79+b/LN3Ykv+w58MdU0cTB3cVPSm9MN38x1vFro+eHy6I83pn+4ceanu4s/3zn37aXTLyfbHxxev1AZNlrqN1RqHS2wz5RHjFWGT1aGdsf7HrBJioTkXB5lpkrXFa3qiBTPVvktrLWdKTZO5ZvaImRb9KxcoUs6j1LqQV6vYm/TcpsDJP1JHkvVvtd3hC5W+c/mak5nqcp9RQoGjUMgiElEBZuhl3D9lOJArTLG7lOZlbpzbfna/Jz0yLDU8JC0mICqpLTa9eUjJ7vmhkpP7NX21ZtPHrF37re01Jmat2sPbzeAfB/3JBU9RORi55IcQpcQKSnJ260iRLw71VQaIIvycLNxKTYO1Y9N9qHhTRTYwMZb+CSbmGLhk0wcJz0Lp3ZDe7PwIVJSloW7OVFzrDpsqrn4ysj+D84PPLwx+dGlkYljm9fFaLMN7Gwdp9Qq2RSn2pqqqkvV7UnR7U3V70n13puiPpDp3ZRnPFLoczjPeDjP2JxraCmyHC0wH842HM01NaR7N2Tp9md67cv3LgviR0moMSL3FJU4108eIaV5YIEQgh1c1ppA7zI/Xr6Pe7KaEaNwiZKSkhX0UrMiTcHON0ryTKICP1mhRZprFCYrmKsQRglcE2WseBkzSkgzu+HUKDQGADIJnerhnqNkpOg4qQp6NNvFl+QkAIAFEBwCCBCIFUr+fUfa/7kp+nmy8Nf53r89uPTj3XO/3pr75v7KDx9f+O7+8vcfLb/5YPGH9xd+ubf0t1uzry9NfHvp5JP5nq+WBr5aHHx2ru/5ud4nE0e/GDv0cLT+fs/WO80Vl2sz56ujZoocEzl+oxnG0Uz9vgAxdvWMQAEIxqzqkYI/ZS/g1Skx8D88w384hAAGAAVDGATGoiACAuMgFB7BuqLxbhCKuCpgAwAKIBiE5EZQ2AGB6srzjAmP7tizvakyjyeWSxzpbEOcR/oubvQWgSGGqAkHiDOAMDCRSlT4YBQ2gtKfa0sVhpQQ5XaAwAy53VVuIQm9EaoSwBAaQABDQfAMJYOaq2WvDVZXh3kXmDnpBnaUhBrCJTs4rg53ir8b0ZfkxEGh3r484LeGNAGARJnTlZ0JLwf2fDtW+3x8x/OedXe3xL6/L+N0kXW+Jv7F8rEXy60/XBn46drY365N/HBj+tWl4R8vD72e6/zqaPVyedhUnm26yDGaZxsvCZxaEzaxJnSqLPjYmrCtJkEek55Co54q1B2L9W735UwXmReqrFNF2nOVvj0Jis0q4k4Toy3euylSts3I3m2W7fR2745RTRca7+6KOl/lN53nOZajTFNxuXgc3QnNJZI0VIpGxDbKhP7enolB9urcjM0l+dX5mfmJcdmxUXkpUZXZSTVlxd3N+2YH9/fsV48d9u9v9B1o8Gnfo2/aommptYCDuX41sZoCqzDTxClxSDfHqPenm9rLAtvLHHtTDSU2cYIXK0rOcvBdzQyciYYy0Z3sPHKIlB4gpFg5RBPLSUPGeFNwYWJioU1cl2nu3Bg9Wp91rmPtO2eOfX51+NH1obmuLdWx2jhPaoSIHCEixyopcWqXBBU1Ue2WpmNkmVjZZmaemZVvYRb6sYttnDI7r8zOK/PnlNrdK+ycqgB+hZ2z1l+4IVRWYOMma2jpal6OXpyh52T6sLJ9JOFypg/D2eCCiRS45XoLSqzKJLV7kooZp3CLk7klyGgJMlqxxSNbzy+0SEusskKLNEPtHiumhLo7BdBwgUznMC45jEPzZxBNBCwOADweihAycpSMRLVbmhcrnkf1ccaIAGACGAMBDABCAGYijT9tLfhha+yPV8bffHD+p08ufffR0jcfnf/hveXXdxde31t5ff/Cm/srP9xbfnVj+usLY69n+55PdLycOv5sovXRqYZPB/d80L3lXvemm8fKLu/PubAt9Xx17HSOf3eU5kiQrCFI0h7htUbHwKAhAGEABCCAQmHQf+3k/Wts5j+FEAJoBMYiAAsBDIAwEMYZwVIgFBECaBgCq3UzCMEVL7EAAh1Fk1JoPIOHh12toYg0vIAcqjbGI3UHP3YbWx3hoo2EMS4AoAGOiBeocR42gtLf3ZbKDypykloBBNOlZlep2YnriXZTrE7ygNAkBE/zZLplerMLzaJSm6LIIsg0usfIaEEcooPjGsAl+7rgDDi0+2oHCHp1BDcgwiCWQz1VEftwZP+vs70/zXZ9NXro/qGyCyWh729NulQadGd93OtTO7872/rqTPvruZ7vFk++XBj4YqLt27Pt3023vFeXPZ5lGUw2jGT5nsy2DBfYJytDZ9dHj1fFjleH7Q/WFUncY0jYvlzt0Rhpe5ByIt/nXIV1qkg7WWAYyzW1RCj22XhdKcbBXPNBh2yvWbpdzWoP9xjP8b65PfziBsdssfdItleUhMbGoN3wCJdI8nYjq4WsAG9FvL85Ny5yXX5WVW5WfmJcdkLMmvzc9WX526tK1xXkH6rdPNW3r3WX58BB81hnyMAhv+N7jEd3aI/t8gFHCs07ExRVgezyAOaWaMn+VFV7oeV0TeSJjUGtpX47YhUVdl6BDy9ZzQgSOPu5Y4LZhHg5NU3LTlJTYxUu0TKXMCEphOeS7EVdG6I4kON7rDzgaIV/6/qwieaS6yP7Plo4crZ9bXWsNkLhFsCnBnCogTzXULFLpIIeqaBHezESNawUHSdFz07Ts9IN7CyLIMPonmni5Pnyi+zCYhuv2MarChJvCZHsiNalqtwjRNQUT/csb26Glpnjy8vxERTYpMladzuboHdCbBSnGKl7ircgyyCOldMTPOjxUkqi3C3VkxkrJRdapGuClCVWWb5RlOTBiOJTAuhEHRZ444ABhw5huQbTXFZF4U1M13wtP1NPT/Gix/HJPgS0AkbYEAqHACcMTAHAEwYFYuZQiv7N3eUfP7z85oPl1x8s/PThhV/uLL25u/z6gyuvP7354+d3vv/wwtdXJ75eGvz6bO/nQ42f9NTdO7bxVkPp9QP5K7vTlmtTbtUkn68IH0k3d0VrepN8RoojJjekntmWPbcuo0TrjgAAIDQMw2iABhAKoDH/awj/EMZ/K8UNQ5i3bRgQCiB4CE36E8LV5gyME5GvR1y4sJsHwDERFB5LcHf2sLnZckiqSEn8JkXqboYmiqyPxhAZAKAACoewZDgPG0EZwLSmcoKKCRI/AMGuXBWB6wW7ctEUMQAwAmAAYQDsJHJ1TlIy83TcIrO0yCJO8KBESaghPJcQIc3BcdVhgQ6DcNEIWJ0GiQIAwDwA9ljlr8aa/+3BtX99ePu3z9759dGtf/vs+u+3z/x2bfz52NHP+/Y/Pd3yzemWbyY7flg4+dPVqR+uT7y5OPS35b6vxxo/qC+aLHCcSDcN5fgO5fiezLWeKvSfqAgdX5+4UBnWHm8rtngHkQkdqfLeTPUhP8mJNNVotmaqSD9VaBzP8+lL0R8MENQHCg6Hi3cZWbU67hYl9WiwcCRLfX172JVtIbNlur50lZnuTEfBDAJKSKYY3Bk6KdeqECX6m4sSo0rTErNiItOiIwvT07ZWVx3ctePI3v0bykrrtm6YOtHcsVfXtU/bf8S3d59v605dW52xc68ZHC/za8rS1KcrDhd696yztZUae9b4LtQnj+yKOrE5uLXEfDBNtTfBc2eM59ogcYGZXWXn7EnyOlZobs7z3pMq2xEn2RIp3RAs3hIpP5hpPFbo15xrqE302BojPZDn27UpbuJgbsfGmMIgeYiMYueRA/jUECE5VkFPUNFStKwMAzvHzC1ziNcEyyuDJGUOYbG/qDxAUhUiqw6WbAgVb4oQb4uWNuaYuir1BzP1qSpWGJcc6u4UxsFH8F1SNKJMHavAKsqxCDMMogghVSzmJQAAIABJREFUw0TCaPDAznZOVPISPTkFZlm2np+mZqZ40ePl1FQVq9Quydaxs7W8ZAUrXsIK49A0GNgLDTRorIOMt7tg6QgAEFDRXUvNHkW+nCwdJ15EtRKxKgyWASAMAAQUigAACsBEAOoilL/du/rmg/Pf3Vv69d7Kj+8u/npn8ce7519/cOX7z+/+9MXd795deLEw8Hyy5fOhQ++2bLpdX3ptR/qljXHn10bNlYedKQkejvMZz3ScW5d8q3ntp0P1D4YO3uve837H7g87955amyp0QUMAvZqWABAKwKh/ghD+C4R/mU7xZ/UMAuPeyqvCaAjlBEH41ZsBaFVMAE1y98K4CABRCFPFCI4EXGR4D6uzPpHkFeoenO+VsY+hi6cYYnAUDgAoBIWBqVwnudXJM5hty+CFlTlJrQDAznQBji4GGFfEhfu2hBVGAYCioJAQITVHzS4yiYstsngpJVJM8WfibSyijUU0EhAjHsPHogEAGICCARoALAvA240eL081/u3jS7988+lvn7zzw4fXf/ns1m8Prv/wzvIvdy/9/d6N3z++/T/unf8/7q38/f3lH++ee3Vr6sdbk98v9z7o2nmvoWS2KmK0wH4q3z5c4H8q334y3zZeFjxWGTJTFtIWZcwMD12bnnk0mtMZpzpgZB+P9TiZoRnN1ozleJ9M9+5K0ByLVDSGiFqjpU0O8QFf8U4N42gwfyxfc3lr8NLGgOX1vh3pBiURS0MgthNG4EpV01w9eXRvDtWmFCc4LJlRoUkhwSlRkSXZOTs31gx194z3jzTtrd9ft2PyRNvY8aiJjqDBFr/u3dbGjV7ttbrj+33AyTUBfeV+pzYGLh/OuD+67srxwuVj2e8Pr787svlmX+Vyc+bktrCTVdaTVbaBcmtbnqG71Di9I2ylIX5+X/jIJkt/pbGrzNRepG8rNHSXmztLjEdzvetTFDtiJLtilXWJmgNZxm1xmgyje5iE5BA4RchcU7WMEpu4JlxYG6/Ym6DYm6BoytIeL/E9XmpuydcdSFU2ZWmO5euO5Wm6io39lZb+ctPIevvcgeC6JFm6NyNNxU/woMeKXYPZBH+Wa6wHOVXlnuktKLFr8nw9ErzYvjS0yRUxEiE/N3SMjJau4+f7SvN9xDkGQaqKVWaTZGlZ2VpenMQtkEHyJTt5oWCtE0GHJ6rRQA4DOgoFYIiOBelKdr6BlaZmR7g7WwgoTxSaASFO4G3RJh5gqSioNcP+2ztL392ZeXVv8bt7y6/eW/jx5sx3t89+8+7S64+uvLm/8vWFkSejzY97d39ybPOt2oIL1XHnCoKmMq1ncoMWymPPr0+/07br6XTnm8sjzxb7Pxlrfr9r9ztNNbf3rn23fee1Q1VVgQbMakMTFrzVsID+dAv/ySGE/sk3BDAAMAJjYRj1NqIDYyEY+xZCBI3AAEB4Il2OI4sAhg5c+BAKD5NleIHa2SuI4hlAMcQoUnZRveNd9FFYhgRAKAgCgEhzkllcNOFcR7YgrJwgs0IwBk9h4KlcgHZCuzBXf2J1Ro0zDPlyyLka91wtL9coTpS7JXqxAthOFhrW393F383JQiRwUDAEAwAjBIACEAoNgTwu/+HRLT++O/TDnaXfr838cn3ml7tnf3139s2l0Z9vTP1068yPN2fe3Jr74c78D3fm39w59+b2zC+3pr6dan+/Ye3cuuix4oCx4oDTpUGT5aGny0NOFfqPlgROVNjGygPWGUQqT1PT0d72bGNboHy/jtYTrzqdbx7N9R5IVpxIVbdGyRsCBUcjpQMpqvZIZYNVUm/h9CUoF9baLm0PWVgfMF9t2RvpxYAhCgB8Z5yIQlPRXb3F7nohQy9kODQeKaEB6TFRieFh6XHxW9duONHZPT8+PzM+1d3VPj3UN9aVONruf+KYb+cuS+NGr87dht5DvqAlS9uerz+53rFwMOXe0NprXUXLx7Kv9JRc6a5YbM6a2Bk5WO3bX6YfW2eZ2ew/sd5vYrPj7I7Qc7Vh52rDZmtDz+4Km9oaMlTtN7jWNFht7i7VdxRqOwoM7fnGw1m6+iTPHZGiLeGyNf6iEiuv2M6uDORtCBPWJmp6S/TDa63Da30HK02nN/jN7wperAuZ3xl4erPf6c1+U1vtZ3cGzu8Kntlin9homdsRMLUnpsLunujFyDbKco3CfDM/Wc0IEZAiJORIgWu8hJGh4afqONm+wlQdJ0HOSPZkhQtd7QxMoDshRkZL8GTmGASlVlmZTVrgI8zR8WPENKsbQeeE8UTDWpKzDMGKYUCHARFBAQC7YUGWipdn5MdL3UJYzn5OWBkC0RCIDMHOq5JmEMQGYKg86rcP5n+7M/Pq9rlnt+Z+uD376sbpb29Pf3N79tU75769Mf3sXN/jkcOf9+190L71zsHKa3uKr+0vvdFcfa+v9vFMy8uVgefXxh+fH/x4uu2jkeb7/fvvHK1Z2VMyvzVnflfuyrb0wwn+zgDGoZDVoAXmjxQE9B+v/8VaHbOx+gmCMTD0dvAGgLEQAABxxpM5eIoQYCgAx8SiCQhF6sSTEpVWqoefizpQnrSNqksgegU4CbQAwSIAAAwJx9eSNRFsazrbnkuQWVEIDk0gYpzIAMJABBcI5QRg9OqD4WCUwd2tyCQsMYsLfBV5Rn6cgh4pdgvikx0cVzuV4Ety4qDe1ubhUaveJFBDmN5U/59nD/zL2b7XC0O/X5n+4cr418v9L6fbvjnT9vW5tp8v97+5OvHztekfLo7/uDLy6+XRf7s08rx37/UNmSP5foNZpqF835FC/6mK0DNrI8fLgkZLAkYLfU7k+/i7keQKc9fI4kLrzkN+ku06zpEwaXe88mSGqideOpim6U1QHwrgHomQ9KepOqKUDXZxa6j8dJ5peYNjeYPj3Fr/hQ3WKquUBGAKAoTOTkKymyeDpJcJ/NWSIJ0yyKCKC7SmRUdGBTiCff0KM7Ibdu+ZGZq5duHS/Lkzi1PTvc2RXQe0Q222vgPW9t2mnoOW3kYLOJanac5SdRSbeir8RmtCTq73H1xnH9poH9kcfGKtvbPE0F7g3VWk7S/TjlQbpzdZZ7YFjm+0nqr2m6wJWtqTcKkhdWl/7Phm//HN/hNbAk5W+faWmgbX+I1uCDi11tpTrGvK9DqSrT+Wa+ostfZVWztKjfuTPQ6labqLNKeqLac32SY3+U3XWM9ssZ3Z4je33X5+X/CFg5ErByLmd4ecWmduz/fsLvEe2+hoyLSkelFj5fRoOSNaRk3wdEs38JK13ES1IF7BTJBRo8UukVJqkjc3Qy/IM/ILfYWZBn6snO5gE/1ouCgJNVXFSlMxin0lFXbPbK0ggk/2ozqp8YgUBnI0IkKh2GgYA4FV441BgLI8+fEyejSPHMQg+RIwEhi4QoAKgBuAsDAgYGE2AGe3ZPz43pnvr49+d3Puu1sL318a/ebW1Ks7Z7+9febVzZmXV04/Wzr51UL/09muR9Otn4w1P5ho+WKh9/H5gUcrAw9X+j5e6n4wefSTseaPB+vvd9fdbam5erBibkf22Lr48cqo8ZLAw7EWHIyC3k6xRyHgT+b+KwT+cR7+ISYHo2AIAwE0gCGw6l/CBBhPRrnyAJoM8BwC1hVhqgg8OUZqIUl9iF4OacIWlikZJ9I7y60AR0QAACgCRFdQ1KEMU6KbTxJW5otCcACGAIwFAAYIGsG4ABQOhaxmUFAiF3yakpqrZWf6SPKMnEgJOVpKDxPTHBxXKxnn50rgYVDgrdAMADBAIxgcAGYaPF4Z+/2pplcTHf+6MPTjuf6vJ1q/Hz7y/Ujzy9GGN6cPf3Om7fu5468nWt5MHP1p5th3Ywffrcs7k+eYLLEPZfn0p+u7kzX9WcbREv+xUsfpyqCZisCmWC85AHExWYNjK22719tdoTwF95BD0BIp60tWdsQIB1JUJ9MMHbHK9lj5QKbmeLxXc4CkK9prIt+4WO03t8Z3aV3Q3HrfVA+mE8AxcGgRgSBwoanZZKOHKMjolRhkTQr2j7b7RditwWazReMd6QjYVFHe3dS1Mj///nt37t98t/9wfHudZ3eDvnOfsavep6/Jeqo1CHRX+x7KVjRlKpvSlO05mp4C3alKy6ly03i130xN4NTWkMltYSObg/oqTCcqjOd2hszucgyvM3bkKY4XaIaqfCe3Bp7dFTRe4ztcbZ/cHDK8zr+/3Dy01jK9NeDMDsfpjaaBNab+cnN3sXFwjWVyq2OwynggQdSQrOouNgyusYyst49tsg+vNfeXa/rLNac3WBb3h95sTb3YFD9e42gv0jVmeh1M86yNlZSaBWkqRq5FHu/FCRG42ujYUAE1VMKM8eQXWuXFftx4D1KklBYhcY+VMwuNvFJ/UbKakaoVJnoJA9wpCQpulo6XrWOneNJK/TySPJhWCsZIRCvRQIoCHngMGwAXAAAEA0AAAHbDgEwPfoZGnCRmhTFdzTiMDIuioCAqAEwAowEgAyBEkBv7Kn58Z/rL20Nf3Zj59tqZZzdOvbx55tvbs69vnH11bebZxdGvLo6/uDHz1Y3pl5fGHy8MfT47+Pns4IPJ7o+GWx4MH/5suOnjwbp3OjffbF1/p3Xd1UOlCzWpU+VRE4Whg7mO3nRjvowEATQAeBQE3u5y6J8Pw/86hKvztAFAAQggACZBAEBogMajqQKAIQOSGAW7AIY3xBIDoZEg9cUr7LyIKp4lFcOS4z1sAOeCAAAQHHAVunoFM4xxdHMyWmJGIbhVhmAAARhGYV0BCvf2NyEMz4WQrKTkGtxzbB6lNmG2SRwjowULKOESehiH6u9G4qIRAAEMwCMAwBg8gLAAARAExE7gYLTpwq6Y+415n3Wt/bR341ddW1+e3PPV6YNfDe//amz/y+F9Lwd2fTey98XJHe825M9UOqaLreN5lpFs06kcU0+KujVe2Zmi6crQnci3TJQElnqyHK6kvbuPjIxeyAg3OQNgdsHv9eX0p+q6E+QtEfxTmboTqd7dSV5diZ5dyfK2WMUhO68tTD6cqZktN53O957IN54u0zroODTAsAhYIRbHJ7l5c8hGD1GI2Ts+yJYeFRIf6O8w6m1arUWlCjD6ZMbFVOdVHTl06NLF5Y/v3B87njVyzDpwxDx42NbTYD62W9t5wAd0lPjUJci3RIs2hvIPpWnb83wG11gHq30naiyzO0PObAk7VWHtK9KNrjUv1oWe3xsxXRd4vNxQFyfdFMSti5MezVV3FGq6S7x7i839peZTlZYTpfr+Ym1vib4j37ujQNee43MwWbMj2mN7rOe2WI+tUZKaEG5DstfJNZYrh9OutqRfbIw9t8sxVKEertKPbTQv1AeuNMdfaUme3uE/XOEzUu2zK1oS5s4M5riG8l1jZIw0b36uWZrnK4/2oIQInRxscpSUHatgJXqxsvX8dA0rRcnIMwhTPZgxfNcoPiWC65ooY+UZJJkaTqKCliCiJEmZUXy6mezsgUFzYIQOIxQYwcIABQEMADDAAQh2J4AMlSBPK0oSuARSMAYcWo7G0AHaGaBwKDSMQrAw0ADwUcPGv10benFp8s2VqSdXe1+eH3xxY+zljYkXNye+vD7x9MbUV7fPPn9n/tm7C8+vzzy9PPF4efjRme5P+vfdPbLubmPl+4er7xysvnGg4tqBkpW67DOb46bXRkxUhAwX2Bsj5fVGjyASDrfa7gpQyJ9b+y1Wf42R/j/DCP4y2h5C/sQYxmKJLICmQHg3gHIGDA+UuwLH8yJIzWipnembKvRPg5kqZ5kPIDIAAGgIwM50F3UkxSeZY451klsBwe3t6+BtVAiCMM4AwUIAwBBww6BjJLwSszjbh5PlzU03cCLFlCA+OdqTEyYgB7Jdhc5YAIG3xXmrhbEIABCgA6ADUDke3cCljvjJlnOtH+zLetq+/knnhk/bqx+0rvvkcOWnDaXPWtY9OlB2tTLmbJ59KEPfkygbSPXqT9X1JOu7U01daYbj6drjWdrBbE2lzN3Opbcd7Li+3O9NR8MAkaBACI/VFeXZGSrtCBX1xMqaopTtMYqeOK+OOFm9TbjfT3wkWDiWpz+Vpe1P9hrLM3al6IQkLAkgfCcUzxmWUV1kHKqPhBeg944JtKfFRCVHRoRYbTa9warT+uv1SYHhieGhmakxzQcaP7z2znBXXF+zaag5sK/B0rHX2FZnaau1gsH1wbXxsnXB7A3B7ofS1T2lPn1lxqNZkv5yzfhGe1eBrjFJ0pHnObLedLY2cOVQ9My24JYsza5Q0d5Iz4ZEdVOSV1u6d0+eT2+5fqzGNrLB98Qa04lK3/Zc3f44j13h4poQYZmFUWh0K/VzLzAz843UChuzMdu43Jj2cGrLw5maW735Sw0xc3tCV5oSLx1Lvd6a9E5P7p3unMvN8Uv7Iia3BGd4OZlIGD8q3scFrcUDNQZYyOgET16GXlZo1aTpBGEiij/LOZhDCeNTo8XkTB2rPECSpuJHCij+DCcTCeVHdQoV0AI5ZCsdb3fD+bigVQSUCA2xIIgMgBMABACt7hg0gCCAAxDMwoJEOSPVgxkvoPi7YryxiBSBGQAiAUBYtZtgYCHAn/Xs/vbKwLOVkRfnTz1a6X2x2P9kefCrS8Mvr068uD757ObMs1tnX76z8PV7S9+8v/ji9tkXF8cejh+52VS9tD1zfnPSmQ2JM7Up09sSztbEz22KPVMVOV4Y1J1iPhyhbk3Uj1emnauvaarMMXHpCAAAjUb9/wAhDGFxzgyAocIEGkA5A5oUYckxHCVeZEKL/ajGeIkjHeF4Y4U6QGKB1agOnuqsDHbRxdJ1YXipL+T0HyEEAMB4AGNWvyTCIITHKjIJc8zcXL0gSUWPlrqFCd2i5CwHi2AhY3kYGIbhVYsUvaqeCkN4CMgBFO3kUs8SjvFl53m88wr3q2Hqq1l+1ytC7u9O/3hX0o3t0be3RN0tD1zKNJ5M9GwPkx53SDsCVd2R+t4UQ1eGrj3FqzVR0Z3kNZRmGCoMWK9xjxPQD1YUrEw2sp2dAAAcFMyHQJ0frzVUfixI2BUtPRrr2RHnMZCk7klWHg1TNARIj0VIx4tMvSleHdGyU1nag2EyJhq4ABTfCSUkYRV0ipeIZfWUhBrV0TZzYnBAbGBgqK+vw2BwGAwBRmOsf2heatqG6sqWxpbbi+eHOmK7Dmjbdmnb92p6Dlp6D/kd3aEF7cXmQ+lezdnerYWmgWrb1PbQMzuDz+4MWNgdsbQ37kSFT0uOx8lqw8RW36kd/gv7I+Zqg05UGNtyNT0lpp4SY1eh91CFeWpT8NzBuPcGim8fz73QkLS4P/7UusAj2foDSeq98R7bQoU7o+T7Erx3RMpqQvh74j0G14de68y9N7zm9omixSPxS00xNzsz3hsovN2Xd6Mj49bxrPPNiefqQyd3+PZUWlM8qZEyZoyUleTJT/eWxHtw/BlORhfYQEICOeQ4BSfVW5ys4Sd6sqOklDChc7InI88kihDTg7gUX5qzCgfLUcALj1bgECUepcKixCiIi8BuKBThrxWY0GqbLgQAGkBASIRT5IxEKSVJwnHQSN54lAQNswFwgwEZgQkAAAjkqfnP5loeLXe8XBl4dnHoycrJr5cGnyye+HL55PNLYy+vTjy/Pv3s5pkXd+a+eXfh5f2lL6+OfzHTdq99y1JN2kRZ2FhZ6EhFRN86x/D6oMl1YSOF/p3x2tY44+mq5FuHa97r2PZO1957g02fDjS2pse5QQCgwD9E1f4wNP8cpv2/AeFbyU+AQuPdAJaCENwA4gzcRJCbGMWQYbgalMDkpAgSWJPRPAPK3RMhc95qK+LIBJmdqI0iqwKxIuMqhG+f6O1CAwi1ChYeAH+2W4FJXGAVlvnKcwy8NBU3WsaKlrGC2c5WMo6LfptaQd5m7GEIAlQADADkkWjHGMxFpfyBzuNzg/hjg/CKN2c5SPlOZcTdqpBLeabzhfrz+bqFZHVfhOSQQ9AdqGiJ8W5P0Hal6HpTtZ0JXu0xnj1xusEU3+FcW5mKUWpWNJTGdO/NgwGCBYCJxpMAKFDSjoQqOyMUPTGKtljPrjj5QIqqN8WzI0bVFCRtj5WfLrK0xcgag/h9qaqtDhEdDegYvJCElVCdVUyat9jd10NiVYjtXh4OrTpArw80mSNs/omh4RkxcRU5ZTs27WhpPnb6xNidhdnBlqj2vaqWnV499cax1sDJztDu/QYw15C43Jhys73wna7SG+15l4+mn9sdubA7YnarY3Z70NSWwPk9YVePxF89En+5Ken6kaz5feHjNY6hjfZTm2zj222zewKXD0Xcakv7cHTTk9na90+ULTfELx2IOlsXOrLRNrLRf6jKdKJUP1JlG67w6yvQ9xXpTq4xntkZeLMz43pn+sW2xKWmqJXGqJutye90ZdzqzrjTXXytPfPCkdTZ+pCJvdaD2YZET06KUZCuZ2UauJkGbrqOm2sWF9qU8Z5MOwtrpuADOS6JKvc8P2mmgZ+h56VqeHYGzkLFWKg4i5uT0ZWgJRG8CHgxBEtgRAjBLADIEIRfLdSAAICRtwXQb7sSUAga1jCcslXcFA9aKIPs64LXEFASNMyCIDcIIcNoAoBJADTFW19f6vl8oeP5fMfTi/1PV0afL5386vzQlyvDT1eGn14afXr59OMrp59cn/zq1synV8Y/n+/57MSe23W5c6Vho7mOoXzHyaLg4YqgscqQriyfIwma8bUJH5/Y/2i6/WZv/c3Ondebas7vK79aXzpTmRbApqIQCKDg/wDVHxzC/zUIAQB/gRD+x1A0BOsK4SgoJxpAnIErD7jyIIoIYSoQjjdG4CPwTSBI/GCaBEXhAgiNAADQRKzIh6gJJyn90QItwFP+kTf5I0uCAgCFwABAAAOAkUJK83JP17Py9YJiX0mmhh8rY0fLWOEclwCasxCHWn3zIWBVrxFgIMADwB+Acidam8htVsb6QO3+hY/gmUP52Ka8Z5LeMApPGeQn7eLTKarpDM2JEGlvsGIowdQXr+1OUvQke/YneffEe7fFeLXEq1rTdK3ZhrF0bRzPtTBIUxKhLY7UoBDAAICBwkAANhDBbquwO0rVFiY/EixsjxL3pap6kxRt0crGIGFPsnKsyNwUKt7n4LUnehUZea4QYKKx7jiYS8LLKS4yposni6GgU9Qctk4iNnupgy225Ii4gvScqoKyHRtrd2/f37Dv8NDx/rmTh9v32Dv3qHoPGLp2G4ea7NOdIafb/MG742V3TuR/cLLko+HyG925i4dThzcFHi/UD5QoJzf5Le2LuNKceKExdmZX4OnNgRM1oScrHMcydY3JXo2piv5Kn6kdjqnt9osNce/0l93qyj/fFDe1w39+b/CFhpjZ2uDZ2uCztY7pbfYzOwImN9kmN9kW9oRdbo692Z70bn/BOwNFH45XfTK57uORNQ9Gqj4dX/tgav2Dia3vnSx9MFb9/lDJhxNrajOMEVJGkp6T7cPJMXOzTJwkFT1ZzUo38FK1vHhPZoSEEsQj+ZAx/izXBE9BikaUrOGmaN3tdIKRCGnwQOsEm1wIOme8EoV4otAKJyILIM4AYP7cyH9YUm93OAxDQMsgpHkwY0TkAArBl4hVYVECCDAA5AZQbhCWDDBiAIbzwp+fa/lqsevpVPPDxeNPV0afLg09Pj/4+PzgFysnn1w89cXFoc8uDH52YfDR5VMPlwaezrR+eGTNQknwcLJpMN06mBs4mB8wlBcyWhEzX5d3p3vrJ+OHPhhpuNG9+2rbzsWDVWc35kxUJ0xtiD6zNilW6I4FAGDQ/wlX/6XwzD/Wnw34f0AIA7QTwJLReApACBCRBYhs4MKH3KQQXQFoSrp3GF5qA2Q+ypXzNkILY9ActZNnIN7DihXqAM7lj5Jx+I/nQf/jb8UAoHZxTlKw0vWsYqM0R89N8mBGiRkRYnow08lGxq1C+DZCikCrlWueEBwN0BtJ9HY6e1ogvO4helcl+MQoeWlVf23xeKjlzvL4W1iEA3reSIimyyHqcHD6AkXHI5Wdkcrj8erOBPXRWGVzlLwlTnE8waMrTr5Rx/AiQHEWUUGQPErDQAMgQgE2GgYwVkYAex2Srkivw4HS5gBOa4SwN8WrL1nZGiVviZKczNENZBt2W/m77aIjMcpQIRkHAB1GMVCA5YSTkUkyposHk6nics1KZaDJHGYPSgiLy0zKKs4pqSxas6lq8/YNu3ZuqjvecGCgueTINp++gz4DDZbuPb6dtca+evPJRj8w1R7Tv9M8Wmdbbolb6Uy7fqL4Vn/52T2JMzsdN9syr7VnT+2J6Nvgc6xQ3pqn7C01dWR6HUlWNMYpDsSJ+8uMZ3cGTm+zXjwQsdKSuHg49uKx+Ln9IYv1EdfbMm91Fnw4uO6D0cp3TpS+e7LqRk/JjZ6Su4MVH4yt+Xiq+uFc7cNzdU8vNT6/cvTZStPzC83PLjY/On/o87N1H59e/8XZTS9W6q4PVOf48uJV7HQDJ9PAT/V2zzaJ8yyyLIM4VsGKlNIipTQ/Gs5CxTjYLsE8qpXu5EPGBHJc4hScTIMiRs5xsF0sVJzeCVGhgAYD+5JdNGQXAQqhQ8ANhSYi8NupYxDAA4BBABYBaADhANBScYkit3ChaziT5EfCecJABIAQQvEhhAMAD4BYCvbGntKvphsfTR97MtP+ZKnn0dLAF4uDDxd6Hi31fbHc/8Vy/+eLvZ/Ndz9a6n2yMvByoffDri1L1ZGnUg2n0m3DRZGn18Sd3ZiyXFtxq2XbewN7rndvu9yx+UZ7zY2mdSu1JWc2pp5ZnzZUHnm6PGQgJ9jMJCIAIP+hafB/b/0Dwr84mDAWYEgI1hWGCYgTHTizAYkLkYUQRQTIIpLchpM5EDIPcWUBCIMAACAUiu1BUNixMl+CUAvwrhBYPcTe3nP1pH3bfgWAGI2EC12TVPR8jSBdw4qX0sIFbmFCt1A20UbGCbDI29cBBAC7SgK5AAAgAElEQVQCwRBgAWCBUBlYp61urBY3fq+76JRIPCkTnZfJrotFNzwEt03Sj80eMx7iNXjCdk/+UKz3QAi3N1TUYpXUW0SHA+UtYfKj4bKWSI/mUMUOk7BKzlDh8ZnBPvkhHrUZPiGebgQAS4jAHYEAjJa7EvY7xA0Wdr1N2BoibA0TdUYr+pO9jico+9PU48WW1njlFgNnh0W8L1CmJuPxALBRGA4Bw6W4alkMvYhtksltGk2IxS/CHhhmDwq3h0YHRiaEx6THJOWnZa8pqNi2ZnNHfc2xXQEH16rba3XHdurad/i0bNO17dD17jODpp3mPWXSI5XK8frAlRMZNyfLPzq35VJn7vnWzEfzux8vHbw1vHblePZUQ/ipnb4j2ywztX7n9oadqYs5syfu4pGM6x1ZV9pSbh3PvNFX+P5IxZP5bQ+nN94frf50auuT+X2vLh97trz/ydK+51cPP73U/ORi0+dL+z87t+vzczs/X6h7vFL/5dXmp5eav1g49OX55udXWh5fanq0sO/Jws6vFmuenKs7WOiIVpJzLPw8kyDV2z1dx80yijL0ghwfSZZJkqhyD+AQbHSyzgmlwQMjGQoRksPEDD0Jp0RBngS0loSzssnhYnaogGajOVnJBDuVqMTDcgwkRkEiDJoDIzQA3ABgIDADQpExMAWLuKAxJATyoTkniugRUloUh+KgEnUYtBpC6dFYHQT8sCCeiT2RHfr49KGvzjR9Mtb4xXz/k/meB7NtH5/p/mz2+MO545/Ndn420/7ZdMvnUy2Pplu/mD726eDui7Xp02X2uerw5Z15S/Vrzh+ovHyw7GrjuksHKy8cKj9/sGRxT/7irtzlHTnnt2bNVEWPlkf35wX2JZvXqTlkAAAKYP4/hBBC/wkhhAJoJxjtDMMEBEuBnZmAyEVTRGiqAHGTOEv9XNSRaDIXEOkAxqIhAACMZcnxHlac3A/HV0G4VQjRf0K4elfwtjGCC4EwESVNyy7UilJVjAQ5I1zgFi6ixUkZAXQiD/0PSwQCECABIAdQKECXEFw2k922sRh7abRGGr2ZxTrKZPbS3WaFrJsGyeNI+ROL4ai7wA8GWSLy0TDtbj/JDq1ot1Zy0KKo9xFv03Ir1Jw4oZuXE4oOgMqNvWddXlGUNNnAVbLwfCcixxVFAQACsISIrbdxD5hojUGKgTjPrihFR5RnV5yiO87rZJZuME+/L5C/Ts3eqBdt0LO5aMQJRpgIzHXCupNddWymjs/USSQ2jdpf621RqQweSr1cYZTLLZ6eQXp9hM0/LSpua1lld31F4xZ5wzrV0a3ao9vN7bWG43t8WnZoW3d6g+3V2sZNPsP1wVcGsz++uPG98+sfXt5xb7L6/mzdd+/2vXr/xBdXj356Yfe9s2tuDqVd6Y29diLt6kDulf6qT+cbnl1pfzBf/+m5fY/PNzxebPxq5fCLi01PlvY+nNvxxVLdkwv1jy8eeDpX93Rh77fXj7243vLyRuvTiw2fn6v9YnbHk/maL5e3P16ufby454u52q8W9z67cODzhV2fzu95NLfti9m1C4czklT0PKssx8IqtsjyfPn5foIiuzjPV1BklxQ7ZMUOWbqBneDJ86M564hoLyzkhUEMLnitM0pHRCmdCSIECGDgRYB8KHgbw9mf4WIlE7ydYB0RrcYjcghIIUiKxohQKA4AHIBQwNtxSM4AaF0wkWxSgIAcQCPYyU5GLNYHjQkgYJNouH3+0mtb074+Vf/JmaYH4/s+nTryydyJBxMtD8+1fDR9/NPJ1k9OH/tkrPmTkabPxpo+H2n8ZHDf/e5dlw/kn98ef6028e7hsjtdO28P1N/uqbt8eM1sTdrM+oTp6ujJNZETlREzG+KmN8SdqowYLLL3ZNi6kn0brNINOrGaSwOo1eDh/239v7NH/xlCCAIAQgEUASAECMLDaBLixARO7rALHyK6A1c+7K4lKEIQVxbAUQBAowEAAMYwJXipL1bmi+EoIRxpNS+/WteG+msOEwUDADMACOa7pHqzcry4sVKXeBk9XESLkDJSvXiBDBLrH2lPCEIAYALEBLDJiHM1yW2Di+tWKm0bmbKdRqujU7u4nPt+hl+TA35M0P2WbnrHKj/qTo/A4pkIrMTgIgmEEGco1AUX4eZsc0Z7QUAOAykG8XRxNrqzAyUcmSva5o3i4NFEFJDhESoB7QwAHkAyIq41XN4ZKj0WreuOlB0LEjc7xMdCxe2R8v40dWeKYpsPo9rTfa1aVCynUADAIwgFABYWoTk5e1LJcjeilM5SMt3kTKqERlm9xGSilOKsZrnppZJou33vunWnjq5prZV01Vnbdvo0bbG07fIeOGQ9vsfYtdcEarbp2+r9ljsSny7uen675cndo1/cOvLwQtMni40vrrU/Xd7zcH7dZ8trP1ne+OFC9d2Z7PtL6+8tVb+3VP34bt3nN+s+vVD75ZX/i7X3jGqi4cJF97QkJCQBAgRCQgKhhd577733LiqISFOKIk1ApChYAFERFUVEFOxgV8TeO4K9YX3tXZjzA32/b51177n3nHVmzc9ZSWZl9uz2lEUPD9UMn2oaPbn49omGG0fLL/cmDQ9kDh8uurl9xpWu9OEd+Ze35t/eu/D+4aX3jzSO9i8c3ll0Z3/N9b2VwztmX+zNv7Er/962mdd7Cm9tL7u2Jetu15QL7VNzvCSR+opRZoIEO/VZdrwES26KnWq4kUKksUq0mShEnxdhohZpqp5soZ5kq+2nrWyrwJRQUDGBqWGYDiFlLiclwUAbMDWUqoBg0gCKVLoiylAGTJlKVaRQlQgpeQBlKkYHhAAa/p8HGmcBOKjIhXPlNaXAhEqzAJob0LM11es99HfO8b24MuP2xvmXttZd37H8Rkf9xc76iz2NV7Y0XN6+fHhL0+0tddc6a6521l3pqr/UWXtpQ8WFtrknV2Sdq0sdqs88sbL4XE/jhb5l5zZXnW4p2F2UsDHBrT3BaU2SXXeG5/Y0t21TnTcm2a5PsesItq7xVp9vJiixMVzsbdIY6qAlM4kFQ/9WbYBjCAKAopO+2X9+Pob82/JhBOD/4kknJ5A4iv2NWXRyIInBJMEXB4wGmBSNYAHOBKYi0BUJGhelKVG4EpauE1VeAwg2AI4ACqgUsJRZasYsTQtcXgxScv/R4UcRQFBAEUAnm04EBUQGwEmJE6XPjzTlhWorRhny/HVYwbqcAIGsM0dmMslPDqblEUIChBdKjQQsgy47HWfG0FjxdOk58krNSqKzxnr/JDk9dtU/YqK9R6LVJBbkK0sXcBRVgQYYAZQ/fT4NRVkAKhgiwjFtNltbQUGFyaRgABRg01AmBrpUworJwgDkAQUEDebLrgsyr3MSNrhoNzpoLnYSV1ryG9wFK3yFa6aY1IWYpRmK07UUigyUPQQcJgAbQdgIwgKQRVAFgsKlUrlUKh/HlRFEGce4CCYPCJcguFQqj07XlJO31dTNivFsLvVfU+LQtsC4rdpsSZF1Y6HR6grb1gqrtmpbKCt1KJ2ts7HW6czmtOGDC64dKD63fc7I/uqHJ1be2lt3fmv+UNf0c7tmXunPO7cj9Vxv7MWDaYd3Re7b7X9kIPLs4bShHWnndmdeOTTn2tDCm8eLLh8vOHc088Tu8ANbw/rWhvQ0uG6a79C/JORK9+yRfVWPji8fO906vKf8fn/51d68u/3lI11ZFzfkXWjPvLt5xrWt2ee2pJ/tSL/YNmX9HJ9oU5VkW+0oc7VYG63pVoJEC2GimShClxupxwsUc1y4Um7KTFs5mr8qK1xPOc5aM9REZM9nGjERYzriyJHWYqBqOKjjqBBDeSioUBAOgCzApHD1nwn9v/gTFAAFCqBKVNCTkXJTYbvxmaoEQxZAHcBPhV3mqtmf5ztUF3+xLffihtLTa0qvbaq82FV5q3PR9S01VzctvL6+8nxH1fn2BefXVV3cUH29a/G1zbXn28vOrJ53dlX+qZac00vTz64suLa5/kZf05XuutMtBXvmxXUkua4Ls9mQ6NI+1WXNVMe1iXZdKS7tUVaLPbRr7CQ1viYd04P3zs/cVZW5MSM0yUgNw/748mJ/XZgIggBkUij/b6QhCCB/lhmTujR/OjQEQ/9qBCPIfzIqiv5NjBgNEAoAQWUpAoUNNDmatBLgcsBSxdXMCAUNwKQRBEMAAKUgbB5NaESITBA5dZDiAOB/FOEQBPlrNYxhk3wplAFgqSATpKMcoCcXqq8coq/sL1EI0Jb3UmE5K8spEziK4giCUAGEKG6OYq4AgSjuixLuKO4L9Fi2dJGc1A4t/v1g68dRtn08+fkcfiVHrlJBsUSRnc/lqgJBBRwHAJw6+SaiIggNgAJ/HDsQDBAgKIAyUdCRplkyGUIKgiJAxXAKoElaKsvdNBv9tMocRZXOWuW2olo7zQU2omYf7Q1TTGp9Jan6oggeLVVfSVMOxwGIv/bJBAD1rxIsggIggKFAoJNuyUAHYBOYipSUFkfZx0qvOtd1ZZnV2irTVRXmTWX2K+abtJZbtpRbNJWawcC+Wb1bQk8MJJ7fN/3oxpij68IPrQ59eGDe2NmV948uvX1o4fUj828cL756eO7p7SnHN/rtaPNobzHp6DTu7rbZvzVo02LXLct9DvVN2b0yuqfWaX+b/+CO2EPbwg9ujd67NmLdXLP2LP1jbSm3D9Y/P7fm2fHGhwNVdw/W3D64eHRX9c2ugodbs651Zl3uSD+yOOB4a/KZzuwjqyL21YbO8REn2gnSPTSnumimOGtPteXNcDRMMFVLt9NLs5FE6ih5qbAsWbgZE9dlghkb81aVC9VSDhRzHLk0SwXcgke14bIs5BmGMjQtAgQAYhwRUzGRNCFHAI9CcAlC6u9fxQZQYYK5AsdHRdNHnRMuVkjUU7SUw6nAsESkypwN+3JCTtUnnVk+7WTTrEtrS66vqRhpr7q6ccHZDaVXO6qvbKi82l52va30zNqSU2vLTrUvPLd+0eWN1RfXlZ5qLTjTmnd+TeHZVfmDzRmnWvMud1ReWld5vqVwsHJad4p7W5BZa6DZynCrlji79TO8NqX7tEbbrwix6pzq11+Se2J19eDa8v1L8vqaCjsLw4ptdDBA4Y/IBRAY/kd+m8AnNYD/LU1RHPuvihD9nyLw7/n3MnQS240D4FSKNIFLAUoDggUEC3A2weACg4cJ9HFFDcAZGDa5SECBIQ/KOojInFCSgLTC5NQUA8AQdDJLoxjxh8dIEDiAibx0mL5KjBk/2VYcZ60RbiyKMhBG6PKcBBwuhlIApwFFDhBNFMwAnDDMCaeYAhhTMXegptKZ9XyFA5aSx8E2rwKtjuqpLRMIWpTV6lV4DVzZGTIs2X/3jCBNUCl/7hpBEQxF/u6hGIDxEEKHTtfFEQkFpyMAFAwQwpAJZeaCFba85e6qLX4aa4J1FrsK6uwE5Xb6jZ5abfGGJY6CSCVGmBI9RqLCpv2n+Mf+vs0JABqK0ikYS4rClWMLuQrqiopiBQWRnJyQLcNj0MTyXHsD3eqC8JYq+5Zyg5ZS85VlNk0lJk3Fpk2lFo1zTeH82bJDR1P7B2IP7IjpbfY40OK9f4X3ha0pd4/XPT7VNHyi4c75htHLK26farjeP/dAa2BLnn7nCoddvQE96927Fzu3FVj31IWf6C3cWBG0qcjxwIrQ831Z146U3ThUemNn4fn2tKEN6de3zXmwr/Txkbp7R5bePd708NiyO3vK7+wsv7Yx83bnzLPrZw6tTT25Mv5QQ9hgc+K5dTM2FUTEGwrjTdWTbEVTHXTTXc2y3Eyn2WlPm9QRtVWPNFD2ELFchBxTWZqePEtMQyQMTJ+FGzFxKxbNWYFtQAErGrgpsc1YhD4VMZGi62IUIYAqgWgRYEQlbFg0IxqiL0XYK3N91FWCNLmeImakvijMWBCsqeAlYLPYUkocbrW/+fnm7Etr88605gw2Z51ZPfd8e9nptVVnNtYOthed2VB1qb3uQlv1hXXl59tLTraXndtQf3ZT3YWO2gvrys+sLDi5Iufc6oKLa+edXJl/ZEX6iebcM80FQ/VZxxak7Mr0bw8zX+lruCLMakWY1fpk9w1TPJaGWbUmue+ryrjSUXe6s/bA+pJdC2f056f1Fk3vneU/11KET1Zuk9u9fwtLBFAqhgFQ/1J+/+Q3FAAFAkGxvxfDn9oVmXyG/tavk5UpiiEUfJIBjFIRggWYNEEwMaoMUDlSfF1CQQMoLGRyqIoiwFQAjgYuNMcUtUFKARAC/4t8wAAof1evKEYACjiAlbJsiFg+2Zg/xUwl0kQ1SE8lSk81SkfJXo6iioIcQmWhFEUADQQkAHoIpgFgAGCBghuVXcpQ2ivWuGkteelj9MxN95KV1kE98R4j1QMG4i0SUbwcGwcACqAUoP0LlEUxFKNObuQ5gHAB0aTgGjRcC0AIwMERDAAIXBpoESoyFWZatXYaZQ4qSzwEa0K1G7wk5ZYGC+zUVwZJWuOM8u3VAll4lDzDkytL+a8enEBQKoLREZyFUeUoNBGdKWbK6MpzTQRCOx1dL3NLDwtLJyNjEw1VfTWBhcRgSVnelpVJLQuM11barC6zbikzaSk1X1FsuXSeJVy9Wn/oeHZnb8Tqld5rq13Xl9luq3M7vSVt+GjZ4wvL711oGrnSfPd628jZNdf2VBxYEb1ncdD1/oKrgyVHe1L7m8LPrE4d2Vt778T6Kwfqz3UX3NxZcm+w+c6pNcNH6u8fXvTs1MonR2pvbcu5uy1rdGfhzZ0lt/cuvLe3YnRb3oWu2dc6Ui6tjTu5Mu7kmimDy6J2FTntLvPc0xid5aMfaaoRa6sZbcOPtRbMcDeMtxHPcpXkeBpkuOjMcNSKMeZ5i2U91Dj2XJYti2lIoegQmCqAGoZImHR9lrQGgelhmA4VVQHgoaBOY6hjNDUUtAgwl8bd+ExfIStSWyFSmxttJIjQ54VpKsRoceLMeGEGokAdBQuOLKGuG2JpdL4+7tzq2RfXzL22tvTiyvmnVhScbSu5vLnmbEfluc0V5zfUnF698FTrgjNrik+vm39m3YKTa6vOblh0Yf3C82uLTzbnDi7NONOad6o172DjrKON6aeacoeWZB+rTN2TH75xqvP6RMeOJNd1qT6dM/x7MoI3TPHcODPoSOOcsx0L97cU7VtSuHtRSt+soI1TvFpjLVYHGMXqiiaxMTiO/5V7Qik49c8zARjyh0o7mYBgErCC/W38EPgjaTFZNxII+u9AB0VRBFACKBgQKEJBUCqOSwNQMZSGEtKAMwlZIcpSBYSOATAoKAAAwcLkNaRUTaR4ukCRmcyEOCAYggOgGIIj2J/ECChQAHQYmLcSK4TPChfRow14gRJugJgTLlZw40ipA3AAZQJwAJRQXAFQRcDUATMD8ABIwpEqrvw+HY0TRuIzNjp7NTh7xHInnbSGE+yfx/qcCbbY566fzuNI/RFEpiIA6N99Lw4oGzBFQPmAKAAoYsBDQQ77g1RlATiyWOmarCoj3mJHnUp7nSpL4fpQwyZfzUZHtUYn1fYQ7WUhhtEaii5UzEeaqoEAAZR/ty84IBRApQCjIzgDcBkUlcFxWYKQo1CU2SxDDXUvJ/uIAN8wD1dvR1MvO6fVtY3Hti1aUWLaWmrSWmLZttBmdYX10nkWy4qs4ORQ7uHBabv6Y5YvsW+psq/L0uyosTuzI3V/V8j+LdEHd0zZtzP5+OG8y8crTnTNON4WebMv98Gx2huHF908WHFlW9b1npzR/kX3jq4ZOdZ4ZVvRjS2Fo3vq7+xf+vRQzf39C68da7uzu+LchozrmzPv7po7sqv05vaiG90Fl9fPPL0x/Xxr5N5K964il+0LQ7tL/HcVOh2q9K+J0IkykE80E0+31Y4z5aeY85IM5FLttRLtdCIt1KOttIIMBd4aiv4aSh7KLCsaWFFQYyZVwpDSJGiKACwAGQRUUFAEQg4QKgCNQgVAWSiqL0NE6CtFSfjhhso+WnLB+qrhhipRhnLRhooB6sohIr6XulyIOn+KmYopS0ZK1y7R0PByc86FjUvOtFacWTrvUlPxtbaKoeWFJ1uKTrYUnWivOrWq+HR76dm2kuOtxUfbys+0lZ1ZO//MmuITLYXHlucebcg8vizz5Mo5x5tn761NPd4489Sy3ON1s45Wz9hXGtc7N3xvefLAwhn9ZamHq9L3l0zdNidyYGHq0aWz9yxM21k2bXdOwuZol3ZP2zo/22oPyRxNJTWcArjUZAuHEDSCzpKSlp2clFBQDPvjHUMFnMAApfzpHdE/JPd/a9T/OpD/VI8oilAAJttCHMGlAKgYxgAgAKUAKgVSCiDNB6oMhlMAAFACUAYweYScmJBTBwqbIKh/xd5wgs4EBAcUKOgfiCqGg4hFdxbyLGWlAsScaF1epJGql46ii1DBXl6OB8DGUSb+h8lEAYocIBKUMAfUV4qdR2eVyituUBT0qAm3yCpuNdK9Gun5Kc3//dyIRxkh90IsLzmI9uhpztRQpxMAFCYASDHoBJUyedcEgSEAVArKZMnhKAYYUAHYDGkEwFwKm2mpkylRXGChUmrPT9ViLLBUaw81XR0gXu2ivNBZ3BqguczH2EWeZUijamEgQ/kLEPxPqf+fY/LVhgFwGDR1JUVTDTVXM2N/W+sAR7sQD5sQV7va/Kydq/KX5BstnafXUmq5usJ6ZZnV4nyT5fOtYPBoysGBqE1rXRtLLRvmWdfk6HY2uvW1BdfM01labtFS51gxX690rmH1XJsluaZ9SzzPrU+9sCnnUnf+ze3zrm3JGloZf7It9XL33Aub5pxbPXNfqd+e8sAzrWn3unMubym5cmlw+P61a/saRjunj/TNfXDzwP2H1y7sWX6gzONQY+D2Irtti1Nvn9p35fSRy0e27akO7y1y7O5YfuTEof5DAwcPHzp8fPDgwZ1L64pPnTlx6viRw/v3Hezfc2Ho+ILsDD0WxZZNcWCAj672jh1bug/s6dm9b+v2XUWlJSEO9k40lg6dLiRwDo1SuKBi474DOw7snzc9NlCNFamp6MOXWl6cPTR4Yvv61iQrVX+BVEF42L4TB3b09USa6EVJ2HwAFZfAVUtX3H98Y/TZ2Oi94QtHe4+tLTuxInNwTfGtswM379+5eKT/xOqqo00zT68vGz6zf+T2pXPdLUPLM0+uyDlcP+NgXfqRZTmDzXlDKwuONeX21884tnTW0YbMY43ZxxqzDi9JP7I8+8TKomMtpYMtJYdqcvaXTN2WHdY7J6J3TkRXqu/6WOdmX1F1tHNv98YrTx/ffPqgu69HRVMwmdEcPb3bu3tO3Rw+dXN4cUsrkyWHAFDp7BXt6zft2bOxr09bRx8DFAC1cXPt7j/QtWvf1r3713X3JKXNRKQYgFNb2tp29vc7uLj+maNiRGlldc++Axt27N68Z+/2gUOOHgFl1Yt79vZv3Llr467+jt0HmzfvS8sv7dq1r2vXno0792zYdaC7fzAsKQOoiiiFjfxdzWsaGHds37mxd5esgjwCKI5SPYJD23t7r94ZPXfm7NpVrQFO5gGaKj5C2TkpoWeGDna2rJEFCgIgVOV37dqzftc+LQ1tPoA+wGy/wJO7Bg4eObm1bslyFWEbn71NXXiuc8XD64OPt6x9E2f/KsDwgbfFxW1rbg0eP5ickCSDmenptPX03nz4+My165U19UwOBzDUOzKyb/DY5cfvB06cjpmWKGQwmQhBSNEa5hVcOT1wbeTZ1Qtnt7cuLHDSLRAyqp219qyqOn/m+IHNaxri7aqdtcyZlAW5uUcGBgJjo+Gv7isKyL+AIwDAMISOAl9OxlRb083cxNXY0F5bw0lb01lL015Xy8lQO9hZUjTdtrnIbWm+6Yr5Ji0VNs0lVkvnmi4pMG4ps4FNawI3tnhVZuktyXWZFaSd5K5QPN1oVoQw2oOXEqQ9NVQ7JkAlMUQj3lscbSWf5cVvSjZsn2nbkeXYnGS8rdBjf3XQwZqgvmK3nTWxPWWBGzLNeoqcdi7yG1oRfbx74ei77xe/kw+Hj19YM/VMd8mtl2M3fpLXrw51znbYmu3WnGJxfKDr0Y/xy5/IR5++7Fw+Z7634MjZi48nyPs/J+59Ih99J++8frd13667X36PfJm4952894V8+ZssLl/ApWFuYiUPHj3YxunF9+93fo2Pfpi4/5l8RJIP3r+anzrdmQ7WNHDTUXs89urRb/LlOLmnuytEkx9twAvQlt+3s/ceSd7/9DkzxM5BDnas3/CQ/P7uC5kTEmQtD2Iud/3JS29/kSMfyOvP3l3/8Ov+t9+3r5w60lR8qLHo4b3hqz/Ie29/Xu3bOLgs/ciasuHnz2//Jvdv3XiqIePE4umHa6cdX5p9tq3kdFvxseb8Q8uyDzbOOrQ0c6B+5pFlOQNLZu6pTT3SMufk2sqh9tr96yv2LZ6zKy9hXbjD6gCzZl+DBhdxo7P6Ajvlg13rn42Pn71wc+jwxZsv3+uYmjMAD4mKevbhwxuSvPHPu9vvPrz49pOvoYUgmL2H76vfE/e/fX4zMTErNw9FKICiwUnxb0ly5J8vN8bevvhBvifJ6bPnApVx6c69ryQZHBMNKDaJdNl95Nhrkhz++OnWm1fDr954R8T1nzzzliQff//6+NvPl+PkhScfatdufkuST7/9evRj/NkP8h+SzJpfCZgMlS6L/O0rLV3c3v4m77//zBOJMKAWFJS/+kU+JcnTT8ZuvHk/RpLDj+9k+LrZsfHyopnvyN+nL91i0mUBBX0D0yc/yQe/SUtTEzMUXGjIznVrn5Hk04+/Hrx63G5lvUlZ7pCG8cjps7fHJ259//GwpeSVp+hZuNXI6IO7P8mr86ft11c5fW34MUl2HhkcvHrr5MUrOFXawNRy7OP3B/98Wbvj6PCb12tblwsRRJFgrGzf/HqCvDH+7ey958Pffj8kyWunT5Ta6M7Sl2ntWtIAACAASURBVN2/a90Dkrw7QR7b3ljmJNahwKaNG76TZO7CahyA/seQB+jwZwBLQ1E2nWqro+NiZORkbGBvoGulIzbTEBqJlNXkGHw6RSBFj/bQWFJkuDhHa0m20ZJ8o5Yq25YS2yV5JsuKzFdX2UHNDJs5IeJUF25plHFxuEmKjXKsiUKsmWKEASdQRzbYQDneXnOKq2acrXKCjXKEvkyyuXKms1p9gs2KFJslsXorU4w3zbJZn262u9xrZ4H9nhL7gRrfveX+u0u993ctGP305d4/E3fH3h6q9j24fuHoF3L005dLI88XRFoWBKrkeaucHLl3+cmbno0bnn0d7+lqd2GAk7Yg1N1l6PbzJ7/JtDnZ+kY65poia33L1Ru3Ppv41bWr18fC3FdfPUBT2U8or4FBkJ7w5rs3w6++pgWGT3Ox27t1y1OSHHz63FUo0ALIzSp8R5IbN68bunjr3rOPye6WkebKMXqqxy9fuf31x6OvZN380jht2WPX74z+IO9//V5eMMucgPr6FWMkeenq8KlVxUMri052Nw0/f3f/E3nuwNb9DVNu3b177y154x05/OzLsXWLDyybc+vx4+HP3w/1rByom9G/NPdgy7zBtRUn2quOtxYfWpJ9sHragYqEPQsiB0ojDxRH7SuN669NO9oyd2h1xWBz+UBzxsHKlN4pXi0u+oudNGsc1WrtVett+bUukst3r439IssTk6YheAFPWwYwNps9eOfR699kx7ZeVW0NBVXl9OxMoUgDgKhc2/76J1m8sO722NjAmTMgRQcEDYmKGiN/bh84wKLJFyxY+I0kdxw7SpWWG7xw8xk5ERQThwNKBQQQ6Nq79y1JJmQVUKlSTFl5jMLQ0TR0cPa68ejl0y/jcVNzDPUsVbStdA1N2rf1fSDJlq4+QyMzntgU2CpA5wBCTAoSmzraP/z04+KTf2S5HHML26dfxp99nZiWla1AENGWFnsPbh8jP/eeveLMY9bPzno6QR4+cwGAigCqqaE7/ObLvXefQnQNfAFJEGmOPnt6+vLIrtZVj36Tu/OKt8rJnjDSHB26cPsLee+fr5defHtTlPw+zmF0+PrwZ3KkqvB6uMvd7+TVp69UtXSkKfIy8lwAfHrWnIkfX7uP9ANbWprKNOSpKAI+c3r6fZK8NfbPstkJqXqCxTHuw8PDT0iyr3Nzmjxs61z36Ad59T354POPlSWzTIDSsG7le/J7dn495Y/pFY7jOI4hGAANgCfNMFRVtRQLDFUUdLmyGrIMEZMqoOPKFOBJoSo0REuG4yxRK51hU19gtijTeFme/Yq5FkvnmS2fb7F0ntmqCns4vnpK3VT9hukm6/PcGpLMKsIk5cE69YlWLVOtl6fYVseYzvFRy/MTNEwz75rr2zLddukUs7VZzpsKPDbP9WqebtWQYLo63bllukN7lmdntsv2Qu9VMx3b0pwqArV6Vi148HXiyv2x2/98XlUcf3jHlhuvf1159ur2i4+ZgSbhQtnqaXH3f0/sP7ozz9fx+dtPx65f9hYp2imynJSlL9x6OPaDLEgOs1WkuKtyDBFY0rD8LTmxectGM0WWr7piqA7fh69oQAN/I/OrH3/df/97uoe1vzIkuplefvDg8TgZ5+enh8Ku/oOPf5AZgZ5b1615NTHeNC81TEjNcTa9/fjp1edjo28+7dyxN8vf9eGnn2eujT77TrY117tw8JNnLj+aIPNy5zbHOJxtyjtQm372+L7R7+Stu9f2Lc24duvO3Te/b10/d/cjefPG5f7W+cOPHo5+mDi+Zfn++vTjrUVDa0pOtpUeayrcW5PeWxLfNz9y9/zIHXPDevOCds+NPLQo7WBD5r7GnIHGOYcbCwdK4npSvdq8DRstBEvsxNXOWoucJI02ujEq/L093S/GyYcvPx7ZO7A6MTUSl/N1sR359uvO63ciNU0UkL/uhCiLo3jm3uPRp6+FYv1dh4+//PzVxNIWAA+JiH5BTnQPHKTTFefXNX7+Ta7b3kvQZY5cvPaCJP0jo3BAJonC3f39r8fJrfuP1axYuXBFE1eoBhhFWoF37sHj5z/GbVy9MGAATQkwSk3Lqg8kubClHUEpQFXEZPlAsBHAMQAUR8ycnB59/HH12XsZeU7Jwpr3JNnRtxdwoCOgi0J6iNf99x/vfhzP8Laoz5n++Ad57emL1q7eFRs6Vm8/eOfd+JWXb90Nje0Rom5W1vPxT3sa1iz28r/zkzw7eGg/n3PeSmVk6NSVnz9uX7s8/Gt85OLQ27TA29duXfhF3pqbdSvU887jR48myKFHYy3r2l09PQgMd/DxejROPvlO9l++XFe/1FpXF1Ckc3//W5LsbG4t0Wfn6SjNFzF6qvMefP9yZfTRfBvlng3r7/38fuTY4WfPX4++ehaga1y1ctkXksyaV0YBHMOwyd4PB2ATOI/N1FJSMBIJdLmyk6c6W4rPwHlSKJcCyjREoixlKeYneDqvKJneXBZQk2u4KFuyJM+kodCsqcRqVaVtc5k5XN6Q2Vvu35nvvqXAY2m8weIovWXxpvWR+g3RkoYYgxIftTnuvIowzbp4vWVTzJYnmS+JN1kYLpnjzsv3Fma68KfYKCZacCMN5VMdNbJdBHO9tHLdJDNtlCMk0ts6Wu//Itesbb388tWOXX03hp909u7defDw819kRqyzDQs2d254Qo4vWpDhy2cfPnXiNvkxPzMyQFdxlpvBhYeP7v4iG/NnhGrKeKmz9QloXrb05Y/vfb3d3mpyIWpMV0WGkxzTgo4l2ztefffz5usfs8K9w3RofuYaV0bvvfhBJoREuErUH/wiB0cfhmvKlk8PHvnxa8fRoUAhURznP/rte//5wY7tXZdfvN3Su+36mw8bli1/9pXs27nNV0S/cefuI5IM8Q+bZyU4syb3wJLU4zvW3/lCXh95eHR5/tWRB9d+kWd6m09dvvDk+/jpE/3XRh+OvP51ftvKQw2zhlbNO940Z399+u4Fib1FEdsLw3YURe4uidmdF9E3O2xHYczuipS9dTMGlmQcqs84smjGzhne6/2NGyxVFxnzl1hqLtBVm85X8JClGADFTlahYUXjoZsjt0jyMflt9dyCIn//RyR5avQ+U1qOgVIBARzFMEB9I8Nfk2Rn3wAgUjMLSz6QZFn1YkAooVFxj3/+vv3q/fV7Y3c/f+8/MqSub4hSmUeu3hwb/xUcGzf5PCEEvnnPnhffft5782nsO/n88zcDE1MAVF4ovvjs5aMvX509PVFECqR5gKCNq9s+TZA1LesAUITBBYosQZOlINRJJwkjG7unX8YvPXzD4SotWt70niSXtLYBDhgGBnRKkqnRrRefH30h86Jdl86fef/DtztvPl4fe3/jxcubjz/eezd+9cN7HRN9OkDf7n2vyYnG4ClNNMa1y8N3vn+8EOZ7z0E8OnTu2o+JZ3t7ng7tvUySz/fsfnTp2u1fP0Zqs64Z8E6EeZ3u3Tn8/OUYOfHk609Hf386gF9g2NZDh658/fblB3nl5lWBumb3wYMvyfEVubMXmTKKXflFQrQ9N/bRb/L6k4/zzJT7N2x6RH7t39x0qHXxPZLc0LljxcaNb36SOWVFk0NgKQTYGKZEl1LnyGgqckSy0srSFB4N1+SwJVyOgEHl4MClYWJ5tom6wN5Q7G6uHWBnkuhtl5dosbjItC5PUpdt3VBotqLYckO989pFdlAaajA/QDLHTVgValLmqzvPXaMy0DDblpftrD7VQiVaTz5CjxNjwo02kU8w48UYcSO1OWFaskGa7Ggj5QgjXpiRsrcmO9hYJdxEJcVeKdZEIcqQF2XM8dLhHDgwcJ8k81ICt+7pGf3n94sfZF5a4pqWpS9IckF+WpBE/vTwg+GvE6dv3N198NSFh2OPvk90r98YJpZOdzQ4d/f+Y5LMiIg2pmK6dJAFal1d3WuS3LZ9ixefkajP8VBl23OYDiw81trozj/vHo69neVn7aEK82cmP3z3+dHHH356+rWVhfd+/Lz65suh44ePnDo7/I689vpdhodpQ27G2AS5e0dP+dSERx9/P/jw68jxU3mRfg+/kgcuXHFXZezZtfcpSS5rbvcVsg4tiNjblH/l2umR7+T1K+cPlkcP37kx/O3H8e3Ne1uLbj54+ODT7ytjX+6+mzje2birInFHZcqO8vi+eWF9+QF9ef59+QHb84O3FYTunB22Iz9i5/yYneVJexdOOVCVfKAoaleG37pg03o79Qp9QaG6SpySnAUFzBHwAMILKDEcVRtgCIGYPb/oCUke3X+4RMvy/tg/j3/+DkmeOkmcFaiqSzNlV2ze9ODXxPm7T3oGjg1cvPL45+/BqzeAoHlHxb78Te6/eOP08ONH42RAeCygOIXBPnJr+DVJOvoHIRQpQDFA8S0DA69+k2lzy2jyIgWBiIqhFMA5PPXzD16MfSedXL1QRAoYygBoU/v6T+MTi1dtQBAMCDmcoQBARYFAAAUM07W2e/Tx57Wn79kcueSZGW9+TZy5PUJXUgIMFKl4fXbWg9/k1ftPgy2FpQVTXpHkoXM3ZZU16DIyFi4u1968HX37TqyuzdOUjDx+9+DTz0tDFwdPHLz+/POtr+TlNUueeYgfXhq6/Z180df2bU7s8JPR0Tfk7ccvrv4g7zVkXw/QOeHksIXDzRCprN686SNJFtc3ABDKirIAoK5hcvLWw1c/f9oFBZYtb3hDkvsPHphrL5qvz5olYB3YsnmEJA8PXZgppB1Yve45+WtoYFujl/Dw0V33Jsgzt+8/+/lrdmkRYBQ6gcpQCAWCUMIxPhVXoeFyGEgDyKKgQEGU6YQqm67FldNW4og4TIEMXQ7HlOiIuizVSkOQEWW/pMi5ZIZ2TbZN3RzjJQXGqyqtV1aYQaQp31ud4S2UitDjRErkkk15GQ6aM+zF0aYCPw0FT5GCh5qChxrHRcB0E7Kd+TL2StJOKmwHZaaLgO2hoeCjw3UWSntoyAbpcsONZYIkcq58tquQ4aKneuX2vetfJqJs1KrmzhojyavPxyJsxE11pU9Icl3LqpLZ8Q++kTcevRw8dfrs1evHhk6++EAO33sfb63uq8M/NfrwMUkmBUYKAFehoSyE0bii6QVJbuvtCdRRSDZX9tFR8BAqunAoES62I5++3R77vG3btq5tm0dffHjxm9zY3eWkxDl2+cLzH+PHTw4NXb8wePLC6MiLeyRZW5XbvKj6GUl2rlk+w0zv5t3Hz0hy7fKlcXYaV1/8vPzsvZ+2SlJw2INPH5/8JLd2dRzZsvbk1asj38bvvn4/0NG8tzLx8sjdmz/Io7s6dpeGH+1ac/f5+2ufyBufyf61VQMV8T1FMdvnhffm+W/Pce/Jct2a7dWV7duZE9g7O3hLjt/WvMDewuDuDM/2CPMmN81ltqp15oJiLeU4RbYEA3kAbcC8KNLBCDWGw7lw/cLh7l2FASFrWle8+UVuat9iStD2ru5+T5Jnx55VLGsqq2nce+yUhbP7xQeP7n//sW3/0cNnLvUdP3H56bPnX75bunjY+/v/M042b+mNnJb5jCRv3LmnIhJjVPrR6zeefB/v2n+4YdXaxta1yho6G3f1v/hFrt3Rn1dSXVW72FBXQgWEwxVdePjy6VfSwSMYgIqy+ADoslVt38fJxlUdCKBAUwAKA6MwAHAvP/8Va9srli9/9u3XlUcvpVlMlrzc6evX35DkzmMnp87MKaute/Lm5WtyfHVDg408WlmeOUaSB09fB6BSMFAXq9769OHBmy/qfJ2kvPxP4+SJW3cHBofODp25eeHi4y/k7Wu3RiJdhq+evv55/Mme9T9mh75tyHr07MPtd+TNj+TTdY1ji7NvjX0YWrW0LjRs58FDL0kyIil5WsL06w/vhE1JCQtLuHn/7cjEb2U1sZlE++6bl29+kvsP97UUZe/etmn06/ijn98W56dFyELP+rY7JLmrt3OVj1JDsv2Ve08efZn4hyRz5pcAAkwCY6GoDAAXRYR0qlhGWk1GSiBDE8owRLLSqmw6n0nj0jA2CnIEqLBoOjyula5GtI9n2aysbSubdrdX1uY5VGZq1OWbNpXbrF5kt7LKCswUcSMZsFcmAiSccENutDE3XF9uqr1wqqM4zEDRRywTJFGMNlXx1WS4CSi+GuwAQ7lgEwUHAcWWR/hqywcb8IINeJ5q7EAdBT9NmSBdbog+31NdLj3Y5/XLN8Njb6Ks1PNjfZ59/jZ48WSQgdySBblvyF8nBg7tPdLzaZzsblscbcGOlUhFmKsNXrrwgiRnxgZo0ODsvfsvJ8i50xKU6VQGDup06Ona9P73z729W8IN+GGGHC8djptAzloa4t2c7r95++wT+fgH+ZgkR19+7NncEaCvXJgQ/OzrxOjD5yluRqFGnCAt+ZXlcx+R40ev7j9wYMcY+XPN8gUhItn+gR3Pfn7KnRLqpSN9/fbDf36MZ7g78ACPiIs68ezdGEmOfSMf/iCHnzw73bNu36I5++ozbtwbfvD99+ne1l3lSbsqMq4N9Nx7/3Xk0/ej7WU7C4N2FsduLwzpzvbqSnfeMtNla453T37Q1vywLTl+nVle3Tke22e5b4q2bHLWqDcTLDIWlIiU/aQxMYAqICYY0x6j++G0MBSZI9Y/de7sCDnxnPz1/Meni8M3PMzM9AHC+ZI9nVtejH9/TZJfSPLiyMPsBZUffpO7Dh+VorMBCMCptSuaf46TtXUNQeFRX0hy56FjgDM37N33fWJi/eZNTJbMyes3nn79+c84+e7nxMdfpJ65zYZtO95NkC9+TnwhyU/jvwNDQzAAXV3d+2/evvhB2nuGohgNMDZBEK1r13//TS5pWUfFcEBZQNAAIQDwwvmlnyfIjyT5+tevwoXVkxBWkZbGtiNHPv4mP/8i35Lk/X/etiyuDBKLQkRyDRWz3//+eeLcFQpVChAw0Td+9PnXvXe/jM3stw0efTv+O37GNBFgJQzOPieb0dHLo+MTj+cX3D87dJn8Mra/45+alJcLAsd2Ng9//HTj++cnO9Y+7aoZefvhBvnz8QT56OfXtt4dbGlOSeG8J79+fSQn3pG/n/wkc8sqCAAjOj7LP2Tw0v035O8nJPmI/Hbr2eMti/JKrVQSuIztHe0PyR8XDnatjzat8ZBdnhk3/OLFP7/IgrJqDP2DF6UDyKEoj0bh02lKUrgynRAwpJTpVB6DJpaXlfC4hkK+rZ6Ou6VZuKdnrL9/elx0QVrKknlzNzUsWFURWZWlXl9o2lRu17zAdnW1A1jx6JaKVDcRM9FGa4aTJMaEG6bPznDXTLBUCDeQiTFSnG6nPttTMsdbK9dTY6aTMM2Fn+2jme4qTrTkJ5irhko4USa8CCOlYC1WtKkgylRpur0oRl8h0UYrL8FveoR3pLFyhKlierz/VB/bEF1Gsrd+eVZsYbzX/OSosmkJswPNp1rJpxgre4q4tvp6YX4+iS4OwTqqsYHBSQE+ARIVBoACBlG6ChlB7hkJwTMDXZNM1KJMlfz0FL2EHHtZepiBqCIztn5mTOnUwNxkzxx/yxRrUbwuO8HZMGdKfF5MYLyRUpKxaqKZKNNDry47tCorpjo1ZkFOcq6f9XQTfnqgQ35sUJi+Sqih0uyo4Nwp4fHG2mKMRqCg5R0elrewY2nD0KbGPcsLBxunHVo8bX913IFlc0511PU3ZG0rn9pXEr+vImFX26LutsW95Unbcvy2zg7YnOWzMd1tY7rb1hzf3oKQ3rnh3Xmhm3P8t+T6bp3l1pVktc5ff7mddrGuMFVFwRwDcwAbAGcg/DF6JBDJODGNQSRT2OmyanXhUzbMLe1InjlFQc0LcEcEfBDCnSrtY2UxJSstNilFYmIm1NPz8vbX0NXFAKUiBAAqz+N5enpbmlspKfHsPZzNLaxwwGUFKvbOTq5+nrJsGQNTC3t3L3t3TysnF2dPT5o0U9/YxNbJ1dbdw9bZ3s7LQ5bL1eDz0uNC5+WmtrU2c+VVEJQKDC4CoCnR9/D01tAzIxAUMDbgNBSjIUAgKG7r7DwtO8MrOAAQwGAS3IMCgTu6eE6fmRWXNt3b2tpGnuGjQA8VyyY46pelJvk6OSAEDgjg0mxLFy9rF09leSVbOwcPdx8Kk2KIQL60oE9TfTg9cqS6+Mns8Ffz0p+0Vb9sK/+0OP1TScy3BQmfVta972z4sKbqVUXCo+q8x+3Nj7razlUUWLHoVEBQhGpk6BiXPjMlM83S0hlwgo+jnvIMEwpYy4sacqZ3L6hdPjO52N2iylq02E4wXSRb6OlamRTWmuXdHmO7NECUa6mYEujm6eQpFhtMzsImAUkUABoAE0AWBSUKzqfTBAwpEUtaV0nRSCQw01Cz0tE0FYssNHQNhEJ9IddITd5ai5fgbVGT61WTa7B4rklDkcXiQvMVpXZgq8S2kKG6qbD91GS9BfRoPfmpVqqznDVjLJWSbEXJVmpTrIS5HrrZruJZTqICH/1Me9XpZkoz7dSmWQrTbMVRBvIxRopJ1irZXuIsH8M5wboLY3TrY8yLfDWm2rDTXATloSbzAsXTHHm5VmpV4cb5wVoLfLQqojSKA8TFAdyqQFGShaaOoqISgLU8HmbGC9ITGjBQVQLxEnP4FABMSkGaGmsnCRWz7ZUgUqKYbauT7qwbYqjkrEj3FChHGClFWfMj1dhxhioRJtwECSfJQhhgLPLiSzvxqDHGvGnmokQT1SQb9TRH9TiJTJaF2nQz/jRL1Rkm/GQrlWA9mQgBK0JLPlSbGyyg+4mlfJTopkx5CgDTwFbJzNNBg7V7buT+2tl7Fs3oay7dXTOjb17YlpK4vpLo7QsSe0sj+wp8dhb498wJ3poX2jsnpCvbd3OWT2emd2em95bZ/tsLw7bPC+8pCO/Ji9iY4dmWYN7so7nUVlimrxrLYVsC6IOUBdD8cPoUmnSxgtIigWCJmrBOVWWRPHeqjHQSBc0ASKUSs5gKaYScP4XmBzCVwrIhqAgCGIb8K44zSVrCJ5H8/1r4IgAYYACMSULFpNE2AIr+txvZH/gHhiF/iFIoCoCbqgrKk4JdRMwgcwkfowAQQFekEhRACUAwQKQIBAWUhaBUBPBJl11AJ22FAQGgAfUPWwpD/qWr2BM0LxWZQDVWqKFigrFyjEhBQieQSZnJSdXuSWw5gtKBQUcougDJMrLrtbi33VRGg/RfxBiNJdm8qg3/Xj3tc1bEp9K4D7Wpn1tmv19b8nlpwbOG6KcZ/rdTve9Ot3sT7zrkZxnKYwLxh/AFCGAIRR7AFiWCKODEAFsGMVuHkSaRS1fHF1jI1nrql3nqzLLgJimzU5Sg2offGWtWF6ib7sBLVucoAIKB1B/gLIJhCEogIIVhbAyTRRAOgsgCyKOgTCWETIZYlq2rpCjhcVWkpeQpwGcROioKTsYGPpZGUwMslhS41uZKavL0GudbLiu2W17iCEayUsZsipWClIearLuQ6aUu4y2W8RbLeKpL+2iyo8358VaCBEvlJHP5NDulTCeVigi9ykj9JYnmlaGSylBJ01TbVTOc1uV4dhe77Kj03rMw4OSKxP6qoJUpxqummrenWnVku3bOdusu8NqQ7bg+y6FjtuuWud5dhT5rZjh05XnlBhrzmFQFKjXcWCPDURJpqs6VlhFTIURH3kfCk0ERKoCXrnqCnry9MsdWkR5jrpZgpZ5ioxmhq+yjykixVs9wkSSYq4boyE0KQIUZKUea8sOMlH3UZZNstGLNhZEGygnmqtPsNBNMhVMsxan2WtPtNDNc9KZYqSUYC2INePGGqilm4kgDFT8t+QAtro8y016OIgNA44sFfnGq2pYrpngeqo3fsShtT0XC7orY3oK4PcUxfUWhvYXB2+cEbMn06Ehz2pzh1jXLtSPNoSPZYcsMj63ZAZ3ZAR2Zft15oT35IR0zvbZNdW6JM1rsI6w141fqa06TU/QCwgrAFPAQlKjiyndqqPZJVHcbqG03Em01E66TSOoF/Dls2ZkMdqaM0myOSiZLPo0hE0WRTqLLRtBYKgBAoQBQKYD/XyDc/z0oAAA4AMHEiSg3+7LUpDh/HxpCQ4ACGA2hSANKAAAKCAIEYNL/i4/CJoFof1Wo6AAWLClXDsOJywiVcBMMuLFGQnX6XyYnOklqBOSv5QYLwAyQBBa1Q0f5gqPWnVCLJ6me7ytj39fGv54f9jY36GN54vdlOV/bit615D2vSX1aHPO0IOThjOAHWcEPswOeZweNpgVWG4q0AACAg4IYAQsEC5GVS1ETRCmx3XHIMVTPt1GbpaMw31hQ7ahZ66udY82doiE3VaCyKtS0Jdqsyl+Saa4800zViUelAwAijaI4huAUhKD8BdBPpkQ6gcjQCEUGVZVN1+cpWmuLLHWEhmpKFmIFZwMTVyMzR30dfxudpaWBy0ptF8+xrcs3rcs3XVHqsGFxADgKGS4ipp+OXIiBgq8mI1hPNs6Sn2QrSrZWLQg0nxdqMd1eNcNZVBSoVxtjtiLFtj3HaW2m/bpM+7UZ1pty7furAg7WBW+b79wz33egJmpfVVjPPO+WFNMlMZINGfZdua7t6VZb5rhsL/LYWepzYFFoX7FXR5Z9+0zrzVl2y9PcdWVAHoEgc0mUqSjSSNWUBTwM/PWF050NfCVKqhhIZKSCDTUCxXJ6UmAugwbpcuMsRCk2mmE63DBdpRlOetPsNIO1Of5idoQRL9lWM8lGI8FKPcxAyU9TLslGK95SLdFCLcFcNcFcNdlKbZqtxlQb8VQbcaqdzlRrzamW4jgDQbyharyhaqiEG6SjHCzhBarKeSizFDHAOTyee7iysWuYncnesoTtlQldlUlds0N35Id15QZ0ZLivTrZtiTRrCjJs9JU0+kqW+ElqvLRrArVWxJttmOW6McdjwyzXziyPzRlu66bYtngaLLPUWGKgNo+vMEWKFo5TfQm6LSCBOFGsptphrLXHQuuQyOfJswAAIABJREFUnc4hB90BR0mfnXqnkeZKHUGVkJuvKJMjI5vN5mSxFWaxuVl0xakUmXiGnBFKTIKyaSj+/yD/9H96TDI0AKNhAIpSiKa8tKo8ByYJdBj9v4MQAAdU6v9nECIIJgVgzqS5KEi78lhhukqJxspRxmqqUpTJ3Qb8ZV9NYtMxFHgouFMYCwQqB11MR6e5PiuP/Kc+5XNd8tt5wf+keX2cE/qtLOFTRcpYaeKTsqSnJfEv5se+L0t6VZ36uCzpaXni87lRr/OjXpZMOTIzNNdcaE1FbQGcAPxpVD8ZaRsq6APE6qkV2Wtm6HBn6ynPt+AvcBYVOYhStRXjVbiLfXWawg0rPNXnOYtn22uESxRVqABARQHB/6URAjAxRJaCy1MwAVVKKMVQl5LWZDINlBRsNNTsdNQtNVVNVJX0eUrqMixVaZpYFstJ0ltVY1tfaLpotlF1rmFdvvmyYgdIsFUNN5JLsORmumulO6unOgjTHNVnOGvNdODne2vP9tBId+AV+essijKqiTJsjDdZHG1cG667LN54c47L1ny33nluBxYF7ih16yn02rsgZEexf0eWfdsMy+58t32VgduLPDoy7XoKXHfM9zpcE3quOWnSuGJTjuPOuS4ZfqYsACcxN8VGHGGiEmooMpXGgnSVUl2MkuwlYYYqrspElCE/wlhkIo0Z0RE3ITtITyHGjJ9ioxmhz4s1EUYbqYToKbnypfy1OFEmqkmW6lOsNaZYq8eaqEQY8RKtxZHGKokWaokWavFmgqm2GslWagnmomQL9VgjfqQeL1Rb0VfIDlCX8xOw/NRkA8QKnnwZN3m6E4emigJKZSrbeCrZBfK0DZqnBw0UhXQWRvbOCduc7tAx1bklxLTcTjVHVyZbIpNvqDTPQlRsrVlspb3QTa3GU9wYqLMyUr89xnh9pFGLp7jKRHaWjmAqnxfNYodRpcJRmj9OdaBgjkDMlaVvd7M46G582Eln0Nv4kKf+fjdJr52oz1Jto5lgjYWw2Vy8UFM5T449S5qVIS2XRpNJYcimMRX9CSYX/rABKf8b8hb/X0E4KYaIUwBFiP9o0lERoAHKQAgWoFT4o+IEkwH5/x6E6P8UhKZMqpM8w00gF6KjmGjCDzEQcAnsv+vYSWI+AigBIELRIAp7qUg45Gp6b4rTWGHQh/lRH/MC/0n3/D0j8H2W/5e88NfZAY8zfF7mhb0uin1bnPh5Ydq7mqR/alKeVyQ/KU54WRz3fF700/lxIwWRfYkBbZ5WFUZq2WoKURyKmxRYYRAuVphjxJ+hKV9grlHmoF3uoF7hpDFDSzFCkV3tpdUWbbbIS1wVZJTnopVuqWYhz6BOpj4EGAjIoAiXwPh0Cp+B8xm4GJcSU+giKl1AlRIwGCIWS0VaiksjBFIMPR7Hy1J/elhIWoTfvHTrJaUGTQvM6wvMavNMFs02WTTbBOYF6MwP0i0LMSgPNSz2053np1vorZvrrl3gqZ7lzM/zVJ/nr7kgRK8qTHdJrNHKFMumZOuGGJOVyVbbC/26ct06Zjkcro25tHpGV77zvqqgwaUJB2oiuua6b5zj2pHn2pZl3zbDuS3dcXWa/YZct47Z7suSLRoTzRoSzOsT9G1VpbTZzGhzrQgJK8ZCxVHACtIQpDloJ9tqx1tppDnqTDFTiTfiuavKatMwJxV2uJEgwkgpwVx1mp12rLEo1kw9QFveXch2F0iH6ivHmgvjTFWjjZQTzATxpvxUB+2ZLgYpNppJlupRhrxQiUK0kXKMMS/OVJRoIQ7X5fkI2e48uieP6SeU8+az3Xl0H4GcG5flokB3VWToMygUhGBrGSo5+1ONbDwMtXameu3J8OvO8OxKs1vprTtXnz9TwJyiQJuqLDNFVTGCJ+/OkbZmUnQxij6FMGUSdgp0Vx7LV4XjIce2p1DUUFDEwBAgjMqIpsh5YbgXFQoUeR26/KFox8EQsyNekuOh5gO+Rv1uujsdxfvsNXY5a253197sprXJRXejq+lyE908rlwam5XAZkyhScej0toAOAUB9P+KCtt/ByIKCI5g6CRdChAcUKnJIEQpbMBo/wlC5H/1vX+CcFJiGMGoAAZ0ioMCw5UvG6LNnWKl5iPhMVH4k1bRv1pPKAqAYgACgACEUclTPGCqMeKj/zLR4eN0r49pnh8yvH9nh33MCfyYE/hmpvfbTN8PeeFv8iNeFMa8W5D6vjT2U8W0N+Wp7+uzXy+eNVIcO5wfMTon8t68mNG5MfeLk4aLkk9mRuxJ8Gl1M1pmK5lnqJIiYM7U4821EpdYqS5y0s7U5YVxmcUuamujzOp9NRYGG+Y4iDJMBP4CjhxMFgBAR0EGRZRwTIWCcQlEngBFjOBgOBvDGBhCw4CGAQMBOoBAimHAl7fUUfGzsajKzdjSnL9yoUdjqXFdoVltgWltgXldocX/YO29w6Mqt3jhtevMnt57z8xkMpNMyUwykzbpvVISQg8BQkLvvfeigqKCCBZEwYKCIKggXgsoR48NjyjHjiBNQaUkmfJ+f+wQOefe7z7f/Z67n3l49t7svfPumfV7V3nX+i14aXHdvjkVe2aUPDOtaOeEgo0t3qV1qcvq3WtbMudVO+ZVp84ss80oNc+vta8e7F09yLNheNr9I9N3Ts5/blbZ4515W9oyH52Q8+T0sj1zKh+bGN3akb9hRHBRo3tWlWNKiaUraurINXfmmztyjRMLzZOKLCNDqrG5hvH5lgkVqUVmQaFO2hqwDfaqB2dqmzzaQS7zkIBpZNg2sdgzscjdlmWrskoicl6xRVtpVbT4jS1+7ciQaUzE2ew1Dko31joVFWZJQ6qmxW9sz3FMiLrGhK3j8xzjcpxjc+3j812js+2D3Jomp6opVdmUKh+YJh/s1g1K0zbYVeV6YYlGUK4Xl2qF5XpxoYYp10qKFaIijahYzY+I+SIAEEoE/nxz1TCR2VmmES4vSFlc7lwQNk9QMvU8soFDDeTwmxhxIS1wYISwz5oSADD9DckwAAxIAii2rLZVINiot7bzVM0Ud4lKeNhuPxr1vDum+NjQ7GN13reaI0cHRN6s8h+r9B4r9Rwpc79W53210fdSdfre8vSnizK256VttOona0ST5NIOqcoOADgAQQPw/68BEIAg+giCsT5qDBIIBsc4gDM4LcZIPkvN2nf1/9uG/w1Ctt8wBeBmyHwVU6yXDEjVtmXZcoxiGoCtOWKdKwxYYOMYBhqAMoy70qA56rP+u9x9ZVTe710VN2Y3/D67/o+J9X/Mqv9jRt0fM+r+mtV0fdaAyzMHXp4/7LcV464uGv/X8inXl3VdWTHu+8VDzi0c+NOSoT/Mavl+TvPPi4ZdWNn+45KRX89q/mZGy8ftVe8MLthW7p/hlHc5lXMyzQtD+tX59ll+8xC9ZG6e8bFBgQfrnSsb0mYX2yf7dGPSTRn8vioKAsNZTga2EpKHA8V2IMf7WB4pAD6GS3HKJOCahUzQbsx2mZvLCp66b9VrTy9/cFnBhrmBtbN8q2dkrJnphzc3DDi0subF+aXPzYrum1u+c3L+hmHehbXW6aX2GRXOGVXusbmmkSHN2FzDjHLX3Gr3khbf/AHuOTWpE/J1w32ylgxpc4Z8eFDbGlAMdEsGeWSNaYpah6zKKis3y6ps6hKjsMYhr7bLalLlA7y6aqe82imvT9PWBSyFWrrBImlM1ZelyIZlW0YEjYPdupZM29CgqTPqGp1ta0jT5uskOWpRfaqpxWcaW+DqiDomFDonlfjb89Kb/ZZqu6LRpR4RtI4Imsfm2bqKXcMzDcN8hqFefXtOSnuOY3jAWmdTDHYbhgVtg9lG9g51tVlebZZXW5XVVnW5UR6R0AVKYZGeX6IUR+XCXKUgR0pFxYyJJAAnpBl56sxKQbiKUWuMNGQwEAYqDBAFTi7G9QFtBlzcZ7bhQFIEQbFLZIDD3xW1BABBcwCW6JRPWfVTebKlYuXzXtNbWanHKjKPji96vS3/jfrAkYGRo4PyjtVmvdUQPFYdeL0u88iA4GsDg0cGhd5oyXl1UPjZmowXC/wPBlLWp1qW2a2lAkrOsjr8bwMk/0dbfwUwBjiBkURfU1ESx2jAaIwS9YPwP/p0/38AIQHgoImQCCtUC4d4TF3RjFyLnAIAggQAHDAO+y53jVg5BgU4vVSteT3N+lOx51pz5PKogqvTK6/PafhjYt21qVW/Tav+Y86AmwuG/Lmw9eayUX+tbL+2dOSV2S1X5wz5aVL9DzPqflk48OfFg88vHHFp0bhfFrb/tGTst0vbv1446qt5w7+ZN+zzaQPfG1dxYHj0/jzHskzLyhzn8lzrklzLgoh9qFY4O9u4pdZ9f519cYVtQUXapIB+SiilUivgYSSrsXEc5wDGB4KEv9uzEjgwBCGmSA2PZxNL0+Qqj0YWtBrzM9xl2RlDKqLzxo7fsnDKjrWD71+YtW62f9X09NUzfPDC0gHbuwo2t4U2t2VvGBGcV+ucXGwaX6AbHtQN8CgaXPKqFEmNQ1brlNenyRvTFFWpqjKLrNgozlXxQhIyIKZ8YjIg4WQp6WwVE1bzwmpeWC3IVvGzlLywWpApIcMqTq6Wl6PjFtskUZO4wCgqMEoiGmGpQVhlFFZaFdUO9WCvvsWrbEyTNfsMLRnaoX7DiOyUaoe6QCuMqgQ1FkVrpnlMxNYWMbXnWsfmulp8lgqLPE/NDE7TtGXZxueldETtXcWpQwOawR71EK9hbMTRnpM6JMNcrhdXm5R1dk29U1ljl5bpRMUqYZ6cKdaKS/XyQq0kS0yHpdygjIjwqWwhkynlBviQw8WcHBIDAIFCmRqURcoFwVzgMnwgNMDocLACYQBCjGE4flds2V7tfZJH/AehC0YA4AKAjWm2J+2KNXL5HrPlSKnrcI3/RF3oUGfx0faCtxqCR5rCRwZGjjdkvd7oe6M+cLgxeLQ599jQ6NHm/AMNwRfr/C80Zj5fHXi2IvOZAt/ThaGNed7xFm0mzaH/1zj4/7PhQPS34O5Tg4ATGNuzhQSKDwSPtUYxDPvfmaP9IIS/QWijsJAIy5MztQZZs1vnFrN0VH31x1Q/IzjggIEYIAenZghkB1PM3+W7rjdm3WjJvTGu+Pq0mpvTmq5Nrvx9Wt2fC1tvLR99c0V798pxN5eMvDKz6cr0yqvzmn5dMPji0iHnlw+5vK792oaJVzdMv7J28qWNU39YP/Hfayf8sH7id2s7P1sy8p2ZA96eUPp8Y2hrftraiH1RxDgnS7uy2DNSK5jq0awqtq6pMM4vMi6ucHdmajp9+haTWEPSfa1aCZZghsDY6kIcJzCcAuABSDHcwOOlyhUZWl2uy1kR8pcGg7X5WcPri1rLi+uz/ZNbs+5bENo4L3PjvOADi3KgMz+lxS1tcUuH+1StXlWjUzbAo2nyaKvt0qieW2QWFZkl+QZhtoqJqLkRNdevYDKklEeIuwVYmhDzykifknZJsTQR4VVwvAqOV0b6laRPgWXIwKeAoJz0S7Cwho5oOREtJ6Jnco3CkJpTohblKpgigyiioJu95lafcUS2eXCmqtklHZVlrnXKh4ZsA9INtVZ5uVYwJM0wsdg3Ntc+IqSbUOhsCztK9IIcJafMImt2KUdkGjqjjonFjq4Sx4iQfmC6ujXTPDpkHeo1VRgkYQERlQvKDLKaFEWRlpsv5UZVgiAfCwnIkIjKEtPZYm62mJspIyJCTlgk8Mu4fh5EaAiIeAwNGACtVeJqDdeRRsktNC7t67hAQD/n0t/6APuPkwTgZN/iHACO8QG2uB0vpar2mIxvhjzHBweO1Ybfrg0d7Ch8dVj221X+1xuyX23MfKPef6gp7Y2Bgdebsw8MyNpX5X+u1Luv3Lu30vdMVcbuWt+u8oxHcx3rfNrlLsVao3q2UlvA/F8zR/s4oFiKCIJk+Qvv6j2cpScFuEtw+H8AQpoAsJBYtgjPl3Ir1MImh9Ito0kCAMMJ6OvhjfV1x8IBQAqQg5GTJcrnUi0fF6X+3Bz+fWT0RkfJ1Snl16c2XJ9YeWNG063FI2+tHH99adu1ua2/zxp4Y0bD1QVDfls97uKGiT9u7Ppx7djza0Z/s6j57IJBX81v+XZ125crR3yyuOXLpcPPLBn2j4VD3pk38L2JRe+Or3hlUHRzQeoMr7Q9lbOyLGOsSTzFpVlVYttY51hXl75hUM6MaMrEkGGsS+MRSYTQ9+tjADS7oIKzfHYYDcAAiDFMQVMaIaOXCNJUmiy7scDrqc7NGjekYkxjcUAvqg6p71+YtWl+cOO84H0LwjAgw1hplxYYmAIDU2jiR42CfCM/3yAsSRH7FeCTQ1jHzVRSbhGwn1QxkSom3GLSLSFcIixNiHnERLqETBPi6RLKK6EzxFSGmPKL6YCUDsq5eTppgV5aZJKVmERVdkVVirTUJKpxKAf5hCV6QZ5YkCshRwSNwwL6oX5Dk1s5MEPf5NGWmQVNHs2gDF2tXV5hlgx06cYXutoLUkZGTKMijgFpxlK9tMwgafYaR2eaJ+TY2jJ1Q33qjjxXW8A6yKFqTte1ejWVRmG2hFOgEBUrRBVqcYlKmMUj/DheqlaExJwMAeHiQaaUFxLxw2JxRMzPEtN+AeSK6VwencVhMnhcCwlsggSXy6MoiuZygCTuBiUA7lIP9hMQ4vj/Qij7nUMJSb+c5n3FYjiUYT8+KPhGU/D1Kv9r5Rn/Y0zp0ebI4Xrvwfq0Iw2eYw2Bo/XBY3WBA/X+F6vTnytKfbkpvLspsntgeM+grL114b1V7qcKTI8GzPe5jWtTlSus0vk6ST5JiPvGQLLLbQzgFND9zE7/8wgxDGMP2Qv69/sP2R2K5fsFnHUU+1nb2J3+h//Xk4ElYmQPWR4NAC5J+XlMloRbKOc2mTWpDEbflea7ySgsgQ2GAahxLA3nTGYETzu0Z7PTLzRGfx2bf76r6I+J9RdnN/4+pfzazNprcwfeWNjy1/yWa3MHXlrcemX9+KtrRl9eMvT7KbU/zmz8eemwMyuGf/zA+C+emffNq1t/fe/py6eeuvD29h9e33zuwPpzL6/7+sXVnz6z9JOdC96/b9L+6YM2NQbb7LzF+SmT3YpOh2Jpvn1NmXNFecqaBt/8ctfEkG5SUDdQoxACAEYSOO8usw4AhuNYH/MaHwMZSai5lEXAt0vEXq0qaDIWp6c25PtntQ1dNmVSW0NNU2nmsknpWxYXrJ6RsWl+CEpTFCEFlSkjcnX8fIMwxyAKKOhUHrgFeIaY8kk5PiknXUR6hIRbSLn4hEdK+hVcr4x2CSCVDxkS3CcjvVIiS8PN0nCzVZywmpuj5UXU3IiajhoFJUZedYqk1iGqcfBb/arOImdn1DEqZFjUHBgVsufLxfkK3tgC17CQeYBHM8Srq3HIK22SGodssM8wMF3LgrDeqW5yK5t9mqFBQ2umudIsz5FyIhKywiyqdapKjPxiI6fczGtO17W4NI12eUuGvtWtq7IovALCAuChIUvESafAyxBWCjcCuDi4j0f6GTyDBicGPoYO8ugAH/cxEBLSdgAXSRoBLKy3AjiOk9i9NEn3oOt/Fmh2517px3GcD5iLofc6lM+7ea+Vpr1e6/4fjYFXy+1HavyHhobfGJx9tNS9v9SzuzT1+TLnS1Wup2t8+wptLxbYni/NeKkh6/khmS8Oz36+PvRQdWRLjX/7oMzdQ3L3tBY9Ojh3XWNoQWX6nCJ/g02bzuXyAYCVCPxeHd03nr4Z4Z6R34sfdja5F0798wv0sZXiADhJ0gRB3T3zHxj++14MAIN7olNAYTiF4TYAK0AaDmE+10GTHAAAoAHH+pgj+noVEjjwAYxA1pDkNo3s4+L0nxv8P47Pudied3tC9aWuip9n1l+c0vDXrNbbi4b9sWLoHxtH/7ZuzE/zWz+fXf3p8uYvHun8Yt/8MwdX/PvNdb8cW/f9K4v+fXjJ2QMLPn1h1uk9U956dPRbD496b/uY19YPeHnloJcWNb00r3HfzIYd40pW1mYsKXROy1BOTFUtCltWRK1rKhwbmjKXVqXPyrNNy9a3Ow16BgAAB4oAoDHgAuA4MIAxGPAxEOG4jEPpBHy7UuYxaLOdzopIZFhj/bRxbSvmzFkzf9nDa9cumzV+5ijr8sm+DXOyN87LgqCa8Ygxn5wTUDJeGSddQrlFRJoQdzKER0R7hJRHSHkltEdIuHiQIcTdQgiq6IiGyVZxQgoqpKCCcjKs4uQbOOUOSWmKKKrnRPVUiZkpt/Kr7KKhfsXIkGp8rm5qqXVerWtxU8a8WtfEAsP0ctuQdH2QR+YpeYN9xqoUaaVF3OrTN7o1FVZxjUNW65A1pqlq7fJyk7jOoRqYoWvJNAzNMje6NfkqfkTG5Cl5lTbZmsnjNy+Y+sjS6ZNq8+udygFOZYtHN8Sra3HpsySciQ01S7s6lk0c31IQsZKwYXLniSOH9j+5069SunAsA4MMHMISJpUCP4OH+FQ6AUUmw6KO8UsnTlraMc4r5VMYTmB9yV39HLstLS0dHR1dXV1Op/NeQCoUira2to6OjrFjxyqVynshSgBoGebdZdO+2L7866c2v9lS+ZLP+EZF6oHS9MNt+fsqnUerQh/Mn3Du2W1Xj71y9cPXfjz56r9f2f3O0im7h+c9Msi/szHr6Rrfs6NCz09teHb+gBeWDXxqYvSBIZFnlk8899HrX378xpOLxnZ5TOOs2gKNhMH7yk4xiqyuru7q6uro6Bg3btzYsWPb2tqampo8Hs+9iq5/H8MwFnUSiWTMmDHsje3t7R0dHWPGjG1qGuh0uiiK0w/IvvQ3AI1Gs2fPnpdffnnhwoV9OMQxVhNiGMblcseMbpswvmNc+9iFY8YtmdixpHNsZ0N9yGLjwt+kbwTRB3KCoDCAwQ0Nbx44+P7+vYdaB72eqb3S4v1tYvTayILzwyI/TSr/bUrV7ytHXd4y/cJDs39Z1/n1wpYzy1u+eWTc2QPrvjm09tvXV597c9nZ1+Z/uX/mmeemndkz/avnp3/1/Mwv9s4+9/Kyfz2/8PSuqR9sn3h0Q+ux+0fsnBx9dHzuY13Fq5oDyxq80yPGGUHDxFT1wmzzinzz2nLH8vLU2fnW2XmWOTnm6QFLugSn2awiAB4AH4BLgBgIMYZJcFxOUWqGa5CKHTpNutWYmWIpDAaH1Nd1to1cOW/R/UvXPL1lw56HFq6bFVnc6Vkxxb98cgb4lFyPlEwTEXYGnAyWysOdDJYmxNP44BHiqTxIE0BQgQcVeKYccrV0vp5bbBFWOBQ1aZpat7bYIs7VcqNGQaVdNMivGxzQN7gVg3zaERHLmDz72ALn1BLHtFLnzMrURU3ehQ2eaaWWqcWWKUXmmRUpLR5dtoguNctrnKoyi6zKKqu3SwZmGBvS1LV2eYVFONCjq7SI8xRUoZpfbVfUu1QD0nWVNllExuSrhPkqfrFB8NOZL1CiGyVubl8ys0jLqzQJBqarB7gUlRqRi4J3X96P4jEU73nywQfUFPHaU0/GEULJxMfHjwfVKi+X46WwEJ+KSLhBERURctwYjC6vQPEESibQH7+XO1P4gHHYCZ5N0wQQCoVff/01QigWi40dO/Zejef3+xFCCKGenp5wONyveQAAI0Ag1/5+6VoiEUM93R8vWbDPbXgp2/BKifbl2vTPtyy98/1ZdLsHJVAMob9QEsUR6kaJJLp97fxbG2Y9Oy76wrLmXava980sfagzsqEt/dG2wIrBwTPvHU6iRG+855evPxzjt40yi4a4FHYeUDgASdFAvfnmmwihZDIZj8fR3e3mzZuvv/56OBzuV3QEQdxriKampiYSiWQy2X8Lu//nn38+88wzBoPhXjuWIIglS5YkEgmEUHd3t81mIwiCVWrs0zQazW+//ZaIxVESoUQCoV6U6EbJ2J+//bHt0ceNVhu7XA8AQJAUzcUA53H5H330URwhhBLfHT90NDvlh9a0H8dELndWfz+l/MKyIRce6vhu/ZivVo78fF3bFzsmnTuw9PxbW84f3/rDkfVf71/+r+cX/vvFRT/sn//Nvqlf7u3494FJZ5/tPLN74slHxr3/SNeJBzoOrRr+6qqhz8ysXDUwsGZwcNOw3PXDc5c2Z20YUTirIGVqwNBhVyzNdawpStlQmbq82DYrrF9QkLKsxDk725qv4QkASMA4GMZjcUhgEhxnP3KKUnG5OgHfLJXYVcpMkzpkM+VmpNaV5LTWVHY2Nz4wd8TjKxpWTg2smuZfPT2wenoAsg38kIYXUDI+Ke2XcXJ1wjy9IFvFydXxiyzSfCM/R8MpMDBlKZLKVFlduroxXdvg0dSlqRrTtYN85tpUdYlJVGoW16Qqal3KGoe81qlo8mgGeDQD07UtfuNgr3ZEtnlUtnF02DgyS9/iVQzL1LZFzJMKbQOcyoiErk5RVdhklVZVvUNbYxdXWqS1dnmVVVJllQxK15ebhFEtE9XwKyzyCqu03CLJVzFBIVmgFhXpxCVG4deffpZASZTsfWDejEI1f4BLMdivq7KJy7USB0289corKIkQQo88+AAX4IWdO+MIJRFCifjbh191SIQ2AgJcMhOHLAk3R8hLw/Dh5VUIoZ5EvOf3a0UpZj3F6aNdJvoaPJAk+cWXZ1i5HDly5L12ndfr7e7uZsXd7/ffa/hhAAKx6srl6ygWR8nY/nlTXi1yvZSreaEs6/sTzyN0E8XiCMV6UG9v7PatGzeTf96OoVg8GUMxhHpj3596c+e0gY+2524dGdjanvPomPDGQe5HZg5GiRs9CKEkSsR7F7UNjcrxFoeiXCcVAgCOcQB/44032PHcuXPn6tWrd+7cicViLK6uXLmSl5cHADT93+FVt9vd3d2NEGKheC+AEUKffPLJvXpeIBD8+OOPyWSSBer999//X4auTCa7fv16IpFIJBJ/3bp54/pVFOtGyXg8nkwidOofH0nVcgz6+FQBcAIjmwdwgdIUAAAgAElEQVS1xBG6jeIojnpjt9+fNPzrrujvm8fe2DrjwqaOHzaO/XL9kM8eHP/V88t/OvbwT8e3nDu86l+vLvzi8Pwv900689ykcy/O+eaFuf/cNfnD7RNOPtp+YvPwA4sGrW1K78rWTs5NGeqUl8ugQU83GKgcDhTyoUrNVGjpYjU2KqCbnu/sSteOMYuX5TlXRa0byhxrypwLC6zz88yL863z8211VqkMAMMIiqB5gDEAXJy8y/4EQgAJYGqSNvOFTpncb9QGreaIx9FYnj++pXH5lFFrppZsnOlaM9O/YW5o7azAmpl+qEpTFlmFeTqmQMtEtZwap6TFr622MzUOebVdUWoSFep4hXphoV4Y1QmKjeJKu7TKISu2iPP1vFwtN6LmZimoLAUVlBFhFSdPzeSpmXwVk6/mFOp4ZWZxmUVWm6qusivYG0vMgiKDoNwqrbLxi7S8XBnd6FLX2uXlRnmVRdWYpqq1K6tt8gqzqM6haHSpyy2SCqu0SCcs0omLDYKolslTcrPEdL5KWGqUVKVIz37yaQyhJEIbZ0zJFRHVFkFThrrOoShRi5wMdfTFF5MI9SbRxo0bSYDnntjJYjKJEEKJo6+8ZBcLbAA+As8ScQJc0gLQXFqaSKIYQn9e+jXHaDABiFl7iWRZX3E+w2NBiBAaPXo0ds+Wnp7Oym53d3cwGPwPWcRBKJVc+PEXlEC9CdRWX73CTL+Ur/55//MIxW4gFEfo4rmPTz0w78ioqhfHVTzbUf7uY6uu/PyvGIqhJELJ7vcPPfLAWP+mYb7No8PrW4JVBuzdV56Iod4ehFAMoQT64I3XzTgECaxKpXaJ+eyawqFDh1gd9cADDygUCo/HM2PGjOvXr7OTyOHDh0mShHtc2X5NePPmTRZ+EyZMyMvLGzRo0JNPPsmiMZFILFiwAMdx9pbOzk4Wfiy8f/nlF61W+/fsg2EKheLChQvsNzaubYzPYBqUk7vv0UdRIoESCCXQnDlz7qpWgnU4j594Kx7vRSiBelEcoRsfH//3ghGfrh92bHnr+6tHfblj8tcvrfvlzYd/OnLfV/vmnd0z6d97p3zzwsxzryw8d3Da1y9Mfm9z8+7O7FXlpk6PuNUsalILahTcUiFRwCWjfF4ul8mluYV8YYQic7n8IoEoyueGacgXYSVybKhVMslrGGUVLytIXVlgWV9qX1+ZtqLYMS/XtKTAuqTEPspt0ABblkHyWG5bwEkALvT5hAqatookfoMp3+UuCkVKI/k1JYWjhgxYt3jhi7se2rxi8IrZjk3zQ2tm+tfPzlo3KwSj86xDg4Yau3CQW9GWbZpelrp8cGBerZ0ls2hKlTa45AM9ulqnqtwqr3Zoi8yiEqukyCwJq7kBKemXEH4ZJ6jkZSm5BUZJmU1VaJTmanlFBlG5VV5hUxSZZFGDJGoUFZklxTZJoVlSYBSVpqjyjfwCrbBIyxvkVgxMVVQa5FGVoEjPVJglJXpBuUk4wK1tSFPXOlUVFnmRTlhulFeYZFE1t1DNz5MzhWphnUPVmmn+4fPPYgj1JhP3z5haruQ3p6tagsYKkyyqEjh4xJsvv4ySKJFEmzdvJgCeenw7SiKURPEESqAkSsYPPfuslWHsJOXnEH6GNAE0FUdZjPb+fiNkMDgwzMDlsA1kcJwkAOdQ9Keff8JK9qhRo+CeaITX6719+zardrKysv5DueAgUcl+OX8phtBthMrrm4bw4dPV0+IIxRMIodi5N/Y9VeHdm2/YXZ7yYK7h6Y7oI1NyHl5Q88OnR+78cf69w7ueXjTkoVHZM0rsw73ScgNd43Pe+f16L0LJBELdCCVRsrdnaHlFCkCES2dLhGwk/fDhw6z0r1mzpt/4XLlyJTv+CxcuiESi/vH3I8ftdv/5558s3liVzm779+9n8Xby5Ek2asowzBdffNGvBlmUzpgx42++fYJQqVQXL/2aRCieTNRVVJgA9+KEBYcPTryBkolkT+LI4aPQt+6DYwDRkuI4SqBkLPnXH/F4L0Ko589LJ9dMPrZiwCfPzP3p8P3n31z93cHln+2Z88+nZ57dO/fb52d+99zUr3Z0nNrYum9cePeo8JxsdbOe06Dk5VOQBVDAJUuldJVGUCgls2iIMJDLJwoEVJlcEOFz8/mcIj4nj4RiIdRruK1m0RS/aYiBNzfLvDisW11oWVPmXFninJtjWFHsWFVumRGy2qm+/DURgABAgpFCAhcSuIgkZDStEQhSlEq/zZbj8UQyAnmBzBxfRkVezpCq2jljx+y4b8LK+f7lkzOWdKWvmhZaNjEAbTmGqWWe0UHd+LBxVplzboVtbXP6/SN9ywf7Vg8Lza/3jM83Dc/WN6UrysyCErMgW8XJlBF+CeGTkX4ZJ1PBZOvEOUZZrlEc0Qvz9KI8vSCs5kbU3FwtL6Lm5qj5ORqmyCwqMAnyDLwCkyDfIIyapLkmWZ5eUmGVNnvkg5zSBpu62qqutMmK1Uyxjl9pETe61NV2WYVVmqvgFOtFpXpptU1eZhTVOVSVZmVUJSg1CGsdkh8/+TiOEkmU2DJzepGIqEsRNvp0JQZxpgCMOBzauxclURKhTRs2EgBP7tiGkolELH758tVYLIGSCPXGXn7iSS1FpxOYn0s7uHhrdRmKx1AS3bp8NWKzuwD0NEH3RRpxEgguzTnzry9YTdLW1tYvu6wm7O3tjcfjsVgsEAjc6y6SAGq57PIPPyJ0A6HesgE1QYALX51BMdSNunvPffRkaWhPruXpfMuDRY4dUwc8Nbv0qc7K7W3lzyxofHZ57ea2zDn5pjF2aZTmBHGwAOzZugvFEUokX3t5397HHo0hFEfo8J49dgwCHIhQWCrBAaAOHz7MwmPjxo39vt+IESNYgF26dEmj0dw7V7BATU1NvXXrFuvcRiKRfjjNmjWLhfSXX37J5XIBoLW1lT3zzTffLF68mN0/e/YswzD934xKo77w68UkQkmEGuqrTQDlMqkF4IXnHo+h3iRCh187CjiQOEEDTmH4/kOvdCfuoGT32y88/8l7b6FEHKHYb9+/feHIyrOHVny5f+1Xe6Z99ezEL/Z0frGn8+wzEz5+eOhzk3MXlBtHZ0rr5NxWm6pGxZTKOSUyboSDF/CYIoEkSBNBGstmiBADWTwswqciXDLCJcNCLJuGKBdqZFS7W9/hNTYq8KkB81CLcGbIuDCsW19q31DlXlOeNjfHsLjQtr7SvKwgNVNI0gQwGChwUNKEjsuVEoTwrkUqwDEJzZFyGTmPnyKXZ5i0QZvOp1MGdaZSj2fzwuFbVkSXdHlnj3bOaUtb2hWCpQ3Oh9pz1w7JWNmcvm54aG6ta3imbHhIPTJkac3UN7ikxUZOnoYMK7CABPMKISCBiJoOq6gcLS9PL8gziYpS5PlmccjI9ylJr4wMqZksJR2QQJYM8jRUVM+ttEvLbaIKp7TCKS6z8yvTxGVOQW2quCFNXOvkD3DJGlLkFTppqVpUphFXWEVVKZIys7DYIKiyKWvs2iKdOCJjijSqsJQbluGlJlGenJ8r4xVrhVU24b8//yyJEvFYz8apkwpEdKNV1piqr9ArPRyOHIOD+19g1dr6+zYBwFOPb48jlIwnnti+fc7s6TGUiKEEiqN9D+9y8jh+DpGFQ1dpCUombiJ04+qlMoMxnYPZaFzMQonEAMcpijp75gtW2kaMGHFvaD4jI+POnTus7GZmZt6rWwAjFDLl97/8nESJHpSoqSj1KbR3uv/qQQj1oE83Ld2WrXoworuvxPHc5LJHpxc+2pH16LjgtjGZm5rTZhcaBzlELhxSMHCTmIPAsy223y9diqNEEsWaSgrr/Bm30G2URD23bld5MjJoKKSwVBrjwt+acMWKFexguFzugQMH2JOnT59mUfdf5qjT6bx161Yikejt7fX5fOx5Dofz1ltvsSr0vffeYy3wkydPso9avnw5n88/f/48ezhs2LD+JyuVyl9//ZU9Hy7KEwAYgSxxeS79+H0MxZIo8fCmBzAAoGnAIez1xePJ2wgl7/w2tTywd8kElLiZTKKexPUvn1/6y55xZ5/t+Ofz884+Pf70w6MOLm7aOjx3YoamToSVciGXggIeXSziRfmcMI3lcIlchgzTWD6fDglpHw0+HuaT0gEBEebiOQyVySejEqgWk9UkZ6hOPilTOSvLMETJTMowtVtk80LWpXnWDZWp99W415anzg7r5+VZ11Q41pS4yowiHgAXJykMcAx4gDGACQlSSJBCjBBihABwXp+LyJNzOEoOR0nRBh5tE3LHNgS2rsxdO8c/q801qdm5rDMbxofN04pT2zI1I7yqsdnmUUFLdYqkUMersPCrHeL6NHlThrYlaB4YsFQ61QVGSbldWWZXlqYoSlMUUZM4W8tka5mInp+p4vpkZKaSU2SW1LqUA72akWHLhBJXR37K1DLPxCJXe8QyMmhsy7KNyXY0u7UtXtugdGODQz7QpRng0FUbZUUqbqmWqbbLqu2KqhR5pU1WYZGXmaSFWlGWmAzymQAfz+BAoVZQoBaFJUyRRlSk5X718Uesg7dmSldIgJfr+SUmUY6CbwJQ0gQLwmQSbbj/PpLEd21/pDeJUBI9t+sJDsCKJQsRSrAG6ouPbXNyyBCXmlBeluzt+Quhv36/Wm1LcRPg5JAqHOPclVQOTX712Wes3cWao/1I8/l83d3dyWSyp6cnFAr16xY2EUQmkf988UJvPBZDiarK8lJvMIkSKI5QIrZ/ZMtjafJtpan7ZzRuGRfeNbXojV1r3ty5ev/9c3ct7FgxsnH2gPoFLcOGRoodBKYD2LpqNUqiRCLx2T/+YWS4JoCP3nsHJZIohp57+GEPQAmXTiVxwOC1115jYXPo0KH29vY5c+b0wwYhNHLkyHtDuDiOsy5ivyZMJpOrVq0aM2bM/Pnz33nnnf546dy5czEMq66uZk3Q27dvW61WgiDuu+8+dg46efJkfwRVrVb/+uuvfWGbrZvHjx69Y92Gq//+FiV6Yyjx2/XfvW4PhbFdReG53U/3xhK9CH1w+ECNjFo3IrPnt+/iCPXEb/3y0e6vdoz4fNeYN1YPe6gxc3qmtkZJ5XAgiEEWQWYzdBaP8NF4JkNlMpSXwvwMHuARPi4WEtJBARXi4GEuns0QYRqLcshchkojoTVN3eW1DFerhukVE7zSuRHzaKN0vFvXniKbE7IsDBtXFJrXlKasKLLNCGlmRyxrK1LWlroaUmRClu6OzSMCIO922mNLDTl3uyPygOYBKGgqRa7ItBiK0h0Lx1c8uqZg6VT/nHb3rJHpc0b7YWyetS1iGuiWNKYKB/uUw7ItzZmmWre63CautEsrnfI6j2aA31iXboyapJkyKqJhAlLcKwK38O+PV0oEpHRIxs3XiaodysE+w6gc8+Ry17ymwJCgcUjQ2OLXD0zXNriUg9yawW5dg10xwKUaFjAO8+sGpqqqjbIKg6RIy6uwCGsdmgqLvNQoKTNJi/WiEoO43CzLVXCCfCYsYbIlnKhGHJEL/XwqJObkKJlzn33K4mHJxA4vA2EJRHW8kIIxAfAADrzyIkoilEAb79sEGDy1Y0cSIZREL+5+hg+gIqiH169Hyd5uFEe93Ts3rjUDjCmrQAl0B6FbN37LNxjTMHBzOWaKlgDGx3CGIIQczleff8IKX3t7+72GXEZGRk9PT79P2B+6AADAMZlE+tNPP7GrD+Xl5WU5Bb3JRBL19sZu7Wms2epTPjm+cNf4ooc6wk9MK/3j9vUY6omj3iQbdYknUBwdfO5lLYBHq77444+xnl6URHMnTNQArgOYPnR0oqcXJdHVi+cbDOYCmrECAPW3JuwPnLDQunz58owZM+5Zi4d7oZiWlnb79m02ntkPvOTd7eTJk2KxGABee+019syTTz7J3puWlvbHH3+wF5eVlbGvr9FoLl68yD6kN5lACKFkAiXi8Xjvx599WlVTDYCzeScpqc6//vqD/Y1GFpU0SQXzCxUfvbCNjd9c+vnLKUWeQU5xKQeCJLgBnABOAA/JyaAZJ0lYSbBRGPuxkGClMCuFmShI4VFZAjqHSxZyqVKGU8ahq7hMIcNxU9Bo4E/xGkfrlCMM8okB1eKooytVP9quGGUWzQ6aF+WYVxZZVhZZlhaYZ2Zq5+XYNlTa76t0jfLqZP2Nwe+ygvS3K2QA4+MEj8KFXEpBCXQCxq6SZxiNJQH3+AE1j60ev2VZeNm04Mx255wx6dOHp0OhSZyvF+RreFGdKF8jCCv5mTJOhpgMSPGgnMxWU/lGPpt4nankpPEhQ4K7hZAuxtxCyJDgAQXtlWJeKRbR8MNKJqLiRXWCUpOg0iqos/MbU4VVdkVFiqTGIWv0yIdkqsfk6jtLTNMq7evawuvH5C4d5G/PNpZquLliOigkQxIyqhEX62WlRlm5WVGoFRTphNUpqjKTNCjgeDl4QEB7GcIn4AZEPCcFPhHn89MfsL/uvM7xbi4USMlSrdDPx/U4xQU4cOBllESJWJwF4a7HtieTyVgi/tRTT/AAlABGgn7y4YeSqBuhBOrt3rRgXkNuPoon4wj9ce1y2GgwA9hp0kzRCsBFgPNxQsDlfHnmU9an6g/MsBLM+oSxWOy/oqPsuplGpT7/w48soCoqqz1p6UmE7qDeJIrtnzJ2R7N3+7ScreODWyeFt08rTfzxB0rEUCIZQyiGEDuV7Nr6sAbwBVOmxJOxOEI/nPs+VWOUAMgJwi5WnPv6G3Zh7bE5C9yAmTAKSDh69CiLvW+//fb27dusv7p7927WFfzPxLS/D51OJxthYuGUSCTi8XgikTh37tyGDRskEglFUTk5OeyTY7FYJBKhaZq9fd++fSxujxw5wj623xzt7e39+qtvkgjdifXGUWL+wgUCHh8AByApEgcM3/LgVpTsTSQSp94/beULC8X8YhE0pFtuXrmU6EXJJJoyaIQZwA/gojnpDCfAI3wEZHMgT8LzCDgWLm3kUloS05KYEgcFgAxABqCkiaiIF+WQxRyqnM+UcehSgszB8DSAAUbxzJB5jF46VCvpTFfMy7FM81vHuw0jzZKZIfPiXMvqYvuqYuvyAsvskH5hTsrmWufm6tTpOXYzDXeTFTEAksD72vdyAQQ4ISRIMUXKGa6OLzGIGadWHrCZy0MZXc0NO9d1blqYuXiaZ9Uc79p5oXljveDvgxwdlHODcq5XQnklVEDJSRdjXimRqaTCOl5YxwupOX455ROT7PkcrSCi4YfVXDZ1JlfHLzAJwho6KCdztbzKFGWjW9fk0da7lMO8ynER49Ri++wKx7IBGZuGB+8fEdg8OvDE7LqNo8Lzal0Tcsy1RlFEzAT4XL+YF5Yw+UpRroIfkTE5cm5Uwy8zSUsM4mwxN4PGMjikAwc3Q3oEjAkghSK++OQj1txaPnu2AaDRosnjUT4CVARFABw8dAAlkiiJ1m/cABg8/tgOlER3ErEn9u4mALQEZccoC44f2LUNJZIoGUeJxBuvHOi9fac3Hrvz5/VMk1kGoMRAgeMiAAaAAqBp8vMzn/2XT0iSJI7j6enpN2/e7HN+wmFWoPtywUhMoVBcvXgl3ptACJWVV5I09ev3P7DG8Ddvv7x5dGDHBP9DkzLXj/PPLLTMrKqeXF87qqZ21sRJKBZHyQTq7Z7RMU5DcX48+3Ucoe5k8tKlS+8ce+v0++98+P4777311pVLl28lYwglLnzzTZZSx+avHTp0iMXJ0qVLOzs72bF9++23aWlp/fkx9/qE7L8ul6vfue3o6MjNzc3Ly3O73RKJpB+rzz33HPu027dvv/POO++///4777xz4sSJ7777jgXtnTt3AoEASZIKheLSpUuswVJfVv3K/pfjCPUk4sffPCbkMATgOFCAg1Kru3blN5SMoWT8/PkL7x4/fvbU21+eOnX67bd6bt7oSXajZOKf778dlHKzeRAVCItF/BIRUcSHajmn1qAIyvhmDmHgMhqSUlOUkiCkGCYEEABICaJMwI+SeB6J5XCJCIVFcTwHw9MBSkX0FJ+u3SAZppVPcKunZ2qne00jbYpWo3hSun5WULcs37y6xLamxLE417Ki2PVgvWtLjXNBkSNdRN4tvAIMJ2kABjAeYALApTglJ2gVzdHzBSaRNEUh9BjUIYetMuTtHFz/+NqujQuCD6zMfuz+vK1rIyumZYBbCh4JZMjAK8WyNHRIQ/jkkC4Dj5jwiAmvjMxUUgEFGVJQ2SomouFHNPxsFZNvEBdZpIUmcY6Gk6PhFFvEpXZxoUVQaBKW2qS1qdpGj35AuqHJox0RVI7PMXQVWCZGrZMLbZOi1s48U0dY35lrawuo2wLKcSFjnUkc5JFuDpXKpSNSXp5CmCXi+BgICskcOTeqEZYYpLkKfkjIdZNECgYpJJhwMOCYDog3jhxk5filfc+rAPLFggKx2E2QDIBCIfv54oV4bwwl0eSpUwCDnTt3oiSKIfTo04/jBCgAHBgW5PMDfO7B3c+iZCKZTKJYHCWSSYSuXrnk1OlYE58LQGN9Mx/FIT/78gw72Y8aNerePEyVSnX16tVkMhmLxWbNmsWe7NMzOBQURlECJRIoEUtGIhGchD0PbEHxbpRA3T1Xn986eVOLd/Mg77x8U7OY8gN4CFIBsGHZ8mQcJZPo5o0/zFpte+tQlEiwqjGZTCKUQMneZKKHNVnjKJFMxGIoPm3UOC7gBIYfOXKEHerKlStxHD9y5AhrYZ45c6Z/wb0/gtL/ImlpaWxgBv1n1kF/Amp6evrt27f7Vyb6bd3/SrLZtWsXqwkvX77M/ld1UblGoTx//jw74Gef3k1jFAYkULBi5dpkD0LxHoRiSYTiCCVQb4wNqnazKRa9vejm0LJiNYCbgjQupPJwJ0OkC7npQp6NxnUEqAlShRNKgpDhhJQgxBjGAxATVCnDieJYNgY+HDJxiNKcQg7PC3gej54U0LdbJC1q2Wi7YopPNSdka7crByj5Yx2qaV7N8gLbupKUdeWOFVHr+or0B2pS76+2Ly+y5yoF1F09iBF31wkBEwMhwykVwdFxGItQbBJJUzVSj0HtM+qLve72+qrtqzrXzA1sXhl6ZH3OgyuyH1gSBq9ckMrnOBnKQRMBCT8g5/uktFdKeGU0C8JsLZNn4EVN4iKzpNAkDqs42Uo6V8srt8trnCrWdax1KevSlHVpygaPutGtrktV1Dok9amSRrdkQLp4YIZsYIas2a9sDWra8iyTKzO6ytzTix1L6tJXD/ZuaA135tpyZbSTxE045mfwHBm/WC/LUwqCQjLAx0MiqsykrLGr8xTCNJp0EJidgxlJMFKEBGDpvBlsbCWG0NxJXS6G46BoGYBOqnjy6ad62QWKJPL7/YBjO3bsjMfjcYSeeGoXCaDCII2isgTcDBLSBJKX9zzD/uKJRCKJEr//fs2iM+CAsQ3hMayvwoDD4Zw58y/WHGWXKFjpZPNOWClntU1JSQkb5wAAlzv10zNfsEP9+quzDJfEMKi1O3p/+y4eQ0mEbt35+eiO9fPzA1EKwgAZQDkJzpppMxN/3EIJhHoSux56lAfwyT8/Qok4SiT++cEHO7dve3zbw88+vuOlJ3bt2b59z8OPfPXxRwglYgid/uAfNEkBwKuvvspCYsOGDQCg1+svXrzIjvDgwYMMw9wbFGV3SJJko6PsO2ZnZ7MgZN+FdXS3bt3KesU///zztm3bdu7cuWPHjm3btj3++OPbt29/7bXX2D967do1s9ksFouvXLnCXt9YW0cAtDQ1JXq6EUoghOYtmA8YwZfwfv7pIkqiJOo98T+OPbrtsW3bd27f+fjjjz/+zPYnHn1w23dff48Q6kbowL5DFAglBAhp4JDAJUCE4woc15CEhsKUBKYicRmOizEQ4bgAgAsgIqliHqeIJKIknk1AFkABTubglBPAj1PtHtVIk3CAQj4qRTkpQzE/nDIhTdeoEI1J0UzN0K8qcmyqSN1QlrIkT7+qKGV9lWNDlW15obXMIKMAAGPtnLvN6/twiEsBV+KkgeGnSBRWCZMiFfpNpqJ0z9Cy4oeWjt+8vHDx1NTlU72LOz1LutzgltFWGuwcSOMTITkvU0YFpHhQjWfrRBlSyiPGMpVUrp4pMPDz9bwcDZOjYQoMwkI9v8wiKbOKyszCepdyQLq2MU3VmKZqciuHeHXDg7rR2bpxefquYtOyAf4Nw3O2tEcf6Sp5fHr5wbVD33us6+CG1v1Lm15ZUb9vYeELi6tWDcksNfKsOBiBDPDxAB/PVfCzJRw/g6dT4CYgLGHyVUw6BWk0aSPAQoGZBj1NKYB06FS/fv9TPIHuIIRQ7Oy77zz30Nand+38/utv43e9qad27KQoCjB8164nkwjF4/Hndj/NAzBSlIPAMriQKSRTgNDx+C8feCWOEJuNee333ww6Y3+NaX9ZAJdmznz+JStkZ86cOX78+LFjx06cOHHixIkhQ4ZkZ2f364dbt24dOnTowQcf3Lt377Xfr8YQYlNDuyZ0khgQAIUi6dHVM27dupWMoyRCKN5z7cynLz69bfeG+597/LFz//o8gXq7UeI2in/8r8+EQv6A+poYSqBkHN3pLsmOcAEEOKYiSTWACaPVgA2OFvUkexFCvUlUU1ULxN+xk3Xr1rEQqqmpYSMuCKFNmzax2Ls3QsNqQtau7unpYVPb7t0sFsuNGzdY1Tdp0qS/68r74sAglUp/+ukn9itauHAhwzAXL15kzdGqmmqSwGiALZvWxxK9MZToRcmKmtrOrnHJOEJJdOX6Za1FA4ATQBFAAg4cAKChrbU5hpJJhGK3buVm+iRAqGhGw2V0XK6WIrUUrWUYKUXpuLSWx5FTuBBAgGM8ABqAR5JFQqaMy6kW8KsE/BKSKgIiGyedBJaOcUe45MONooEq1Si7ptMtnZNpnuBSNyokQ/TSsTbJ0jzrllr3g/XuZQX6JXn6NWX29VW25YXWWrOCAgbsX20AACAASURBVMAJqq/SBgDHgAbgY7gQIyQYqaI5ZrHEIpTapDynQuYzGvNdqUNKircum3DfkvyV0zPntvtmj8pYPTULCgz8qFGQr+fl6fi5On5YzctScrM0vFwtL6zi5GiYqFEU1fHKrdJio7DIyCs08yqd8gqHosquKLeJqxzioVn60fmWCbnGaSUp82tca1v8D4zOeqg99MTUgv2Lql7fPPz41pFvPzrq3cfb39kx5sS2UYc3t775yKiDyxr2L6nfPav8obHhzWPzWwJqBwNyAB0OWRJuoZgoFpMBBnMLyBQK3DwolwsifNqFg40kdRipwkkZ4EogSRLyw6FvvzrHRh17UOxO8k4c9ckqSqBXDx6Ry9RsbfvuPc8glIijxO69TzMAFpJIoygbgIWDWzAQAyhl/NcOv5pE6DZKXrt1Q29QY0ABRgNOAVAEkFycJgji6+/PJVA8iRLJZF9SZTKeQEm0Yd16AJgwYcK1a9futc2SySRKomQy2ZtEq1YvJQkAjMMHWBA1PNKR+eyGMVe++weK96Ik6kHodhL1rVwkWBWffO+NN+06vQAnPj15qhuhJEJH97+sxggz4HaAVAxSANJwSANIobnvHj8eQyieQCeOv0XgcPToUXYM999/f/+awbp169ixJRKJOXPm/AfC8L4IU3++aE5OTn89EoYBjsFDWx5ECMUT6IfzF8Vicb+2v9egXb16NXv7xYsX09PT2cBMIpFobKrlAggxQsPjffL2cYR6exC689utK5cusyu6Dz74IDvjcQicg2FiDJMAJgRQ8nlnv/oSoQRCiaeeeFKAAw9ATIKMxGQEqEhcieFKDJcThJwgZSQpJgghhvEAGAx4OJRyyUoMK6LxQoooJPAimizBCS8BGRiMMsmmeSzDLboRJul4l3J22DEtQzlQLW6U81t1wlmZho3VngcaPKtKbIvzzAujuodqM9YVuWvNMj6wBD84O4HhgLHKUISTcorScBmTSGwSSS0iXrpGnWkxZTnNAwrztizqfGRZ/coZ6Usne+ePz5g3NgBlBklUxSvUCsrNinKzokArjMh5+WpRkVnENoEpt0iiWqZQzS9U88uN0sEZhhFBa3vENjKgGRdWLalP3dCasaXNv2tm4d7F1fsWVr2wuOrV1U0HV9a9tKTypSWVL84q2z+n4oWZxS8vqDy4uOrIisYDi6p3T41uGp61YUTWqiH+KcWGyYWmFr82rBXLAEQAKTw6S8TJl/I9XDKNz7h43Aw+kyMjcuRcr5C00bgCQIGDGEAMwABwAFINtrWLVpz58OPeG9dRItF989avV84fO3F0xMhWlpCaLb5cOn/+5599cvqjD5cuX8THQAOQweelUIQaQAwMj+ID4AqZ+u233u3u7bl46bxJK+ewrbBojL7L+sDjMnt37/voHx+eOvneB6fe//DUBx+cPPXhqQ9OvX9yUtdEVhDD4fCWLVu+/fbbW7dudXd39/T0nP/p533P7S0sLcPYegySKwJY2xjYPTFvU1vWfV3VTy6a9PErL966cAH1dqNbt3pv3/r9yuXXXnmlfegwMUWKcLwgEDjzwQcfnHr/w/f+R31BgRYglaIdAGkA6QSWhoETQAcwuLbu5Een33v/1Kn3TzocKevXr//www9Pnz7d1dXVH32hafrZZ589ffr06dOnjx8/7na7/07uwQAArFbr22+/ffr06ffee8/v92MABEWyhRFisfjgwYMffvjhBx/+Y0LnxHtDO/2ZQxiGuVyuEydOfPjhhx999NHw4cNfeOGF06dPnzp1qig/RyuW8DBcCBB1p7371hvvfHDyi4+++PSfn7z/7nsnTpzweDx36w+BBOADiAEUJMUFmDR+/OkPT/3z9IdvHj5slkqUHFpKgAQDGYCSwJQEoSEpGU5IMVyC40IM42PA9BGEYmEeVUDgIQ6eSeEBgACGBQFLwcGNwUijdIROVC1hhhhEnR7N3Ly0mX5do0IwWCMZZZFP9qgX5ujXVzk2VLkW55mXFpo2ljpW5jmabHIx9NFS9YOQ9QwFgEsJgg3M6HhCs5BxyqQ+oz7kMDXkRzYv7HpgfsXMUWkLxvsXdgTmj/NBlUMa1XMKdJyonlts4hea+FkKzCcCv5zKlFFBOZ2t4GZJqbCUmyPnlRuVg93/D2nfHSdZWab7ft8JlXPOOeeu0Kmqc5jOOeccJnRPTw7MAAMDwwBDEEVgRdZV17wqCIykBdMG3at73b27q6suigKKioTprnDuH6e6aIbVvbv3/OrXvzPVVafPVH3P96bnfV7ZQrnx2D7P6Xb3xX7/Q0vVj61mPrGe+fTJ9se2Wu6YiB1tNR9utBxutB1rdZ9sCxxK2w7X2bfqbee6Qidb3ceanMf3eQ5kLHMVxuGgYjKumShTziZ0Q0F1o03j5FJ8AB1JhIX8CrnEiZGTpLw0xwPIQ0JIyPELuA6K0gJSApYCEgNIMRZiggugRISFohvd3sZIrKYsZTJqiFKJDhf9SYpDY0qI+SLgCgBIKcFXEzwBABcAQbEhXYTBKpVVBcJpX8BCcUkAEQ06EXJL8VBlaKap2qNVUAACiuKTJJckKIQpgiQQZmlc71kUjKVSqdfrTSaTwWBQKVexnXMExXbtUBISn+tNPTxX/eBC9ekma4cMEghSSlVTJNxRkWgIhv1qjZokxaxsCYE1PFpBYStB2SmOBZNmjGwUttOEhQAjgBNBiOYZANMAmKYoDo0B0TTJpoVomi7VIUrOJ0VRFEXxeDwOh3OdJWTfQhAERVEIIRITAJjL5bNtggRBcDickgGE9xNu4P2VD5IkuVwueymSJLVikV4mRwAqHk8HoKBITCIEJIkJiiDZa9IkxW6dHIRECMkxIQNQUbQAYSmHK0BYzeHruVwFQnIAJQYVgZQY5AAKhKQYSxASAwh2N2guAAehKJeOI+zH4AfkAwgAlAFpJ1CIQy+6dWM6SYdMNGVXLvrVhytcxxLmXpWoVymcNCs2wvrjSd0NaePFZtf5GvtNDbYLNZazFbYRt1bN7haYKIGQKBbokQQhBUHqOTyjUOKQiVgQljmMzfHIhUNT51ZTo82GpQHXxrT/2GIQGt3qGpssbZHEtZyYmirT0AEp+CUQknPCCm5EwYmr+BVaQcYoarEr+8PmhbTpYJNzq9V5psd/tsd7rNl2tNG+mTGvVptny7TDXmmfU9Jpk7abZV0OTa/L2OlTt3uU7R7FcNzUH9H1hbVDZcbugKYvoB6M6icrrDPlpuUqy2zK3BvQVWhFCgRqAA9FJMQCJwYbBidGNgATAhuBXBTt4fBtJFePKAVgGUEICEQAcAhQUmAjwQ6gARAg2JVaIjHBKbruLA53VYx4JBIASAH0XNqmFGeMohq7sCOkGC13BmV8IQAFiAcYIR4A5gDoADJK8T6DqtGmsYqAAyDjcCU0h53vwDb+EhRZWo4f0LzABABJU0UdTpJDA0xVuR9ebzvZ7O5RoRoC4oh0AUcLWA6gA1ADGAhCg5GOJPQY9AAWAjsRZQBQAagxYvEpBpAgsGLswrQOMA0AxG5/HgJ4f7xHEETJKd37/Hv1CfTer96zciUtK8AIk5ig3uuB3zV913Xr70X73o4KDVcgpmhEAA/AQdAy9nlME4idglHUIUUAfJpita7lJKkmKAOXryBIKcZKkpIC6AhKQ5BaktCSBItAKYB8DwL5ALzdsfI0QJxDpwAFAKIAZYCTiEoD148JJ4Jxq3xUL+lWSqfsyim7dN6nXg+qhgzSTik9ZpAeTzrOpe2nKvQXGpy3NnlvbXLfmLGerjDP+fRWsqjRWAIhei89AzKEtRRHxxM65WK/WhW3WSr9jtZk7Nza6M0Hque6nfvHApszgSPzfkgb5OVqUULBj8t5KbWgTM4JClFSxS9XE/VWUYdX2RdSDcfUozH5ZFK5mNatVduWK40LKdVms/1Yt+dgs221wbxca56vsMwkjZMJw2yVY7bKNRgxdniVbW5FX0A9GNYNR3Wjcd1YQjdbbZ1IGftDiqGoejbtXG8JHmj2bjQ599faJ+K6fU6xR8AxAVgAXDRpJZGRxAaC0AKWU6DAoMFgopCewrLdfQ4hhGkKEHAAHHzagkBLEjSw+RTE5gCkGExcwiflJXTSequoySVr9MhavYrekGYkpp9Pu2bT9oNp80ajeaPRuNnkSWiFJABglpZEYcQhEE0D5gNoKag0KBqMCiFgAcJ8hDmIIABITOyuyfetv73yEAS7nDFis9oUwmEN79JM5VLcWEuhKGAHgBmwERMGgjAQSAtgoUgDgAHABuAG7AEsxCjkdO1fWd7Yvz42NBj1+EWIEgEhBrDSPD3JoQG4QsHk5OTCwsLy6komk2ERsrdVYq/Vui6iKwnDwF6ZGYIsftpQ3N1IirOL8feFgns56yUE7gW8EDCFMGCQ0pQDSAPCBC4KrqHSFQAoEhMAXIwFBJJRlAqTWpLWkLSGw2XP9SRt5vLNfJ6eplgQyjFWEIQIISEAfxeEHIQoBBSCSh5Vg3GcgBSBKwBVYaoW0QEAB4JBvXhEJ+6UiycsygWvetajXvYqhgzSLhlnzCDdDJvPVNpOpLQ31touNLgvNLjP19nOVJlXgsYAF1Owqxa3Z7eidzXXNCRtEAjdKnGZ2ZRy2tMhd1NZ+OhM922H647MB0+tlh1diGzNhqHFTHW5BEMB+WRcs1htWUqbV2tth1vcpzp8N/ZHbxtLXpkp//BK5sMrlQ/vr354f/Ujq/Ufmq28Mp26bTx+YSRxsiu0UGWcqTDMV1lXal1TFabxpGEsaegJyTt84v6oqsspHwxoxmOGibh+LKaZThjGo5qpuH4pbZxKaWYqDKu1lqUKzXxSOZ3UTKQMNVZtUMQ3AugQ0pCgIJEUYzGmuZjkAyEBQgpIjgkpxkKMaDbYwxSX4AgAlABmjDQYKUlSS4NNhF0iVKbmdwUNQ1HTfJVtvsKyXuNYrXUsZ2yrtbbNVs96rWV/jWktbVhqcM/V6pcbDSsNHr+Sh6Coh0kWVThJILgAFAUEtzihDrFbrJjLp0pfA37PMuxd4gghAJJfVHonilYKEXIKjrTZxuziSoAUJfCSpB3ACGAlwIGwHZAVwARgI2krl6sAkAHcdNNNv3vz9zuFfI5hcgzz1tvvfudbf3PT2Rtry5NKkpIAJgBuv+sSwzBMgckzhePHj38QISwOS1YRAPh8PuwKNL3/tgEASEykfa6I1VQUGSiKULw/o/r+g33vXpeVvQEagCYpIAkOgB0IHWLtCEYAHIou3hsgBMCjSJaTqeTztBRHhQgNScsQVmKsBKQAMHC4Bg6tpUk1iRUkkmMsAWBDQT4AH2EuxiwCKQTlfLKeQyW5OEXjJIYkhjQi3KzOt4o7oOA3cTkDKv5awLgWtRyKGgb14k4pPWFUHPAbjyfMWzHVmSrz+YzjhirrmRrLmWrLZsRULqT5AKxrsxeHFAI+gBRjLcXR8wUOuSBuNVa4nUUQTvdeOdV+cs17bMl3cNK9OR2Ge5YqPn5s3xdvHnji0vhXbxt+4o6Rv75/5q/vn3nxyuwLd82+cNfsM3dOP3X7+F+e6Pz4RtMDi5W3jXhuHfLc2OvdbLCupU2LKeOwX9bvlQ4F5NMJw3yFZa7SOpkwDIWUw1HdeMI0VW6fTFkmE4b5KutSjW290b3ZGjjeFTvRattqcRzZ5z3VGTrcaN9ssK2mLTPlprG4sc2lSqgFbgE206BBRU9DAlgGoASkArBwKBuPYxVwDTSl54KBi40k9gg4fiGutchbPfomp2YsbFiocE0nzAtVzrlKy2S5fqZaN1+jn660zGccs9W2mbR1rtYxX2tbqrGt1NiX084Dzc4DTdbVpqCJTwBBAoERDVwEHBJIAoSYkABSAs3FJHAwBcAjCJYuSCBM4j+xIIEkSUAkWbQkJGKtBKZIgNGkbjFiqUcQAXAAuAnkIpAZgRWTNoIyAbISHAUAF4Ai4c57LzMFhsnlmQKTK+RzDHMtl2V5bdvZaz/4m7/9zKMff/bZr+eYfD6fZQrMW++87XA44P0qTO+LAN9/EASBSaKUvCm9RSqWpG16u4grYSerkayrD/Qe4bnrjhK82Z4meL/BBARCADtJy9nUBuBi2gshgiAQAEbAITANQBJITBIaDlcKoOPx1VyOnCSkACqCMPB4KppQkEhBIhkGFoRsWYIHiAeIVYJhxfwrOLiBplI0TpKQQJAkcJqkXABOihgyykY04jahoF/OXXJrVoLG/SHtmEXRJiKmzKpDQeuxMsuRmOZ0pelc2n4yZjhebTpTYzmVtNdJ+EL0XgHrva8bgLsLQoNAaJfx41ZjJuCriXib47FTC0N3Hm+9aSt2fiN+bDF8bCEGf/fYiW8+fPjFjx78u48feemja0/dPfnUnROfOdfx8EbNPYvxi+Ohs32eI632lbT+YL3zYL3zUKPtyD7v/lrnSsZ5oMF3sMm72eo52Gw/3evfanWe6PSd7gmtZkwL5foDda7VtG2jwXa83bPVYjve7jjRbjvX5704Fj3f77s8HL59OHZDT/h0R+hYk/NIk3u9xrFS6z5Uo13NmGaqrH0hTYtDVG/mN1iVjXZTk0fT4JA1u6QdXvlI3DCaMA5Hdb1+RatP0ulTdbk1PV7NQEQzltAMBkSL5fr5avNQWDYSUY3FNCNlmpkqy1KdY7HWvpC2LFZbZssNSzWWqUrdfI15pcZ8pMWz0eY63G453mmfq7SoASggKYLmAYgQJQGsAbAQ2ILARmEjJtSAOQQmYJfC+37H7IM9sgAAiKSL9Aqq6PEhCmMcknPmIt59PLKCQgGCtANpBKwCIAkgAeQkIQdQIUKKcU9rc5HTUyq/ZHeYQp5h8oV8dpvZ5RkwuRzLd84X7rnv3pL1+0/lGK+TimHhUeKdl55HAC4SvBKuhktwSkrHBHEdBPfGfvB+v/e9j2LXWeAB2EhaRRNsizq7mIs+PMKlxAwCkHAoJU2zgvMympRShJhAYgAlTckJUJBIToCkuFODAGH+bihI7YayGFCGIltIbjlCKYBKwGmS00DxvQBWBH0aYZ+M2yOXTRsUS27NStB8IKAZNcubeTBhVKy4dAf9miMxzZkq86ly07Gw9kiF/oY6283Vvla5UAx7qsi7fgRGwAWQIKQhaR2PbxbREaO2JuivCjjrwsGT84Pn16oOTNrOHUyeWI4emPDA50+3fXghce9s8vJ0+dme8FqdczplGgxohqOGsai+zyvvcYkmIuqpmHqryb/Z6L6xO3BxKHRhwHXrkPPKXOTyZPhsj/tUh+eW0fiJDu9Wq2cpbZ1JGvc3uLdafAcb7JuN+nN9npv63Zcnw/cvpi6O+C4Meu+cin1kLnnfVOwj86mHVtIfWa5+YLnq/ID7xkHPiXbfVrNzqUp/sMF+oNE1k9LOVhrnqkzLNc6ltHm11jKZVE9UGIfi+oGovtunbvOquvzqnoBqMKrtcAsGI/KxhGa53rnRVXZsoOJYX/mpwcoT3dFDjdb9deq5lGAqoTxQZTlUZV+qti/Xu1eqrRtNtvV9hvVG54Em66FG7VCFnoOBBCxFwMegAdKCaReB3AjcCPw80oxBCaCj+TG7q768ore9fWxkdHR0tL+/v6mh0ev3iaWSvSuvpD523WLFBAWASQT1VtGBlHlSJekxWdemx1dnxhfHRxfGJxZHR20ioRVjO4AJ0HNf+UqByWeZfJ7J/fb1X33/u3/78s9/UmCybE2xVPdjGIaV2CgpwXxQyHAvAksV9us0C/e2gCCE3EqpVS5Rifjtbc19A73tnR39A0O9vf2ZTOY6MP8xwJcuxTYc0AACTHGKEy/+kzCV9erZ3LWcpuUkydYM5ZiQAkgBFAgpADSIVAKWIVKAMA3ABYLYZcwDmzMDwEBEOahNIMzQRIYmkhjiBNRyuCEELkCDFsm0UdzOI3qU9LRVthmz7y/TDBkVzXx6xqFb9ilX/bKtmOV82ne0THsyaDybtt1UZT6Vtg6YxUEACgAQyQO0O2gRAAOXAhUXm7iEVSpzKSRJp7ElGa4NhTqrEzceGr2w0b4+6j446d2aCx2eDcI9E5U39YSPNTgOpW1zMX2/Q9JtEw/5dZMJ/UzSuJS2bja7Tnb5j7e7Lk2l7p6ruGe68s7JxO1jkUvj4dsnYreORm7sD9/QFz7VaT/X5z3d7TvUaNtosp/uCZ3tDZzocJ5oc53r81+eTj5ysPHBtdors6n7FirvmSv/yHL1/fPltw2HLgwEbh6M3tAXPtziPLLPvZaxrtba1utdh/cFN1pDi2n7fMax1uRfrnEdbA6MxTSDEWWnX9bpUwyXGWcqnf1BTZuVPxRSdntlS83Rj9589O+fe+LVn/7bO2//4d133irk8oWd7TdefeWn//L955/4zKUbNg73J5cbXQeb7TcOBU51uQ82OTdbfWcH4qf7I6d7vecHfd1RNQdAimgNgJrEdpJ0kNiGwYrAjKHSaTuxtPRXj/3FP//jD37/m1/ncmx/IpMr5BmGyeeZ7e3tf//3f3/iiSfOnj1bWVlZKgy8J60LgN4fLJlI2GwMHo5pH1gZZQrX8tdyTCHLZPNMPvv4pz5poggrxmmLjbl2jcllC/nsL3/8o4wvYObyPUr1UEf7Yw8//B///hOW3cJ2KjAMc/XqVavVyl5/bW3t7rvvvvPOO++4447Lly9fvnz57rvvXl1dfR8w/khypXSwYOhpby0wO9n8TmGXLPq73/3O7/fDnjTMnwwVARC0tLTce9fd99915b47777r0h2XLl26/Y5Lly5duv322++5555Lly7ddtttd9xxx+nTp5eWljqam30Oh5Cmi7M4AQkxwQckI3ARhwgJ2Ck8wI4ZLdpzKA4EYeNvIkRCC5+fJokMTSQQlCHIYDIE4MbkkE2xaFcOa6QzLt2cQ7nq02/EDaMmVT0NYybFakC9EdNuRgynUo4TCf3puOVcvfNivfN4lXXQIotwKAIAipq0BFAUECQA5gKhJngOvtRBiYJiablW1ehyNLm9LX7fgf7Gm9a6JjsNy8Oug1PB48txWK+1rKSNMwnlatqyUmNdrXXMVhpHoorZhGGl2nqqK3rjQNkNfcHDLcazvY4LI/7TXe6tJuvRFvuJDu+RFtfhFveRfd7NJs/hJtPpTu/xds/BBvuBettms+twk2Mto99q9m40OE60+871Rw432w/WmthJT0da7cc73UtV2sVqw3LGNpkwDAZU3V5Fj186kTLOp11DES2rntgb0vQE1YMBzWDY0OlRtnsUzXZxT0DV7ZV1uiW9HkWjid8XtXz5I3fkf/0LZvvdAsNs55lsPseSgLMFlvtbYPI7TOFa9tV/e+nxR+89Pb5arz7Sqj3S6dhoc53q8B/vsl0YDVyZr2xySmQAGsAmACeFnQRYCbDzqPHWxic+/am3f/0bloyaZQpsaoTlUrGJEGansJfBfO3atW9961uHDh2Sy+UIgB3MRJMUW1AiitOtaT5Ag0N830TZ45f3M8xOjmGYQo7twGLy2S8++ogSoNLpePTKlYfuufLoRx7orakxADICmAhawgpnaDR9fX133333Y489du+997a3t5dQRNP0Cy+8UDKS7O0VCoWXXnqJIAiSJPfireRGltBY2ju4ACTA1574KusNF0o8IYa59dZb9yoLA1xPgnsfBgl8/vx5Jl8oPt7T3bpel5G9YYZh3njjje985zs333hTLBJl048UOxSJIAQsU4wmCAAuSbAORik8IAGoIghxiIRmHq8SQTWCJEAMoJagUjRtBei1yFa8ukGVeNSsmLEpl9yaJa9i2q5t5VNjetmCS3oorDocNpxM2o/HtceSxrO19ouN7iNJ45BVnhILeQiAQEAUZ0txAaQARoAgl1spk/W6tZMx83zKtFxpX874RhPGiXrz2qBnod893+dYGfYeX05Cf9g6ELG0OhT9EWOXV9UTUPWH1b1B5XhQORc3LJWbpmPK2bhyqUKz2WA9vs99qNG6v858qMG1knGOhFSDfuV0yrSYts+mzNMJ40SZeSxu7vVrul2yfp+qwy7scEm7PPJev2Ikoh4IyPr9svEy3XiZbj5jX6x19QdVnV55l1e1zyFrscubrNJ6M7/BImi0imoM3LSOrjHx6yziRruszSquNwpbXOpmp6rTp253S5st3HanKG0RbYx0vPIv/8i2PmSLX16e5Y1mc4VdTjbLV9thcgzDZHfe/MXzn7nv3FTV2VHv+RHnvfOJ+9dTH91fdXE0Ua6m1AA2hCMcygVgIWG0Lv3S419mrm2zbPDtfJGrxjbaFRdRvsgULwpJ5XKlDtqdnZ0f/ehHayurCIBLcxAAyVIrMBZgAgFFA7ZJ4I7hyKfPTe/k39pm2D2DKRTRmP3zjzygIBGboOIDaAhspTlaABkblBIAxHtBXQkMpeTn17/+deYDx9WrV6+Hxx8PHQEAAa6pqSswzE4uex0IX3nlFbY7ke3n+k8LhnsvdOaGswzDFGVIi52S78HvOijmCsWPIpvPvfnmmw888IDJZAIAAbUbnMJ7oswlG4hRsYIqBkwDBoAACS18fjWBaymyisRJDBnASYI0A7RqRCs+Y5eM1yampyzyjahlxa+Zdeo6hNS4QT5nl+73Kw+HTadSjuNx7fGU4XyN9fZG99Ey/aBRkhBwFAhIAB6ADMDKgSo1dzig3Wr0XR6tfmRl36eO9n3p3PDXLgw/cfPQE7dMfPJ8/6XNqmNLno3p6NKge3nYcWDSB81WUZNFWG/iLNa6Vho8s5XGmQrdUo1pLW061Rm6oTe+0eA61OA5WO9dqbYvV9lW6mwTCU2/T9HpVnQ4FV1uVZtT1mDmNprFGZ2gSsevtyjSRkmFmp8xijI6QYVWlDZKas2SBpu0wSZlieAZo6jZpmh1qFrs8gabtMkhb3HJW92KZqes1a1qsElrTMJGu6zZqWB/2+RUdTnlTVZ5vU1db1E0mASNJm6zTVClOwimZwAAIABJREFUo284OPvOb15hmPw2w1xjkcdkmQLL0M+XdtN8vvhtZxnm3WyuwDBMnsm9+m+fuzj+0fWyx47UPrRR8eBy/ObBeIAHbg7lIbGbQGEB7/5bb9554w0mz+RyBTYbWWDyBWanhLfCLl87zxSyTIElkRYfu+pjuVyOyReef/a5UCDImkEhTXNYDRJM8wCMQuixCG6b6mKYa9v5AsNkd1XYijh8+N4rIgAVQegQ0gGwxD0eYgdzvRdwfnAqBkEQJfoos6sjyjDM448/XooVPxgTXgdFjDEA+em//OyeTY29ueLVtra2/gvslTBC4JOnTzF72vxLkM7lcnv9iD3Wm8nlWEnFPMMw//zD/xOPJQBIkuIhTCOKBoQJkq0NIzbaFAGoMWFApB5RCoLkAQqQ0MTlVyKoJnA1RSQJXA0oQZJmgEo+nrIru+XcViF3SCPciJq34vYZp7qFA+MG+ZpfuxkxbISNJ5P2Eyn9qQrjhbT11ozzZMw0pBPHaRQS8NUAJoCUUjAeMZ9pDtwzFH90seovNxq+eLz1a+dnn7u08uLdKy/csfiNe/Y/96ED951uX5v2HpoObM2Htxb8p9YjcKTVfqDOcKrL/dDBprvnyi9NRR9cyzywXHHLeOL26Yob+iMrNeaFKvNMuWkyYZirsI/EDYNRfZdX3WJXsjPSKjTchAInVXS5hlumoso0dFzLCStwQAxBCYSl3IiME1fxKwyiCoMoqeWXa/gptaBSI0opudU6UbmaU6ml6s2CFoekzS2tt0oabFK2L7HZqWh2KvZ51M1OxT67qNWhqLcp9zmVnQ7JYFjT6lXOtaf/8MavmPw1prCTzxeb0LZZe1hgCoVCPneNYXbY37JNFVmGKTDZHMPkc8wrP/ibe5Ya7pkOXRwJXJxy3dJrPVjj9NEQ4NJeDq5xOr79lS+zJi5fYHLFDjfW3O5k87kCm6Jk8rlCNsfks0z+GgvOklXc219XYJgC8/LLL/f39yMADkJCjOQkqQQsBVDSUEZTt8/OMcwOw+Tzhe0c60HvrvVc9t0rt96iJKmIQOClKSvGOhoL2RQiQbJzVK7LRpZQ8dRTT+317tiTp59++oNthB/EcCl2jZUl3nl3u7DHdWQP9mol8bU/Rp3Ze5w8eXLvJ1O6sb04LEG0+EmWfNcCw+QLr/3q1Ug4DoAxEGxxnO0hEgJWIKQEpEZgIbADYSsQBkzJASI0buTwkgBJgDhADEE54ChJmBAkucSEVd6nEXbJpH1y3n6/9nCZY8qubOHjCaNqyaM9EDIcDJiOxm1HE7qTScP5pPFsynQibh01ypI0tOu1lVKhm4R6PW8xYT6/z3/fcNmjS7V/udnxhVP9T9449/ydB5+9cuiZy/tfuu/w8w9s3HuqY302cHQpfOZA/NiK/8KxFJzpjqxUmZYqDFuNnsMN7rNdsYsj1YdqHbPlmsm4qj8gHgjIRuO6kbihL6Tp9qlbHYpGi6RSy0up6Ao1P6XmRaVERIJjMrJMRUVVZEiOoioyrMABKUTkOCajy+ScpIpbqeNX6rnlaiqppMrVnJSKTKlwjYFbY+A228UdbkVvQDsY1Xf4Na1OWZtb0eFVtbkVLQ5pm1veG9L1hRRDSWtf1DQcNSxX2YbDqp6E43+9+DTboFC0e7kd9tvNF5jcTvaff/C9l57+0rNf/sTfPvdXr//8X/P5bJZhdnLvFhiGKWT/8PI/3jJXf3Of96GVqgfW0rdMeC6PeOcTpgCXdiLoKgv8yz98l9lFUMm8MQyTz2cLpQrBzrt/eP3Vn//oX1/+t3/59c9/lnv3D0yBKexk9/ql+Xy+eIOstczvrK4skQAihEQABgAtgJwCPcDxkUn2vVkmt5MrXiS7Xcz9MLns5ZtutgMEOBwXgc0YKUjEL3aykXtt115SNQA888wz1611hmGeeuop+H/Jo+xe8JGPPcz+Hz6IExaKU1NTH0T1Bw8EcPr06dIbS0grFAovv/zyL3/5y5///Oe//e1v2b5+9svNZ/d4p7vqw9944XmVSCAGUGPCRFEmApsQ2ChsJSgzRmYMDhI7AewAFgIrASI0buYJqkhcgSGGIIQgAuAC0ALESDRslHbKOS1CQaeIXnEr5+3qSZuiXcQd0irGDOIFl3rRqV0P6Ddi2uMJ49mY/mjKdCRhH7LKIwQM6tU9WkWAhjqtcDaqP9vku3c49dhyy2cPD/zVqYmnb5l8/srac/dv/vWHjnzrwaMvfXTjgXPtBxe8+yc8RxYDJ9dDF0+Ww2abf7Xe3h8Qd7q4kwn9dMo0GtF1uyS9bnWPS9XukHd51fscigazuM4izRhFFWphhZpfrip22ZepOBEZXabkpZSCiJiKyjkRGe0X45CEjMjolFqQ0QnqTaIaA7fWyGtxSJrt4la7dCBsHE4Yxiss4xWW0YR5qtIxEjMPRYxDYVNfWN8fMYwmbR1eZatd0hfU9YU0/WHtYEwxENcPJc0DAfmwT9hqobYmOpj8NTbeYxMwxeAv++7fP/u1G6da1xvd+2s0Ww3KW4Y89+1v+vxdh37zw2dZ7yf75m8eOTvw6MHoQ0uR+5cS963FHzhY9fBS5bBH4aHIjF758ndfZJj8O4Ui6ti6HLv+2E35paefuuXkye6a2pjB7BHLvGJZVK1r9Pnnpqb//GOP/ubV10pZB2Y3d8oU86jZ7e13J0cGRQgpKMoM2IQ5EhIrABa6etgK33aR7sIw2TyrSVPUR8oV7j99zIzAgcBJ03IAAYEAAXzAgpV6cBFCTz/9dAmBJeQ8+eSTJau11wXdm5spxZZOp/PNP7yRz2cL+SxbgSwmePYA6YUXXiiZzT9VogA4c+r0XkQxBaaQy7/22msOh0MgEMhkMo1GE41GR0dHP/e5z7FbXoHJZ/M7hffyOXkmf+3A1KiBQB4u7SNwgEBBCjwYrIAsCCwYnBR2YnAgsJNYAxAioZHDqyLJIghJiCPspZCZJAIAAzpRt5LbyOV3iuhDId2cTTNpVzfxiHYRt0/Fn3dqxo2yaatsM6HfSphORPUb5eZDSVu/Te4B6JGLhnQyL6CMVDDtN55t9H5oKPGJhdovbnQ+fnL46i3TX79r7Zn7j7300Nlvf/Tktx7Z+rObetan7YcXoyf3J249nT51KAyn2oPraeeQVzXk14+ETB1uZYtdXqMXl+u5KR0voeHElHRcxQ+KibCUDsnouIJOqrgJJSeuoOMKukxOxWRkXEGXKfkJtaBMyYsp6biaTqrJKjXdYBbvM4s7HbIOu3A0rFrL2I+0BmcTukN17jO90WPt3vWMcblSv17jWMo4R+KmnqC206fq8CrbPYouv7rJIWVjxVa3osUt2ecUtrvk3X59p0fZYBF8+dF7CwX2a8wz+e08q9ZUYL579XOr9fa5SvXxDu+pHt/pbs+tw8HL45E7J4O3D7m/+dVPMm/99Kv3HL04nnxgvvyh5fKHV6vvno7etRC7fTjeZhbYRPjFq08yOYYpRn7vMHmG2WYKDLPNZPPMmy9+5ZMLDdVhCnkQWACMGGkBzBhZETgANAAKhFwG3S3nz77x2qtMvpArCmTn2ZxngWFyTP71119tqqjQALJg0oTAAKBDMN8/wBrMHFPCbxG62Xxu1xnLXzh2TIeQAcBKEgKWWEcUgceOHyMAoz3zA1l39Lpw66mnnvpgXhT+SD/E5cuX99rS9zJSe5Ku2Wy2qakJPkBVux6ECJ05c4b5wPGrX/1KqVSWmA9olw9dU1Pzi1/8Yq/ru5sMyz//+FcsHMInIIJC5KYhwEduAjwEYQMwA7hJ7KXAAeCgKDUgO011cLhNBNSQuJ6gazl0hsBRADOiXQA9YuE+sShDkT1CcsalmbPrxu2qBh4M6ZUjRuWkXTlhlc445Ut+/aGIaX/YeCBkOBg2DpgUAYC0kD9kkKaF3CSXGPLoj2Rc9w6E/2Kh8rOH2r50w+RTt8xcvbT6zJVD3/jw0W8+sPGtR7buO9G5Mh7aWomc3UwcW42tjQbhhn7vSlo3ndRNJY0DYWWXT9ZsF1fpuGVyIibDQQkExBCRk+yQpoAIh0QQk5FlcoqFX1iMwmJUJqeqtMIak7haL6jQ0GkDt9EqanNIu72quXLbfIV1f4P7eHvocIt7q9m9UmVYS1vWay3rGfN6xnywzrbZ5FmtcU2kjINR7UBI3emWdHtlQxFtl0fa7pZ2+RS9QXVPUD0aV89UaFabrGeGoieH47/4wV8zDLNdYPK5HaaQZdfum7959fBQ7aEa7VLauFJjPtzm3mh1rNZoT3R5bh0rO7rPttYdu+tAx/HewIXR0KXx4MVRz71LqXuXK28e9W42WMtEcP/NZ7LvvsPkGbZLmGF2mEKRl/LW66+c3z8bU3BTUk5aIUpIeGEh38WjjQB2ErtJ7KWQhaJViC1bQXWs7BvPPVcosC3jeWY3nZhlCgyT/4dvfsPA5RsQaacpMwYdgunuHibP5PP5HJsV3BWWL3nCuZ1soVBg8jun19ctHEoNoELAB6Bx0aixZQ8OQZLF2bHEfxeEew8WjUaj8dVXXy29cS8SSn4pe/LFL37xvwwI/xgIX3vtNbVazWKPhR+BMAZEkmR9fT1rwPdmUJkC88Z//EeF2eSjcYSPowIiQEOQJuwEMgOYEDhocHPBRoCVQ6gBW0mik8tr4ZF1fG6a5CQwigH4AfRAehC087kNXE6GIruE9KRTM23XjttVtTR0ykSDOsWMSzdhlU7Z5Ys+w6GIedGjmnfJ14K6frMihCAjEgwbZfUyURkFnSbFgQr73T3BP5+r/MsDrV84OXz14tyzd+5/9p6NF+7bfOGe9W89svXA6a6lEf/iqHth2LY85loc8MKHN1qOdfnXG91TFeb+sLovrG2wiSu1vKiUCItRQAABMUQVVEiKowoqpqTLVJyUTlBhEFUaxeV6YULDi6u55Xphs1Xa7lKwXUsDYcNUuX2+0rVU7WLZ0hst3q0232rGtFSlX89Y1zPW1bRtqyVwtqfsZGdkLWMfCcvZ4HM8qhkNq5bTjuOd8UNNgeW0Y7bCMpkwzGU8R9qDp7oDpweCt00lD3cFfv0vf8tObmEYVh2IYRjmP37495Pl+kNJ7lqddSltXKjSr9RZDrf7Drb5VpucGx2BI22OzRbzsTb7hdHwqW7nsQ7bDcOB8+PRMz32iTJlb5nnrddeZa1PPptjfUI2JfjGyz9ZbKkpF+Auk6LNJG/SSVMSblTEcXNIMwK/gOvnkQEadAAWDqUC0BBYDGCTyb/4qb9gmPwOC6oCwzDMTpYNEPM3nzwlAzCTBAvCmb4+Js+USo1s2Z1hmDxTKD22WUBuv3tidclAU0aS1CBCtms9KFTEIbHLKf/vgvCDTbqlEK4UDV4XXpau/Pbbb8disT8G6f8XEALLWUMYA2J/srf09NNPsy9jCQmFQmGHYZhcvqe83IkgzMFRAeHC4CHBicCBwIrASYGfg5wIbATSA7KTZBuHW89FlTxOHFNegACAD1MaRLoJaOJy0jRZReI2PjFqVQzrpYMGaR0H2iSiHqV0yCDtUXGG9MJJq2o1oBvQcocNvPWoccCmdgOUUXjQIO3Qq5I0tGrF+8ttl3tCj81Xfn6z40unR5+4afKZy+vP3bv5/L0bz929+o2HNu85tm+oVT/QbJ4fdK2MeQ9OxmAsbmxzSFvt8lqdsFrDSRv4cRkVl/MSSl5cQUelRJmcSmh4cTXNKm2X64UpnSCp5ad0gpROEFdz42puUsvP6Hi1BgEb+zVYBC02cbtN0mEX9wZkfUF5b0DW7ZN0ekQdduFQUD0W1Q8GNH1eeZ9XPhhQDUZUA2Flf1jdH1Yvph3TKdNkwjCdMo2X6WaSxqVq+3LaMRw3DYWUg17JiF8xU2bo8khf/sF3dkrJuny2KND0+1+dHq8/2mg4ts9ztNV7tM230eLe2Oc72OZbrneuNnu2GsxbTfbjbd79ddbVWst6vW293rbZ6tlsMjVYOV/9+ENMgdnJM7sRT45Nrvz+16+MNpTXKLnjbt2IQ91pkzUbJEkRUSaifFzCQaKYVBDgYj8FVgKsJLKSyEFRNoLSABiFwm8883SpoM8WGQsFhskXXv3VK369QYeQBYEWYG5gYNcNzbM2k70RNjORZwpZhrmWZ7bzBYbJMzvbB6emtAQ2ErQBkRyEWE45jyD4NMWnKZqk0H8fhKUokT1RKBQ/+9nPWENUsn65XO6zn/3s97///b2XZc3UQw899P9jCWFPF8XeDsM777yzRDNgT95lmPz2O+PNDQ6AGJ8ICZCfBx4eCiDsx4QLIS9GYQ72AXgA2QDbKLKZosoxBAnwAfIg8AN2khwFkGaAOpqs4tDlJGoXkBNu7ahR2auX1lKokcdpEXJ7lMI+jWDEJOtXCyfssnGbdN6nXgsbO/USH4IoAU0C6NYpEgTUSumFqOmmFvdHRmKfWm/+/PHBx8+NX720+tw9G8/dc+i5u1e//WdHHryhd6hVP9nt25hLrE8G5nrtkFaLyqW8lExQLudXa3g1JmG1XlChFrLShhEJDotRUAJBCcSUZErHqzCIEhpeTEmHZQQrAcxqAUelRFxBx5RF1eBKLafWIGgwiTJGXr1VkjEK0gZhrVlSreGxg9bSWm5Gx2MVbmrNgiaHtDOoGYgaByK6/rCWTcaMxPTDUd1ASN0XULb5lO1O0VTCvFjtmYyb+kP6H//9i9u7S5Y1LzmGYQrZf/rG1zb7q6bjipW0cbPZtVZjXqjSr9ZaWMN4oNa61eo53hU50OzdagttNDkP1llu6AltNjtGM/78H35fYJidPOuI5vPZXC7PMPnsrYfXE3K61STq96h7Xco+r7rDpkgruVUqYZmE5+MSMTHfz0FBDgSEPAuABcBLU26MbQjrSBQw6X/5ys+ZPOtevlfAyBXyZzY2FAB2ktQATPf27iZk8qVC9jvvvMMmZwuFAiseV6x5FvI7b/5ufnBAgZAasIQiWfoIB4BPkmy5jPzvg5A9SkmatbW169Cyvb29s7Pj8/m2trb2wo89fvOb39hstj8RFv4JELJM12JOaDcmZG/m4sWLJTvM4jDH5JntdyfrMh6AuIAIcSEkJDw85KUIJ0lZEGFByMehXASyIWwG0kAQ9QSZQuBH4APkI7AXwAxIhkgLhjRJxBHEETRR0GeQDGql/QZlNYlqaKqJz22Tcvq1wjGLokfFn/fqF4Om5ZBxyimrERJ+jMv5nHYZPaCXVfNwRkzPhE03NHk+NBj99FrT54/2PXF+4ulLS89eOfTivZvPX1n7zseOPnrLyFiHcbLbtzzqO7IcWx/3QINZnpJx42KqWsOrN/NbPdJ2v6rOIqw2CGvMkrRRVGeV1ZglrP5vQsNJaHhlKg7roPqEwOpwR+RkUidKW5VpqzKlF6Z0goxJWm9R1Jtk1QZxxiRNG2W1ZlXaIK/SSTMmeaVOXKHlVRvEaaOk0iiuNogzJnG9VdLikO7zKFlO9mDMNFPtGk2Ye4Pq3qB6IGocjKjGU+rJSt18jX662nD10w/urq08wzD5ArOdZ7K5AlPY+eWP//dHTi5MZbwdPulQTNMbEA+GxAtV+tWMYX+TY7HOfKDZebjdd7TTd6TNcabbc/todCymuffcJlNgCsWKVDZXyLJpkh++9HyFgt9mkrY55fs8yja3vNuraHcoMypeSsaNijgBLhkV8Xw0+Gjwc6ggn+vmkF6adGPsxEgHoCXgzOEthrUnxUIHw8aKf/fNb2pJyk6SBoCJri6GzcEweSaXLVYgs9tnDm/94t9+xBTyOSbP5BkmV9SVYpj8u2/+dqirgwcgAlBQlBhjDgAfA80KHAH6n1lC9pBKpd///vf3iouyHvKTTz4JAHa7vaR4X7psoVC4cOHC/6clLFpjQCVL+MlPfrK43ZZi0ew15u23O0OBAIYyHhHkER4u4aCxigApBralUEFhBQlyjEUIyQHqKE4lCWEEEUARAocQWAEEAFYSqikiApAiiWYa7ZOQ3XL+sEVbTUIdl9MiEXbIef160bhVOWyUjZqlQybpqEU8YhTWCIkwSVWLBWMWZZ9GWCcgyrkw7NGcqnd/aKjs02tNnz/c88T5iadvW3z2ysGX7t944crKtx/Z+vPbxie6zLMDvrVJ75Hl2NZ8BFockjoTv8km7vSpOnzSdq+k06fq8Gg6Q4Y2vzZjErODe8vkVEiKwzLCL4KAGEJSzP6TDRGLfqmGF9fwoko6IiejUqJMSsYlRIWGrtBw2bp8UsFJG4QZo6Baz6s1i+qtklqLNG2UZIyiGj2/wSRod8jb3PIWh6TJJmq2CXqD6sGwZrTMMJE0L9e41utdK3W2mbRxpd40FpfctNzHvPv7QnFlFPVw2fgtn88zuXde//d/+vLHP3xstqe/3N4dVo2X62bTxokK/VhCM1mhXaw2zFWql6t1qxnDasbQ5pT97TNfLhR5Kvls7q3itJbCtcOjffUqfrtOUKUgOwLGgYil2chvsYirVdyYkAhwcYBLRsQ8Lwe7KYjyeR6KcNGEm0NaAbwk6aJJEwKbWPr6z36az2eLxYZi7TD3zpu/T/v9FsBGQOPdvUyxnpFnCvkCw6Iu15gob05W/P5XrxaY9+qVpYrZH978XU9Hu46ipQAqiuKzFUiE2OTQ/zgxgzEeGRkpLf29Ir+tra1s78UnPvGJvdhg/8pPfvITpVL53wXhq6+/ptK8D4SlWzKbzR/MDDEF5mc//GFQo7ZyCDONdTRmVS12Bf0BEGACSAAKAQIQANRwuTUcnCJwCogkRkkMPoSkiHZwyEaRII5wJU11irgdck6niDvq1FXTkKGJJhF3QC+bdusmHOoxq6pbyR2xyGdcmgmrtEnCiXO4ZRhaBWhAI9ynEKQ40GuVn6h13z8Y++RKw+c2Op44P/HkrfNX71x//sr+Zy4vfPuRw5+/srA04p3scS2Peqb7TCvDXugJKds9MrYk0OVX1pl4SRmV0UpTKhxX4qAIolIUlaKolAgKUVCIylScMhUnoeGxYWGVSVJlkiQ0vAotjx1KkdRyK7S8pJKq1vCazLJ2t5SlhnZ6VG1OeW9I1+YRt3slPQFVl1fVbJfUGYX1JlGjWdhhl46G9J1eeZdP0e1XdrjEAyH1VNK4lHEuVFoXKwwTYdlETDdV7lyqdk1H1aNJy/9+8fEd1rnLZ5nsNTY9w/ql7Lw+hskzubdf+advf/HBC2dn941WmnoCqsmUZa7SOpsyTcX18xWWqaRxqtw6nnK/8+rPckUov8sw7+SZHJNnXv7X77cGbc0afqua22qQ1mhFXS5dp1ncYpM1mWUVCn5UxAnyqLCQ7+eRXg4OkqQLg4PGdhK7aNIG4CKwiyb1iHzwzjsZJp9lcrlCvkQqZ5j8wYkJC2ADwFTfAMs7Z/I5JpctgrCQ729olgHqbWn93e/eyBWyJVYcm+Ap5PJv/Po3g9U1GoJUYiwjsAgDOz9dhv4nJQr2J03T7PymUmmRPfnud79baguura1lFe9LCGT/yt4Wjf8BCPfeCY/HY/X2r7O32wzzyMf+jCyKdLENRBgQuVswpQCRe3reSR6CDE/QIODW0JwaoCoRVCAIAoiB1ALU8jgxgBhAv0wyZlb3SYV9Jnmag2o4ZA0Hd6h4YzblgEE8YBAPGSTjVtWsSzPtULTIeDGKLgPoVfInTPJBk7paSHebpUcyjiu9kY/PZz69v/ULJ/q+cuPU05fXnr+y/+t3zH/jo4c+c9f0TJ99dsA3N+Cc7rVtTqeg0S6r0nFjUkipyBqTMGMUZIyCOou4XC+s0osyJnGjXdbkkKeNopSal9Dw0mZFUidKaIVxjSCioCIKqkzNLVNzfRJI6nkpPdXilvRHFNPl6tP9kf11ptUm6/5W11zGNFGhH4nrRhLmnqC2zS3vDmi6vKp2p6zPqxwIyKcS2sWMeX+TY73GNpc0Tsf0QwHFoF82Waafq7CPRc29UV13UDGS0K41eZZrzaMx6ULacLwn/ON/+h5T2GYYJpsrldfyDLNTYJhruXyOYbbZPTq3zWTf+l8vff2WgzNdEc1IVDIdl81V6GfKzYtp+1hUvtJWy+yw797lheZzBYa5+pnHMipeu1HYZJZ1WDUtFnGjQ9zhVNXq+eUKKiXjhvhkgEvGxPyYmBsVUD4aXBi8FApwaTeB7AAWBGYALcBsby9TyO6ww+mzWabAMLlslik8cMftRgATW6IoJpr2ElNzgy0tOgAbhpmOprfefJstnzAsfY5NpuaY11/7RXN1lQxAC4QGkJ4i9Ri0ABKErj79ZHY3xMwVWDHT/J+whOz5vn379mKvdCwuLpaAihB68cUX91pCFpDf+973rtOe25t0/WN1QlaUjX0ZK83W2Nj47LPPlq5fVNovEo9y5ZUVrPQue1kCva/Pn03wlB5A4BoO2SemGiicBjqBUSWBQgjEmNaSVC0JYYAwELUI99pEKw5tp1aU4eJGgTCNUZuUN2ZRDmpFfSr+tE0yYZUPm9TNAl4Dl66hqYyAX0aSdVxOt1RWw8FdFslqhe32fZGPz9T+xUbzl04MPn1u8uots0/fNv/Uxblv3n/oS3fOT3QZF7ptG1OR1VHPgekQVOr4SRVdJicqtLyMScz+M6miIwoqruayk0ArtLyoFAXEEJIRfjH2i7FXCB4BeIXgEyFWLT8spVNaUY1Z1uZS9Qd14zHDcto5GlT0uvWddnWzQdRulXY55R12aYtVMBjWjUbVYxH1fMq01RTcrPMtJc3LFeYbepI3j5ZtNNmXM6bVWsvBZvtao2UxY55M6Ht8yrkK+3LauVBuXEgaVqvN+2tsa2nLWlfyH65+hsm9wzDMdm43sVnsoigyPNivcHsnV2AYZuetf/721WOT+7pCyrGkYbbCPJPSDwZE5+ZH2PodU8jm2FWeyxYY5sFbziR50GWRtDmVDXrxPpu01Slr0ovrDIIqNbdKJYwIaS+FgjwqzCPCPCLII3w09nMNGdEPAAAgAElEQVQIP4fykNiJkZMiHBRhAGiOx7Pv/CFf5MAVYZZnCl949GNGACOwxfpCsZJRavMp5Lpqaz0cvpemDBgWhoaYt9/JZbcLRTY566IV8rlrv/3lL9LBkBxAjQkNRmoAG4GEAE8/9bWiqcoX2dKFfPa/dEevXr3KvL80l8/nf/rTnyoUitJrSJJcWFi4jgXK/hwaGiq9pvQn2OM/BeGbb7554403Hjt27MSJE7feeuvHPvaxUjhayseU7oRhmAceeIC1cmwSmMYES6PdC7zSg031VPGoEbmgjoAqwBUYV9JEmJVNQahFyK8TEFFMNlL0oEM+Y5INWjTVJDTweW0SUYec1ymne5W8KZtm1q4a1IqGTcp+nbyRR1ViqBJQMRrSJNGtkNQLUKOK3l/huNwReWi8/C8OtnzhWP/Xzow9edPU126ZefLW2W8/sPn4vSvz/ba1Qdfp1dSRhciBGT9EFBy/GLOI8ouxT4TYk5CCjiq5rOdZpuIEJcgrBJ8Ee4UQklHsK8NyOigl/WKIKumUWhAS4ZiEqFJz6wyCBgO/xSjcZxHtMwk7bdI+j2wiplvL2DeanEf2uS9NV3/0SMvpAe+xDtttE4mLo4nj+9yrad2BWvOBZvNKrXGlxrxSZ9nfbFuqNcymjVMVppkKw2ab/1hn8ESn/3x/7Hx/7GibZ63GPJtUzKSt951Y/sn3v1Ms2b+XXmR7mvKFXL7AMNmii8nkmcL2W7/78w/d1pM0D0aUS2lzu426c2upkMuzTRjF5plCvsAwdx092Kzhdxj5zTbZPruqySKqMwr3GRXNVmmNVlClEpYSMxE+GeRAkEcEeUSIQ/po7CGxi8BOinDSpAWopM2+/fvfMky+WAEpFiFyVz//OQtCJhaEhV3hbdYK5XMMk++pr7MB9lGUGYMFofXRYaaQ3dnZKdFTi0DJ5l776c8qgmExgJ6mjAAeihADPPXkEyUQFnY7pP60O1pdXX2dAWSPm2++Gd7PiZFKpT/5yU+YPTEqC8Kvf/3re3Wl9uLwPwVhCWB7g0/mA14ouxc888wzSrG4NJqTTxaHInGKbWLFR9EGsv4pxn4MgxJ+m5DXwufXYJwiIA6gQYQQIEORLQIqjqkuiXzKpR7SC4fMmioC0hQ0Ccg2CTFiks069SN61bhBPqyXdso5rWKqgYczXBwlwEtAvYDXoeK1qjl1cmo5ZrvY5n9wPP7YWsvnNru/emLo8bNjf3Vu7PEbJ75574En7lme7bUcGveeWC47uhA5shiCkIz2iwm/mAhIyJCMDkop9sQrwj4JDkhQSEaEZERAgnwS7JeQQSkZU/HYR1LLjynpmJKuNIrLtXRYAkklUW+VdHhV7R7lPoesN6CbSqmWa81b7Z6jnb7TPcEb+iOnu30XRsqO9SfmM9bpcv1clWk6YRgJKft80sGAajKumU2Z58pt00nLbIVlLKEbiemHIsaRpG4spR1PqWfTxukqfV9Q0ukT9UcUfUFZf0je5RV3BlXnFge+9+xXr/3ht/nd1ZbNFdi+JabA5LLbTCG/zTBvsyX+wrtf/8wDPVHlap271ULftjnP7HZCFYr9fPlCofDhM0cb5OSwR9HpU3d59C02WYNJ1GXWNlkkaTWvUimICOkgj0rKhWUiKsLHQR4RFVARHh2kCS9FuElsJ5AVgxFwucO58/s3P7Cqco9/6pNWjM0A093dJXe0eP/5nUIhN9DYaALwIuzh0x4MZgxHFueYd97dZcIxOYa5tp1l3/jyj38cD/ikCOw0YQVQUNTTT32t5I7upnX+C3f0C1/4wnUZUYZhXn/9davVyjYNwp4yxsWLF68r37NHXV3ddd1Sf8Id3VvnKDHUSvfA8rnZZx579ONioYgDICIwq7HNPnan5GJ6NyIsFTkAAAFYCOgRiRtpVEehRoQrqP/L2ZvHt3WWacPP2fdVR/u+WpK12JK1WIstWZIt77sTO06cxc7SNGm6hDYt6UbpvkObtrSlBUo3oJSlwAwMMDDwAh/fzFteXvhm+2bgHaYUOsMU2jq2pfP9cWTVpAvMd376KYpz5HPsPJfu+7nu+7puOAOAEwAGgBSCDpFIHIA6zS05dEseacFuqNJ4iQBzFmGt034oZJ03S0M0MaNj9zj14zqizmEVisjhpB+AAIF1AzDhpnfHDFU9cyjmunHIf2458cRa7blLxl88PfvimYXPnpn7/Ad3ffuuoy/dd+TQtHtt1nt0IXB8sePU/iiISniIgzsFtFNAIyIWEbEQB4d5JMjBYR6OiHBcRuMyGtdhXQoZV6huHZlQqLSZ6bXxWRPVo2BZE1VyC0UH2+/iiw625OSrXrneYRj260cChpmIfrpT2R03L8T0u6L6pS7jrqiyq1Oei+h2dxmWuvX7EvqL+twXV/zHSr6jpcDhgnc159ubcO+KWeYjhnE/OxHUTYfNk536yU79eIc43iGP+sW6Rxjx64f9+uGwYSykn4vrJ0J81YUPh/UnFgafuOu6//2DbzXf+J0WzbYa6tbWltrcUDf/oI3XXNeC0OZvn7zjikEvV7IQV++fVtXGlqo2tt5qcaTNRlNVP37rjWUdvhQ1jYeNI16lbKFG/PoRq75sYXIKldXRcRoNIKBHoBIclhLwKI12s3g3Q8ZIrJPEgzjqRWEXDMwArqcy6vkNLQA2txNSVW0889BDDgCcELR/akrd5k7PN7a2mhpzszldLvsA3EWSHSTSzaJdHGUH4KZTl6ob23ukRqvwoRUh//5//zTu8+gA8GGICMN/8bWvbG23ejW32df3AiEMw7FYTJsQegGX87GPfax9ftuZBoIgj8ejgUQDUvtdTz/9NNh2bdsJ2veJhDuhqL6jOe4bf/n18dExFEZgAIk41hJkIjABAI8iFAAc0kJgG4Q7E2w9gowI0giPV0hQRaA8AuchEIaBAJBOBK1zVAKAAYKaNwuLPnlUpio0MqXnLuryH425lpzStJ4boqkpiVzxGRYd4qxRqJB0juBdAJgBSDDg6FDweD0yoBCrEeeNQ/5zyz1PHR56/pLxL1w+84Ur55+/cubzVy/89Z1Hv/nQJSf2dC7W7fsnfQemfAemfCCuI7RctL3B6xSQuI7QhofGBTghY2kD1WtmU0a2Sya0Hpq8lS27pKKN6bdRNY9Q98sDbnkooK+5pZpbqjjYATtdsdM1Jzvmkcd98kxIPx9VDuZcp8diZ+d6Lh0OfHg+ftfe1INruQcPZ+/eF7t1d/iO5a6b5jsPZoyrWfuhXtehnGOt4DiYt6wWXUsJ00qPcrLiPV0PnaoELurzHu0L7M+4x33ikE8aDRunuqzDIXkyquzLuXZ16comMBlVLlsof/ojH/63v/9farP9Od1Q1Q212VCbWraz/vqvfj7VEygZyBPTFW0T2Nx8cztnazRV9duff3bAwk/6pCGPMGTnKhay7pVGnYaqTSwYmKyOjlGIHwYpkUxwaErAuxisi8FiFBLBkRCOBnHUhyEuCCgAHF1a2nEn6nYTW+O+G26wAeCEoMNzc82N801NLaWqmnpAVTenSiU3AJ0I0kEiIQJ0UWg3RXkQ6MZTJ9XGhpZlNtvCn0ZDVRs/+b9/1O126wGgAdBA2Gg03u4DeO90FADw2GOPXSBW0iZ+ajPS3hnZIAj61Kc+1Y5U6nbeuL6+HolE2t/2T4Kw3ZLW3BbXa9/tZz/72cmTJ7u6ujAE1fpjSRTDAeBQjIZgCkE0YzW09Xg7Ef0jCEKAAiBDMQsWecbEjgl0CUXzKNRLoxJAnRBSlZkMCvXh1C6bsuSRJhRy0akcCDgOdNimFGqYgydkelIWFq3igYBh2SEsWnSjvC5LcE4A3AK0kHecWOw5OBIsG4mDYet1g8Fze9JPrVY/faT62ZOjL56e/uyV01+4ev7bt61+86ETp5bDC3XvnjH/7mHP7kEHSOrQCAsSMtKjYD0KppE0GSOZ1OHdAtIlgJSEZBW810SlFTLGQz06NGMgimaqYCJzeqRkJYfcfM1JD7qoYRc97mcXu5SVpOFIznrFoP/m3emPHKs8etnIJ89MP3Pt3Et3HfjWuWPfffzEF+9a/srNe79y0+KL106/+MGpp05V715K3L47ee1Y6JrJ8BVDgeMl17E+x8lBz1XT4Q/Oda8VbFfU3R9eTNy2N3t2OnZx2bmSNu2K60f9/KCdmuo0TccsYxHjTMI6322cDfOLUXFPwjARYMtOfCLpuuX0kVf/9e+3G7I31UZD3dhqqupbqqo2z59d25PjoT25zv/41f9Rm6ra3GgFqebWRlN97Vf/Mh33j/vE0YBu2MFP+eWqkx1164ecuj4TVzBwSZ6MknDBKPQIeA+PJDgiRiERAorgSBiFghjiw2AnADoEefqxRxtbG+0N39ZWs6mqmxvrh+dmHAC4ILA6M6O2uJZGWzG8cf6NuWrVC8EdEHDCoJNEowSaEZkogTphcNc1Z9RGQ0Nf67a3uwFe/sEPIw6HhCBfeelLLT+ObSXG+4DQ7/e//vrrO7kQ7fnZZ5+9IAaCbc4TRdFcLvf73/++DaH21u7ee+8Ff3y8Fwhfe+21kydP/uQnP2lnvy0cquovf/nLYDCokZ8aAjUORlOPaF2m2r++X/s4DAiA+CFkSiLHJGjaJI2QdBYCOQyYAKGHkKyIZ1CQBNC0VTrYYdxt5y6KeRft+kkds8sqjUt4jQL7vY7DQfuhgLLXxR/wmqb1SppCU3Zsfsx/YKZzdsQ9XXYOudkDUdP19ehHdqefXM5/4lDp+eP1F09Pv3Bm9gtXz3/jw/u/+cDxk0vB3WOBhRHfbM2xd6IDDAeNZZcw6FdqPl3JyectVFqP5sxkRk8VzVzFLg7YuaKJLBioopnLmdiqSxz0yFU3328hqw5mocu6mu9YKwROj3ScnYnffTD/yInK4ydLz35g6IVrhr9x+/xf3jPz9Xvm/uKuua/ft/yNj+7/4m2LX7lz5Yu373vuuvpLt009fmn2sVOZ588O37EcOzPmvWqs45KK63Cv6UjOfmLAc7LiOlXzXDEWOthr3ZuyrmTscxHdmJcb9oo1l1hx6gZcxgm/NB8xLPdY96Vtu5OmhYRlKeNezPrnepyzceNCXB4PUBU3eXx+6Ne/+Edt+6RuNdSGutFQ31DVTVV95r47ihzUZ2H/7rvfVTc31MZGqy9MbWgqinsuPTxoZ8Y7lPkO45CNqvv4ml0asPB9Jm7Apssb+G4W7zNLKQFPi1hKJOM0GqOQGIl1YrAGQgcAAav5d795RVUbbWMoLRL+/vXf5YIBzc1tZXxcbTa2i/VbLXNRdXNhcNAOQAiBAxQSJrAYQ0RJkGSxGAFbAbjrQzdutFQaLeZVs4FQm+r/+Ou/dojil7744vlGq2j6J/eEmmrpnRvCF198UeMtr7/++htuuOHmm2++4YYbrr/++ptuuuns2bM33njjf/7nf16Aq62trVdffVWzhNkpdHxXEP77v/87ACCVSmmZcDsR1SL8P/zDP7idLmjbwhBtN5e2fwRo2+Zjpxpq54ECFMBWAOYN3IgABmViCMYKBJRDgRNiaACCJMiTaBcAgwqz4pYPdOj2epQ6iw5S6KxRWLTr5s3CAb/9WKdrLWhYC+qXbMIgg4x7pENTwZMXRZcmPROjrpm6v+6j90cMN40l71tIP32g/9NHqp89MfLFK2dfPDP3havn/+rmA9995NQHDnbNDHvm6q6Fuvvwrhg4mHXNRwxzncYRr1yyMkUz12vkilZ5wMGX7dygS1d1SP1mtt/IDFjZMb8yH7cc7PUfTDkO9Zhumk2cO5w/dyT9ueuGv3bjyJeuG372dO2508PPnB55/qrx56+sP7yWfuhQ5pHDmWdPV56+ov+ZKwZeuGb0yYtL5w7mbt7T9eE9ycuG/CtJ04GM82DWs6/HthBRJjpNiz2eqbBxKihMdnDz3caSk+13G3I2uc/Cj7rEETc36GNqYWEiZqx7hMkO/kDWdrzfc7jXdChrOJi3XTQUWsw5FjKe1aJrX965kA+sloK7QuRjH7pYi4QNdUtttgRF6+r6tz//TIHD+nj00Vuva6hbrUS0sa7pKNZV9V9+8uPxkHXYwcx1KKNWYcguFaxsxSrkFCqtMAmJjrJEQmITApXVcRmejpNQlAQxDg2zsJ+EXTBwAHDfLTerzc1mS4HcQsSWqn7vxc+7SLSTJTpQeG18vBWut+kZTdW4PFBzAeDDQCcKIjToYuBeHR3BQI9AdeCQF4cfueHsutoigzfbSotNVW2oX/3qV7/3ve+1mcZ2jGor63fi0GKxvPLKK+0z1XfzfXnXo/nH7kzttzcajbNnz+7MSN8LhL/97W8VRYFh+PLLL2+DsPWLajRUVf3Wt77FMEz7ni/wwvmTEioAAAIAA0CEIiaNpklJ7sWxKIZYSJwHOAIwO0CzLBdBQJXDd/uVtahtTMYrBBhmqSmRnzcIi1Z+n1tYCitLFv6AQbcgGcY7kP0TgVNHe4/sjazOR3ZPeRaH/VUnuzdsvq4evn934vHl3KcPV168dOLzVy984cpdL5xd+sqH9//owZOXr0TGKqbJcmBhKHjpahwspuzTUeN01Fj3S31WMmcmMwYiZ6bLTnzASVVcbL+FLJrwfgtZc/GzUcvhvOnMePiaiY4bp4P3ryQ+diz7+MWZB1fjHzlcvH4uvpYz7UkoS9365aRxreA40ufYk1D2JOSLBpzHyvYDvfq1gm0lbVmI6OaC3ISfmvRzEz5+ukPak7AdyHrGffxIgN/VbdnTbV6K6W7Ynb10pHM8JPVZyZGwfjqq39tjOlXzXjnecXYh/oGxwDWTkaN5m8brHMo5Lh2JnhoKraRN+zPGxV7PnoSyL2Naq4RXkqaLUrpTE8n1N/6jpQ1vqlpT2pba+P5Lnyvr2V4a7BssrP/+tTZJvrGxoW3MVHXjibtvKhioaY885haHPbohuzQZUIoGLCXASQHpYuCUSPTwSFbEEyKe4NC8jkmxeBeFRhnKBkOj6dQb//U7tdlQG81WpU5brI3Nq/btdSIgSuMeAI5MTraA98cg3FsZ9ADQQSJxEgmTIEKAtECmOaKLgrs4wg0DH4E8fvc9aovIUdfX11t9Cw1V3bHX2rmstUjYLo5rL3bCo9FovLNI8F7HTszsBHyj0finf/onnufbnOr79I5qlm0AgOeee24nnrUXW1tb586d21nzwHEc2uEd/q4+He3iJIAxgEAAAjQEzDgwIIAAmuek9gdqAnCKIqMADBLwash6stMzI1MVEh6VuEmTblQkxyRkxSXsc+kXjOKYXhxyO+brjrnpwMKMd3HSsWvENT/h2jseGvZJ+0Lma6qBe2bjjy/nnlorP3+8/vzp6Rcun/7c1fNfvmHpf9x30VWHYrNjnuE+x57x4BVHkmA6aq/7lCGvbsirG/TINbdUsrFVl1ixi0NuZchtGLAJNbs07NFNhY37sv4jecexPseVI6Frp+JXDPovLrpX047FTmUqyI/6+aqLHvSKgx65z0IPONkRv67ul2seYTgg1v1CzcPWPHzJTueNxLhP3pdyHy52HK/FLhtP7s06psK6+bhpIiSsZBzLCfPJsu/sdOzWvfnVvHMqKEx1SkcrgVMjgevnoveupD92pP+2xe7LBp33X77vupX6ZFQZC/JzceVAr/NQr2slZdudNK8kpJWEtNbnPt7nXk0Zj45l/vCH13e2pGimT9/+/DMFha7axBABXnz8nOZ01mixlxtqY6OpNhrn37zx+Fpagib80pCDHbQIUx36qp0tWZleHd7NQTmFSotYNwMSeiJGgz6JyTNEDIbMAKR9vn/+Xz/Zam62N2xvbm1sqWpja+OXP/tZtyz6cSQtMUEALp6bU7f9FLXLb6rN