tag:blogger.com,1999:blog-51834378005310951902024-03-13T13:44:33.163-07:00Sonia Profe de HistoriaSoniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.comBlogger21125tag:blogger.com,1999:blog-5183437800531095190.post-26186157135412848472022-02-14T11:12:00.000-08:002022-02-14T11:12:04.108-08:00LOS CONFLICTOS BÉLICOS ACTIVOS EN LA ACTUALIDAD<p>Vamos a visualizar el vídeo que os dejo en el enlace: <a href="https://es.euronews.com/2021/07/23/la-mano-invisible-de-europa-en-los-conflictos-belicos-del-mundo" target="_blank">La "Mano invisible" de Europa en los conflictos bélicos</a>. Una vez que lo veáis responded a las siguientes preguntas que os he preparado en Educaplay:</p><p><a href="https://es.educaplay.com/recursos-educativos/11428226-la_mano_invisible_de_europa.html" target="_blank">CUESTIONARIO EDUCAPLAY</a></p><p>Cuando hayas respondido a estas cuestiones podrás entrar en los siguientes mapas interactivos que te propongo para que puedas señalar dónde se encuentran los principales conflictos bélicos del mundo:</p><p>1- <a href="https://es.educaplay.com/recursos-educativos/11428039-mapa_de_los_conflictos_belicos.html">MAPA INTERACTIVO CONFLICTOS BÉLICOS DEL MUNDO</a></p><p>2- <a href="https://es.educaplay.com/recursos-educativos/6477340-mapa_interactivo.html">MAPA INTERACTIVO CONFLICTOS BÉLICOS ACTUALES</a></p><p>Materiales necesarios: planisferio político y un móvil con conexión a internet.</p>Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-11816504402715945962015-05-20T10:57:00.005-07:002015-05-21T02:54:24.512-07:00PRESENTACIÓN INTEFPresentación: <a href="http://prezi.com/dtwuhk63fidi/?utm_campaign=share&utm_medium=copy">The Physical landscape of Spain</a><br />
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<br />Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-70115038634051592592015-05-20T09:04:00.002-07:002015-05-20T09:23:02.163-07:00THE PHYSICAL LANDSCAPE OF SPAIN<div style="text-align: justify;">
Here you have the presentation of the CLIC unit that I have done for INTEF. This unit has been done for student of secundary education, 3rd year exactly. This topic is from the subject of Geography. This topic will help us to teach the Peninsular relief, the Spanish rivers, types of climate the great variety of natural landscapes, the most important protected spaces.</div>
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The objectives will be mainly, identify the Spanish territories, recognise the principal relief formations and rivers. Learn about the differents climates in Spain and recognise the different natural landscape that exist in Spain.</div>
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The differents tasks that we will work during the lessons will be quitte varied, we will need 6 sessions.</div>
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<span lang="EN-US">We will use 6 sessions. <o:p></o:p></span></div>
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<span lang="EN-US">During the first lesson we will check the previous knowledge that the students
have about the Spanish Relief and we will work the vocabulary: relief, river, climate, natural landscape, natural resource, peninsula, archipielago, plateau, depression, cliff.... Afterward we
will check the Spain’s Relief map and we will do the activities</span><span lang="EN-US"> that I have prepared (speaking,
writing mainly). Those activities will versus about find out mountain ranges and the main peaks of thoses mountain ranges, we will work on their altitudes aswell. The second activity will be necessary to work in pairs and the students will use the speaking due to the fact that the students have to say the altitude of the mountains. In activity number three the students will have to find out the noum of differents adjetives regarding to the altitude...In activity number 4 they have to look at two photos and answer some questions about to differents relieves.<o:p></o:p></span></div>
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<span lang="EN-US"><a href="http://www.planetware.com/map/spain-rivers-lakes-and-resevoirs-in-spain-map-e-e2.htm">Spanish rivers</a> (here you may check the map)</span></div>
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<span lang="EN-US">During the second session we will talk about
rivers and lakes of Spain, especially we will check again the previous
knowledge of the students about this subject. We will work some vocabulary: flow pattern, stream, torrent, crater, karstic. And we will work on the map about Spanish rivers</span><span lang="EN-US"> and we will do some activities. Activity 1, we should look at the map of Rivers of Spain and indicated which sea or ocean those rivers flow into. And in activity 2, the students will say which rivers the rivers given flow into, the rivers listed are tributaries.</span></div>
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<a href="http://2.bp.blogspot.com/-eLhRDiGRJZw/VVyrAttwySI/AAAAAAAAAMo/sP3oAbz4zyA/s1600/national-parks-spain.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="309" src="http://2.bp.blogspot.com/-eLhRDiGRJZw/VVyrAttwySI/AAAAAAAAAMo/sP3oAbz4zyA/s320/national-parks-spain.jpg" width="320" /></a></div>
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<span lang="EN-US">In the third lesson we will use a map to know
the protected spaces in Spain, it will be Spain's National Parks, we will use an interactive map (<a href="http://en.educaplay.com/en/learningresources/1839001/spanish_national_parks.htm">Spanish national parks interactive map</a>) and the students will try to guess where are the Spanish National Parks situated. We will work some vocabulary aswell: measure, national park, deplete, settlement, sunshine, wind power</span><span lang="EN-US">. We will do some activities to
know which Nationals Parks the students know and we will visit the symbaloo
webmix where we can watch a video about Monfrague National Park</span><span lang="EN-US"> in Extremadura.<o:p></o:p></span></div>
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<iframe allowfullscreen="" class="YOUTUBE-iframe-video" data-thumbnail-src="https://i.ytimg.com/vi/BzmceeQ0DR8/0.jpg" frameborder="0" height="266" src="https://www.youtube.com/embed/BzmceeQ0DR8?feature=player_embedded" width="320"></iframe></div>
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<span lang="EN-US">After watching the video we will do some activities: the firstone it will be to work in</span> the listening and reading, the students will read a text about the natural tourism in Spain then the language assistant or myself will read the text for them and they will answer some comprehensive questions about that. Next activity will be a speaking activity where the students will work in pairs and they will have to talk about their preferences using giving structures as: I prefer to....because.... I agree/ I don't agree....</div>
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<span lang="EN-US">For the fourth session we will do some activities</span><span lang="EN-US"> that we can find in my blog:</span></div>
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<span lang="EN-US"><a href="http://soniaprofedehistoria.blogspot.com.es/">http://soniaprofedehistoria.blogspot.com.es/</a></span></div>
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<span lang="EN-US">Along the fifth session we will talk about the
climate and vegetation of Spain we are plenty of vocabulary so we can use some interactive
games to work out the vocabulary: inland, bush, prickly, laurisilva, scarce, mild, steppe, grassland.<o:p></o:p></span></div>
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The first activity is about a climate graph of Toledo:</div>
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They have to answer some questions about this graph: rainfall, temperature, type of climate...</div>
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They will work on listening as well, because they will have to fill a chart about the Spanish climate characteristics that we will read to them and they will fill the gaps.</div>
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<span lang="EN-US" style="font-family: Arial, sans-serif; font-size: 11pt; line-height: 115%;">And at last we will spend the sixth lesson doing
revision activities, we can use some interactive maps in the symbaloo webmix
“Relief of Spain”; as well as interactive games as the webquest about the Spanish climates :</span></div>
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<span lang="EN-US" style="font-family: Arial, sans-serif; font-size: 11pt; line-height: 115%;"><a href="http://zunal.com/webquest.php?w=282178">Spanish climates</a></span></div>
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Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-18318218379505134522015-04-20T09:20:00.001-07:002015-04-20T09:20:30.018-07:00THE PHYSICAL LANDSCAPE OF SPAINCLIC UNIT ABOUT <a href="https://drive.google.com/file/d/0B-ePys-pWMoCcmZvbDlVajBka0U/view?usp=sharing">"THE PHYSICAL LANDSCAPE OF SPAIN"</a><br />
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En el enlace compartido en el título de esta entrada, encontrareis el guión de la unidad AICLE con el mismo nombre.<br />
Aparte de las actividades que he enlazado en la unidad también he diseñado algunas más, como una WEBQUEST sobre <a href="http://zunal.com/webquest.php?w=282178">SPAIN'S CLIMATE TYPES</a>. Esta actividad permitirá al
alumnado que desarrolle competencias como el conocimiento e interacción con el
medio físico, analizando el medio natural, los paisajes y las medidas tomadas
para proteger y cuidar el medio ambiente.<br />
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También desarrollarán la competencia digital, ser capaces de
seleccionar información de diferentes fuentes objetivamente. <o:p></o:p></div>
Muy al hilo de los climas en España he realizado un mapa interactivo para conocer la localización de los <a href="http://en.educaplay.com/en/learningresources/1839001/spanish_national_parks.htm#comentario">Parques Nacionales Españoles</a>. Con esta actividad cumplirá el objetivo de localizar
absolutamente todos los parques nacionales de España.<br />
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ACTIVITIES ABOUT <a href="https://drive.google.com/file/d/0B-ePys-pWMoCYnRNQURDZE5NeHM/view">SPAIN’S
RELIEF</a><o:p></o:p></div>
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Con estas actividades se consigue un andamiaje lingüístico
gracias al uso de estructuras comparativas como<i>: Higher…. Lower……<o:p></o:p></i></div>
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Así como estructuras superlativas como <i>the highest point ….</i><o:p></o:p></div>
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Con respecto al andamiaje
sobre el contenido de la materia se consigue trabajar con la situación
geográfica de algunas unidades de relieve español y su situación y relación con
respecto al conjunto de unidades de relieve de la Península Ibérica.<o:p></o:p></div>
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<span lang="EN-US">ACTIVITIES
ABOUT </span><a href="https://drive.google.com/file/d/0B-ePys-pWMoCb0FEdHlOYW5PVDg/view"><span lang="EN-US">SPAIN’S RIVERS AND LAKES</span></a><span lang="EN-US"><o:p></o:p></span></div>
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Aquí se consigue trabajar una gran cantidad de vocabulario
sobre los ríos y lagos, verbos como: TO FLOW; nombres como TRIBUTARY.<o:p></o:p></div>
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Estas actividades se van a trabajar oralmente lo que
aumentará la fluidez del alumnado. A nivel de contenido de la materia es muy
importante como se alcanzan objetivos prioritarios como los mares y océanos que
bordean España, qué vertientes tenemos en la Península, principales ríos
españoles.<o:p></o:p></div>
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ACTIVITIES ABOUT <a href="https://drive.google.com/file/d/0B-ePys-pWMoCcmNfc0xuZE4zM1E/view">CLIMATE
IN SPAIN</a><o:p></o:p></div>
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Con el comentario de este climograma y apoyado por un <a href="https://drive.google.com/file/d/0B-ePys-pWMoCWERqVmZKb1FWclU/view?usp=sharing">cuadro</a>
donde se detallen las principales características de los climas que se pueden
encontrar en la Península Ibérica; con este material se trabaja vocabulario y se conocen los
diferentes tipos de climas en España y sus características.<o:p></o:p></div>
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ACTIVITIES ABOUT <a href="https://drive.google.com/file/d/0B-ePys-pWMoCeVhJdm5kcUlTc3c/view">SPANISH
PROTECTED SPACES</a><o:p></o:p></div>
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Aquí trabajaremos sobre un texto en el que el asistente de
lengua extranjera leerá un texto y luego lo volverá a leer el alumnado
respondiendo a unas preguntas posteriormente. Se trabajará las competencias de
lectura, la competencia oral y de escucha activa.<o:p></o:p></div>
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Los <i>Talking points</i>
servirán para trabajar andamiaje lingüístico como I agree/don’t agree; giving
opinions; se trabajará en grupos para comparar opiniones.<o:p></o:p></div>
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<br />Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-49187805060466532482015-03-31T02:28:00.001-07:002015-03-31T02:31:42.546-07:00UTILIDAD DE SYMBALOO<h3 class="post-title entry-title" itemprop="name" style="font-family: Georgia, Utopia, 'Palatino Linotype', Palatino, serif; font-size: 18px; font-stretch: normal; font-weight: normal; margin: 0px; position: relative;">
#REAicle_INTEF</h3>
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<a href="http://www.symbaloo.com/mix/escritoriovirtualaicle2" style="color: #00ec73; text-decoration: none;"><span style="color: #45818e;">SYMBALOO WEBMIX</span></a></div>
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<span style="color: #cccccc;">Sobre este texto podréis acceder a mi webmix hecho en symbaloo donde he recogido los 10 mejores enlaces de webs interesantes para la unidad CLIC que estoy realizando sobre el relieve en España. A continuación paso a comentar cada uno de los enlaces:</span></div>
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<span style="color: #cccccc;">1.- Wordreference: diccionario inglés-español-inglés que es absolutamente necesario para poder solucionar las dudas de vocabulario que nos puedan surgir.</span></div>
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<span style="color: #cccccc;">2.- Mapas interactivos: este enlace lo utilizamos mucho para las clases de geografía ya que es una magnífica forma de trabajar los mapas de forma menos tediosa y más efectiva.</span></div>
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<span style="color: #cccccc;">3.- He añadido una página de National Geographic sobre España en inglés y dirigido para niños, así podemos localizar más vocabulario y conocer los aspectos más destacables a nivel internacional de nuestra nación.</span></div>
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<span style="color: #cccccc;">4.- En este enlace podremos ver un vídeo en inglés sobre el relieve de la Península Ibérica.</span></div>
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<span style="color: #cccccc;">5.- En esta ocasión he añadido un enlace donde podemos ver los mapas reales del Instituto Geográfico Nacional, es muy interesante esta web para conseguir recursos didácticos totalmente fiables.</span></div>
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<span style="color: #cccccc;">6.- EDMODO: es una red social para profesores y alumnos que me resulta muy útil utilizar con mi alumnado para subir información adicional sobre las lecciones, encargarles trabajos y tareas,etc.</span></div>
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<span style="color: #cccccc;">7.- Educarex, juegos interactivos en inglés para hacer la tarea más entretenida.</span></div>
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<span style="color: #cccccc;">8.- Un Worldatlas en inglés donde podremos revisar el relieve de España.</span></div>
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<span style="color: #cccccc;">9.- Un enlace con mi propio blog, donde podrán realizar algunas actividades sobre los ríos de España.</span></div>
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<span style="color: #cccccc;">10.- Por último otro vídeo, esta vez sobre el Parque Nacional de Monfragüe en extremadura.</span></div>
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<span style="color: #cccccc;">Con esto podríamos completar la tarea de la unidad del Relieve en España.</span></div>
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Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-37386089731671513692015-03-31T02:23:00.001-07:002015-03-31T02:23:29.345-07:00ANÁLISIS E IDENTIFICACIÓN DE LOS ASPECTOS METODOLÓGICOS EN LAS AICLE<div style="background-color: #444444; color: #cecece; font-family: 'Open Sans', sans-serif; font-size: 13px; line-height: 16.0030002593994px; margin-bottom: 1em; padding: 0px;">
<span style="color: #cccccc;">IDENTIFICACIÓN DE LOS ASPECTOS METODOLÓGICOS DE AICLE:</span><br /><span style="color: #cccccc;">La unidad AICLE que se comenta <a href="http://www.juntadeandalucia.es/educacion/descargasrecursos/aicle/html/pdf/093.pdf" style="color: #00ec73; text-decoration: none;">"Renaissance through Michelangelo"</a></span><br /><span style="color: #cccccc;">la podréis consultar pulsando en el título que aparece en esta misma frase.</span><br /><span style="color: #cccccc;"><br /></span></div>
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<span style="color: #cccccc;">La unidad AICLE elegida responde a la competencia curricular de 2º de ESO. El trabajo con la lengua y el contenido a la vez se ve reflejada en muchas partes de esta misma unidad, pero concretamente en el trabajo con el vocabulario a través de imágenes se trabaja con la lengua. Acto seguido este vocabulario se utilizará para hacer un "listening" donde completaremos los huecos con este vocabulario. El texto utilizado es sobre la Biografía de Michelangelo, de este modo se ve reflejado el trabajo con el contenido al mismo tiempo.</span></div>
<div style="background-color: #444444; color: #cecece; font-family: 'Open Sans', sans-serif; font-size: 13px; line-height: 16.0030002593994px; margin-bottom: 1em; padding: 0px;">
<span style="color: #cccccc;">El análisis del Renacimiento se hace a través del estudio de sólo 3 obras de Miguel Ángel: El David, La Piedad y el Moisés.</span></div>
<div style="background-color: #444444; color: #cecece; font-family: 'Open Sans', sans-serif; font-size: 13px; line-height: 16.0030002593994px; margin-bottom: 1em; padding: 0px;">
<span style="color: #cccccc;">En las tareas se refleja la metodología AICLE, el uso de obras de arte para comentar, la utilización de un eje cronológico a través de la vida de Miguel Ángel. Gran variedad de actividades para completar las tareas arriba reflejadas. Se describen las imágenes, se exponen los trabajos oralmente, búsqueda de información y posterior exposición.</span></div>
<div style="background-color: #444444; color: #cecece; font-family: 'Open Sans', sans-serif; font-size: 13px; line-height: 16.0030002593994px; margin-bottom: 1em; padding: 0px;">
<span style="color: #cccccc;">Las actividades de la unidad reflejan la metodología AICLE por ejemplo en los modelos de comentarios de obras de arte: escultura, pintura y arquitectura. Se trabaja el eje cronológico de la vida de Miguel Ángel.</span></div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-39361723753174420342015-03-31T01:54:00.003-07:002015-03-31T02:01:28.843-07:00WEBMIX SYMBALOO: SPAIN RELIEFTras muchas idas y venidas y varios visionados de vídeos sobre cómo hacer visible mi escritorio symbaloo, espero haber dado con la clave y aquí os paso el enlace de mi webmix:<br />
<a href="http://www.symbaloo.com/mix/escritoriovirtualaicle2">SPAIN RELIEF</a><br />
<br />
<br />Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-55383423761227373612015-03-17T10:22:00.002-07:002015-03-17T10:22:20.494-07:00#REAicle_INTEFApenas hace una semana que comencé la andadura en el curso sobre los materiales AICLE que se ofrece desde la plataforma INTEF, después de estar desconectada del uso directo de las redes sociales he tenido que entrar de lleno en ellas (concretamente en twitter) y eso me está ocupando más tiempo del deseado. No obstante el grupo C, del que formo parte, parecen profesionales bastante activos así que me alegro de estar en contacto con ellos. Espero que podamos crear una unidad AICLE y nos den claves para poder hacerlo guiados desde la coordinación del curso.<br />
Aprovecho para reactivar el blog que creé en su momento, además de recomendaros la red social para profesores: edmodo. Muchos de vosotros ya la conoceréis, actualmente estoy familiarizándome con ella. Bueno seguiré escribiendo mi diario del curso más adelante....Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-84884434017882974482013-09-29T11:48:00.001-07:002014-03-24T08:09:24.195-07:00Nuevo curso escolar<span style="font-family: Arial,Helvetica,sans-serif;">Otro año más entramos a formar parte de una comunidad educativa deseosa de vivir la experiencia del saber y el conocer. Pues ante todo, bienvenidos y bienvenidas a este blog a todos aquellos que esteis interesados en la historia y la geografía y sobre todo si sois mi alumnado.</span><br />
<span style="font-family: Arial,Helvetica,sans-serif;">Intentaremos suplir las carencias tecnológicas del centro con nuestro propio blog, espero que esteis dispuestísimos a participar.</span><br />
<span style="font-family: Arial,Helvetica,sans-serif;">Mucha fuerza y vamos a por ello.</span><br />
<br />
<br />
<div class="f_container">
<blockquote class="">
<i>El único encanto del pasado consiste en que es el pasado</i><br />
<br />
<br />
<footer>
<cite><a href="http://www.frasalia.com/autores/oscar-wilde">Oscar Wilde</a></cite>
</footer>
</blockquote>
</div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-3704383091000252742013-04-24T11:01:00.003-07:002013-04-24T11:01:27.826-07:00LA PESCA EN LOS CALADEROS MARROQUÍES<div class="separator" style="clear: both; text-align: center;">
<object width="320" height="266" class="BLOGGER-youtube-video" classid="clsid:D27CDB6E-AE6D-11cf-96B8-444553540000" codebase="http://download.macromedia.com/pub/shockwave/cabs/flash/swflash.cab#version=6,0,40,0" data-thumbnail-src="http://img.youtube.com/vi/q5Sj_Hp6qjA/0.jpg"><param name="movie" value="http://youtube.googleapis.com/v/q5Sj_Hp6qjA&source=uds" /><param name="bgcolor" value="#FFFFFF" /><param name="allowFullScreen" value="true" /><embed width="320" height="266" src="http://youtube.googleapis.com/v/q5Sj_Hp6qjA&source=uds" type="application/x-shockwave-flash" allowfullscreen="true"></embed></object></div>
<br />
<br />
<div style="text-align: center;">
<b><span style="color: black; font-size: medium;">Responde a las sigu<span style="font-size: medium;">ientes preguntas después de ver el vídeo, tienes <span style="font-size: medium;">hasta el próximo 30 de <span style="font-size: medium;">abril</span> para enviar la respuesta en un comenta<span style="font-size: medium;">rio a esta entrada</span></span></span>:</span></b></div>
<ol>
<li>
<div style="text-align: center;">
<span style="color: black; font-size: medium;"><em>¿Qué especies capturan? </em></span></div>
</li>
<li>
<div style="text-align: center;">
<span style="color: black; font-size: medium;"><em>¿De dónde son los pescadores? </em></span></div>
</li>
<li>
<div style="text-align: center;">
<span style="color: black; font-size: medium;"><em>¿Dónde van a pescar? </em></span></div>
</li>
<li>
<div style="text-align: center;">
<span style="color: black; font-size: medium;"><em>¿Qué son los caladeros? </em></span></div>
</li>
<li style="border-bottom: medium none; border-left: medium none; border-right: medium none; border-top: medium none;">
<div style="text-align: center;">
<span style="color: black; font-size: medium;"><em>¿Es importante el pescado en la alimentación de los españoles? </em></span></div>
</li>
<li style="border-bottom: medium none; border-left: medium none; border-right: medium none; border-top: medium none;">
<div style="text-align: center;">
<span style="color: black; font-size: medium;"><em>¿Qué productos del mar compramos y consumimos principalmente los españoles?</em></span></div>
</li>
</ol>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com17tag:blogger.com,1999:blog-5183437800531095190.post-41946008893979913432013-04-17T09:24:00.001-07:002013-04-17T09:24:12.568-07:00EL TREN DE LA MEMORIA<div class="separator" style="clear: both; text-align: center;">
<iframe allowfullscreen='allowfullscreen' webkitallowfullscreen='webkitallowfullscreen' mozallowfullscreen='mozallowfullscreen' width='320' height='266' src='https://www.youtube.com/embed/Ebay8xbhzso?feature=player_embedded' frameborder='0'></iframe></div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-42384443059467995632013-04-14T10:51:00.000-07:002013-04-14T10:51:12.677-07:00PRÁCTICA T 16 ÁREAS DE REGADÍO EN ESPAÑA<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="color: black;"><span style="font-family: Arial, Arial, sans-serif;"><span style="font-size: x-small;"><b>PRESENCIA
EN PAU: 2008</b></span></span></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="color: black;"><span style="font-family: Verdana;"><span style="font-size: small;"><b>En
el mapa siguiente se representa la distribución de las áreas de
regadío. Con esta información conteste a las preguntas siguientes: </b></span></span></span>
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<span style="color: black;"><span style="font-family: Verdana;"><span style="font-size: small;">a)
Diga del 1 al 7 el nombre de las Comunidades Autónomas señaladas,
afectadas por el máximo regadío. (Hasta 1 punto). </span></span></span>
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><span style="color: black;"><span style="font-family: Verdana;"><span style="font-size: small;">b)
Deduzca de la información del mapa las posibles causas que explican
la localización de la agricultura de regadío en la Península
Ibérica. (Hasta 1,5 puntos). </span></span></span>
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<span style="color: black;"><span style="font-family: Verdana;"><span style="font-size: small;">c)
Enumere los cultivos predominantes en las tierras de regadío de
España. (Hasta 1,5 puntos). </span></span></span>
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<div class="separator" style="clear: both; text-align: center;">
<a href="http://3.bp.blogspot.com/-AFILzEM43LY/UWrshoMxvoI/AAAAAAAAAFU/8pw1HgRLixY/s1600/AREAS+DE+REGAD%C3%8DO.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="221" src="http://3.bp.blogspot.com/-AFILzEM43LY/UWrshoMxvoI/AAAAAAAAAFU/8pw1HgRLixY/s320/AREAS+DE+REGAD%C3%8DO.jpg" width="320" /></a></div>
<br /></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<span style="color: black;"><span style="font-family: Verdana;"><span style="font-size: small;">a)
1. Aragón; 2. Comunidad Valenciana, 3. Castilla León; 4.
Extremadura; 5 Castilla La Mancha; 6 Murcia; 7 Andalucía.<br /><br />b)
El regadío es una técnica que suple la falta de agua de
determinados cultivos, por lo que requiere de una serie de
condiciones que hacen que su práctica esté limitada a áreas que
estén por debajo de los 500 mm de precipitación. En nuestro país
predomina en las cuencas y ríos de la Meseta, las depresiones
exteriores del Ebro y Guadalquivir, las llanuras costeras
mediterráneas, los archipiélagos y algunos valles montañosos del
norte. En cambio es inexistente en zonas del interior peninsular por
la abundancia de heladas e inexistente en el norte peninsular por lo
abundancia y regularidad de sus precipitaciones.</span></span></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana;"><span style="font-size: small;">Podemos
distinguir entre regadío intensivo y <b>regadío extensivo</b>. Este
último consiste en la introducción de técnicas de riego en
cultivos que mayoritariamente considerados de secano. Predomina en
los valles del interior de la Meseta y en el Guadalquivir, y requiere
en su localización la cercanía de fuentes de agua como ríos y
riberas.</span></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana;"><span style="font-size: small;">El
<b>regadío</b> <b>intensivo</b> predomina en la vertiente
mediterránea, en el litoral sureste y levante, en la costa
suratlántica (Cádiz y Huelva) y en las Baleares. Estas zonas se
caracterizan por la suavidad de sus temperaturas (ausencia de
heladas), la elevada insolación y la protección del relieve de
vientos. Predomina en áreas con suelos arcillosos y sedimentarios
como en terrazas fluviales y costeras </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana;"><span style="font-size: small;">c)
El regadío extensivo son cultivos tradicionalmente de secano (vid,
olivar, plantas industriales, cereales, algodón, etc.) con una sóla
cosecha anual a los que ocasionalmente en función de las
fluctuaciones hídricas recibe un aporte de agua. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana;"><span style="font-size: small;">Entre
los cultivos del regadío intensivo podemos destacar una amplia
variedad de producción con productos tropicales, fruticultura,
horticultura, floricultura, cereales (arroz), etc. Favorecidos por el
transporte refrigerado, la fuerte demanda internacional y el apoyo de
la Unión Europea. Asimismo se caracteriza por sus cosechas
extraestacionales (extratempranas), por la difusión de invernaderos,
por técnicas de riego avanzadas.</span></span></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm;">
<br /></div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com2tag:blogger.com,1999:blog-5183437800531095190.post-52426205100174283292013-04-14T10:43:00.003-07:002013-04-14T10:43:41.109-07:00PRÁCTICA T 15 AGLOMERACIONES URBANAS
<div style="margin-bottom: 0cm;">
TEMA 15:
</div>
<div style="margin-bottom: 0cm;">
PRÁCTICAS SOBRE LA DISTRIBUCIÓN
GEOGRÁFICA DE AGLOMERACIONES URBANAS EN ESPAÑA</div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">El
mapa representa la distribución geográfica de las aglomeraciones
urbanas en España. Analícelo y responda a las siguientes preguntas:</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">a)
Diga el nombre de las ciudades que tienen más de 500.000 habitantes.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">b)¿Cómo
llamaría usted al eje urbano número 3? Diga el nombre de las
Comunidades Autónomas afectadas por dicho eje urbano.</span></span></div>
<div style="margin-bottom: 0cm;">
c)Explique los condicionantes
geográficos que favorecen la bifurcación en dos ramas del eje
urbano andaluz.</div>
<div style="margin-bottom: 0cm;">
<a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" name="irc_mi"></a><img align="BOTTOM" border="0" height="236" name="gráficos1" src="http://farm4.staticflickr.com/3354/3626468832_c93bc8dd12_z.jpg?zz=1" vspace="18" width="320" />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">a)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Ciudades
con más de 500 000 habitantes son: Madrid, Barcelona, Bilbao, </span></span>
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Valencia,
Sevilla, Málaga y Zaragoza.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">b)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">El
eje urbano 3 es el eje mediterráneo o levantino, desde Gerona hasta
Murcia. Eje consolidado con un elevado nivel de urbanización. Las
Comunidades Autónomas son: Cataluña, Comunidad Valenciana y Región
de Murcia.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">c)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Las
cordilleras Béticas favorecen la bifurcación en dos ramas del eje
andaluz: un eje litoral de gran importancia turística y continuación
natural del eje mediterráneo, así como enclave de conexión con
África y un eje transversal andaluz en torno a la A-92 que discurre
por el surco intrabético, pretende su desarrollo y la conexión del
territorio interno andaluz con el Levante.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Las
cordilleras Béticas están divididas en la cordillera Bética que
discurre paralela a la costa, la cordillera subbética que cierra el
valle del Guadalquivir y entre ambos conjuntos el surco intrabético.</span></span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<br />
</div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-33803696261685409072013-04-14T10:42:00.001-07:002013-04-14T10:42:09.702-07:00PRÁCTICA T 15 JERARQUÍA URBANA
<div style="margin-bottom: 0cm;">
PRÁCTICA DEL SISTEMA DE CIUDADES
ESPAÑOL: TEMA 15</div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">El
mapa siguiente muestra el sistema de ciudades en España, en 1991.
Analícelo y responda a las preguntas siguientes:</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">a)
Diga el nombre de las ciudades que son metrópolis nacionales y el de
las metrópolis regionales.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">b)¿Qué
contrastes existen en la red urbana de España entre el centro y la
periferia?</span></span></div>
<ol start="100" type="i">
<li><div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Explique
las causas y consecuencias de esta configuración del sistema urbano
español.</span></span><img border="0" height="212" name="gráficos1" src="http://geoclases.wikispaces.com/file/view/mapa%20jerarquia%20urbana%20españa%202.jpg/119242867/mapa%20jerarquia%20urbana%20españa%202.jpg" vspace="53" width="320" /></div>
</li>
</ol>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">a)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Metrópolis
nacionales: Madrid y Barcelona</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Metrópolis
regionales: Bilbao, Zaragoza, Valencia, Sevilla y Málaga</span></span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">b)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">La
distribución regional de la urbanización presenta notables
contrastes. La diferencia más destacada es la que enfrenta a las
comunidades del litoral, donde la urbanización es mayor, con
comunidades del interior (Extremadura, las dos Castillas...) cuyas
tasas de urbanización son muy bajas. De este desierto interior
solamente se salva la Comunidad de Madrid.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">La
red urbana implica unas relaciones de interdependencia, las ciudades
mayores tienen un área de influencia, en la que se localizan
ciudades menores. La red urbana está formada por ciudades que se
agrupan en niveles de rango o importancia.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">c)
</span></span>
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Las
causasdel sistema urbano español y de la desigual distribución
sobre el territorio se relacionan con el incremento de actividades
económicas con un fuerte poder de atracción de mano de obra.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">-La
industrialización ha sido el factor de urbanización más
importante. Así, la concentración del desarrollo industrial en las
regiones cantábrica, vasca y catalana explica su temprano desarrollo
urbano.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">-El
turismo ha provocado un aumento muy rápido de la urbanización,
aunque ha afectado a espacios más reducidos. La afluencia masiva de
turistas extranjeros y españoles a las costas mediterráneas ha
transformado la vida y la estructura de un gran número de pueblos,
que se han convertido en ciudades especializadas en el sector
servicios.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">-
Otro factor que se ha de tener en cuenta es la influencia ejercida
por una gran ciudad, que actúa incrementando el proceso urbanizador
de los núcleos y ciudades próximos. Por ejemplo, Madrid.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">-Transformaciones
de los sistemas y técnicas de producción agraria.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">-Desarrollo
de la agricultura especializada y de regadío.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Las
consecuencias del sistema urbano: en cuanto a las territoriales
destaca el despoblamiento del medio rural y la consiguiente
concentración de la población en las ciudades más grandes. De esta
manera, el proceso de urbanización ha supuesto una progresiva
pérdida de peso de la población residente en municipios de menos de
10 000</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">habitantes.
En cuanto a las consecuencias que afectan al medio ambiente natural y
urbano, los efectos es el aumento del consumo de recursos y energía,
la degradación de paisajes y entornos naturales y la contaminación
atmosférica, del agua y de los suelos.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">La
red urbana está distribuida de forma desigual , mantienen entre sí
unas relaciones de interdependencia. El modelo urbano español es un
modelo concentrado y polarizado, en el que las grandes áreas
metropolitanas concentran población y actividad económica, además
de los más importantes centros de decisión, investigación e
innovación tecnológica.</span></span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-5697003232023011002013-04-14T10:39:00.004-07:002013-04-14T10:40:32.298-07:00PRÁCTICA T 15 SISTEMA DE CIUDADES<div style="margin-bottom: 0cm;">
PRÁCTICA SISTEMA DE CIUDADES EN ESPAÑA</div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">El
mapa muestra el sistema de ciudades de España. Obsérvelo y responda
a las siguientes cuestiones:</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">a)
Dé los nombres de las metrópolis nacionales; y de las metrópolis
regionales de 1º orden.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">b)
Diga a qué Comunidad Autónoma pertenece cada una.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">c)
¿Por qué se establecen las categorías que aparecen en la leyenda
del mapa, qué diferencias básicas existe entre cada una de ellas, o
sobre qué bases principales se hacen esas jerarquías urbanas?</span></span></div>
<div style="margin-bottom: 0cm;">
d) Explique brevemente el
funcionamiento del sistema urbano de Andalucía nombrando al menos
las ciudades que pertenecen a las cuatro categorías primeras.</div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" name="irc_mi"></a>
<img align="BOTTOM" border="0" height="228" name="gráficos1" src="http://farm4.static.flickr.com/3433/3386106520_1531055d99.jpg" vspace="14" width="320" />
</div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">a)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Metrópolis
nacionales: Madrid y Barcelona</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Metrópolis
regionales de 1º orden: Bilbao,</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Zaragoza,
Valencia, Málaga, Sevilla.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">b)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Bilbao:
País Vasco</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Zaragoza:
Aragón</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Valencia:
Comunidad Valenciana</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Málaga:
Andalucía</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Sevilla:
Andalucía</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">c)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">La
red urbana está formada por el conjunto de ciudades distribuidas
sobre el territorio de </span></span>
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">modo
jerárquico . La jerarquía indica que no todas tienen la misma
importancia ni desempeñan las mismas actividades económicas o
funciones. </span></span>
</div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Se
habla de red porque las ciudades mantienen entre sí unas relaciones
de interdependencia: las ciudades mayores tienen un área de
influencia, en la que se localizan ciudades menores a las que prestan
servicios especializados. La red urbana está formada, pues, por
ciudades agrupadas en diferentes niveles de rango o importancia.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">En
el sistema urbano español se distinguen los niveles que indica el
mapa: El primer lugar</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">jerárquico,
las metrópolis nacionales, Madrid y Barcelona, con 3 millones de
habitantes, ejercen su influencia sobre todo el territorio nacional
y se relacionan con otras metrópolis internacionales. Son sede de
servicios altamente especializados.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">En
segundo lugar, metrópolis regional es de primer orden, Sevilla,
Valencia...</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">su
población oscila entre 500 000 y 1 500 000 habitantes y su
influencia se extiende al ámbito regional. Son centros
especializados.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">A
continuación, las metrópolis regionales de segundo orden, Granada,
Córdoba, Murcia...</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">con
una población entre 200 000 y 500 000, su influencia es menor, son
centros especializados y también tienen funciones del sector
secundario.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Por
último las ciudades medias, capitales de provincias, Burgos,
Segovia..., las ciudades pequeñas y cabeceras comarcales, van
reduciendo progresivamente en volumen de población e importancia de
sus funciones.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">d)</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">El
sistema urbano andaluz se caracteriza por la progresiva concentración
de la población en capitales de provincia y en los municipios del
litoral, debido a la mayor presión demográfica en las zonas
costeras. El eje litoral andaluz constituye un gran corredor de gran
importancia turística y el eje transversal andaluz, en torno a la
autovía A-92, pretende el desarrollo de las ciudades en el llamado
surco intrabético y la conexión del territorio interno con Levante.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Destacan
Málaga y Sevilla por volumen de población y sus funciones de
servicios especializados y relación con metrópolis nacionales,
extienden su influencia en toda la región.</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Metrópolis
nacionales: en Andalucía no tenemos ninguna de esta categoría </span></span>
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Metrópolis
regionales de primer orden: Sevilla y Málaga, con un volumen de
población entre 500 000 y 1500000 de habitantes</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Metrópolis
regionales de segundo orden: Granada, Córdoba, Cádiz, entre 200000
y 500000 habitantes</span></span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: sans-serif;"><span style="font-size: small;">Ciudades
medianas: Huelva, Algeciras, Antequera, Marbella, Jaén, Almería,
ciudades con dinamismo económico.</span></span></div>
<div style="margin-bottom: 0cm;">
<br /></div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-41493076187324880162013-04-11T03:33:00.001-07:002013-04-11T03:34:47.250-07:00Bienvenida al Blog de GeografíaAnte todo dar las gracias a todos por vuestra colaboración y espero que os sea de utilidad este blog realizado especialmente para apoyar a aquel alumnado interesado en la Geografía y la Historia.
Suerte en la vida.
<i>Ningún gran artista ve las cosas como son en realidad; si lo hiciera, dejaría de ser artista.
<b>Oscar Wilde </b>(1854-1900) Dramaturgo y novelista irlandés.</i>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-76651981476498664352013-01-28T08:54:00.000-08:002013-01-28T09:07:47.612-08:00Calendario de exámenes para 2º ESO y 2º Bachillerato<iframe src="https://www.google.com/calendar/embed?height=400&wkst=1&bgcolor=%23FFFFFF&src=6v76h0ddfd5j9ff5ma04d0dcu0%40group.calendar.google.com&color=%232F6309&ctz=Atlantic%2FCanary" style=" border-width:0 " width="500" height="400" frameborder="0" scrolling="no"></iframe>Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-55747445981873350082012-11-11T02:53:00.002-08:002013-01-02T02:13:52.228-08:00¿CÓMO HACER UN COMENTARIO DE UN CLIMOGRAMA?
<div align="CENTER" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><u><b>ESQUEMA
DE UN COMENTARIO OMBROTÉRMICO:</b></u></span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><b>1.-
Análisis de los datos de temperaturas y precipitaciones.</b></span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">1.1.-
ESTUDIO DE LAS TEMPERATURAS:</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">a)
Valoración de la TMA (Temperatura Media Anual)</span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">b)
Distribución de las tempreaturas a lo largo del año, régimen
térmico:</span></div>
<ul>
<li><div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Hallar
la amplitud térmica (diferencia entre la temperatura media mensual
más alta y la más baja del año) y valorar dicho resultado</span></div>
</li>
<li><div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Estudio
pormenorizado de las estaciones térmicas: duración de cada una;
calificación de las temperaturas medias mensuales en cada estación.</span></div>
</li>
</ul>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">1.2.-ESTUDIO
DE LAS PRECIPITACIONES:</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">a)
Valoración del TPA (Total Pluviométrico Anual)</span></div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">b)
Distribución a lo largo del año, régimen pluviométrico:</span></div>
<ul>
<li><div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Máximos
y mínimos pluviométricos</span></div>
</li>
<li><div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Estación
de lluvias-estación seca y su duración</span></div>
</li>
</ul>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Recuerda
que la relación entre la curva de temperaturas y las barras de
precipitaciones nos permiten reconocer los meses secos y húmedos.
Cuando en un mes la barra de precipitaciones se sitúa por debajo de
la curva de temperaturas decimos que el mes es seco. Esto nos
permitirá valorar si el régimen pluviométrico de ese lugar es
regular o irregular, y si cuenta con precipitaciones excedentarias o
insuficientes.</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><b>2.-
Interpretación de datos</b></span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">2.1.-
DOMINIO CLIMÁTICO AL QUE PERTENECE</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">No
basta con nombrarlo, tienes que justificar y argumentar tal
correspondencia. Para ello debes indicar qué factores geográficos y
qué aspectos de la dinámica atmosférica intervienen sobre ese
espacio (factores geográficos como la latitud, la altitud o la
proximidad al mar; factores dinámicos como las masas de aire que
influyen, centros de acción, perturbaciones, etc.)</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">2.2.-
LOCALIZACIÓN DEL DOMINIO, REGIONES QUE AFECTA</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Más
adelante, cuando completes el estudio de los elementos del medio
natural podrás amplliar el comentario con un análisis bioclimático
de cualquier paisaje natural español. Los apartados que añadirás
son:</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">2.3.-
TIPO DE VEGETACIÓN Y SUELOS</span></div>
<div style="margin-bottom: 0cm;">
<br />
</div>
<div style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">2.4.-
HIDROGRAFÍA, RÉGIMEN FLUVIAL</span></div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-68914645769014341262012-11-07T11:01:00.001-08:002012-11-07T11:01:22.666-08:00CONCEPTOS GEOGRÁFICOS: EL RELIEVE, EL CLIMA, LA VEGETACIÓN, LOS SUELOS Y LOS RÍOS
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ALUVIÓN:
depósito de materiales sueltos –gravas, arenas, etc.- formado por
el agua al desbordarse. Al suelo formado por material de inundación
se le denomina suelo aluvial. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">AMPLITUD
Y OSCILACIÓN TÉRMICA: diferencia entre la temperatura máxima y
mínima de un periodo de tiempo, día, mes, año. Generalmente se
habla de amplitud térmica anual ( diferencia entre el mes más
cálido y frío del año), y oscilación térmica diaria (diferencia
entre la temperatura máxima y mínima del día). </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ANTICICLÓN
TÉRMICO: descenso de una masa de aire debido a que está más fría
que el entorno.</span></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ANTICICLÓN/
ALTA PRESIÓN: centro de acción compresión atmosférica superior a
1013 milibares, que es la presión media a nivel del mar.</span></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">BAD
LANDS / CÁRCAVA: son formas de erosión sobre materiales
sedimentarios margoso-arcillosos en un medio semiárido; éstos han
sido fuertemente diseccionados por la acción intensa del agua, dando
lugar a una densa red de barrancos fuertemente encajados y separados
por crestas agudas. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">BARLOVENTO:
ladera de un relieve o región, orientada hacia la dirección del
viento. Habitualmente la ladera de barlovento es más húmeda y de
mayor amplitud térmica, ya que el aire se ve impulsado a ascender,
al hacerlo se enfría y se produce la precipitación.</span></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">BIOGEOGRAFÍA:
<span style="color: black;">estudia la distribución de los seres vivos
sobre la tierra así como las causas que determinan dicha
distribución. Dicho de otro modo, la Biogeografía es la “Geografía
de la Biosfera”. </span></span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">CADUCIFOLIO:
término que se refiere a la capacidad de algunas plantas para perder
sus hojas anualmente. En las zonas templadas la caída de las hojas
se produce durante el otoño o el invierno: robles, hayas. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">CAUDAL:
cantidad de agua de un río que pasa por un punto dado de su curso.
El caudal absoluto se expresa en metros cúbicos por segundo y está
afectado por las condiciones climáticas y ambientales que tiene la
cuenca. El caudal relativo se halla dividiendo el anterior, en litros
por segundo, por la superficie de la cuenca, en km<sup>2</sup>. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">CUENCA
HIDROGRÁFICA: espacio geográfico o área en la que las aguas de la
escorrentía convergen en un colector principal, que es un río, lago
o mar. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">CUENCA
HIDROGRÁFICA: espacio geográfico o área en la que las aguas de la
escorrentía convergen en un colector principal, que es un río, lago
o mar. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">DEPRESIÓN
/ CICLÓN / BORRASCA: centro de acción con una presión atmosférica
inferior a los 1013 milibares, que es la presión media a nivel del
mar. </span></span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="color: black;"><span style="font-family: Verdana, sans-serif;"><span style="font-size: small;"><span style="text-decoration: none;">DEPRESIÓN
GEOLÓGICA: </span></span></span></span><span style="color: black;"><span style="font-family: Verdana, sans-serif;"><span style="text-decoration: none;">zona
del relieve terrestre situada a una altura inferior que las regiones
circundantes.</span></span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">DOLINAS:
depresión geológica en terrenos con relieve kárstico.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">EDAFOLOGÍA:
es la ciencia que estudia los suelos, analizando su perfil, su
composición y distribución, y en cierto modo la forma en que se
utilizan (agronomía). </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">EFECTO
FÖHEN: efecto causado por la colisión de masas de aire húmedas con
un sistema montañoso, que al ascender por la ladera de barlovento,
se enfrían, condensándose y produciendo precipitaciones, dando
lugar en la vertiente de sotavento a vientos muy secos y temperaturas
que van aumentando conforme estos descienden. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ENDEMISMO:
la restricción de una determinada especie vegetal a una zona en
particular (hábitat) debido a factores como el clima, suelo o
aislamiento. </span></span>
</div>
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<br />
</div>
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<a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" name="Escorrentia"></a><span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ESCORRENTÍA:
proceso de desagüe superficial por una pendiente, que se alimenta de
las precipitaciones, deshielos o manantiales.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">FRENTE
POLAR: plano de encuentro de dos masas de aire de características
distintas: cálida y fría/ seca y húmeda… En este caso se refiere
al contacto entre la masa de aire frío polar y la cálida tropical.
Cuanto mayor es el contraste más potente es el frente. Separa, por
lo tanto, los anticiclones cálidos de las bajas presiones polares.
Se localiza en las latitudes medias y junto al Jet Stream y sufre un
desplazamiento latitudinal. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">GARRIGA:
matorral perennifolio xerófilo y poco crecido, que se encuentra
sobre terrenos calizos en las áreas más secas de clima
mediterráneo. está constituida por coscoja, algarrobo
silvestre, lentisco, acebuche, romero y tomillo. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">GEOSINCLINAL:
Surco o depresión de la corteza terrestre donde se van acumulando
gran cantidad de sedimentos, que posteriormente son levantados y
plegados. Los geosinclinales suelen formar parte de grandes cubetas
sedimentarias marinas que, conforme van acumulando sedimentos, tienen
procesos de hundimiento. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">GOTA
FRÍA: es una masa de aire frío, que se desliza del frente polar y
desciende a gran velocidad hacía latitudes más cálidas. El
contrate de temperaturas da origen a procesos convectivos importantes
que dan lugar a precipitaciones abundantes, a veces catastróficas,
tanto más cuanto mayor sea la diferencia térmica entre las dos
masas de aire. Siendo frecuentes en el Mediterráneo a finales del
verano y principios del otoño. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ISÓBARA:
línea imaginaria que en un mapa de tiempo une puntos de igual
presión, medida a nivel del mar. Su conjunto configura los cambios
de presión ( anticiclón...). </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ISOTERMA:
línea imaginaria que une en los mapas los puntos de igual
temperatura, bien media o medida en un momento concreto. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ISOYETA:
línea imaginaria que en un mapa unen puntos de igual precipitación.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">LAGO:
masa de agua dulce o salada, acumulada en zonas más deprimidas de la
corteza terrestre, formada por agua estable y con cierta profundidad,
y sin comunicación con el mar u océano abierto. </span></span>
</div>
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<br />
</div>
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<span style="color: black;"><span style="font-family: Verdana, sans-serif;">LAPIACES:
surcos u oquedades de dimensiones pequeñas o medianas separados por
tabiques.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">LITORAL:
zona del territorio que linda con el también llamado costa.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">MODELADO
KÁRSTICO: Formas que se derivan de la acción del agua sobre las
rocas solubles como la caliza. Algunas formas aparecen en superficie:
Lapiaz, dolina y poljes. Otras son subterránes: Galerías, simas,
estalactitas, estalagmitas.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">MOVIMIENTO
OROGÉNICO: Proceso que transforma la corteza terrestre, con fuerzas
y presiones, provocando la aparición de las montañas. A su vez, va
acompañado de movimiento y alteración del magma así como
vulcanismo. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">PERENNIFOLIO:
término que se refiere a la capacidad de algunas plantas para
permanecer siempre con hojas; de tal manera que cuando cae una sale
la otra hoja. Ejemplo de especies perennifolias son las encinas,
(quercus illex), los alcornoques y los pinos. </span></span>
</div>
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<br />
</div>
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<span style="color: black;"><span style="font-family: Verdana, sans-serif;"><span style="text-decoration: none;">POLJES:
extensa depresión cerrada, de fondo plano y dimensiones kilométricas
dominada por vertientes escarpadas.</span></span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">RED
HIDROGRÁFICA: conjunto de ríos, riachuelos y torrentes que forma el
agua de la lluvia al circular por la superficie terrestre.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">RÉGIMEN
FLUVIAL: término que incluye las fluctuaciones estacionales del
volumen de un río y sus afluentes en función de sus fuentes de
alimentación. Puede ser regular e irregular. El régimen regular
apenas presenta variaciones anuales, ríos de la subvertiente
cantábrica. En el régimen irregular existen variaciones
estacionales con crecidas (caudal máximo) y estiajes (caudal
mínimo), ríos mediterráneos. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">RÉGIMEN
PLUVIOMÉTRICO: variación de las características de las
preicipitaciones, en cuanto a frecuencia, intensidad, duración,
épocas predominantes que definen un clima o una región.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">REGIÓN
FLORÍSTICA: Extenso territorio con una flora o elementos originales,
con especies, géneros o familias.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">RELIEVE
CÁRSTICO: tipo de paisaje calcáreo con gran nivel de erosión, cuyo
nombre procede de la región yugoslava de Karts, paradigma de este
tipo de paisaje, con estrechas gargantas, hondonadas, fisuras y
simas, grandes depresiones de fondo llano temporalmente inundadas y
gran circulación de aguas subterráneas.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">RELIEVE
HERCINIANO: forma de relieve consecuencia del movimiento orogénico
del paleozoico superior que afectó a Europa y Asia Central.</span></span></div>
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<br />
</div>
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<span style="color: black;"><span style="font-family: Verdana, sans-serif;">SIMAS:
Cavidad que se abre al exterior mediante un poco o conducto vertical
originada por un proceso erosivo kárstico en la roca calcárea.
Degeneración de una dolina.</span></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">SOTAVENTO
(o socaire): ladera o lado de un relieve, protegido del viento
dominante, generalmente más seca y de mayor amplitud térmica que la
ladera de barlovento. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">SOTOBOSQUE:
término empleado en para referirse a la vegetación que crece bajo
los árboles de un bosque, ya sea leñosa o herbácea. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">TROPOSFERA:
capa de la atmósfera terrestre en contacto con la superficie de la
tierra.</span></span></div>
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<br />
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">UMBRÍA:
vertiente de una ladera de colina o montaña expuesta al Norte, en
donde casi siempre hace sombra. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">XERÓFILO
/ PLANTAS XERÓFILAS: vegetales que soportan y se acomodan a vivir en
medios escasos de humedad. </span></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><span style="font-size: small;">ZÓCALO:
conjunto de materiales metamórficos e ígneos que forman el
basamento de la cobertera. Se trata de materiales antiguos, que
sometidos a empujes tectónicos, se comportan de manera rígida
fracturándose. </span></span>
</div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-29889565549829727892012-11-07T10:45:00.001-08:002013-01-02T02:14:49.672-08:00APUNTES SOBRE CLIMATOLOGÍA
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><u><b>1.-MASAS
DE AIRE Y FRENTES</b></u></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><br /></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Las
<b>masas de aires</b> se pueden describir como cuerpos bastante
extensos de aire con propiedades físicas de temperatura y humendad
relativamente uniformes, en el plano horizontal. Para que una masa de
aire sea considerada impotante debe tener más de 1500 km de
diámetro. Los gradientes de temperatura y humedad en el interior de
la masa de aire no experimentan grandes cambios.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">El
<b>frente</b> es la frontera que separa dos masas de aire, la
superficie de discontinuidad entre dos masas de aire.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><b>1.1.-ORIGEN
DE LAS MASAS DE AIRE: </b></span>
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">Las
regiones de latitudes medias al ser regiones de movimiento casi
constante del aire, son poco favorables a la formación de masas de
aire, son las latitudes altas y bajas las más idóneas para su
formación. Las zonas polares o tropicales son, generalmente, las
regiones de origen.</span></div>
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<span style="font-family: Verdana, sans-serif;">Una
masa de aire puede permanecer inmóvil sobre su región de origen el
tiempo suficiente como para adquirir las características de la
superficie del suelo. Así, la masa de aire queda definida.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><b>1.2.-
CLASIFICACIÓN DE LAS MASAS DE AIRE POR SU ORIGEN:</b></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Hay
dos tipos principales de masas de aire: <b>masas de aire polares</b>
y <b>masas de aire tropicales.</b></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Las
polares son masas frías y las tropicales son masas cálidas. Si se
forman sobre los continentes serán secas y si lo hacen sobre los
océanos serán húmedas.</span></div>
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<span style="font-family: Verdana, sans-serif;">Las
masas de aire tropical y polar se subdividen entonces en marítimas o
continentales: <b>Masas de aire tropical marítimo, tropical
continental, polar marítimo y polar continental.</b></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><b>1.3.-
FRENTES:</b></span></div>
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<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Las
grandes masas de aire no se mezclan, sino que están separadas por
una superficie de discontinuidad. Esta superficie se ondula por
efecto de la presión que ejerce una masa sobre la otra y se forma
un frente. </span>
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><b>Frente:</b>
choque entre dos masas de aire de diferente origen y características.
</span>
</div>
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<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">En
las latitudes medias existe una línea de contacto entre el aire frío
de origen ártico o polar y el aire cálido de origen tropical. Esto
es el <b>frente polar</b>, que separa la masa de aire tropical de la
masa de aire polar.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">El
aire frío al pesar más tiende a encajarse en forma de cuña bajo el
aire cálido. La masa de aire frío permanece en contacto con el
suelo y fuerza a la masa de aire más cálido a elevarse por encima
de ella. Se trata de un <b>frente frío.</b></span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Cuando
el aire caliente penetra en una región de aire más frío se habla
de un <b>frente cálido</b>. También en este caso la masa de aire
frío permanece en contacto con el suelo y la de aire caliente se ve
obligada a elevarse.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Los
frentes fríos se asocian con perturbaciones atmosféricas, el aire
caliente se eleva y origina frecuentes tormentas.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Los
frentes cálidos van acompañados de condiciones atmosféricas
estables aunque la inestabilidad del aire cálido formará células
de convección produciendo chubascos y tormentas.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Los
frentes fríos se mueven a mayor velocidad que los frentes cálidos.
Cuando existen simultáneamente ambos frentes, caso de las borrascas,
el frente frío alcanza al cálido y produce un <b>frente ocluido</b>.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">El
desplazamiento de los frentes está relacionado con la circulación
general de la atmósfera y con la corriente en chorro.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><u><b>2.-
ELEMENTOS DEL CLIMA</b></u></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><b>2.1.-LA
PRESIÓN ATMOSFÉRICA</b></span></div>
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<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">La
<b>presión atmosférica</b> es la fuerza ejercida sobre una
superficie por el peso de la atmósfera. Los gases que constituyen la
atmósfera pierden rápidamente densidad con la altura, por lo que,
la presión disminuirá.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">La
presión atmosférica se mide con el <b>barómetro</b>, instrumento
inventado en el siglo XVII (1643) por Torricelli, dicípulo de
Galileo.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">En
los mapas del tiempo se representa la presión por medio de <b>isobaras</b>
o líneas que unen puntos de igual presión atmosférica. Las
isobaras representan las presiones reales reducidas al nivel del mar.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">La
presión disminuye con la altura. El descenso medio de la presión es
de 11 mb cada 100 m en los 1500 m más bajos de la atmósfera.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">Las
variaciones atmosféricas horizontales de presión se han manejado
tradicionalmente para predecir el tiempo de forma inmediata. Se
observó que la tendencia de la presión a bajar manifestaba tiempo
variable, y la tendencia a subir manifestaba tiempo estable.</span></div>
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<span style="font-family: Verdana, sans-serif;">Considerando
la presión de 1013 mb como presión normal a nivel del mar o altitud
0, las presiones por encima de la presión normal serán Altas
Presiones y las presiones por debajo de la presión normal son las
Bajas Presiones.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">Las
figuras isobáricas más importantes son:</span></div>
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<span style="font-family: Verdana, sans-serif;">Los
<b>anticiclones</b> donde la presión aumenta hacia el interior.
Suelen ser más extensos, pueden ser dinámicos o térmicos.</span></div>
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<span style="font-family: Verdana, sans-serif;">Los
<b>anticiclones dinámicos</b> son el resultado de un movimiento de
subsistencia (mecanismo de descenso) de la atmósfera, generalmente
de aire caliente.</span></div>
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<span style="font-family: Verdana, sans-serif;">Los
<b>anticiclones térmicos</b> se forman por un fuerte enfriamiento de
las capas bajas de la atmósfera en contacto con un suelo muy frío.
Se trata de anticiclones fríos de poca altura, se debilitan e
incluso desaparecen en verano al aumentar la temperatura del suelo.</span></div>
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<br />
</div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">En
las <b>borrascas</b>, la presión disminuye hacia el interior.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">En
las regiones de poca variabilidad de presión se forman los <b>centros
de acción anticiclónicos positivos</b> o <b>depresionarios
negativos</b>.</span></div>
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<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Como
centro de acción semipermanente positivo tenemos el <b>Anticiclón
de las Azores</b>, en verano cubre casi toda la mitad sur del
Atlántico norte y se prolonga hacia Europa Occidental y el
Mediterráneo. En invierno, la banda anticiclónica en conjunto se
estrecha, el anticiclón de las Azores se retira de Europa y sobre
todo del Mediterráneo.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">Los
<b>centros de acción depresionarios negativos semipermantes</b> son
de origen dinámico como el de <b>Islandia</b>. En el Hemisferio Sur
apenas se desarrollan. Están mejor desarrollados en invierno que en
verano. Su origen viene de una masa de aire frío del casquete polar
y por el paso frecuente de depresiones móviles.</span></div>
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<span style="font-family: Verdana, sans-serif;">En
la <b>zona ecuatorial</b> existe una banda de bajas presiones.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><b>Dos
zonas subtropicales</b> de altas presiones en ambos hemisferios
(Anticiclón de las Azores)</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><b>Dos
zonas polares</b> de bajas presiones (depresión de Islandia y de
Aleutianas)</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">Los
mapas isobáricos mundiales de invierno y verano presentan la
siguiente disposición:</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">En
el verano boreal (invierno austral) la banda anticiclónica
subtropical del norte se fragmenta al atravesar el continente.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">En
el invierno boreal (verano austral) la banda subtropical de altas
presiones se refuerza y ensancha al cruzar el continente, mientras
que la meridional se interrumpe.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><u><b>3.-
CIRCULACIÓN GENERAL DE LA ATMÓSFERA</b></u></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">Las
diferencias térmicas y de presión sobre la tierra tienden a
equilibrarse a través del viento a escala global a esto llamamos
circulación general atmosférica.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">La
<b>chimenea ecuatorial </b>está fundamentada en el calor ecuatorial:
el aire cálido del ecuador se eleva y origina una zona de bajas
presiones que atraen los alisios. En altura se dirige hacia las
latitudes subtropicales, creándose un contralisio, o corriente aérea
de altitud que al bajar origina las altas presiones subtropicales.
Desde estas altas presiones, el viento se dirige hacia el ecuador,
alisio, o hacia las latitudes templadas, vientos del oeste.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">El
movimiento de rotación de la Tierra da lugar a una desviación hacia
la derecha de todos los vientos, por lo que el aire polar no alcanza
el ecuador.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Si
se trata de aire ecuatorial con dirección a los polos, también se
desvía hacia la derecha, forma un cinturón anticiclónico
subtropical que emite vientos hacia el ecuador, en dirección NE-SW
en el Hemisferio Norte y SE-NW en el Hemisferio Sur. Estos vientos
son alisios de ambos hemisferios que convergen en la zona ecuatorial.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">El
cinturón anticiclóncio subtropical emite también vientos.</span></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;">Al
finalizar la Segunda Guerra Mundial se descubrió una potente
corriente aérea en la alta atmósfera, el <b>Jet Stream o corriente
en chorro</b>. Se trata de un flujo de aire del Oeste observado en
cada hemisferio a una altitud de 8000-12000m entre los 30º y 45º de
latitud, con velocidades superiores a 500 km/h. Esta corriente sopla
de oeste a este.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">Cuando
sobre España hay un anticiclón en el mapa del tiempo, pueden
ocurrir dos cosas en las capas altas de la atmósfera: o que haya
también un anticiclón o que haya borrasca. El primer caso
constituye la situación anticiclónica propiamente dicha. Esto sería
buen tiempo en general, aunque con la posibilidad de nieblas, y si es
invierno, riesgo de heladas nocturnas.</span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;"><u><b>4.-
REPRESENTACIÓN GRÁFICA DEL CLIMA: CLIMOGRAMA</b></u></span></div>
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<br />
</div>
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<span style="font-family: Verdana, sans-serif;">El <b>climograma</b> es un gráfico
que representa la distribución de temperaturas y precipitaciones en
un año, es decir, el régimen térmico y pluviométrico de un clima.</span></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm; text-decoration: none;">
<span style="font-family: Verdana, sans-serif;">El climograma representativo se
confeccion con las observaciones de muchos años, entre 20 y 30. Así
obtendremos un año típico, reflejando la evolución climática.</span></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm; text-decoration: none;">
<span style="font-family: Verdana, sans-serif;">El climograma se construye sobre
ejes de coordenadas. En el eje vertical izquierdo se marcan las
temperaturas en grados centígrados y en el eje vertical derecho las
precipitacione en milímetros. En el eje horizontal se colocan los
meses del año.</span></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm; text-decoration: none;">
<span style="font-family: Verdana, sans-serif;">Si la curva de las precipitaciones
queda por encima de la curva de temperaturas, tendremos un <b>período
de humedad</b>. Si la curva de temperaturas queda por encima de la de
las precipitaciones, tendremos un <b>período de sequía</b>.</span></div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm; text-decoration: none;">
<span style="font-family: Verdana, sans-serif;">La <b>amplitud térmica</b> u
oscilación de temperatura es la diferencia entre temperatura media
más alta y la más baja. </span>
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm; text-decoration: none;">
<br />
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm; text-decoration: none;">
<br />
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<span style="font-family: Verdana, sans-serif;"><u><b>BIBLIOGRAFÍA:</b></u></span></div>
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<br />
</div>
<div align="JUSTIFY" style="font-weight: normal; margin-bottom: 0cm; text-decoration: none;">
<span style="font-family: Verdana, sans-serif;">-MINGORANCE JIMÉNEZ, Alfredo:
<i>Climatología Básica. </i><span style="font-style: normal;">Madrid.
1989. Ediciones Akal. Serie:</span><i>Geografía Humana, Económica y
Física</i></span></div>
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<br />
</div>
Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0tag:blogger.com,1999:blog-5183437800531095190.post-55928994280386583812012-11-07T10:37:00.002-08:002013-01-11T00:05:29.661-08:00PRUEBA DE PAU DE GEOGRAFÍA 2010-2011<br />
<br />
OPCIÓN A<br />
1. Exprese de modo conciso el significado geográfico de los siguientes términos:<br />
- Industria siderúrgica - Cuenca hidrográfica - Cordillera <br />
- Ría - Éxodo rural - Pesca de altura <br />
(Valoración: hasta 3 puntos; máximo 0,5 puntos por término)<br />
<br />
2. En el siguiente mapa se representa el sistema urbano español. Analícelo y conteste a las<br />
siguientes preguntas:<br />
<a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><br /></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="http://draft.blogger.com/blogger.g?blogID=5183437800531095190" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a>a) Describa los principales ejes urbanos que aparecen reflejados en el mapa. (Hasta 1 punto).<br />
b) Cite las aglomeraciones urbanas que tienen entre 500.000 y 1.500.000 habitantes y sitúelas en los ejes<br />
que ha descrito anteriormente. (Hasta 1,5 puntos). <br />
c) Explique los principales rasgos del sistema urbano español. (Hasta 1,5 puntos). <br />
<br />
(Valoración: hasta 4 puntos) <br />
<img alt="" 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IDjZUmmKmH5BSWSTEOA7JyCNWvX5+UXc7wcAuC7IYDObNPymOGsW795z96Dkkw9HySZihIJQggBIuWJIACek3leDAMwDMuxAwCAEDSNadQMQ5Al6roY/7B05uTll2TnFHK8ojPH88H1QJK1EwWlimIKIsEGa7pt2YEgkn37c1as/Ab/+NgXMS2fUFMQyd/d4Co7rlaF0korR0VpPMF5Png+GKaX4WRJ1rKyToUQNGK4djD2hfFdO99GVVazRu0WzW4wmfPAoIcvv7TGC6PHQQi26ZnMETjZNr1BAx585aXXIAQ+I0EALZvf+MnHn+Lt9ZmnRg8dMkwjRtvW7We8MUuVtVo1r921cx++u3LF1wMHPChLdOKEqSOGP01Utm/vIZ6TL7rwspLiyJTJr7RofqNlHo47b960ffrrMxPxTKeOXT/+aDHPyU2btNywfott+eh7XVe3waaN2yCEWzp27Xhz55539XHtYPlnK/v2uWfv7gOhD/FoCkJo367jooVLTOaIvILgnzB+ClFZu7Ydsg/lW6aHsHTsoFfPvh07dCkqLMP9P3D/Iy1btC4qLBvzwvgON3eOx9LplHBgf07jRs337D4g8Eqb1u137tiLHYLxL05u1bJNYUGprlnvzZ1/5+09GtZvsn/vofzcomQ8c2vXOx5+cHBudoFj+YEHEMLTo54bPmyURownnxjZ4ebOmzdtlyX6ysuvX13z2p9+XOu5ACG8NPXVetc1vKf/wHgsnZNdkEmL6E7d03/gE4+P2Lpl54ovvurYocspJ58+e9ZcCOGhBwcPe2LkZ8tWLPpk6fvvfVBaEg18kCVakFfsOeHan9fd1u3OU046bdmS5VRlskgWLVxybe3rRjz51E8/rOnds+8tHbvu3rnvi8+/rH9949dfm+HYAVFZaUnUsYOxYybUrlV30sSX3nt3QYP6TRYvWmYw57EhwwYOePCmdh0/X7YCAtCp+fCDg888/ZzFnyw9uD+nf9/7TjnptK6db2vSqHn3O3pu2rD1+efGXnbJlQ/e/8it3e5s1Lh5jatqf7HiK0Tj0888f9LJp818623L9tG++371zR06N29x4yWXXtmgYdMxYyeUlEafGDZy8JAnQoDNW3b07NX3unoNzz3vwssuv2ro48OTKb6ouPzhRx67q0efkpIyw7AWLlx0880dv/nmu1mz5mRlnXzWWeecdtoZ5557frNmLb788qtNm7Y0bdo8K+vk6tUveuPNWRgllhVdEEmGk6OxtEqMEwWltg2EmpKsCSJRieH5QDUrN6/42+9WByFgQha6p1SzCDX/7gZX2XG1KpRWWjkqSvFmkeHkZErAiFZW1qmppCAJKgQw4vGRrVu0CeywY7tOXTp05RJ8YIejhj3Vr1f/M04585qrrpUysq07EMAdXe8c8+xYVSAmtcCFTjfd0rdnvy4duta49Ko7u3WPFEchgAZ1G05/5Q1bd5o3bdWqZZusrGpZWdVOyjo1leQhhP79Btx37/2KrEEIsWiq1tV1FFm7qkbtee9/mE4JXEaKRVMYlIMQbru1+7RXpq/5ed3FF12+d89BRJdlerd06ta1y+25OYXX1am/Z/ve+nUafPj+R4f2Zt/SvrOUkRVe9Ux/64ZtF5xdfe+OfRBA7oG8RHkSo6CyRK+v12j2rLmLPlk65oXxL019lajshlZtV//0i+cC021V0SGExo2ab960vfMttz7z9PNYk0mLrhP6HuRkFzRvdgOyHEJ4fvS4tm1uLi4qD3zo1KFLzv7ce/rcO6DfQCJS8KFvz36vTn0tdAACUAUCAfTvfc/IJ0bFSuO3dOz6w/c/404EXtm4YWt5WVwSCSXGXd17r/l53R239/hq1Xd4rTAs+egjQ4cMfgI9YMv0Ro54ZvrrM7du2dnjrj6fLFyCm2H/gKjMdUIIQeHVYUOefGbEsy8+P37urHfjZQkI4MEBD82Z8TZTDQggGUm9NX3W7m17tm7e0f3OXi+Om1RaEsWdRMoT/fsNmD/vI9zzL2s3tL+p03ff/vTdtz/dP+jhRg2bPT3quXQs883Kb4c89FjdWtctX/JFUW5x7+59Fi74BFzwrYCIFAIYN/rFJvWb/vTDGgghFk+Pfn7c/AUf68xes3b9oPsf7tip68RJL0WiSZWw6W+81ahx89HPj3PcMAR46unRN7XvtHPXvvETpoyfMMUw3denz5w1e65peablJVP8kMeGjR03UdOtd+bOy8qq9uyzoxVFmT9/fr9+/Q4ePPjSSy+NHTu2pKQEAGzbBoADBw706tXr5ZdfBoDVq9c0aNh00uRX4gkOk5gw0ltYVH6ioNQ0Q505mm7Lio6Zujpziooj3/+wBv/yeAqKygg1q8ZK/+lWhdJKK0dFqabbsXjGcQH/b8xwr6xR27YCzwYI4d67Bzz+2JO27rRq0bpRvcYQwAP3PWibHgRAVXbXbT2GDhmm8KrvQs87ek14cbKYlphmQQDt23V8d/Z7juXn7M+9plbdpZ8sc+2gS4euH8z/2DP9yy+tkZtTiDf3gvyS6+s1isfSt3Tq9sGChbblO3bw6y8bL7n4ings3btXv+dHj2O6LfAKwmzpkuWioA4c8OALz7/IdLtF8xvzcoskkZSWRC3Tu65ugxtatZVE0rL5jRvXb8nZn9v6hnYL3v2gc6duyUjK0G2DmLJImjVsfnB/DgSQm13QrGHz06qd+eSwUUy3n3n6+e539po86eVFnyydPWtuKsm3ad1+3vsfKrJWXhaHEAryS5o1bZV9KL/DzZ1/+P5nUVAXL1p27TX1Tjv1rKVLlpeXxZ8cNuqiCy87+aTTsrKqNWzQdPu23WEAhQWlN7Xt8MN3q5PxTO+efdf/usk2vdtv7d68aauzzjj3vHOqX3zhZZs2bO3Uocvct9/fvnVXty63f/3V97pmadREjzyZ4HTNmjpl2oTxU3JzCm+7tfuC+R9DCOmUEIumZIkOe2LkU6Oey80plCVqW363rnc88vBje3YfGDL4ibPPOh97Ld263rF7135dsxLxDNOsdb9sbN2izbvvzJM55a47ey3+6NPiwrL+ve9ZtmS5zCmrVn7z/tvzXpv2RnFeyZxZc+vVbbDk088hBJ6TIYC578zr1KHLD9//7DmhRs3S4kjbNje//+6CN6a/9cbrM0eNeKZ+vUafL1sx4vGR782dP+LxkfPe++DA7oMvjp14d4++jz782JOPDX/3nXkl+aWjnx3Tu3ufH75bbVv+e+8u6Nnj7iWffk6JMXvW3Jdfeu2rVd8NGvjQtFemu0742qtvNqjfBCPJ6ZSAQYKdO/bee8+gd95+f/nnX952a3fsNDh2gO7740OH791z8N258wcNfKhv3/5z5syZ//6CJ5988tCB7Oeee27gfYNycnLycvK3bt1aXhpJpVKPDR7avHnz1T/+HASAYeEQwHZCQs3Ssng0lsYMphMCpYKgEWrixDYM5KrEyC8o/WLF154PvKAaplcxoajKK/2nWxVKK60cFaV792XjDcIwvSCE1T+vO/W0s19+Zfovazc++MDgk7JO37VzPwRwYfXLalxeyzL9Ky+v2aL5jY7luq5fv16DWbPmOJbrOF7Pu/pMnDA18CCZ4HRqdurYddKEqejBDLjvgXFjJoiC2qhB08mTXnbt4PzzLtq4YStC4tDBvMsvuyqZ4D784JPTTzs7leQDH5Yt/eLqmtdKItm4YeuF1S8tLioHAEr1wYMfu/DCiyOR2MiRT40bN17T2DXX1Bk06IFEIhUEsHr1mjPPPDsajVuWc0OrttNfn2no9swZc2rWqD36ubHZB/MM5jiWz3S7c6dub895zzJcCMFzwls6dZs86WXb8hs3ar53z8GK2zGE0LXL7U+Nei4eS+O5jBs7sW6d+oUFpZMnT+3X756SkrIgAM8L2rRpt2/voZ079jZs0Gzrll342bfnvN+wQbPduw698/a86+s1uvKKq6+9pt6ZZ5z75cpvKDEeefixN9+YVVoSRZ/YNNzHhgwb88L4stLYHbf3+GXtBsv0MmlRFNRHHn7ss2UrIITud/Zq2aL1LZ263dCqbf9+A3bt3Bf4kExwTLf79xsw7ZXppSVRSgwI4YXnXxw3dmJxUfk9/QciYDA+nJtTiEcMA5gwfkr7dh3nvjPv61Xf3XF7j5lvzlYV/Z5+A1au+Npzwq9WfTd54kstmt/4w3er83IKO3fqNuONWZZmyyIhIt2wbvOwIU9u37pLSIm+C+DBkEcfn/fO/AkvTn7k/kf37z00asQzs2fNHfvC+OWffznk0cdnz5p7YF92v773DR0y7OfVv06d/MqXK7+xDHfihKl1r72+W5fbGzVoelq1M6dMehkCgBBGDn96xhuzAg9GPzvm9VffTMTSQ4cM69ypW252QVlJVKemRgwcsJ80YeqcWXNXLF/12OAnVv+4FocYAg8++fjT3j37fvXlt+PHTZr+2oxpL78+fNiI6a+88ezTz21Yu3HJ4qVdO3a74rIrLzrv4isvrzH4wSGxSNw1vGkvv1q7xjUnZVUbOeJZZrh5+SX5BaUhgCCSeIJD9pwQKLXtw64npj1LshYC7N5z8MOPFjPD1ZmDWVqyorseVKUd/dOtCqWVVv4qg1dWdI5XBJFgRKhvvwEPPDi41tX1Pv5oaWFBRNdcCKFlizYtW7QhqqEq+pgXxmdlnXzSSadMnDjZ98NIJOb7Ydcut997zyCiMtvyXSc85+wLXp32hsEcXbNmz5p78kmn2ZZf/YJLxrww3rGD2rXqXnzR5VlZ1c4849ysrGq//rIRQkgl+Xv6Dzwp69Szzzq/2iln5OYUJuIZCOG5Z8dcWP3SatVOq179oqyskwsKigCgadPmY8aMEwQJAC699PKLLrqkdu1rs7JOjsUSjuMBwNU1r920cVs6JcRj6T69+2dlVduz+wDPyb4HtuWnknzHDl0uufiK50ePa39TpyaNW4x/cbLvQcMGTW9o1bZxo+bdut5xTe3rMF7avNkNPe7q887b7/fp3f/KK67evm03hGBZTt269dq1a//NN9/df/+Dp556+tdffc9zctMmrXbu2Oc6IApk2dIvhz428pe1m7t0vn3jpu2W7TtuOH7ClDvu7FlSGr2l860PPjRYEFVZ0ZjhOG746ODHMVb56mtvXnF5zeWffxmNJHv17Fvr6jo52QVLPv28w82dv/3mxx3b9/y8+tced/X5bNkKLiOhc//UqOe639krFk0RlQ0a+NCF1S/99psfKTF69rj7ow8XGcxx7ECRNc8F1wk1ambS4uNDhw9/8qmJE6ZOGD9l5Ihn7r1n0N49Bx984NEWzW/cuGFrGMDmTdtb33jT4kXL5s/76Ka2HX785icIQEiJEICUkUcNe2r6K29AAKEDE8dOat/65u+/+mHalFdnvDaztDjy9pz32t/Uqe/d927ftnvI4Cfef++DaCSJI9yeC6bh4vD2E4+PuK5ug59X/xr6UJRb/Nyo0Qve/WD9mg0D+w+qW+u6008+47wzz3/x+fEHdh+cOHZSnavrvv7ydPAAAnh50isN6jb8esU3w4eOeGniy5k4N6DfwLemz9IV5jCXS/Bvvjpj4thJ6Vhmxmsznxg8zNLskU+MatOy7RODh+UeyJs25dXnRo32TD+wQ0yiLsotXrX8q5L8Ugjg4P6cgQMemjL1VRwBKSgsE0TCDBfzXU8IlGqaq6gMs4515nC8Ypjezl37v1z1HU4wxZmmkqzZTijJ2t/d4Co7rlaF0korR0Wp40JObhEzXMP0snMKQwDUlEFXiagWJTZOFKmYa6HIGn4lum64rq+qVJIUDLgVFZZBCLJEfQ80arpOaJmeYweOHaiKjqINu3ftDwMwDRdH7HD7TFqEEJhum4ZLVKZR07EDgzmxaErglTCAzZu3xmIJPJk9e/Z5XmBZTjQa1zQGACtXrvr++x+xSYpCTNMuyC/ZvWu/abiOHcSiqV0798WiKdNwRUHNpEXb8nXN2rlj74w3Z3+xfBW2ihLjq1XffbBg4cKPP43X85YAACAASURBVP3xhzUTxk8pKiwzDVfXrDmz331q1HNjx0w4sD8Hw62U6rKszp79dp8+fTds2LR//8HsQ/mHDuZ9uvjzvXsOofxCeVlq4oRXVq747rVXZ8TiGVEilu1HoslHHh26Y+feRx4duuCDhSph+w/kRKLJEGD6G2+NHPVseSShM3vZ0i/atrn5pKxT7+5zT2lJ1HNh8KOPPzlsFNLdNNz7Bz3cq2ff9es2i4LquTDgvgeuqlH7vHMvrH7BJXfe0XPB/I+ZbocB3N3nnpYtWp9x+jlZWdXOOP2cTxYukUQCIUwYP6X9TZ1+Xv0rftE52QV33tHzgwULIYRBAx8668zzsrKq3dz+luvrNVr0ydLvvv3pgUEPn5RVrdrJp59z1vnt2ty8feuuPbv29+7Zt3HDZlddWeukrGoff7gIQnhi6PAnnxh56EBucVH5oIEPzXrrHcv0Xnj+xXfnzi/IL+nfb0D7mzp163pHu7YdBtz3wNo161+a+mr96xsvW/pF6INOzaFDhr089dWnRj773DMvRMsTvgtlJdG+fe6ZOH4K06zx4ybVrFF7wouTp0x6uVWL1i9NmQYhvDbtjUkTpjqW/8LocZdfWmPyxJfKSqITXpx8xWVXvT37XVkkL46d+P67Czwn/GzpF7ff2r1/3/t2bNs94cXJd9x217z3Plj40eIF8z7atWPvV19+e8dtd7027Q2TOVs2be9+Z+/xE6ZijDcSTVl2kM5ImPV6QqBUUUxsLWYgCyJJZ6TNW3Zu37EX55Ji1BeljlRi/N0NrrLjalUorbTyV2lHVLNQXIZQMxpL5+QWhQDFRTFR0FJJCX5TsHPsMJngicp4TtZ1gxBN1w1VpQCgqrSsNGaZnsAriqzJEoUQCgtKDebwnIyY9FyQRFJWGkMY40BgTnaBYwc4qUPglXRKYLqNzig+QggH9ucYzAlDSCRShGgcJySTacOwAMA07T179lmWE4aQSmUYM7Ge4wQEnm35qqJjeo7AK54LAq9g8BYPqiq664QGcygxYtEURkGZbtuW73tQVFiWTHAQgsEc1wmR/SXFEQghlcoYhmXbrqKQVCqjacw0XAiB5xSUGWK649hQWpJAViVTQiLJiRIJAUpKo34AhumKEsEay/ZtJ3A9cNzQdgJCDaIyCEEUVLx0puEazLFMT6NmMsGZhhsGgMlWhw7m8ZxcEZHWNQu7Na4TxmNpXbMq8p/xOkgiyaRFXbNURfc98L3DlwIjw/jdpZL8ls07cGRU1yzHDspLY5bhek4YKYtjiDX0AUJYsXzV9q27MinBsfx4NHXoQC6fkVRZ0zVr3a+bMJj8zdc/bNu6Kx5Lr/t108cfLf5s2Yrln3+58ONPd+/av+bnda+8/HpebhHTrEQs/d7c+Xt3H/jx+5/XrP7VZI5tekyzPl+2Ysniz7i06Luw9ud1TwwdfkvHrss/W6kRI1qe+OiDT1Z+8RVOvNmwbvM9/QbUuaZeg+sbYypTbnbB8GGjpr82A0LQqfnxh4vmzJpbVFA6a+bbPbr37tXj7l497m5Yv0nXzrf9/NMve3bt735Hz5OzTq151TXTX38rlRY13U6lxRDA9QDz208UlBJiow/NC6rthJpu5xeUfv/DmmgsjeJQVLMsOxAlSqs0eP/5VoXSSitHRWksngkBcvOKRYlikkV+QWkQgudCQX55GICuuSjRZ1tBUWG5wRym2zwv8rwIAEVFJaWl5aIoYyKrRk3Msy0rjZmGS3+bGl9SHFEVHaOREEI0krRMD+/gsWhKVfR4LJ1Ji0y38b5fUhxhup2TXSDwimV6gQ8lJWW6bjBm4vns338wDCGd5srLowCgKAQf8/MLGTN5XsShzfKyuKromCGsa1ZZacy2/JLiCFFZcVG5ZXq+B+mUgKREkHgulJZEicrQH/VcwIxcptuIsVSSLy2JSpKSn18IAHv27DNNOycnT9esdEqgxPTcwyJETD/MMFHQUNkOBWN5QS2PJEOADCeXlsU9Hzhe2b3noM6cikrUqsWP79yxLxZNo9oRhFCQX6oqLBpJoXAxl5GZ7rgOJBN8Is4FPqC4oCLrjh2ahpdM8MVFkQpVpngsg+p9EEIywUcjqUxaQj3hZIIXBaJrdjolosYhhGBbQXlZwjGDRDSjqWbgQjySrtC7QN0JVJlQRM2zgVFbyCiOHaKoMs8pokBcB1DTMfAh8MH3AOUdIATL9AMfdGKhGEh5SRw1HFBewzZ83wGLeSgogUfBv7zIqfjc0JxUnLeYZ+qu7xy+IfgO5B4qTMY4fBkrT4Ue8GlZFigEwKiNe9OJ5ZhBhURX6AEEwHRHEmkIEE9wiSSPSryYUnCioFTTXBQFFCXquOB6sHPX/oWfLNWZY1o+/hpxcAcFHP7uBlfZcbUqlFZaOSpKU2nRtHwcVtmz95Cs6KhcmkyIRLUghB3b96OYDj76HkgiQa/Utl1CNADwvACnhSQTXBhAhSe6edP2RDzDZSRMq0FfU9cs1wlFQU3EM+iq4vboY2UfyrctPx5L4w1XkTXHDjDtSJIUALBtN5PhgwBc18dzO3DgUGFhcUlJGQDIsmpZTiqVQRyilxmNJF0nTKcExw4i5QmMMzt24DqhwCsCr5SWRHlO5jKSJJJIeUKWKNPtTFpEF9xgjiiohQWlAq9EyhMIaQAIQ+B5UZKUoqISzwsEXknEM6jhh+qyBvNTSamwIFJUGLXsACcm4my/SDRVXBLFvouiMj8AWdEj0VRuXrGiMgywF+SX5ueViAJx7BBCQGn7nOxCfKkqrLCgDHX2UawYNYTxa5IlrbgognKDv7mkOtOdWDRdWhJDiaKC/NLCgsPzZfPzSjJpqUIxX1VY4EP2oYJ0SkTdf9RjEjKKoTn4j9NUk0/LmmqauhsrT6UTgqm7jNoip4qcGvhAiYmLCqD0Y3FRBOWUFVlHGX2eU6KRlGX6mbTEpSREcklhBEUouZTEp+VkjKtgZ152UXlJHAUpY+Up5CVVDFXShYxCFUNTTUXUIqUJIjPfgUhpAhlZWhTNOVjgmIFrhbJAU3EeNZ4S0QzuOVKaKCuOWcxj1CYyUxUWAogSxSFG1CZUiXECpR2hcCBqa1PN8gPYtHnHnLffxxUCcG2AI+PVf3eDq+y4WhVKK60cFaW2EyaSfMWYEE6eU1Tm2KBrrihouub6HuC91bFDRdbCABzHi8eTruv7fqgoRBRly/SIyg4eyBV4xXVCXbMwNJqfV4whyngsbTAnkxYxzIgZQJHyBE4yceygvCxeXha3LT8MwGCObfn4FrqqpmlTqhcVlZimDQCW5WB42bZd/H0kEql0mvO8QNcNAKDEICozmON7YJke+seOHVBi6Jrle5BK8pHyhGm4mDOsaxb60xgRRf+VEgOnsR7Yn4MjvhDC4kXLateqe/rpZ86cOcuyHBwtlmUVA7mo9Y8pspTYTPc8FwL/8KwDzPNCWbt0RsIZ9KiZrul2hQByQWEZKg7iajOOHRYWlKFivkYtg7nZhwrQnzOYW1IcReVhXCHANDz0LMMAuIxcWhIrLoqgcC7THc8FVA9GkWHT8CLlSRRoRI3G0pJYOiVq1ELJe6Y7uKxNSXGUqIZpeAhXohoF+aX4caQmivRWsFzgVZQvxtVgKDFRrB/pnklLBnNRadn3ANX7uIyMa+mkU2JZaRx1+dF/LSwoE3gVzyiTllAbGULIyS7E9XZwkQCeU9CVT6dEXK4nHsts2rgdRYwlkSbiHIbfUbjfYG4ywaeSAi5lk59XUl6WwF5jOiPFE5zthI4LGCDF0OiJglJVtXhBRV6m0qLrwdZtu9+ZO9/1oMITRVnBKomG/wNWhdJKK0dFKS+oGLkqKo7gTfzaOvU9H3wPZIkNHPDIpInTAh8a1G/apvXNt3brfvllV90/6OHc3HxdN1auXPXQQ490795j+PCR48ZO3LVzHyUG023PhUQ806XzbZJIMEb6ycIl01+fyWUkHJ97+KEh0UgS48AQwuBHH/908WfotsoSVRX9jelv9exx99o16wVe2bRxm0bN0tJyANi6dfvixUvWrv115sxZn3/+RV5ewf79B996a3YqlQEA3w9Xrly1YMGHluVACHm5RYEPmzdt37hh6/p1m7dt3bV3z0FRUE3DzckuWLtm/c+rf8UmMd3GYCM60zg4CiFgRFqjJoaIY9EUPoHffpCKQhSFaBpTFAK/TaHJpKV0SjSYK4m6LDFcQtX1wPOhtCweAkRjaRReT6YE5Gs8wRUUluHceVGiispwGRZchA5CIKqRSgoVqryFBWUF+aVcRk4lBVxiBZda0zU7k5YQPwZzK8IJ6IhXLPIj8GoqKciSJkuawKvRSCrwQVUYSuRn0pJtBfFYBoV/bSvABQZQdhgXksPgLYSAe4Pw8EI0FQvV4eJ0GrV4TsH4MyWmKJBoJIXNw4XwiGrg6DKSLye7sAKBuOQOzym4t7zc4tycIscOPRcM5tpWUFYax6uRTolFheWolpxM8LFoGpftwxA3evC4fh+GxLGp6ZSYSgq4eF8smsYLjvFnpjsotoca+kXFEQwVnEAavKpqZTjZsgPbCcsjSceF3XsOfvDhItsJsfeGSby4dExV2tE/3apQWmnlqChlhptKi6m0mF9QapheSWksK+tUzwdKbAih1tX1pkx+DUKodXXdDjd32b5tT15u0YL5H1900SUHD2Z/+OHHrVrduHHj5g0bNjVp3OKO23tIIkmnBNvyB9z3QI+7+rRp3R7TZyZNfKlVyzaPPjIUs1quqlFbFFREXTolnH/eRZddWsM0XMv0mG7XurrO1CnT1q/bfFWN2sOffMpgzvp1mz0v8P2wd++7L7vsimbNWtStW+/WW2+fPfvtFSu+bNSoyZNPjuA4wTCsGjVqdut2WyKRwgPhsVCcFrNYCwtK9+45eFWN2rffdlef3v3PPac66tk2btT8+nqNqp1yRlZWtVpX14lFU6Kg7t61v/71jV8cN4nnZHSOO99ya8MGTQ8eyHUcb8mSZQ0bNt6wYRPHCWEIbdvcfOYZ5+KkUlxEDEJQZEOjTlFhlOepKOqybBBi67pnmqFtg+MAY76ue2ia5lYsVU1U60+N54giG6YR4CI2phEossFzRNdcZHY6JadTssBTVTF1zZUlJol6OiXHolw6JWvUsczQYL4k6qmkpComhGAaQXlZKh7jXQeY7qmKiZ/VqIMfp8Q+mjHdw/Q0LqNSYhvMV2QjnZKP1n5ZYops4CEwP/xfq38TW1VMRTZwA3xLVUyme44NvgeODUS10ik5GsngZv+58RwReIo9G11zDebbFjg2VFxMXXOTCbG0JBGLcjx3eK3TP9rR/kd/973y97dOzOCtCITIin4ou+Czz79EiVBcqA4H73Gd17+7wVV2XK0KpZVW/mpeaVl5Ah0tXNYqK+tU2wnTKRlROm7sFMcOT612VssWbTwXbMtnun3mmWcDwLp1G8455zyMtS759PMLq18a+ID5O+efd9GWzTuqX3AJJYZGzf37sps1bXVh9UtdJ0wmuEsuvmL/vmwcdGzR/MYvlq+6sPqlhw7mQQj792VXO+UMjLXu2rnvgwUL9+09BCFgwtGwYcOffvrZdJoDOFzz66/rb7ih9emnn4nzTdu37zB06BOiKCfiGYM5Aq/c3P6W3JxC3zucoapr1k3tOu7YvgenWm7ftrtunfoHD+T263vfxAlTMWP25va3rFzxdToldO1ye7OmrUaOeKa0JIr5vQ0bNL3i8pqvvfqmprEff1zdunXb0tJySvVoNN6pY9crLq+5f1+OqjAuI9tWkIgLimzgYKQo6qKoSxL7nSmKiSbLhiwbFfVHQxElNj6poBFWIvmOrNeog3ggqmVbmD6mS6KOlOI5wnTPtkBVTFliTPdMI0DM4B4Qb8ihv0Ap8g8BiS3Bl7iTP1oFKXHj/1+UVryFJ37kQY/J/ths3DN2TfA5Hl3XXMsMT3SUqqqFOgyWHejMESVaUhpb+MlS16tC6f9Bq0JppZWjopRQM57gCDVj8QzKdZ5/wSWY9gIh1Lyq7lerfvRcuKrGNY8+8vjdfe4dNfLZ6+s1Wrv2V0lSFi9e0r//vaeddsbZZ5979lnn40cyafH99z64846eYQCXXnLlRx8u8lyYOWPOY0OGff3V9+ede2EYQM2rrsnNKcTYb62r65SXxRcvWtayRetMWpRE0rtXv6ysameded577y4QeMU0XFXRk8k0Y+bAgfd36tR53LjxAwYMGjJkaH5+4YYNm3r27P3aa9NbtGiVl1fQpk27Hj16qSq1TA+niDRu1PyZp5+fOGHqmBfGT50yLZXkHxsy7Lq6DXr36vfJwiUVU25a33jTe+8u8D0IA7im9nXTX595YH9O/esb79+XXbtW3ZzsAsw3bt7shvXrNre+8aatW7dv27ajW7fbduzYBQAdOnT6bNmKBx94dMrkaWWlcUyXTcQF9BSTCRE9TkJsVbUQnIhMrKwwVbXQjoZSg/lIOOQiYgArdc1lumcw32A+0z2EK3qZoqCpiuk6EAagUSce48MADOZXkEYUtExaSafkCkpV0AWpfGQjjzRFMXGhaU1zVdWqcLuP1v6KI/4OpUdeHEUxVdUixMZMVEJsWTawI0KIbRiBbUPFhfoP7Ui//8gDVbzEZhtGgOdyoqOUEBsFeG0n1JmTzkgFhWVLl61AKUE8F0QpLpn+dze4yo6rVaG00spfeaWeD7jut2UHv/y6KSvrVE23sSPf+sYOr736lq7ZTRq37NSx26GD+V+u/ObZZ14YOvQJx/EWLfr0mmvqcJwAAFu37DzrzPMi5QkIoWePu3vc1SeZ4G7p1O3hh4Yw3V67Zn2Txi0s02vWtNXsWXNr16pLiWEa7ocffNKoYbOS4sjsWXNbNL+Ry0i6ZskSFQV19U+/tGnd/ozTzxEFtbQkiqfx2GOPDxr0wMqVq2bOnPXSS6/ouvH99z+2bHmDopDGjZuWl0fr1Llu5MinEokUhIBpwC1btB7+5FPz5320YP7Hkya+hMOiGzdsfWrUcxdWv/Tss85/Y/pbkfJEzx53d7+z12mnnoWLoxUVlq1ds/6e/gOjkeSTw0bdd+/9xUXlGjV79+r3/Xerx7wwfsSIUQsXLnrkkcG7d+/NZPjOnbtu2rjN96D+9U3ycouJathWgF4OhCBLTNNctIpwLhpj/u8M64/mAiJ4kJoVvETm4btYX+HkcRmV6Z7vgWkEPEcwxgshaNRJJaV4jFdkw2A+bmwwv4J2uDd81I+IPP/OFMXUNNc0Q8Z8RCmljmEEuub+qR3pSf+b3/kb0v7VmSA2VuKB8OpVbHa09hzNEPx/rLcs0HXvyH3KsiEI2lGReYKglNLD67miFEMkmvrxp1+2bN1lWr7OnIqcIxQ4q0LpP92qUFpp5ago3X8g13EhkeRNy8cVGbvf1Wf4iGdwhecWzdvOnDEXQrjyilp16zSA39YhueyyKxSFLFv2ea1a1wAAYybT7ZNPOs1z4dPFn52UdeqMN2ePeWH8jDdnX3LxFYUFpe+8/X6njl2TCc4yvSuvuPrMM85dv26zYwf1rms4csQznTp2ve3W7uefd1F+XvHMGXOaNG5hMIeozPfgqhq1E/GMRk1BkERRHjjw/kGDHsAkI5wb88kni5s1a7Fr1x7bdlu2vKFfv3seeOAhWVZlieJ0l3ZtOyz6ZCkq1eG010cfGYrBXkxNatyo+f592ffde//7732QSYu4wpquWc2atmrR/MZzzr6gYYOmdevUz80ptC2/ebMbtm/bTVSG7m/nzl3z8gq++ea7Ll26NW7UvGuX2+vWaTBl8jSBV30PKLHLy1JEtSRRl2VLUWxFsVXVIcSl1NM0X9N8Qly03//6VfdPjSiORjxDDy0DLAMMPdSIRxSn4t0Kw5rQB1W241ExnVSZFngOGHooCQaf0WwTHAsETpcEw3fBtYHPaKps42fxUae+Tn2NHPVf+sdzwZf4wT9aRcPQNOKh4a5+Z1ipaT5joWEAYyGlnqLYkmTiEf9zU1XnyCuv64GuB4yF+I3gW0d8Ec4/AKXoksbiGdeD/ILSt2bNlRUd3VBs839x2lSVVa5VobTSyl9NhkFZAI5XUOfop9W/Xlev0Rmnn5+Vdfqokc9jAuQF519yztnVLdO3TC+Z4LKyTjZNe9q01+66q2dW1slt2rTLyqo27/0PTcOtXatup45dU0kexRYurH7p/Hkfbdu665KLr8BRw3FjJ5537oXplLBh/ZaKYVFKjIUff3rKyaeril63Tv0bb2j3zdc/VL/gkpemvioKajol4GlMnDi5Xbv2PXv27tOnb/fuPaZNe23Nml9atboxkUi5rn/LLV3q1q337LOj02mOy0iYttrjrj497urz3LNjnnt2zOBHH4/H0k2btGzZovWMN2dv2bzj+dHjrq/XKPtQfuNGzZ94fETFFNivv/q+YYOmu3buY7oNITRr2qp3r36JeKZ5sxumvz6TEmPjxs39+t1zzz33ZTJ8p06dX3hhbCrJl5XGXn7p9RpX1v71l0149MAH9Pbwfn00+yNQKxjzOzsMtt+oiTTSqc+0QKf+kfVYKXC6RjzXBscCWTSTcVngdJOBRjyTgWUA4k2VbVk0BU5HVGMlURzkH1XdoyGKUo8Q90hKUeqpqnO0rsAfIVqB0j81XQ8qjnIkCI8VpX9sNpqi2HgUXQ/wEJrmG0agae6RObr/Rp0TAaWKYmKoKRJN2U64Z++hV6a9gXOu/vxc/v42V9nxsyqUVlr5Kw3eQ9kFuIBUIsnHE1wIQKiJTptjgywd1tyBEKKRFKIlDCGT4QEgmUzbtut5AU4g4TkZM3eIynBGKcr17dl9AF+WlkRliRYXlQu88sXyVbt27vNcUBUdxY9W//QLTo+Z+868l6a+imt2HjqY5zqhpjHDsNau/fWzz5bPm7fgjTdmzJu3oLi4NBKJzZjx1pYt2zwvAIBhw4Zv3rw1lcpYppdK8gZzVnzx1cwZcxbM//jdufOHP/kUyv5tWL/l9tvuql2r7uNDh+dkF0AIc2a/u+rLb9MpAUWXPv9s5dNPjY5FU5hFNWf2u9fUvq6osKzzLbd+sXyVZXoA0LXrrV26dPv557U1a9aKx5NhAIEP69dtadG89RvTZ23fticayTDdU2TDdQBv1n+8lVfUVPhJaEdDaQUyVdlWZbsCmRXu45HQ1amPPqjA6Tr1XRtMBrJoZlJEFs3iwkRZSdrQQ88BSTCI4kAAVHWZFjAtOBKlqmxrmk/0PzFV8/5olHpH+sdH2tHOixD3j/tRqEtZQHRfoa5MHIW6quZpRqib8KfH/QujLMBd/a7ZuglomhGqmicTRyaOQu0THaWCoDHDNS1fEAnVrE2bd3yyaBku+l3hj/4Xt7/KKteqUFpp5a80eDXdNi3ftHxNt8sjSUnWDNPTNDcW4yEERTETca64JMpzih9AKimUlcd1zYrGUuVl8XRGxAmXumahrjqEkEryOEkUNRYs08OVy3bv2p9OCSh2j4jiOUUSiedCMsFxGRmBjWyTJWoaXn5ecTolOnagUdP3AHUEcQ4oCvuhHATO6UTFJZTVNQ3PMn3L9HHqoe8BKidACHm5xarCbCvA1sZjGVnSfA8M5nouYGQbZxkKvJpJS64DOD3RMn3cQzLBY7PxZeBDXm5Rfl4Jyim4DtjW4bckUc+klUxa+Z3feTSmIlB1PThcSX736GjU0TTXYL5hBKYRMObjQGbF+GJFyitRLaIaiqzj1EmDuYy6qmQxxfcMgABMMyTEVRRbVT1V/o3NxDaNoGLQFFEqy46mhQihf3fvXELcimyd30YcPcZ8qlkaNTVq6cTSiYOmUUuj//bz0+hhuCrEV2mo0pBoQDRQaajSgBCfUk/TXMb8wz0MLSRqoKoIQuc/fvyX4VkgWSkLENjIaawnuq9qzrGj9E9Xz3Z+e/yjHd9bZyajOi5g2EkQydpfNm7ctL1CnKEKpf8r5vz3PFahtLLKUVGak1uEufKRaMq0fFS3z3CyaYYKtT0POFFTVcsHkGUjxam67kkqEyXKS5RQUzNcHH1BHQAULy3IL1VkXVUYJaZjhzt37IMQtm7ZhZhBPvGcwmXkTFrJpCWBp6rCDOY7dihLTKOWRh1Z0iRRVxWmyAaXUdNphRAbk0Q4jiSTkiQx0wwxFVYQNI4jHEcEQZMkhpkjksRU1cKkGNeFIIAwBI4joqhj/eFcTWIriuk4oOueKOqplJxMSjxPCbFNM+R5apqh7wP2LcrL04TYYQiIjYpEXFk2kGTl5elolEsmFZ7XVdVhLLRtcF049v9hoNKAUnTyHFVzKHVUzRIlKqmMahbRbUJNGQVUmcNrlKNEpsyyfVmgtulpxLAsS1JExzMFiTcMw9JsISLbvA8WFBfHE6LiAaQFI56kYQBlJRzPkUxa9P1QVallOcxwk0lJ00JF9igJKQ0oDTQSHPZ6ifMbJpGXFpJSo45GTaorlMm6RkyimYSZqmkSplPNsBixiGIoMpMVjRJqaKpNFE+lIBMQZRBlkGRQVNAoGDpoxPsXj9VAV0FTQVOBUu8wwP6Tx2NGl3PMw6V/ysuKNvyn6K20m7hhBKgOSKiZnVM4b/7HQQim5Z8gXvU/wP7818iYrxJDFHVRoopiUs0ixFaJYRqBRi1KbIO5TPcoMfG5wXysYbqjay7+vygxZdlghltYGPV8IMSWFR33oyimSgxCbEJNVbVUYlDq6Mw5LP1WhdL/53JUlKKuGKGm7YRUs3hBTaVFqlmq5qiaI8hMobaqOZJq4iMv6bykc6KWEWhGoLykS6pJiF2hIyOJVKMW0x2Duahlw3RHFAj6RqgeR1QD3SZUAMBJHZjPWTHJT5ENWWJEtRTZEHgqioaqOujGSZIpioai2Jjqoii2LFuiaIiigdk9Fc7fke8KAkOTJBN3VTEI97vcE1V18FOybAUBqKqTSMiZDDUM8DxgLOQ49PwAPQAAIABJREFUDQ8nSWaFYQ1jIfqUqurgcXle57hjXg9SpYFKg998KUfVHFWzVM0yHN9wfGZ7hFmiqvEyEWRNJLoNkB+NmK6XTglSRg5t39R0jcohGJYnvzFj8o03NjmwY5sj6UVbc14ZPfXOO+9au3GjoOqCbDITEnEicDqqOCWTSY5L67pOqEGpYzCwLaAkpCTUSKCRQCee/htKDWJVPCJNdeJo1FR1jepEp8xULVtxbMUxVUunJi8rHFV4psg20yzXNENTA4MCL7oCAaoDM8EwQKegyCDylk4cnZpohurpaqgrR6D0GFB3jPfB/3eU/tsG5r/bcUepLBs4t00lxs5d+2e+9Q7OgalC6f+KHfX3g6IZGHs3TA+zqVViiAJhuoOuCAp/UmJyGVlVmKowohpENSgxsbeqa7bz/7H3nuFRnlm2qGfOc+acc3um7+0Zd/fY3XY7tVPbxmBjY4wBgwEDNphkbGxwIuecRZCEEBKKgMiSUEYCSUhECaGcc1aVKqhy+HIOVfXt8+PF1Wq78XSfoT3tc3mf/egpFyWpXHq/d31777XWVoEgOQ1AEH3dPTpJDqDDfHjJgaR4tAdoRnwApfdr/VCBt6/fQDNiQAOcYFFIcoCiJJ73W61epHMwmZyCEBCEAEr1UEUxqIwURU0UfC4njqA0aB5LUwKBs2gTMLRos7qRm50k/lH7iDB1uOEAUk2gJ9G/4hiHSJgI8xjGFwRR1IBE+IewEJVJ0Z4OPh+ExiCHNhjoBUF8DTJFCULyenlRBJKUPR6OICRRBEUBhvG53SxBSMF3EuTaEIQkSSCKwPMaesNBFL9fV6bJbLc7vGhauCj5BFHlBYXhFZ3F7mUFQfS5HbiP93FeAiSho6W6t7tm4qSXsy8eTz5/pKXmRuGFM6vmz9u7evX+Hds2b9zkdmIBP5C4IvIAAfB4KZYThqyWAPgZjrXb3KoCDOXHvDLKShGU/rHHyaCy7d2vSNOCytEkG6AYYCngSBBxEHEQCGApwAnwUAEP4/cwGkYCTgDlAcoLqh84CXDS53RLLqeMYz6OBVkGlhHZu4vnaImlfX+Slf5koPQ7sPpjQCka8S1K/tq65viEpOHc3QdQ+jeOe24AZBpK0QLHK0iJJIg+RQVZCiBraBxj0DwJgVe1ANwLSt0e0unCLVaXy01oAE3NHRrAoMEyHEqR7/cDKL2/655Q6g+AxepCw4GRHy8vqATJIQUkKm/yvN/pJFFLDNVFg0p2llWRZN7rodDoLmRf7rB70W5QZM3lxFlGsts8aEiI10OhrDQokQzG8Ge+Y4KDCJYICBE9h2X9JCmjLDDYdEQ4yvPacE4pklJIEkgSDCedDo/hSepwsqjHwzGMT5ZBkoCiFJQcI6wN/q7h7wEBdhDU0a8Wxf+DAu+fvzI1gIAGLCe5PYTN7rY7PF6MomjB7qL9AA4rRnsY8AH4fCs/mxcXsSP17KGW5gLz4J11K2esXzq9ovD0jdT4bz6cWJKXdSQkJC48MiYsetHcxQvmLr5dWu1y4ywnsDwTAD/F0ATOiJzfbWc9Do6lA9+HUob5LvmWYn2oNI2zgDNA0cCSIOAg4MARwFDAiUDw4GbAgWs2t9/lAsoDLAEOJ+YhSFZQVRVUFXgeMEywO7wMyzMczbI0w7EsIzKMwtIaQ2t/PdTdn6PwfkBp8PV/w6OcZVXVBywny4pWXdOYmZWnqIDA9QGU/u3jnhtAVjTkP0WQHIJDt4fEcMblxHGMQTMeEG8D89IOuxcNXUAJKzK1RmMekPLCYnUpKgwaLILoq6tv0QBwgkXYybBS0IjjQYH3Pq57QilBcooKPj9YrC6cYDUAt4f0eClB9JEUL8kB5N+NyAvB7gsqHA2XeKNZYMgx3O0ikGO4KPgQ68dosPKcgsZpITpPsJnKsXJwo6BAt13oSbRvGFpkvtXpDz+tgr4Hfy7+hNcTBMgg5n1Hi4KwGaE1KhFzXEAQIFitDea7KN1kvsXj76hFh+sXmWFkovtwZTIKwyguN+HxUmjepCT7VR/4A+APgMfFGgacoALvooHjyy5lUsb2rur8kiuJbuud+vJTB3fODt36YX1xrLercOsnE29fSLI01p8Oi4jcEeLQW9vq2zdv2tHS2o7TlA9Us93kxT2gAeVlvFZKE4GjAt+TrKBuboAaFiQboBiNZAMYp2GcRrIaQ2scBajHSTGah1a9nN/LB7ycH2P9FBOQOPDJIEkCzeFur8dmd9sdXgzjBCHgDwDDsRRPMxxN8TTD8tQfD/2/eyj9D+JvfpQj40AvRl+/cbu8ohZ1cB5A6Y8S99w/igq8oFL03fI7w0ooPUVWo5Lod9i9aH4RSXCGQcu9oNTpwtHo2fqGVlHyI/Ww3eH1YjRBcsMr+Q+g9P6ue0Kp0WTz+QFNA+YF1e0hbXaPPwCC6PNitM9/9zbHHwCHE/NiNPJPQU/e/SMxIkFyLCOhjJNlJDRIhKYEHGNwjFFkzWH3Iq6swKtuF4HmeQXrFcH9QVMCahKgUWICr6LnOVb+DlEIFZk5znevo+rP4uhwKA1Wd4c/YIbJFtFrUCKLKsOo/Ivy4yD0Di8so2w1GN9xG/jPXpmMwnzrrSorms8PiqrRjGCzuwf1ZggAZiMZOwEU019VtuurBa8++t9KcyI5W3l9SWxywtLDu97X1Z90dqSYq48XJ26IWfnJ7aRji8a+feXUWWfvYE9je3Njy+dLFp+9cJ7gCYLFcdIjiwrhJBXCp1IBjvaxwzCAYr/t5jIaxWgk+yeBcwGv4PMKCs5LFCt9WwGWKFayeHAnzRKSQqt+WpApmqUImsYxm03n8ZhZhpBlWZE1nveTpOjxUhQnUhxL8TTFsRTHU5yIOscPoPSH3z/LqjjBUrQwaLBk51w2me3IevcBlP4occ/94/FSSMRPUjxyxZEVTRB9PhWQdzcq7+EYg+Zh3KvAi5DYYnVpAL19g1abGwEzwlF0MjOshIbVU8GJkw+g9D+97gmlFquLF1SXm0B/UfOQA1kJCrxKkTxiD6GuJ6o/BO+MhieRCO1IgkMDI++CH8mjn2A0WBVZ41gZDYPs6uxXFRj+7X9MPWkR/S6GFhGUInzlOQVh53DruKCx3HcM4b41s/2T1ukPFFoR1CGwZL5V6w+HSY4LoPYn6n0yjE+SIFjXDQZ65vtZ6XBxy18ewfp2UC6CepMC7ydw3mZ1D5kddpubJGlZViEAriEX6yKSY2M3L1lwPmxrz83UtqvHmq9G91ed6CyPc/akya7i1pthZRnrpYG0qvNbtk0d1Z+TStdXM10dRL9usKV9sLfX7XXtDdtbUV9OCyQnUh6Hk3XTftJHWmnhW4IuggEEpSQbGI6gCFYpJkCyPq8geUWe5FmGY1mW5liaZVmGY90k6eU5SpEpWcAZwos5MLeF8JgUwSMwTppw414Cxzia9Ak8KApQrI/kJJITSZ4nOZHkpL9TKP0PYPXHPsp53u/xUqoP2jt6T546/0Pc3QdQ+jf4/H+4wMsLKoI9j5eyO7wWqwvz0i4nThIcUvqhow/NGfyzUMpysstN+ANwq6Tci9F/eGnkrZJyl5tA909BKEVzCx5A6X1cP+R2JCvakMWpqEDRAppKbTLbkS4TjaL0qTBkdnw7NYxjaBFVG5BskaYE9Af2uElU4AUNHHYvKu2iEZKIyot+FJpbGQTR4OYIwjbaOghK0R7iOYUZ5tEahEwEqEHf8yDQ0rQc3NbDuUXfL71+5zWoWosKvMHC7HC5Z/C7hhOgghVjRIP6ziv/z+LPQyntw70CTUmSqCE3JUXxEQThsFsZt+dqVnry0QMpR7b2305huguwllSuP3uwMr77dqS7O9lQn9hTegjY27fPLpPa0lJWzYma/77aWAUD3fo7pebWZpfZOGQxNLbVx5yIKq8tFWSGo0geozknrZKqQIssg0JimLtiTZJFaHq3usswAeZb/SvOSzgvUhzPsqzA0AJDCwzLsjzDK4yoMqJKsAJBkQyNaRIFAV4iHTLjkVlW5lSRBZ4BlgaGAooBkg2Q3F0CMzUcqH6qUPqfrPb/Re+fZVWHE9MA6upbjkTFoaFPSFT6AEp/hM//XvsnyAkiSA4VY1HqgkbWK7JWcqv82tUSzEurCvT1Dt6rwOvFaORSF9Bg0GDRAEaOejOggdtD4gSLEtNgPCjw3sf1Q5NhRMlvd3j9AfB4KZ8fNID4hKRD4UdOnzq/c8fewoKrd8qqQg9G1NY0Wi1OSfQxtCDwik8Fj5sADZwOr08FdD8l8GpYaGR31wBNCT4Vzp9L6+rsxzEG+R6ABhGHor+l+DI0xeMYrQVAEn1Oh5dlxIAfaIqXJT9JsGgGuE8FHKN5TkbEKI5X0KGA4cwPSeb/C/KA/8NgWT/S56BM1+ViPB5OUYChRWQ6b7dhyKiIYzSRB5YO0KSC7mmcDi+GEaWlpXt3bhs/+qUrGcfNzcXWphxHQ7K+5IihNKL7aoikS7fWJ/aXHTVWJ5rK47uKDnbl7x66engoO2rD608Zsk+DsYfpaCR1Pdb+7r7uFpd76Ezq8eQLSTa7ISALrAuTMR4kAB9QBEmTDGhAkJwH5/wADjcjKiCp4HTSoIHEB3hKZLysLGgMrSkyOG2k2+IBH4AQICyEnweWgCETJ/KgiMCSfvCDn2adA/356RdKC6449XYQABQABRgMJB54HvwBcHsVm40SBJBl4NkASQgkKaIaV5D3j8jnQfZ/cHsjScC9Pn+kqmIYX9Dml2X9SFKMGlroJEK39ugBL6jB4Sro8Xch6k8K8ooogiAAQSgkqQoC8BxgmCSKQNMqkm8F6yIYJtzrVi/4DOK+eb08KpAML58wjA81+EVRc7tp1AWoq2+JT0hCDXWrzf0ASn+UUHCcFyU/an4x35JpOV4RRJ/HS4mSHydYpwunaAGZ5Az0G/U684cfzD1/Lq2luXPZ0tU3rt8O+KGludPjJlUFWEZCGYgsBQT+7pbTAIwmGxpREH00oaj4JhoEhAguSHKDenAUyYmCGgjcxQPtu5D6AEr/0nVPKHV7SNUHiEaE4Qz6Mzz3/MsH9oefOH46LPSwXmeyWpz5l4vQEG/kUuT3gc3qQgNHRUFlaEGvM6O6xL//+rG9ew4ihtGjj/wu6kgcer3ZZO/vM/zy4UdpSkBFDJcT41jJ7wMco0EDvc4kiT4tAMiVN+AHNAGNoQWfCohAgRQ7qg8UFRCB7ad+NHg8nCSBIIDLxeC4qGkgyzA05MYxhsAZAmdVBSAAXjdnNnpFHjhGU2WgCBnz0piXAgCHwxaye0tXc2lnVZ6x6SJvKBwoCW+8uJZpjxe6kwxlEfrbkaaqY7b6UwO3optydvcW7KMrT0Bt5rklUy6s/pgqv+Lra6X7O+y9bfruZl1fa1tHdVxCxMqVS24UFagMCyqAFABVZQgvaMDSHInoaW5aUYCmZdCApUTKTbEeEnwAvgBl96osiGQAZADBz1tcGsaAAkADKMB7AVRwGHlQQcb4jorKgxs2bF++6nh47PXskui9p19/ftb/euiFx3416dP5IVV3LDQBJA4QAIbw6XtM4AevnZREP0FyOMEi8gUCVFHyB4eIESSH+ka8oMqKdq/PX1EAmdq73Sy6jyEIiabl4XPWEE6jn4a4lxjOoH/CcIYgOVRM+7NQKghgsWAmk5eifKIAmFf2uEWOBYuF4HlN04DnNRwXaVpFQH4vKPV6edStD0K+ICCEllAFhWF8BCEhEbPLRWkaoPvj1rbu02dSJDmgAaBj/Sd9vfxEQlFV8HgphpWCeGm1uVlORvRdXlA1ANTJ1gAcTiw87MiZ0ykCr4IGouCzWlxXCq/X17UosuZTQZE1VLETeBWZuGkA5iEHKiK6PSQvqD4/fLN0FaI1oc2JkPsBlN7f9UNQim5waEZUVEC90qefeaGhvgU0IHGKZ4U1q9b+5pHfUgStHxh86cWX/+Ghf6yvbQANVq9cs2LZyl//8t99isYyEko3n/jd70P2hqJq8JtvjMvOupR/uTgzI3fpN6tu3iibMX12xKHoCePf62jvAQCG4d55Z8KOHbsiIiIlSYmKOnrlSvGmTVuOHIkOBMDl8kRHx2zfvrOqsg7ZAMfEHvvq6xX5BVcZVho0WP4voFGg85Fl/cjkgWF8ggA873c5MZYWKJwjvJwsgCoCT4PIAu6W/DJ4nExABZYWjIOG4qLCuuqS0qtpFUUnL53Zej1lXX/pXk/TYbw5YvDWLsPtsP4bEQOlcZaaM5bKU/qb0cZbR/CKY9CW0564Zf0bj9WeOAj9zVRnvaOzydrbatF3mAztd24Xnj4ZfeVSTujunYvnf/rNosVhe3bu2Lx27oczdm3bGnrg4MKFn65ft3nv7v0he/adTDhxKi7xdExc7bVrpqZGUtfXdaes7vqNoY5OxWkFhQGnMX7b+nXzP6q6VMBZCFCAc8rlxZVunenA+rUfjRtZeO6Y7MBi98ROeOn9Zx8eO+6lz+ZN3TPxjTWvPv/Z7x+fERmaJVDgGmJZrwQ+cA7aApzP4yRkRVNUcLpwg9HqchMITR1ODMMZXlBVH6g+4AUVwxmHE/uBz/87XvwM46NpGcPu0jcQlCJIFkQfki4gkYmsaCwnYzjj9pB/9F74I5Sin68qCmgBEAXwehS3S2JoUGTgOFAUUBSgKMXtZlGWiXARfeO9eHPBd47E0IgBh4ReiBPH8xpyARs0WPSDQwmJJzu7+v0BCGbwP+nr5ScSCo7zKBmlGdHpwhHJVpIDBMnZ7B5Z0VpauwIaULRwMbfg1ZFv+H1gGXJyrOz1UAwt9vbo9+8LDw870lDfmpWZFxd7/MzplMKCa8VFN9PTck4cP/PFl8u279ibd+mKfnAInY0uN7Hwk8XDR7szrBRUWDyA0vu17gml6LYaMY80AHSbM3LUG58v+mLK5Kn/+NB/EzjRYrb+w0P/CBr82y8eJnEq4NOefvIZnhX+x3//n53tXTTJnDtzPmhy+8i/Px4fd4LnFFkKjH9ncltr98Wc/F//6rc52ZdJgnv6qeedDuzWzbJHH3kcx8nU1LS+vgGHw/Xoo781mYYeeeQ3e/aE+P3aM88829nZ/eSTT2dmZjc1tbz44kv6QfP55PTRb7x9p7xm1uz5NCMaTTZkc/iTrvGiAm/QJgnlRhQlKZLfrwYogrUNeQiv4JOAJQMmvUdkYbDfoYjA0ZJP0SCgfbJwQdiBHSu/mr1qyaRt37xTnLyK60/ytoQPXF9vqwqxVUcZbkfrSmKNFacslaeMtxNMJVH2kijqVgxzI2HHxCfPrJnDNd2k26qcbTXuvpahngarvp30mno76wz9nfreLoUTVJ6P2L9r6eIFt68V+CXOqOvr7eww6vSdrW3l12+0VFXqW5or83Oz4o7Meu3FL959c/9XC0NXfB69aemOz6YufOvJPZ+Ob74YX59zfNfiudFbtmxevHTVgiWhm7cl7t+VcnRPwt6v8k8eKjqbvmru2qmvfjz+D5++++qKmW/vmjpm++Qxm98e+c37E1cU59aCCiop23p0jMUKnOBx4cjnMqBBUKuH3EUQvDmcGIJVlArc6/P3eDg0sk0UQZZBFBFDWyYIIdjTGl7m5XgFMd5dbsLlJkTJ7/MDxyv3glKPRyAIxeXkjQav3cbxHNAUmIwERfmMRldf35DLxcgyKMpd2dW9oFSWAd1voXYAshxBD9CT6H8EKaR53s8wiuqDAZ0p4vBRJBZ3ODGUJz2A0r99KDYbpgEYjNaABgTJmYcciGrEC6rBaPUH7tbV9INDc+YuVFRArBTMSxsNVoYWJdGvBYAkuKbG9t4evdXislpc3V0DjQ1tXZ39NqsbVe/1g0Nr1m6KT0gSRJ8GsHjJNwhKgyge/Ps+gNL7te4JpV6MRn2U7h6dPwBI+ftP/+NnNovTp/hBA5GXrhQU/cND/8gx/L/87OfxsQmffPzplk1bHTYnaLBrx+6f/a9/bm5sEQVfW2s3RfKzZ81f9OkXqgJ+H/zu8WcyM3Iz0i8ePBABGvT1Dv78X/4N2db/7vGnMYzIy7s8b96CpUuXv/LKq06n+4UX/mAwmKxW+6hRr5tMQ88886zD4eI44Yknntq8ZQfLSRfSsn73xDPrN2whKQ7pQL5nyfbjGLPdt0CeD+hA5HlNVYEkZZ3OwjG8zWJ32NwC65N4wN2ix8GTXh9LAvihrrqNwjmn3QUQkEQ2MS4yNnJv1tnD9p4ioj+ruWCjqWKnX5/oaQgbLA0dqoizVZ8ZvJPUXhDRkrev/3qYpzLGWhiiNZ29uPOj7dNe6LuUpPbVkR21zo5aR29Db2OZ19rLYGb7UH91RWlHe6tJ3//u2FGFOefNfa0ttWUeu8ljH6oqK7EN6nCL2dTexJp14LaA23h624orUbuY5uutefHdRQm2ilPmmzFdF/dYb8V4qpM7C461F2WkHj6QHBFaX5hTkXvC3JDTdydRX5kWt33vnLELZ7y2eM7Y9VNHbZj86ua3X9rw9strPpy47a2XFzz36OsfTph1LSMXCAwIt+yxQ0Cz2tw6vRnloB4v5XThKAMgSA7VMzUAlAc4Xfi9Pn/UoiZJ2evlg9nhXXI4I+IEixrzqMaL/GU8Xgr1X1Ff1uOlLFbXvaDU7wcCV70eReBB4MHllK0WzutRMExSVdA00DQgCGloyOtyMaiBir7x+71SlIYiapso3jXVEgSgKMXj4VBpGnVSnU6SYRSnC792vbS8opblZIcTk+TAAw/eHysUQQhoAB2dfaLkD2hAUrzPD04X3tOrR88TJHfpctE74ycjTDUarD3duuAALsQ1oSmhr3cQMZJ8KnjcpNOBMbSoBQCRWgoKr02ZOnPe/E9DwyLRLV2QHhxsTzyA0vu77gmlyIdB9cGQxSmIPpxgZUWbOmXGpws/3x9yYM7suVkZ2fqBwYf/9ZegwcfzF25cv8nlcL/x+puaH/7tFw+7HO78SwUfzPjQ7SLQ4JTsrEv//uvH0tNyzp298P/+/GGWkZLPp69dswlxcZ968rnqqoarxTf/6b//P3a789lnn/d4MI4THnvsdyRJ/+xn/2Kx2ADg4Yd/5XZ7f/Obx5KTUzlOGDNm7JDFUXjl2v4D4RrA//eLX9bWNWE4rQH8XwCl6KBEuQXD+Hw+AA28bozASJ+i+RXwuli3nZN5AD/YzDT4QeQ0gVVAA5oisjIvdLQ23Cq69MWC6Ss+ebs4eZOhPMxYvqu7aE3ftc2Wysihqnh92bGuazFtVw713jhkvHPIWRVBVkb6WpL0efs3TXnqyuENoGsQexqczRWKbYAe6q68kXfjSqbbPqgF5Lq6mrjYqPo710R8yGXsNve1djVX67pa/ALV3VDjw12m5hpd5Q1X023QN53e+Pn5jZ+1phzqyYk2X4sbzA83X9nvvBHWkry28vga8/VTpacOxW9eWZN9wdlc1XUjrTorovdWlLkqLWrjrvde/HD8M3Omjlj29u+XT3xp0/Qx++ZOOvjG84tffnzauaNZF0+mr5g398vp7y6f/W7s3s0uiwXhJeKjoWIs6qMjuy6UNaKKi+q7p9vUcPerYVbMMlK1uj0k6i8ijhsvqP4AoKtGEH3IxoRhJX8A7gWlTgfndHCYV2UZQCkp5tEwrx/psiwWrLfXbLXikgQcFzCZ3PeCUgSiDOPjeS0ozcJxMThmlec1VDFmGJ/Hw7Cs2t7Ru3vPgSGLExFeUMHpAZT+KKHIMni8FE6wLjfBCyrHK1abGzVNvRjtchOLPvsyv+AqRQsGo7W1rRs06OnWIZkDqvAhWxvQQFWAwFkcY9C8Z5S8dvfoPF6qsal95ar1e/YejIk9dvzEmWPHT6OK7vcr+Q+g9H6te0KpKPmRXhjd1KBBwU2NbUWF17paO7taO902V0zk0X/+Hz9zDNkhAKXXS/btCiHcuMvq5CnuSHjkym9WIBo3KveDBnqdOepI3BdLliJmr9Fgzb9cbBi0sIwUdSQuJ/vy2LfGy5IfAEpLyxYu/PT48aSVK1fb7c7w8AiLxebzBT7/fInD4QKAzz9f8tpro5uaWmx2t6wEduzc+7snnok+Gs/xshej3B7ipw6l6IhEilWUGLndrNfD1NXUWwxDAVmTGJ/N6CGcokSDy8yrHPh48NrZI2ExLz//UlJiQltT/awZ025fv3n9ck57RZ6pOZ3sPoe1RBtKt3NdcZ7GeFNFbHtRRFNBeN/taHtjorMhylwWQtZFem6HCY1nTq2dlrBiFtNwXeyqI9prXS3VmK7VY+yUKHvprctJJ+MOHwkvvJLnHuptLC8e7Kztbq6wDLRzXltrTVlfY7W5rY7StSnGTmWgXmi5eXz5rOS18wZzYsyXj98IX9F1fg91M67r3Ma+Czuw60mt54/oCy6WHEv6ZPTbv3rooa/fHXPjZGht+r6+6+cPLN044ffvTx/x+aLJu6a+umn8i5smjtj23utbpo5eNW/yyskjp0XtCKkpvNh2I1tfnpuwd01GyjnzkAPZeWM4g3JQJDAYLgZAmaUXo+/1+SO2F8v6UZUVQRrSWaEfhUgcThfuxWhZ0VxugvlWHSjJAWQh5HIT39t7324/WuM5IHC/1cK4nDKBQW+3+0phVX+/DbHMNA28Xt5gcLrdbCDwQ1kpeibI9UWzGVwuBiXTwY2EbgVUFZpbOjMyc2lG1AB8fujs6n9AO/qxQiEIAe1Pu8OLvBT0g0PI8ebmrTtffLmsp1ePnM/vMiiHnKABx8pmk51lJJoSXE4c2cZRJE/gLBKeOh0YMl7VABqb2jUAkuLr6lt6+wZRwwvVdYM+dA+g9L6vh4Zr8v5ob8tKouR3eSmXl1IDQDIizalooBhogHlwmZNKb92eMHZ8dmYOBMA4aJJYkSJo8AFowOC0yEsQAIpgEcMQw4SuLj0610ADWQpUVtSxjIKmiLtdlCwFECOJoQWHwwUa8LwIGvj9miT6FMWnyIG+vgFRUAGgva2b44RVhsywAAAgAElEQVQhsx00ECWfot5tjKGanqxoP3g0/N1CaYBhAmjQCkNrVgslCECS8pDZhT6Zupr6FUu/WPrZB7vWLS7Nz1JJEnwAEshEwGGguhpN33y25Rf/8+kPpyye+OYHLzz5SvHlKz6OObh98/aVn1VdOensyG4r3qcrDbHXhluqQvWl4YY7R/tLYtuuHGorCtXfjrBUH7ZUhhtKQjrytkJvTv3pbYc/ett0ORlvqhD0nc7WhsG6SktPm9s8cDRs782reVbboNtr7uuo4jGDsbN2sK2WtOgsPW1D3a1eY7+5s8HaUWNuuCkN1IC9rfTI5ovrFjTGbHPln8WupngKEw1pIbrkrfa8A7a8qK6zEe7rBambt65/7/3PXnv9mYceOrXlS1PJKUd1btKufROfe+/tpz6Y/eaaqa+sfX/Ullljdn345rYZr6165/fTd365vu1aYW9JZkNurP5mSu+tjCM7Vq3+8uNFH01duWR+9L7txVmp9v5O8MsgcD6GFgmawSgaYxhSEFhFloClfd8aCGvBD59iAoIALKtSlIQT7LdO4iJDy34VRM6v8KpPkFw2a3NjS0vLgGWIDfiBItScjMzZM6bOmT7tYnomSzDgB/TDGVZkWB5tP+RiYXWQqgpaANpa7GtXHvnNL9/62T89+9Tjbz3x+OsP//LFmR98VV7WrfnBp4DLKZOYn6H8yIsjqJNGUmle0hg+QNCKy8u5XByOy7IIEAC/Cn4VZBEoQna5KI+HQezQ8ora0LBIkuJVHxA4ixRrSHL2vfij88aD+MFQ/vKvqDSCirqoaUrRgiD6EhJP7j9wSFHBHwBR8vcPGAmSczgxVQGPmxR4P44xOMaBBrIELCPxnA/HGIoUVQVEIeBxkwTOawEgSVEDMJtdRpNN00D1Acf5FBVwnCcpnmVVXlA5zsdyMlK4PoDS+7UeIjmF5BSG8bF0QCA1gdQEKsAyCkZyOC8SkuzlBQfO2t2cyyMTuErgLMNwkiArik+VfaIoszRHEJQkyEaj2Wl39fT0gQYEQXEM39dnUgPgIUFUwAdgsWODJpvHS3ox2u8HHBcxjyjywLJ+i8VjHrLjBEOQrKJqOr1Z9UF3j071gc3uEUSV5WSaEdwe0uH0UrSAcmWrzY2MF74f/0XGbH91KDIwtOxycT4VcAJc7oA/ADa74g8AjvkoQgYNdL1dm9Yt3bFp2e3CJM6Y13Uj9GLc2jMH10Vt37B31ZrtK9YvmvX56OffG/H0zHnv7Zk7ed+sdza9/Nh7o58f11FVqW8siNn9UUXePqw3Hes6h3We0t0OZ3rOGe5EdhQd6CoOt9eexFvOW6uOGUujzZVx1ubT+jtxzttJzK3kcx9N7k48SnY2evS9WO+AtbVnsKvXYx4qzcpM2Lfz1vXM7r5Ky1Bbc81VU0etZDe2XivuvlMGDNVSWabvazYNthh7qq2tJTDYUB+3L3ry661h28mi7KYTYb3JB/pSdhoytngKQgwXtpkzD5gz4+piD656/aXpj/zLF68/WRC5Sn8t2lR2pv5S+vJZn49/Ztrs176ZNXLFrJGr5r+5acYfls8fuWrMw2MSN26i24oHiiMaU7eaCs62pBy13j5lqzrprD5tKj3WnHnwcsSKmGUzd859Z/vcSUfXflV88pi5qRE4BVQABQgHT7lEkQIfB5QX3PYAz4IogdOj0qymN1pphiMIgiJI0ECT/QIpggq3LpVF7ti/bO6spfOnrVzy+cGQU2tWHpsyec3Y0R+kHou6lZ1wdNuKsLXLo3furrpa7aNBYsDjJhmO5gUJIwWaBzcuObykHyAyIvnxRyaNG7V+zEtrp4xZP+mtla/84ZPp7299c/TSX/z8nS8XRZp0oPJgMyrgA5eNoXAuEACKYnCclGQ/wfASQIfO5KYkVgSSCIAfNAVIZ0AiwGsRSZcEASBw1u/XBEl0ub1HYxKTkpKRdsJitpt0RpZgfIIi0mwwBJoXaB4NsGP//i6Zv7P48/NH0ZRQmpY5XrHb8YAGaAop8sfo7RtEeQXDSqoP6upboqLjkZBUA2hp7VJUaGvvUX1AkiJJiiQpf+fr3V/9va8WC9be3o9hgiyDyeQmCEHTwGh03Ov1D0Z/36/1EH4XSgMcpYkEiASIZIClfQ434aBojyBgokyIAUYC1QdaADCMwwmGpDiK5imaJykOJxgMp11unKQ4DYBmBI6XTWYby0miAt0DmMMLOhNDcGBx4pIKOMHIisZxPo+H87oFngWW9Xs8jMdLspyEZE+oXGaze1Cji+MV1HxCbA6C5JDE2O0hh+sB7p+37Y93HTqsGIULmh9MRoxjgOPBaOIYFmgKbBYKAqDwjNvSX1p04dKF6KHOXLY3AeznAoZsw50zfaU5mstSV3xj4dRPp735+eRRK6e9tnvM0+tnvbVv0bT9745Y8PWshR23TpekrxusidVVHe24cdDRkmSpS7DWJ3YU7WstCOkqOmi4HWMui9ffjDbcihuqOaFrOE7qs/XXjkBtZs7CqUVrv5SMbbrOOktru719oL+j32UYcjS0lCSfLbma4fB0NTbdtJs6DG21+toKsFnpvv6O22Vuo66vr6VvoGmgt2qo8w4MNpozT56dPUkXvZ++lt2TGm3MOTKYtdecvdVdsNuUsdmWs8+Ufgi7cr7yyN5jX8/L2rW8PTvGWJp0LWlHz43swoSkJe988vZvpywYs3zqi5+9+ehHX07a/t5T8yO+3tt7Jd1cEl99enFv+nqqKMWQEqPP2tefs7U/c2t/xjZ95i5zbqg9P8pRdMxbekFfeOZq3P59X368dOa0g+vW11676adEkEHBAzIOIAP4gCWBo0H7lkipqIIkUeCXabfzxuX8Xeu3zxz/UeT2iCsnk/DOutrLF+ZOmPzC41NHvrR0/Jvr/vDEpLD1q5rykwZLMwZuXkw5FL558dprWbUSARAAgaccDgfHK34NXB7ZD3D82IXnn3rviV/NmPNu5FsvbJ306voPJmyb8Ma6t15fO29mxNhR65597OP1S081lHtFHLqaLALl86uA4zhBELwo0LyEM7yDYiQAEcBLqhwDKg+WAeF6XvPe9XGHQ05lnbtqHvBCADxe0ul2nTp9ds2aLa2t/VarFzTwKZoq+ESa5whGpoJQygu0KNAIR6UHUPrD1++93ItQ/V+U/CTFBzQwme2oG4oo5UijggC1orLuozkfoySVF1SrzY3UXHaH1+HEvjOoKhj3ekscF3A4KFEEvx9cLoZl/ZoGTue9GhkPoPS+rYdwXkJZKUcFREITCQ1BKcVKXl50MpydYmw45/AIbpficcsU6yMZmaAlnBJxSiRoCc0Ad2MszamKH3hJI2jJ5WUoVhEUwCngJfBp0NIx6AewOTGC5CxWF0mKGCbguEzTyF1PohmBFxReUBF3w+0hkXU+4nAjmwhE6MAJFjE+KFr4qUOpLGgsJfNsoK1N73YJNBXweiS0dZ0WlyqwEOAzTx+J2rdy3pQXB2rPGu/sM9zYaK86RLan2hpyqf7myC17Rz8xYfST86eM2vzRuPDJI3ZMeGHTh2/tnPnGhrefGV97OcHVdooZSOsrO9xweaexKsbbfsbeeLz9yv6BkkhbdaK95pilPMFcFmetOGZvSOpviuiqCam48BV0nK3YPuf85+Pp/puuoTpza7Wju7O7tXWgvUPQm5uvFKUkxbS23aFJc3tjqa23Zai5zlBV6W5rH6ipNna1GfWdvX0N/T3VQ513+M471I2ckx9OagzZ4Lx0qi89wpB9SJexW5e+dShnh+7CZlP2AXNOVG9y1EDW2aErF/HKkqrzx9sL0rqupPXknqNrKk+u3/fOo2MWjV++fNa+0U/O//2/Ttj+Tdj1lGzdndT+q/tM+etdedvwC1FExgl3Xpw197A5O9yYGWrKCrNcjHAUxLiKEp3XTvTnxXbkxA7eSrXWFVbnHt/x9exRT/zrtax0S1c/ZcU8Ro+MqxoPLqOjq7Glt6OFJR0UNiSzztKrl+ZNn7Zk/oJT0YlXLuTvXrZ6/9J50kBN6oGDr/9m5JTRS999c8vMiXvHPDdv4biZ+THhlooL15J2RaxbfjL0CGlwU2YPbhkEiQSfzOGczIDEQm1F3/yZK8eOWDTptbXTR++ePGLrzDc2vfH0oo+n7Xv5d4vefW39B+/sHPnUp1PHrEk5VhpgAVSQWb/XjdntdofHS/ESqwAl+g1Ot8ntNdrxPp1b5KGj0fvR1DWP/PyNEU/PHPH09I+mrJg/a6UqgaZBUfHN6NhjNifl14Dm/C4X43SSFCmSGEvhHDdsSHtwxOzfYRXn7yzuCaWC6AtoYLW5+weMJMWjhv2AzuQPAKK8lVfUPvqbJ/r6DSmpmV3dAwhHJTmAQNfjpe6aE/2V5xtSTyEjLRwXGcYnSYCIaX/2/T+A0vu1EJRKDKNwtE8kAyIZECgfyygM78N5yc3ybkbEWJXhQOBA4IAXgRWB5gMU56c4P80HWBE4CWg+QDCqxUGSrA+jZMkHXlJyYaLLI3MCeHHF6WFFBfwAouSXZUBWLMjwDE13YTmZonmkAlRUQHZLHi8lyQFkUoP8a5hhUw7+L6BF8JzP66KNBnvAD6j/QeJMeentpITYq5czKYcuYtfKiO2LL53dfysrou9OIt0Sr3bH8p0xTPdJa12yo7lk9dwvZoz8ZNGkfdNG7pr00tYFEw6/N2Lrm0+tmPzS1hd/8VZpajTVl4p3nzfXxfffPtx1I9TZnORtP9NRdMBSnUC2ncdbzjprkuxVx60Vx/TlUcaOo83l26z14dBxqvrAvLj5LzVciXSb7zh7qx09LQPd7e31tVSfXl9RfTo28mL22b6e+q6WO66BTm9vB93XK5pMzp4uh77HoOvo7qnr76ke6qjA6m/462+dmD05f/lC/YXw/szQ/vS9PSnb9BnbDVk7+y9s06WH2Aviu1KiGs/GduZkmG+W1lzIKT6WHLN2x+XQI12Zl1xl9bfP5Kz7aOnM12ZuW7I79+TlOzlXay+n12Yf7C/cxZSHe/J2DyXtoTISLCmHh9KOWDOPWLOiLFmRhoyw/gv7O1P2tiXv7sjY35Ud3pod1nwxoutK/MCtM/1lGYe3Lg/bvGbZvDkLp0xZOnfu5zNmLJzy7pavFx0L23766J7ln74/deyLG79ZdPViZtOdiuS44yErNxQkJZSc3dd75WTi6s1zX53z8YRtE1/d8OZzy76cHjLl6fE7585x16QN3Ew4GbI+bseWozs3bf1y4fxJry+dP+3wzi35aVmYiQIZSnLbRz8zZ+xzX0x7bePUVze+P2rjh2+sn/LK8qkj17736rpZY7bPn7B73vjt7768ZOOScNwkY0M05aZ8kgwQ8AOQnGTz8jYvT8sqIyoON6MFwGmBrWuPvfmHTye9sXLGuE1ffxz59qufvTFizoI5q29cb9i89cDVGxV+AKMZYzjQG9xujEdnbvBoRhbKw+bi/Qi2wD/puCeU2h1eRHbz+e9SdpHcBY1q+d0Tv79xs0wD2BsSunrNRpSwOl04mviNLOlZTvYH/up5xmjIFWJxB2c+3ntsxgMovW/rIZwXSU5iWImjFYFSRNInUArLKKzgJ3jVy8kYK5OcwnEBgQGBAZL2Y6wf5wLBwFg/xvo9tMrI4KYUwQ82L09L4CJlVgRNA1EEHOc1DcxmF47zLhfl9bJI/C4IgFiRCEqDvpTB3BTx9YOzahH3EhWB0eP/6mvpPxsmgws0cFg9DMWbjSbQfJ0tdfNnTaq4kRV9YHVC2MqzUWsJ3U164CrWeYlsTaUbYqT2KFv5Nm9jONZ6uuPquQ9HTlg4bsXCd/ZNH7Hr7WdWzxt3YPqo7eOf2zD3jahXf/l+4YlQT9tJS12ctT7eXpfYdfWAqeKouTKmo3C/seyoveaYuTzWdDvWUp5guh3bee1Q1bV9XXVHVXMuU3+yLX5V7Mcj6y4fYh3VXl2tqa1yyNDd29pkb+vk9MbaG1dzMs62Nd0Z0rfoW2sHG6p0leW6mkpPf6++vbG3q7G7s2agq8rWXU20lIG+JWf5onOfTu1L3mPLDx/M2jtwYac1L9SaF67P2DeQsb/5zO621Mim1MT2izmJG/d9MWHhe8/OeO3h8aP++Z0FI+bnxyRZqkt1JTlY0w2+o6b+QlJ37qm+S8f0+Yd7s3Z3pWzVZey1ZEUYU8MtFyItKYdNyWGGlDDDhTBDVrg5L8KUH9Gfe1CXHz5YGKEvjBy8ckRfGNWRE16Vsr+3NKP5eualE4dSIncXHDucEbk7NWzT7QtHGwuS8pP2tt+6YG+/3Xzrct65kzH7wqJ27KnOy75+8lBDWkh37tH07SGTHh039rEFs9/aPeapb95/+euZT0/J3BPiqUzOPbz4wNJZ8duXVeXEVF2Mbi46p6++lnf86Pavv8k/nQMk7Ft+auQjCz54bdvE51a9+8Ky2W9u+uC1tR+9uWncU99Mf2XT1BfWvP27z6e99M3Yp2ePe+79gxvDWsobIODjSG9XZ4ukyIIc0Bk9jABejAAAk8El8XAyvujn//jq2JeXjX91/bujtkwevfn15xa/9/bK3//u3VUr9vsD4NfAF4BBk8sPIPtA8QEnAUapNhd7dwrenwbJag/Q9Afjh7JSJHHp6Oyz2T3IxMNqc6/fsDUs/EhAA5ebQNxaSQ4E/VmRYoKiBVQHxnDmr31LBCEhQRRJykgbTVGKJN0Lkh9A6X1bCEpFhhU5WhJQUArLKDSnUryKsSpGixjGYW4KdxBeB06SIs5IFKtQvEpzKskpBC1htIhTIidrBC2JPnB6aFrwYaQgyAGGFnT9eopgRUHFMc7hIDQN/H6gaZXjfBznQxQh9BgpiINfg86FDCsNH7OHlHyowBsc5f2d+K++xv7SgAA4HURXRy/PcgAqQ1jCQ9bs3fZZQsRKa1ehrSMH8KqGy6F9t2K6iw6xbefYhliyer/h+hqx5yg48gdKz38y9r1ZIz6Z+NSSBWP3Tx+xcfIfVk0bsW7+2/sXTYgf9avpN85GEF1nHU3HjFXR9rrEoarYoarY1oI9uluRxrKjxrKjuluRxtIYR/UJV+1JY9VJzFDaX3+5qeC4qywDOkriF00qSwnz6srdvTX9dbeHdJ367lZdbR1nNDv7e4oupvZ313vtA05dJ20esLU1G5vqZI/T2t/Z21mn62/S99RYu6rw9nLQtxbvWhc25dXmhDVYcbglJ8SYHuK+HG3ODtdnHOhJ29+TFa7PTxgqySaa6g5+tfH1X40Z/evpi8bt/Wby0QlPLlw2Y055erSp7Hh98ubaE5sM2YetuYcNmfvslyPMF8NazuzqzQizFMcNZB30Xo71Xox2ZkcOZYYNZh4cyN4/kHOgN/dAT+6BgfyIgUuHOjMPtKXu68s8ZM6PNRcnVWdENhWeuHb6YMr+lVfjd3fkJRiunrGUnG3KCq9NC7XV5FRmxsduXx21bXP0zn1ZicevnDiSFbrSceu489rJ7G1bl4x8f+EbyyY+89Xs1zZ++PKSLdO/KomJGrgU5605b6vNO7ZrSeHxtbrSE303Uxvyzndeu9hXdjMn7sQHoz6c8fI3E59aufz9xMnPr5vyh5Vzxmx+78VVU17csGRi5JyRu+eP3jPz5XUfjFj25ZT138xYsWLuVycORaSdiKEcg6DxuMtGkxQEgMR4l81KeTzgg/Za4zcLQ6a9tXb+e2Ezxx2cPSHytWdWffx+xHtjN0yftGb2jNW4F5w2Xtdn1nzgsHsFIeDxcC4vR/PAq4CzGs4Cxt2NB1D6l8U9oZQgOVTd1QAUFTxeKqDBzA/m1De0ImmK6gMNoL2jF1GNUFdVVrSgzgp911/7ltDwR1TzQwiKNF33ev8PoPR+rWFQyoiIbiDQEssoLi+HUTIjgCCDLAX8kg8kH/j8IsvxvChwoiBIIi+hxxwnSILMcQLmwRmGYyhWllWW5hiK9is8aCpLEhAAi8nBMorF7MU8PHO3P3o310RSHB6xtFmJ5WRkDYqAM5iPDne9upuq/sShVD/gkEQNNHBazSxpwx1dySd27l43I2LHB+0l0Z6u1MHyGE9jEtV8Esx5eHWM89Y+rTNe7YpyV+/31MWrups5Rw6/9cjIz99Z9dV7uyc/+/m4Jz/+ePzmj9/Z8e6zq954dFLX9WSuLxlrSxosOzxUEeNtOumsO9FRuN9wO8Z0J26oIs5SGW+vOeaqT3I3nLTVZexcumzcc2+M/MXja9+dIZZVxyxckHVwF93b5O1uNjTX6LpazANdffU1lvZmt66rojg3LGRT0aXU8muXBltqgcadPR0Nt66aulsNvc0OS6+pr3Goo5Lsqgn0NlbGhW8d+2zRjtmu3D22zH3m1P2OnOjB5IP6tIP6rIONpze1podUnQ/NDNuxfOqc+aMXfjF+26Sn1ox9fPPkF5avmftxXuz6gaKDpoI9Q5l7iEsRfGGYJXmTKWWr63KkteB4X25MV8HhgaJD+oztQ+k7hrJ3m3P3GS/vH7h8oPfSgc5LoT35R/ryo/tyY3qyjg5kxhszjxvSjnelHL1xfGfOkdU3T+4cunUOr0jvzgyvO7G1I3nXYN4hT+np/vz48rOHmi+nNxVeKTqbWZKS0ZZ/2lB8rCxqXX9KBHfn0ulVq6Y88e7oX04d//jsmc9PP7dhs7kwtS05suHcQVN5eufVxNqs3W2XIqpTj9Znnm7LT2kpTGvKzy08kXVoxdmxv/lq9K+/GvfkyoXv7H7/1fXvPL1u9uuH3vrt+olPbvp4TOiHr2x667dzxz814/OJC2O3htzOTkuLO7Bn9SdZJ8OBcwOLd9Y2Gju7AyyJW4ygwtmYjBcemThl1Ko3nl42/c2DI3675v0xYXMmHV4wLfTZx2Z8OHXlgtmrmqq7FZIPcLxNPwgBYGmBIkVeAi+pfC8ffVDg/UvinlCKmqMWqwuBpU5vnjHzI6Tl7ejs0wCaWzpR+U0DuHGzDKGvooLLTQiiD9nzCqLvr+2VsqwfjYNExyAycL43TekBlN63FYRSnmN4gUE8eJFlFILyMQIICoiixlAs7XZyDivvsvhYTGG9KoPLjEeh7z5WOUwTaL9A+FhC5TCVwX08HuApTcA9lj6VdYFftAwOQgAoXGIoP4krghCgGZGieV5QOF4mKZ7EJY7xC0IA1TdQlzTonjocR5GT+F2U/YlDqaaByeDCvYTAEqaBptA9X2Wc2ZF2bCWuzyH7L3hbT1Dtx339573Vke7yw9idMH9bvLt0N1cfwTXHGm+Gk01Zg7cuL586c+yjI6c+N/39Fz/6ZNzSxZNXv/yvb7/1+PQLESc9LZe8rcdsNdG6krDB2xH2mgRLZfxgaVR7wYHeaxHm8lhn3QlH7XHTneiBm4e6r59aPPXj13878aMRs9782TNtp/MurN9xbNUad10N2dvp6e/WdTS7rAa7rnuwrY409g00Vfa1VScePdBceZOxG9orSgdb6okhvdPQPdjThDl0Q31Nls4a0dAOxk59fvre919L+Wqc/cJ2R/oBW2qYOyt28GyoLeuI60q0LiekOyfEUppUfvbQjvmfvPXrUR+/vnzBqM1Tn1s97skPNs7/qOTsXn3B0aH8GLzgDJ1/ynBqkztnpz1nuyFrt/lSTN/FqNasEF1hqOPKQfulPYacnT0ZW9szt7Vm727LO9h++XDzxYiegkR90enenBPNJ6PKI0KKt2/K3PDNzYStxQnry0/taE7d158Z7iyMxYpjbRfDes5sdRfFVsZvNBafx+vvbPxo3m8e+tmrv/jVrgXvOEtOmrJinLnxg2nh+O0cf4+5Na+uOq3MUtZMlBca8+J1GYndGfENWdGthbFtl8OLE9Ynbf46JWRT8r5VcVsW58TsvZORvXj8ysm/XzZv9J4pL26YNmLdtJGbP3w9cuLvQ2ePPrrgrZhpf9g57cV1X723e+bL86a9OD49IspWX9p85UznjXO3047s+vKDlbPe3fXlZxsWzovYvOLQ5jWblny9euHq2W998f7IZV9Mj5r44pY5447Meit88qjtb7+0bPaEtRNHLVj5+dabuTeabt78dOrEA5vWXk5Jrrp5a0hvAg047k+nzLLfgsQD2tF/EPeEUvOQA1Vx0R1/Vvalru4B5NGIeLyIxOtwYqgOrPru+nMheQzLyejxXwulogioSyoIwDA+ilKQi+S93v8DKL1f6yGSk6i7UIpGMbMISmnaL8rgC4DXw3S1tJQVXaooTK8uSrtz+fzty2fKLp0ryz9bUZBSXnj+zuXzJXmnqovSqopTq65cqCxKqbpyoao4tboorfrqheu5xyuvZwx21u/euF6TNNLNSxyoMmgamCxOgmF5WfFiFEFyEAACE//Go5v/7sLhYCQJSJJua65ZumTWmfhtvLvKM5DbdiuU6j1DtSfaKw+SDUeImnCqOgIMyf6WKKU5hqmJ9t6JwatPkg3pljuprZdOr5j67qwRb37w0rufjJ07a9T06a9MCFu1tbekgO/Pw9sS3Q1xnoZEZ228qSzKWhFPNJ9tztvbXRw+WBplLDuqLzmsKwk33ok0VaYv/eDzD0YtXDbpy7nPj28+n1t7/MypFat7L+UK+u6h9vrupur+7ibzQMdQX6unr4Mx9cuU8+zxqIupJ2tKrqSdiLmceqq77s5AW62hu2mgo9aubxvqqLa1VlCddUJnbcySD/aM+40reQ+bF+dKOYJlxJvORVjSwgaSd9oLD3RnbrHcjGrPOZy6Z/PC1ybM+P3UWc9/+OWYuZN/8/TJrV8ZbqY5S26kbNjz3s+fX/vG1OthG9mq48ZLmway11oLQgfS9joLo8y5oYNZu7tTt3Rn7DRfj7LdOd57Nbo6c3/J+T1pYcsLY7fVp8d0XzzdlpzYnXzKmpNhu3xhsCip61JkZ1a4Li/KmnfUmn3Ikr7Pkr7XkX3AnnvImHOkLTkqe++21ZOnvvfEK9OeeTH008nOmyexghPdx6oscdoAACAASURBVHYY03b2pIW0ZB5vzEnPjztalZzYl3O4P+2ALi3GcTVdfz25PDX83O4ld84eKj+TkBG6s/JCpK48ufZSTFVucsSqQ6/86+RxTy+e/caOt57+asqIHR+8njj91RNjntwz47VDY59aP/aJr+aPWTPntQVLp8y/GHW4Ift466WYzstHegqPDl4/bS1Lt97M0V/L1JXkZB3dn7Bje8KO8E8nLnnzsRkfvr5++qtbp47YsWjykQkvrJrzzuZJL8//YMz8rGNZZ8OPHlm7tDQ5/sa5hPS4iMPbNh3cvrWytAz3Um4X4fcD0mRLop/EGZZgWILjOR+aV4+26/AZqA/iB6BUVrTWtm63h0Qq0s1bdga0u1VclpOdLhxJ/pAn13/d6PUHUHrf1kMkp1CsxLA8x9ICQwoMjXTZLifv8sgCD4SX6WlpbK+8bmq5aWu95u267u646mwrcrYVuTuuejqveTqvuTuu2poLbM0F1qZ8FHf/s7XQ0Jqvay609NRsWblUpnivlaJxH0mqJpPTDzBgGPQDsJyA4QxL+yhC/f8blDIcsILmcLgA5KyUuLrbFwaaMt19OWT/BabnlK0y1Hp7j9wZ6+uKp6pD6eoDrpIdZEUoW5NIVZ2iqs/Rjal8ezrbmcN1FRcfD101fcbsV8dsmvtJfmLsUH2xbLrlakj0NsV4GmPtNdGWiihbVZyr9oS7Lqnn6qHB0qO26kR7TcJQZbSpPNJSFW2tSynLzNz11abwpRtuHDshdTQXRYSsHf2Kt6RQ6G+xtFf3Nlf2dzfo+loHOhuHWuudnS2OwS67sfvCmfikmHB9R33C4X3FF1Mph8E60GbubXbq28yddfaOWrynQTF2Xoves+blhyu2f+Y+H2k6EWpMCndcOOrIOjyUtc9x5WDL+VW9F3fqi6OGSjKvHo06sHDZtMdfmfnk0+l7Ng2VZFpL8s+sD5n+6Lj3H35v0fMzz21YPXgluitnbXf2SmPezs5zm01ZBwdS9w9khenyjugLYrouRVYm77t6Yvv103sq0iLqL8blRG4ojNnRkXuyJTm2OHRr2ZG9/VknDIXHunIPd2aE6bMjLbnR1uzDtoyD9owD1rS99pxwV36CreB0XdLRw599Pu+F0dMef+r81i8txYnOvBhTyl5H7r6B9B2dFw91XUk0laf1FSW2nNs6kLYXu3K6/dzh9JCVZ3Yva8w6ZriZ256bcfF/s/eewa1dV56vPsyrmak3M13vveow7h63Z+wOlrttt4MsW5aDLMlBlizJklu2cr5K915eXl5mEIkAAYI5E0wgcmLmZc4kSCLnnHPGCchpvw+Q1GpNy69fl3o8bmnVqlOHoQ7OqQL2D2vvtf9/YuvtsRblSrdkkWTYY/fWtz3zw5ce/JunH7+n7uffuv6jL9f/+Cs99/wF+Wd3df/gS7ce+kbLcw90PPy15+/7wg86X3kneLojYZAVbJyW267jtJm4OAuPbGJRVLNd5tUJ6xbnmDHpPDgdaer9xh9958lvv/HTL7/6sy+/cf9fv/SDv3jq8W+98MO/ur/9pQb3mXKxv3d/grI93OHcE3jONva4U7yJ4dPtLVAB1TJA4FwoGEfhLJpE0EQKFIpIPInAv/8fsX/F/EiU1iCqUOpefe2tp3793Psqx7UlrXAkiaYLkWiqJm/+KUr/DcQdSaSSQgowkn0PpUkUTiNwAYaqoWA2mwZZOKc43tWfLCfMOzHNQlIrjKu4YRkzJJ2PyFkxJSeu4sZV3IicFZGzar8PSefDMmZYxgwq2Anrikez6FHv1r30dDGRhsK5DAySiVK1CiwOdxkAb8hXLFUKRVApAZcj+olCaQoppVBgd0fQdB6B4yLO+Pkey6EUG08m4gZmSDroO8KHj3GwlIzKSNAZLnGMAcZBoB8D6vmigoWcT0cOB8On1IS033/SX7KsAr+matdWbCrgu0xbRM7T7sBZF6IeQFQj/iOKY5vo3ad5DvpsW92GVZJ9m+Y9HvCd9LsOqY59svOgy3k86JIJ/Ko17ykvJGEnFFz/7jjl0a+b56kl22nQcOTQnNjNcrNVZdDKnJcSr/Ti5PaCSS3JpgJhj2lvTTjaQ4z7rA6dVC89NMuObaoTi+zQrTrzqE4Qu8a+I6K/8MjOzReKq4wEb9wySogJhu2zWBuj1ThfL596y77UYRbjbSuDOsFoYG/dv7sdPT1Jys70S/OOzaXd/um6Hzz39F8+fu+//yK/scWzSnetEt3rmMAGycTDuBd6bPxeLbNPzx9Xc0d2RvCCzhsCcv3mOOGc22/dZqyPtggp7+yMNh+MNu0P1UunMRZRt0FAVbM7VXN4I5NkZ1HszE4nA++Z73Ax2oyTt6QD9aqJDuP8sJw+ejY2qWKyFMwhs7BXNV5nm74ZFpEdPKyS1yjh1klFt+S8puDaQHhxwDzd6hL1ONeZexM91nWxSsBa7e2avHVlfaxBc7v7QoxV3h52ne51vtX0V//lSz+68/Gn7qv/2p89892/bH70O33f+vyb3/r8C0/c2/D43Ve+/afff/X+X28Oj1tWORezBB2n3S7CuIStHmFHQEgI8MlObpdV3Kvm9dnW2Pbbq+sD9IYn3vjRF+6/60++98y9rz/17Ze+/7n7fn7nj7DPXT2b4ybOJXrRnGt5MrAxbV4ak/JHj7iTzH7KApNRhNPpVCbgjURC8UKuHPUHk4EgKJVKCAonM+/7tsJwCUHKKFr56M0Vn7T8bVWp0+X/wQ8fJHf1CEXLxRKA4KzHG6o1gtQ8/modRjXX209R+vsedyRhkIIrMJJFECQDJ1EkicJpGC5UyiAcyuWzoJovH6+LlLusmE7sPhlLKGbi0snY5UTsciIunUzI6AkZPS6dTMqnkvKp2nktEzJ6TD4dVs+5FWyverPxtWdAulRMgVIapOKVRCJjdbpy5bxSp6oC8Jk//dyrL9fls+CThlK7O1YCIBxJBAMeXPsN9cX6Jq83rF/0yWZ9ZwMxWT+s7I2eEqInGOgCD10Q4ic472abe60zfjiUvpxCpcOpy66UvAtRD6TVU4hSlLgQB49Yrv0R9zHJf06ISclpzQCqGgqedDu2ic7tLvcuzbHTo17AmdbJ9t0e1wHNsd9l3SHadgnWQ7L9vD9qmPFLB3wSmnkf594h9j7y14bx5rJtN2zac+tObCaZ3qrUGaRu2UVAJoV8Dp38eHyA3Im5yZ0btRtkCsmuXSe1yE9c2kuv/tJnkAbNCqf6LGxS5O1qQcPrA7/4oXW8y8ca1Ax3BEQDWnqbnUcI3e5RMxq07FbZ3C0VCyeZ7rAujVtWOaql28zOPiGNalpbUHI4Y2/Wdfz8+eFnr2/iSHYe3cLrMgmwZjFezWkzinu0ggHL4qxBOHsxM7g3Qjmd7jUszTm3uLYNhnZhdHeifbXv2t5YvYzVbl2lujZ7jCKiSUQx8qkmHs3G73UK+138Hheny8EmojujifV+r4DsFfaEVqddwmn9PN3Em9MJxi3ifv8iISzGWabaFeO39Isttr0O+cL1ndGXePVPHJPeTqz2GhkdK5QGyfyoms/aGe7hYOvH6p8WdL28Onxlqv2xyban3KeLe7PTbz/63A//6r4HvvT44995+8l7W7/x2Wf+/oc3nvzelcfvfv67n/3BQ1+8T0AaDO7vX0z3nIw2auYa7bwmN6/RzWnyclv9nA4XG6sYv3Ux0RrYZOj4dO/2pmv3uO03b/7y6z+5+4++/PMv/eDpbz2A/81LMsa8b2NBPTdoFQy7xf1mLlk5T/YfCpjk5jFCWwlKJsPRaCiZy1bLJQCqIAtn0rF4FUHCLjeSyn5wce73rhfhXzl/m9qR1xeepM9dr7tltjhrJpUOp6+2i6+m3Vbb1Pc7Hd8+RenHFjWUVmEk9yGU5rLA40bSUBWUqgfLLN3hfMrE9572ItqJtGYsox3PG+gF41TeQM9oxxHVCKwchhRDKflgUjbwfsbkQxH1ZFDDipl2W994FiC5bKyUS4FoKI+iJSSbK4PSysby//mf/9Mdd/wfSwu7JoPvk4ZSVxAqAJBCcgKBoJdCIDS/89qTP2TQrnnOWd6zibh8AlKPxKXUpIyMKMjRM1zFMI5cDqQkg1nFWF49kpR0BQ9a/AfNaWVP5JgS2u+HLmdQxVziYih+SUlrelJyavScHDmjRM66/QdU1w4lcDQAy2fVCzjjGsm+2+M+7HEfdbsOyc6jTtcJ0SHBqzdvGDZvOI9avVKiabl+4Of/w01vyWrW/OoNm3Jfrz6VGSVqvcSnvIyp5GGbYWasT8ChJ6Muk+7C69TZjVKPRelQn/sMcp9W6tZeujQXNuWZRXVWCFhVc6P9Tz10RGnyiMfsfJp7sU8+0+Za7pNMNCnmOjy3R/V8ikFM1Ysoro2hS/bI43c/+dd/cNeP/+YeJrEjciYsadeQA0FogWmfmwsK+BbWqJZF1YrI6iWKcWvCsDG9PYq93dMqItQtdd48m6TYF2YsognpdJeaSdvovr5Be1vNxltXqeaVTq2oXcpqVHOwWm6nnttl4FCN3B4Tm6pnEjSzbdKJOgOj2cRsdfDxoZVBj7DPNEfTs3pNK+NqEdW7TAosdLrYPd7FYdttimKpidv12MHE205ev4Ryk/Ha/ZvE58/o+Jnm16duvrnS1WJZHgsdTUdPp51bfWezLedM3BLtxsn8gHp5kXTl5nf+7Bs//MsHHv3Wk4988/HHvvnQPZ/96t1/fOerP3hshToS2NmzirlrnXWaOaydh/UuYNzCZhe3yclusc+3Wedaoys9hbO5s+Gbq53vKOYHrWtC3962Qig4mp49ok+GD3bgs23P0qxLOGRnk91cilvQldqb0nFpcu4wm9LOG+nLxhPRQEyncxRKwBtIajSWcCCehTOVdKaAZlAk/yEvmt8rNbF/7fxIlNb85zPZUmsbrgpAOJKsyQTWTENhJFfbMQ+/t83vU5T+vscdSQikYADDBQRJv49SBC6kUeDzptFUBZTAySrTds5KmzkRWU9K0Qspe1HVQEY3lNePZnRDsKIvLqVC8t6knJaU0uJSavyCGrukxC+okUtaXDsW0c3HTZuNr/yqFIXSoXwJBUgKZDIVOJPWmjR//Gd/ODg89B/+43/pIg6BMkCg0icKpTZvPAzn7Z6A0WQhYttVkoPTNS5noG1jBmveHUmqGFHZsP+UHLnohNWUrG7Au0OMHvWgsv68pj+j6kLkhLy2G1jHvNttSUl3Tj4CnfcF9wn+3Y74KSmtoBX1Q8kLSuikMyqhBY9ozk2yZ68neTmlXsAZVjvtuz2eo17vSY/nmOI6JrlO8B4JwX3SkVRQnQdtMW0fdN4nfvH7WtLVnGI9oN5xqY4NmjOZWaK1XEZ1MlivVB1uTY/2NtS9dnuNFw5aterToNeokx2aZcdW+Ynl4tAsPTJeHvosKovuHA1YI6c7C9h6ftsbahZFL6LsjdQtd792MN54PIndHmhd7ro5Wff04USbZ2tEyW3D/PrBX9/z7IN3Pv3jL9033tqwP9d2MP2Of29Qz6FFbq/auELJSP9qVwOH8Oxsx68m2p4ZbnjqbB5/PtdxMYtTs8h28VBwbdq7MG5m9ZqY3fIJzMngzb2+qwcj19R8rGWNqhJg9QKiSUQxiWgGPs3A7zUJ+81CmoFPcq9SA7epNmGrZuaafrbBMN1knm638sjqBYqE02EWkExzOMNUl407cDDRwCE9e8Zq1QrIqnGCmd4FrY27BNT90frTWbx7fd4kGLIski/nbuwNvr4/+M5u3/XLaXzyjHs0gXVsCLwHe3tT3LFG4q++e+89f/6nz97z7bG669L5+dDefmxvTz07KZukQftcM5PgFOC9Cx0eMcYt7PCKCR4xycUnaMauuTkY/UyTQ0gNbEzL52nbw7iNQaxxedaxwfJvzBtZ3WYGPr5ESy2RoZVu7WTDcf81+Ex0yRpgkFrjVqNOqnjs0ae6++hRqFoAIFcC1Soo5UHYF4qHYp+2Hf3W/EiU+vyRKgAi8cr2zmGtWRdB8/5ANJ0p1uQa4gmkJuNQ20X6KUp/3+OOJARSEIDh0odQmsuCRLSShaqgXJGsMz0yDmqcSan7YO0ArO1LawfThsG8cTRjHEI1A0kVLW8czZqGs/phVD+Q1g4iuv60dhDWDyY0gxHtTNyw3vDSE6UolI+VQR5kUZBOl8sAHJ4fOn32KgD/9//zJ/20aRT6xKE0D4AjmCgB4HL7WXMMu1YNkOiNZx4Zx17Rb0+ktDzv6aDrqDN4ToorSXnLePh4AJGOpVXdUUmTe/eKY/OKd7shtIcD+tmCcgI6JUcOMSkJMafsR877Q7udVeN4RtWbOKeEj7q8e13OTbLtNsV2m1pDqW2H5j7s8Rx3u4+67AcE2z4xcjlqWu90b3f7D/vjipno3ijjke8qWm6UFIcx3XlIr7CZ5ErHhd5xETOcQ/pL+f766d56L7Vjcpy2syW+kGxHg1b1xZ5HJ/VqLv06mVcvs6gkqbBTKT9Une2sjtHmMdevP/wtesvT25P10+1PiGivrQ409Lz592Jym1rA2B+lHtGJSh7RsUU5msJd+d4T3//De3/83+/uu35VMHidP/zq8SLxUNg7S8BONGPYhJa1/lvHM1f1C+2etZHA5oSCe0vBq9MJbplF7VY+1sLEWeYIDgbZzaL5+EMWBnWbdFWMeeViCmdfHdMIKOaFLusS1SSiqjhdKl63aWnIcXvEudGv5bc71/DuFYxd3BhawURXcAEBxi3GbE28JhG0RnYYulnq7Y43l9qv8AlXD2dpJ3M08yI9sy+IL04Zxroc3D7H7e4z5i0Nq/Nisskmbvaut4U2KIHVwdP+FnHLq8pZnJFPNS+MX8wNH9EntYv8mGIVRM6D+6zUsdi9zFDN9OvnhnQz/RcD7ae9N+VjjSr6Tc1MvXr2pp7ZYuETzIIuM4cQFOIcczf9ArxH2GkVkE4nGnm4l3aGG85mOpyrQ6qZdtVEPbLRk1zAGvqeuyT92ssjeJcHtLz+pifvm8Q3pYOBFfFqcytZtHoSQkE8DwLJSixV8vkSUCoDquBTOfvfmr9tX+nW9sEzz76k1hhjcRhGcuUKiERTNZO1dKYYiaayuXLt/NO2o38DcUcKAjBUheECAmcRBEEQBEZyKaSEZgCUqCLxLCgXL27PBxTcjHkuZx5LawdRzQCiHkA1A2ntUEY3hGoGEXV/WjtU+z2s6oOUfSlFT0rRm1D2ooYR2DiLmFdbX/slgKBSolhKg2goH01kwwkoW87nKoVCpfyHf/SnTMZCufgeSj/CuujDx9/zz3kKKVk9sWAqH0lks4VqLlMExWI65JmktovGiJ5LcVjJN+/1J1T0nHUmLKN4jvEp6QgqH0lddoUlmJSis2IdBU5OxcLNqmfj54OxMyKq7MpraGl5LyIZQc/HEVk/rOiLSmiubYJzm+Q/7Ldv09QLOP0qybxBde73eY/7fKe9nuNu5wHJttsZOBkJnkz4D4bsG9227b6iXLD4zCPnt25kpEdh/WXYoHIbFVrLpc586lEf+uWHxYjHKD+BIq40FGhrubq0MO9xaD1WtVMvc2ou/SaVSyu/ONg0ay6nJwdwjVe36EMa4Qzh+Z/yu94wbw7s0G+498fdu1MG0aiePxHcXtRxJ3cH29iYZ49mbxiWRrZ76cSn6rf7ZzQilnFz1Hs+zh+8MoF/+VzE3GfQlYt0w9qAfrHVIm6zsklmJtG21K4TXtfx6mzCFgevzcxosc1hfBxKgNtrmyX7+EOh5QkFnbja+c5tat3JWMs65aXb3S8uEV/ktj3DaX9xpfvq/ljTEb1RPt9iEnUYuLe0c+84+Q2hhWYft97KuWnfpRyzW08mcNuUJukoxsrrkzN6vZs8FWdYSidLh1tMdIKLNWhhdqu5rZZVvHeFZma1ORcbLYIbRm6rY7FXNUs5HupQMgm21f6D0RYtf8izwV2l3lykviBj37Ivk21CsoVD1s8QNeNE82y3k9NjZhItXLyR36Hjtmg5zQYexrZAtoqoZk6njYnJH00qRq/pZpsOeq6wGx7z3x4Mbg4n9sbM3A4ruzW11e1k3DCMvowut8dFbYaxG35xr3VhYH+mU7I4LZ7uxzbUMUYnr75+ldBOnhibV6ks+RyoFkApXYr5Y1Aql0rlIKjmkPqxtB39I5Mv5J/Kf/KT8hFX+PD/vCsj/F7+z6/4W4//gmf5p1GagjJnEtnVazcl5/LaLvlKFdT2wMQTSDpdDkeSuRyIxeF0upxMpX9H49unKP3Y4o73vCCyMJJNotl4OhdLV2IogFAQi+XycB7kYPn2vONsFtHPwZrRjGasoJ0o6afzmvGMciyjHCnqpoBlrqibyqnHKsbZrGo0qxov6elpxWhOPVY2T8Zkg3nbMv7NR0E6gYZiWaichCruIOKLo1kANBZbGYD/9J//r7HRKRQpIv/wBvrXeOv/75UppJQvgyRSMdmCDneoUARpBI0FvdVsrA9fpzrgJG079tMZENj0SoYvBDdD57SSbiR20mlea8nomBXHbf85W3l7WLrW47iYsJ7RIMuo+wKP6AbzBrp5EQdsi4altuj5QFI66j6g2Xe7bTs00ybVsk2zbNPse33uo0HfyaDvpN971Os57PYcdrv2KcYNnOuQ6j/p9R335S/m+M8+uNt4JSLfdutO/OpLr+LCoZO6zTK36cKpPTWe7cBus8+ocOik28s8hWTfYzeeHW5rFZdGjcJl0kc8rrjfa1YrBfNzlFs3AttrIGhb66zve/XnkplWJRdrFhM0jGY7B2+e6zDP4q3zFM086XCseaXvmojWuD05uz/JkjLoBn6/TYC38VodfLx7sU/FICvZFBUfrxS0qHkNBk6LnUP18HtNHIye2WRgNdu4HVZOh4nRap7HOLid5nmsk9vlE/U4eF3qmfbzkZtnw/XnY/U2AU7HarLwcf7bw46lAekU/nKaaBEPu5ZGdfN4IwvnERHd3BYn66aHXWdi1ru2hhULfeKudw6GmoxcilPUHd0cMzDxbiHFIyS7eQQnB2dlEvXzOCWjRTF3yy3EGWbr9PN17mWCbZlyQG8Wd18TdF+z7c+plgYst0f3JpqPRm9Bx3Ox7T4Z/a3tgWc3ep4+H31LQ29UjTbbmSQ3v1tGbzybum5ZJyjFTefMa5eM695VyuXIdSefcj7eZhb1WQS9p0MNJ73XDDMdtjmMYuAdE/2Wk9nq4bS5uS36mWuG2esOfnNijeybbnbPtcvnmrembrD7rgy0/4bd+baCO3wxNcBsuSnq6SJfe4fW0sQbGdNuHcBOP6iCUDSVLYB8CQTCqSSczxVBEs4XCjUrzTyClFOJfDKeg1PFZDyXywAoWUol8ihcTiOVVCKfSuTTSOUDpMx98FgTWat5o37AnaaQTpdDITiTB5FYLp4swhkQCKFIGhQKIBiKp9NlCM6mkAKarQTCqVwRoFkApSsQWk7AxWiyEI7nYqliCi0noFzNN7QGJwTNo2gJTRc+JnR9JEprhanV5n7t9bdr2oH+QLQKAPy/1/j2KUo/trgjA6VROI0g6dS7HC1F09UYCiLxUjicLqA5kE3It1mmo6mYmpFSTyYvB1H5SFoxisiGk+f9yfN+VD6S10wmz/tz6onYaQ8iG0Zkw9ETWlY1Hj+jRc66s4a5lFbwzpPfBmiokEqm4iiSBuFk0RfLGl3BVK6YK4M/+uP/2t8/WCmDfxuM/GdmCimVq+DkXJfJgTIAF5dKAAAApeeffvSJh76rPl3Ih2RuudC4N7I5fZ1Hedq5Ry6bBiKnWOAQg4hieYjy2Lfu+m//4d//4b+7gzuOC5hW/HpGWDep3ezQr2MgKT0uGbPeJkYlw8GzQfMm2bxJse7QTDs020G/Za/Xut/rPOh3HPQ4d2nOPap3n+Y9ojn3yMYNjP2g07ZLcGx1Zs8mWc/8aK3hZeMhXyvdcF+e+KSSgFoWtKj9TrXHJnPIj63nh+bzg4hdz58ZH6F1bq8vGrQKxszEtbeuXHvryuqC0KRSrAsFA2TSOAEbP9oBTt1Sx/X2h++S09sjG8OGuSYPrz2yQHQxmsxTjS4uMbA27F4b04gGLtiD4y03mPjm3eEWI7s9IGyP8Nsj3M6IoNvKJNqEnY5VguN2h30ZYxN02Jmdtnmyf4HmFpFdQpJ3geIWkW1cvJWDcwo6gys9/qVu7wLFJSQ5+EQHn+gUdLqERKcQY2I12rgdvmWaXdh9OtK8Rrq6RrrmEI/ZBQMuUZ+VTVCMXtNNvuMXtASXyRcM4upQy3JPvVZIcy73K+i3NFM3LfPNdmaTg9Xo4LY6eBiXAG8XEmzCTruQEF/tcnGaDYxmk4CgEZL3plp5Pdfnut6e7nyj79ZThwy8e3fSIu7SzDUZ6PXx213hPVJWMaZnNkkGrkUWx3R04mrH61pmp5LfoV3BmTbxvuMevajVt0b1CCnhlVGjaMi+MW0UDZ2OtZwN1tvmiTFRd4hLhJd7fMwO81STi4v3LvVYazIUPLJx+EaQhXMsELUrBPNer3W/TyfqVE9jbAwKus2/nOjWCZniXkr3tasDN5uYvUM7t7dzpWqmUE7C2VIZIJkikimHY0gwmIzH07U11FQiDyULaaSSy4AaO+FUEYXLCFSCkgUEKmXQ6kehNANlawpr7zL1PaO3YhHAcCkSz/gCMIRU82UQSxVjiUIikUlnijXPqEAwBqH5mudjMIKE45kUWk7nAVoEqSyIIeVYKg+nS7Wm2RreaqJpH9+E6keitKZzZDDaXnn1zXSmGE8gDqcvBWV+52POh+7/U5R+XHFH7fsgAmdTaDaJ5uJoIY5W4giIxkvxaK6Sr4Icoj5Z0Z+wQ3pBTD+fM82UzZMVC71kmsjrR/P60bJ5EthnSqaJnG6kbJ4sGMYKhrGKhZ7Xj5bMM37JIEgcxvUrrz56D0Cj1XQm6Isnk8UEXPZF01E4h+RKSLbw2T///DyDuCAP0QAAIABJREFUUyx84lAaDGfgDMjkQCSOJlPpUqliMevHh7vlpxscOvmJ+++cJL/GoLxMuHLvTMcvzVv4mJQQPCfCGp5+jfvY1+7/9fde/PnXn33snpe+/Jmv97bi1HuLRd+pdJF4zLru2e+6YF9zbBODx73WLZJM2KQQt6mWOxTLOM16p+NowHE04Njvs+1127epjl2K76A7cNrr3CNbd4iOQ5JxA2New+bPpzjPPbB844WwdifgkMJWfdKgCWkVHr3Mbryw6iURm9YhPXUpz5MeyxJ7dnKAOjM2QCPjNlfFiovT04OdqeGBHgJOPD+nvzyPGNV+yS6wypxLc6MvPSyu+7WXSXTPtQU47bElkovfbma1WQVE90q/e3XYLh4y8Ps9BxzHLt271R1Yxfi4dfbJN02DdYahZiuDZOGSrAs421KrTXTLwr1lY7RZZjB2Dt7M6jAxMbWjfq5VN9tiYLQ5BZ3G+XbFxE35eL12ptnM6rBycFZOh1uIs3HarByMe4HiWeozcLpOR9u2uutFmNe2u+vUDIJdSLVx8R4RMbREtvGJK70392bJhtVJ4+KgSURzL9HsPJyD0+5kt7g4rU4uxsnvcPJxDj7exifaeQQnF+vkYu3cTgOPrOZTZfzeU17/Ebf/kNO3NNwmYVF0oj4tm6hjYDRjN3RT9RpGnWOZqJvHy8YJTj7DKeRqGZNW0bRpaeic0XbJavTu9kjnbqkY7XY+TTaF14n61OK+y3nCwfCNw76ryolG6zzOxSKqRxoNE+3W+W4rd9DEn5RM9av4c8njda9gwDGPVc80m0R4z26/eZUsYzVr2Fg9Ax9dmzJM91p5s0tkwisP/IjX3z9IJE6NT6ytb2i0eoVSa7O6trb3h0cmXe5AqQRqVonJZD6VKkQiaDSazecBilYgKB+LoYlEJpOpFAoAQYrh8Aetp/+h6nq/MK3hs1aP1tLrjddeIpMHsWTO408EI0gKKbndYQTOpdFCNlcuFEA+DzKZitsXRTJVCC3HoUIslY9DpSRSSaHVJFL6XaG05ggZjiTbMYRyBWSypdqy6O98zPnQ/X+K0o8r/tEEbwrNppBcEiml4EoyUYpHc6VspYCiJtWpUbbuNW14dQKvfDKoGAkqxgLyYZ902CcdDCrGwqqxkHLcftId1dB90kG/bCSuo7sk/RHtnE1CzwWO3MrbTVd+DdIQyFfQRC6NABStxFP5YgXEITSWQtra8TKZ7hPF0Vqm4CqaA0moHE9l0XQhFkukknFQzbc3XHnt6Z8mnWfGE+ZQ+1MHHMws/ilEPwcb+6z77SAsefvRhx/56uMPfvHlq78c//GXb9z7l89874s/22GJHJLb8pUe93G/+7AzIetFVGNZ3XTkYsi202Xfpdj2uvWbJMMWxXUy5DoZcB/3Ow9pzj2qa58SOKYFz/rcBxTXIcV71m3ewltv4ytyhuClny5ef067y1Wf33ZdHDvPjiynBybpkVl7atVLNMc7btVF0mX16JXjPWT+zLjseEdysCE52PDZ9blkKBV0Baz6sM0QsRr8RoVTvh9R7QO3SjlB7nvorgvMq2BtxENvtDOa7XyMZQFnEOKU8+1yeqt+CmdikXVCslLQouVdtfLe8HHfCnJvJgVkZGnUNttpZOC0zAYN85p+/h0L86aL2eFhdTq4BCsHZ2FjbVy8nUf4YBoYbcrJBhX9loHRZuPibVy8lYVx87EOTruZ2WpmdbjEVP/qkHNxwMDrVjNJ+wM3d/tuXNDbtCyCXUi18UnSaYyIUr86hpdyBxap19ZpV51LvTY+0cput7PbnKw2B6fdwWm3cTBWToeFjTWzOsxz7V4R1SXqkU5jN/sb1wZal4Y7RANtqjWGhDu4PYZboV6XTWHh3Wlke8LBxCjp1y/Gb7gW6fG9DT1bfDbGktDZByOj2/34te5rS6QXJPQ66UyzgUfxrE6d0QlnDNwJo+1ivl3BxunYOBMba+MQXTyKjUmNbzIjG6ItGoV+vbHliRcprzeJu/rsCzPB1WHfQq+dR9AzWy/odXJmo2ejxyGmyEaag/wxy+zw0EvPDtddA4mIXn7JYzG7yJ3Xr14jETvr625iMFiRcKnhViuaLiST2XAYSqer1SpA0UoohEJQMRKBU1AGQYrJZDaZzNZgE4+n/6k3f23B9X2x33f9xmvHfB4UCsBs9kJQsVAAuSKoVkGhAKoVgCJ5q8WVSqZz2WoolEqny6lULpsFcLoSTWT9YTgYzSTgMpwBSKaaSuU+6IGBoHk0Xfht+0/+f6Loo1Bakw1PptLkrp58oQq/pxz+Ox9wPnT/n6L044o7EKj03nxLFkayMJJF4BwClaplgCTLSKrodwUuJUdb6/yNNYaQSzvaoZ/sjJ3uTJ7sjB1vjR9vj55sT5zujm8v96vOmWIWQXo8Iz2aW+QStJe8/fXh/Y3Jw03G6Y6on4yN+4LxQCIHl+KRdD4H0mjB4w1WqsDrC1UqwO9PfrTs8r/ZzOSALwCn4AqarXi8IRTNAFApFxAAUIv6AKQdXY1Pz3a/aT+dCau4EdWM+5Lklff75GLs62/+6IuPPvTl69/+7Dvf/0L9G48O/t0f3782JZIssJynjLSF5TvrRHT9ac1Y3jCbVIwFJP3hyyHvab9xu8uwRbbu0+yHve7jXvcxzXPY7T6g+A6p3mOK+4DiPqL6z3vseyT3bhdQc4UvPyS++kxQveO1XCRNmphGHdTIgxZ1xGeIB80+o9IgOTJITnSSwyX2rEF6GnNbfVZNwm8zK8+0Z7tunTTuNATNKr9OFrQqnRaJ/nI9aziFdoT8Fx5be/EXFf4AzCIZxq4bWM2GRaxWjFWxW7Vz7Y45go9DNgkxBtEt++JV/8o7IfE7bubb1ok603izndlpZnXoWTf17GsWdr2b2xLiUUKCXhub8C7DWB02Lt7BJ9q4eAsbq5lu0s22GOfbrRycnUdw8Il2HsHG7nBzsG4O1jrXqp1s0M22WHmdFiFFzyUFd+jHE60bvdeljE7TwqB9acQsGlCwacfMvnnyTRbx2nTzi4vkd9RMomauw7/UbZprNjOarMwWO7vNwcM6+DgHH+/gEy3zBCePpp8nHw62bPa1bo8RV4Zwc4Q6CX/iaK5nb7xTxqTqWFTZSLNs8KZhssUvIpvnSWrGhITOHn6b/Is7H/rBf737hbt+tj844F1lepYGlTMtOjZROkNY722fa73CI73M73p+vf+18+kGJbNZOXNLQW9ST2OdwlH3EmudQn3+rvsf/eL93/mTe779mQfv/sxdhBef0gv7SicCJ4OoHb3hFRM8610aXotZiDPOYRLCEes47cY93wgcbiMBVzDgtpq0Bo0y5PMaNOrzk9Np+tT1q3Ui0UI0ksykiyhaCoehYARJQAUIqcLpiscbQtPvuoaFwgl/IApB+XL5/c915R8SqsJwJQVXPtgi9H57UTSKJJNZpzNYrQIIygeDyWgEDvijabSAQrmAN1IugXIJBAOxTLqczVa93ngkgiaT+QRUgFGQzgIYBdFE9neFUgjO1vxHKdS+mqRRCsr8C0zT/pXzU5R+bHFH7Q39Lk2RNAqnUTibSRXgWCHkQ5BkGU4Vi4Vqvpgrg3yhksrkotnsu5nJRN7PchkyGqUApKNRZzTqBCBtMskqVSiXj7rdegSO2602UAFZqAjKIAsVs3A+GYdTCahcrkbCyWoVeHypXAHAnzBfpyRUTsEVOF2B0CIE5WEkm0okQ36Xy6wE1dTTj9xjl6+65AtZ115cv+S6mDKddIX1sxH9Bunq1Se/+5sf/83zj95Vf+WR7q/84QM///qjZ6Il59lyXM3znNICFyTnYUvghBQ97/Md01yHFP9Zn+OAotsk6LeI2ttE4w7JcUBxHVPdBxTXAcm1S3TsEV37XbbdTvdJt2Of7N2nAhWH98JPxFefDap3XMazkErmOZdYTg8MFwd65aFWeaw82Uu47JVU3KGS86bHLvbXzcozr0Fukh4lvUbEb3EoDo1nO0H9Rdgo119sW+3nDpvEf7lZuNhyjJAZj3zv4M0nwcqoj4k1czFafqtaiDGL8d4FcpDd6Zpts/MxRt4tm/Ad7/K18MqN0EJjUEgICrsdHLKFi7cKWuziRo+43SPAeZhU51y3ZZ5Qm9fVzjTr51pr58rJhpO+N6Wjdfq5VisHV4OriYkxz2McTIyHjfWwcTYmxjzfZmS3GzlYLQen4RD3hm8ejLeqBH36hTGdeNy0PGNYmZUtTN2mdwlpTfMdb2z237KI+13L/d6lbjsHW5vLdfE6nHyck49zcHE2Lt7N77YwyRej7Xv9zZdzNMPK7BlnWEhrmWi5wiXVL/c06vgDvrVJzQzONt+ZWhuG1kdia7N6DmfkKuHhv33iB5//5aNfeeanX/jRK9/8/irmVnyNrptqtwt7DMLB7YmuvRmqdqlHLcQZhDjHCtmzRnUudjrEFNdCv1UwahKwGLc67vuzrz/5d3//q7uuPPWdWz/9m6d+8Xdf4RPeDixMuOfIjqm2qKjTIW6/nH5bPXvTLyL7GOS5Zx8ee+7JklF9tLHgdpvVsjOLVu406nRKKXd+dm9r8+L05IEf3c9ksHRaE6iCQgEEg0k0C8oAIJlypQogGA2Fo9FYCkFztU2T75WnpX+AKFSFoWoKriY/YOj2QazmcqBYBMlk1uUO4HEUIoHC5y0c7Z+hUK42qufSpUgw4fdFculKuQSiERhByjWn60SikITKqVQpEkFrTUb/6yd4s7lyjdy0nsFiCaQzxXf3j/6uB5wP3f+nKP244o4UDGCoikAlBM6hcDoDpbNQOpvKVTIAjZezKIhGcnAG+GNwNI16YlEkU06nq7WG+NpJrfUgFstUq8Bs9haLoFgEZrO3WgXhGJIHIAwniwDEU9lcBrhskXSy6LUGoAiUSaGgAsLBSLkENBpbOJqLJyufNJSWy8DnS9VmyWIxNBiKZdMZKB5Bk+E8FOBMUtfY/UHDjnJnWr4xfsDHm08HgxqWemfmYoX9xqNPPP/jJ7/9ua9/9wtfe+hr35ynYqyHbNgo9Ev6HXtYVDNQMI/EpT2QYih80ec77Q5dDPjO+lynPUHZsGqtQ7eJs+6SHIddrv0u535nDaW+Y5ppE2fd67TvkXwH3RU5k/v8j1fqX3JerFrUB0GlNKxUhHXqiF0f8hh8Lp3ParAo5furi7zpidt8JuSzBcwqr/7SpTm1yfYtl7tu5WHULE/aFDGT3GeUGMxnbpcsbpIU1cfgYHXn2ovDP/qqra8xIez2CUkmHkbDajHzOzwioo+NtdJbQksDNj7JwG4wsa+bOXUmVoOFhbdyqXZht1lINAlbrKImp7DNwSXYZ3ssdJpP1OtdoDgFnTYu3inorJ2bmJjavK6dR3CLyB5xl0tIcgo6XfxO5zzGzcB42Fgfn+AREBx8nFWAN4s6I/t001LfyQxOTKljYN5c7eu45E0oxHPb0z2XosmdqS5h142l7jopg+BaGdAxO9wisltI8AgIbj7eycXa2Rgrs8083xZcHnAIei4nsVs9Nzd6m7ZHsaLupommV7cnSKa1OSmrR8Gk2hcHrXyKi0cxTLdpR26ZZ2nLRMqTX//55//j3Y9950bdr7of/dsnH/rTL3U/8Rh6m2Gbw2sZODmLKuhrWx0nuDYnHEsUIx9r5LabuW0mTquJjTVxSIppimJucuJq011/cOfDf/3Ln/zVC4985cZP7nzmlR8/xGh7w8wejC2OxQQ0D6PVNt/gE2PsnKaQmCzrvob90Vd9y5y09lJ7tpeI+pIBp/Jkz6FXnWyvc6fpFo0ynYp7nY43Xn2NRCSbjLYqABCc9Xgi0UTaF4yFI7GDo0OegH90chyLJ0tlACNZfyD6T6EU1FD6QYfUmsVbCin5/XGfPwJDWbfLj20nzk7PT03O3rrZXH/1Zh+1/2z/LOgJlbJlUAVwHA0H4iiUKxVBsQCSiUwoAMViGThVhKDi7wqltRcKR5JYHCmbK0NwNpFEP53g/Tccd6QgkIJBDaUZKJ2BkXwqnU9ms8kSFCnk0iAULiJ5EEgVkiUQz1WSEIASIBUHUOLdTMZAPFLNpYHfk0UhkIqDZAzASeBxohACHMGEK46gZZCAK6UiiIULoAzKaYCEIVABUX/Q4/KCCggEUtUKcHvhTxpKI5FMNgsiEdTnS+TzoFgCiUQKhpKVYuZ4Z3mBPerUHamPBAHdziTprVd+8dXzRUrnOz9mUt9Kmfbc56sTHVe7bzzX/PyDiyM3oqp512lP3jqTkNGKpjHHRlP4mAjJ+yHFkP+0275HdB502Q/I9iNqRDmmud2h38Jb9zodh12uA5LrgOQ96PQcdYXPB0ybeNM23r5H9h30lGXzvBd+stl8JaDcdZsuYjpVXKuJGrQBs9pulGqVx0GHWcSY7SNiN8XciF2fj3kVB2sBk9SnO/Vojv3a04jpMmK88KvPvPIju/LIYDyVXm7E7XJEcwys8sK2kP7EfZOPf9fPIAUFXR4+0cxs1c822litfh4hIOhy8/psvB6niOJf6w1sDDmXhw3cMTVrzLk6b14c0guwOu4tI7fZziM42YNO9rCNQ7Zx8WZWh3G+3cbFe8RdtYajWiOShY21cnC1NLM6zPMYDxtnm2o2TjZY51psrFYjs0nHatHzOwzCTq2o63gaz8K/MdX65tYETSqY3aL3n3BG5YvTRwzaJad/f6JjifyWjtPpW+0zMNpMjFYrs83Oxji5WBcP5+LhXFy8aR5rF1JNPOrxaPMC6W0h6e1F2q3V/pa9SaJrh6kWDmj5Pa6VISOP7BJTXXxyQEDN7PNH3rp2759/+6d3vXL/19/82z/6+S+//szrd/8M++D9hR1OUNitm8dpF3qXxrHLY1g1i6ybaVPRb6rp9UZGo53b7hYSnKLu0PqMXTTPvNV6/2e++tzdz//izuce/tKVB//iiRd+8ICQdNOzPO0TDjtmOuyTjc7pei+z0TPf6GFiJl64b/LKY0X1cURxbFdIvBa9VXGW8lp9RqX0YOtwffFsd8OmU4e8LpNGQyWRx0cnLi9ljDk2poMgFC3b7O7h0aGmloaGW3VTM3SZTOb1BWAYLVcAAudguIBAJRiuIFAFhqoIVIWhahKpxtFKHKnG0RpKa1VpIV+oxuIQDGUOD49ffvE1hUwJqiAVTfqd3vmpOWIr9ubVGx3N7dTOblwbfnxowmF2puJopQgKeZBFy4U8KOVBNlOpgfN//QRvJluqWZNicaSavRoEZzPZ3/2A86H7/xSlH1f8Y5TCSAaG8ikkn0rHfMliGiApEImWoSyIpoErno5nqtkUqMIgFy2XkqCUBLlouQqDYgJkwkWQBpAvU4FABQKwPwuyAI2X/YlsBgBfohCDgT+QS8PA70ik47mkPw7KVSSehJKpNJxPp6vVCohEy580lMKpIgKVIKgYj2cjETiRRHPZEqgCJBnDtjbsrQss6qOLHUHjlV8+/4u7L9enRlufFfa8pVsfSmnEqGEReDdBaB0x0As2ekTW6Tlqikk6curugroXuexOnFDiF73hs27vMaWmwGDbJzmOuz2SvgvxLf0W3nlEse2THHtE3wk1dEr1HlN8xzT7HjksG9Kutnv2unOSGc5zP9lqeSNhPE0FTX75RVipQhx2neRwb0N4sLM41k/dXBD5LYaI06yT7Bml+0GzzKM5jlvlkFPtVhwEdWcBjSRhUbvlJwG91KQ5cZjObcp99+VW4nKrpNizMwexP/wK55Wfm4ab4cU+11y7YeKmT9TpFRPk4/XqSbxmkmRi9/rXGdv9xMaHH/nlnXff/Qf/veHhXx2MDzg26eZlklHUZhZ1WPkU1VSHmYmz8wgecZdvkfp+eWphYy1sbK35qNbZW1tGdfKIDibGwWi3zbZY51os880mVrOe2aKab/as9+tFFAmDtDWGWR3E7dB7NyZ654nNG+MkqWDkYIokptTtDDVLZ3DKWZyJTbRzOx1cnIPTYWdjHMzWWtpY7RY2RsdsV89jtByCikM6n8PdHrjJJ715Nk+ScbpVvG4Fi6hmE0zCLtdyT2C1F9ke082Sz2enca81fvVzD9z9pV//8t63/v7u3/zqr7+53NIQE48a6c1GDlbKwfMH6407cy7xYFjcFxZ3B/idbna7Y77JyWpzcnDWeXJgZfZ4sLf+J489/Pl7fv13T/zmmy8+8Ln7yM+/YF6YcSzRLYJ+J7crxCU4Rq6B9V5EQFT0vtX6sztdO4ySWwVZVR6l1HBy5NPKvHqZRXa8KWRe7Kz6zFqT8tJnMycjAa1SNjo40FB/s6MD19aGaWvD0Ol0ArFDJpd43DaRmNfW2tjS0iQSCMPhaKUEEDiXjCFQKgcnC/FoDk6UCjmQK4BwPBOO53IlkCuCeCqbTGZTUAaGsqUigFPIgkjciSVmEdRqNAXdXpvWYNcZrSqdSnJ5urO/Kl6eHB4ntONaG5rNOkspW9YoDaAC4hFIeakuZCvJBFprna2p92Vz5ZolSwrKxOJwzfIskURrnEPThQ/Za/9/SVIUYLhQK0BrFt/v16PRGFQFwOnyX7veUAUgX6hmc+V05t0r18QXP2i5A79nFQDDpfelGf9lUhjvX/+DaskQVPzgs7z3dEUolcll/xEgq9UPYvVTlP5zo6Z2BN6b4EUyMJSFkCyULsBlUABICsSiRTQLEijwxpAIlEeS5aQPLSSrUCADBTKFZDXpQ3PxciFZTXiRCgKQUA4J5SoISHgRNFVJZUEiB5AicAez+QKIR8poqppOFtOJdCIUgRPJfDZXLIBICHE5kyjyiVsrraEUhkuJRK62hSCbKVUqgM1kXXnlRZdZHXYbfvWz7+okt2U7wmpEz+++pl3sS2vFCTlTu4TXLbWEJZS0picpxSbO2xLnbanzjsQxJrKHSR2RsvLBpLQ/KRsInfc69jutO0THAcVx3O047j5gXdNuYL2nvc4jinWLYN8l+A67PEddrn2KY7/LL+k3bxF8B33581nOcz85wtd7pJsX+ytBpTyq1kQNer9JY9ZKFgQzRtW506AO2Y1+q8alOw+YpH79mf503a89jVlkIcNlxKTwqS99aqlXJUs6jFa1xGuW+83SqFUW1hyl1Pup09Wzfkzrd+88J7wdnac4J9o8DExQRHIvkkK3e/3iPguDauEM6bgzXc+//r0/+bsHPvfQb77x8jf/4Buv3ffo1jDRtt4vZ9Vp+fXe22TnYqduvqXWcGTnEawc3PvrprrZFhMT8/72GBMTY+XgrCysh0/0cPHu2konH+cU4K18nJmH13IIej7FvTXl2WMrBKNrIwQWsWH45qsrfa3bo5jtkda9kdbzGbyGRbbyKf6VARuHaOdg7awOG6u9xlEXq83JanMIOuxCrHOx07tO82wMGMSUk6nW9d5rUg5JzuvSCCiGhR7TIk3FJeyOXBXjfkN//b65uieFpPYj3kLdi61/89nvP3T3U3d/5mvNjzypnxsJiAZMsy2oZFohwNMJz9v2Z/QzRPsUzjHT4Zptc822uhlNHmaLh41188j6GaJbNBO8vSLqIF259xHib26YRAexnQ0da1DHH7icxpo5nWE+KURvLQooKuIrrd/787nmZ4LKNbdm36+TmQ4OEnpT1KSJWbVu7eW2iHm0JgqY1U6dwqZVmDUyJBFRXJxNjg6trS67XQ6DXnt7fblSzNgtWotRlYbjbod5cnSoE4cVcnnlXAlNImgyDYoAVAAog0yqEA4kg8FkbZE1EE7VpkBLRQCqIJMuJGLJSqm8u7nVQ6EaNOqw16s8k7iNBp/FXMuIy50KhlLBUNjrnRubxLa0LfBEQo6Az+RSiF2Y5vZkHK6UQc0WNBCMBUPxQDAWi8OFIkhBmSoANY7WyFoqg2gM+uCi1Qex91EohaB8IonWOowQNP8uj+EsjOQCwVgVAEwHsQpAMBSPRFORaOp/VjN+//rvo7T2p38ZSt+/wgfJmkzmP/gs739XSKVyyQSaSRcqlY8CxKco/efGHTD0D2ulCJJGYQSF0xkom4MraagaDWbCwXQaAShaiibhBJRJoWU0B2q95nAGJOAymgMptBqHSkgWRJOFFFpNodVIIg9nQCyVj8M5fyQVh0r+IJrLgli0nE2DNFz2e8KlQhlUgcfjCwai1TII+pFE/JNYlaJwGYXLcKqYSOSSySyaLuRz5bOz84P93ZF+2vNPPWrXSUE2Ciqp1jeePJrv9O5PZlS8jJpTNvKBmZtVjMWPu5KnXeg5NSejZS5pyUNidBcHn3aXNGO+g87oeV/wrM+6QzRt4h0HFOsBVb2OVa5grQdU31mf65jq2CV5jroCx1T3Idm23ek6pLqOut1H3f7D/uzpLOuZB+U9mLRDZpAdZJ32gEwZMxqSHtvl8eb4cJfqYt+hlzl0lybFkUNz4jNKAgZJyHRhl+8FDBc+7YXxbN8pl8at1rDZYpRI3Bqp1yh16i+CDqVLe+yR7+RMF1nZzmFXc8M3/sfC678EJ4IIjyrrv+oUd1p4HQ5mu2mq7WK0Q4hpfvXeJ+//3KNPfPXWT75w9amvXfvpFx7kYNvt68Ons1dU/CuGhXcuZ181c9tqjUU1cYbaTK9+rtXGxbuEJLeIXNNncIvI75atPLyTi3WwsQ4uzsnDu/gEB59o5XUG10e0bJKCQZLOd20NtS31NO6MEyXMnpMZ4sFI2/kM3sCn6ThkPZNg5Xa5hd02NsHG7rAxMQ5mu5PZ6mK1udntLk6rcb5ex6w3sBstAoxZiNewMSfjDbd735pv/Q0f/+IZoyNwNOvamdibaFjueeOIfitzOW8W9yhEE4ujA/zxuWHCUNPLN84Eq8YFUXhTEFgcCa70mIX41d6XxIOvS3kEG7PLM0t2zxI8sx2e2Xb3XItrrtEx2xRbpDrYRO0U3jDf51/jxXY2nEtLypkpl3DGxOqziAe1XHJqb8rP7YJZXYkp3FHjcxMv/iQiW044z+2Gs5g7DyVOAAAgAElEQVTbGlMbgD8C2cwi+tAAoUUwNWSVn2QjnqBFY5SdRdwWl1mtlZ25rPocEg/7HGaDOhL06FWXsZAzErCrpKc2ozqPpuTnJzfeeZM5PQ3HYqACwl7/9trmkmBhcnj8xjt1Tbea+XxhMgltb++OjU2YTJaAL6hVa+AUZDEYZyYnIj7fxNDQYA81AyXMamXS70143UGbxanTOLRqj8ngt1r8dmvY6aJgcaR2DGtmRjjPXltYGqT1dmKJVouzVAZVAOwObxWAKgCSc3nNqiWeQGq0K1eAxery+SPZXLnG0Q854fwWlGaz1ZppWg2ltfNoDCpXQDiSDEeSdTcag6F4rSz2B6IfrHo/lO/T9IM//stQ+sFLJRK5SARNpQrJZL62Cfj9h0okMok4giK5UumjWPopSv+5cQcCVRGoUkMpjKRhJI0gaQTOxaOZRCSXiOTQRKGYKZcyhWIGKZcK4QScyle8MSieKcYzRW8MSuUrgSSaylesvnAeAH8C8SeQPAD2QBQtVRNJKJ3OBn1RUAFBP1IqgmikgKIAhgsImkPQTDgSQ5EclMr5PElQ+SRWpTWJNRQuv/f9tICmC1AqPTIy9qvHH/M6LKCaD7uMeunR0myP42C6oBfA0lnbepd/pyd1NpL5f9l77yDX7uvO89mzu94tj73jsWfstceqHVtWsAItWYGiLJFUpkhKoiyRlEiLlJj0+N7jy92vc84554zU6JxzQCNn3AjgArgROefQ6O67f1yyzZFMla3xjl0l/urUrQt04eJWoYFPfb/n/M5RDF6YJvLakbSiLy7rTiq6M+q+lKYnrmoPy9vUvBvEfn1Q2+fT9HrVPR51H7hZuz36JiXvIWXdjqMWy24tddziU3V7ZO3W7Wpsp5Y+6cD2613ybo+0J7DTO/bDR+G++ohF5cXBAAQge4dxhz0bcC0IRjdW+JBe4nKAjFVvA6VOs5IAJXbdvteiDtgMlEnhNpt8mNltxqwawG604IDFiUI0okO0RzZAjgEnNu1+BFHF9Ecsotivvd/4xMPDz38F7C48PZoIbnYrO6+CPT938so9KwP7Hc0//eIPvvzfvvvjh2t/8KmqZ/76xpf/y5emi4ttq93w3F3nfqFj/Q659sAmrrCLat69qZRjKrcNhkujmmfKuY2nmKACE5Rb+WUWXpmVX+4Q1uCieruwwSZosIlalH3Fku4C1WiVerLWIGyGl7rRpW5ssQucqbMvdDjXesy8OmSm2iFqRCbKMF6lbabcMVPumCkjZspJfhklKCeFpfRiuWOu2CooNAuLLLMV6GwlKKjST1fSO0OysXJx/euLLdeOJyqVgobDyfLNvjuy8SLFdOXxdL1xc1q5Jt4VzqhXluQinnV9TjfTpRqutM4177S9Lqx+1rhYBcxXOxc6PMJ250yDc6bOxa928irJyWLbWIGh5xotqvavdjhETcB4DTzdYp8fpBaHTMPVnpU+VNQA8mqg8XLzQAm7PSUvfq3uKw95tmbYoMUGSgC9BNVpPAbYfqgADndXJgeVO8tJtyPpduAmJaQ4RFTHZr3MaQOdNpA0GyiL0WpSokalC0dxxKCR7AIqCWUBHLDeYtQYFZKd5blVkWCir6e1uqq+tKSupLi9tkY4Nn68ta2RySZHRx7cu1tVVjo+PFRTUX71lVe6Wlru3rhRcPut1fn58qKCqtKi5TkRe5bbWBCTCECbAQY14ZDeZtJYDSqrQWMxamyAMR+LxL1u9iwHadWEGYl4XD0d7TPTQp8/0t0zqNUBG5t7MIJdsCzj9KXSea6Zn1pj5Fr65U5Zxum7hE3sXe7urzB44/FTztS9jEg0FY4kff4IZ/C2tnVzW4OOjuUXLBsKZX7hLbjgnnm3MP31UBp7B/+Xl/V64wwT8nrjoVAmFssnEuccX4PBdDCY5FTp+7nS//l1JRHhOJqLxTORRDKSSIYT6Ug8EwplYpGzszTLZtl0IBKh8ITLng4yp2c53OPOsawvHvPFYzmWxT3u1MW5Lx6j/L5INuOJRnzxWOIs74lG0tlUNOBi8+kAzbBnrIsOseesy5OOJdhAJBtN5QjGGYhEM9kzjzsYDiSzKZZzO3+DIppNxk45lHJfg3DsNBzLen1hnzd0dpr3u120A0tHfOxFtuTaCwpxnVfRH9WNhlUDp+BURjfh3+vwbLenFeMxyZD/oDdw3BdTDsTUfR5pk32nIqLr9co7dHMF860/mmt5Xi68b95rMu+1IDtN1oMW20GLda+BPGp1yzuZ42Zkvdy2W+eUdVn36tyKnoByABPV9D/9CDbSyqGUUMppldYDQG4L0ttWI5OskpiOtmlh7S6k3fbZtS6L0qrecegPXWad7mCThoFcKHKwunv/amFdcYtiX2nWaz0OyA6qHCYlCSopk8IPq2nFXt6qZx169XBj+bc/2/D0Zw+rX3fxmzIbPacrjd7JBzS/EeUNVfzo55/9w4cf/fMfP/PJtx7706ff+LvndJN97u1e+0IhKrp+2PEjVFBg4ZWaZ8qRqVJ0uuwdXlZZ+ZVcFRKXK0WmSjmzF5outorKzKJSs6DMIqhyiOrx2WZc0OLgtxoGy41DFehMo1Xcii20Ups9jrU27USxmV9t5VUzi63UXBMyUUbNNfnWuqxT5baZ/xGlvAoOpZ6VanqxHBeXOESluLgan2+wLbRY59uo7WFmb0rJa+RVv7HYft+0OiibbR+u+Fn7re8QkjFke3B3ompztKbnwSujVW8h24L9kWbr+pRO0AGI2wyCmoP+G+B8GbXebBfUOqZr7VM1+EwNLailBdXETLl9qsgzX+uYKbFMFTuEVY7ZWvNMOThZBk9XeFY7HcIaG7/GtdCq67jj5rXCnSWFD394qeQGa9XZ1XsWgyzkJqNuj0MFDFU3C3q7d+d4ZpXErleodlZNkt0AjgQJ1CDZDjHmqBtDtEdG+Q5l1nocAInqnBjgccARl522GPXSXcyo9hNWAjbsLYsH2xq66iu3F4QEbHDbEKcV8eFYPh5aEkw9uPkmpJHbYWB2ahzRa5RH+8mgTy8/MShkEY/zZHdrUTBj1CjZ0wykPsb0MhrSua2A1wZ5MNCDwS4MRrXyIGNXHGz7KTuBAl4CS/hdM+MjlZXVc/MrBYWlbe091TWN8wur/QOj8wurMIJpdUA2d5E/Y3OnbDJ1iprt+bO3UceR7JKjvwKlXm80GIpzji6XMU2mTrO5i0QyR1LuC5YdHBqHEYx7mErnf2HaK6cOw+FsKJS5TGe+W1n+GhzlLsi9SyiUcbkiOO51ODweT4y7fjCYdrkiLlfE44lEI6l06vTivUj6Pkr/2etKIppPRHPxWCaS4NrZp4PJTDCR8wez4WDmLM3mo2mHXq/ZXDLtzCHHS8erfBxWrYtGIfUBoj5YFY2SsOpgTXi8LmKzQcFwuxcHgyQ8O9HDnsdU+8uIfJsyKXCTXn14EvMlI6HTWIINxi8c7lCaZX2xRCiRiMXT8ViaPWdxm/M3DaWJaC4RzXEeL/fNCcdOw7HTTIa9YNlgMHyazU2Pj738wvOPf+Fz1fdfdet5fnUvddxMHzUkdH1n0Ng5MMnC/MBhb1Q6HJWP+E4GmKMO6riFlDSSJ/Vh/UAGmkiAEz51v1c14NMO4Sfd+pUqCf8+tNVAS3spaRd52E5L2p3HrcRhE3HY4pJ32w6a6JOOuGFc2Xer59ufp6b6zlyIA1J6jEbW47crVOq97ZHe5pOjZcqudqBSs3HfCuwzqJQAj0jTsQfT2PQnZo3MAQBmHfzWK7c/+VcPf/yDX3z2uy8dbG+4CMjjgChIQxtVtEEZgA1OvZzSHjo1O+e4JqZanbjx7PVP/nHf059H6q4nJspcfXes/UWEeHCro+P+D1770SMvPv2x7/zD57/Td+2GaboR4Rcyi6Xu5SpgqCCw3m+ZqeIc3ctuDFzG1Cas5rbBcE0b3i5BElYgs6WwqAQSlKKCSougzsZvss20YlNtqo4SeLSOmG2zCOr0IwWosMyxUosKS8CRe46ZckpYbRkvgofv0+I6/2qbg19p51XYeRWOmXLHTDk+/bYwJfkltun71pl7GO+BnV/qEFbZBLUovw6Yrj/pL4PEvdSB0HEg0i2PyGb7tavj6KHggFdfc/Ubk7UvLXa+uT18Tz/fJGj4+Vj5z+SCLsPCsGFxSM1v2+66c9R30zJfgfAL7aIah7COC0JY6+BX26fLsMkSePiee77es9yAzRRbZgqdSzXUfKVp7BbCL7TMFHlmaz38utPVoej8QOmjnxh89Vk2RMfNBqtKgpv0gFwJKbV7cxvDTR3s6WnC6TAcbesPt6waqRMxBAnUojsOkrDNKMEMx37cECJNJCwjwBOv3cAgOhLSMrCeRvQ0pPM7kCiFeW2gXa9IevCsn6JgrU0v8zvgEIE6TEqz5iTK2M4iHj9pTvmdKb/TDmijHtoBGz2EXXV8gBq0dhi4e+3nNhTyMw4a0ZGgkgSVNKymEDUOqBwmJQGqGauJMhsckIY0G+yQjraaCNToc5J1NfVl5TWra9s+f+TgUCoULSwurVdU1t27XzwxyT+/YPNnLOP0RWNpivaEwolLdcgRlPNIf4XBGw6n44lsMnXKWbvBUJxzej3eUP6MNRjheCJ77fptuULr9YXDkWQyecEFh+dQKOP3J73eeDCYjkRy70bpu33mf1GEw9lgMM3RlEOpw+ExmymKCvj9yUAg5XSGcdyL416K8gUDsWQi+36u9H9+XUlFclzvwEgiHUymA6m0P5ULJPP+cM7nS5wm8ml/EDzYPpjpV4p6gYUe21L/SW9xYH/aNN0ITDf696elvcX2xV5yZWDq7o9ymuW9trsH7fdy2hXe/RccayNyQbd0fly9udRYXJwJpSgieHrOeiJnyQvWTHupQCjHsslszsl4k5FULpn/TZuPmIjm4pEsV3z0ticTz0fi+WyeBSELe8H6PP6utvbJ0ZGfvvijNeGATTboVnfkbGMsORFU19k27xC7BQFpXeCkOa7pj2mHndJO20GTXdLs1Hb7TQPkUbP7pNMt73bJe92KAeqkB9xskImK9CvVyE4Tttdq3mmw7TQ5pZ1+Ra9L1sWcdLjk3YSkDT9syZuF2/U/7XvqC37xeBCRw5pDp06XxBxeEN6dn91aFlG40UXqCKvEQ6hCLoPLKsUM2wR45ME0DKKLUDhjxQCl6flnfvroI9/76F899tDHH13bWHbgJsZqoo1qr07tVMgCRp0PMQDyLbdNzcBHAWCXBQ/g/qqBb3y29aEPiL75OVvltcBUY3B1GN+YORzvme9sm66r0okG6Z0hYqnCNPIaOVPgEjSY+zvNgz2kqIMr2eX2lRJz9TZhNTpdZhotRKfLuNTpu1UpMlcCzRWDwlJYWGnh12O8ZmyqzTreulX6pqz5nn2m0bXUZhdWWAWFVnEByruNTdx3CSsJXql59B42XuSYKXPMlBH8Si5wXgWHUo6mBK+U5JeQwlJKWEGJa2hxAyVusc+2W0RdhqlWQdm1wXuvihqLJmsLaq7/pK3w6sZkGyabtxxNHkwVW3fblfz7w/e/tdL+6mLbm/vjtX0PXhe1lIibCgbuPCfpu+NZb0Km79vnqh0LDcRSE77YaBc32AS1GK/aOlOFC2rg0UJ4rICaq3AvVztmizDBPWKhGBDcZlYq3dMldM/9+HTL9s2fNH7v8QuLNo3DhEHpt6C7wrmh+ta+2nbxuEgnUVIIAimOTzaWPBicD7txQG3RSMzqQy9mpCAFBcucZoXXovLZtW6zDFVvk0a5E9XjejmqOnLBOp8NxPVy/dG6G9Hb9Cd2rYSG1S5YYzdIcYOEhpVxp/VgSeCzgbDiwHC0HaasmoMNHNIjGhlthdlMPOwizUYdaUEWRDzR1EiQhF1mDQnKGUTltmjdFr0bM/gcAAlpcFgTYqxmvRQzKUlUZwPVTsJaW13X2tYdi2c4ziVTpxYrHo4k5+ZXbt8pbGrusNmpcCTJ0TSdOeMI9M9HaTbLptJ5rk0g1xowEIx5fWEEtV2wbCAY49zd53/0kzt3H1yw7C+YxuFwNhBI+XyJQCDFjdm5rHv69VCaSJxHIjkOpbFYPhLJeTwxgvDhuJcgfBQVoKgAQfjeCY+T8YWCsVzuvRj5Pkr/uevKu7oGJiOJZDCZDiRz/uR59JQNxM4vzlk2nSG0J9D6tOtwKiGdCC63nu31RRYb87u9+d3eyGLj2V5fdKkpsdrKSsf8szX53d7TnR6vsIo9GvIttjpW+pGNSd0q/8FrP81Hk25XKH/BUoGML83qMTJ6euaPxGHEHA1HLnLn+fTZbxpK47FcLJqNRt62d2LJ82jiLBLPZ05ZxunLZs4uzthULDrY06lTSimLMkbsAPsN4E6Vz9gdgzuTUGsGaY9q66Kapqim1S1twfZqrXt1lKrbC4z4obE4PBnUDXkUPW55t085ENQM+1XDXtWQTz1s3W2R8QsOJm4YFsucsh6vshc/aGbkPZS8h1B0YvuNLLa4XfrjwWe+GFjjBTBNxOdwm0DT2nYSJ6d7OoXjfW4G3lqd4I01r88PoIYdxiJzYSqnWQmrdlH1MayWImp11BO89fO7T339h489/PTNa0VyxTFFgHajEtfKQ4DBrVK49WoPrPc4AEh/QGNKn1kaUG2wDMjqjvauvVz+wf9n/BsPTz37qLThRmB/2rk/Y9uaYg559pWOwG4HM19gn7yOj931TjfF54R+wQwj7sBFtXZBtV1Ug4vr3vY2x4vgyRKLoMourrPN1tpma/H5BmKh2T5fa1+pxZYrsYUa+3wtOddCzbaTgk6K1wH1Vapb7oF9RS5Rk2eunhFXuBbKnfNl9pkCaq7COlNonn5AzddapkuBsQJ6scEhrHIIqxz8SpxXgU+X49OV5FQlPl1Ji2oIfoV9qgibKMQmi238Gttsu3W+Tz7RrOF3mxaGVcLexa6K3vKrXeU3RlsKx9rulV59cnO81H48pBaVQat1jv0uw3KzYq5zqbdqsbt2rrlENdFEr3dbePddy+WGibsmfolZXGWff7vpBC1ucM814YIqeq6WXqixz5aiM/dQ3l1yvtS/WevbqrdM3g7zq1mFyFT91v1P/wU43ZuxGmyaYx9uUW1vN9x7gKtNWU/oPJ5lMAeiUbksICA7JEBNmLLajQoSVDOIhobVuEnqtqp9dp0TljGo3GdVM6iCAVU0pLNrZYRJHbIjuEmJyg9cZgNpVHqshgBmoiCFE1J7Mb0LUVlUexblARt2k0ZlAAMDDtiikYQpi+5oK8Rg0u1VBoPk+1uoTnMajxxtrY/2tCe9dr/dyHHUY9UxiAYHFZeBaCWIVuLETBaDLOEjEIOqsqhScqj0usIBf/xEosQJZ+6UDYZii6sb1fVNbe3dZ+fsBctazPaLc9brCfr9cX8oGY5lE4l8MnnGRSyZj8RzkXguEs+H3xWReD4ROwv5E15XOORPZJL5sxybSeYj4WQue4EiNifjS6fyydRpOJx+442biUT+Hb14dilAo9HTUDT3r4XSdJqNxfKhUIbTuLFY3u9P0nTQ641TVMBmc2GYkyB8DBNimBBF+Rx22uMOpJK59/B4z38p3l//9LoSTJyH4/lYPJ2IxRPxcDweDScy/uQ5GWWJCOsMn55m87JVgXVr3L3ekdpuSa81plfr0qt1qZXa1Eotd55Zq8+uN2TXGzJr9Zd/TS7XxJbr04cjnu1R2+ZMb9EtNpNJRDORFBtIsTqUzLKsEbY89fR3n3vuubGhQfb8NOTzx2P/fw+O/3cV/7i/+11f1PNIPB+OZT3e0Pk5CwLGs1yyrbFaONkvO1hQ7M9MdN9566WHK248ql4qjZgGgprmiLqRPihKGdsj2raAtpORteMnnR7TOKUZJBSdbm2vT9PrkXZ4D9sDR52evXZivcF93EUctJl3GoCNGnS7npC0+dT9QcMoIe/VbtWatV3Qdg2rnDy69f35N7/vlyxYUakRVLpMSNbCeAzgrojXXvugtOD1troHMyOdC/zhJf7IwZrQapRGaCsOqGwGOaI6JkBN3EUYZcf1JUXt1dWMBSVQPYFoKUhDA2rG9E6AGkwvo1FNkITDOOABZE71YQxQsHbAKx6bf+O5ws998MEXP9Tx3GOCt56Ttd6nZ9tNfYXkVHlovjY4W0GPFRD9910jlQF+C8mrdvArcUEVLqq2C6qtMxXQRLFxpACZqUT4Vaio1iKuN8/Vo+I6SFgL8MttS9WI4AG+UE3MV4Fj961T5Yyo0TxcRk3VMVMNzGSdY7gC63tg7S0kR8rpmUqzsAiaLYREJdBsBTRbA8zWgeJ6WFwLCirsS/XEXC06XoKNlXuErX5RNzXZ7JrrsUxUuQRlXlGxeeQqMnkPW203rfTOtt0fr34TXO7FtgYOx0qBrX75+mBL5asD7beXBS2Djbd5nQ/0GyOGjX7lUtPOVMl4w8+X+itnWyrNa0Jyc5JebbfwrmGC68bJO5CgDBNX47NVTlGNX1wbEFa6p0ucgjIbvwjmFZh4hSZeISIoJRbrwuvtQVFNRFDjn6xBOwsan/j86NXnWZsxYJRFHajdqNydnxWNDbnMKIOAsFqOaGQeDKRg3fHanEGyzaB6h0npNBvsRgWN6GhUQ6MaClHTsJqEVRSkImEVDemcZsBtBhnURJi0DpOKgfVuK0CBWhxQOYwKm1GKm5QkrHJb9D6biTCpKVDLwHoa1pKgmgBUBKimER2XdrWDasoCEChAW9Dhzo6ohyZAjcuq99iMTovOadG5rSburhhU78EAp9lAgGqn2RAkUJfFCKuVk51jDQ9aDBLQaff5neHzM9ZmJ+0kVVxZ3jM0kMplvX6f2+1OJ1Mnh0ev/uyV7f2jRDYfjCVx2nXGsp5A+Ixlo6mcNxSLZE5d4UTk9IKJJW2+YIxlA8l8yJ1mo6zT7E35MmyevUieh5jg8c7x3ub+g7tFc6Kl61dvSY5V7DmrlJvaW4fYc9bnSYaDp/k86/OlAqFcKsMGo/lgJBuMZENRrhzpV01B/9XxXuXB6TQbieTc7ihB+Ox2N0dTtztKUz6XM8hesOwFe3p6xlHh4uLsfXz+S9cVf/IimMjH4ulULJqOhVKxcCSR9ifPnSmWSrKuBJs/Y1WbYnxnPLTVkt9pSizXJFdq02v1mfWGzHpDeq0+uVKbWK65fJharUut1nFPxlbq/PMNzoV2ZK5vuOwmGwsn4xlfKOsMn2ZZ1hVMfvDDH79y5bc/8Od/9h+uXLnx81dDPu9vJErTkXiGm8nDoTQczzNM4IJlEQhl2fPTVIxl08V33ujvqOjvLO5ovD43WYkbRRlyPYlOB1Tt7uNq50FpytDmPanxyZuw3Sr7YaNbM+jUDPjAUZ9p0KPqZg6bmO0673aDd7fRvdfIHDa7ZB1OdTcubzPv10HbVeh2NbpXT2kGUXkXgY5Y9+rYg6Gdl76+dv9F8kRsw9WIA2RMqE8Nu7UmF2jwOYxhj9lLoAwGWU1q1dF2W03x5vwMZTbgsNaiPfHaQBpW2/QnAQeYcGEBB+i3Awyio2EtBWlIUH0ZFKSxG+QEoHKiepfZQIJqm15GguqI1cBiGtaqZE1HxNLIXOHPKr71t/ce+WD5Vz4y9g9fW3nr73UNb9IjZVF+fYxfF5iocI2W+MUNjLCGElY7xXWepVb3YotdUA2PF+Nv69F6TFxvn290LLWQq+3O9XYrvwyduk/MV9BLtWZekU1YQc7XQRMPSFEdLW5yiZtdohYXr9E13ejntfhnWzB+CSosMovK0dlqZLYWma2FxbWwuBKdK7culGLiYnKugpmvw8bKoZ4H1pFa23SHbbrBJ6oMigq9s/eCW3XwYoOg6dpKX9nxZAO9M2RbajbxysClps3RksG615anqhVbw/MD9fPddQrxqELcp1roUMw3LfYViNsfCOqLlprKzeIB41ipe6mImb/rXWuw8MqgsUJuP6tl7C4+UxhcrSWEDxhxGS4qNU8/sAsqXSut+GwD0H/POVzGbg3b+kqKvvjBgVefYe06NkR7jHLoeGdxakg8MaSR7IYZB2U24ICKAxWN6NT7a4jqyG01cZyzGeQ0ouOCgrVckJCGhLQkpGdQk8sMM6iJAHU4oKURo9sKkZCWADVcahMHVBSs5UBIgVoGNjoRAwPruf8KClEzZi1l1pv1Uo8DxoxqH2mT7W43VZTnYxEcUNOIjkH1JKQhIY3TbHCaDdyJ1wa6rSYS0lCw1m01UbAWUsmkOyeVxY3SA3XYGw95I5l49uRYOj46VlVV0dHRNjU53tLUfHx4lIzGdje36mvrrl1/K32aP2PZRDJ9ccGenp4hsDWZyJ7m2Hgi6wvG4pl8MscmTtk0y3qDqVyczUdZNs+GXNGwJ+IhPZMjExUlpZ2tbZPjEwtzi4sLq89879mJcd7khPDln1yNh89yKTbgSTnpSDLJxpLnTnfcG0xFk+ex1EU8dRFLnicT+XgsF49ko5F/8Y/he6GUU6hcwRGOey9pSji8TibwNkpzbyvTfxql71ma9P5i2V9CaTgVi8bi6UDy3JlkqTjrip3n8+eKdYFtc8S32pTcbAgvN4TXWqIbbfGtjvhWR3SjLbzWElxpim22xzbboxttkfXWyHpreK0ltNocWm1Obvf613qx5cHewqtsPJKMJBJpNpplUbtXD2D/5//1+z6fL3+a/cCf/vF//v3fzaYz76OUi0AgkUjmzvOsBTVnE1HKjrKniYuM53hnTDBeDCmnEtSObr1eu1CSNI2mjYPBk8Y80Oc+rAqrmi2bRYSkzqNpD4JDLvUAJe2y7zUSWzXEehm9UercLfdIqpHNAvSgzCatsSkarJI6ZK8S3igFN8r0a9X6nXpI0QGvV2Xmmia//ZC04aZbuWrGlBYScQKI40iN7B7ZVDLGrHbhBhzRYYAmyNhTQVd/a410Z9llAzGT0mk2+B0wBams2mOXWee3AySotGqP3wulFKRxGIMPlRIAACAASURBVBUOo4J7iJuUuElJg3LSeOBHjiNWWQqTs7SBJXRh6TIw1TJ97bm27z5y/1P/reCTf9Lz9Yd23vg+Unnd3nqfGa8gJsuIyTJquoIWVNOCapJXiU+XWyeKsckS+1SFnVdl51XZZiqtU+WWyRJGWG2bKsJmisGpB6qR21r+A3ChSi0sPhi+dTJ2VzX1wDhTjsxUWqaqsYkqx3iZc7LMPVnqna70zlS7+NVOQRUlKHWICjDhW/j8TVTwOia+7t4os80WwFP33KttlLjPMdPinCzxTN7x8e+F1uoQYd1i/fXhey/JBqod/GZ0qNgz1+Bb69KOVxlmW3XiOv1sw1z1rbmKe8bJftvCuHmh1yBsJPbHweWBvb7G1eZKYnkSn+t0L9ca+17zCGvIyTLHVBk+W2WZr9CJCtTie8ByiXHmDjR2mxwuCE1VRaZrnWMV5tFSdKTEw2uQlL9y81N/slV5jbUoIprdMKhwKA5HmmtmR/tNcknETZCIkUENHquJhrUcmYwnOxbtiQcDSEhDgOp3o/SXaUojeqcZoBE9AWoIUEMjepfFRME6CtZx/KNgLYdDp9lAQzoGNrpQoxMx0LCWhrU0qmHMWidmAlWHbjuEGdUuu5k3PCgcG/URDgrWcXTHARUOqLjr0IiOANUui9FlMXJ3SCM6EtJARoV4c7Wssx3zucOZtHBWNNTTM9LRNd3Tb1Xr+uubhpo7+IMTE31jvAl+e1tPR3tPaUllwBeOBmKpcMqLu1P+eIQOHi3tngdyLohKMFE2yZ4F8mFHyGP1xv2pVJa1u72wHZ9dXWkf6K3raCitKZmenXL5GYywkC7c5XdCFvj6W9fmFubfvPpWOnrK5lk2x0Z8qWyKzWbYcDjrDcRjyfxlJBP5RPw0FjmNRf7F803fC6Wce5xInIdCGYYJ2e1uh8NDkn475qIp37tRenFx8U+buu+j9Feuf0RpIv4/oNSdZOk4643mz07zijW+dX3IvdQYXasPrjYH1tsiG53hrc7oZldosyO01u5fa41sdIY2OyIbncGN9vB6R2C9LbTWHlprZ2ZrY7sj2PLg7lgHm4qx5yzDhChvPM+ykAWPJzIURbHs+Z/98R99/fHH3E7XbzBKc+FE7hKlZ2esA2dCgSh7wYY8ntNU/Nbrr15/9bmOpqunMZXNwCt789GZxhfChomoZojYrE4oOlhwyHtYndJ34NtFjKTKq66Pw/1hw4hfNeyX9URUXRF5i++42iOpdCtraXW9VV6JSqusilq7shE7rkG3S4HVIvlsoWK5XLNTg203esfK2v/ug9BIbRyVSE6WT1SHZpmKkmoZtY4yqDDDCajdcztgVK8gzSbSbBrubJDuLJOonrYYORuQABQBB+i26EHZDqLcj1Doe6GUE6O4SUlBGgbRcec4qLAYDy2mA1i5CUqXXaajPGU6tan98jUW07BmNSvfso21L7z546avfbb64Y/VfuljHd/5NO+1rx1XvQz33XOMl1HTVR5RQ2ixJTDXGJhr9IsbPMJaJ6+KmirHx0tsYw9cwmpSUOkQVFh4pdBMCSKuhBeq9aLSw5Hbx2N35dMP9KJyeKHWulBvmau1CypdE2X+8dLgZGV4ujo4U+3nl3t4hYzgFi2+4Vm5DU2/rBr5sVl8GxEXmvjF5Fo3tTZqnmlzTBS7+IXMzF3LxB3jdJVJ1D5beV03Ws8ImvGh4pCwLjjXYhout8y2ALxi40ThVs21rYpbwGCbXTgE89p0kzW7fQ92+isFtQ/QlVl8c962OGKcqiDnatDhAo+owbXQaBaUmcRl5q16aKNKIbhrWaikF2qC4obgVLWzt4jofuCfrMuuDh5VvPqzj/yn1ZLXWcaY1O9HTdI0DirXF+Tbyxa90gEbnVYIUhwGHWjAAftsIActg2QbkO1RsJZB9QSo5gxVjmG/QFMCVFOwlkENNKIjIe07ZDXSiJ5G9NyrLl9IwToaMjCwkYH1nMfLoZRGNU7MhJkUNkBFIkZEp5zs77UBJoPsxGk2uixGBtVT72CeO7HqpBSsdZoN3D1wiLVb9NvyvZt1RY1DHQ09TTfuXOvpbttbW0Y0KieKbgrFIZzJeCMr/KXKgqq+tsGNpZ18+szLeNgz9mjj4M2X3qi8W7rBW7z+/KsNt8vbCxvki4ek2pp0hNg0y8ZY9pTNs+zy0e5Lb71R0lgxKhrtn+6VGY9ipz6ZZt/pxUBYaTZrE1GPBTG4SPvrP3mRzbAxV4RNs/FAgsAoCnelU3m73RkMJgPhVCiaiUazsVguEX+nc8u/0k8Nt6k0mbyIx884bUqSfoLw2TEXRXrfjdKzs7P3UfprrCuBxDsojcXT0SiH0mAi70+zvjQbTZ6zF3n91qxje8y31hbdaIpttkc22sKrbcHV5tBKa2itJbreEd1sj653RDbaImvt4fVW7hhebQuttbEaPj7b5D8WvfHtR9hsDFCp2Qs2lWPPWNaGu7hP53f+9//jt65cOTvNp5OZ37Cyo9y7EqW5cOIfaWqzMRcXLGFn0skce8ZOj47f+flV+d4KBiyrD7uWpu5Nt728PXbLJe+P68Yca1URSVtO0+s/qM4Y2p0HxeTefbesNGJoSZlG4+qxiLwnJGv1HtdQe8W23ULrYQlyUm48LjOd1JiVTTZ5k/Wo2rZXbt+vwqXtlsMW9KgloZ909Be0Pf5RYq4v61DptDs7e8uylTX8WBVBLGEb4sYMjF3npyyUBaAsgHx/Y5E3srssVOyvOTGAs91oWM0gGieq9WJGvx1wW/TvhVLueQbROVE9DWsdRgVuUtKw1olq/Vajz2JwggpKf+IynoQhVRzVJFFtSHsU1hyymJ4NUazPFlftIoL+zfLXhl58rPCRP7/z6f/a/OTHxdeeOip/WVbzin24GB8qJoaLmNFS73RlWFSfWGhJrnaAg3ct06W4oIrkuucLqqChe8qON60zZSi/DBaWo/PV8GodvNEAbNQjyzU4r9Q9XeKZKffxyvz8ci+/xMO/7xLcZkS3CNFNdOZNTFxErbfAs03a6Vbr6pRpfhReHCCWmpzLVdRCCcQrUPOrDEs9e4PV0qEq13yHT1jnnCzxzdZbp2vByTLHQql3s86z3GUarNqueIt/6yfDN743Xvg8r+7nc50lc90tdumRZnFuvr1mo6/Ur+BZxPX0aqtlsVY9eU87ed+xWOtZbaTEVfhsFTZbBQhKYWFleK0nM9eDFr42/OWHCh/+kGGihXVovNKVqEnChigPoiUh7eYc3wEbGQwKkBgg299fEGwLJ0J2MOCAcUClP95S7a3ajQqvDbzUlP8kTXFARcIqCtZSiJp75lI40oiOQQ1Os5FBDTSip2AdCWlpyECBegrUUqCWQykJq0hY5YDUjNVIono7oIW1ip2lBeXBPmVGCFDzDq31nM3LyVNML+NQyulR7pyxGr2UWcgfammrbGwtX9oSUUG7xYnqrXrMaYOtkF6vn+PPOs1UFA8qFo4Lf3bbhbvy+bzVjL360iu769sYgE72jbBZVrFzIhqcaSlvvPri6yMdQ2zinE2xsBGxkdikeOJ26Vvr+wu+KGnG1Dih9/sQxfEyqj/02PR+u/Fokcdmw2zY03Dnpmx9q7+hfU2w4LZRbJ6NeCOZ1GkuexEMxUPhRDicjkazMa47xL8qSi9bBnITvaLRU683TtNBEvddqtL8KcuybD6ffx+lv8a6RGkmEUumYtFULB6Lp8OJXCB5HkieRxNZ9vxUvymyb4+71trDG83Jzbb4RlNstSm8UhdZboiuNSTWW5JbLfG15th64y8e11rt02XejX5Q3LXSW3sedLFn507G5wsmfMFELJ5hL9jf+73/+7euXMmmMwzlzGXPY79ZKH2bpr+M0lTq3OuN+j1RCnclgknhpPDBjfsmuYQ3VFZ+64kbL/xtV+kzmoUqr2ooaRw5h8ej0takoiUua8zp2+PqBvvGLa+0LKxqCMk6Q5JO9149vlZqWyuwbxfbDqvR43qbpteiHbCbRp3wlNM4TEhaqMNaj6zZpexySDpse815A19e+crA3/+de2smgSlcNKRSHao2N3GpKgTBbkhvM0oxSKqRbNshXZCxg+oTRHtytDE/M9SpO9nx2SEa0TGIhgAUVu0xCSoZRIOqDt4LpZdAdaJ6AlBhOqnDqHDBurANdgEaSq9wmtRuUE3qpBbZHny85QbVflTvR7WEXgKfbCLSDSeoOMVNLHLM0hqW0eUkIknDzf4fP9bw5EOt3/3b5m9/cvSFL23ffx7uuOUar/RN17rGK8mhEr+wObrU5RM0MZM1Xn4jM1WF9N4Dum9S/CpcUGUXVliE5bCwDBCV6kUlJmGRTVRCCIpIfhHNL2J4JU5+sZNf5BQ+oEXF0NhtM7+SXB2UDbf23Xyr9uU322/cW+9vx7amXFt94PQ9M+8+sVYPLrfJ+E1LrQWi8tetkzWB2QZ88J5PVO1d6sIEVcDYNYx/N7HTG1kbcIu7XQu9xGK763DMsNhnOVw5mV3oKWkcrW4bra7Zn+zeHCwFVloU/GI1r9iyWIsv1GGTJeR4aWiuiZisQCZKrLN11HIHMFy6dP37Y9/8XPdXPwOMt51ZFWmzPALJg6jaBantRuXs5NBIb7sV1LkdKGZUGyQ7e+Lp9elBwiALk2YS0sDKQ+XuCpf/xgEV583+Mk1pRMdV0pKwikLUnL68pCyN6DhtysW7UUqY1CSguUQpASlR3QltMURcdlApcTssqE5TU/SATSWsOplVJ+Xqni4l8tvJV7OBE6ycx0tCGhrR0bA2TJqTfpIhAbcX80YILSpXQCc6i8bhwTHCOjM1fby1H6dDHpCqvVcxNjAk4M/UVJQvz8/ZUUvcF/TYSQK2kIgtSHkS3rDyQN7b1ttS39pc19JcW19+92b5rTfmhrtNh+tZp5UNMz6DNOcAWK8DXBawpDlrUl1Aenpj+VyvPQMhfkv70dJqR2XNd7/6zaP1bTZ7zp5ekDgTj2XiiWw8fppI5LkK3kTs7NfYZH9Z+vsLwe0x5bRpOs1yVUgeT8zjijqZwPkZy16w52cs+z5Kf911WcHLoTSeiMXjsXQkngtEsoFoOhpJsqdZ3YbQujVOrnb511qTG03p9drUSm1ipSq5XJNcrc6s1Wc26tKrdam1ml84xtcafSutgf1xeHFA1Fp+GnCyudNIOJE7ZYOh+PkF+xf//UO/deW3jXoTe8F63AGCdP0mojSWewelmXAiwwE1m2Xj8dN4JMtt6NpbOzbJwK66JtmWsKfm6o6g/tR5FDTy4fUa+qDefVgVVzSET6oy2ua0pukM6kEWbvqkdUFZU0TektV2J5Xtrr0qZr8uoOnzG6cdah5wMrO71LPKa5Ku9tqkY075EHPYTOzWWHZrHQfN9rWGlGSU/8oTy3f+Iarc8IAS3KaDAZVdowoAYNxiDlkg2qIjrFoC1TttsNMGo3qFWS/TSrZ7m6v2VkRuq8mskVCQKkTAFKTCTfKAA/wVBi9XvXnp7tr0Mg6luFLi1quCiDEAGxijitQrXLDOb4cMkm1IfWRD1ITNSDhMmEULggpYux8xHUblq3H5KgsdspSetSuSJ3M2Yddu9bWpN75b+bWPX/3Yf77+8T9s+PrH5t/8nq7qTW9bSbK33t1WQrQ9CEw1+kStBK+Wmmuwi2pIca1zod4zW+vmV7gnS/2TZV5emV1chIjvo6ICC78A4xfZ+aWkoJwU1dALbRZRl2V+ZrWl82ePPf+ZP/nyQ3/0xEd+73MFP3xRMtDgXOoER+6gY3foxXrzYrtG0L7UdG+l6ho5Ux+ZbSAGblOj9x2TVZbJMvdcFTp0g5oqc4wV4+Mlrtk6cLRAM1Kmm+49Gp6qe6X8m3/1rVe/+nLTz4s2+rt4jbfWJh+Ie944GrztXGoLLXfhYxXYUIlP1OwXtmaW+vMLA0jjvZ6nHi5+7CPbHXfZEMCG7QFAliZB8HiVQTRxLzHe1z7Y1RJwkyE3aVQcLfMnUOVxzktm3XbapHCZDQSoJkC1/ngLVh6SkAaQ7dkMcq7e55dp6gDkOCgjIDmFKLmsJycT3wktV5pEwQYuGNhIgXoS0FDg254EhagJSGkxyByQOkBZUK086qFxGCy7e8cGGElIy7HzMmNqNyoIUP0u01h7yVcS0jgMShJUB3GEANWAfAfVHdsgBWUz0jhk0ssgSEvR9o2tVYyw+cOhE5m0+P7tmdH+oc4WNh1nLKhsc+MiGtHs7yXdbrvJBKlVLrsDNhiW5sS8yYmZnt7ggdQ7txpe2mL44uzWHitVOgbHzJ29SHOHrb33+Hah4Icvrvzk9dYvPN746S82PP7Erae+d+vFn7z01HfuvvI6m8llQzErZE7EkvFYOh7LXKI0kTiPxy/i8Yt/RZRetm6Ivat9YDScc7tC3AiBi3OWZdl8Pv9+2dGvsa5w9aKxeCYeSydiyUQsyU0WDMeysXgmGU+xZ6fGnXlsT0hujfi3+8JrLYm1hsRqY3K9MbnWxJ3HV+sTq43c+buPkfXWyMGwbbUf2+VXXn3hIhagbLZUMpdI5i5Ydmf74Pd+9/f/8A/+6Leu/PaVK//b7/7HP/D74//WYPv3gNJMOJEjCM/ZGeukgtHgacKfZ0/Zixi7MLF456VXLPLDDAUBOxPITnfIOBbRd4bVdUFFhXP/XkJb7zupOoWGVTNvOQ87XAfNvqOanL49q+twHVQ7tuppyaB5f0oyN/bit7/xqb/8y7/8wz987mtfEneUkkfjAfkguVfvOGwIagdD+z2Zo/H+5x9XdpbmzUpcf2A2yhyozg2baI2KUJyQOrkDUtpRlQPWAiqJTrrvtMEeB5wOMrMT/Yfrc2HKwhm8NKzGdBInqvXZTL9ClXIEJUE1g+jefU6ZFE5QRZkUuF7KgCq3RY8DKpNi30+bSasRARSwSW41awkHQJKoEwdp3VEYkCZhZUh/6DxepfbnfScrKd0uSxtZxsgSOta4614a2a+71fvCN6sf/XjZh/909LHPzj7z9d2rz2MdpfhwjaHrvrG3wNR33zxSRE1WeiYrvaOlgcHiyGCpf7IEExeZFu4Ds/cBfgHCK+I69xKiZuNIPbUiJDf2O65WfvoP/u6RD7zw/GOtX/3o6x/9nT/ufP15+2yrf63VtVSDCEoV09XauW5+9fWNlruUuCW01Ozml9C8EjO/0r3Z7VxuAobvkoJKbKLQPHbTvVjhEJfhK93HA131L99/9M+e+P5Drz3518995xPfqvjpS6bNCWHX9dm217Y6rmmHHmDj1dREnU/QmloY8AzXM91VGz/7Qd3n/3rq1WfCink2ZmKwvRgFOLRHDqPMbTXZQLVKsiPZ3zRqZH4XgQJa0gpYjQoXanTBuhRlYQClVXtiNyrcVhMg2zOe7KDqY+nmgkm6y6H0kqbvRqkDkOKggivE5f7EcZQA1VwhEgHqOJrSiNGFAgxspEAtDem4+m3GrCVhFYnqMJMC1UkZCxhkcLNeu8Tn9bU0RWjMawNdFiNXXWw3KmwGOadBLzsfXQYF69xWyHiy70KBOIXZVBJcK/OjeodWot9fpWCtQbGXTftXN8RLW+KJuQmjWUfjEKI98WAgCWiSlIPUqpw6TZ4iSak8BqN+vTEMQC6tgVZpI4jFurGzeKdUUlQ3+fyrg997ofWr37n14U9X/O2jlZ95rPgTnxf86JWer35n6pkXt964c3CjwDsw2f/3Ly63dm5MTS+NjI20tOaDkfNEMhtPJ+OpUCAaCsY4g/edNg5sIsH+a6GUM3g5mgaDaW7jaSyWTyUuvJ7IaY7lPF72fZT+uusKN2g3Fs9wjRriMW7+bS4SyaRT+Wwiw56dSleE4PYsuDpmXx0ilzoCm73etZ7Y/nBsf9S71hXY7GcWW/0bfcGtPt96r3+jx7fe617pcK90UcudJl6DSzILbfMlC9PsWZY9v/B6goFgLJPOHx9KR4ZGp0YnR4fHensG19f3vYF/b1Pm/xfFL6E0E41mPZ6Yz5WIBM7YHJsOsoNNgi989GsFPyupv1kx29kL7S2lsH3tUoVP2xIDGrPmRp+qyK+qCqnbYvqxsJZP7E4QO715qC8gLUnpmv3SZnSlLqRdNq0tvPXcT5/+wve/+ZkffO/vnv/aJx69+vRTwMpo1jSPLJSaNyvtWzWJnR6PsKXo0Y9hcyNJi8YJK22AEoe1DKil9SqnTsUYVTiscZi1VpMS1SucNpiyAGGnbWao83B9jrGa3lYhoJIElQSguAyX2eBE9QyioyANAahwk9JhVNgNcgrSWLUnDKJzmQ1m9bFNL2MQHaI9sqJyi1WJWZUoIjXDUodZiVs0dlgJKPc8GOC3Q7hebpYdICd7Do0saAWdiIEE1bhezoAqp0mJHK1De0tu3VEMVoQNR2HNfsp0zGJqljCyDj2LKlzL48rW4tGXnq748seLP/tXjY9+cuipR2Z++PjJ7ReJjgeuvnKypyg0XRcTNgdnavzzDdRWA7pRCS2UgsJSs6Ac41VjUzWW8XpKNKDsbsVEa60vlX7mP37523/15vOfa37288Vf/eBnal/+nmOlVz92Xzd5VysoViy2ylZ6JlpuLfYVyieKAV6xiXdXz7+nEJeoF+oMC816QZ1eUAaLH8DzN4HZ64a5u6al1uHS4s/88eeefbjgyb+5/8gHnn/y09//7iOfP5hqCZwILOKmne7bK81Xj3sKLOONwcnOxGi35vbV1i98quiRj0l7q1mnLu1S0+adsFNNwgoK1uKwNshgOAbQhGV+drqxrtxmAWyoyYEacFhLgVoaUDNGBW1SBBwwjej8DthuVECKA5tBbjzZkW8vXUKUs1VdFiNXRkvBWgJSUrDW74CdZgMOqO1GZQBHaUTPoAYGNdGIkYT0lzSlQD2XK6Wht5PlnJbFYQ0Oa6xGhQuDccSE6jS6E8lge6vPDnMJUc7LdZiUdqOChDRcdTGml2F6GVd2RIBqq1FBmxGv3U5BoF2vsanlpFYRsYAh1BAy62iDdG2mX7m3wNh1Tsrk95mPjxZ0ik23w2BW7yOSTcPGYg5D0gada2uLWVpTt/fOvnG757s/bnj8qdLPPHb3o59780N/W/Od59tffrPk6edWa9v3Oof2u4ZDJ2p65yiuNtJ7x6zTkwKgqM6QN5sVvJnN/oGxmtqbL7zYcPd+0unK+UNRtycRioWDkVgkmYhnksmzePz0nbFoZ/H4xWXD3l+YV3PZ3oFrz3TZPimZvEilWE50XjZp+uX5M7F3Gi2FAmm3K/R2ovSCqzli3zd4f411hcvVxWNvx9tz4WO5cDgdDMQi/vBpPKreXYOO1uHdBWB9Wj8/hG3NGGb7LRtT1vUpvbjftjljnB+EFkewrRlgfsi8PmlenTDMDVjWJo3zg7Y9gWZxyCrdbC65x57nIQDm3N1kInuazb/9SV2w52dsMnkRjGT/zan2b43SNBeRaCoQSOVSbCrKYqbAC9+79ZVPP/vkF176wl985xuf+MFX//qxGz94Dj0Qxq3L5qMqt66a0RS7teVOZZ1X04sd9LlVi2lUrRa2O3Yr3ZLimLY5qOx07HZ75StS3uyLj/3oyx9+5oeP3nrusbce/8i3vv7hT232Nvql02HVAC1pcR80sRqhtu5674tPkjviIKpmzFoPBhiOtmlA7UONbqM6YDY5IDWklxCoMUDbSLMJUEl2l4XTgx3SnWW3HeJ+ZD1Wg89m8tsBvx3w2UxezMixkwvcpCRBNfcD6rYYAemuy2yIUBZEeUiC6qTbgZlkdpvahqsxhwq1SM3oCWaW2RC51SRhzOqgDXDDGtogD5uNUbPJb9BQOqUN1KtlxycHWyrJnvZkT324rT3cNJ3suCA1bZBS2mOn7jgIyqOwKmySB7SHWVh2bpaxNjVrVZwpt3B+707x1YkXn6z/ykNt3/h0w2N/3fD4R4af+9Lm3ecNbbfJqWp0vAiZKLKOlxLTNW5Bs3+2zSds8wg6vXOD0HCHXTzX88aDb/3l15/51CtPfPz6o3/57Ff+4qGGV35Ibww6FhqYrWZ8p+1E3DjTXTDcdHNP0IDv91N77ba1ami1Qr1We7xQo17s0oha9eJqZKXMvlmIbd3H96rI4+GhouIvf+CrH/qdJ//+M5XPPlzw+IeeeO3pJ+Za7rnXx6LbE+Rin3KgUtJepGorO3xwXfDi39d86bPrxTdZTMNGMEi2YAe3kl4TIFvBQQVtBgCVxI7o7WYAMqmXFwRH+xtW1Iiheges51DqhLQuUOuC1BSkoWCtzw5xmPQ7YJtBbtZI3lVJpOfkKeesWrTSEGmhYJ0HAxHVSZiyua2QSXpAgDpOhnIoxQEtDmgJUEcCul8oO+IyrC4bQKI6AtHRZoA0g1ajXnmwv8SfcVsBLvPK3cAlSrnsqdtq4ro0OExKEtIwFhAzGSG1xiiV4yZjwIH5bTANqCHJhnpNkCbBqFUbRdUBQOYznlzQKCHdythMexO9Qa3scKhHNjLQ9epPb3zhi1VPPPXSf/9Qw9ee5v3k5wuv3pQ8qPGPi9m14+TqIUsEAnLwAnNjOzKWjjJSk3VPHkUJ5FCBq02wRK7Y3KIgCFYrb7/+asrjZqNRNpnOujxx2pUJhNhkNh1NxiLxSDgRi6a5AajcNLRY7DyZZN8Lpb9ARw6Nfn+S67J7ufUlFstzYvTyVZco5foL+r0Jbl/pWZ5lL9jzt7vxvo/Sf/G6cglRjqNcA9hYLH9xwSbi2dNU7jyTCdJkhMLjjJ2B9V7MnPR5cJPRTziCuMMOGNNej9tmtWjUbpsVlEkpFGYQ2CSXejGrRX1ik2+7IblqdwVQK2iSumDZSDyXOWWdjC8ZT2UTmYDb7/ME06l8MnnBuGL/5lT7Xx7n/yRK05kztzsaC12wefbZJ699/P/9xrc+/9Mvfvj5b/3Nm0/8zRvf/OQPP/FfPzJYVcIYlmjDiAfqDdv6rYoqUtcVQIWUeuF4dkTc2bE31U0rX4wn6AAAIABJREFUesNAB3FUTRw2eeQTQe320aTg/2PvvYPkvM87T93t1Z29VXt769tdn+8cZMterSxKJilRVKAoiZIYRCqYkkwrW5YlWYEKtCSSYABBgASYQABEzjkMgBlMnumezu/b/eacc+rwds5h0nt/vOAYpqSt8p69rivzV09N9bzVwNsoTM3n/T7h+3zqXffd+bbPffmuX3z2vd/9+Ns/fd87b48d2V1IHF/hz+bBl+vJnQFw9tiDH5nf+vMSFPVY2JGIokwpcMpjYY+BqjxelUgeTVkKQYBxHgMvHD9w8sCuFzb/YnHiPJKcByKTNBDlcnEZTWpExqBAgwI1IqPiaZ3MbtREN+SpxcB0JtLJayoOEMn5lqu4PIbGZmo2b4igreQsOavxaZVL6Xxap1MyHjPolMWAGpawiHRdo8oSxqcWgLmrLIViOMRyJIbmZmcmogvTLAGpHGbwhM4iOgXpVM6kIZPOmgRgoskmB9WJRAFe9ND5Mh1rqcCyhwUlYmQCVuocdHL7tWe+d+Drn3r+3vc8/cG3P37T/33krlsv3fehxS99Gn34m/qWR4o7n/QPbCkc3eqefl46/by/dGFmz/MPf/7BBz70yQ/cdOenP3T/D+65f2zTTyrTh40zW7RzT1rXdtDXdkdP7ZjY9zR8aZd6bSd//kn+3KPa5DZm6oXk2c3i9BH+6l5+bIcw9pR46Ufc+b9lzv2IPr91fNvzP7zrO1/40x9++eZN9//R1+99613PfO1L1NhrypV99sW95XP79dd2XPvO157/+Ae3PXjP8U0/JCOXikrOFTIKuuALuQKbNuFoRUYLMl1zDAYGJBpVWDQyd/XKxRN5W5J5TOUwncNtDnNYLM9hRQ4v8HhRpvISKWOZ9OwVPDmvEiCViYTc2hiA2cjiGjSsEeiw7JOpZEESC5JY1lSNQB2O1klsg6YhSnUK0SnEojGLxsJaaThebPOwzcO+yRsc4im0SiG2xCoUEbk2gWdSDo+/nry93jAc1kQlNG0ycEGmQnOG8A15ifEkyeIEg+NVlhJoVGByhoT4DjN1+jUXTzQpcJWGlqFUa26qdfVKbsvWc3/17bG//eG33vr27Xc/8J0/eefRr38rvmVH4fJkL55pJ4BGCqhlwAoAFkHAzQBeCvQWkVqM1a+B9hzSzGryVE6cgdiZLDkDepiWnYrn5pIGKVAA9Bef+kywsjbyqyuVerC8FqwErUK56pZW+sv97qjZ6DVb/UZjUK9fz752Wqv9bvCGTTKtf7iQ/MZlapVKr1hsOU7VtiulUjv0IAzt8kOv/DfsK63VBpVKL+/WLbP4Jkr/v5+39Jr9TpjXfZ2jjdZao70yGAR+qdnrDDv19nK332u01ofLtVK11RqtBoFXbHYHQXcQeMXmahA02isFv70aBKZT6Y+CwXJgudXVIKhVmuudWrDSWe22VpdXuoPV0VpQrHRtr9btjHqd/qDdH3WHy72Vfm+t1wu6/X90beD//7HWaq012iuN9usc7XbrnX650hyNgmAlOHNs/oGP/s2Hb/7KVz+16RO3fO+T737ka594/sN/8tCf3/GVt/37/2tp7CgaPSwhR6jMTgk/oFNnFi7vGDvy/OVje3c+vfnFx3+qZU/UxVNS7HlxcbuTPuTD19iZiSe++oPPvOcL99/8pTv+8FP3vvv+zX/9XXHugrb4mra41Y5v64K7Swc2PX3T71Mn95SZrMmjKodoaGa1bHlcTsxFWirlUTkRzzQqFgOnJy+eOvray47MaAzsSKTBoZ5CI7EZND5LpuYYYJEFI1w2yoIRFowkpy7lFq/RmYiKAw6HhjR1ODQvEiYNhS90Mhu6HVkkaOIpl854DOBQaZtOexzosoBOJYsKUtIwk82IaFQkEiwSxTIzRDYqSZQosfmCLUvczPR4Ir5oG7JtiDJHKDypC4QuEDqH6hxqhOU9CvAYoCBkXSlrioDCxQVmkSdnK3ZWwSYrbDTIE4GBBEwqQBaHi2PklkfTD3/nwoP3777jth3ve+fLH373wftvP/4XHz75jY+c+s4ngN2P4Ceeu/zsT37+uXu+cOvNj//5g9Sho9XL54KFc+0LL1ZOPV08t1U99wp69EX06MvahX2li6+4R590Dv2idGFL8dpue3y3euol4+RLzsnnS2eerZ57vHr+55ULm0oXXujMzU7+fPfH/9ePfP/dP3r4Pd+5/7dunX7qicL4scPf+OyZb35+7/13PfXed736wN3pXdsdYNHigGsTxxaXLtkG2SiINgkWKLAmYmImUpK5iq5oNO7JLIcCV88fn792sWSLGo/rHGrymM1hLofnObzAYiFKSyrDgEuzF09kF6/RQDQzd1WAkxsNPhvDnSYDGzRKplIGyagY2c2XCqLCZLIuz0sIbNKUxZA2S/0DScriv4zScBimoDEiniloLAdnLJERcfTSieO2yFsseiNKNwwfQmGq4EA48xp6NahEVkBhEUdNgZZISCRAg0MkJCHnFo3MQhmKy+MXwF0vH/nKV3/2rlu2vPeDz3/orpPf/N74z580zl0JCD5AucApl+fjwxw+RBkvmpLnIlYaMEGIiyf5VNqBSX0OtqYwfRLpQG72+GLgrpsxoYp51AzKxWguQbm0ScRhCeWe2/SsgNJBb7VfrNucutLs9yqdTrUz6C1Xys1Od9TuDJvN4RtQurHZ9EaUhhwNq55hFjfM1oY0te2K69bCgqjn1V235vudcrnr+51SqR2+Dr8tFlu2WdY1bwOl6+uhS8ObtdJ/9HlLv9ntNbudVr/VGjVaa/X2Wr293mit1WoDz620W6NSsTbor1YqneEwqDSW3cqwtRyoXqfcCcqdQPU6reXAqSzb5dEgCBS33VoO2iuBlu8OgqBYH66MlvvtRhAExXKjsxro+WZ7Oag0ho1mr1yq1P3aqDscdZcr5Xax2Kk1/sXB9i+N0m43RGmjMWg2V4OV4Ntff+qTH/jmXbd9697bfvjnH950/21PfeRPf3zfex+++71fv+2/fPihez978chrZw89d2jPL04cfOLVF358/tRL+/ZsvXb1fMlzd27fcnL3Jnj+NQU8bGT3cws7pOjuMjpBTp7/zn2fufdddzx4+70/+PMvp88d89GJEnTIiG91U8+uwQemv3bXc7f+sTd7uSwRpsrwNKTBmcC3dTxukkmfhSws08irLAlse+JnF08cpKFUr5oPTVNdmWLhZPj7LtSjBgVaTM5mIZdHjOui8HqVVMUBGU1LSKpq8AwQ9QS85SoinNTJbNtTXQouIkANA6tEtoyDPgGWObjEwS6bVckUj8WSkbHxq0euXD0yPnl8IXoRxqKOKXAkLLE4T0BgfEGkkIKt0jgg0bDCohqPazyucpjKYbqA6TIuCbAg5kQ+K3IZiUnrXCYvwxUDr2kYn57UofmWAjV4wKeWfCJqgJMDGxm46MBAGkzSjl/Gzry6+NLPJp/45pWffn73527ecvvvbnvfHxy970MXPnPv1T9/EH/k0aXv/ijxnb8Fv/0lY9O3qjt+VN/1qPHy08xzT7HPbfFefXH90CvBkReCPU/1Xv5Ff//zwfm9zb1P9fZtXt773PrebcFrm4M9T4x2/6L96qbyKztKu47jjx7e9PbP/+St95z9wsMH7r3/mZvfcfFzDxz/9H2Tj3zPnr04MqmyjhsCnDfZxNzV7U/97OjulzyFrpsKl1lSoXRTF20S1ZCsRWNVXcAS89fOHxOwjKtSpoBbAm4J11WpzaAug7oMqmCZvESaDExlInmJLOtc6HwU0iv8X97oKjJotOUUPc5oO9W589deefq5o6/sDXrLeUF2OM7hWJulDArXKcSg0esuSK/XSt+AUlvEGSheMngeAWyJZeHcyf37KrZpMsgGvDfSy66Ah5aBCg6oBBiOwZgMLJOgJiASk7UERM7FGhwalJxODtAuXzj5/b/d/sBnvv/um5/8yCdOf/uHwI5d5clIO0fgsdjc1MTc5DiPIktXr0kgPHPklBbPZk5ftZagFiqVErgxDdhzOW8RseZhO0rlMyo7idCTsBGTUmdi+DVMWBK5JQ4YB/EI4TJeZhZgQSYxHdvz/K65sZlgOVhpLXeq3ZX+2uooMHS3VGoOBkG7t9poj+r1fr3ebzWHndZqt722oT5/maOFQjP00fX9TrhbJiya+n7ndbf6iqYVDKNUKDQ9rx4K1hC0IWIdp2rqJU1134DStbWVN1H6jz1vGTba/X+A0vUwGq21en04HAaVSq83CArVYb0XVLpBuRM0RkG5FdSHQaMf+J2gOQjK3cAuDVsrgeZ2aoOg3gv0Yqe3GuSrfdV0KtW66ZWbo0DOt5qrQaUXjIJgOAwGveVOvV0vVavFWr3W63SCTi8IE57/iqK5/itROhwGjt0YdoK//sqT//X/ufuL92z6yE1/c9e7H37wzuceeP/mO2/6/oMf+/k97//Gh959786tr+VS4NTVsTMnD01PXzp15mC1UVgNlk9fOLMUW3h566ZjrzyFLhz08FNSYru8tK0A7c9DJ7tSkpq7ZEFxPjrekZNG+rCRekFe2lRFXuwld+7/4NsmHvp0KxsrKbShchyN+BxpQykJWuy4rIXEHALsV51Tx/bsfWmbSORW2hWNxfBMhEfT3bItk1lfYwsy5Qmow8EhRPMiVpSJqsF7Ai7CSTQ2k5oei02cXxo/F5s4zwBRIjlPpRclJCWjaRFOagRY4okiAdcorEKiJQwq4FCRxYoc7rFwSaNsEeWIJEulDA1XNUQQc7qKWQKmElmTQVQiSwNLBg0XdU6lIYNDDR4zBdzgMZ1DVQ5ROUQRUJGHFQkzFNKWCZNHdSoX7gKryYSSjUrgvE2mXDrjMGlfhssmamkZwwAsI+fpiK+hbZMIXCLIk4EOBFo6AC43zr/WPrm3dXCP8NjjC1/7612fuHfXJz/63J/9/u7bf+/5d/37Hbf+9mv33H7qLz97/POf2f+xO469/6apT7wn/pkPRj79gclP3zn54Efn/vJ9kYduj/z5nTP33jn1sQ9cvfM95+54+6EPvHXLO//jS3f82ZO33LbngYdOfe37x7/yN+j2bZVzx4KFmYAjgoLWk1GVTCgiZGm0IZK+oTgce/HYkR1PPTF98bxB4S5Hl3i6wJJyNulSSEVhwbmJidOHigod9umE9kMWi1o0YtGITcEmBYf+9XmJVHCgrHMtT5XQtIxlQr8hk4HD/Op1mtKExxk2ZUXG5m/63Xfc/vZb3/9fbz23/1jd9BxWcDjOZhmTJnQKMRnMFYiCTLscGbodhW1HGxYNloBxSLJiSxqNOjJHgpkzhw7WXNtkkPCjhkANO57CDHPY1htaBIfNR0WZKPG5dY8PekUjMn558y9e+6uvfvfmd33tD/9w30NfTjy7vTw+t5IhhgBVj2POHEhOxvAsfuz0uX37DxMYbYjm2QOngGtLJcqIHLmaO7sgXAP1OVSfRJTxnDoBqdOoOE9QM4gQoZWkDF7OTh6Yuvk/v+fCzss27LJRPjcJsXFaBng2jhuYdOHA6e997XuRqcR6PwhWg6rfHQ0Dz6tXG/3uYL3VXak1B9VGv9kYtFujcK50A6UbEV4pl7um6SuKZxgl266Eu19arZXl5aDTWSsWW4ZRkmU3fIPjVC2rHC4A1/WiafqWVQ7djizD/2VV+iZK/zvOW0aN5rDRDlFab69X20G1HdTb635lUG0M663lfLFTbq5b/rJVC/KtoNULavXOoL/eaPaajUF/sFqv9bq95Ua9Pxiu1Wu9Xn+l31ur1TujYdBs9du95fYoaC4HxU5QXw/sVqD7Pctv+9VOrzNc7S8vd4fDzmjQX2+11op+702U1rvterfr+63RMAhWgo+8/0tfeuCxz9316Pv+6BufvPWRO9/105vf+s3PfuTpd//BX979/oc/8/EfYelisBx0W0GvG7iF2koQ5Ou+U8v3gv5Pn/g7IAG+smXL/Pk9GnxcA553oKeFpZ/K8cfN7M7cxFYHOc9GD7DRV4nZp9T0Zi3xeB1/kTn8vd23/q709C9WKNgTSZ7HFZGpiowYn3fZTMOhC1TGwlJwYu744d0FXRCJHA7EJBJyZSqzeE2hct2yff33LAXqJKARGZ0EDAo06WxBIvMiEU685EWipNBVg2/YkkaA85dOEsl5m0USkxezCxM2i2CJOZHISTQsEjkOBQQU1Gg0VE46BelkVkJSLoO0LKmmMRaZc6isg2Z8FqpLeIEChfQ8l5w18UxJxEsimX+96dQSMEvATB61WLTIkAUMteGcmQNtDC5yRMMQu65WlumiQBg4qMFpEwXUXNyEkhUeklITenbGRmMekbGwjIYk1dySCkUkcKZjwOsu1ZfhPocEKh8oWhOB1205KPPu0hHq3Kazj9136MefPPr4Vw5v+taOb35u033vf/S2P3ju/b9/6N53nvjse3d/6r3bPv62bXf/uxfu+XcvfuytL3zwnS/fcdveu+/Y99nbXv3CTQe///7jm+6On95k5C4EPT1YKXUMdGRhawZWzM4b8UkfT1U5xMazDoXVLVNjaIHA1nv9Qb1x/vDh3c89B0UieZauSazPYEUK8XmCis1dPrzLIkGNyFhMzmSvT5JYNGJSsEmhJgWHnbEWi7DZmISm8xIpwMlwGCZUfjfmeC2GFHNcWa6mrqVv/oNb/vKehz52y52Pfveno3LLIBmTpm2WCXO8FovbHObweF6gPZ7yeMLjr/9UhLVSW8QlAihbosWTBk9B8aXLp076ph7a2Ye3Dl3s8xIZFk1DbeoKeDhsarFIg0MDLNO+clY/tGvfg/f94Ka3PfPJDx/5m28wJ46uE0Qzk3UWU+JERJ4CvDhrxVhtkZbnyaHUsFPS0U17fnDPN5tYATkTh87G5Vk6eXwxdnSenSXNlC5GBCkul4giF6XZCGnldPAyIMak//Kbf3LLf7z1fb9zux7XXdCW5hluBi3mNDmCFbOiDvLZCPTxj3xaYKxhP9C00moQ9IdBuT6oNkfl+sCv9sq1fqs57LSXu63ldmsUVjc3aLox01Kp9EzTlyQntNI1Tb9QaDaby71e0O8HtdrAMEqK4llW2XGqhlEKURpa724sLrWssmtXTaPwhlrpmwne/47z61TpWq05avfWG+2VSmO52Q+qvaDYDZqjoNNZKTqF5d5KOe+X85Xl3qjolAbtfrPSatdarWq7U2+3a51WtdmuderV1mA5aPRXi61lwau1g8DrBV5rudgc9XprjVq7VWn0m91es1+vdRqN0b/aWmkr7Dzq9BudfqPTbXT67fZypxUEK8GuFy5+4N1/eefN37z9v37jgQ//4p4P/OzDf/b9Lz+w/d4P/fQ//9s7ju1ONIpBww+qfqCpNTffckvV+qBbGzR4m++MGqvd9tGXtsXHduvZw2z0CQN4nI18v0RsLeAvUfNPW9l9YnInMbu5gL1apV/WYpvKmRevPPKpV973tvy+l5c52GYhEsvYOufRaImGW66gkomWyQpQ4qVtTyaWpjUerbqKgAMCDlQduWJLBY1Vaeh6/o3HXB7Jc0ieQzwW9liYziyIcNKkoYJE+ipTkMjQyN7lsYrOyWiaBZcsBsYTc4nJiyKegcElCErC2QSUiRG5lEjAOoebHOGJpEVCdHwBnZukonNcbN7IpjsKX6KyRTKjARE+McUnZojIBDp/hUnOFDjEZaBwOCc04rFYxKHhMoFWMMRH4SKBlCjMoxGTyGloxiChvECK2QQamWYSUTYeVTOpjsJXKaDBAHUm51OwS8AWCdkM6gq4wUE8EWfgiM6BOgubDFIz1LIuUkikVsRdfiqoA0EXDtaFlpOJXN7LJK/UmESgZQNmcZS51I6fr8XH/OTpJrS3De+rJ04V5y7UFmYGYHyNjS3Lc13jahBgZW9G4K7y3ByGzVgmoslZHo/YHFBTsJZMlmnMRXM2jjkca4sCjcEUgmgsRwCZ8dOnI+PjVV3ymGxVRl0SKHK4Q8JjB/dy6bjDEjqR04mcTuV0KmdSsEVjFk3YDG6yORGNOQISmh74GiuhGSg6lZdIR0BCZ6LXUYpZDF2SHDZDUUn8ozd/6B2/87avPPD5K8dON21PRlGNwG2WcnnG4UmLvd4xlJcYT6TzAukJeIHHwx8Vl0c8kVCobFHnTIGUSTy9MD957lxBUWQKNXgifJYyacgTUE9ALSYXpnMlAjDpbIXD2hzWwXLdVNw5fOTgvfc9dcst2+68M/Hs5mEmUY8vjUjKiSexK5PMVMxO0/msJC8S+FVQnafzC7x8GaoltGpCG2E+fTblLYotqMCMI/I8Iy6y2BQOXMmC4wg8SxHztJTgO2Jt5uB4T24++53Nb/03f/Djz/34lt+6JXM6JS/wpawtzeLCNCxN5fQFpEm7EiL/3m//ycogWBkFnlcfrgS65Y/WgkK54/mNfKlVLrebjUGvvdJtLXeavxaljcbIcaqaVggTtrZdCVFaqw3ClaW2XTGMUrHYKhSaqprfEKYhVh2nGiaB32w7+qc619uOOs2NDt7r0e6t1pqDWnNQqfcandVKY1htrtSao9WVoFZpBmtBu9lr1XvBeuAXaqPBarvR77T63daw1xn22qNue9BpDtrNnuf67c6w2GirhXJzPfDavfZaUO+PbKcYrAaD5qBWqAUrQalQceziaPSvDqXt5vW4PobUvj7XW68O+t1g1A8YovjFz/z41j/97Ife89UHPv6TD77765/9+M8/+YHv/tkff+arDz4anaLrhXVba3pW3S806tVWuVzWNMUv52v1Unpp/LFv3X3oiS9ClzcXoP1N9kgeepmZfdzNvghf+ZmX3WWld7rgqx64U4o87YHPNeE9/vSr+x766OKj311Oz64osC/kFCJuSlBRJnQSUKisI1OWSMFAfHLq6qWx07nUrM7mLAGhczGByJQdsaBzBLjkKbRO5TwBV+CEx0A1lZTBiEMBBR4NF0fbLHTjyKnLI2GErg7X38AiBoubHKHRKJ1Nwktz8NIcAyZ0CskLtAQDbCqmo7mqIjRNqcBRKpT2RbwsYUUe9bhcCG8NTdHJuapKh9nmvIjlRczhYE9AKzrji6gMRmwyI+eiFpVpmJSMxi0G9FVKJ7N4fD5x7fL8uTORixepWMLnOZfO2XhaRxMGlrYpKGw/NigwL+OehIV0MZhsWAZWsIwrwiaXNqmoRS16XKwgpgtC1uWh3NyVpbHjA5Nfc0QzM98RsZHBVznIgOdkYDrwzTKNtSWxLYlFCqmppE2nGHAmE7l06dTefS9vHT93nEMBlUF9S9RYpF0yBThlMpjDkxZPmwLt2wYOpl98dvO5Y4cP73n18K6d2aVIXqUdYalqZ1whY9KQLyuRS5Ondh1u2iUNpyQkp1OQycACnJKQnM0ynkibbEYmIkUVLWmUAKdankaml7DEfEEhLC6rkgmdzrgiWpAphyd1EnM4dqVWtVlm99ZnfvC1Lx96aYeMZQdlTyUgnYIsFg1teMMCp8NjBosbLG4zqMsgHgW7ZNYhQItIW0zOkQiRADtllwQzeCo1e+5iyylqgmSqikLiEgwUeLyqEB4FGljSFlGRzugK2i/IgcS0ro2jP/n5kY/e99h7P3bg6w9TRy+NYH6VVktJWFlMa0u5zLkJdCIqRmEtSUpLqDAPiwuIGsH5CaCYEsKvxMVYDTG0RdKIMdQEUEGtAqwzc1j89OLSmUV+iZFjnJsW5/eOuSlZmCMy5xKf/rP7v/j+v/j6x/4qDxWZWdZIaoWsAZ2PL4sVdjxJXkuSMfRTH72/U+kP26tVv72+FlhWqTtYb7RHbqFimsViqdZq9rutYbfRbzeGlUqvUh/UmqNGe6XZWW20V+qt5WpjWK7186WW6VR0yzediuVWLbdqOhUnX7e9mu3VNq6YTsWwy+G3bwjHqb5Bla5f3wD+Jkr/0ectneYg5Oh1c4b2IFz4VW10S5Vmoz1oNHv9wWqz1e91l1v13qi7Us5X10dBo9yq+82V/lrR8buN/rCzPOwsL/dWNyK8EqwFo8Fqb7TaWVlrr6/L+Xy1P8iXa6PhWqvazhv51d7qoDkI1oNuZ9hs9f+1GQduoLTdXGnfsPJ3eRhU/EGnGQSrwUOf/+H9d//NPXf99S3v/OyH3vPVuz/07Xf8/t0fu/3L02O55XZQLw5stVgrNarFSr1cqRQL7Xql06gi2cyx3Vujpzd5mZ1d/gQ3swUae0yOvKQmXi1hR93cgTx8wAV364mXfGSvC7zCzzzdyB6Edj727CduZ47vCmy6J2XV7HTLY/MaqtKgp1AFXZAZjCUx29EFVZyaHceyEYlM5lWyaHIai9BIUiRAV6F1DpfJbF6iRDipIcmaTLhUushl89yv4GgoFm+88nq/Uk5BARXLyQjIZOJwZBacm4Qjs0QiohOwgmYlGJARUEZACQZEKCNCKYdDbRYKbfRtFtKIDJeNEslZT0BNOquTQHijMO28cceKTjUdXsESEhr1NczhQYfLeQJaUmhfYW2GlGFYRVGPZxwO3fhTG5/ZoMC/x/8NFw0KdHnIZrMGlTGojElnbRYKK4KRy2dP7HoBWpzxFV7DIYNENByBI/P7d2yfOn/+wpEjFsc1XJeH4aKqIvF4bHLy5N69k+fOqSTJZLNXTp6cv3zZFjiJRLKJRZFCqnmTQUFLZnkCKphyNrG4/9UXBBJWWJzFsqnIjK1wZYeXmCmdm1bIKA8lVYzOTCcXLs523LqKkSqOqARosrmSypR13hNYg0YNNlVQwYKCFBSiZklcLpWXmMTUWFElXTFnshmLAzwJyUukw9EGhcsYoFO5gkx1CvpyzesUdFfABTi5kQfecLe3OdTgEJMjTB5zWKzAYiUa9im4SGddGjQo0JEIFkv7jiZgyOLly2wSMHBWpQSRoF1ZKiqcgqVMMl3WcV8lXB6pa0yDw53IQmzLluc/eMfOW29L/+Bn/njSW8TLGaEMinaCEhcgaQnAIwvVAAAgAElEQVQ1Mkx2fAmfzQhRRInjcgyTFmF5AVYWEXE266VZcS5nxkn8SsxO0uwMwExn8lmBnQGAC4tWhm8wBSMlqgleiZDOEl1I8m6M46dRL2Oc235m/+MHlk7E8ogvRWUHsJgZDDwT9TKCsYTLEZiOwZ/7xGd8sxSsBrbmButBr7tsWvlGe1Dw6/lCpVJttRv9dqPfrnVb1U6l0ivX+mGtrd5arjVHlfqgXOsX/LaTr4eYvBGlGxDdiJCmvy7eROk/1fmHc6U3orTW9suN4Wi91ey3G/2CW25W2iXb75Y7vl4c1QY1u1K1yoNKr6B4rXyjZlfqTrXh1jai7lRrdsWVbZVTS8VqsztoDpe9emMYBIZbaNQ7a8P1ar4arAYFs9Csd1hO6v3rs7NvN9fazbV/iNJBuzWqlnuN2nKnGZSLy1cuJr79zU3f+eunvvDZH3/u3off/V/u//pDjxO5QrASdBtBs7q8vhK0Gt1yqVKv1mrV8vJoYOjqoYP7T+x7wciermDHSthRZm67EN3p5I6S8y+h09v52G5y/iU7e0iK7bLB/R50kJne1iUunPzhQwe/8YVmcmpNgmpsmstMVkySQaMaB8dnr4ydOnriwN4LZ05iGJIBgee3P8sQYNHkCjoHpeZnrp6LRyZVDqt4WsUz8hrfdFWXxzQ05YtogQVtMuWxsM1CG8gJO3tD+N2oR19/D+zxRF6gCyLj8ZRJoQqaFaGMkEvrBMyBSSIRYYGESaFFic0LtEnBOplV8bTF5IoykRcxBUsJUEzBUnkRCwka3tGksxqRUXGgIHIN0+SzGYNELBrhc3FfpUwakJCYiidNGgjt+OlMhM5E+Fw8hHSonm9k6hseCzb+CTabtdmsxYAmDegkoJNAOPPjsBidjo4d2X/+wB50ab5uKjVDhRbnjr26Mzk1uff55yQEtlmGz2Udjp29cP7Mvr0MkGk6dtXQTZqCIotn9+97/onH97yw7aVtT0+Onc0bksxgriYIJGyI9MLk5cmxs64mVPMmT0AlWzVE2hSxogmp9ILJgjZHFCXdIKTktUhsfFJEgLyM60xSQOcdEXQESERSIpIymLSERyUsabGojEITp46LcFYloIJCeBJk86DNg44AOTwWTrkUFYbLxdlszNfYTkHPS6RO5V73sv/7BTJh/TVEqSXgHk8UObzCYRUGLXNwkYdVMlMwWFXENJEmgPTBl1/uuAUNxkus1NRNgyWpXFwi0goHMGxK5UGfgvtArnjg7LFPfvHv3n7L/OObhnCmCqSbEFsFpXycVhZgaR7SYriRprUUBY/H8KkUt5ATo4gSRdUIqkZQPYoJM4CxhOlRVF2EpYWclSTNOKksIuICZCRIfg7i56DcWDxybBK6nCDGM6GEVWexKuIgY2k7o1fJipZQ5SUFuQqLi2xXqOczKj+TI67ExChikyqboz/ziU8Hy8Fyb9Wxi2urQbszDH/flivNRrPXaQ6uo7TeazaXwxnFUIz61V7Bb3vFpu3VQo5uKM4NrG7EjUAN3/nL8SZK/6nOr0Zpqz0YLQf93kqwFvheBcmgM2PTixMLE2euJiYiC+en0teWIhdnFi9MJ8cjM6fHl8bmwohdnt+I8AoHEPNXZmbHZxXZWA4CxfHK7e5qEIiCGiwHTb/Zq/dczQ3Wg2arV2v22u3lX+kh+S/OvP+xKB00G4NOa7VeHTVr6z95+JknH9+JZHWeLhtin8VqK70gWAkcvaXLpVZ9ZGr5drNXKvjddqfZqHU7rWQi9uyWzXBqTkidphZeNsCjFe5yhb2Kz++5euCRyPmtRfYaEz8ipY8J8cPYzC41ddTKntKiR3/2yduww6+uC4idmikxgMmkDT5rq2Sw3Lx8+sgLm586uGvnwb2vHTt27OjxY0899cSZ44dJKCnR6NkThx595Edbn3li9toVmaM4Es0mFolMTMYABcs4dM6lQQ2Jh6o05GX4ItzCFsYvpXlRg4QMErFozGEJhyVMClWxnAhlcgvTmZmJ1NTV7PxUSFOLxlQMdDhUJwGbhUoK6XBwOMxqUGBRJhwODrufwltbTM4gESKWqSgeEQPZTHZQLJZVySAhX6UcDrbZrMmkFXyJy81TmWkamOFy8xqRCrfcOBwcSs/w21+HUpMGbDbrcDmL+XuTCptFdCJnkFDdVAoic+Hga/MXz9QMdfb8mUtHDsavXaUzybzIVQ21W3DB+ZkTu3cSyZhJEwaFqzhSkHiXZ3QSK+lybGZiz0vP5ZIRTxc1nmRQUBeoiYunzxzd3yg5CosrLC5SSMlWGRTEgahvkQoR9zW2aqi+opdVKzsfOb7rlejEGVtIe0pKoeYLKuiIoEpmyjpXtRiTzeUlSiPQpfFxLpuFoxGHJx0ecwTIEbI2D1pc1qAhnUI0Et5Yza3gAAMusdmYRmY30rkbEN3oVAoT+C6HFzm8whEVDvN5rCgiGpMt2rxfVBkyuzB5edfz24JW2+dFI5s1ETAvUb7LOxohs5m8QQRlpzC7cOmbDz/x+++Z/osfBHFkHafoyIyBQcICYCyixiIqzmaF+Zy0hNKzQPrCXOLsNHQlysyBcgSRF2BlAdajmBUnhRlAnAWtOMFPZ6wkqS2hXobTopgeJzyQlyOYMA9T0zlqOueAsgeK1FiilOLoy0lxBuGmkDpREBdZOSbQs4QH2cwMYaUV+FLSTvJ2nFHiODidaOTrf/v17/Ybg2A5WB0FFMmvB4GXLxdLtVq902oPup1RtzXsNQfd1rDfDzr9oNVdqzVHfrXnFZshFzWzpJmlN2R3b2TkxvUw3/smSv+5z1tuhOiNUchX6pV2sBqstlc4iJFQvm74HbNSF7wKZTZ5r0pbFcqss04J1yqU2eDcBufWWWcjGpxb4102Bq/XBlgK3r/7gCTry+vB8npQLFVbjW6/NagVasFq0Cq3uu1Bf7DSG669idKNJ5t+b80vtk29tGfXsVQCD9aCYS9oVoL1UdBtBJ7ZadVWg9VgdRQ0a91mvVMt17rtTjFf6LY7BIa/9MKLiYVxX07Y+JgGXSCih3NzB2fPv3Bg+8OHX/wJHjs7d/6VC/ueWry48/KBp1NXdvvc4tjOx/Y9/M0aGOvQUJHMVFSiVVRZPCUwMJSJnTq0H4gudcq1bDqzZ9drh48cG5+Y3PbM5meefHzHtq1HDx44c+L4saOHz58+NTt57fzpEztfeG7XC1sWr12QsYxOAhYDOgz4BmR6AhoWL39NjjenEzkNz2p41iChsLNUJ3IKClCpiMvhDUsuiJQIpUQolRfIlqP6KhNiOC9iKp7G4tNEclbF0yHtVDytYKmQtS6POCy14vd2P737tre9571/9O7DL+xuWnZJFvhswmJyeQnyNbSsIwUFMNmYgMxQmWtcdlFGk2E3chjhvTY+/xvi9aQubDG5DZRaDGwzaF4gVQz0FZbJxM/u23Xp8L6xI/vnx85eOLxXwXNofEHGsjZHxCcv5yIzwajTcDQeSqsElJcYKhMjUtGGZ9gS/fLWJyfOn9BYTCRyKoMGwxaWWTq8+0UWyeQ1Hk1Hm0VL53CDJwQ8K5Mgm40XJN5mGQXDCpLEQ+noxJnIxBFLiOW1hM4uFLWsyaU5aMnhcQnNuAJVUmQ8nkpPLwSdYVk1GCBjsYjN52wedISszecsFjEZzKBRBQfzEllSmXDis2LwBZkK93K/gaNhpldnMIvFryd4ObzMogUOcXnEEFBVRD1PSqcXJsbOTl463ysWXY7m01EFWvJVwhRyJLFUM5l6Mnn1+3+3/dZPjj30g9LFhYBQC/MpaTpCx+Jz5y9oScJN82acFhcQaRHVk4wap9g5KH5qGrmakCOYEaOURUyahY0F3I1T6iIcopS8GtOjGDWeUBYxZhIQ5mFiIoVdSRWyqpHiE6fn0PG0k+GlqZyf5vV5TJnH9SXaTknkFMTMYGKU0VMSNYVw87i8SGhLtJXgpBihosJzT2w7e/jMam8tWAtq5ZZfqvd7K45b8suNZqvf6Y467WGnPWw3+s1Gr9EYhZXRYrkTclS3fM0syVpeNYpvkKSGXdYtX7f8N9D0vxFvovSf6vxqlLZbg0a1M+qurHVWg/Zq9PIctQRpWdaDpRIsl3JSGZKLWbGUFQugUAD4PMCXIbmUk/ycFF4PX/uQ3JOLA7O6eHFq9vJ0sB745TovKOvB9d6lXAwkIdLWnFaj2x+sFPz6xo6hN8S/OPP+B6PUL9VXloNmozczvaipbtlvNWpDWfRKXs9QKq5Z77eDUT8oF5uOWSgVKo1as93sNGp1Q9OXh6Pl4ejypbEdW59CYmNVLZ3no6f3btr57A8vHN1xdPfmF5758ea/+/bBl58+vPOZ6NWTx3du3vnkj6ZO7nn4i/e99sgPyPELPpEL2hU4MQem5ggUyOd1S5dOHzt87ugJQ9JWeqO1lWB5Jag3OuVSBc5BM1OzAJDVdVMQpKtXJ3Y8v30punjmxNEXtj09OXbaCbdIcpDLQyE4N4Aavgj7gG7I6/49inyFLUp0XiDDeYnwhcvhWGxOJ3J5gZTgNLQ4BUem+WwizJ2G9HJ5xKBAEY6reLog4eHFMK+rk4DDwQUJL4gcsYR94WMPve9tt9950x3f/9K32DTU9TwVy8lo0qBTDg+4YsqT0jafkPFZChgnUzMMsCghCY3IhBz1BLQg4Ruf/8YHgpC4oUjdKKCaNGQxMJ2OdvNGXiBZIJZbmL54aO/i2LmOp2OJ+TP7Xxk7tu/EnhcuHd174MUtU+eOGTQERac1MmsyiIxlXIEo65yCg+DCNSaXchX25a1PXj17LFjreyp37ui+bsVDUpHdO7YsTV+ZH78Qnx13FVYiobzGewKrk5jF0BqBlxS5YkhIbGbhylFXSpcMUGcjMrFQ0rCyzuVFruk4JUWpm05RMg1CMkkFW8q1HN+gKJNBTDZnsqAjZPMynpdIV6BsjijItMUiKgGqBKiR2XDqNNwheqMY/ftNMixiMpjNoHkGKzBogUFdBrFYRBdRAkuSNDA+fjYZm9MFyuQYGojbUs43EAlaUHKLNR7NHTu++/6/2H7rJ3OPbO9dSbTThL4E2hlUTSFMLGujorSEqkuEHMGERVSK4kaKNVKsGqeQqwlhHrYSjJ1k9QihzMD6HGpFSDOCCTOAHkXJq3EtgjKTgL5Eywu4kxY9QNaWaDslMLNo4vQcNZ0zE1whI1KXY26M8bMKNQFwM3AxpzGzKDEFUTOIm9XQcaDBFNQ4I8yh0dOzDEA/9Lm/LJjFYWdZV+xgNaiUm+trQbFUqze67c6w3Rm2mv1mo1ertkvFmm1XbpSbISl1y1f0gmaWQlhuvOGXhemvTPa+idJ/jvOWX66SbqB0pbvaLjSDUbB0cabMWBXKbDFODVKasFYHpHpOaYByOSPUAamcEQa43cWtHmq2UaOLGB3M7GNWj7C1CNIWvOy1pcjVuWA1GA1WC8VKrzvqtgexhfh/+N/+/W/8T7/xG//mN/fs3r8eBF6x+iZKX1el/X5vud9bpkhu395Dhu6U/Xqvu1wt9/rdIFgLWs0hQ4t+qR6sB8PhcqPRarU6tVrD8wq93iAIAopitm/bjKanZ8f2v7bjF9uffhhOzQSjGpyObH7ikVwy0m/4g0Y1WF0e1irRq2OXjhzc+eRjF1996cizT2/50fevnTuRjM0JIolguStXL/78Z4+89sqrSCrb9JtNv1lwy7ZTVFTLdUqd9nA4WCtXml6+XKm2Wu1+o9mtVuuaKp88dvDS2eOmRDgKqTFZk82FHN1I4W6keX9djje0CzAp2CChMEKTOYtGPJ4wKZgD40xmKcSqJ+A6eV0phktSNSITmgArWCqUj+H1kLUuRyuQ8OjfPHbnO++857aPP/XDX1AJsO04EgwUJDIvIjYH6FTCZFJ5CfREwKCTRHKaSs9z2aiKp232+pNB+Nf+MkpNOhvuYQ3xGTYchU2/NVOAIpO+whZEKj5xsaxywXKHzyZaruLyiMtjFZ3JiwSRnJXRdMuVChJp0lmHQ4sy4Qm4J6AFibQ5VGPg+Oz4kT0vgUuzWGZJ53Dfksu2QoDxXdufuXr22OK1S6+9uJWB0wsTF3EgYbNMWdM8gVdxpG6rKgGOn94bnThRcyhXyppspiBTZU21aEnMcWJWUBAejUJUgqwo1ZLoXzsxQacwDacUPCehaRlPGEw6L+NFhfZE2mJxh8ddAS8qdFnnXAFXcEAjs6GN3xt6jq4bJHGoxaIOi+UZrEBjHo1aNKKziMTBJJlJZeYOHn6Fo6GKpykYTOdiloMwzJxBLgWm1L04s+v2+1+764tBklnNctUkXskQylI2NRnFY5ANCOIcaiYZKYqLEUyJkVIUxyZSsZNTMwcuKVFcixJalNAjhLGAGwu4uYAbC7gVxeV5SF6AuemsFqWURcJLK4Wsri1xwhwxtffKlVfPZc7F9KRQgE1kLEGPp4uAxE2CxOWElWDkCAaPLblZBZsESrjlE/bckfHMhViVKmDXsuMHLj3x4yfK+WpIKI6W6pV2sB74pXpYJW21B41mL4xypel6vmoUFb0QhmoUN/K6mlky7HLYZBQiNlSoGy27N0aYB36z7eif9fxalLbqveXOSlHxgmGwcHqip/gVTKvASg81R4TTzWl91OzDRiurDBCznVPboNIE5WZGqmfERlpsAFILkFtZxZiHA6shxNGxQ2dc2V4ergXrQa3aCtaDP/zdP/rN//k3i1bxP/0f//nf/ub/blremyjdQGmj3mm3+u12d3z8mqrqo9FIVdVOp9eod5ZHgWMXdM1eWw163ZFlOa1Wp9lsV6v1RqPV7faLRb9SqZVK5YX52Vd3PP3aK5tnxk8zRMYvmH7Btkx9bWVVU9R6tYFmMYmVg9WAymF7X3j1+J79Z3bvxiILJ/bu2bzpF9t3bH3muc1bnn922/PPUQSZt7xurVsv1m3NNTW3UKj71U693rdt3zT9fKlhuVVONHSr2B2slvxaoVA4sH/vSzu2QkBU5RCFyWlM1hV/9TDMG/ToxnWNADfwGa7iygtkSWZcDq8ZYlnlhFwSic6wQMzl8KrBX5ebEq6TAJeN4okZYO7y0vgZKj2vEZlwBlHBUjKaVLCUBAMtq8ym6B999ft/99c/ZFK5umEWBMGkwjXUqM1COpm2GNDlIYPK8LklKj1PpedZMBKyObzXRq30Rj39Olyv75KzGPj6Pk4eC1exljXW5XA4Mq0TOY8nkOiMrzJ8bkkngY1Cb9MRZTQZMjus+JYUUkISKp4uyoTFQa2iUTTE+fELzz3589de3Hrh+AGJhIDozJbHfjo9dqZVsiUSSi1Mnj2y99zRfWcO7l0YG/MEoaypVCaGJ+fHT+8/d+ilTlHWKEAlsjXTaLtleAF58bE9X7r7Ox+56YGP33LfXTff/chfPXbt+AIVl5ZL61SCBOdiXDZDA1EanJewJUdAwmEYjYR1CgoxqZHZcJNMWefesEMmFKk6lVMJ0BJwh8dD1988cx2lKgOzNKiqZCoz9/LLz+gyZUu0SaF5GS95qMwsBBWTOnT0O//hj+e+9LOAq5Qm0l4UlhcBenKJnk1JACVlBXGRFudJG5D4CMrMQ2qSNlIsOQXETk7NHbhkJ1llEeMmQW4S1OcxZ4l2opQ+j+XTghGj5AWcn0b5aYyfIdUIbyW0MlzI51xhgVPiorIk0LOEmZKttKIsUPICLs2ieUDGryT0OCVGMGoW8GAlc3Fx5uiVoBYYoMTHmU3fehSYSjfyzWA5KDq+a+SDtaDbGrpOKaRprd6pN7rh11Z7UK21vXx5Q3RqZkk1ihuhW77lVp18fQOlG+27N9I0lLAhd9+slf6znrdcnyi9AaXX2476a91ar1dqB8Pg4q7jZUL3IbkCiEPcHiDmIKd3c1oPVLs5bQgZA8SsxdhmRuoCSguQOxm5k1W7gFJL8iPKKYJ8+uKshvLBStBqdB27UK+1g7WAp4SyWw6Gwe/+9u/d9Kd/Vq+1h6P1f3210l8ehhm0W4Ned9Rq9kzThmF4dna2VqvUahWGobLZrKYZjUZrMBiNRivD4XKlUlMUrVppVsPtwbV2GLVao16tVUpuv1Md9pqVcsF13UKhlC+ULbtQKjWLxUYx3/ScmmOWTS1vSI4uGMFK0C1XcqnUqVMnxsav8qrcGgw6g6HnFUqu7zu+75RLTtVzK45TNp3rT7uWU7e9mptvucWmV2rlSw3dyjea7Uwq/fKO5xg85+k8i6TyKq1RQEHCizJhUKCKp8O2I43IhNXEcEYljLDf1WaR0K3XpKHQIMkT8PCihKRCnwcWXGKAaGiOH464bKRb8yIWbnnjslFkaXJDmCpYCo5e0/CsSVK+ZCyXa0G703YcDUcUNFuSGY8nws6gksz5Cq8TKAem+WxKJ7Nhn1E4bBPe60Yx/YYHhZJC89mEkEt6PGEzqIxkdDLrcKjFwLnFa+mZyyoONGyponOegBckUiMyLg+VNbKskXkRMWlAJ9MGlbEY0GJAg8roZHojNArg0bTGwL4pVB1ZwDLXzh87uPO51154Jjl3NTF7hQSXRByouYol4P2q60rM0Z2vHHnl5asnD0+cPnR017YrJ/coRLJbNCQk13J8j81v+dGLt731nnf8n3d9/o6fPXDb9+5771fufOf9H37HA+/4T+9/8CPfQBe4oBX4slszDQnNZCNXKGDGYLJlnWu6qkbCFntdeobqM3SWLyr0r+zgtVhEIkCDhgsi41CYhcNSNm0ymCmQFA7k82oqNfvKS5sdlSZSi75A+SzU1fEqFJFOnvrBTbef+tvHA2fYiDLFeVyfg4S5DLsIKHHMjpDaLMVGeT6laKAMTaSNjCBEidxY3MesPKhce/VsGTbkOUydxSqgJk8j+YTAXgXMRYq8CnqAys/ixFWoDBeslJW9kKMmWeBcLn4yHTkaXzqVRK6iXERUYrK8JIlztDBHKAs0MwU7aZGYzNCzgJoihChSYe2Le064hO6R1qmXTxx/6XgwDIKVoFXvOWah6jeHvdVBd6VR7VTKzVazX6u2/XKjWms3O8NmZ1iutd1CxS003EIjnBbdaMTdSPNuEDR8wwZEQ3xuxEb19JfDMnzbKq2vBddXlgahS8ObKP1Hn7+fK30DSjvNQdNvdYqtYBhMHb7Y5fMt0mohehfWe5Deg/RuTuvmtE5WbYNKG1TqKaENKuGVTlbtw0Y3pzUzUi3N12EFvDQPzae65fbKaL3bG7Xafb9UKxUqwVrwO7/1O//mLf+LppidUBC/idLWqN0auE4p7/lrawEIgkePHj1y5BBOwDgBb9/+XCKRaDabzWZTkhSeFxuNVrAehBzdQGmt2qrVGtVqtewX2516p9Mq+iXLztue7xZqhlMxrKph1Uy7blt1267ZZtXWK67ua7xWtPOlgu8Uil6tWun0nHKVERXPLRWdUtEqFa1S3vQd27dt33R8y61aTt12G47XtPNNp9ByCg23VPeK9XZnEI1G9+97jUJzlsqLRM7ksZolqnhaQhJFmajojE4CMpoMOeryyIbIC/lUlImNLWyh13mYIDVpyBNwh0NLCm1QOSw+K0CJ142TAJuFQkEpIQk+t6QRmYKEy2gSi0+LcJwFI3RmgQUjUGRChJNCLu3xjK/wYQNwKH9VDHQ53GEJiyYMglBRTIJQHkCYdEYnciE+N4ZhwlzxjfM8NwhuSMOzLodreJYFYiYFN22lKFNkagGKTBLJeT4XV3FAI0CNAA0qZzE5T4DzIpIXEYsBVTyp4kmLAQsSGqLUpP9f9t47yI37zPPW1W3de7fv3Xu1t3u7e7Z3bSsxiqREipIoMeegHLy2lXOgqGxlybLkIAdZtiVZkpWtQFHMnDyDQUYD3UBnoLvROQHoiIwZzAwH7x8/Eh6PTO15z3u7VWbXU6iZJoAZktX49PcJ3ycGRlS7g6pcOipSsMqgcjYt0YjO4Y7KVotSScoOHfxk7wdvVAoihyXkbFpjMQ5NjttFmUxz6ahMQSIR1nJJnUHoRLRuOLk4++D1z21cfP2Fp123bt7d31j5g+3nPLxt6R2r5l112YW3b1123cq5l956+QMH3u5tmrUCyyoUkkdDDDKMRnrw6JBKpwscoedQID27fvfd1O7MvWxdlGosVjaFAkfJOOLxTMtQGDhGI7F6uRAJ9u3f+95v333FknP5VLiApcxYoEOhyscf3bfkwgOPv1iIMjZqSKM5bG9MHcaZ3jjeE2EHk/ogoQ7S3EieCQnEAJrpgfgQxY3gUjhrxDj409HB1/fxA6gSoDKfjGYPJEoRDv4kYCWE9J6IEZXww6gSVmzEgXbDv/3+pz+86+c3r9/5jfNvXn3ajlWnbvv22tufuvn7rz711sC7QT4kW2kHPYDyAS5zICVH2MzhqAlzXBiVIfrgmx+7rBE9FPjo1Q+efeC7zUK7YbUlVmtUx6cnO1W/6VqVZq3drLWtgtdsTFTKTcetApTWmhN+tWW51Vl+C12Uzmzi7bbpziqdzmxBOonSf+3jlObvo9Svj/n1sXJtrFJulu1qo1TrjHcG3tvfzBXKGclLcLWk0EiJLURuIXITlupJoRLn/CjjRXLVRL6eFKqJfA3iGymxnhTKMbaW4tu0mTkSSg1EaqXK0alOsz3lVuqN+njBsFrVMVXQnn/mhf/8n/5fDKU6050/O5TOsGWYydTOdKdRb09Ndjqdzttvv/3ss09//wfPvfHmq7yYL5RMr+x7Zd8vV2v1Mb9cLxRdcBG6Xs3z655fc72q4/qO69u2XalUyuWqbpQE2ZB0SzUrgubnJTsv2YLiSoqnqWVNLeuqb6iuJhpF0y5Znl5ypJKl2K5me3rJNXSroJYKctEQTV0yVaUga0VJt8A1fOy+2KyoZkU1fbXgMnmVy0tvvPGb9955F00lRJZWGFKiMhKRNJk06NMBXTnd1G6BzTgiCQZRwNTKzBrqsfGV46tmgJxVSAgL9yUG9rFwsMBmQJt9GKoAACAASURBVP0S1EqLHGrkEPAjihxaYDOxvs/6dr89tPd9Fg66EpVLBuL9e0EDEYeE6MSwgEbBlnKZSPLpuE5jZjYroVg+hYlpWkznuCQqoqmZ5gwzu4q6ed0ZLg0Qn467Issko4H9n2KhQTOHiSiEBgdiffsENF7KYxIezyUD4A6Az0SKDFxkYIOGJDTMI6NCOqiR8RKLaGRcI+MqEQOhkXGdSgBDqBJPmSzOItFsMiSTsMFgMgnXTDF4eM87v3ixrOXzmbhKp1kkajCYJeR4NCGRiSKPFHmkyGcKHCGihMXaB98OLPnS9vO/dv3FS5/YtOCxzQuf3jD/4atXPr7yzGu3Lb3jypW7Vs29ZsmX19137WMmbahk1mCIkoArdAyL9iZHDtJQsJgnZ6IUrOAGjoN/kKMKBdsKg4QHfJXHQsMezzHJuJ4lCyIbDw0d2vfhm6/9RGUxlYLH9Hxu8EiHxDv9wefPXf/dy2/69KX3X3r0V/d96/HYAVSHS0aEF/vTzMEI0xunAxlmlJb7ObmPJQ/DeG8yvnsk+EFffggjDyWG3zygBCj2cMqK5vF9UWJ/zIZEbH/USorwnog4Kmb7ucOvDDz0jadXnbp90V+tvPAfd2xbdP26M7+xfs4/7Vhy4/azrz/vH7fM/6sLtiy+5pFrn0/uz5J9gglZRA+J92RyAVxHOLgnFNnfX1VK4UPDLz33k1d+9EpnojPd7LTrnUZ9EjTo1mvjVb/p2VXfqdUrY2OtqWqlBa5iv9oqN8a9Wsvya19AQUEugQLqzJGYbo53Vv/RSZT+ax+nNCtjgKYzUerXx+qNdsVrNOx6p9EZeG+/g0lmLGsEiTIsVFJCFRarsFhO8j6Ud+OsHc3Z0ZyX4MpJ3ktwXoKrpIRyknfjbD0tVTE5fTiYjWNTzalma6LkVexyrd4Yv/SSK2+8/pbJ1lQ8lDj1H05LxFK16p+fKv2DKK1MinzBsWuKbNaqrU8++VQQhFar0WzWa41qrVEvVyueX6lUm43mhOfXdd1x3YbrNjyvOROltuM5juP7Fdspy3ohLxqiaktmWdTLguYLmi/rZVn3Nc3XNF9THFW2ZcFUREPWilLB4s0io+p5zdSKTsF0ipo1C6WKaekFTzNdzTx+X6y7su7Khu1VxhhW/PlLvxodDAi5nJil5CzFoUkRh2yBKOUxPhPhkBBI9gLnBKBKu51BgFJgpUy3HgkSv8fLqNFcMoCF+/BIv4THjRwiYjEAVA4JFTm0ojEWj4MZGPDmAF1gITmHhDgklEsOQ0N7Yv2f0FA/kH18JiKg0XSgj4yO8ggiYzgP49lYOhfHeBiXcWSWJVPXomHWRKlCQgqZUgi4xNFULJgc7MkmgpnR/mjPPiYZ5pCIyaDg95HweCmPmUyaSY3KWEQj4wYNGTSkEjEZi8hYRMGjAKXdMGjIzB5bWqdlM3oOlYiURKQUChEwiEqMChiEjPYd+vAtAYNsMSviSQaOOFIOWAOaHKIzEJMeopNDKo36cgEewB+58cVzvnzlhgX3XbXihXVzvrP69EfWnvnQlSue2rDwznXzb1+/4LaNi25eccZlV6+78eC7h0qcpFAZnUEMNmmwsEjEyXhAJmGF+r1l4LP87mdyVCZTIpUyBQqNj6g5vO0WIkcONkxNIbE8kX71pR9FR3poJCZgiZqUNeFwFU12GHbfTbsePWvD4xffPu+/LzzvKxtXzbny4gtv6fsgno8I/DDO90Fcf5waTmUHMfEQLR6guH6c7keiHw8NvL4v/VkI+ng4/E5PDTP53rQxmgWmgNxAxkpJ+MG4EOLqbPv9H+7ftOCqxX+z+qrz77x58xMXn3PHiq9ec/UFD1114YOXnnfP1rNv2bz4hk1Lrl89/+rlX92+6vQrP/nZUPDDDDnAO2QZ68+8/+M3c5GMgFDRvsDHv/ntaM+ILhY7Rzt2qZnLaVNTHcetFgturTrWrLWdUhlkepuNiWql5Xo126vZ5XqpUjfcslJy8lJxZrfRTKEJRmI4wQSl0Jn2RrOSwCdV6f+F45RWeawrTAFK3caY2xirtiZq9fFGuTVVmRj+5IiFigWIKSYYFxEcmLeSXBFMwsRzxQRTTDBWknMRwUuLDsw7MO9nJD8juTBfCJOFRDb62QAWQVqNdq3VLlVqTr051eksXXb+fzjlL175+atf/9LX/+Mpf1E0bUO3/ixROjYDpaAL6WjnaKdWmZyc6DQbE3AKPXy4x3XdVqvFi4JZLLhe2XErxZJnWdVyeaxeP+p5Y57X/DxKXdd3Xb9QdETVyIuGoBZFw5XMslyoyAVfNX3V9HXd0TRbU4uqUtDkkiwVJLWkWWXVLgumnVeLim6XTNcynKJSMqWCppiqVlDMklqw9IJjmLZh2qrhKLqt6KCAahUKfmA0+tST3w2PhFRe5HBCIAmByDSKkkJCTGoUWOACAdpVnGDCxMghpTxm8Xgpj3VpClAKOArUKp+JgCYdYGykkMDqDxOxGAsHwfsAryIWDtKJYZMBbbHpfDrMwkE9C1s8LuFxLNwDjxzIQkMiFuGQ0VxymENCeKQfGjyYDgzkkSQVjQUPHI4c6megpEoiAKLdXTczzRm6noXHi6aIkcV1msgmwhIGV1SBSUYjR/ayqYjJoBqNgPdRqYSeTcpEjENGhXRQwaMGDRVyKTObVImYhIaFdFCnEl2O6lQCoNTIIXo2nc/EGDgMTIXA3jFHykpEMtK7t+/T90o8WeBwAUuA1WO+ylkCpdAxkQzJdESm4iZDl2U7cgBZ/vUdK8+44YKv3bptyePbljxxybKn1819YP28+y9e9ti2sx9Zefpt6xfcdtGZV69ecMkTdz3VMF2FxEQcksiYp1IlAcciQwqFgFrpzBzviTgKUMpiiTyR9DQhn4EkLO0KQujwoRefeerwpx8ebXgyjTp5Mnlg9xRPTxCZ6K9fv3zO2S/f8sQ3T9122+KbLjn1ulvXPzX3rzaefer2xCCVHs0wwbQwnFCOQMpBWDhIsEdIdgCn+tJyMMf1Y9ShFH0oRXwWkwfJfE8m35PJHUGEIRI/CClRjurPlFDr0eteWPalzStPu+KGzY+vn3/Tsi9fvWXRPVuW7Np2zv1bluxaN//2lXNv2rLsrmvWPXLNuoe2n3fnmnnXLfn7Hc/e9goxoDBBObY/no/n5Az35K5Hnn/sqUDPoFNwO9MdQShMTXf82tFEClcNq95o+17dKZXrlbFWfaLs1pu1dq06Vqm2vErTqTRMryIVLFbRuT/UvttN8H4epd1CabdBCbzqJEr/tY9TWuUxQFOAUrcx5jTHnOaYU29VG+2xxmS7PB7aP2QRso2KNUq3UbGU5gswZyQZHcqZKbYAc+CMlRFsVCwi+SKSdzDJwSQb4bUQ7mNS8vBobDBsW35rcroyMWk3mowgZ1Byzhnz/8tf/OV//g//+fvPfL/m1TtTnfqfF0q7oy8zUTpdq0x7TrtgVCt+uzPdMXTr44/2IEhG1/VqreH5Fcv2HbdaqYxXq5OeN1YsVj2v7XljAKiuV3Pciu14lu16Xtm2XcO0FNUUZENQi7LuSqYnGq5o2IrpqIZlmJZulHTd1LVi2W2aus9LJiMZnFYUTFsv+UW7ClBqK1ZRKRpaUdOLAKVa4fjLDUvRS12UOk49EUde+cXrkUDU4BUOpwSSMvMsA0dUKumIpCOSCgmxcFDC4xaPFzkUZDhBkhZkdGfyCeC2+y1Qn1R8SCGhsprTszCTGgV/1N0WAsZgihxaVnMgb0xEB/LpMOiDBZVaKj5CJwLwyKGR/b8NHPgwNbwfCRyM9u72FYqFg3QioJIIk4yO7NsTOXxYIUDtNtlF6eczvTPNm4xcxpM4I0uiwSE8PAI6mIRMQsZTRi6jkCnwN5WJGJMa4TOhAot0s7gKHlXwaDejq1OJz9NUz8JFDs9nYrlUCKRSs8lgNhmUiKQjZT9759V3f/nipG/S0GiBwwscTsSGFQpRKJhNj3LoiM4mtBys0ZQnloJ74a/95fnfXPvkhgU7Ny+6f9vZD11+/uNr5961bu59Gxc8smH+Q2vm3HPJ8gc3Lr7xgjO23XTpbZNu3WRolUbY9KjOpEQiHh84aItZLZsxGLTA4SaLgRyvRCRFHJqZ1AUclcmUQCaJZLDpG+GBQwU+m4dhPBT67oMPfPDrV4tC3uCynsTRocECFGlh8BgU/fbiJR/84JdHXj2w5r9e9O3TbrzitDu+efaja8+4cccFdwT2I8khJBuGhUBcPxwvHE6pfbQ4wGAHoOTuoBHJG2GOPpTSRrJ6IAc4yvWhqU+CxKGkEMxCn4U92kodQlacvn3F6VduO+fWi5fvXDP31rUL7rnsvMcvOe/JbUsf3b788SsuevqSFY+uOPOmuX938bJTr9lxwf3f2vjMxkW3bzjrpqtW391SOjZbQwaQD19595c//FlnqiOygq4VG80Jt9LmFFuz6kROyIuaWXBsp1LxGs1au1Edr/rNZu2YM0OlPu7VWoZb5s1iTlK54xz9gyj9fIJ3JkfzM157EqX/2scp4/4fRmmxXKs1JybanabfGt0/KEK0GCGKSF4I4/kIzoUxLozlI3g+gvNRgo8SbAjtfsGGUCFGinFKCOPiaMZMMdEDQ/HhqONWymNtq9ksNRrtTmeq0/ns0/3PP/PC26+9PT023aqOFQ3nzxKlrWM07aK03JF4t3O04znjdqmepQUcy9aqrVZrXFFNo+RYXqXkVEBatWS3qvWO4024/oRbHnf8pu3VLK9Scj3LsT2vbFmOYVqqVpC1oqgVJN1STEdQi6JWkPWCrBuaoWuGrmmKrmoSb6iybRi+ViirJV+xfFEr5fOaqVlFzbKV0nGUmoJpCKahGwXDKGi6qelFTS9peknTbE2ziwWfJJg9n+x/9eXXPn3vo3dfef2tl3/54Ru//uTNX+KRfkckVSrZ7QkCqddj27KOZ0q7HUnd6uMsy3gRi2HhPiA3FRLKJQPdXC7QozKRAG8uEwkWDoIxmCKH6lkYMFilYF/OlxW+xJFCJiFiCYvHHRHXaKhR4IDbnytRRg4Ba8mLHN6t8gJ93M3ldsn6+zTNmDlCyMBocAge7ssmwjqNFVmiwOBg0hTYO6hUIp8OSni0lM+YNKwRkILFZTQmozEVT+hkEqy40cmkRkAaAal44tgXVJLPxHg0LpMpIAQVCj6+vAwL93z229d+xqWjuVSomCfAWmyFQjyFsSVcZyCdgRgkmIUSFlc4/G5g4d+tu3Hrc1evfHz70nvXzLtpw1k3bTjrti2LHllzxsOrTrt/7ZxdV174+OUrdq1fdPW1225uW3UjR5ksxmWCOpNi06Hh/R/bYhas5ga/DNhZCxj/eY5KRFIgk4ZIGSKVTceVLOZL0ts/+1nf7t2WJOhsjoUhNhEp54hKJjWGJD+6794ntl7sZ5Rbt99z3pe2XXfhY5fNf+iKhY9+8+xHz/rLden9ND2AckGYDUS4wZg8hBiDWX0gRx1IJT4cyR5Bsodhcm9cG6LNAFMMcvIgme/HsH3xXF9GirBYH8KE6IeufWzB367+pw2Pblt616L/dcXF5z36jXXfXzXn3vO+ftfms5+4cM6uFWfcvWnpI5dc9MSm8+5ff85d68+5a8WZt2w+594VZ1y35B+2j+7B6Jj82Zv77vzWHWNurep4HJN33MrkdMd0G2Z5vFSdcGrjnKDmGMF2KuPNqarfrLr1dmOyVm5VK61qpeVVmpZf02zvWHnl98VlN07UdvR5VQpeexKl/9rHKS2/3ayM1SvtWQle06vUW5OTUx3Prh7efSgxGI0cHIEHYqH9Q+FDw7HDo/HeINQbjvcG40eC0SOBRE8I6g8n+yKxntH4kWByIAIPxJJ9keiB4dG9Ax+/+WEqhjTGpkyvLBZL5fbEZKcjKHpnutOZOPb/lWfFoxN/nqp0FkqP1irTY82OrvqeM95qdDrTnRd/9FJwNFarj1VrraLja3pJLziOU3fL4543Zrvjvj/hlsd9f9zxm65Xs7zjqtStloqublhANcqaNROlkmZKmikrmqTIkiRJkqKpVtGsmGaZl0uMZIiGrRU9TbM11dKVYkEtFdSSrhVVrSBqpqAamm4ej+Ixmmq2ptmG4ZaKXiZN/uwnL7/75nsfvvPBx+99eGTPZ++//qt3X/v5oU/eoeGwr7KunNNoRMQSCgbpJFzMYSWOtvKMnc9bfN4WODOHdeVpt9UIzMyoVBKP9KeGD0p4HNC0wGYYeIhLj2ShESoWEFFEJchE7/D7L7/+5N0Pf++BJ3/4nWeG9uzLwwgHQwWGVIi0jGeyiXA2EdaodClPgJ+lZ5NMaoRK9PGZkMWjRS7NwoEsNAI0Lkg1A3B20Q4qrN2Tx3O8aWSkFw0OKQRs5Skhk6Djo0ImoWfToGv3eL4aMnIplUqIWASQEsASEBScmfl1N2QiKeKQxmJaNsPAERoK8mhcIlIAnxOekRg8+PbLPyzmCS4dzSaDVYNn4IiWTQt4hMsEDRaWyZSAomXZPfDWwLKvbrngtKs2Lb5j2zk718y7ae38Gy8+94EN8x/edNYzF5/7/Jp5D6ybf+emxbesX3zVt7feVNc9mcBNFpOpeFnPqlloYM/7ei7DpaNg7fYsx91ZKAW8l4gki8bSscFcJsHj6Whvz8evvz7uulQK4si0SqfLOcKDYh1RxN946/r5i4y+kJ2S9vzi0Nlf2rB+wQ2XLLp36xm3rfgfl9297jtivyAHcuJoJjccy41AfBDVhmi5B5dGaPJwKtubpg/D/AAuDWDk3qgyROgBktgf4YcwJcqlD0Ie5b71wjtf/X/mfXP9g2sX3rrijOu3LN118XmPrl1430Vn3LNm/oObljx26QXPXXz+02sW7Fq9cOf2Cx65dOWjW5bff/7pt1yz5pm1C29dt+iG7Rfe+L2HXj7y8dBkZdqUChiMl4ru2PiUXW7mVYsSTEoww0k0L+tuueWXG57bqFXHmrXJqt/03IbrVG27VrTLhlWWizZvWHm1yP8+QWfOt5wchvl3dZxybAajuy+z2gbzMEW7DBqyJ452fL81OdkZG+t0pjvtxsREs320dXS6fbQz3pkam5xsTLYb402/2SjXW+VWs9IAj02/WfcbE2Md3x3TdafV7rSnO0W3Um6Mt9rTRbtcrjRBsd0q+aZhWyW/Uh77t2bb/22U/p5l4/H/gmq1PT3dEQTDceqOU2+NTT3+xLNvvPmuZZfLlYbjVkpFt1B0rJLverWy3yhXmqAHG5Rbyn7dcStWySsUHb/ccN1GwapopitrvzPnlDUHZGKPR1HViqpqgYXAx1rwDU853qAry5ailFQwAyMXBbkgqSVZK6pmaXYYlmpYLK+IiqkXHLPkFSy/5FS8SrPRbOcYrr+//3vPPbtv94clOZ/HUnkkVsiiTU0ycMzOsX5eZ+JUejjDpiQjZxq5LFA24NMZfBCDiqDBoNlkMJ+JiTgkYAlbpEsCqmSDIjnCpkPjtm1Q+i+f/c23Nu486+82LfnS9mX/eOmqeVfN+5/n7/zWg9kY3alMENGoRqEKmZJwSMJ/5/YnoFEWDhq5VJFDuzvUwCgqmHsBihmMw3bdfcGwLJMaBc/hkJBMJFLDh+lEACw2d0TaZFCZSPKZyO/vkouDIVoRiwEzB+CLNNMpCfg8gBFbEUsc/4WTBT7L4SkiEdIYwpJYgUyxGSiLRPQc6spM7yfv7H7zF7ZAOSKNhvorGqdSMPiJCglJOMSnIQUnbNYI7o2c/ZWVq+dec+WKBy469aaN8++78Gt3bF/y9KozHrvs/J+e8+W7Lpqzc8d5D25edvNFCy5+/O5nj3pjRY4TUdBTHVWoqE7FOGQ0lwrlUmEBg/QcCpqhRDypZTMgVDotk7CAQTyaEPGkQqYqEkmG+00hq/Psr3/ys7plkxkYw+I4HXUMsoJEOlim8snBR5es+uDh5+qUJoxQNbry5PVPXfSPa+7ccu/FCy67d/uujtExo5IYoNmBDDeUZocz+eFMfhDND+D5IAntD1P9mewAmutDhADG9ifzQ6n03kExAGMHg0KQYoeZzGHqwq9uWfb3Wy4//4GtZ9+7dt5tq868dd38Ozcuvm/H0od3LH90/Vm71p+1a/1Z965buHPtgntWz7tj1dzbV865bfk/Xnv9pu+tWXDLZat2zfn71bvfDnRanYJcNdWyrtk8r5NZgRN0o1Q1ihVWME2rphZcxfCMol+wanrB00zfKPrgepRUW1CLgmLxSoGVi/nPidFuzLID7DbSf35TqXR8ewxYbtoVrMcUrWQpchH4M4B5gZMo/Zcdp8z8ZAcVO/Cx7nq1ZmvSqzT9+phTadnVMcOp+q22X2tWa616Y7zRbDea7XpjvFprVarNZmsCnAEna/WxWn2sXBurtTtufVItVSpjnfr4tFkq++VGudJ0vVq1NtZsTNSqY45bLVm+49RB8e/PKdqzaXo8XK9mO5XW2FTJ8ienOq/9+i0Ywf1yw3OrtuUXC06x4Fglz7HLYJy07Ne74blVxy6Xim6h6Hpe03KbZqkKtht2r8AT3aXOvCZnRrce073tlVRb0W3VsP4gSvWSqxZsxXRkwxZ0i9dKnFJgZbNYrmXzYiwO7f7koz0fvJtD4jZPs1Ao3d9TIumOW//4l+9cvOKSCxds/PaOe6BBvJDPA4IeWyRCJEUckslULhVSKJhFIiC4dNRkMZGIcuiAmgv5Kltk5Xd++vGlK2676PTrLzrtjqsvfGHLoke2nn3f0q9ctuO8679774vwIOJJpkpmuhVWYGoIVG83Ydt1YBCxWC4ZOOaDT6e6G09BEReYH4EENWiSYuEgFR/qNifPHOaZZerUBSpw8P/fR6lEpPB4UM4Rej4r5wg2A9GpqEyjlsQKGLT//Tf2v/drNNTPwmEJrGFPR4HslomESoHdAIhGUjan02H6uzt/NP9vLrzo9Gt2nHPf5oUPXLf2pxvnP77itEfWLnxy9bwHr1z9zKUrH1j81U3rl1727su/bRUqRi4n44hGp3QqYWYTRSYp4VEBjedSYUBTlU4rFCKTsJbNyCQskzAgKwiJSClkion3mxRUNqQ8jr37yutDh3qKBY0XSYZNyGTQHj3SydGfXnv7L7df54So3GBGDNBykKmRNn4w+bN7X4h/NNKxOvGPRph+lBvEhRFKGqWUUFYN56RRih3G0P7Ukbf24/1pNkiLIdqAOOJwOD+SzPUH88PRzP6AAfHiqPjRDw6c96VtWxfeunXxzvUL7lp15q0XnX7z6jm3rV9w16ZFO0FsXnzvzAAnL1764NIvf+Omrc8vO/Wqb2x54PxFl02Pd0rmeJ4rqqonaw7La5xgqoan615eLMiaw4kFVjAFxRJVm5dLeanIyyVJcyTNEVVbUCxBscD5L0DpzHviWcvUZvbuduXpzCt3plTVFEdTraNTJ1H6f3qccqJPdterNZoTfrVlWF6jfdSpNIpupdJsu9UxvzperrUr9YlKfaJca/vVca8yZnsNEJZbt9y67TUcv2mXm7VWpz7WsbxWtTVVa05Zbh28ebU2VquP1xvtWn28XGkCvp5EaTdKlt9sTTZbk5ZdnpzqvPrabxS1YJi2bflWyZuJUscu25bv2OWuS4PrVGzLByh13UbJaZilanfgDNzDzrreunEilHZf2C3JKLqrGg4A5++HoxqOYZUV0xG1kqiV1IKrFlxJc/KyaVhewfY03XzrN2/84sUfkFDYzGGFLFrOMzadqwrqd3c+etW6K76946bz569/9UdvWqIIHFxBAAEqEUkWiRgMyqWjZHwkE+onYsMmi+kMwmaGBTzUKpnpEej2Kx9Y+g87Vpx642XLn7546dNbFj162XmPbVp8x4bF31pz1sWvvfBmXfesPAPGT0F6FjQ0lfIYkJjAaxBoUyY1yqRGgRIFFhDduViFhIAjP9Cj+XQ4nw5noRFocH8pj4FJHuDuBPQoeNofNEr8ApR2adqVpBKRyiFxjaOlLE7BcYFADI7icZiEwtDQ4fdf+Wlq+LCvMGRsWEDjzaKUhUbB2wLLC4WAZRzRKcpipQKtHX63d+XcrduW3vDNNY/O+W/b1s+955qLnl8974GlX731/NNvWb/kjs3Lb75w4cWP3vksHiGsvCpiqIynTCYN2olLLKJSCY1GWCRKxEZoKJjPxIEAzWfiAKICBol4EmBVJmGJSOrZpCOSBYYs5fPQaPjpx59AMRhFIq5ESJG+DpaEX/rZkxdtyH9wYBLV2F6EOpSijiDcIFEjbQfRmH4UgJPpT0ujlByk2UEk25dkBuBsXzJzMJI8GPrtT9+JfDpKDqJiKKfFufS+gDAK5wYiUgime+NanOeG8g9e+fSqr13xjRUPb5h/x9p5d6yec9vqObetnXfH+gV3rV9w17r5d3ZpumXJrq1n37ftnPu3L31g+9IHLln2yOo5t53/tWuv3/Hdc8+8/MyvrE5FxWatQ1O6pLhmqaroNi+ZolJUFBuoyc+jVFCsPxals6ZcunfJs9K/3ad9ft4UPN/QPEN3OtOdznTn6FSncxKl/9LjhCgtV5rN1mS10VYNa6rTccsNx69Xmm230vaqE37tqF+bBI9edcqttL3qlFedAI/l+nS1OV0f6zTGO44/Vm8ddfxmudYu19puudUam3K9GoDosUU09fFafbxSbZUrzX9rtv17QSn4ZymWvGptbOpo5/kXXszmeN2wAEpLRRdwtEtNq+TZlj+bppbvOHWwnqmb+QGVlT9WlXZfCGw/u98ep2n38VjIhi3plqiVZMPWS37BqZpWzbDKCJ4r11soiv/0Rz888MmHOkuKKOSLWYNAChQ2ZhS+e98jy09fsvSMZeectvy9V96z+Lyey3RLawKWACgVcajA4RKRBAoVDQ8oFFzIo1oumU0GbUHY//a+q9betPnsm3cse3DHOY+vOn3XpoWPXLr8sUvPv/+S829ffurG7z/0syJjAWur0AAAIABJREFUmDkKJGy7KAWtQAB+wDkBFGJZOEjGBoH7bnd+FEBRwuMFNgPegYWDyaEDRHRAwuNZaGTmqvDuyOnn95x3mXoilM4Upl2UyiSsZDGBQik4jsZDBkcZHBU4vPez997s+eTdbDJU1fMWT7JwWCFTjkh3raOOvS0BK0Rap4lCjqsqtpyWf/rYr5Z8adXSr2y5YsXObWffuWPZrvWL7968/N6r1z96/pwrV8y/5Jvbbx3aG5j0x2ScYlIJEYWMXEYjIJWIGTQkEwmDQUU8mU2GqMQoDQVpKEjGA3h0uKtHJSKl0mmQ6RVxSKKTDBJEBnrEDJrL4D958cdvv/X6yz/87lEl32HJUu+hO89dduC5Fzqczu+POGGOH8CzvRnokyA3iKthFj8YZwcyRUiQg7QRZ8RRPLN/FNo9hB0MZfsSZF+cHEru//UnR97chx1JcSNkdiDNDCTVCIEdChSStBQkcgM4fpi+eNG3tp910xXn3rd+3u3rF9y18ax7ADU3L75341n3bFh4dzc2nnXP75i65IGtix7YuuTBJX9/zZVrHl12+uXnnXXFO6/3VPxOLmvKqlewaprpikpRVIqq6kiqrZo+IKWsu6rpA3zKuiuqNoguSkGc6Jb3REydRcqZ6d8/uBnG1H3TcGehdHp66iRK/9jjlJn1uZlRq483mhONZtswrYnJju2UHbdiezW30rark071qFObAo92ZWrWGbc27TWm/Uan2uwUi+V6o+16Nb/c8MsNIHYtu1xvtAGwK9XWsdVCtbGTKJ3J0XKlaRacsfGj053OL3/1OoZna/Vx16kAJeo6FeAR6NhlwFGQ7PW9WtmvA+9Ax62eCKUnWrr0BSjVTH+mHahqeHqhrBqeajgzHn8XeqFsFCt6odxVw5rpUjmxWHL37vns9V+9jEORspYv5Yl8KsjGR/NQuKFJoYOHnrjrvruuve2F7zwPByEjR0lEkkfjwDSn2w7Ko3EAV19lTRZLB/toaFTAEgUO59FkkRXffen9bcu/uf3c2y8+96E1Z9576bnPXrb82W1nP7Tj3Ht3LL918ZfXfP/Bl4qMwcEQEJpFDrV4vMBmQLYWTKYCTGp0yuJxlUqSsUEkcLi7ZA2MsoDnA6d7kNSN9X1GRAfAaOzMYdPu6puZKJ1F0y9A6UyaHpOqJMykEwyaknMEhyMCgcQGj7z/2stDBz4N9+wta/lGQeQzMT4Tk3BIQONFDgfbdUQUElFIwiGVRDQK1UiSR1Cb0728971dP9y45NJLzr923l+vmPM/Vl4w5/Jzvr595VlXXDB/6/03PXbko76y5liiLOEYA8dkPGUyKJj3VUhIxBJgtFQiUvlMPJcKA5QSsZGug4RKp7tFU55ISmy6KNOlLFHMZlWeb4+3RvqPvPb8sx1J6WTQl6+79tHt21wULaRQfm/IC2SVIUoMZMUALYxQmX0xbhCtEoVcf4ofQaUgxg3Bmf0BZO9Irj+hRggdyspQFumJ9b51gB5MC8EsfgQqpXg1QpJHInIIywcIqhejerllf7P+kiW371hyz9o5t4Kk7pYlu7ooBXDdsPBuIFLXL7jrGFPP2rVuzs6tSx7esGDnBWdev23FXWvOve6hnT+p+B1Z8hXNVwxP0hxZs1TD0UxX0W1Jc/JSkRMLQIkKigVU6UyOzqTpP4vSE9F0Fko/f4GfROmf9jghSv1yAyzMqpQbjfp4rVJvj000G+1ac7ra7NQanVmPfmXKq06Vq0e96pRfmXLKE47Xtr2W79Unxo/Wq61Wc7JRb3t+vdGccL1aV4ZWqi0Aj+OqtP1vjbd/Fyj1y43W2FS90S5Xmq2xqaHh0GgwZtnlLiYBMruV0S5HK+UGiLJf9/z6iRK8f2ycWJV6quGpennW8zXTL1i1ktMoWDXwEs30S6VKpdr6+KM9P3z+BSQRNfhcLhW2BSIPB5o6k0+OiulY2zanXLdZsGqmqzOcQmWAtwDYfDmz7UgikkRsWMASLBKBhg5lk0GVRvKZuEYTZaV44J1DV6y+4aIzr952zs5Llz+2/ZzvbF3y4PoFd1y8fOfmc65b8HcrXnrqNYcvmTmqO7E606dQxGLABx9wApxJjx7JBHuo+BCTGs0lA2BDCzBOIqIDTGoUtPJi4T4yNgiqrcC/sDvkc2y52wya/u+r0u63v8v6krBEZTgcKYisylJKFgv27P/ozVfUHF7gCBFPgjUAoLwK3gF49IsoxKfjwFhfo9IyjpCRCI+gTcMti86hdw49dON3rt92282X3nPT5Tuv2HD9jVfc9YPHfwKPpBpFv1YopUZHDIbg0YRCpgosBvq2VAqWsCQokRoMplAIyOgKGJTPxLl0TMSTKp3Wc6iWzYAaqkjBJBJm0LiGp1WCyKQSrVo5cGB/32u/7mDMvp0Pf2fD5vTu3XImkwvGhQNRe4DIHUxJo1niUJIdwOQgjR2I0b2QEqbII1GqJ0b3xujeWLYvzgxAfCAlhNJCjGBDaHzPMD2YZoZwuj9jpaRsX1IKYvihMH4kxQ0zUqhw2n9atmneTZcu3bXq9FvWzL0dwBKkdtfOu2PtvDtmYvV3NF1470Vfv/OSZU+uXbBz+/n3r15846YLb9m2/tbpqY5utBStLCiOoFiKbusFTy94quGcCKUnii9wDfyDHD1Rglc6vgl8FkpPJnj/VMcpx1qNjsXvPt/LfqNYcKuV5tHJjm1azWqtMzE1Vms1a+1GfbJRnajXJsBjszbZqE+26lOt5tGJsc5EuzM53mmPd8YaR5u1ds2rTzTGG+X60fHp8eaU59ZazaO1artSGf8duY9tdmvVa+MnUdpFabM12Z7oFIputTamqIXfvPU+nc1XK01A0y5Kfa/WXQtT9uuzUHqitqM/VpXO7LmfoTJ9VS+relnVK8e/OBa67hmGb5rlQqFSLFZLpZpl1V2nnmfF55/53isvvWRrsqVwWGRQIeMlNqVTMYuDzWxSz6b5NETGwhJJlg1NJmGQ1AXTimDEQsumLYEyGDQT6ocDPZlQPxkfMVlMz2UYOKJnSSsvEyH8u/e+uHLu5esX3nj1ykcv+Pp1mxfftXHRzZvPvmHj2ddsXX5FzwcDJVZzBA7sL8unw3wmAiyTihwKdCpY1pZLBnLJAJ0YBroTJH7J2GBy6AA8cgiY94LNaMCeCbwEDfWiod5ingAJaqCqPz8cMmvU8kQoBYnZ2XClEEtiORyRc4RAoSWRQaOBT995vcBnPYVl4AgLh4Hvv0rBRi4jE0kRhWQcASgFvUh6Ni3hUIHBSxyNDA/TMcgTjLFCpamXsWC6b3cvGspoWblqOCbHSxSRS0VZJFriSQFLiDikZdMiDklESstmgPQEzbrARNBgMC2bEfEkFhli4IhCIXoOBbJVJmEll1FZTKDSco7wCgpNpPd+8B52uMfoDcSf//mj564+8sKPq3Qu1tfHJ1H+YLTUhwl9GaYfFUYoMUBCn4zk+pA6Xcj2JZG9I9DugfS+EXYwKYzC2f4ocSRI9UfZUQTrj3OjWHxPIL57VI/mxRECPxDRotn0viDZk2YHWTFozvnLFVsW3HLZsvvWnHnbuvl3glwu4CiQpFuW7Nq0aGeXr+DkprN2rZt73/p59+9Y/ui6JXevP/fOZQuvvunbT09NdFStIShuXrIExZJ0SzZs4AWmGB5QnJLmAM0qqjZg6h+F0j/oC/h5y8BZTUbgKu6iVNack21Hf6rjhCidaHdcp9qojXWOdjgqa6ta3bJNXqgW7ErRrZhOueCAx2rBrRRdM6+UZMPXrZrlN+1Kw6nUS36t6DiKUS3Yrl4Yr7Va1bGS6VYr4wCltdpEvT5Zr08CSVqvjTUbEydR2kVpyfJr9fFC0R1vT7cnOt//wU8IkqlVW5VyY+YSGCBSZ6H0GGK9mu+3bK8FpGG36eBEe4BnXmlf3Hb0u2/1yoz4HUpNs6yqjiSVZNnSNNfQgcGv/sHbv/3o3ffpNCzRpEyjvsrKREzBwwoe8iVUQoNkrL9mCs2SwmYgmUZVOg0KomBXFxj817JpBg6bLAbGJUUcskXaV1kqEShwuEJlOASx8+bBd3q2Lr9m2Ve3rJxz9bqF375+y3cuv+i2c7++4cJ56++/4UGdUkqcxCSjIMEL8rF6FuaQEBkbZFKjWWgkC42AZTJ4pJ9JjYI8rcXjJpPGI/3D+z4Y2f9bNNQLUsGeTBs5BJhOyEQCj/QT0YGuZwJwpgWrOsHk5WyIgvgjUSqSaQqOizSWTUMaQ0Ajfb95+cdZOEbGAyWeKrAYn4kBXvKZmErBEgYrRFrGU0ImIRPJAouBOwkOCRm5jIynZBzxJF7GMDISLbGcSlGeqookLlFYFo4ZeYJFInk0UhLwPBrh0lERPzbZomUxiUAAR0GCVyZhk8W1bIZLx6Chw2Q8AAqlEpESMEihEJPFs8lIUeJkISuKWTIDPXTTDX4cKe4bvPVri9++YWchEFeTaSqSzAyE/TgjHEiIQzg7kMEPxqVRSgyQ5GFICVNaNBv/uC/wzv7ohz3cUEqLkkIgnR+GlRjJh9HkwVEHVwd+c6D/1wfqlMP0Ztj+tBDAqCNJKcSihzDsCLf07zdevvyerUvu3njWXZsX37v17PuABgUQ3bHsQaBH182/c83c29fMvR3gduPCezcueHDT4kdWz79n07JdS8/4p/UX3vrCM+/Vah1BLOclm5dtUbVFrSSoRVEpypol6y5QpV2C8nLpX6BKT9R2dKJhGEDT7mXbfcLJYZg/1XF89fexidJJENVqu9U8WjLdztHOWLU5cvgIEgzmklC8txcZ7E8PDSD9ffEjh+KHDib7epD+vmRfT3qgPzM8SI4GqHCQDgWJYAAdGkQGB8VMBgkE4oPDai7fmerUvEbFa9VrE47TdMvj1cak7TVaY1PTnY5t+fVjs5X/5oT7t0dpozkB7jBKll9vtKc7ndffeIdhxVZzolJugK7dY+vBq62yXwfCtNt2BEDr+fVKZdwtj5ecxqxy6YlUaffutStev4C7subwsmOUGqpZzUu2pLiS4iqKXShUCkZZ5Aue2/C9Jp/XVMmEIfyH3/vR808/N3TwkCVLBZ4hk0EBj1k8qlBRnYoadMxgEnouoWYhNZsCm6JnWaIDDuUzMRaJ6LkMERtOjRwBC7yyyaCaTdkSScQH0fCwmeMUnN/96z23Xn7v6oU7Lpq3deX8bSvnb7ps1VU/fvzF9EiiyIoygdPxUZB6BSb4RHQgPXqEjA1ySAgo0Sw0AvqMQDsS6L8Fnkd0Yjg1fBCY6QPjQwGNgh5d8OQih4o4lIkOiRRcFGmdwzksQaVCjsraCsMTSRaN80SSJ5JKLqPkMrlUGCATbGaViSQLh/lMDCwMB3Dtth0BlKo5nMMRV5cSgQGDo/JY6qM3X4FG+kwWV+l0d3hGxBL5dJSFwwqRVoi0QsAKAR/PG0MKGRexyAx3/pRKwRqV1qi0wWAgE6DnMkUeK/IZnUnJVJxODqnZlMkTSi4tkCkli8k0zmYgsJoG4DOXCvNoAjTrkvEADQUFDDJZXKEQBo6IeNKTOA6Klw1NL4jB+HDv3o+G3nm7k5N/sOGKt2/YNQnRZiyDDYT4KI4dCed7odyBiBqi8sMZdhDhR9D8cCbXn2IGYHEUz+wPqRFaDpH5YaQAMdjBkB6joc+G5DiJ9Ua0ODP6fm/w3f7Up2FhiCwmeGj3kJWS0gfi3AhL9uf/aeWd2xbffOny+9YvuGPN3NvBrMuqM29dO+8O0Lu7bv6dq868devZ9209+74Vp964Zu7t25c+sHbuXRvOemDzkofPP/2WLeftOn/+t1eee+1H74Wq1Q7LOYLiCrrHKSVOMgS1CPp1v4Ca3XLpsd5dxZI0Jy8WZo2+iIoFzAJnnuzy9US3wuBOujtIA17CS0VVtiXR7K7+Pn6cROkfffxhlJZrk/XaRNFwJhuTY3718Mcf46EQB8XR4X41GdWTYSUWEiPDUmRUT4a1RESKjqCH9+O9+6n+I9mhI9nBXmrgEN5zMH1kPzY8lBke/uw3b5UEacyvj1fHy269Xp9sNjtFu95qd8YnO6PBGC8oluV4bvUkSkE0W5OGaY+3p/1yA6D0xz95OZvju7273QQvaNadBdFjatWvVyrjjj/2+c6jE6Hx82WVL8gGK7qrF2t5yeZlp+i0HK+tmb6qOqVSzXfHDN2RRNP36q5V6Tnc/8xTzz35nSdefPa7WDQq0ySTTvoqZ4kECwdsMaNTUZ2KqnRUy8a1XFLLJbUcrOXgrmNOd+clgKvBoJZAkfERaOgQcHJnkYjBphlkuCSgxTzBIUkZpxzexEbR937+wf03PHj/DQ9+74HnDr73mU7zE65r8SwWGXGlLIeEEgP7goc+jvbuwSP9ehauaMzMGidoLzKZNGjl7XYSiViMSY2CiVLwpwCf4LUykeCxKB4dhgI9HJZQGVTncJVBmUxMYzEll8njkMqgjsqaPClSsEjBSi7TnVQB3bYilhDQOKh0go2tII4pVBLOIXEGTdFI4tDu3w4f3ANo+uqPXwB9PaBBqbsyXc+mVRJRyYxKIiqJHH+3JDBaAjvGZSKmkHGVSqhUQqOhPBoS8JBIhCUyIhJhAQ/xWJDHgiIRVeiknEVEChYIRKZRnaUNjuLSCZVOA5CDHC9YViNgEBkPoOFBLh0zWbyYJ7VsRsaRIkGjodBQcCCUGHr35Reh997Hf/Hm4+duyL23/yilZgfjZH/CgXk5gCqjWLYnroYIfgTlR1A5RCphih9BuaF0fjgjBDC6J6WGc+xAhu5JcYOoMEIoYSq5d8iAGbo/ldobSu4ORT4Y0kJsaneAH0HJXogPZtOHEQNxnr39pbO/tOXS8+7ZsPD2S5Y/vHnxvaAgumnRzvUL7lr0t1eBtiOQ5l0z93bw9dq5d11w2q0blzywbflDFy26ZctFd/+vvzrfNjvlSifHlXjZFnQnr1q8UpB0C+Ryu625s+JEKAXInJmnnZXanXXl/lEoFeSSpjgnUfonOU4BrnW/Q2n1aLl6tFybbNQnfafWqjSma43977wjwSkFSUjxkJOJe0jYTgYtKOCno3UCqqBxCwoU4yMWFHBSIQ8Je0jESQUtaNRIjDKjQyaOvf3ij6f9cq1gTzYmPbtaLo9NTXWKdt2vTpBZ4X/+7ZcvufTKTqfTap5M8B6LicmOJBtTRzug87k90Xnxxz8nKXZ8bKrZaJf9OpgutS2/Um60mhOzOHqsjFpulMtjAKWg27YLyBMljmZCFDQZ/TMdSWZFNSum1dAKVV60FN0tFquSVNBUS1OLJdN17XIayvz8xy/94qcv43BawPFSnrMFTqVR4JUjYhEBC+q5uEJFZDKiUFE9mzQZWMvBCp2cuauru70LtB2VeJKGRuFAD7CcFXFIZxCJjKi5mEInRBzSs2RZVWt6yROLk06zVfTbdnnSLdsCn01GWCRiS6SARmN9n6WGD4LZUODSwKRGwdazWf1BoDWpOyQDJmHAPCh4gojF+Ewknw6DpW8lAY/1H4BD/TqHayyWxyEWjZPJoJxNF0VapGCBTOkcLtEIDYdZNG7yJJChoIunyOGulHVEusBis4AK5KmAQRKVUVnq47df3//Re8MH93z05it73//Nu6+8VMyTJosDLatn011RC7TmsaARjUbA3w5wVCLC4L9AoaIqHVPpGJceloiQlo2pdEzEQzw6ymNhiYxJdFKkIIFM8kQyT8A8iYg0pmQxHk0ClBoMBgyPQN1UwCAaCqLhQRoK6jkU7H3LjA7no6nkwHAiFWGYTHjPh0Mv/fyXl33r3evuaWfyVUKC9gaInmRhNMcfgsThNN0bEwLpXD9EHonSvXFmAM71p3J9SK4PQfdHhRGKH6ayvRl+KEsfQaGPw3o0L4SwzKGgFCTkIM30ouje+Gcvvp/aHdCiWWR/CD4QEqJcLpCnR5T5f73ym+sfvOj0669Y8dixUuiinSvPuGXHsge3LNm16sxbL1n+8BUrHtuyZNfaeXesPOOWNXNv33bO/avm3nnFqievXPPYuXP+aencKzauvml6spPOqDRTYGWL1+y8anFKiddsQfc4xQaY/HycCKXgrhdYFAF7+pkGvJ8v1nzBpQoUbRfAgNAnUfqnOgBKW8dQCjhaPVqtTjZqRxvV8aZb7YxPfvbGGyUKN5BEIRX2kkEvPmxHBuzIQDUVHMPiNThkhfvLUKCSHK2mgjU4VIND1VSwkhz1kkEzEW3L0pvff6HTnmzb5anaRLMy5jktUbS88uRUp/OVr575H//ivzz2+NOSpHSmOydR2kUpSO1adtl2KvVG+6OPP0vBGMBn2a/Xa2ON+ng3u/t5jgKUdmuls1B6IlXabc3VC2UQAKgnCr1YU4yyaTVk3aVyMi+Zrttw3Kok6opsHJ3slArWu2++88rLv8hAqZpl10sFjSZ0GjNzGIdEFBLyZLLApUw2qdIxiQgrVNRk4CKX1hlEpiBQXOyaHHXXdfFoXKHgXCpExIb1XMYWaZVGZAqyJTQLD1BQv8ll9BxKxEaZVLKiaRpN04k4EY3waFIiUgwcFvCIIxO2QMT796KhXleiwCLVUh7LJQPHd3cfM2HoehXN3PUGOMpnIkxqFGRH+UyEhYPAyaHAZjyFQWPDcKg/j0MCmRLIlEjBuXRUYzEjT8jZNIcl8jik5DISjQhkSmMxk8VsgSrlCUA+lYIlHGJSIT4TAzTtJnhFLMGjibIhJQIDP3zm8fhIPwmFn/vO/S89/zSVjBQ4wmAwIG3BCA0QuMf06GxVCm4IYgoZPyZJ6ZhGQ1o2LhEhlY4aTMJgIC0bV8i4TMUVOpnHYxqL6hzOE0kOT4l0hsMRLBHUuWMQPb5wLWMwWIEjwFJVLh2DA71woDeXCuczcToeoYMJnWRNRZBpdErMv37nnb+46tvGnr4mIZYyAjNKmHGhMJTl9iWMCKXHKG4oRRwOp/YMJj8dTO8LkkfiTH+aG8TlYI7uScOfxvghpoL5Jahgp0qx344WkXz0k141Qhsxnh8klVHmnadeoQ5DPiZLESK5b0RPS6E9YZdtbDrn6mVf3bZt6T1XrHjs/K9dv2nRzu1LH1j+j9defO5D317/3Lr5d16x4rEdyx5cO++OzYvvXTf/zotOv3nTop1blu467/Rrz/rKZVduenDhqZs//TDGc1Wv0mH4Yl61BN3hlBIjFTilxMpWTiz+saoU3PUCcPJSkRNMQNOu898smn5BB34XpTOLrJriyFKhi9LpaQDMkyj9o49T6idAadkbb1bG6iW/057a/cqvbBJV4qNaeKAMBcrxQTfS50b66qlAG4s24FEn3FuOD5bjg5XEUDfK8UE3ETCio00u9+b3vtep1TvVVtOpHx3rVPy2YVSmpjuJFPlf//vf/rf/76+fePLZRqPF8+JJlHbbjtoTnZLlO261Um3VG20Mz/b1j0y0p8dak436eL02Vq+NVStNYCV4IlUKOni7Eyn/7CTM51H6xUC1vBbN61lOKzhV22sYRbdk+dVaq92eVGUFQ9Ifvf/e9556as9HHwg0SSYTRDRUYEgBTvDpeLMoFdgMHukt5TMmh6hZSCJjCp0AfkMmg6oUPHNXF6iYggDjMSwSIeMjYJxUz2VEIi6RES2X0HJJiUyIOKRQiEJlJDxj8WyBowocZQm0JVAGmxaJKJsedSUKGtyfCfYAzyOZSNgC0R2PATIUZG7B3rdudre7YJVDQoCdeha2BcKTabDQTcLjPBovinQyOJAI9GGJoMoSjsYrDF6UGAqOmkK2KDEKgxfEnMHTcg4zeVLEIT2bNnIZCYc4JJJPR7t6tEtEAFRg0SAQyBsv/+SdV19mMTiHxAOH95JQWGMIkFOdOYQK5OnMcZqZ0WXqcRUOTPmTKhFR8LCCh1UiAk5KZIJH4ywas+RcUcpScBiHQnIOE7IZJDJs5Ak9hwLLQGDFAAZgeDQhYFA62H/4o7f3vvvrwMHdaHiQiIYkMudJpoZiWiJaS0FP7dg2+KOfjGdoZF8/2pfgArQeFrj9/z97bx4myV3eeWr+2Gdn9nn2mWefZ2bH6x0br8GMbQwYhMQh5OGwkcFIYA6DwcgIzOEFY4wAD5hbQhxC99U6utXqbkndra4+6q7Kqsr7iMy4r4zIuCMy8ow78r5i//hVB0W3mrExs97H2/G8Tz5ZUVlZ2V1V8cn3fb/v9y3TJ9PaDiokytWNHLWWxs4nsfMpeq1YSyDSLint0kZGyp9ID9k+s0Iv3X1289FESAwa+Tp2PtOCOPJCjltHyfNQPSOI22TxuS1mPc9sFdkdCNsqEDsIlWKfuff0b/6vr7v5+s+/+3VfesNv3PpHr/zczdfd/pbf/vQ7XvX5t/7OZ979ui/dcv2X3/yyT7zhN2695fovv/cNX/2Dl//Vm37z1j/6/c/efMPfvOG3P/iON33ihte8P3SjCiQ3O2O17uptX217Qr3LKU1OaXNyhxEbsRXDJXEllCp6F1ATsJAXzWrNADS9nKPygQXgl8Tl0l/wvtnQLIBSIOIFKL06V/oLHPsoDS5F6dy1R8NgPLSCaDI989ijFoUZhZS6t+YWd73CtpPZsjLrQWF3AKd6paSVWe9DqRDaDYt7QWkH3PZKyaCc6RTTfY4+8eMfRa4f9SaeaU/7keeMfX8e9KJf/bWXb+/m/tOv/NrNt7x3Op4FQS+4itJg6AdD3WgtoqhudsLeeDKNgEXUqdPnSkUYgQmWqalKHVR3A38QBsMryY7iudJLUHolNL4oSq/0YM10FMMyrUDUmlVRdfxBMBjTDL+xsZXc3VtduXD/T+7+7je//vyxp+FilsMRicbofEpGCmIlp2LFbg1XiAJd2FLJvFGFNKYIMp6L6EJ0umKwCNjVdUm7FIiSBDSPpDaQ1IaIFQwWUaiiiGcaNdjkEQHLSnixIzEdqSrh5Wo5V69ibZGWiRJTSjLQLo8keSSJpddTy89j6XVQzgV+uYAAHonjAAAgAElEQVSLoGYbD5sCfIJF5WYVjo0D441vGlWKTQf3Pe7RfEet8jjE4xBWSCK5XbqSoyu5ukBX0aLbUNoqT0KZcno7l1iFszttheUqWRHNg16pSkISVjAY2JKZBoeBbeFxM1WnKwaLrpw89tzhQ1UU4rCyymAyhehVQqHR/WkTEoqVSoCmB/2SDoZGVsCM6cWq737t16AKKp6V0bRG5MCuG5ko1ZA8XU4bPC5S5ez2heT6ObqSExmEKmcFoiRiRaDdbfCERsNgrrRZIy2l2hZpYNHQldm2SIsEQlQwBa92ytgUJc5+4x++9773ws89W9tNnjt0bOPIhfKpHP5CGX02S53MsmdS0LMr2Lltej1V2ymJu7CcxJQkLe3S/BZBnEeoZaJVaH/1A1/7s2s/+sm3/N/f+shdPhYoSVrPksxqkboAIS/k9BRfz9Syx9Z2jyyx2wV2J8+my3QKLq2VZLj+pzd+/FX/6ebXv+Rj73rtF9/9ui+9/RV//a7XfvGW678MhLt/cu3fveu1X4ytBN/6O5/5w1d/9l3Xf+4Df/h3N77qQ9f+zrsf+skLs1Fk6L0KJrTcYccfN9ye3LRqWlfQLUGzebUj6zbwCLwkfk6vlBdNQW6Ct7m8aLK8XpMaV5Id/RzF7yXTMiCFreu2qjSvovSff1yKUieYu/7C9+eeMx4G46nXi4ajc0887pBoB84Z6U2nsOcWd53sTiu1bqW3ncKOl9/rZDad7E43u9VNbbVS653kZju9YWcS3fxOgBRHPLv0wP1Rvxf5vV7b7TmjfrhYLKJrr3vrNdf8u1kU/Yf/+Ktfuv0rYk0aDsdXURp78IKsNOyNh6N5fzDt9SfLK5u3f+nvH3rwsVQyZ+hNUJwHhkcHI2aqZQcApZe7Hf2crPSgG8NPqfmiD67bTE0NJ1HTCmhearQdTlROnT778MOP3vm9Ox579OEXnj9RzqetutYxJJFCNZasQZnyxnkmk1DQQrWwoxNF3+BaNUyhiiBUqgw4Afp5NSQHApgcgequSpXrVRR482KZreL2BTAbo1Jlo1qRiDwga72KyQQk4WWNRhs8oZDlGpKXiVJHotsSgWbWz584xJZ28cxGbGAESrjAODDug8YuCqCKCzwWwKcMphwzWMJywH1XRLOge6ozMIfmFRYzalR688KFk88k18+lNs7nd9aIUrqKFgu769sXTm+dP3X6mSeWTx1TGLglUEAlZMlMk8e5cpop7sl4EaAUSIfAnCiQHZ155snk+gWvqROlrKUJldQ2ltuTSBgUVOssArRLoD4cb7+5GCWFKCk4pODQRVnvRXHvRYmvQZbAwlSThussYtCISlVkolKFCzUMosrZXGJ1Z+V0fmeFgjMiVabLabqY5CpZ0DFVqQrw4KUKewJa0BmkwRMtgWrWSAkvIbkkBFV4mIkYxTx5/ns3vXP9R3euPfVIfn2lspaGzxeY81j1HMGvEfImIa8UldU8fm6b284paUTaQ2qJSm0b47dwdg3X0yp+FvvkWz/9in/72ve84kMfuva2V/67N9792fuHjI2c2RUTqLxDV1cQaYviN7DkkQvo+R2tgNGJNLWX3zu9tnz0LLZHHP7JmU/d8r3rfu2jN193+y3Xf/mGl972J9f+3c3X3f6BN3/9Tb/58Xe86vPvv+FrN193+w0vve3NL/vEO1/zt+9+/Rf/8Pdve+Wv3/S2az/y4+8ejSZRoz42m4PJIuoGEyscN9ye1OhyWqdmWJLhSnVH0qx/UlYqax1OqHNCHSCTE+rVmnF5MhqvfLmSZ+8laiPgBqybzlWU/rKOa0JvCJZlAs2REyxcf+H6c7s78K1wZIcLxz3z2MNtBOrAuXpywyulwlLaLySt9HY3teXmdv1C0s3t9qBMUEx5+T03t+vmdr38XlBMBVC2nk7YaOXEj38UDfqTjr0Ixz1ntFhEXK3xv//qb73rlj9/2003/8//y7//lf/j1/7+779mms2rBV4Qw9HcD4Zdy7ed0LIDYK+YL1SqrGDW277Xd+xAU01RUBtmJ/AHnbYD4iBQu5bftv5pxoEH26X/GNmRqDW1RkdU6mFvNBiOT548+d1vf2dnc0OpVZFSrqnWBm5TICscVqoLNAtnmUKywaB8KU1lEg0GFeB8cfMCntkC8/77E5ZYScZKCl7RSITI7RC5BF3c4yoZESuAB0h4UUDzGl2pV1EWSpV3V3k42+DxeB0b6M+BoUaFLEt4CZjvAC910HwVsCyPpAUkA0qaBlPuSiQQ+AhIbr/LiEMqUdYpuM6gdQY1aCRWGwHuAmWvQhV1tqwxUDzDo9EVHs5Shd1KehPJbue2Vo4dum/p2FMUlEqtnTv80I/PP/v0ySOPPP3wvZtnnyWL6Y2lEycPP4bmEnByI7N2Bk5u1KuorXIaXVHIclukNBrWGVhnELC+WyZKAlrg4Vx2e+3MsaM6x2KFtMaSSGZn7LSIQoqHCwJakLESsAwEJWKDgePCtUoW94dhiLJKlGWsLGOlg7cSut9eVclig0EMBlaJsoyVgP+fymA1vMghRQbOVtKbma3zSC6h8zhdyWD5HTSXYOEs8N1VcMigkXaN6opMiydlAqqWMxyaN3jcMsSuaXZZIYKZ+97751+58S1BCTryo7uQ3b06XJPTVWWTqa2Q/AZeXS2LF/JBkRO2iloW07Mkv12mlvPMWlncJqWdqp5W1x5a//VrfutTf/SF9137l+/+vY++99pPvvU3/6S2Q8sZonI2ZRRqSobDlktRZ3HyniN7z62ce+KZwsrW4z+8d+fM+qM/egjN4MNu1K1Ft7z5i9e/7MNve/Wnb/zdT/zxdX9z7Us+8l9f8ek/ef2X3vTy2274L59426v++u2//9n33viVP/2Dr77ptz/yG//bGz754f927rmsIQ3nkygMIlm1h9Oo64663qDe9Wtam5VMXu0ohqMYzn93GKamtWtyk1MuFngNqyrUWV4HJoJszeBFUwW9T1C5BXRU24Lc5KWGIDfBtvDLbyWtowDHfKUlXESpYfwMSufzeRRF8/n0Kkr/qcc1oTcG+0pdf+76C8ePHD9y/YXdHfW9oaU1o+Ho+QfvsyjUxku1zXNBMRUW95qJ5WZieYzkxkjOTm/a6U03uz2sZJzMVnt3NSjserlEN7kelDN6escmkON3/2hhWXO/b8pmNI9cf66Z/g1vvfnd7//YbZ/94jX/5t9e82/+pzNL50bj+VWUxlnpIopabcfzB0DEOxzN95I5jpcl2QD7ANodt9G0wG2r7QCBUhdY71p+1/I7Xa/R9syWb7Z8YIcb2xW9qFfn5RXgnzFGMZ1GO2i0A61ui0pLq9sdu9doWhRZ1VUjWkTZ3d17vn/H3tp5gaw0JdrgMZkscHCKx7I6BzdEvFkjGjyhkUidIes0LVRgrlzmyhCeSZL5XTK/Qxf3WChdQ4oiWhFRVERRR6mZVbQKpSq7q6XtC0hynS0lRTRfhVI6XaELu6XtC3hmi8huU/mdJo/X4CzI6kDdssFhDQ4DAyF1FgFZHeg76nTFrKKtGlZn95M8kAoDroCt4BpB1GnaoGgZxUQYk1FUIaE6V9aYIgMliPwGjyRVuqQwkMJUanhBpss6hyksonEYVthdOv7E6cOPPHXfXU/d94ON08+IWNHRuI7EqFSZhdIiVmjwRFdmTA4n8ztbZ048/8SDTz7ww2ceu3ft9InS3hpZTMt0pc5TYHBTpis8WhKIkkKjOoeZNVrnya1zS8effDxst3SONQUezadqWMUzFZmo8HCOgzIiUjBppMliBlkW0bxyseWsMzCwjAAFc50B8i5IJkoqtZ/6xysEFKIU+0soJKQzsEKW4eQ6tLMq02WdgTObZ/dWT8tspcaWq1QRg3YLeytYZkshSk0WrRNlFc4LpbQE51QSkumyIeB1mZTwYgsrW1AROnzkC295e+qhJ3YePowsbeKrGSGB81s4t4awKxVmuVRdK4hrRWm9JG2jyh4hJlBuo8ytVWqbuJJgtGRN2uGrm9wr//21b/vt97z39be983V/+er//M53XvcRA9HVclUoUkwKK1xIbTy7svbscuLs5qmnnjt0zyNHHz2ClbBoEkXzKPTGcq3tmBFRbN/59cM3/P6HX/2y97zt+k//0Rs/d8OrPvn63/3426773I2//6m3Xf/Zm2743CtecvPLfuUdf/yWT93+he+X8mw0i1x7Kokd2x77/lyQm35v3rb6it6tSQ1Bbsr7m5RsUK2VY6qp7ZrWFvQO0PrWtDantXi1xev756W6xastTjQ5pSnrXaXhaKYj1S1Z78bQFZSWoHckrSPoHUFp8WrrRW9rWltU2+CR+/eVlq5bV2VHv5TjmtAbhx5Y/f0zKA3DKJpFA6sXTebPP/Rgm0BaSEHYvuBXMub2Sntvw8vvdVNbQTE1qOQaidURUtDWz/mF5AQrGZsXnOxOxGKd7I6W2zMR6NCdd0w6nanX65jdxSJygrnR7o+iyB1FbW/0H3/lJceOP99sWVdRejC6lh+7E4MyL4YzqXQBJ9hG03K9ftfywdSp5w/aHTeOTteLmdpoB5dzNEbp5VaCl3dSwZmDVrrgqRS9qyhNRa47lutb3saFCz/8zreWTjyt0WiDx80qbFbLYIJCobImDzVqsFGtmBymkHCdpcxqVcZIGSNVkqzBUHl3DctsVStJja40a2SDY2Qc58plIrMrILkmj3s676hVg4Gp/A6UWAZlTzyzlV45Xdw6DyWWS9sXqPxOV6LrLAIysFaNaPI4aBACZQ1oNzLFPXhvjS0lmzze4PZlrsCUwKARjawoeKXF0wZNqDhuUFSdZnSS0gjSoAkiv1VD90y+0pYwk6/IZI7HsjyWNQScJwpVNG+KVEvjcSi9fu75Cyef1mi4I1K+UXPUqkKUqPwOeBPQESlgwgDqrqD9qZCQXiUkGimnt88/f/T4Ew+dOf5ULrHK4xBdybFIoasLMoNyWEmt4hxWaso8i8LHn3iykk51VAVK7g6sTtiql3a3WCjLQlkJLTaquEkjEpzX8FJXokU0LxOlgxO6YMSohuRA0g9K6LEBE+hPx8Jp8IU6A3ckWsQKeHa7Wk6DoV6ukmnJdF2lFQkXGIhFszycFdG8CGWYTEIuZ1U436niOl0RsYJAlQSq1OGxkITqibW7br310N99OXXoGWJpS9mG5QQhbpPiNilsEcI2JmzCwlZZ2oSkTQg5nWJWKq28YKRY4mxBTlCdgsquItIOX3oBuvE3337Taz54yxs/ftPrb73hVX/+sfd8yZZ9rkTtLm2+cOTks4eOPfv48aXjZ1aX1izTBgT13H6rabte33ZCVW3VuMZ4EHlWtL6MfP3Lj77/5tvf8sZP/sHrP3ntK/7i9a/++O+97P2/91vvecsbP/H+m2//u8/d99ShldEwajQ8khRJUmw2/ckkGo8j2x7a9rDVClS1IwgmzxuCYEpSU5ZbP6Oh1buy3gUc3R+b0duc1uK0Fq+3eb1dMzpAAMxKJiuZnNKMuQsezylNXm3F0AXcvVIAVB/E9lWU/hKPa/reECSmvj91/YUTLABKJantucOW1opm8xMPP9xmyTYJN+G8ntsZMKiZ2xUTqyFZ6Zazta1lq5LT09tDFmvk98TEao+CbTgv766HNNbCyiZeefwH35/7/sQfuFbY70ddd9LxZpzcGcyj8TxaOr9x7vxqw+yMhrOrKAUxnUVVTppMI9fr+8Ew7I0HwxlBVrcTKZqpdbqeZQftjuu4Pc8fAHa2O26r7YBod9yu5Vt2EKP0oH0uaJm8qCXv/ojLZZojUCIGjzca7v7T1q1W0/Ycf+D3N5eXjz/5OFZIK2TZ0TiNKhlMyWBKGlXQ2VKjBte5skoX6hyskJDBog2eUklMo/B6lZAJiEfSbHmHLW8LWFpnyw0eNzlSo9EmRwA07qtjqLJZRVs1gshuC0iOzCUKm+ew9GYNzgK9K1tKIsl1NLVRg7MyXuTKab6S0emKgORqcFZAcnwlg6U3ocQyld/Zbz1SwLjgp/OXsWOtjBd1ugIEUDJelPF80OBUukAWNsnCZg3NyGRBoiCZLlPltGOKVTRf2F3FofTSc0eOPHYfjxd5OAf8+Zo8rpIQX8lIWKHBYW2BBCgFjvMGAzd5vCWQVbhgikxL4UQKziVWnz/y2Nb5U35L03mSxyEGzissVhdotYrrPNmUeZVjjh56dPnk8yxckWly69xSIbHBlAuBqTR4qlbJ8eVsnYK7NapVxYDnkUyUgJgL1MlVqmxy2MFuNNgLW0NyPJzl4SwopMfclfAiU0oCEhO5BJxcjxXUClOROZinilUizxOFGpIjc4nS9oX86hlib4PN7nRrZJ2qADUZkUu0WHhIo5v33f2Fd9yUePjxzBPH6ylUXK9oe7SwRYjbpJSg5F1S2cGlBCxvlaXNsrpLGSlO2MTxpTyzXFJ3KXWPFbZINSPWy+bD//D4R276zKt//S03vvp9n7vtrlNHdogcu/Lc+aMPHV49uawxSjSMomk0Cafj3rQfjHv+yHP73Y7XbNmWHfQHU9vqWZ1+Xfe6relsFHXM6MILyPe+cfRzf3XPlz738Nduf/yObz7z9OOJYka121E0jVrNfrPp+/50sYgGg8g03VYrmEyidjtsNv163VGUtiCYtVpdFBuK0v4ZqwS9C9argbQS4I1XfwalnNIEEQMVTKlewkjR6Ep1SzbtfwxHY5qKavsqSn9ZB0DpMPSGF2VHCxBesFgsIqvtRfPo+GOP8eUimtgor51vYFDh3CmllOlQSOaFZ5H1n55h9jZr2V0xnyS2V+ndjVp2l9xeF6FsrZQ7fN+90aA/8Ho9f+Q4I9efB4NoOI+mUaSbjuMMwGoCgZevyo5AzBdRlZPGkwjkppYdjMaL9Y2dTLakG60gHIG6bqfrtdqOUW+Dcm6r7TRbdrNlA5TaTtjshGbLj4dKX3SQ9JJ8FBC03vRALgtoCjSEYGOaalj1pme2fMPoGnprNpnXVe3Qgw8ePfSoRGM6g5CFbZUsGkypzkI6XdTZkslXAEqNKiSTBZAJiVhRJiCNrghYtlGDFTrDIQkOSchkps6V6xxsAIMeqhwjR6crgEOAoPDeWm59CUtvAgUNW0qmV06DTzHFPTyzBe+tMcU9g4GrUAqcQZLrVH4HPNvBOUudggFKgXa3BidFNK3RuWat3OAhhUwL6K6A7oLqrohnBCyt0iWTR7QqIhDFtlolSslzzx1++tF7XjjxVH5vncWKAgnpDAIAL+PFJo+DgVHw3S+OoJTBP1BAclwlI1HlGlHmsFJDYgWycvSx+x/5yfeJUtoyxI5Wy++saRyh82QusSrRCAllDL6a3Fg7ffTpww89UNrbWT753Pa5F5594lEWyjZ4qsWTApyX4Lwl0K0qRhd249QzntYFcmjgyMhVMiyUYqEUU0qS+R0sswXtrACailgBrLqjCrvZ9SUil+AqGaqwi2e3FRJq8LiIFajCLvjfkCioIZINkZSJUrWc5ioZrpwmstsqVqSzCQ0vuTIrlNIBT0vb63fdeuuz3/gO9Myp8olz3UIVfSEpbBHCFnkxCHELE7cQabMsbZbpC8V2QebX0eoqHGCmmqShk7t6hsdXKxqktRknv4Y/cOfR73zloQfvPr1xFvrxt+87e+yMTIqzYBoNo6E38juB1w0mw4VZ76iK6Xr98SRyg2Hb8m2v7/n9fm/c7QSK1BH5jlRzu80omkaLcTTuRdNBNO5HbjeyO5HVXhiqzzCaYdieNwnDuedNHGfkumPfn3a7fcsaWNag3Q5N0zUMu9Hw2u2w2Qm1ui3EzUvDEtU2LzWuhFLAP+CaFKNUqltVuRGnpAdpCp7kSgGeSjS6V1H6Sz+u6XuD0B/so3R/m/fcCeZuuAj6C01tjHujk8eOEcVCbn0tsXSayKYKm2tUPlOFCumV8/mNVTKXLm6t04VsZXcbzyTBh+WdLTyTLG6tl7Y3kOTOySNPLfqD0Al64di2h6NJZPvzcBhJSncwjmyrN59EDa0Z2FeHYfZjMJyBnTDAn6HdcRdR9PgTT0NlrNP1/GBoNrrNlm07IajlWnZwMDEFaavj9lrdXiw7OojPF+Xoz0GppLbj0i4YrYExbmUlsbqymc8Wnjt2/Nmjh/FSvqPVek2lJeIaVaqzUJ2FNKqgUHmjCpk8AiZeRDyjUHmNKQpYWiKyOlsS8YxEpCUypdCZOp9vy3BTLCt0hoN3anBawgogGQVWtGBEpCNSlsy0BdJg4AaHBXXB03mNKnPlNMAtMLAFqSpfyeCZLRHN1+AsklxninsdkepKdA3OxsIig0YARw2mZLAFCU9qdLZZK3bkkslnZXJboRImn0XSF+oc7BpVk0eAy1JbYRoiWUXzTz96z87K6XJ687H7f5jeXo4mgcIizRrZ5PG2QIKXCqZCQeIL3h+IaB60MA0GrlfRtsIKRKmc2hBJyDXFfGL5ift/8OyTDyYunBRJqKNWO2pVYWCRhFoyUxdokcRFEscLOQoqPviD72+fe4FDIGhv+7Ef35lePdviya7IiEihWkpLaNGg9yeLwJoaULAFH4INAXByHdpZQdObVGGXzO+g6U2wva6G5OjiHpnfqZbTeHY7s3aGyCVqSA5sjW3WCJ2BQY037lKbHGYKhMxWZLZSF4m2wigkJKL50sY5Yne9S6MWDk9F/tG//eJ3PvRR7tyaspGSNnLtHMssl9hVWErQQoKqbRL8BlbbwIRNVNlCtQReXYXrqZqR4mobWHW9wm3A8h5l43WtJKw+vZw4vZtahnaWy+sXSnvbBF5RomkUTaOxO3Jbnt8J+t5wFE76wbjdcsaTaBFFbjDs2IHbG9nBwGh2OlbXde0w7AO0ONa4Vm1xTKvTnNWqlsDZhhoqol3jTIFvCHy92+277tiyBo2GZ1mD4TDq9RatVuA4I9+fhuE8CGauO3acEcBtxx4YDRcIbi+6WLeqQj3um8ZJZIxSkLwC4nKiKapttW7/dFpG6whKqyY3BaV1ycbTy2VNB8dvJOB2dBWlv6Tjmr7XC/1eCJaG+mMnmDrB3ArnwSBywxnIFzVFj+bzaDaf90MUKkSLqS7VKoVsNBt3G0YhvRdNhjxNuJ2mUquyBOq0Gw1NZnCk2zB4ApVpEivmo9m0F/Q9f9Dq9vrDqCZ3bHfaG0SOM/Kdodfp9Z3BYhxdRWls0RCEI8sOLDsYDGeu119E0QMPPsZWRbDqFWSithMCaZJlB7HUCHDUdkLH7XWd4cG50oOrIV6Uo1cq8AIeg3E0yx2ZLX95be8f/uGO++97+J67f3LHt79VSO/57QZWSDKllMEiOg2Z1XKdhVQyD3hp8ojJIwqVr6EphcrqbEEi0jpbaImwUS1KRFYmMyqdM6pFs1YyayW9mlWZbJNHQa31IHJAjzOeiazBWSBGJXOJBod1RApUU+ss0pVona6AZLTJ47bC8pUMkd1WSajJ48rFTSxAlGQwZZ0u6nTRYAs6k9OZnMFmNSYp4ts1dFNjdi0FVqh8nYOBQFdA8waL8FgeSq4de/z+jbPPthS2bxnJzfNPPXLP9soLpkhVyxkByYFvIeNFcL8jUvHsZmyoC1BKFfYMHgewdOqCa4o1vIjld5584IcbSycGloHmEnBma+SYSHa7uLNOVwo7K2efP/zk8qkT6y88b3B0Q6gKOJzfXD5//PD5Z55A9jYaVbzJEWC4yGARhYRAfgm6niJWAKteq+U0mt5E05sslAKGGKCWy8PZajmNZbawzBYLpbhKhi7ugcowkCA1eFwmSjUk1+CwBgVraFGsZGtwtopkaTRD4zmOLnFkQanC9SoqlNLk1qqS2jVSe5UTz9563RtPfONO+MRSM402M5S6hyl7FHWhrOzx0k5V2CJrm4SwQUjbpL5D1feYAGtWV5B6mld2mfTRNTVNBUwzcXwls7Szenxl+dn1R+556r67n8gk8V4YLeaRrrQG/iiaR4tx5Hb8lmk53aAXjutmp2MHXjiy3F7T8tpOYAcDvz8YT0fDUeg4lm3bgT9wnZ7njKN5NBpEndagrrvd9sC1R+2W12m7/d6k2w09bzIaRbNZ1OstOp1ep9MLgpnnTQBKAU2DYBaG834/ArslQJUI/BkKSosTzRdFKZARAX0Q2CcTLzqV9a5mOkbT00wHUJaXGoCmPycuQamsda6i9Jd1XNP3g9DvhX7PDwa+P3bCsRNMrXDaDWZ6w29Z/aA/q5udIOhNRlO7a40G4+FwPJ9Hi0U0HI5Ho8liES0W0WQyM83mcDiOoqjTsXq9QRRFnuOOev7Ad3zbWszmg/4ElBxtb+yHUX8Yed5sMYs6Ta/vji3T9tr+VZTGKAV6IsBUkJgePnJcN1rD0dz1+majG4Qj2wmNehugFOATBBD9Om7P9sbxkrUXHYa5hKNXkh0BlILCVNcZdp3hbgr6wQ/uW1vb4KucJok8TcgsZYoMsEGILW01qiSTBY2BTA4zOUxjIBHPXaz0ZoxqsS1hJo8cVJMqVFGlc2at1JYQCcupJAT6o60aYVZRlYRENA8UNBpVbgsk8PFp1QiVhICuR0Tz4KuA7Ai0SIGlrUKUyFyCLuwC9wMZz2tUCbxU0NkFNu7A4V1E08DhHdwaTEmlylwlU0PyLYGyVY6HcxtLJ5557N7E8imNwwQSUljE7+hby6cf+PH38jsrbfGnMqg4qwYpaZ1F2gLZEakGh4HpzxqSU8hyV+PqNaKS3swnlnms0NU4ryFlNs+tnzme275w5tjjZ088md44e/TRex6/765D9/wgt7UC7W3f+bXbzzzzpMpgIgZRhdTc6yCp7WcP3b909BBdTDoa3xZpHs7F00QAliJWYKEUnt1mSkmmlKyW04CRYKSnXkWBghes4uHhLFgPB2RK4IcFdgmAp23yuMVgTpVos5hGlUWyJFQrAg9XuTJU3BYYSKXKTo0yChkzuScvr9z5oY/86OOfZZY21+8/nBJONtMAACAASURBVDt6tpOvCpsws1KRdhkxwQrbjLBFC1ukuEnKCUpL0PoOo+9x2At5LVntkZ16jhf28OK53UN33n/03icUUozGkdsOkQrbsQezRdR1hq4z6DSdutZqGJ3QG86m0XAwAzUey+012k44mg1nUdfrNRw/HI+Dnu96XdM0Go1GGPYDf2B1Q8cadlph4E277V675Q3608AftFt24A8Wi8iyBprWbbdD358Cgg6HESCo503AGRDgvuuObXvY6ey/wd3fgHYxoQSC27geC5JOXmr81P/IsBTDMttBy+p3nGGjE8aL234+SgFBwZfvA/UqSn95B0BpEAQ9Pxj4wdAN9lE6iqKOPx3Not4ocoOx7YTjyaJreYPhrG52ev3JZBqpWqPZsoejed3sgKY9kJX2B1M/GLY7bhgM59NZvxcM+wPfD8Pe2Lb7ljuyvbHtThuNYNiPOq2w54z67jiaRU7TDbx/cbz9fwKlvf4EbP8GmAx7Y5xgT546q6gmGJUxG93ReBGEI7PRBV5IgKCu14/DcXuOPzloZx+XcK8k2b3SMIykto2GC4bEjYbrhTNJbe/s5L7ylb8/cfyZpqGaqiixeENiBbRQr6Jg5hJ4Hah0SWfL9SpqsIjJ4TIBaQwE6roKlTc5TKUQEUXqLGsriqupbZHVGVgi8iKe0ajSvmMDXQGaIBC+URPRvMHAjloFmiBgNJjfOItntnS6YitsnUWqUErGi67GAdACpwKunCZziSqU0mlIxrM6kze5UoOHAEpVsqhRZZUoC3BeQqEmRzmK2BE4Fcf5crFeJUSsqDNIR2KYUmr91DMbSyfIUrIh0TIDi1RZoiscARHlTCm9ld48p5BQ7NsX63WBjqnOIsB4AfRomzzeESmTw1k4y2MFUyAbIqVzmEhCFJTSqmg5tfHwj7+buHByd+X0oXu/jxd2mxLdljmVweo8JeDlzaXnx06Lq+TpYpoqpGy11qyRu+dPLh09BO2sgn0sQF4E1gMAjhK5BJLayK4voenNGrLPWmCLIaB50CIFpWywL9ZgEZPD6OIeePcDtrKDGq9BlqVCqolCDbIiYQUeywvVCsdXSCqvyoQu4kR2u0ujVrk0KFfsxN6nr7vBTOT7mLj7+PMPf+l7dlmWdoj0M5su1mTX8Oo6UdukhC1a3CTlDVJex6UNvLqCaEmOPF+qbsBymjp5/5EjP36kU6tHwyjqz62mHS2iXn/iD2Zef6o1rLA3Hg3ng/7UtoJ2ywGFnK7lt7qeGwzd3qhl+x03DEczfzzreqHj2cNhv9fr+b4/GIx64cj3RsPBot3yokUUBhND7/R7k/Foblt+GIw6ncDzJr3eAhRybXtoWYNutw9oGpd2fX/qOKNutx+G815vARqrbasP/hLjwZjLUaqZjqR1AEfVum00PZCJdt2RE0zdcNZxhnrDPVjjvYrSf5HjmvDFUOoE04bdN61ew+5b3tjrzcPB3O9NHX/geSPPHXru0PdGYTAJg4nvjTx3CFaIXxZD23Zt27Usp2t5thPa3tALZ0F/0est2u1wOo40pbMYRQ21M+3NvG7gOWPPm4B6SPzODnTy/zXGz0MpKPCajW6vP1lE0SOPPvnNb92B4Uyr7Vh2oBstsBvc8wfgAgHS0J9C1O3ZTth1hrEH70GL3StZLoABuIMQBfJdWevETVNRaYEZ02bTPXz46Tvv+C6BlFuGgpUyCouB2cQ6WwGuQDoNXRyiQAwWNas0Xym1BKpZI8BVWGcwGccdudXmG4kXNnOrSY3kQ9OslnMGixzkaDwbCnJTYDsACAqUsa0aQeYSXDkNzjc4DNj9gEQWVHSB/UINzuKZLRHNmlxRo9MqldKZnMECh/qSgld0kmyw1Q6vEKlS6txWbnkv1FyTlql8TsQgz5BkorL87NPrp47TUJZDihKNsEiBgbNqFWWxfFNl9zaWTjz5YEeigSU9eB8AUApy5ReNePVNvCocfChiBY2uNGuEpbCWwrYEEohpY+P4eAeLQpZ1BqGLSZ1BFAZWWaS4s372+OFCYk3nMEthgexIQPPVclrECjycBaVaIN89+E3B+CnAZ6xRAgyOP1WvouDBOgM3GKSBlNoIZBJlna6oLCxyMF+D+RpcZUoiDfkqZxPIgqsOC9Bd7/nAw3/5mSkhyVtlNQFnjl7YePQUfj7vYo3S6YyYYJlVjFsn+A2SXYaldaK+U5XWCWYFLp/ODHhXyjDJ5zdWj57hisTYCif+YBgM+uEg7I38/sjrj0EAxUAQjnr9Sa8/ARXdjh24wdANhk74M+GGAz/ohWEfuFu7Ts91Bp47DLyp54xde7QfzgBcAAN/bNtDcHUCVyrLGrRagWm6QTDzLyagljWI5Ui9YO67+xc0ANRGO1D0bqvbE+SmoLRAwRawk5ca4M9N1jr1pme5IzeYWu6o2QktdwSKQ44/8cJZ1xlqdZsT6nRVldS2aliggAT+2EWlxYsmeB6w7hRsPFUNS9O6utYGHJ1Ooujq6u9f9Lgm9HtB0DuIUkBTrze3wqnljW1/4oYzrzd3wrHtDX134jljzx55zjj0poE3DdyJa4/A/Utv/XHYGwfhMAiHfjC0vWHX6XfsQdvq93oL2x6OBlHT9Eb9Rdd0R+EksAauPXLdcVwVARwFPfx/jfHzLBoAFxdRNBjO/GD4k3sefPsfvjOXL7faznQWgYQVvMV2vX5c4I0hCs5Y7ijeDHN5UfdKxoGXZ6tgBqbe9MAgDZiHabbsCxcu3HnHt9eWl5QaLbGozuM6A7cE8gooxQ2GVkmihhQlHBQYi3WWddWmWJF++NV7b333p7/wF1/+8dfullE+8kI8k7zEFfaiyHZf1hsXS0Eb1ayiTHGPr2TAEMvBENF8g8MAgIEoiSnuSVhGIZMqvaPRaZXKaHROpyGdgjWCUDCyVVVqJfreb/zko3/80a9+8mtsRjBJs12TZKKSXjl/7JH7nnv8ITSdsDTBb6gNidV5UmERHi9ScKalVbeWT546+lhbpC5HaYPDroTSeNwz9hwG5VPAv3oVbfA4mDwBElxw53KU8nCuWSN5rKAwsETCeytLqbVzVSQXmFK8Uz2/eS6/eU6jKw0ej0u+4JvGBV6ATJ2B4zFT8HrAA0wOA9ZOIJfVCaiNVzoE3KIRs4rqHCrXUElAJQHl6BJTSfsSa6OVECrLZ859821/bK/tOTlSS2K1TQg6mdh+cqm2jTUgBbsAWXBdSFC1TUpLcsomJaxi8johrGJqijOKErEOsUnsG5/5Kg9R0SSKxovA9j3Hd1zf8nzLC7te2PV6Xa/XdcJ4nMzvjd1gaHv9rhO+OEqDoecPgPub741ce+RYQ88ZB97cc6aeM3XtiWuPPGfqOWPfnQTeNGYkAGen0zNNV9etbrff6fTa7bDVCtrtsNvtA+gCKscqpCCYWdag3vSanbAmNWpyU63bID1V6zZoZwLneqPhWu7IC2eOP+nYA9sbW+7IckcApbY3BlIGYCsI/mDjGVZBboK/32YnBAUqMFmuqh1N6Whq6xKUXjUO/AWO/SVrAZAdXUSpG4y9cGb7E8sddZxh1x1Z3rjrjrrO0Hdnvj0NrIlnTXrOLHBmoT11u+O+Ow/d+aW33tRxBrbXd4Oh35v6vakXTgAdw3Du+9MwmICM1neGwCzCtUfgtxO0GQBH/3+I0rA3dtwemIGxnVBW6t+/6+7vfPcuvqaAWZdG0wLvuG0nDHtjoDmK26WxCsn2xnGB93Lh7uUBarxg6hSwM9YrGQ0XdHe0ul1vegClGIbd85MfPnT/3Vg511Q5mYFVqtwWqYscrej0/oYQncF0mpBxvFWrEdmUTEANHq+Wc3WGa/ONr3/2e//1Fbe847Ufesvv/elrX3LDnbff5andriTpFHqQNAfXXwNvd7AmBXwW7COrwdl42iReow3KqkDg0xbIBocJSE5E09Xyhkrv1Ks5hUzLeNZgYJMlDIpusuKo6T/38Il3XHvT21/9x2/+7bff/fcP9fXRqO0klk7f8+1vvXD4iTpLeboikaiAw+X0Nl5MqVW0iuZVHvPayvILz5x//khLIEFpF7x48GqBU8QVAgL73eIVNMAKOLbXB55/wEQXmO8DC0CQsmtUGfQyRRJqiBQFpSSq3NUFopRObZxPb5xVyDKo2eoMnF1fSq2cttUq0PGCiBEOYBnjE7AWnI/zV5Cwxr5IGl5qk3CbhJsXUarWUIlHFB5piKRQzjSQUquQG8HIqa987Z73fTjCeW2z0C7x9EqhcmYv/9ymluNquwS9geh5obZNCFuklKCULbK+V20meWETF/ZoepfQyuLSk6eevPtQr+1H00iXtMALPT/0/L4T9B1/4PgDxx85/sj2+o4/AODcx6e/f0V60fC8CWCk54wda+xYY9ee+O7cc2aeM3PtqWtPPGfmu7PAmwfeNH7fDyZh2u2wXnc0rdtoeCCaTb/VCrrd/n6l153EhO4F815v4ftT2x422gFIFhW9W5ObktYBhVxJbUtSU5KahmFb1gAomAC843IdyIAta9Bs+oZhm6bb6fS63b5pupLUFMWGpnVbrcC2h0Ew6/UWrjtutQJdt2S5pUgtVWkClM6mURRFs9nsKkp/geMaYGR/SbjB2LaHXWfoOCPbGzv+BITrjkN3HtpTvzsOrEloT0H43XHfnV8eoTe1rEHX6dve0A3GXjjxe1Pw2xAEs34/cp3BaBg5dn84WHjusBdOXXcMIkYpiH9p5v2/jVJA0LA3FiW9P5hubu19/LZPE2TV9fqgjdruuLYTAqY6bu8gRw/S1PEnoCIUozTe7/2iUW96oDN6kJ3AGgkQNJ6QqTe9Zsu2bfvZE0/f/cM7ipmdjiGIVBmkLDFKNaoM9m0BlNZguMnz1XLOUtiWiHOVbJMT0udT773xo29/1YduecOn3/K7H/6j1/zZh9/x8aWnzrR4uc7gseHfQZoCKS+AE9iSrdMVtpQEKN3fQXaApgA2AMBtgWzVCBkvVqE9qrCmUqkGX1LIjICkdLpisoROUq2qNO30Dt318PUvvf4d177zDS+78RufvWNYH0Hb6ZVnT+TW1zxd6zcbVaiA59MGR4PtaS2FpcppiYXlKnLq2KFScr3B4/s7tw+gNPZXujx+PkpjS32wlAacB3A1mPJBlCoMrDAwC2dluqLzpMygRCl96uhjS8efoAq7WGYLNESZUjIwRRZKgfzy4KJ1sMwOaHQ1unLQ/AjUeGPKgkdqdMVg4AZZaZAVk6wYDKwzsMJUJKYs02WNKrdoxCGQEIFb2ztfe9tN2MNPOOtpZb3QqQjEcm778Dl6A9JyLL0BMZswsVriEpiyyzArFeZcqZUR3KLGr6NyvsZkqeTS7ve+/F2dVUVGiuZRvd7o9YfBYBgMxkF/EvQnQX8G4iBBL2Gqu588/PTW98eeM/bdme/OPGfqWGO7O3Ltqe/OfBckpjNwC1Aa+ouDJTTXHXe7fVDgBVLebrcf56M+EPT6M0BTzxmH/qwXzEFS0eyEsZcnmHgxmp5Wt2W5BRweFKUNlE2gkgy+CnxrcDkFLHecEUDmYBDZ9lBVO7LcAoM6njfp9yMwrmNZA9N0FaX9oii96sH7CxzXXOn67th91x2GwaTXm/V6szCcgp9cP5gH7sSzR6419OyR74x9Z+zZo9Cbvmj0+xH4qYO2gW0Pbbtv233PGw0GC8vqTSZRtxuOx5HjjMB7NBCXiN/+lcZ/p8A7X0Rdy19E0T33PvTRv7jtwvLGM8eeL0Fop+uBAq9utIx6O+yNY+Fu3CvdP/NPRKnZ8i9HabyhCbg0gMRUN51G0xqNBhvrF5547MFSdrel8WoVBRW/i1lUGaBUpSoajeo0IaKIRuEKCYVNXiYzEl70DePEQ8f/7O2f/NMb/vrDb/3K+2/8wofe9rk3vvwPv/n5bzU5xWQpMFEKaBoDFUxnAiaZVbQtkApRwjNbYEt2nAXGNkmXNFxBjZfIbtKFLYXMmNWySuZFNKuSkE6hKoHWypU2J1e2M39762ff/pobP/X+24prWQXhl44cTy0vtwXBkqXK7g5dyHcUQaFxo0bRlZzO4zWipNXwQnLtyKGfoIVE/eJmtIMv5koc1agy8MqPORoTFDD1kqxUIQp1uqgROZ3Mm0ypzlY0qgTqwAaPc2heYRGjRqD5PZ0n23rt2OP3/+CbXwY+DBJe7MqMzsCWwjKl5JVQChqioMALeqVAtQtQGrsjxSg16f0APymVKqskpOElNpMIWDIytH4FPnH7V3/w3g9GjGBvZpStUj1fxc6njv/g0XqpKqbx6k6luoOwW5XqNqwmaWmHYM8Xa6sVfZusbSDUDkpkyW998dvpjUw0i1iqNptGQTh0gp/mo543AlcPz5sEwSQIR8B90/MHfjAMwhE44wfDwP+Z28AHZds5qOg61tixhq498d2J7858d3KxtDsDmWvozw4WeP0DzdH4BcQXsf15mHDR82e+O4mfIc4pTdMFf6TVmiHIzX1xr9jgeaNa1SSp2Wz6cT56UCEcJycg6fT9ab8fjUaR70/rdUfXrXY7BP1a/+Koq+OMWq2gXnc0paNrbeBlfxWl/5zjGrAHxvfn8W8DUAzZVs9zh6E3DoOJ7wwdu293B3Z3MOhFoT/znbELOOpOAncS900vvw2ChefNHGcCOOq6Y98fB8HEdYf9/tyyesNJ1HX6/Ulke2O/tz+DdRCl8Zl/jXFFlFp2ACRFw9HcdsI77vzRqdPnHjt0+P4HHt1OpGSlDqZlQGLqB8MXle/aTnilAu+VeqWxmUNstwu0SPFi4bh1qtXtZstutRpnXnjuueNPVYp7chVTL152wbqVS1Cq0ahCoBJe0phiR6lQpVWNKfab9eVj595748fe+NL33fL6v/nAjbe/5j/f9F/+w+vu/eb9c6dfZ8gYonGAWi6o3II5GbDRBc9sceU0GJKJnesBvQB0gRAp/hBLb7KlXQHJxD1XGSuBjWN8uVin6a4g5FbXTj3+xNap046s4alsfmMDSSYbHGfJslllx93OxO2ylaJAVohSWuMwnccVDr1w+ujpE4eqWE4/uBPtwKrt/a0sl8WVUAoC0PQgUwFKNSIHUAo60/Uq2hCpKpIzakRLYaHUlsJifaex+sKxe+/8BxErgIXqsfIrxuflBV6g141lR7H0N67xXkJfMPIUr4QzadgkKyZRtmnMI1CvDOUOPf75N91IHz4WMYK1kVa2SnKSqJzbO/SNu1uIyO3CUoaQs6Sao5Dzmeo61C4Jxi5NLeWklUozV+Oy9OEHnl46fjYaRdE8Gg5msm6Go6nl9yy/b3t92xu67hi0Nj1nGqM0DoDSwB++WIwDbxr6i9BfgNxxX3bkj31vdDACfwxElzFKL7lwHbxqHSywDcJFP5iH/izwpgCoMXG73X7b6tebHpAIAbkQQCnH6TFKwVNd8uTxCwB5C7jjumPgX9huhyBFtu1hPJDT7fabTb9peg3TBmZzAKVXZUe/2HGN60euvwA7Sn1/HnhT0LP07IHvDEOn79k9tx3andCzB4E/Hg2jXm/meyPXHfreyPfHgT/2vBEoFF92O+10Bt3u0O6OPGca+rNBLxoNo/EocpxBEExsb9gbLuxg5A3n+/qmcP/XMS7z+hebAf8a4+cVeGOX3VS68OBDh9KZ4qnT55otezCc9foTYCjYH0yByveg5uhnlEdXkB1daZv35YvV4h5qbMAL7uum0+l6LEs/+MBPlk4fZ4gST5bVKgqs6S5mUftrNVUKUUlMo1GZgDSmqLEZmU7w2LpCpxo8JVTY73/p/pte85fXv+SD777uc39y/W13fPF+OIFYUl0lUMC5S7qk8YDmQXtbtpSM/QUBLONF2eA+mEytwVmwFobK73BQhs6n+HLeoLE6g4PlYgYD1xkUPMaSqYVntgW8LeBocnPn7JKCU21BkHGcLRWLW5uptQt4Pu01VcsQWworUmUos3n08ftKmfWuwWkXm6AHUQp8IV40rlTgPRjxp8Bqbo3IXEQppNNFjYFMHjF4rIYXeLxoihSPQxxWamk8CaWWTz6dXV8SsUJbpCS8yFUyAIdXkh3FvIyzUlDsPSjuPZiY1mt4vYYDmtZZBHC0iUJzVQxwdOfhh7/13vfd97GPR2TVWUtoZze0RNnI0ehy+thdj6gFikmU+CSsFWktT+GrWXatUM/S9T1K2oD1TVTZI+Dt8uMPHPG7fbsT1o32bB7VZG0aRW5v5PZGXjjxwlkQLEI/6nlRz1uEwWSfneEoDA7ERcPUn439omsvmF+cTegH/jAMRoE/8L3+xRiAk71w7LrDSyZHD/anDkIUlF5Bra7nz0Jvui/hBAkJSDHDWdvqg2aK2fJlrRMXeFW1026H8VzN5c9/EOGeN7HtIXgYEEMBmtr20PenYHQH9FatTr/T9gFKryp4/zkHyEovQek09MaDcDYKZkN/2nfHPWc09KfzSRTNo/Eo6g+mvj92vb7njUCD4Yq3PtCqzUJ/1g8Xg/6835v1wmkYjBxnsP8MvbHbm3j9qROO3WDs+2PPGznOANSBHWfgeaPLu7kH4l8ch/9DUOq4PVHSF1HkB8Oz51Yff+LpL93+3448fUJRzV5/4gdDWakrqgmSV0DWgy4N4H7X8q80DHPQz+hgxJ+9xB0JFH5Vw4o/ZTRc2wkZhvr+nd9eXzlbV3iNIxoitZ/0XESpEqOUQjQariG5poAYXI5HNxtiViL3iFxi0nVKG+WHvnPkozd9/q8/+PX7v/mkSbUHDV8hCAndFxaB9meMHIBPoNo1qyiYFgX5aNxSBdwCE5wgPQWCI2Au2BEprpzmy1k0naByaZ0mWjwrYbCEFk0OM6swXdpp8rDOlonsNlfJT7vd7OrWk3cfIlLksQeOf/Rdf/HpD37qb/7i83/1Z5/63pe/+6Nv3HX2+AtErqJVOaYCn3r6CAuXGTiv0iWdLuo0pJJgw3ZZwcEYT1El8xejqJJFndj/pylEAXRD41ou6IzKeF5EsyKalbAcaI6aVVijCjKe1fCCwZRBVqqzZZPDFKYikiU4s6WwSFetkVCGruQaEo0Xdg8/9KPs+tm2wghoQaXKHYkR0DxY46rRYPMamG/56eqYuFcar5QBGWq8qW0fvTVc41GdQxsMYtKwwlQUEtLQYqNcaOazM5o59d++8bHfe2319LmIFsTTK+ZGRkujHUwmNwrnHj7O7kDkZp5cz6k5sp6nm0W2nqHY1Xz1QqGdqTZ2yPTRlS/e+gWmzLnNIJpEvrPf5lTqLSccOuHYDaZuMPX9eeAtQncRuvPAHwfhKAgmYW8MrjxhMNlPQH2wyePg7bgXzPvhot+bAZQCavbC8ZVQCorJ/sXsEPDSsgaXADWmKRAcgYodyEpBgNm/3jCyvTHw5mxbfa1uK8qlsiPfn17y5OCbgvwYzK163qTT6TnOaDSKQNMUqIhdd9zrLYbDqN+PbHvYbPqeO7S6IUDpZDKLIjBa+mIovXr83OMa159fWuD1pkDA1jI9zx5NhlE/mPvOWBdb6b1iw+ymkrlW0x70J2Ew6oUjWTLGo3kYjBpmx7HDQX/iOr1+bzwczFynZ1tBvzdZzCOr67tOz3V6daPdalrRIhIFNQxGo/HcbHQ9fzBfREE4cuyw35uEwahhdifjKFpE7ZYTBiPP7etacziYgWnr0XDuuf1W2wHWwf/4+Jdm5z8Wpf3BdBFFjtsbjRdf+Nsv7+5lv/XtOwmyGjd+fmbixQ46Xc/1+sCG1w+Grtdvd1zLDtpWHxgVxQ1OoBj6+Qu9L4HrJUMyYNLUbPmtttNutp469MiJp5+SOFrjCA7NA9nnvuyI3R+lUFlEZRGVhWtoRkSzMp5VyIxKASOhvIyVQsPwVMORDEvQ2rxoMoxKoCJSkPAiqDECmWgsewFnNLpicphMlMj8DpnfEbEC+L6gLhr3FzWq1OAQswqDER1QHQVwMnkEzW2XtjdakqAQhEJRNRgyBbLOwToHS3jRMRRkL3/u6EriZOEbn7n3jS/909f/X++7/iXvf/1vfOBNL/3Qm1/+oTe//EM3/NYHXvkrb3/l//nWz//5147ce/LwvceXT6wISE1jGJXOydRuU6jQxT0RgxxVqlVKIlJQ8ayvY3x5jYNWeWjLEjGhlFHRsnpxu5mEF0GmCJJFcOfg+XgGtF5FDQYG53UGNjnM5HCw/LxexUQSkgkIOBGycFYkIZ3Hjz32AJzdVhmMLCXrPGXwuMHiGg0rJKyQZZ1Cjf+HvfeOkqM+8739nrP3nPueezf5rr13115HQAlJ5GhQDiAswPZijI0NGIxyQgiRMxgESKCcRxqNJmpyjj2dU6Wu0F2du6q6qzpWd1fn9Hv/+In2WCB22RfWyx7qPGfOdE13z/RIPZ960vdLITyFwdHrj//tLo4yBewolDaEJwN2NGBHOQfGObCAA+O8NsGJhxC9RJg8LitOqm360bGzJ0cP7He2dj114/LpPx4uOHj7hJEfR139+jjNa3om2g83TrcPU+Nm1xTKaUhmQB+YwoUpwtVvsHdrolq7f9As61isQ/XBM++s//WGw3uOEnoKlEEmVQoF48lkQVHKqUw1qVTgezyZrFzsa158l336x3Tyko+XeYemIDI/NUqfGp/xrk8mS3AfJhbLwXwRppufGnC1Bo4Ew3miVKp8yUbDzE2Hyz3PZQIWunOwtFv7OO+EBuDw06+x+u88vvFJwECUZtLVdLIsCnJUUoo5EPCGO873vvnanpdfeH3Pu3vPNDRBHMJ+dSKerpRBqVgrl0CtCmLRJKiBgD8I6+/5XDkeS8kJJZ8rm00ojlEXOnpy2VIinq5WQD5XBjUQiybDUjwakZNyJhFPp1O5UrHm9XBajdHn5eFFE6iBpJyJhBOSGFPSeVADqWTuvytKeSFcLAElUxSl+CuvvjU5pZ2Y1Hh9Qh2ckJp1g9L6QK8UTkDzRVGKR2OpSDxX1+CdqXZ0OYhe4sVWZydU8ogJBgAAIABJREFU34YQhST2+MMeL1/IFQd6us+ePIYZtJLPGbCjXsLkJz8mGW0K0CYfbfHRFi9j8dEWN66F+dYlPT8XonYhajeq8RH6Pxu3oa2wzOhCdaxVAxECUQqdTNyYHqr2QAOTy6EUcnQmSv02g9em5+0mF6FjLLqQ0ym6PLydpUwG0qjmHKgT1/toqxu39TT2v/X0wd/f99I13/nF8qs3LJ2zYcnsDUvnbF4+b+vK+dtXzt+6cv6Wn9/+zOI5jy6a8+BPZt1357w1zz75qmUESwWiblyNqDsCtI61auwmPWM08BQRZDC7YdSHTbmsQzGP0Y9Nea0qu3YyytIBmwXmgnWIwtop/HxmRxNmhG7MQBmmnIgu4qGjXsaDGxnTtBszQNcdD250Ijo3ZghQVj9pYTG96GYYRH/sw3etmnFo5ebCzQ7EwNGYn0R8NqufRDgS5SmMI1E/YfWTFkhNH231UpY6SusQrXOUZ3GOxZ2MmbSo/KZpv1UjhiiS0VxoOqJqbQz0D51Zt/3Ig+uxI+2S1WnsV7EjKKehu461Hnhjb8uhs+SUJYS6eQPjncI4FRGaJsmOqZTZY+/WBCcJom3CPWCUDA67yqbqmmo/2dHT1KcbNYqBeDZdhcvoslxMpErwPV7XePmi3qqfE1GXRWm9V1Uv+UIDmcs9D/SWEcVUJJKpzxzBlue/WVj+HCit1MC/jdIyAOW/DKa+CsdlURqLZHMZIAqyKMigClKJ4sSQ5tyZtgXzrjvf1KZRG/p6hwYHRvv7hmmKBTVgMWP9fcOjI5OgBvZ+sF+nNYEaCArhyQl1V2efks4X8hW/Tzh9qnHf3gNvvfluUs6AGnDY3c3n2xnaWa2AcgnksqVctlQuAaPBGvAHn3/u5SceXw/v1t7WRVOsnFAgd11OX6UMMspXvcb7WWpHITGWy1eaWy4cO94QDEWzuXJIjNVt1EQpDn1JIVahBBL8KlxIDYmxcESuF3jrPmufrXZUnzO6aKkYiMCTcOaoPsF7cffUH8xl8pqpybMnj6lHh6KcJ+QmHRaNnzRfxCRl9FNGL2X2Uma4FOEj/zRQM5N5sHTpRjV10MLFD7hac3GYhcVDLB6gLE5E6yfNUPSOMalcqM6F6qDV1+VQ+qnn/ZSRY4x+xozrpqYH+50o7qcY3m6XPKyfQXgWlzyu0Qv9L255/YEV62+76ld3zP79ivkbl83duHTOxmVzN624etuqBTtWLdixcv7W+299Zsncx5Yv+N2amx69Y87aZdesff/5gzzpj3odjHncZzMFHbgHN1unRsJOOshgIQfmtE6zpvGYG+MIA28zeswaL6LnPl4vmTkEVK+vXjIZxNFWP2nx4EYITo5GYD7K0YgT0blQvQvVOxGdBzdyNBKgrG6bKeikTKqRhsP7cIMq7HVwdoI2a52YyWeDKanVTyI8hfEU5iesXszsJS5+R0j3ulU47KTCgP86QQfGs5jkp72MJRqgebsl6iNpy9TZE/tiDsLw0ZE9a34ldI5rDpwb3n9O3dhHDpoHT3V2HWs99tZHfafbJ1sGLN1TnmmcHtT7JlD3kCmosnETGNmp8gyb+Ulc0tuJXnWI4Ggt5bS6RjvHH7r34a7WAVAFsUj2K4TST04kfUZARaR64zP1sQDhzFGS/9hP+DVKv9jjsiiNhjO5DFCS5WS8UC4AUAFFBWRSpf/nG/8D1IDL6Xvl5TdefeXN1avuefml1zNK4f/+43fNJvTaa258/70Pjxw+sXTJymKhqteZt2556tDBY79+6HfxWMrjDvz24ccGB0bvvmutTmuSxNgLz7+yb++BTRu3IVYiHkvlc+VUMqvTmnZs33X40PGdT+1+dveLPCc+/9zLPd0DB/YfmZrUVCsAakkX8hWek/67orQGgIP11gD49W8ebTzXWq0BuE4609x7pgMMzEpnojQYioYj8udVO4IohfO6MxdgYIm4rr0CvWJi8bQNJ7s72lsaG8zqKcHFBOyoGzN4CePlUBqgTTM5Wo+QA7nY6qNM9QVKN6qBIIG5qegkJJct6MAClAUaalKGSSgqC2edgg7sciitP/PMCNAmFpniWcRHoRbVZMTrZxGM0OlIo57Qq70kMdk7uHvDMytvuv+GH91z25UP/+wnzy2ZvX7RVU/eeeWTi65at2T2pqVzNi+ds3npnI3L521aPPux5fN/f99t65ct+OWcb912/52/bdrfGvNwSpBzY6awm+JoK2NSBWwWl1XnJ6x2o85p1LvNRlozJdlx2U27LdPcDI7OBOfMPBX+TiBxZc4ZdOCQpn7SwtGIYMdEpw1OTUPxowBlhVpIXsrCWHT6icHBC+cZRO8mLB6blbHoRDfjwc1ewuKzWQPUxZTUh1tggb1eYYY1ZNgirePzkhCcuMdu8bisuHlc1XluvOV055kjFcF/7NENB372CECdgSGd4URX82sHhk71jLcNOzQ2Y+8UMWJoev94+95TotHBTdvcY1bHoME5bHIOmxSCc46YfSrc0jHu05LEOOIws7oRw6n9Z1oaLsRFJR7JJhNFCM4ZBd7Sf/F99JkbLJ8xVpnLgZkrpBCrUPChLmXz/+fvz9co/aKOy6I0nwVyvFAtgWIOcL5IMl4AFaAki3/zv76ppPMETp9vaiuXwNYtT33/ez8GNfA3f/3NXLZ06OCx229bBGrgX777w/ExVePZ5pHhiYxS+Pa3/lkMRSfGp2+68bZSsbZ929PHjp5qPNv86CNPsA7P4UPHly5ZKSeUaEQGNfB/vvmPx4+dVtL5F194tfFsc1dn3z1r7hseGr/v3l+cON6QzRQT8XQ2U1TSeUmMf+ZE0hcSfxmUppWCFE5kc+W77r63t2+YF8K8EM7myvWKLrQpjScUOZlNpnKRaBICFRZ461np50Xp5Zxh/szFwh+GXjHxhNLa3LbvvT19ne0BlnGTKIvpRaftz3qljNnPWP2M1We3+hkrROknIQfnVOF8zcyTIRb3k2boTOJCdQHKIrlsiYDDOjVI6ie8hBGK20Hh9c8o8H4SqPDHY5EpL2V04gbr9ETE66VNJkJn8JGkCyM8BP32c2+sXfSLpdf+/LZZ/7ry2k03//CxFVdvXjZ345LZG5bO2bh83tYVV29bMW/H8nlbF89av/amnYtnP3b9d+9bvuDhu298ZPnCB9bc8kBnQ48Sku0WC2cnnKg6QJsow6QHN8c93rDDWwwmFZ/kMVsderVkR0KMyW8zzORWPROFg7IzS7vwJvR7Ya3asJuKehknomNM05CpEKWQo4Id4xnUzyCMVYNox9TDXQ5UZzNOuW0mn80suUgPbvQSf7Ju5UhrADe5Ef1M/cKZm6aXRymKWScGR1snJjt7Th7CejupsSGqt2fXHSuZI81lxBlXk8lpeupIu3XISBsoVks6VGgU942eujBw6HzU7Apqaf8UHtTSZK8mZLCzo2bHuCXvjpo6JywD6pHmoVP7Tk8PaEY6x5VoAVQA749GwxlFqf55r/Tj4di/NDIviX9nP7UecA105gPrQ0Zfo/S/1HFZlOYygPNHizlQK4OAN5xKFEEZkDj7d3/9D0o6/9GHhxYvWt7bM/joI0/ccP0toAa+8Y2/AjXw0ouvnTxxplwCV105F9TA7mdeeOLx9aMjk3/9v/8+EU8PDY7du/bnGaXwzh/f3/Pu3p7ugSWLV4AaaDh97ie3L66UQTQiFwvVb3/rn3t7BkENvPD8Kwf2Hzl65OTvfvv7/r7hXz7w64H+kUoZRMKJdConibFiofrfFaVSOFEDYFpt2P3sSwFOpGgnnCq6JOoiR1CJF1Z6Z6L08xZ4Z44mQWGjeve0zmD4uY+L+gOhc2eb/vjG60O9XfEg5yZRO6KN+ex1pH0SpRzzZwJ49abpzBYmR5nqEr4QJNAUE1ITqvlYJgccFnWIxcNukqOt9Rrv581KRRfiIQ2W6eGp/k5Cr7VMTSHTGhdGis4AYyI3Pbxt+Q33r7rxd4vmPfKzn7xw+xXrVi3YumL+xuXzNi2ft3nl/O2rFuxYefVTK+btWHTVhntv2r36mi1L5z7+izue+sWdW++c/cvrv7fqN/esRyYJP+kMMDbSMBZymp2oOup1kGpz54m2ydZxDvFmAxGHXsuaxjla67cZ6hydSVPJZRPsKKQs5BlsoJonBjy4MUBZKcOU3ayO+eyJAOslTD6bGRZ4oSQvHCDiGVTy0oRxaqD9LGPV2BGtj7YGHbgT0cH81U+YAzYLTyE8hXCE2Y8ZhRlau3DKKcTisDbwJ3zOKPbGebvVNHr6/IEJVZdlqBuIIcVkObph2zsP/A54I9EJM906WjR6AqOIH/egatQ2bqKGDTHEY+vTDB9umW7omW7owbtU3gk0anXTI0ZkQOMzMUONXW4j1dvQ0fDRmRe3v1yIl0EJeOw8748qqUouB+LJItRlqxd44U7LF/VWvSSJ/Dfjcs9zuY7mZz/PzHvWBeA+tcD7OX/O0tco/aKOy6JUjheCfCKTqhRzIB7J1soAVICb5dau+Vm1AnY/88KZhiafl1+yeMXuZ14o5Cv3rv15UAgP9I+8+MKrlTL44Q+u9LgDv37odx3t3VwgdPW8a/w+YXBg9Mk/bITJ68EDR+WEct+9v/C4A7968GH1tN7n5dOpHKiB5597+bVX3+rq7Nu8afuZhiaeEx995AkCp9taOynSEZbickKplIEkxrKZT7Wj+az4qqAUTvB++NHhgcGxUhm4PVy5AoKhaF0R8JNYhVmpKMXjCSUSTQrBiCjF/2NjR588OXMECdIU9kp1Gv3p48e62po9tI1jKRdhhEsUlxs7umSpvz5WE3aTUKUdtgDraRDMNcNuMu63C3aUNk6h08PQX9NLGGH39M92Mz4nSiU3LnoID2n2UagLR0mDoaPh7Hsvv2XTYaf2nr37tn+9+co1d8x56KYf/mbFgh1rbnhuxdWbl81bv2T2+iWzNyybu2X5vK3L5mxbOnvr6gVPr5y/ffGs9YtmPXHnVY/c9P1f3jnr4QcWb7/xxz898MaZiDvKOxjKMs45DaILcSHmXX/YftvsO5fMX/3hi4eS3pjkcPgwVYCaDpD6mfO69ckj0UnAJrHdPM1aNU5ECx25tUNdsKJrnhgwjvWFWCLioUn9pJ+0wEapz2aG/VQPbvTZzMmQx6oeaTj0voc0h1jCjRkkF2k3q3kKCdgsEKUCaQ1SiEBaOQKu8JrhlQ38pQXtVpFFQw4EDkXX57kExsIxZt6FotaJts6Tff3nVL2tQJJcJ1teXXKvp3csb3Pazw1wF6ZrCId3TumGtJSR8qgJ16gloCLsgwbVqa7BA00jR1pVp7unGro5PY0P67OBuK5v6rGfPdx4qGGiZ+zo+8cZCwsKoKwAUARKshyRlFrtK4PST6Lx30TpJeIPyRm7NzOfEML1a5T+pY7LolRJVQo5UMiCWDgTEdP5DKjkQCKaGRuegnO5p081ajXGVDKr15kT8XR/3zCoASfrRayEks5rNUZQA5IYa2vtHBudamvtBDVgI5jJCTXPiT4vr9eZ4QzR5k3bW5o78rmywEuFfEXgpVKx1t7W9f57H/b2DLqcvlKxhmPUrx58uLurH04C57KlpJzx+4R8rvzxith/N5RCDd539+xzuvyiFGfsbugVlUzloJLRJUCt90qhzH04InO8FAxFP+8yTL1XCj0l6r3SmT1UOMobCqejsVRYjIwODjSeOm6YGpd8Ti9lIfWTHtzwqb1SD23mHH9a6p/ZC4QnZw62wIDZmJcw0sYp/Uj3eNf56f52RDUEwQkXY2CiBl1TPu/YkYfQBewIi+kEJ+GniVRIUA8O73npbeOoZcNDO6/9wdJbrvzZ/T/Zec9Nu2790boVC3Yun7d56dx1i2etWzxr3dI5m5fN3bJ09tYls7YsmbXlp9c/d8/1zyyZvWHpnA333vz0v97x7M9u23nzjx9Y98ALUbfspxgHpnJT02EPNtjStO7BJ67/4a3XfOe2px99UaSDcY+Xs2nc2HiANtTFb+vXGfAX4kJ1Nt04ph7BNaM23TihHcPUI17CRBtVHtyYCLA+m3m4vbHt5MGhtrMhloAEhU1TJ6JzWDRORBfx26eHOg+8+6rkpRMBltCOh91UgLIKNMqRVj9h9hNmiNIghQikxYNp69IQHuzi9DUE6kyOwt9tgDb5WEuQp2y0tr+3qe34AcWKje14/fDaR4GLDxqwrJoOtE2LQ4hvEqP0JK7FvWpCUJOBcZRTEYEpPKihBA1laBlu++AkPqyPs8HRtoFnN+3C9diOjU9tW7/9g9c/rGRALlFW4sVUoljIAUWp8nw8lflyC7xfFEovl25e7nngnii0OP0kQWdyFJZ8v0bpX+q4LEqzSq1cBBExnZZLcBkmn6qCCkjGM3ANJpctwY9KOh+PpRLxdCFfgTsqYSkOaiAUjOSypVoVFPKV+slyCUCCwgkjmIaKoSiogXgslUpma1UAasDr4UANwNZpWIoXC1X4kHyuXK0AJZ2XE0qtCpJyplwCkbCczZQK+aoYismJTCyaSsrZYqEWFCLZTCmXLSfiSiKugBqIhGUoxReOyHBjpFoDwVA0rRRgUbRQrEnhRCSazBeqqXRelvNfNkoTiVw2V4YV2mIJ5PKVhJzJ5Su5fMXrE1paO1mnL5nKQdl62Bb9jKjrBULKhiNyPFkMx7Izs1KYU9ZV6S/ZfoE3Lxk74oKJi36KXtHPx+BkrxhRorHUyNDo++/8sf18I+9yBBykl7JEvQwUDvx4RNbMsxjPYn4H4mUsdkQrOAnJS7sIowPV8SzOs7iLMF5cTLSjPtrqIoxO3OCjrSE3CUeKoP0IohrSDXchqiFCO1Z3H5s5jMPR1pmd15kRciB+mwGKG/htBih0ANUMAnYkYEcYq4azE5TJ0NfcSmhRD8rvXvfmTVes/emtm5YtWL98wdZbf7Rh2dU7ls7ZuHLBpuXzNi2etW7J7E2rFuy4a+GuFfN23LVw1/K525fM2rJ83tY11+1ce+Mzd1+7Y8X8jbde8ZuH79l14fRg0OkN+8igx+xjDBbV+IaHnvjB31w16x+ue2vnB1E2LNodAUobYvUubPqiXBRthX4s9YTbjelxzahm8IJ6oANRDcEx5kSAdaF62qjy2cxuzGAc65vobtEMdtp0E6R+MsQSYTflJy3Gsb6W4/vbTh4c62zqbjw2euGcw6KGlylBO5rkWOgE58cMvM3M4yY/ovcj+gBuvOSKpF6WhwSdCVSIUsGLMpROTvq9TlTd1eruHXxv0f3428cUxBHQY+KwOTGMxSdIftrG6EnWxDBDhsA4yvbqhCmC6dH4JlC6X+ccs5zfc8zQM2kd1XeeadeP60b6x5rOtr7z1vuymElH8plEKZUoxiLZSCQTi+XiyeIlC2914dIv+f37hcXnnQT+ov7+JOVsNlOEKP2042uU/nuPy6I0yCdyGRCPZMsFkElVClmAGqmAV8ymi9GIDFU/uEAoEk4o6XylDFLJLNxayefKYijq9wlyQskoULchDWoglczGoknYDTUarOUSSMTTkXAioxTyuTJMNLOZot8nQILCjdWgEBZD0WymyAVCoAZgzhqW4pFwolSsRcIJSYwLfBjUABcQQQ2kU/lyCeSyZTmRUdKFoBABNZCIK0k5C89AedtCsQaFDiLRZFop5AvVbK5cKoNINKlkinB6VghGSmXwZf9XrlSAPxCC35TjJZc7kMmW8oVqqQza2rv7+keEYETJFIVgRAhGCsXaTJXdmVFHKbxEgLunn4HSOikv0T+qS97DrLR+H6cnxLqDcNpIimbCsazbJ2l15jdee/P08WOayTEXiQccJM/igh3z2UxhFy4wFh9p8JEGP2MN2BEvY3HaDKapwZGu8+1njtgRbVry8SwuOAkW07sIo4swum0muLkYsKNQASAluBwWtRPRxv32qJf24AYnooVV37qRZ93Oc4aMvrGuZAvDi+tgoRKehPVJP2VkTCrGqoY09TOIeqivq7Ep5Ah2nxm+987HbvzRfWtu2rpi4da7rtt156ytS+dthyhdtWDr0jkbl87ZuHL+9lXzd66Yt2PFvB3L5mxbNmfbyqufuvvap++5/pnVC7cvvXrT7bMfWXvH+g9eOaobVevGeinLeJy3k0Ztw75jGx/a/NSjz3ae6JU94QBB+Ait6DSILgwu0cKXWX91TkTLmFTo9LBpvA+dHnYi2o/twVG7Wc2YpjkaCbGEBzeyVq3PZsbUoxyNRDx0gLJyNGIa7+84fRhRDU/1tupHup2INuqlRSfBmFS0YRIKK0KUcoQJotRn1XG4PkiZ/1QPnwFU+Musx8U9YMrotRs8TlOQZxyYfrrpXOPOF/ateTjRPhHX2rwqKzdikcawyISNm8DoSZSaQv1TeETDcGOoqKaYHo13HHGPWQWjfap54OQ7B099cPSDN94vpIrZdJEXwlI4ocSLSryYhBbccjGRKkHnzpkoTc/UAP+K0HRmB3RmfI3Sr8pxWZRKoVRWqcGUlPNFKkXw6vNvt7f0gCoANaCk8xB1MOOES6KRcCIWTUJwwiyzXAL5XNnJeuEZOaHANPT22xZJYqxaAblsKZsp5nNlr4fLZUuVMoBZLIRrNlOsPwSmuQIvKel8uQRADUC4wn/lShG4HL5CtlLK15RkPi3nJsfUHmcgKslRSQZVkJZz4VA8EVdKZVAqg2QqVwMA5nnxhFKugGQqxwvhGgCiFIe7KKIUL5a+dJTm84DjpVQ6X64AKZxIpnLlCghwopIp7t13kGZcyVQObrZwvHSJYP0naVoXsq+Xfy+HUrg2Cku4deX6+pTvzKy0rsEL9RlgvTeeLPq46OSU9umndk1PjPNel5chQx6H4CQcFo0b08MU0GvTCw5ryG1zEQb1aFfn+eNjPS3jva1DF871t50xTPTzLC55aQ9pZjG9A9WxmN5tM8F9fy9lYTG95LKR+glCOwaruDBJdVjU9YHSSwqhM//u1yd1BcbCWlQii4ZdOExSwy5cZFHWqgmxhI+28iwW9tEBOzLY3tR7vqUqV/a9cnz+d5Ytmvfb1ddvWTJv093XP7Ps6h1L5m5ZMnvDyvlb7rpmx4qrt8Dt0uXzti6ftxUWe+Gm6eqFT61e+NSqBTuWL9iy+qYNd9/+2NvPfmQc1w9daNeO92SjHKKeTHAh2mhzmZ0CFcgEY6zF6MI0fkrL2y+m2tCRm6OttHHKNN4HK7qwT8xaNbC47cb0HI3ATZgAZQ2xBNwrhZNEAcoK902TvMsw2ttyfH/QgQt21E8ZfaSBYy5eWHgwrQfTBikzRxh4whAkTUHSxOH6AKYTbMYQbQkxpiBtDNJGgTLUA54JMSb4VYEy8KQ+QOpZfJpzWwM+W4glqAvdex58tPXp18pGe2wC48YQ94Q1oCIiU2RoDGNGTfiwnlMRoSmbZ9gcGEfZfr13AnWOWdzTeNIp0hqs5XjTiYMn8+litQLkdD4mZ3JKLS2XZCi/p1SVHEgqlahcSKTLia8ySmF59pPxNUq/KsdnLcNEw5mcUpNjed4fBVXw4M9+e+ZUs5v1d7R3Dw6Mnjp5Fi6Y9vcNWy34h/sOppLZjFKoVYHL6dv7wX6TEenvG4bZ6kcfHmpv60IR27RKR1Psd7/zA1gZPt/U1tHe7fcJoAbGx1RmE9p8vl2jNkQj8uFDx6dVOgjR9rauUyfPBvzBagVYzJidcSFWIp8rT06oO1q7R4cmoT4w5wsN9o1aTTiogu4L/aoJbSFb4f3ixOg05wtJwRioAQJnwhG5p3coJMZEKV4DQKM1YTgN1W6VTJF1+iYmNcUSSCsFjv+y91aLyWQhky3BfdBKFdQAUDJFJVM0W/Cm8+1QXxeyNhZPQ5p+anzSE6Zu/f2pKK0HrOtCcHr8YVjyvST4kAy9ZQJC3O2TXF5RjCihcJqinS8+/1Lb+SadaoKymjiW8pBm1qoNsbhNOxJyIEnB4aeM470tracP9rSe0ox1W9UjLKaPcWzr6UNw+MWB6jyk2UtZvJTFbTO5CKOHNEOhOzuiJbRjTkTrRLSG0Z6xziZMPeKzmRiTCrLzk3FJPlpHqY/QiywqsihcV+Uok4/Q08apAIV6bFYXYRCcqI829bWc7WlqzoSye18+Metbi9beun3VtVtvv/IPKxc+tWz+lsVzNy666snl8zatXrh95fytS+dsXDxr/eJZ65fO2VgXP1px9bZlc7csm7tl5fztq6/btvKGx+9b+sSZ/R0hp9RxpunMkf2y4OUdVICmA7Q97uUDNnvQbmet+hCLS268LiUPB2UDlAXXjKr62qCckxPRulAdNGCBKBXsmGDHApQV7r1AlPpJixsz4Joxh0UT89klF9nbdPLc4b0pwRX10oLD6kTVdsuU32YIu3DJiXGUKexAg5Q5RJnDdkRirBCoIm0R7WYYkJp1rMLPZ341SBs5yuCn9B5K52VMPGrSHTpxev0urLk3ZXHExwlpDHNpCLeelKYpaYLwjFkdQ0bfqNU1aGR6NM5hk28C5aZtzjELMagL4Z4Q5T+9/6SDYEUhmlYK8WTWGwhBFTZoqJLKVNPZmqxU4qnSVx2lX2elX/XjsigtF4HTwZcLIBbOQFA98tAfRodUSjL/8G8enVbpvvn336ZIR9O51n/89ncO7D/y6CNPRMIJKPIXFMK7n3nh1Mmzf/9335LEWGvLhXVPbtq0cVt/3/Df/e0/xKLJH3z/Cr9PeOP1Pz6989nnnn3pD09sKJfAddfe1NLcsX3b0ytX3H2moenVV95cdOeyUDCyb++BgweOvvzS6889+5LXwy1bumr/R4cbzzYbDdY333jnbEPT00/tPnr4RC5TfObp5/a888GObU/bcHpkaPyjfQeTCWXv+x+99cY7e975oOV8e7UCtmze0XGhZ/+BI6+/8cdUOqfWGA4dPn7k6Mnzze2xeOrpXc919wwcPHTsxMkzyVQ2Fk9/2ShVlHIuX4Gaf1Ch5TS8AAAgAElEQVQ4N55QagAcP3HGZMagBm8wFM3lK0qmGI2lPhullySmsXj6ciit74zCYq/HH4aMnInPmVh1+ySHS4CGpjBbDYXTUjihmpw+cmB/S2ODi8R5J21HtF7CFGJxOcAESKNxvLun6Wjzyf0D7Wcww3jIS4Y8VMBBCC6KsmjVI72qoW7D5JCPwZyEGZ73MZibtHooxEMhTtxAaMcClEV0EoR2TNXXRhkmJZcNtk4/PWZ4ec60KhNZdKb67kVdeNxA6lUBBveQpoDd4iENo93Nqv7BTCj74aunZn9r6b23PbXq2u23XfHEymu2L5u/efHcdYuuenLpnI3L522GWemdVz5555VPLp61Dp6BJxddtW7J7A2rFz51z807bp39s58u/k1Hw2DEJ5/66MQbz77oIYmKEqNMGhdhFJwEYZiEO50xn12wY3Dnx0sY7eZpu3kayiWS+gmoRSw6CWh5FnRgopMIsTgUOQpQVi9hClBWyUWG3VTQgdt0E8axvqADF5226f6OtpMHp3rb0kE3Nj3swbQiiwqMBW7xBilziLaEHWiItkCURhgkZDOFbCaJsYZZa5i1Sg4LjDo7JYcFfql+B9FuFhhT2IOwyJQP0agbz/zxgd8NvP6BaMT9amtsgohM2Fwa0qGx+adwcYIIjWHCCOIZNMGU1DNm9U9innEkoLb5tKSpT3XqvSNH3jsESiCVzCm5cjCSSOVKsly8KGuariRSpViyCB2lvuoo/QvF1yj9wo7LohRUgYsVQAWEQylQBfkM+O2Dj3e29ztod1dnn5xQvvUP/1SrAtWU9pldz/d0D5xvaoM13qAQthFMb8+gnXHdcP0tuWzpG9/4q0oZFAvVXLZ07TU3plO5b3zjr0LByPe/9+NQMAJq4O/+9h8EXvrud37gcvryufKPfzTr3Xc+yOfK3/z7byflzHe/8wOLGYtG5J/cvjgakb/599/WqA21Kjh+7HR3V78cT7/1xjuvvPT66PDEb3/zaCwid3f2mQzWD9778OTxho62rp/f/wBls3+498AVP5rldQeuu/am0w3nXG7/rNlXe338HXcuff+Dj9o7uq+4co6NtN+95t79B44cPHTspZdfd3sCNQC+bJSGwyk5ma0BkEzlPF6+WAL5QnVoeOLU6XOiFOeFcLUGkqkcXBKF41GfXeOdOXwE/Uo/FaUwGa0L7dbjk8bgMGcNSinooShGFCjUIEUzaaXAB4QD+/Y2njoe9Dg5lnLiBtFpc2N6Sj+m6m3uajw83NGA6cZ4FuNduIs0uklrXPAQxulE0EuaNScPvG9HDXLIxyB6H4PxTtJNWh2Y0UMhfjvupa2sVQv3XoIODFY+QywuOomZRd2Zxd5LnLHr6anIolBBCc6awklU0Un4CDTOeW3Gyemh9rHextbTB3UjI6VY+cAbZ6793prF8x5ffd2OxXM33n3DzmUL1i9bsH7pnA0wE102d9OyuZsWz1q36KonF89at3L+lpXzt6y4ejNMVZfO2XjXNTt+esv2Jdf+69qlDzUf7+Hskqpf3Xa6WT08hOmnIn4q7MeiPM4g47zdFKAsIZakjWpENUxoxwjtGJyughk5ZZh0WNQwGYWzSH7SHGLxiIeCJVyfzewlTJCmUJzBgxsJ7Thr1Y53Nbcc308ZpmI+uwc3+G0mgbGEHAjsbvK0OURbgpRZsiMCaQqSJomxSpQlSBiDhDFEmaMsEnFejJlYrZ+sf0lyWEIOS9BtCTGmDI33v/verlX3Gk42ywRLDmmC42hoHHdO4eQkYh+3+CbQ+AgeHUI9fYbAOBoxsu5Ri33QgHWrOD0tU3zX0fMfvPSO5A5VslWBDyeVgk+QsqUatAmDwkZRuRCO52LJYjJT/aqj9D+2VPM1Sv/rHJ+VlUYkpVoCIT6hJMvxSHbbhl2t57u2b3n67rvWhoKR//d//jUE4ZtvvOP3Cf/7f/0dQzthOXfvB/tXr7pHPa1fMP+6UDDy0ouv7di+y+8TTp08+0//91/khPIv3/1hUs58+1v/DPV7f/iDK4NC+PrrbsZQEtTA3/7N/+nvG84ohauunBvwB2+68bZnd7949MjJdU9uUtL5WVfNYx2eQr6y6+nn3tuzr7W5Y+1d93a39+x9d9+rL7wWE+MkSgm+4LM7n8MtxLtv7nnzlbeURMass/z1//wbv5e/+abbtTpTDYArr5prseI/+vGsxnMtBqN1zT33iVLs3T17B4fGWts6n9n9AkWzhWLty0apKMpyMluuAJiY1gAIcOK27bv0BmsuX4lEk3Cs1+3hoEHpvwelf0bTy/dK4VRRXVkXmr3MHDWaOYIUkwtQtEEQk/AhPi5K0c721o533nyj/XwjS6AMYuQcWNzvsEwONHz09mR3k58yxgO04MRZTMcSep/dSlm0Md7tpVHeSRqnhtvPHreZ1AEH4aVRN2nFDarp4R7VUDduUHkoxG9H7WY1ph5xItqwmxTsaN19euao0cwRpHqj9JN22TNnZy7uSjIIRxE+Cu9qOn7+xL7+9hPtZw5rhoYkpzh0Xv+LJVtv/tGv775h57L5m1dft23R3N8vX7hu1YKti2dtvOOKPyyds3HF1ZuXz9u0dM6GZfPWr1ywaeWCTSvmXzy5cv6Wu67ZfteNG5Ze/7PHHtgw3q0VHDHRHfeQ3r6Wjo7GE25a47CNephRwtzNO/Q+0sAzOG3QTvW26Ue6LZMDuGbUiWh5BnFjekQ1BKWGvYQRbpR6CSPMTSFEYXUXyjKwVq0L1Uc8tM9mtkwONuzf03X2mBLyFmMCqZ/Ih/1hFw6vJCIsFnfbok5cZKxRFpMYq0hbIg40wiAiaRZJc9iOxF1Y1IXCuISpn0Sp4DD7HPoMx2QNhsYtOw9t3Yl09scRh61f5RgxuicQzzhGj1rQSZNzCpWH8HQfyg9bXSNmQU3aB/S+SYwa0Pk0No+OfHfXa8ZhDSiBmJhgHd50tpTOl+VMIZG6ONcqp8vxVCmWLEbTpZhS/qqj9C8UX6P0CzsgSi81HkqnirFINpUs5DJAEuVUogiqoLGhncTZ4aGJd/74fl/v0LonN9Wq4HxT25N/2NjR3r1j+y44XiQnlP0fHT586DiK2JYtXeVy+vQ680svvtZ8vv31196+5eafZDPFW27+iZLO7/1g/2uvvnXwwFEo8rB40XKeEwv5yqyr5g0NjlUrF6eTOtq7Dx081tpyYd/eA4l4+uabbodzvGvuvre7qz/ISy8+/0rjmfOs3f3Qgw+rVbq199xPk45jR06ebWjCENtT23cNDYw+/tiTLz7/it/Lr1h+F0WzmWzx/p89YHe4dz/74sDgaGdX39nGZikc3/3sizTjPN/cft31N8fiqZAY+7JRWi6DVDof4ERY1w2Gou0dPe+9/5HXJ2RzZbhdCoXsawBksqXPWIP5JEoTciaezIdjSlBKcUGoVRQNCHE/H/H4w96A5OOifj7CBRN8KB6UUkFJnrkAM3MxhnUHPf5wUJIj8Uw8ng1HZKMJPXrkZOPpU5OD/SGvK+zzOBBT2M0EKGvrif12k8qFaOti9Dx7cdclzrmtmvFYwOUmrU7M5LJZmk8c6m8/F+fcbtI60dtx5siH547unxrsYlEjZycow5SXMEY8VNCBwYInzyCX+FTPXIzhGYS3WzjaGqBNftLsp4zwI2vVCA5riMXduNaF6gSHlaOtjGnaY8Mpk6G94ZhpaqCQ4MI+2k+Tgt0fYpIvbfro1isf/Okt25devWHZ/I23XfnIioWb11y3c/Gs9bf/6PEls9evXrht1cLNK+ZvXDF//fKrN6yYv3Hlgk2rF26765odd12zc/XCp1Zeu37Od27YveXZkCscckUDjMCz3NCFTlQ3GQvSQZ8pzBk99GTIa2ExjRszERoVZZgi9RPo9DA6PewljImAI+KhIERh2u3G9PBlCnaUo60+mxmqHUkuWnLRHI1xNCI6bVD1gjGp2k4eGOk4x9FY0E6JTsqN6uDUVZKzx902ntRzhEFyWGQPGXOiURaRXbjswqN2a9xujbuwiPtiRF1ozInC+0RZTLIjYQcK289hByrZEYmxhmiL6LKUBDva0LBzycrzb+1RN3eGjDbHiNE2rGMnrL4J1DmG4CqEVVPxMUdigI5Nu+k+i33QQg+Y07QoWj0uDTHVOvj+82+DAshElFyqEI9lUqlivgScXhGaccbkQjxZTGWqqWxN/njsaGZWkP6vxNFLfphPNar6lDUYub4MM/Pv86UBn2TmU9W/17/j5X+N0i/s+MZFiYBPfMxmq6l0XpKSaaUQjaRBDUTCqUoZyAkF6vZllEIknAA1UKsCqPMHLdLKJVCtAIPe4vcJlTIANdDacuF8U9vpU40T49ObN22vVgCOUaFgpFwCE+PTqiltRimAGtDrzKlkNhZPjY2rpHDcHwiSlCOTLcbiqdGxqTNnzyuZQqUKLnT2ptK5kBjNFyoHDh4939SOY7TJiMZjaZMRfW/PhzhGp5I5O+PmAmJGKeq05ldfeaul+UIuWwY1oNNbzBa8VAYkxTpYby5fOdvYsvvZlzxePq0UMJx+8609L738hlpjTKZy0A/1S0VppQLCETkhZ7K5ciSaLBRrFiuh0ZomJjV2h0fJFBGUhBO8xRIIR2RIyrqSw0yIJuQM1BGUk1mYv8IeakLORKOKFE6EQolgKBoKJUJijOMiQjASDMaFYITnoxwv8Xw0GIoKQkwQYlwwxgVjgWCiHqxXYN18Jl/x+vjm5taGhoYTx4++9drLnefOqnq7TGPDuqH+yZ72ic7Wic7WsY4mUjvhRvQCjYbseMBmcWMGL2EJUKgbM/kolGdwH4UGHTbeYaMM0+M97Zh6vOd8g2Vy2Esiw+1NDQf39p1vGGxtJLTjlGHKgxsvum9iBsY0zZimYUdQcpFQDy9AWeFJyUuzmM5FGCN+xoHq7IgmxrF2RONnEB9tCfsYwYm7bSYHqk2J3u6m080nT50+eKivtdlm0jowPWmeZnGLn7EXYjlVr+nny568/kf3rrhuw9IFm1dc8/QdV21aOX/7iqu3LJu7ccmcJ5fMeWLp3MdXzH9y1cL1K+avXzF/46Krnlw2d9PaG15cefWuRVdsv+uGrXdcs7zh0GHe4Rbd/qDTqx4eaT9z2mVDohzrtBmcNl086OBduI9BeIdtoq+No/8kHhRyIGEXHrRbPZgWlmSh3TecvPXbDBxlEWhUoFGBxgXaJlCUQNt4CuNpq9M6HffZJCfitE6r+zrH2ts9VlsqwHkxY5KjOcrAUYaoC5UcprgLE2zaCGOR3WiOpxMOi8xa025MwrUpHyH5cNGPR7x4zI0lnITswGUHHmdtIoUUIgH4y1cEj2THRRuWdtFFL5lzoCef27Vn/QbHhNrSM0oNa71qPKink7iP6dH4p2xuFeOadrtHXVkiqxAZn8rPjNg5XcDcYxBxzmtyNH54MiMmFTGlhNPJSEaO5eV4KREvy4nKTGfly2HpPzPkdFFO/5moS/rPbL0rKbmSTlyMlFxJpmuRRDEcL8RTFVmpJZIVOV1OZ2vQ1jubqSTlvJzIKelSJlVKyvlMphKNpWQ5n82Vk8mCLOdTmbKcLsbknBhJZQsgKhcKZSBIqUSyEpMLhTyIiMlENFMpg7RciEWVWCSbkksf87VaDzlVTaXKX6P0izq+8alSO6l0PhyRqzUAlxrhaGtaKRhNKKgBn5cvFqoBf7BSBgIvwflbuKwCQRuPpSplwAVCqWSW58Rsprj3g/0f7ju4/6PDHncALrdUKyCbKUYjcrkEYtFktQIySkFJ52sAlCuA48UaAIVilRekag1kc6UaAAlZSaayUjheA8Dj5QrFag2AfKEKF1egpSmskRaKtUg0GQxF4UysnMwWirVqDbg9XKFYi8XTsI4K7wxl9uDOSVopwIdDyfhCsfYlvxWL2WwVqkNEY6lsriwns/lCdXRMtX3HM2+9/V7judam8+1en5CQM6XyxW2ZOkpnFnKTqRyc2o3F03WCQqzCT6A870yPtrrRKTwJ3Wbgl4KSHJRkQUrVIxhJFqoAQW0nTp18f897x44eHOrr7mo719PYMNh8tu/c6fYTh9uOHxo4f0Y70G2dGHZa9D7cAu26AjbEh1sCNoSnMDdmClAodMcU7ETYzfhJBNdM9J1vuNBwDJ0ek1w0Oj020HK273xD55njPedOENpxiEzoxBn1MkrIS2jHbboJN2ZwIjrJRaaDHg9uZKwaF2FMil4vbfVQFtFLM4iWNE97KIvgsiHaMcPkAG6YdJNmjsUDDqzr/JkD7+6ZHhy1I+h4b3dH4wlMPxHj3byTlgVp5MLIY7/YvOz6B9f+ZMvqG7YvX7hzxcLdN37nsSWzN6298Zn7b3n2nht2rFywYcX89auv2fSTKx751zuev+/m3bf98Pd3/HjDyqufXjbnqTtmP/qrNb+hLaaEwDlxNBrwGSbGLpw7HfI4/Habm0QZRO+hEBY3OQmz4LKh2lEoIww3NSFN4fhx0H5RfQJStr7cGbSjQfvHNKWoIEMGGSzkQHhGH2KNEY81J7ko3WTr0aPavhHZx8W99rALDTksOclVifkkh0mgdCkfkfIREbsp6jCHSV3WZysH7SFs2odMhTmbGCAiXjzuwZMskbTjMkMk7ITsZhTBwztsAQZ3oUaeQEIEnrBhedoqqEf2bts8dOxE1OZgp8yckeb0lK13OqghA+Oovd/sm2R5vVDwgoMvNDa+3dX50XAESzumPLZxMoAGdv3hKfOEoSTnC4lcTs5nEoVUvJxMVORYVY5VL0HpXzw+G6V1iKYTlUyikpIrcqoqyUVJLsaUqqzU4qlKIlVKZarQsjSdKsZjmVg4nYzn0nJBTuTisbSczObylbRSgNfcqUxZiqZLVZBIFfhQXIoriVQJLgWlUuWolAIVkJYLsXA6HJIhBKPhzKeiVE5/jdIv7LgsSjlegrxJpnKQTAk509nVf/DAUQjOShmEpTiUNyqXAMxQ335rT6lYg8umuWzpQkdPqVibnFDXd0PhA6EaA/QGF3gpoxTg3ks8luJ4sVoDNQCisaTXx1droFiqZbJFixW3kXbI13AkUa4AJVPgBQmqF0GJIpicZXPlACdWqgCezObKmWxJyRQz2VI8oeQLVdh0DEfkWDxdLAGodgvVD+CLhSO1cjL7nyDRkMlUQmIM0hGOF9UAOHa8Yc97Hx45eupcU9vwyGSAE7O5clopQOTDe0KO1iV54edwAQbO7kZjKfga6zumdWqKUrwuhV8Xc4A3ofOMGEmJkVQootTDJ0TKALR3dO/9cN/E2DiOWeLhUFjwCgwpsZTEUkGGCDJExMUkfE7Z7+JIlCPRgA2pBzSU9uBmjsYCFOrBzX4SEZ1UiCV9NmuS90guOuiwBR02L2Hx4OaIx56PCCMd53rOndAMdkY8dCHK+0mLZrBzuL2x6+wx03i/6LRBg2uo6eO2mVhM77ejfjvKsbibNPNOIhJwGCYHhrvO97Y2XDh3vLe1wTg1GOVYwjjV09KIaLQ863QReEfjqdOH3jerh/x21Dg13HzyRGdj+/uvHFh1yy+v+f6axfMfv2POuluvWP/AT96676ZXVsx7+tbvr7v+nx655fu/XzZ3009vePqnNz516w9/d/uPH106d93i2X+454Yd99789I0/uq/5aEvQxSZDguR1GyfHzxw+2NPSqB7pd2DGGO/mWJuPwXgnIbhsUY7lHKgL1QVIY91vrg5OiFLoRgf5KjAWkUVDcNjHbhUYJMgQooOQnETEjUU8ZsGhDjm15YTHg2nPHdzXceKkZWzMgxvDHkIRXbzd4sG0khOJevCMYA8xJsGmlz1E1GGO2q1JDxahDAkvJvrxkB8Pe7AZWaktztqCFCLYMdHNpEL+AIVWIqFiUADhUNKiMzQc37dpE681RXGWGTV61bh92BDUkN4Rs2/UyvSZyF6EHKSe+On2lfN/sXr+A3df88v3dhwU8bh1EOk60dW4v6EUz5eThVKykE8WsnJRSZZTciWZqHwyK/2Lx7+B0hmRSZRScimpVCKpYjxVSmVrqWwtkS5DlELNPyVdkhO5RDSTSuSVZDGVLBTyVfgmhW5R2Vw5lc7zQhhaLopSPKkU0ulSNluNRpVoJK0k86mYEuIjoApCfCzIRfO5mhhKfI3SL/u4LEphnicEI7F4Gl4TjY6pcIJ57tmXECvR2zPo9XBKOp9KZhErcfLEGYp0gBpYtXINitiGBseiETmfKzeebQY1cNWVc52sV0nnSZv99KlG0mYvFWsZpYBYiZHhCS4QSsqZjRu2wjunlXxL6wWLFa8BUK0BtcYwPDKRL1RIynHqdGOpDHL5ss8v5PLlcCQRjiRgMgfHXKOxVCZbglGvfMKsGsID6hlBg0+IzDpgwhE5l69kc2WYn+UL1Vy+IkrxLxulkpSEPyGkflopULTzwMFjHi8vSnF/IBSJJqFCPS+EP5mP/knVKKHUqQkhCqkJ0QhvwjMhMQYtxGfahtdvXi4r5aVEOJE+3XDu6PFjDEUH/G6/m6Uwkws1+glrkCEklhIdJE9hLquB0qmCDMGRqJ+w+gkrhCjMTX02K8/gHI25MZMLNUKDTGg6LTopL2FhTBovYfESFjdmCrFkIsCqBy50nD483d+Ba8ZUfe3djcd7zp1oP3VIO9QV9TI8g9p0E6xV68YMgh3z0VYWN3goC8fidlQX5dhE0N3acLjx2IdWzajNpOpvPzvQ0Rj22zWjPd3NDS4CVw0O9Le1DHe1DFw4291yvOPc4aYT+9vPnrSotKSBfmHL27fPu+/2ub+8fc7D9976zOoFzyy+cuet39t4+w82L5+7c821z625dvfqhU8tn7fp7uu23PS9B5fP//0jd7142xU/v/mH973z9JEQy/to0omjyZAw0nXhzeef7Wg81X725GhPW9BN++24kzCLXjrgwFjcYDNOOhEtR5lgOReOR0FlPnhGYCySE4P6EiKLRj246DSFWGPQbg7arSEHJjmJqAeP+VDJrY/6dIJjMuY3C3aDdbJPN9gz0tbc33yKNk0U4wHJjbswTZKzx31U0G6WnFiQNmZ4NuHGecIg0qaIw5oVnbzbyrmtoguJutA4iydZQnZRCRclOgiexXknmZICfhIJYBZVR7t9bJjp7Gh8Zlfb62/JVtI9bsK6Vc4xCz2ojxhZvH3CO4yENKx7jDnzVtO//I8599z0mzXXPbTi6p+vXHCfpssy0apuOdwKiqAsF7NRRYkpSiKbSmRTSahUUE2nv+wq0ZeL0rRcSioVuL2TzoFUthZPleLJYlKpQJfvXLaazVQyqZKSLEKUlsoAXhCXyiBfqNb/rMnJbDyWAjUAs5RQMJLLFDPpPCgDUAV+j1ArA1AFQS4qiXIuW/0apV/2cVmUJlM5eOEDq4WlMnjk0T8US2D/R0fOnmnu6x3eumVntQIInDl1slGjNj7x+IZyCdx+2+LxsemG000vv/RGqQh2PvWs18PffttimnKCGmg+32E2YS+9+Hoirlzo6B0fmz51svHokVNyIvPgLx9ubeksFUHHhd7BofG29u6BwbGQGHvn3b29fcNDwxM1ALZt3yWFE7DUDGkBd0hCYiwhZ2DenMtXorEU/A+Xy1dg9laugEKxVl++zBeqCTkD89RUOl8sAXgTgqpQrJXKAF79JVO5LxulgUAYFpm9PqFUBjUAXn/jnWm1IRyRM9mSKMUz2RIvhENizOUOXNIinYnSej4KE9A6Neti95dUd+s0hQr4ULCifodPorRYA1I8pdYYzrc0T45P+LzOYMDLeexBh40jrT7c5CfMPIWE7LjE2iIuCjqN+HBTwGYRaJSnEB9uclq0cA+SZ1CoGQtXKj24kTaqIh4airAnAmzEQ7NWrRPR+UlL3O/wEqaBlobTH7070NJgN6sjHnqiu2W8qxn2UOESiBszuDGDj7ZG/HbGqnHbTGEfg+snxnpaeltOTw10JARXQnBNDXS0nzlimR5uPnmg+cShnvPnWk+d0I4MCE6CsaqGOk/3th6bGmjNx4UAQ0W9onkc+ePu/ffe+dh1P7j7/jt2rJy/fcXcZ1bOe+7uhS+tvf6Vtde/ctfC3cvnbV05f8ua6zf/evnuB5duu/EHq677/qKXNr7j0LslF5fgAxbVpI+yOTHLhbOnJvu6TJOjF86e8NOY22Zy4oY47xScBGWeRjQjbkwPt2BhYgpTz/pNjjKJLCo5sZADEVk04sZEp0F0GkKsSWStkLJRLxr3I7x9ShaMolsV9miSPK6EGCXoZq3aC41He5pP2hGNEvalRE/Mx3C01Y1rk7zTjWokJ5HwkGEHnvCQAmly41rBjQluTHRhYQcacaBROxqx42EHHnZTIQ9lx/Win+Edtqnu9iOvvzLdeObc7mf3PPRbuq0vMo0x/Vp22MKr6ZDO4ejTkR1TssnLqxiiD7l74doHFz++aN59q6/71e/WbFt1/QO/WP67sQ6N5IqDDFBimXRcScmZpJyB70o5XUwqJVjD/C8Vn4JSaJuRLKSShbT8p8gkCmm5IMv5mJxLpApJpRRP5qVoOhpVZDkfiaTj8aySLuWy1YxSlhO5eESJRtKiKCdShVIV5EsAVpLSqVw8lioVa6AG/N4AqIGpsXG/29Pf2W3RmYZ6h0EVRMQEVKqpFIEYSsSiyp8PYX2N0i/+uCxK4d/xbK6cy1fCEblUBldeNa8GwLonN+dzlXQqv2L53eUSOHWysfNCX7FQu/WWO0tFcOcdy4qFWrUCZs+aX62ARXcuL+Srv39sXSqZSyVzez84EBQi657c7LB7Nm/aQZFsPldZvuyuRFzZvGkHqIHOC31/eHITRTsNRuSBX/5mZHSq8Vzr+IT6g70H4gnllw8+DG04oc4f7HGWKyAhZ6ArGUw0IVBT6Xy+UI0nFI6XorEUBDAcxsnmytFYSgonorFUWinA7mmpDBJyRgonYK8Rlov/E3ql+fzFDmipDO7o/w8AACAASURBVCAsjxw9xfGSPxCC+ISVWyVT5HgJ9kQ/tcALq9n1gm0dijMbpfAMJOjnRak7ILJejrG7GpvOvffunv6+LppAea+DZ3AvZnRatC6rzosZAzZLkMEiLqpuM8KR1pkohV4lPIPyDMrRSN1K00uYJBfpRHSIavj/Y+89gyQpz3zfjTgfrot7N86ec3ZXd1frjlbSOklIQggvQAgnGIxYCXkkgVgQIIQVwiPs4IcZGBjG+5me6Zme7p5pb8r7yszKyswy6b135ave++GdKVqDhrirQEcogownOrKrm+msCqp++X/M/4EEhZhEorNCOa/X8VohgcbmaoWEXsddoTp3aM/0gZ0iUWhqnFJBYVOSSBSIXDS1MJlamFTqJSIX3bflzYn92wqxWaoQFysIVYjHZ48sTIwsHxs9sndLbHo8OjVBZJOWUNHZMpFfIPJzHJlgyrGGwaCJpUo+b9AKkapseHH7tRf+4J//8isX/9t/XPH5+67+0sNXnPbghZ++67xP3H7RP/388tPuvubM+y/+zE8u/uz3zvzHy8/7l0tee2wdk6d5tMbhhFylyFyGxpAakqOxgsXT2aWZsd1b62iWzMfIfExjyhyRr6EpupRmkPhQg0J5KpM5sZyBNsJ0MQa16YlkbxqiVKmk1UpOrRS0KszuZtjSrM5EpMq8xSVMNi1TSV+kbI4sZ5dnx/fu3bxucmTb1OjO9OKkyZMckUvPTcwf3sNiGU+sKRVUqaAskqayEamOirWCXMkr5axcSotokkdSNJKkSxmayOVS81ylqNHk9J4dszu2ibHII1dft+lnd7cSGDeZqE0kufkSO4cJi2VqLCEvoM2CSE5kIjsXrvvyN8/55OUXffYbZ37qysvP/N5FX7z+e1fdRheVgQ84Sh60QMPvhEHbD1pu2HKCpuU3Lb9peq0/VHvRB4VS0ww1M9CtULdCWXM50ZAkyzACQTAkyTKNwHVattVQZFvkdIHXJcnyG32/0Wd4DVZ/XCecmZqdn11Ymps/sHdfYmlpdNfuI/v3rn7y8Scf/NVtP7lt7MA46ANTc3XFViWz3wO1qvARSn/fx/uhFK5Mgd0u7Q4459wLm63+nXfcAwZAloxrr/kmGIBLL7ny8KFJFCFu/Y87bSu4etX1sCB6+WWrbCv4/vd+HPjtz592xqAPCvnSKy+vpevC00+tzuewRx/5NVwCc9NPbpVE/Yc/uMnQ3eefe/nAwSNHxqfyhdKb6zfKijk7t3zo8ORra97sdMHV1/w7L6hQjMLMM+wzgnITSlWOVzTdgRndIOzAJqYg7Hh+C24og2K02erDR2CnD5zphFgNG92w0YW/oOnO7xulgwGAnboDABCUODx2NF8oCaIGucjximF68IJhnudUbUdQgEJbBkhWSErY06SoliBqvKDygipKuqyYoqRDfMLz4bfwnJdMXjI5yR6GYvpuo2M7AVmhDo4cePutdTNHxyt4gUYy9XyCKaYgL2u5OGQqj2U5NMMiaRZJc2gGnjPFFNz5xWIZSD5odAdFKsQhV8rCj3Iez4lEwZfq5dRSduEoi2VcoarVSiJR0Ov4kV2bju3frlRQV6hS2Si0bler2NLRg3s2rZsa3YVnlsf2bN6/dX0VSbLlnFIv8WSBzMfoUsbgSEhWW6yqdUKlcamKELmlQnyCLkcUJltBFyrIIplfrhbTNs83NVerqmM7Jr5zxc2f+dhXv/z33/zqv910xRduv+ILd176uTsu+eztl3z2P87/9PdvvOLBz3/8q2d+8sKZfXMNya1kigpFCWS5nEnIVUIgS9mlOZ2ptkz52IHdI1s35KMzmaVjmaVjhdhMYu4IkpijS+8uB4WDsLAyCvUodJwYopTDkmI5JZEJmUqqlZxWRbUKplKoQhVlMiOUI2otypfndToukTEyMyPgWYksGhzJkYWxvVv2bH7j9dVP7NiwxpZqHFnYtWHdzg1rqHzSEek6mq2jWaFcFCmMo/I8mRfKOamUFZG0UEwxSLKGJhkiWymnyVKKpQr5pan1Tz9WmjlKjo8/duU3qtsP9ZIEfTgmTBXEeYI6kiXHMtI8BoObL9XmyenN8//4p1/44aq7r7ngpq98/vpvXnYrnpF7HrDktimH7QYI/LYftPyg4QSh7QemF5peaHqNE5N7H5b4zebhlShtuE7Ds9+NAJ64zeF7Fr4rVcVy7FDXPE11Dd137KZlNGXREXlLUTzb61peV9E9hteglwtF1teuWbfxrbcfuu++5anp5594LNCUrW+uy0WWNr6+Zv2aN+7/xQOh3+p1QCvs1SgWLvk4sWLypCv/aBjmAztOiVI/aMPEYLsDYJXxnnsfDMLObbf+HGZrv3T62Zbp/9l//QtdczTV/vhf/0Pgt//+7z7Jc0o0kvr6Fde0mv2LLrxU15wLL7hEVaxMuvjd79yoyOYv7rq/hFE3/vDmMOh0O+DqVdd32uDqVddLor7xnW3jE9O8oPpBe3ZuuVDEYSPxf/vvH6vTwg3f/gHss4VyE0LFsgP4ree3YJIWutU3mj0o0WwnhFiCqhQ+L5i/hUMjsFMXZrNNyx9ujIE9Sr9vlAqC0euDYZfTo489lc2hgqiJkq7pDscrdVqAS7xlxRyOjb53GEaUdFgxhSMxsD4Kn7iq2byg0oxYq/N1WmA5mRdUjlfgX4GI5XgFUpbjFY5XGF5jeI3mjWHUOIUR1WwO8QK/Vqm+9OJz+3ZtZyolkUB4LCuUcjJRhHMvQimnV0tSubByBSbUplK5AAdXGDTNlbIQolCVQpEKfQaGtgNcKVvJxWgkBZ1mq/l4ObVUKyRkCpncu/Xg1rcy85O5xWOxY4d4PKdU0GJkZtc7ry8dPXhwx4Z31jy/b8ubiblxgSrCPTNKvSRWEEhQJDEv1zAiF+WIfCE2Q+SWHJmwRIwlYwyxLNWTKpuTarlSepHGciyOqTU6VOz4scRdP/jlDV+7+ZxPX/nZ//eCL/7N18/55PXnffqGcz55/WVf/ME5n77ynhsfTU5mVVLQq6xaoWqFFJ6O01iBKRWR+HK1mJWreD4ytzB+cGzP5kJsFknMI4n51MLE7NiefHSax7PDPqN6IQo32ECHv+EwDNSpw7YjsZySyYxWRfVqWa+SKlWWyoiAZ2UqZTJZrrSkVBIWWzBpxOOrXClbRZIGT4lVFPSDXHRmzfOPo6llLB2ZGNm57a01yYVjHIlRxQxLoFwZpYqZCpKsIgkaSbJoSkDTIpbh8SxbztaJDFlKGkrN4KmFg7tX332njyG5nbteuuHHABed6SwzGtMWCG2pyhzDqhN5L8FUDyfKo1F2DjPSUnmWuu68H3zyf5xxxj9d/q//88Jbf/BwPwAa1wY94Fm9wO+alq/bnuH4uusanmf6vu6Hlt/8Y0WpEwZ2w3PCZqMXhO3Abztuw9BdRTZNw2uE3TDowf8w8Lue0zW00NQbntcznbZqNsIW6AHgB22qQk8fm9vw1tsNx2v7PpnPNU0dS8YDVawUMipd00V19dMvbNm0/cXVr4A+UCWToUUwAB+h9Pd9nBKlMJkgyQYUTIpqHRmfSmeKB0bGFdkGA/DGuo1gANa+vmHd2nf27jn0wuo1lhmufv610YOTc7PRnTtGuh3w6ydX93vg4Yd+XaE40wjuuftXLKM88fhzY4endu4YMXQfDMALq9eAAdi/b+zNNzb1e+Chh349Pb28YcP2iYm5ubnYtm375uZiq1ev8f3ubbfdbdtNz+tYVsN1260WkCTrVNf/gcXvGaW67kPV2Gz1U+nCvv2HYEVkqDIN04OlTUjKU1k0DFtwhxvWJNkQRA1iVZINmDSGAWl6quB4heZUmlMZwWQEk+aNOqfXeTWPEZKsi7LE1On5uanXX3lxYXqcQdN0MVEvxOuFOF1MMEiyXojX8jF4ziBJuMALntPFxHDXN7RWGBos8Hh2eD78KY9naSQFa6hCOQ99fNQqRqSXx3ZunBrZMX1g5/juzRN7tswc3HV037aRzW/Gpw7zeK4YmRnd9nZk8qBEFmUKqebjMKvMYpkThgaoSBSq+Xi9mDi+CQ6LMViExpZobKGOzpczUyKZtDhMqSA0kqkXshJRNmpMLYdGx+c3v/LOE3c9+cDNjzx869OP3/HSE3e+/PCtz7722FvFBbSlhCJeqxcKep0QiYJIIPVCtlZIkZkYlY27Qt1iK/Gpw5vXrF6eOAD9K/DkAhKdYdCUzZHDFeUnxdCz6aSo5WM2Q7JI3qZpq85KODmw7Ho+o1dLEpFlsQiPx9RKzqiXVKrE4wWOyKsszlNFhcYrSPLZR+/bsOaF+NzkwrGxo4f2bXnr9V2bNuTjkcTCrMbUVbpWQdI1NMWVslQ64nKVSibKlrNkMVYpp9H8MkPlMvMThze+kT6w104mHl517ci9j7XmC/ZUrjYSZSeKdpwrHUgqSxV5tmQsEfxMvnosq6d5bKqcGsceuf3FR+5+9Y5bnohM490GkLmGqbe7bWAYgWUHphvYfsMOmk6jYTUbZiO0/A+dKoWW+if2crccp+U6DdsKXKfhuc1m2GkEbdv0FEm1NacdtDwn9LzA0OxWs2fqDhiAwG/bVuDYoWOHzcbAdVqGFjpW27U73S4w7JbXAJoZOH4nbHTDRmdk3+gLz6+WGA4vFMrZDEfgLI6VUrFqMetIApot1kn68Oj4Nau+AQagGXYM3WVosd0ahEHHtuEO5rbvdx2/9xFKP8DjlCi17ABu0JQVEy4mSyRzC4sxz22DAShh1WZjgCIUGADHbg76YNAH9ZoIBkDXPFmywADgpVqrCVTFAQOAIlSnDVpNkM/h/R7gOc3QffhP0XWp3QKe26ZIttcFphkuLaWOHJnp98FgAKamlpaWUu02yGSwDRu2N5sgCHqO0xIEo9UCphn+saPUdduwRtts9bds3ZXJIpJsBGEHchSKzuFYy/ss/dYNF0pbGFCMyooJsQrtfFlOhgE16H8KpZxs0oJi2T5ZoSokZVvahjfXHtq/k8Uyxxl5gp10MfE7oHR48u66tFIGuvkwaBqmcGGIRCE9NzG+ezMSnTUZQq/jaGxuYWzf3KE90aOjZCYCPfMKy9P1YhIOyVRyMZlCII9pJEWkl0uJBTy5SGUjNBqn0SjkKINFmNIyjS3R2JJaz4hkkkajVG6pXkyIREGmMB7PwcVnep1oqqrNyEyhplMGCAGZqCwfXiosZKVyXcRJvUYZdLmUWECi83giqlRKFlvB4osLYyPFyIxWKy2Nj6Rmx7H4XL2YkKmiVsN4PEukl04i6NCuYbg87jcjLRNFhcQlvFzPoi8/8vTqB5/Y99bWtmqY9YpMFE9Y+RdUChVxlC7m2HJOqqMcla8gSaacG921cdfGN4QK5umiRJP5eGR8ZO+W9eu2rF93aM8uPJcWKhiDZ9UqplIoU0zVColSepGvFdlaUZcrClOaHtk+t2PzoEJWDo4++vVr8I37esuYPV1kj6S1eUpZrJZH0/IiJc6h+MElZREjJ1I+bhBzZTothxIoJtm3140kIxToAc8GIu8aRqvdBpbbstyG5TftoGkHTbMRGmHwIUSpaoSa2YAL0Ryn5fvdMOjAMHRHkXTLsLvt3qAHfMsTGLbT6lqG3Wl1RV4CA5CMZ5iaEAYd2wpsKwj8ru91oKOCY7U9r2d7XTcc0JzqBl3YClqvcc8+/RxPMzLLEvlCdHaayGUahqazdGxmWmbFUgFvhp3xsaPPPPU8LLfxnNJq9gO/fdzkwW17XucjlH6wxylRalp+fwB0wxVEzfWa0NMukcz1uoDntGZjAAbAMsNG2AcDIAqGprqw0t5sDHyvYxoB3CqqqS48KWFVmGcwdL/VBGAABF63rUa3AzhWhUhWZNvzOhCiPK9rmjcYgE4HdDpgfj5eq4nNJrCshuO0OE7rdoFt/545+vtHqe93YTWU45XX174FG25httk94YwBiyuw0HsqlMKC8co7IQhRmO+FVRmYvH1/jp4KpaLmlKuMKGmyqqiyEvj2s79+/MjBPVwpMzS8heW9oZv8Sgvcd13m0TiDJdhSksNTwxh+y5aSDJZ49xdKGZEocKVsNR+HLOTxnFrFSomF2dHdqdnxaj6uVFCDLut1HFZYZaKokAjMJxs1nMeyZGq5louLeB4Wa4eFW6lcMGmcRRMsGuOwOFeKwmCxCItF1GpGJBIMEmXRmELljToq4FkiNcviS9XirEglQrXm8DW6WOCxclOxl49Mz49OlhNZs84KeKmSTeWXpib3bt315pqZkd3xo2NzB/ce3rZhz1trDm/bEJscjU4eQCLT9UKcLx2fdRmuJT9p0+pwt/Zvi4xCYgpBsEVs+5q3P/5//cWlX7rwxlXfYfJls1ZXSIwvZTgsLZZzUhnh0EItl2axNEdkGDxF5CJipUjmowd2bBAqGFNGyEKaJXGZrjIE7qrykf17d23agKai1WJaq5VNhsotHtNZooIkZQZH88vp6LGj+zePrH+FWZwBFer1H/5o9bU3DGJouIDoUwV+smDHWXq6VDlaEBbLyiJGH02ZMSK3f7Yyh6BThdwUenj77Jb1B0ZHFgy1A3rAcwZhCGy7LQiW43ccv2V7zRNV0tDyGx/CBK/l9Ex7uCKtaVmNE1BsOXYQ+q1Oq2ubDsewrmmBQd+3HaZa6zSaoesRaPmlF16++677wAD4TtN3mrbVcOwmHKRxnJ5ltWTNd/wOw2s9AIKwY5herwt+fsddC3OLe3bs3Ldr98LU1NjefetffXl2fAy02rVyJZvIVKkagZM/velWVTa6HSDwSiPswqyy7YSO0/K8juN3PkLpB3i8X4K31R50e8B2QkW1uj3Q7gBR0g3dh21mlhm6TkuWLE11PbdtmWGzMZBE07GbrtNSFafZGOia53sdXfMGfaDINnzQNAJNdRthX9e8dgtAeRr4XUP3XafVbgNBMJpNYNvNMOy3WqBWE/t9wDDKYAAsqyGKpq77sGFHVd0/dpTqug/t7KemF6ZnFl2v2Wj2FNWCHIXmEq7XdNwG3F16quuE/hKu1xw2KsNM71ChSrIBSSmI2rAF6T+lSktUvVbnJEWWRSkaWXjq8UeSkTkezw7Tj8NUJKTmfwqlfDnNl9MrH4SPyBQCPQKh1iQzEbiAc2znRiQ6C7uT8OQimYlAzyO9WoLdT7BqC9ugeCyrkAikKV1IwqEdDs1UshEOS/KlhFCOHw88yZcSHBZn0ZhYTonlFIfFIVAZJF7NzzcNXGdSdXS+Upjj8BSDpnKL08f27Z4/NBqZGEciy9n5udGtm3a99frhHZsm926d3L0tOnFo7uDeyd3bYpOjyamxhUN7l8b2Z+cnWDTl8pRew2r5CJle4LCkXkNWvm5DoK5k6m8GnD7CmQK65onn/58/+d/P+ecvf/Pia7IzEaNagyg97oiE5zk0V8+nGCQJ71fkWpHHszyZnxzZPjO2lyMRoYLrLM2SOJJKMAQ+c+Twrk0biolllSE1mrTYCp5cbJqCVMNSy8eOHt65cHRk/sB25NhhIPLMgYMPnnNB8bW3Qa6iTsSlYzlmIqfF6coxRFyucIs4M52VFwviYl5cLmJH43yqRi4TD97+eHyh4Fg90Aey6JGk2O2CbheIou2FPeiQZ7kN0wkNNzC9hu01f89Gnv/p8AJgu31olus4LcMIDN21TN803Ha76zk+x7CWYQLQDxw7GY0cPjBycN/eybEjW97ZePONN21+e9PcsXnfbTSDbjPowk9XU28YWhgEwPN6suY6fkc1/HYPNFt9WTHhvpBjR2fHxyZmpmbj0cTssakdW7Zue2fT2MjBXDI7aPfLJWJ+duG5Z15Y/8aGEzY4bd9rHb/zdlquC4eLWh+h9IM6TolS2AfbHwC4mNqyg24PeH7Lc9ugDzhG992e7/YGPcDU1U4L9LuAY3TbbDUC0G6C0B/wrNFugsDr22ZLU3zoX2UZTdAHpt6wzVbg9UEfyKIz6AFdDUy90WkBRfE8r9dqAV0PXbfbbgNV9TUt6HRAGALTbKqqL0lOrwdaLSCK5h87SkXRHADAsNLWbbsFUYNYlWQDQhGuAYd0hN+e6jqhKn3vZphhfzIsnUKUipL+O9RKNdvneBknylWqsnXLO3t2bEWycaGcg2Mbww/9oTD9T6FUJLMCkRGIDCQoPBfJLOxOgp1HlVwMTy7CGufYzo1kJmJzFDQUZNC0SBRqhYRKoXCklSmm6vkEh2ZEPC/ieTy+AM9ruTgUqRyaKcXnBDwplONiObXCNui4/61EZFk0QaTm8cRsLR/hSwmJSNeKi9XCQq24zJbiEpWrI7HYsdEDW9YvjO2bP7x//vD+6QO7x3dvnR3dm12YwuKLIl6kC2kqHVEpNBDr1WwMjc7YLAFDryFQj4rlDFz9tnI93EqRegqUpmWywKE5laQSk7O3f/fmG1d9Z/WDvzYqrEqSUrnAl1ICnpQI2KCU40sZAU9yWLyWX2qbdL0QpdF4KTG/653X58ZGxvfvmD48Eps9ujQ1uXfrppkjh0d376iXCipTIXMJtU5oNClVSuVcdO+29Ts2reHxbEuotKkSKCGbfnLzulXXgwzeXszxRyLKfLEynmLny5VpVE9z9fmisISws8nq0UirzFHTKWKhMLHlSG6hCHqg0wae0+VZQ1P8ZghMs2nb7SB4twBp203TCS239WGTpK7bNe2uZrRMs+l5Pd/vum7b91rNRk9TLYbhmDpr6kboBxxLT09OrF/72rpXX0rHlte8+OJlF11UTGenJibLCC7Qom34zaALc3uO01FVv9EAtt1uNAZho+u4DVHSXa+pGy70SW13jpvHBX4Lpv0kQT08Or57267piSm0iAmcuDi/dN013wADEAZtz214Kzr/Hbdhe+2PUPoBHqdEabPVh12vsGIHRzM13fGcrm22Oi0AUWpoYegPXLujSG6vAyBKfbenyl6nBUy90QwBZKoqe60GcO2OLDqtBgi8vqb4jtUOvL6uBvDE0MIwPI7MRgN0u8AwGobRaDZBEAw4zmg0gO/3JclpNoFtt6E8/aNGqaq6AwAOjx0dPTQB51zhUCxkJ4zhxQwfeW+sXAA+3P4NUTpUpUOU/g6qlBY0QTU5XjYs03PcdWtfnZoYy6ciH5QqhSiFHB3SVCSzDJqmkVQ5tcRiGTg5QyOp2dHducVjsJOIzERYLNNQ2eNTMWiGRdKwnZguJIVSTiGRajZWzyfMetnjqyqFinjeqOE2Q2pVVCLS0N9AJjPQDEEi8tA2SKGKEpGXiKxWLZo0JpO5Wj7ClbI0kpHIokGXifTS9IEdx0a2ZBfHN6155tCO9Ynpw2QmIpFFrVZWKiUeL8gEKpURoZRTKdSsl1kkTaQWa/mYVkUlIg9XqIrljF5DFCrPIPFhHfSk9qJToZQvpQQ8a9YrHIKmp5am9hyqpBCrTktlTCzneDwmlGMSmZCpFHyOKpmSywkOWW6q1WpukS7GPIFcGNuLxef3b3l7y7rXjuzbeWTv7peefjI2N1NMxiLTE9OHR0a2bihE53kCSS9NTx3aPTO+Lxeb1mtYWMdbpSK+besvTjv96G13gxxpTkakmZQewWszeXIGqS3gUrJWnc2q8ZISyTEzMXYhWZlN5o4sPnzLL0ELuIZPlGuioMGiT+B3WVaH3u5wW+eJTSkt1/2Deda/X/jAsDqW1QqCQRD0bLvp2GEj7Dh2IIqywPHVCjl2ePTFF57ftmkDVsgmFuZsWWQo6vaf/rTth1vefudH37ux6TU4WnLMgOe0MDguJBoNIIp2swngcD8vqLDWA6cBh5Pxjt+CyS1d9z23OTu9sO7Vtfv3jsxOz6US6ZdffGXQB2HQti3fPVEA+k2UBh+h9AM5TolS6EML74YazR4c3JQVE3aXGVrYbgKyzLWbx19nKDGhylQkF/RBpwVk0Qm8fq9zHJygD0TegkX1bhs4VtvUG902sM1Wuwl6HWDqDdfttlrA9/uaFsCbU2ippaq+qvrtNoBvLctqmWYzCHp/7Ch1nFbY6L69YQuCEpruwHcLdGp8L0Hfh6an2mAKi6aKakElCgulvwNKGVHHKzTDin4Y1Ku1l158bnJslMRyPJ4dfu4PGfA71EphdpctJYcBc7wMmoZjMCyWkSlEr+M0koJjMEI570t1tYqVU0tYfJ5B03odZ5E0lY6IeF6vllgkzWNZlULpQjKUaKaYKi5NQ3mqkIhULojlnExmZCqlUFmFyipUXqGKMlGUiSKPZbUKZtGESeNaFVWoPIclq9mYStWQ5cT86NjE7t3b161Z99zjO9e/Ejm6f3F8F56aOV7uReEi7jSPF5hiCpZvoX+Fy1VkshCdPFCKz9HFhERkxXIG6l2tmjfqRaiG4ePvWyWFkWCQqFhO6dUSlU5IOBkIcle3yFRcxPN8KcHjy3x5USCWRCIqkQmJTAhYRKNSNp2X8LiEx/lSwuHKQjnHoGmBKvZc3df42SMHN6x56dCuHUf27j56aN/EyO7xvdvnjxyYP3IgszyzY8MalSPariQReb2QdBKxnXfc+fKlV7V2HASRonpkTl7M8ItFbrlUnsnXl4jqIlZfKtbn0loSYeei9FxUjBfTh2ZG1+8BbdBt9Bw7GPRBs9FTZNMyQ3g7fnynitP33YHvDjzvQ+e+C6PRArbbt+12GALf72qap6m2YweG7qiqHotE161d89qrL09PTVTKWJUoMQSeiSyBfnds354rLr5415Ztb655o+GGbF1UJRNFKF3zWi1gWa12G9C06jjHR/hgz1EQdsgq3+4BTjRUw7e9ttvoNdqg1QWm02YYBUrVQi7/1JO/PrD/YKvRhraCluk5djAcr7ed0PaabtD+CKUf1HECpW77pIAJ3la7L4hquzXw3Ha7BVy7Y6rNVgACB7SC469tGVHGDkQWZ5CjY8mR3XOxxbLMtVo+AF0QOMC1+6ochP7Asdq6GoRh3/M6sKjQCPuu05JEs98Fuhq4Vtt3j5CR5gAAIABJREFUe7bZ8v1+vw9k2TXN5mAADKPhul3DaAwGIAwBxxntNtC0wHW77Tb4XQH521fLnfz1Ay7MnPwiu247bHRLeGXT5h3Q7xBOs8Bc7pCmK789FUrfpx3ppLaj48jkT5njZXiN5vQ6pzOCXRdtmrfqnF5jNVExVc1KJBKvvvjCi88+FVucNYUaV8rAjC5s1uWw9Im2owiDRBkkyqKJ4x28xRRdSNJI8reiFBbw4FzKiemUBFtKVvMxtYoK5TyNJCu5GFfK1ovJsZ0bd7+9ZmznxtziMbWK2RzFEXkGTcsUolIlIrnEYWmbJWA10WEpm6kljh576ZHH7/rhzW89/yK6HNEqhFbBtGpRJVMaldKotF7J6VRBoYoKicgEKpQQo0apFQJPRJfHD0cnj1CZpEnXpXI1Mj71zkuvvvz441vWvDI7ujs1eyQxM0rlFuRKVq5kOTwlUTm4lJtB0zyWrWQjKoUGUk2lUJksKFSRyiyzaEqroi5POFzZpBG9VlArObGc0qpFrVpUKwWFystkbsjUU9FULKcq2QWTxkW8SOfzAoYJGCYTqIBn+VKCK0W40hJXWuLxZaEcE8rxSnrGqGZ7Rq0UnbDqRZXMkOmFhkJrNUytYlqttDgxun39Gk9mm4ZC40WORHyNbehiYnZy6xtrmFJ+w8vPgZZFlRNiNQvEunRk7JZ//uyROx4AnA3mMsL4vLSQJiejQrREzRaZ5XLpaEaMEdxSUYoVkcOzLYoj5uIv/fIJoyI2tAD04Qe9b5m+LBmB320EoBEA2+w4VheiNPBA4AHPG3wIaWo5PVnzFd1z/I4ftE3Ls0yvEXbqNW7zxi3PPPX05NhhgalxNEWg2TqJ5uNRhsBTSws6z95xyy2VUsnSdE1UFUmXRW15KVGhGMdpWVaj3wcsq/t+13ZCSbI8v2UYQbcLDLvR7gHLbRl2w7Bbut2SVI8VLd1sd/pAErV+d9BqtMOwaepOpz0QBa3V7JuG59jh8c8Kp2U7oeW2/I9Q+sEdf2J7w6a4vusMXGfgOX3P6TbCbiPs2LbreUGnOZAF2zV7oAssoQdC0HMBntb3vLO4+tFdD9y27rbvP3/VBXd+5Qs3Xn7ubTff8NSdP3rxV3e+cWwEBS0AusCxepLkwWZxN2hzktrodL1G03FD12uEQUeWrFYI+k1gyqHv9iTRhAPFsDdY1zzPbdtWwzQC3+vA82ZjYJlhGPSgP5EgalCZSbLR6QK4SOGUEP2NVbrv//UDY6dlveu2D9Vnqz2AOwOefuYFrEQJogb99OG+GndF29EQoivbjuC7AhZToZ3T8fa8Ex4OJ5wFPVWzoPcCy6owGEaxrBZFcZJkMYyCl6u8oPKCUqtziu4xglmhtSpv0qJbE50qZ9UEi5Nshtd4Tl79zLPb3l5fSiexZFQkkFo+Vi9E6WIC2u2ySJrD0nwpUS8u1ouLNLLEogkey/JYkS0idL4g4vlhbXWlih1a/Ay17ND3B+YwBTzNYWm6mKjkomRmeXHywN7NbxzatVGuYXg6WkUzIoXRWE4oIRJWUImcUc3qlbRCJDUScWrsiw88929//rnzP33x5z52+ptPvt5Tba6QsepFo5I0qJhOJXQqpZNpjcxrJKKQeC2b7ZlOrVh67qEnr774ym9f9a2Nr23U6zKHoWhk/uierXveWnN075ZycgEyTyZzfCk1NCSCq1o4LK1QRbVS4LB0NbfMlzJGHZXJHJleUKg8LJHqNUSrFuE5hCiMIUqHbgxDssIXii7GavnIiTFcOCmU5/ECjxd4PFcvJmkkCeX+sAgN97XBvwXrrwqVF8u5Wj5m1Eu1fKxeiCemx/ZseL2l8yJRsDlSqOalakGrlQpL8/u2bNKqlfkd26NH9lbEjBdUO/nY4qOPvXntd7vTaXcJqx9Lqcu56rGFyuSyEsOJ8aQUpdiFkhgh+WUid2hZzdEaxq596uVtb24Erb6pWLYVGEag675hBLbddJyOaTbhjfIfJMIQ+H4f5pZh+H4f5sZgm+6Jddxdz+s5fk9UvQ4AsuE4jYbte7ptNdstTTPuu/fBNa+uSywnDUkhsWIhs+zqdCm/nIssybXq0tRRqV7du3376N690cUFMAACx3MM/8D9D72zYcub698RJa0HAMMrrRbodgHHGZ0O4Hmz2wWCYMGGEhgw6W25nRPpuobrtBphv9kErtNSFMc0w3YbwJlX2HDkul3P63hez/M6H9VKP6hjiFLIUeA6wHMGntP3vVanPeBZAQwAUxM8q2crndAEoAFMZjA3ij18xxsXnPb9T//lZef8y43fuezJr5913yWn33XZGXdfde49l3zpZxeedtM3L3ng7p++PHWkAHpg0AWO03OcTrsHVNOyAs8JfNP1TMtrd4DEG90W0ASv1wCK6IABaLeOz57Cc0W2Pbft2M1uB0CDiHpN7HaAKBh1WoCOSLDZeMiYP1DC9pQoPbFS1PP8ZqvdNy1P0204ubvhna21Og83qUFDBghC+FyGfkYQriufy1CSDrt8V4bthJbtW7av6ebxPiNe53md502OMwiCq1Yl+E4TJV0QVUnWqzW2UhcFxZe0sMbbVc5i1YCVfZLRiIogSjpF1F574aVjBw8Y9YpRI2yGhM4M0M6eKWZYJM2iKThbwmLLLBbhsLhQygkYxiMEW8SEUm5lQniIz/cWCFcOhMDtKMdtgIqJaj7WdZXRne+MbHtLY8oqQxp81VXYGpKTcFwuoRqVNetpvRpXyJhOIU6Nf+G+F0/72Nlf/KuLvvjXX9n47KaWYEtYQSNSGhExyksaEdGJuEYmNSKjEkWZKFl1msfK47sP3vLdm//xY5/6h7/41MO/eFKpSmIZE/A0mV7IL06U4jN8KaVWCvDChrGyBffEKrQsNKnXawiLJorLR+liDK5Og9SEHkZDjg5pujLTO8z3wjRAvRCt5SNcKQM5Cm2NeTwHnaGGjowrfyqU83A2RiznOCzNlzISkedLmWouypcyWhU16qVSfG5818aWxtbyMb6cLmWmpVqOLiTRyOL2N988uGnz4XVrZ/dtSRMzulVkDu/YdMN30k++DOIkPp6oLuPUVJSdjXNzKSddxUej/ALu5iQ7K0kJTsxwxancI7c/PHVgytXcXrPbbHQdpwWLNbZ9/ObVttswEfUHCfjXFcWTJEeWXVhm8rzeiXGX42FZLcNoqEbYBaDKiprtmb7LCLysKq4XvLD61e1b9vtmG0mVKbTiKnq1lD+8d5NMY3g2odRrKl3PRpcdRbr3zjszsdiR0YPbN2956831i/NL27btSKezd9x5F0nVFd3x/W6jASTJaTSAonitFlBVf1hLHiL/REW5A2EfBIMwBI7T0fXQslrNJhj+wvA+4COUfrDHqVDadZ2GoTumbrWbPYHVQA+YYgd0gFbrvvjo5jP/+ZrP/8+rrr/4nh9f+/T1X/3VxV+4/erzHrz+oke/efHj15z/y6+f/YtLz7jtws//+Mx//eZ1l//HG2v29tpg0AeC4ATNgWa5qml5jaZm2Z7ftOzAUL12A+ii3/JAKwS21ahQHNyQ4DothpaHNJVEU5asfg+U8ToYAJ7TPL8FLYLhQjFYkIdDmR8qlMJ6s244uuE4btjuDDpd4PnNo8fm5heipuWLkg7tjoeuwsNKJ9z6MqTp8EZhpYPgbzQUvFsoPY5S2HMkCIYgGIJgCYJF06ogWCyrCgJ04jUEUS0TVVbQcZLDSa7OmVRdzWL1EinIekBRnGV6mXh6w5rXU/OzElGqZOK52QnovQDdAY8HkmSQqFCOc6UIiy0zSJTD0jxW5BCULRY5NDNsSoKkPKnUOmwDho9DjkLSQK5AJwdHqk3s31aMz/kqk4/NH9ixsZhYNNiaQhAKjkCUGrWYSsV1CrGrzNLIwhO3PfvAD594/NZn4oejDV41KqhKJOTSoootyqVFpRRRynEFT8l4TiojHIKolUp2MfrA7Xd/6q/+8fR/On3t829qtMygWa1aNOoopCO8pOMCEU1A7EHOQXnKYUl4HwBRqlWLHJYsxWfwxCxsOIJyEy51gV9Xxsoc70qaDnu7+FIGhoBnYUBSalUUtk3B0VL4C/BHEpEfohRK51o+RmWWLaYs4NmFw3vGdmywWULAszqNVktRT6XYQtKuUMXFxYObNpWX5uuFaCIzXspOHH3u0VdXXd0cmwPpKnk0jc8WmIU8v5ivHEvqiSozi3JzRHTb3L7nd81vnTMw6/VH1m5bu9MRfdADAqu4TsN128OPeN/vw67dIVb/1wfkKMcZNK0yjCZJDuzOHapSeJ0QrqYZcqLW7oOw3SGpqiSrrhPu3nnoxz+4Y8uG0Wcfe+POmx5+8+WtkyNHLVEJDHV5alyuk2Q+m11erOMoR5UFunpgz85d2zaP7Nl9YGSfpqgzMzMcJ9z4o5/U6kyr3besBiQ3vABIzSELV1758GUcvpiu27Ws1rDjZMjRFTT9CKUf2HFKlLaa/QpFgwFg6ny3BXotYMuDtg1+cM0vrjz/x5ee+aNvfPWub136y1Xn/WLVufffcMmTl51x76pzf3XN+Q+vOveX37jowe9c/tg3v/bgZefc+plPXHbeGf/+yvPbdaXfaQNJ8gy7YTph0OoKih6EbV5QQq+tiBboAYm3Gn7Pthqu04IWEIHfDYNeGPR8rwOTuprqDvqA5zRo+NAfAMsOVM2mGRGmRmHR8cOG0hOdXJ6imp7f9Pym7QStdv+FF1/Dy1W4hwc6NUJ2wv5b6HME7xKg29HKFTcwTjLmhfVRaMZr2b5peapmDFXpEKUcZzCMpigOglCFIi5KmqwY3R6o0wLNiLJs217bdJqsoFfqIsNKPKeYujW6d+/Gda8j8WUWyTL5BBGfH9ZBV3A0ThcjPB5j0KVaYb6an6/lI/V8op7P1HLQ8yi20pl9qLRgXnTYdDPkEOSoQuVhSGRBIgs6S4zt2Tyxf9v0od2zR0Y2rHlhbO82Fi9oFUItH1elZj2uVWIambcqtZCxuQxPLdNchrcrskYQKplRiZiAzInovIgsSmhERKMSlpBKWaGUqxeyFkM7grA8Of3Sk8+989pb+WhWrjKVXAIKTegvD+8AINhW7uU+aSQUeupyWBLCUsDTaHQKOuueWJdW1KpFici+V5hCmg6fPlwUs+IWJMVhaRgrsapQRZksiOWcgGdXPj58ZCVK6WKimovqNYxML+3dsGZ5fL9CFS2mLFE5lkoJ1TwZWzCJUksQ0cVFX2JUGiWLc6nx7W/c8sPRe+4BkVwwn/cLQnEiySwWqalkfv9Ceu98aSyzuGnqu2d/+7ovfeO+7zy45fmdu9aOgCYYNICrN6sV3rLeVZ+e1xtmVk/60P9fGVCVyrIL3yaq6sOl3IbR0LQAKkLYCOn7fddtu05YrdY9Lxj0wdz00tTk0lWXfe/m7z3wt//jjL/+s9P/8WPnnvbJr37j0u8/98gLDSPIRqKZxXlHZNMLMwZfp4qZWgmhy1i1jElsnavX6Eq1QlKaoj/++JOGYXW6wDACXQ/DEBhGIwgGuh4GweAkiJ4EyCE13+fXhh9QH6H0gzpW1Ep/E6VgAFhGBAMg8Vro9U210w/Bsw+/c/5p11/ypR9e85Wf/ftX77n+ovuvPveer3/53ivOuG/V2Q9eeeYDl3/p3ivOuOeqs+69+tx7V51z95Xn3nHVBbf/5LuP/+V//fwrL+xqN0EjBKbd9Rt9v9EVVcO0vLDRafidMlYDPWConqUHdF2AfWiKbMqSAQZAVaww6OiaAwZAFLR+Dwi8GgYdQ3dFSQ/Cjm64zVa/0wWipA9rjR8qlAqiBmWo44a9PhBEtVJlBgDcd/9DlSoLVWmrPWA5Ga55WbkuDe5sgcIUonQlL1fWR+GPhmvALds3TFdR9eM9R5zGcRrHGRxnsKxOEFynA+bmYuve2LBv/+j2HXuKCEbX+U57oGsOtIzQDbfZ6BI4Gdi+yvPb3l6/f+tmKhuvZmNSKWvXcRYdEhRGnEGiNLLElSI0sljNz1dyc9XcYi0fqeVj1Vx0KKeGihNKrpOQOVRjKx8/TpcKolQQgyMTc+N7N7/xxou/Ti4cmzq099DuLQKJ6lVSIxGVzBi1FESpSmZ0smySQosPnIrVkxsmVScTixy6IJbmBGROKC6IyLKALotoVETjAprkSxlfqhPpaA3JBarsSKJcq4uVKo2iNHJcEa5cebZSSQ9nUvlSikHiw3sFqMKHWVwyvQDLlhCTsEo6ROZ7UTpsR4IoXTG8+64740qswnMBz8LZHohM+CD8TZjdHZJVIvIyWcAT82M7NihUUa0gNktkFyYlBiGLETaXYJPxviiq5ZLElfHCkkNlmenDj6y6LLlurTcbL+0YtzMMMZ1nFlF6AeEWiMj2GfRwfuSlkb/6k49f8blVl3zmqn+/8PugAVoG0HjfsdqO0+p0wLD6eFKu8g+F0qEsNs2maTahqnOcjqJ4gmAxjMayuiy7htEwzaZpeJZhB47dbXSmJ2Zefm7ta89v+vP/+18vO/emz/79tRedfsulZ91+5Vd+9vlPXn7W567Ix8oGp+PppMVWJBLFkstMKZ+Yn1JoiiVxlaXRXBrJZUWW0WXl5p/cJAlio9EyzVDXw04H6HrYbAJF8YLg/TY/rpwgGt6dnFrlf4TSD+w4ZdtRs9ELgzbPSqAPuLrRcIGrgL/5b6df8uUbv3XJPd//+kPXXXD3lWfddf2FD37nkl9/+2tPXXvuI1ed+eBVZ/3y2vMevva8X1155j1fP/OuVefd89Mbnj/rs9++6du//vM/PS2bFHi2OegDQfLcoNtoD3TDCcJ2w+/UKxzoAcdshF67WmEDvw3tOThWbjX7thVIom4aXuC3e12gKla7NRB41XOPzywrqhWEnV4fsJxsmN77WBn8oVAKx4ranUGj2aUZodcHAwDiiczLr6xlORma0ftBm+Vk12tCcEJ5ClUpnCGz7GDIUQhLODnqnthyA584ZLBuuENVClF6ou1IZxjNttsYVve8zuTk/JO/fu61NW/86qHHnn32+YW5xUQsuX/vyCMPPfrEY08eOng4EYkePTK2MDU1PXbo7Vdfjk1P8li2lolUkvNMPsqtEKOQowy6zKDLPB5jsQiNLNHFCIvGYNDFyMp0LkxvQmRCXq5E6W+lqULllQqiVtFyNiLXMIEqJucnxGopszyzY8PaGpIxaoRGIgqR1qtJoxZTqahcTqhEkckWLUqsJUt6mWFymVp2QSYWxfKsiC1IaETEIsc5ih2v2kpkoZKL1ZCMUiurdUqo4Gy5VENyDJpaeSswVJwQljCvC+8MWDQxzPoe19MntpDCpipY7ITV1pVP+aTXYahcV0pe+LequeWVKB1ylMPS9UKcRVMCnpXJApSnLJoa7htgkCScnYUZYL6UMeqlai46e3Dn3Oguk8bFcs4TKoXYjEijFTTR4GtiJtGsUHaNJCvZMhZtFJPK5NjPv3Je8p2NtYPH5l7fmtk5zS8TxLE0PpkUo9X8oaQY5xe2Lf7Nf/mHiz9zxSVfWPXUva+ANjClli6HrRbwwp4X9mDqcgiAk1p7/iAohTG8pGEpV1V9njd53pRlV9dDTQtUxdJFEfS7Cs3d9pOfHd519Fd3vfBXf3rGeZ/78Vc+d8et317/t3961Tn/dvPXzvzp6f+06ptX3uIrLb5cLiXmGTSNRGfrxWTLlDOL00gygmdSeC5TLhbpCjW6f+Tl1S80/aDX6dtWwzSb7TYwzWazCVTV9/3+SYXPIUThNcOv8GUcovQUCeGPLBo+sOMUKHXbqmKCAaBrHOgDVWyALnjqobf/6eMXfeOrd33raw9cd8G9l59xx5Vn/eL6Cx5adfaDF/zr7V877ReXfuGey0+/78ozH1h19gNXn3P/qrPvu+rsu1edd+8XP3nDj69/+soLf/Yvn/ga6AKOCS2zq6r+AIAgbK95/c3Aa3pOKHPqwf1jvtMc9AHLSJl00fdagz6AaxNsK+i0QSPsNsKuIpuioDl22Gz0ZMXs9YGq2XVagLIMLsH+sKG02epzvNJodl2vQZC1AQDtzuC1NW8kkjlIPj9o64bLcjK0l4IohTSFxrzQsN49YQoIC6iwmwl2Lw/7j6AnA0Sp7QS6YUHXQI7TWFZlGI2mVcNo4DjD83o6jb6zcdvB0SPLkcTo6OH1a9etefmld9a/efjAyJEDB7a8/fb6V1/euG7NmueeefuVF3a/vbaeT4jlnFEpCkiCzkWYfIIupOligkHiDLrMYhEWW+ZKUaEchw58fCkhllMSmRTKMa4UEcupE8YCxwXZEBJDcA7x+d5HZDInU0WZKjJ4licLtlg1eSo0RKmG79705tLkIb1OyGRBKMdlKq7W4hIVEcpxAU+zSN6mmWomL5ZKlWxEraYNJiaT80o5quAJuRSXS0mxlBCwOIfFWTSBJWb0eslkykQuUozP4ZnlGpriyUK9eHwFN8QhTPPC5O3KhqOVLUiwSgpbfOuFKMStXkPI9AIanaKLMahHYQfvyue+8mZimC4ewhgSXUCTApoUsRQMqZSGAc+VclYlcko5K5XSPJJgCzGIUhZNKVRRr2EQsSyaUisInpjfsuZ5Mr0EZ3VslpCqCIHESpllk8KkVFzLpIRiKo9H6pVUI7I8++gTT1x7LX10unzwaGbn+NKGQ9wiHt89Nb/1SObgcnE8XV2qFI4iP/76Lded/+2ffOMOtqSzhD7ogFYDOG5Ds1xZsy2rMfzEh9z6AxZK34ulIUp9v29ZLU0LYILX83qm2dRkq+3aB7Zv3f3OlqMHjoll6/OfuOSSM2654sz7L/zMfWd+4q4vfeKOb12y+jN/+62vnnHThV/6dscC0clJAU8zSJJGkiZTTs5PqHWihuUrxbxQJRkCr+DoLT/6kS5LoD/odfqWGZpmE/YQQf+jlSh9TxtRD/6C7/fhTQkUpkOUvqdN6SOUfmAHRGnzXZS6fc/pem5bEjUwAM2gW6PEQRuADvgvf/LX//HdZy4+/eYrz77z2vPvu/rce1edfd815z547XkPX332Q6vO+tV15z167bmPXHHGfVeeed/1Fzxy3fkPXnb6z68598GfXPvCF/7hWzd8/cGP/9lZ5YJt6yDwAUEI/T7odMF/++9/qWt2rwOiC/Frrrq+EXarFfa5Z186MDLWbPTKeHXrll3NRq/dGrCMBAZg65ZdrtN44vFnHDtMpwqHDk9yvNIfAJoRoUKF9nsfNpQKojYAQNUsVbMGAGRzyGtr3jh6bBYWPqGqZjm5UmVtJ+QFFaJ0WDEdLlAbStKVcPWDNhSscFoGDpJqumPZvuc3Lfv4XCnP6xynQZTStKoonqq6JMm++NKaV19bp2pWtVpdnp9bmD5aSCdMkdN5BknEUgtz5UyilIrgycVaLu5wJJmYU4mciMbr2eVaLlnPp+higi5GWGyZxZa5UoTHYxwGu4oyJ2wQkiIR5fHloTkflKQrUTosAa6sm55k7iOWMyKRl8iCXMMKsVmeLBgcWc7FmXJhYXKUxnJ6HZeIvIAnZSqpVBIiEeVKEQ6Lk6llm6mIOKqQCJGa1etpubLI4TMq7Notp+VySsKTJ1AaE4gMW0pSuSW+nLYEoobG0eSsWiuuNPaDsIRduDC1C5/CiYaglEzmhkCtF6KV7BKVWWTRhELlLaZUis+kZw9Xc8uweirgaZPGhk9z5Z3E0On+JI97AT8OThnPwFDKWRg6VdCpgkbmIUdFLMUjCa4YZ9FUvRDnsDTs1xXwLFyQJ+DZai66Zc3zoO2Q6SW+lGGQpEwVGTJfRVN8IaUVM0Y+TWeXS1RMovMgmnzm/Mu33fsAkM3K1LKZrlQn0sxsERlbRiai5Zksl6zmj2b4LIfMlfe/c+Txe59r2aDfBhyjO27DdD0r8Ezfh+VSaBM4bED9/1Hk+33FbxV8wxEd2NAbhgBSTZWNnRs3jO7Y8tozq4vRoi8O/uJ/+8xlX77j3H/+2dmfvPecTz7wrYvXnf6J287511tvuOKhP/8/P6/VAwZBavkIXYxRmUUsPidTxfTCFFPK0yU0On1MqlcraPG6K68E3S5Xpy3DNo3ANJvwNQlDsMJP8bej1DSbw/ZdWOWFL+xHKP19H39i+w37XcD0T6C0qWs2GACekX27D7rg/p+/fPn5P1114c+vOf/ua86595pz7r323AeuO++X157z4NVnPXjlGfdfd+4j15z90Kozf7nqzF+uOvP+VWfef+UZ917+pbu/9dUnLzrt9m9c9OBFp9988Vk/+ebVd7kmcC3Q6wFJsmwnXP3CKxvf2apr9qsvv37PL+4P/Nba19cXC6UNb282Dff++34VWU6gSBlaouzfNzo5MZ1O5R9/7Kl6jTt8aILjlaeeXs0LquM26rTQ7QGOV3p9oKhW2Oiqmu24jXYH+EH7+LDp7/+tCP8P9ryeYQSO0wqCnmEEkHZ+0ArCNl6uRGOp0UPjsmJAzz+oO+H6Fyg6h4XPE1XPwLR8SFz3xOKX4WK1lR28K/t+Nd12vYZpOStRChO8ptmsVESalmXZnpuPvPjSa9t37JEkSWRqfIWgkDyeTVDFDJGN4+moRBYlsghNXNlCjM5F6FyELcR4JEUXskwxw6IpFoustAKgi4l6PqFVcK2C08WEWs3YfLZWnIYa8b0ZXa1a1GsIHLKEfFUrBa1aPCnTK+AntrMRebmGseWcWEE4EpkbP3BsdI9cxRk0zZcyVGaeRpYcHlGr6UpujkVjZHrJqOEyWajlIzKVkitRGp0WyUUJj8t4RsRSTD7KFJY5LA5dahUqW8svVfKLIpnW6gWBSHF4QqIyK698Jf5X9tmutCsaGiwMK6nwX6gXohCQWGwai01Dvp70L6/8Wyu7mld2O3PFuFLOGpWiRuZVIqeReZ0qqETOrCIwNDIPJSlXjPNIQiLylWyEL2UUqkikFqH10oHNb+xa/8qBzW9EJkYYJGnUS2I5RxcTNJIhpN/fAAAgAElEQVTiKVSplY0KpiIZJRsRkBhZibForPr2ttcvvb46MilEs2q6XD4a52cRcQEhp5L1pVx2bKEew5JHltk8rVLm0nh87YsbQA80G4NanWt12qqlcSrXAT3LDlaWS4f51T8USk8aelk5/VKtSrBmKQiW63bHx+efevLZkR3bWBwJNSu3lKsX1I/9H5/72um3XfCZn5/+d3de/NnHz/70L7/8qTuuu+jxz/zdNV/41KrcEsGiiIAnGSRKZRapbIRBUyz+/7H33sFunGe6p6q2ardq71Zt3b11d++9M+Odnbn2jKOClZgkkZIoK4tJWZZlWbIkW4ESg3KyAmUly7YyRVGkRIo5n5yRUwPdALqBRgPobnTOATl9+8dHtuFDyffOlOgZVanr+wMHPDwCIBz+8Lzv8z5vis4ms7EIm8OJZOKVZ58bOXwU9ECv2ZVFrVbtQnwOTrt+dQXwb3qlX9nlofREjdfuOHYLorRR71RosVUDoAO+8/8uvfKiX624eMOKC9avWLx+xeKNK5c8umrJEwMofWrFoic8jkKUXnXuusvOXHvH1a9ded7Day559PLF9/zT313k6qBqA01r9vsgFE4cGxp78YVXyHxpdHji6Sefq9fav3n+ZdNw7/jZXc1Gd++eg0kk/fGW7YbugD64/ad3NhtdriK98/YHH7y/ZWR4okAxv/r1Wph4oOkOxyu1egeWSWH3VDdcjlfgl5Z9yufVqtW+rjdsu+O6PRiM6bod1+3UG124Tb1Wb+/YuSedyVVrrVa775EP8hIeT2vaTkM3XMhLSFxv7Rr0Fp2MUs+RBFHqFXi9YRjY7ykUeJLkRNF03Q7NCEPD45s/+uTDDz8s4GmJKWARfzYeYAmUzSXVEk4m/GwmxmYi8F9kOhmANC0mgzSK0GicSYfZrB9m1HFEkCeiYi7NoCgRCtOplFHOcXiEREYE0i8VYifn+HhO3UE4eaakeYcjEI5A+AKWQwIKTRhcITQ1PHFkL4GExGKGzyWLSb9axNRiKhseoZLTCpUsJGbEPKKV0pVslM2EbC6j0wkmO83nAiwW4DNRLh2hk4HSCZQy6SCHRzg8wuXCfD4iFxNqOSkWYkw2MFiAPRmlXuF63rObN2zKZiJwEoYn4oXEXCY4TkSmikk/vHMwL9ATqSeHCB7/o0wUEhSqUljO5TNRiUhArEJhCgWrnEPkAlbJxovJoJBLsplYcnZk8sCOdGAiPHYoPHYoHZjg8IRCpTk8waSjPJ7kiUwZRbgsIhMJLj5TSc0yZJhP+rff9stta37JH/MxvmRxNkmMR9kZtDSR4EPpsi9JTEaxiQgxh0ZGwrlo4a2X3pke9tecTq3adtxas9dSTEmyeNVSvhCl/4aq9MtQWq32220Aw/waDaCqtU2bfn/v3fcnAr5+1SmkMrboCDnzzH9cvuC7N6+5+LmlP1y//Mynz//OQ8vPeezGy5//zn+9bPnCn+pMLReNHE8By0ZEEi1lYngskEtGxWKBymAvPfX0zNhEt950dNvWLNeum0YdFr3npUN8g9J/b9cgSo+3KCBKbatmGq4q2f026NbBf/hf/vkni++7/idPrVyyYdWijfCsXvz46sWPr1z46HXnb1i9+PFVix5bsWDjigUbVy58dOXCDdedv+6ac9dd+oP777r2zcvPeejGy564+qJf/8f/7XuFrNlpgnodtNsgly+9vOm1WDR56SWXN2rtG6+/BcdzV1997d69+9esuaFcZl5//c3XXnvjmWeec91ao9G6995foWh6dtb3wQeb33//w482f7J7z8EHHlwniBp05cCN5bJiOm6TYcV2B9hOQ1GtZqtfrbVlxTzVv4qO0/WqQDBbpF7vu27HMKu9PmBYYXhk4vEnnjl6bDSdyUHSQzHqCUpoyoXVWqhlvZ3e0FHlodT7u1C/Ds6VQtCqmqUbzuBcKc/rPG/yvEnTCscZsHsqyQbN8IePDD/33HN7dmxLhudkusDmsQIaZrNxDk8w6TCdDDCpIIuGWDR0Ih8gWIgHGCzJYAk2E2KzcxVimsvNcESQJ+JcJsOkcJVkXVZSSJJCAlRygsvNSYXYPD03GNcwLw1/cJ7kTwzLp4R8SqDSeNwnFjMam/ePHx3atyMd9UmwuxmfySdmYb6PUsIMFmfxaAkLVogYXPTN4mEqNUMiUxIVZ9JhDk/AZiQkOnQScXhEoZJiPl5MzpVRv0IltXKyggcHG7eDhIO1aO+hDpJ1UJV6T6eY9MPmaCUbzUWn04ExSNMvU5/zgnk9nKsFxKBSeiGp5OJqPqEXkmo+IWTCMhFT8wmNRDQSUXJx+KdaAZVIVKHSFBKA3t0jn20e3rXVoAkhl4QOJjh4Ci2+Mpk2KJKMhSs4opZRJjUjZnxqLlIeO/rcouXopg/bUZKdQ9GhADERo6dT5EiEnAjjY8GSH40P+fhUefbgzI73dx/ePQq6wLVapSIrKbJsSGZV74KmYsrzUDqvDvnvB6Wu22NZDe5S1bR6twuSyfz+fUceffjh7R++/8aLm0pEWaXtK5fe+oO//8mS039+7YVPXfzjh8//519eeMa9Z/zjijO/feWrz212xFpsZoLLRYtoAJkbIhN+Gk/kEqFsPEQkYkjQ/9arr1qaDnpAlwxN1DtN8A1Kvy7XaaZbN936YJyeYzccu+44VVUxLb3ebQI0Kp9/xk1Lz/nlqkueWHXBY6sWbVy5cMOqRRtXL3509eJHVy589Lrz161e/PiqRRtXLNi4YsH6lQs3rFy4YcWC9dee98iqhU9c+eO1qy98/Irzf73y4ge+961lh3f5QQfoarNW65EFmshRAq+89+7mVqO7f++hTAbftWuPLKtvvvmW41T37z+YzRKHDx+t1RoAgHy+MDIyNjfnn531FQrFVAoLhROhcEJWzHqja9n1ZquvqFat3mk0exyvKKpl2fVeH0DGqJr9V/hthEZ502zZdqtW64miGY1iRK549NjYyOhkIBj99f1rd+85IIiq7dShAIWi2f7ztaO1eqdaa0MuwjsHh2G8oVKvFDxvw5qmO5puG6araoYo6YMohdljilKlKA5B8DLNu9UmWSjv3bv3rdc2bd/8jkznmVwyF/PxuWRydqiSjTKon0756ORxxw2djpaxSAmNsOkUm0Yq2XCFmOVyU1xuis+FeAIpJzGdEipoORfEBDxvMRSfC1HJCSYdnNfz8xIM5uUPzOsL/glguSSfS/IFjCPRAhpmCIQmUqMHdx3cuZVKR5lMzGBybDbOEUmrUkj5xmeP7tVpgsnE+HyiQsToTJDFo3w+IeRTUgFjMzEh9yfPMJw2OWEUipfRYCY4mgmOl1G/mI9LZGLwwcxr4nqq0evyzsvLHXwWXjOVJ+LFpD8XnYZw/bLUp8ES9+DPUXJxvZDUC0mNRAwqZRZRNZ/g0yH4JaSsmk9AmipkgkvHPLcR6hvbu+Xt4MgBhUqrxQxUotAATGMRNhNT8phFUoVIhM0hQjlRSE1YhbCZmJ19842XL76uOxrrJ9jyRCp2cJaYTpZnUsWJRHEiQYyEiYlEZhxRcTk6Gn/k7kfbNqibQBYd12l2un1BFVmRseumYammVTuZo/8eeqXzTrcLRNGG0zulktRogHYbqIq1d/e+37704pb3P/r5bXcqnPWbJ373yrMf/9//+1kLvn/r9//uurO/c9OSM2793reWPfbgbw2+TuMloZClUnNYcIzNIbZYzMZ9SGDGUcQ8mnxj0yaOZrqNjipo7UZf4rVGvV+t9r8p8H4trnkobXkoNQzL0B1Vcjt1MDdOLVvwi+ULHrj6go2rL3x89eJHISxXLdq4evGGVYs2rljwyOrFj65atH7FgvUrF65btWj9qkXrVy5cd935625Z+uzS7951y/Jnlp9995rlD5793Su3vLO/1wKu3acKlT4AoqTVqi3QB3xFAn3QanX6fdDrAcep9nqgXm82Gi0AgCjKAADDsKrVerPZtiwH3q9qdq3e6fUBjAqq1TuCqEEBBzUfL6i9PqAZ4bgr5xT/KsJ3vGE0RdHW9Vqt1kPR/NtvfxQKJw4dHo7FU+0OGBufJgvldgfohgPp2Gj2Gs0epCl8nHDbWq3egc8F6tTBFTGDs6RwccTJwlQ3HK9XyguqV+BlWa1YFAXB4nm9WOQrnGzZNVkxCIKYGhv+8I9v7NzybmRmuIIjMpWmEB8RGuMyIQb1U4ivmPSXsQhDIGwuyRJoJYtx2RRHhLjcHJ+f5vPTfC7E40md4lJTyPMP/uah2x6a3j/iVipiPl5CZ0opn6c4PfORmEcGmQpZMjijOQiSCp6o4Ak2l1RoopyNl7Nxmc6nQjNH93w6eXSPkE+5QpHPpahkhMaSvmOHd21+Z3z/53hkhkr5y+lQCQvyuaTJUhyejk4Ok4lAGYtU8ARHICKJKsWMQqXFfIrDE8Wkn4z7yPhsLjqLhyfpZEAlUydXXwdR6hmmPLJ6BqV5IYhe0hNMSvLIOjiievLq70F1C+9hU34xGzkuOkkEytMKGjgZpWo+oRYQPhOXC5hBE0RkZv/Wd2eP7FaotIdPSFB4u4yGOTQmJzEqGC7l4jnCl0VH6kzcnBzadsddH//sVyCU18bR4rFE6kiInM0UppHiFJIbjqcOhpCDYSZEC0k5cCSx9fd7QAvYct8xgWP1NK1q2bVqvaYZqqJ9AUr/rSD6l1Eqina3C1qt45OdptkiSU5VXdAH9XqT58Vf3HnPxnVPZFDKkHuvv/DxnTc9cduqDTddvXbdvS+/9eKH0elE06gHJsfxuI/NxUuZaC4VYHLJIo5kEiEcTXTr9UuXLgM90Ki1FdHo94BlNuB/6xuUfi2uk1DqNCBKLctp1Du6UgMdwBX7f/N/XXjTVc9fc+Hjf47S9R41Vy/esGrxuhULHoEoXb14w6pF61cseGTFeetuuvDJNRdsWLHkgRuWP/T3//mcI3t8rRpwrE6nDUyrNjk1t3fPQUU28Ewe9IHjVHfv3rtv3wGCyFer9cnJ6W3bPlUUrVZrDA2NHDx42DAsAIBtu70eOHLk2PRMYHom0Adgcso3PjFLFdk+AKNj0yOjUxVOhqENzVafrUi1escwT3lMNnyXm2ZLkhzbbvX7gKK4jz/eGY2l6o1utdZqd0Ct3q43OobpKqoJw+jrjS4EJ5SntXrHdhq1egei1JsohZJ0cGMMvBO2gQcDj07Uil232jStE/tKT6CUYdRiUaxUdEVxFMXheKVMcxVOUhTF1pWjB/ZsePDe2ZFDApXOhCdaUomMTrJYoITM5qLT+biPwiI0gbB5jM1nODzL4yifC/P5WZ6cOoFStKNUn7z3qR/9t3PO/Ltzb7/6lqn9h1oqCyN5BwkxCImTVem8GPdB2xGNJxgC0SukQKXzqYhM58t4cvcn78VmR1K+cZnCmXRqfN/e8NhoLhoZ+vyzoV2fJOdGtTKu00QxFS0k4rloNDI+nvJN4pGZAhIopkJsNi6SqFzAhFySjPuIyEwxGRTzqUo2novOUjGfRCQHJ1JOFtaDvPTIOliPHRxuEXIJNhPJx2Zy0Wk4jQqf8iBNvZfoC9Uql45wWBAKU41EYIEXslMmYkouDgu88BhUyiphKolJJGqx+fjUsXc2PcOko8CRhVyyjIZhUddL6C2lQnQiIoaRSjRRzCfSuVk8P9HiE/r+Xe9fsyr+u82dcJ47HBPH8eJkpjiXzYyGsWOh0kSWmy2LQV6KKUNbpp759WuJqSIa5FoWAB3QqoNKxXTdTh8Ay3LqtbZlNU9Owvs3nCv9ssPzJtzzqGn1eh3U60DXG4riiIrZBcCu1TlefGjtI502qFcB6AI0Tkdmc7/ftHXv9iFQA7akxnwzNIHk0aDCZvkiFpkbCUwNFXNYpUTGwwG2VL7phptBHxi6q2tV02z1+4CmFcNoflPg/VpcX4rSRqNlW7W6229VAWiB//x/LLj12pevu+jpNRc+BVH6JwG6eN3KRY+sXrJ+5aK1KxY+DG+vXrJ+1eJ1Kxeuu+KM+++66qXLz7pn5YX3r7n013/7H89MxyqdBlAkF/SBPxA9NjS25aNtu3ftb7f6oA8OHDj0/vsfkiR1772/ajbbr732RiAQeuWVVy3L2bbt08nJ6ffe+0DTjFqtkc0S7777fiAYe/2NP9Tqnffe3zI0PPHRlu1UkX3n3c0jo1PbP93luE1Nd7xl2n+FXqk3G2eaLcdp93qgWu3mcvTI6FSxVOn2QLPV4wVF0+0+AKpm1eodD5AQirBFatl1iFLoNoKb16BaHUyx9/7KIEoHaOpCVQpRyvM6z+swEU3T6iyr0bTE83qFkwsUXaY5Xdd1TTq4Z+dbv30Bi8wxBJKYPaZTmIBHyOgkERpLB8ay4WkyFSplkSKeotIIT+ACgQn5iEDOCYVpoTAt5MMCgdU567G7nl7yz5dd9IOf3HDJDcc+3d0zRDYT+jN9eVLWLn9i7YmnSr/MdgT1qMbm+QKGJ4JSOaeyhcDEkU8/eOvIrq0mV9LZ0o4PPjj6+eeOILiScGz3p77RgwKVripMEUPSoRCdJiWKTgdncrE5MuEnE34qGaTTUQaLlZLhTGCKjPkrmQSPJytYrJQIMqmIiM9XjfPKuYM2Xc+ONGhQ8ja6FJN+mF6Ui05DBy+cnPmXolTCowaZNAspKROpJP0CFtLziF3EFDymEnE9j+h5RMsltFxCzyMGldKpjESiehlHZoY/fP2FlsoaNKEWM4PRSDAFqZKNc8m4GkWVZKZYQDKlAMFMq8RU8Z3ff3TFyupEyPJnxWMpfZqip3BqNpObjGeGIzaiSX4ptgvZ/uKee6/dcMmP1jy39p2frlr/zPp3j+6P1h3QbQHH6ltGS+T0VhPMG+f4d4vSfh9IkmOarVYLwGDefh/IWk13mhhRsGrNFuh1ATBty3FrFVbqNEHD7g3tH//8k11V1VC50szIvrrBWFIh7h/GEZ8ll9lCOo2E6QIh8+wH77w7OjwGekASTU2pSVK13weSUv8GpV+X68Rc6eC+EbvuONVmo1sqVjotwLONbg2c/f3rr7ho3eULH1lz0RNfgtJHVi5au2LhQysXrV29ZP2aCzasXrJ+5cJ115y99tZlzyz93s+Xn3XnqovvO+Pbl/IFF3RAowp4TqEZ3rSqQ8PjQ8Pjgqj2Afj1rx5qNtuNeufZZ5+PhBPHjg03G90777zr8517UymsXmvfeOPNoqACAO6+6z7TcPsAPPzIowkkPTI61Wj2Hlq74YMPt6Yz+T4ATz39G4YVFdUyrRr09/4VCrzNJoBT57bdkmVbUZx6vd9ug1dfewsG1sO5Uo6XFdVstnpwy/c8qxFsi0JG6oYLA3hhS/ULOVqrd74QpaZVNa2qptuwwCsIhncMo0lRHI6XOE6DUYU0w7MVnsAzr778wtixQyUCreRTUgGLjB+spINp3xA6ezQ5ezQdGs8nAxQWyacieCLIExmBSAn5iED6BXJGIOeEfEQgUnKOJgLZtT99eMUFKyd2D9UFmUajQi42r+fnibzBORB4P0TUl9mO6HRULKbLWJTCImIxk0MCmeisI5UzoenDn300suezVGA2Nj0dmZwsoqhKl3wjh7e+8/rnW95O+MbwWCAXjVSyWTGfL6ExOh2lsUgBCZBxHxn35SJzmcBU2j9Jo1Eui+SjvkxgqoiEBCIlkWglG59nlfpClM7z7kJ85mMz2dAE6huBW2X0csau5CjElwmO80RcL2e8OKS/HPHv3c9nonw6IhMxMRsrRCbTs8O54BiHhTUS0QuoQaUMCtNIRMkhEh6V8LhEJMQ8IpCIUsLwyMyeLW8DV4lPD8GC9omIQW/kN6EQKQlJcqlkDg/hpI/KTZPjuwKPP/3eT1Z14jg1EqQPI9JwljqaLE3hbKxYjtCpg9mPn9i55uw7fvB/Llr091f/7PKNZ/zdFQu+t+Y7f3Ppeadfv+m57TMTRIWugS5wzZ7AmYMcHQy9O0W/no7VgXPz3vEkhP2nQYYvOIJgtVrAtjvQgiQIliy77R6oiFYHAM2usZJUazVprtLtAd1wqm6r0wS5NPm7V9/66N13p8eGdm7/YM/OzVveff3Yoc9L+XQpn46FfRLH8Bz72fZPN6zb2G71LbMmiWarBWy7lyUq7S74psD7dblO+9PbyKnbTtU7jWZXkqxaDahyv+6ANzbtPf2fV1x/xeMrFq+/YcmTNyx5fNWCDSsXPLJm8YYbL3z0hgs2Xn32r1YvevjGCx9ds3j9tec+eM05D6xa+MiNFz1+74o3v/ufVvzi2k3XXfDQNRfes/ryey2h36kCx2z3e2BicrbXB0gy/fTzLzY7oN7qP/DgOkU2QB889+yL01P+o0dGQB/c9Yt7339vC4bioA8uW34lV5FBHzz37Es8p/QB+M0LrySQ9L79R9xq6513N7/40qu64fYB+Nkdd7MVCUYWdHvgeKDBXwGlZlVVXa/3Ccuzo2PTZIGG5INDLG61VW90obEIrrLx8g7dagsqUW93N8zor9U7MAr/5GM7ddupW3YNHghR06o6bgMOpPKCygsqzCCUZKNcFiucDJMcjpd/eaXCSZks8frrr7/z9h8IDGkY4vihz5l0ODa+vxCbKCem6dQslwlBe04JDWOBCdh4k8hEGZur4EGDQeUCko/NlZJRNp1iMYxOpWgUqWRgbPqfNpnMO3D5F4y4q2TjXkisl9IA/333Vo+xmUiFiJVSoQISKGORYipEJYMiibaUCoPFju345IPXXhnas1OlSy1T5yni4M6te7a97xs9sGPz72aP7XJ5spCYs1hCLmAymZZzKI8n+UyCyyJSHtOKeDkV0Yp4OjjlHz5QQiNCHi0gQTYb5wlkUDh6HwVgoC6F+CjEJ5FJNhMpJv0mg+PhSdQ3gvpG8rEZmBQIUwYDw3uJyFQ+NhOfOpKcHeLwmFrEaCxUTAahJ4hCAjCHCIb8iflUGQ2X0bCYT8F6bBkNSyRawaJaAVVJjIrNojMjWf9YBYvqFGaVCSYVLCNBncJcllTyST4Tl8ikTKNFPFjI+OfG9o0f2mkJFJkKqSVcJFGpgElkks2EFDKmFmIMNi2SEToTlFksGhrKxycATwkHD7588TWBl//I+eIlP4rvD4pDGXeSoY8SWV8xExFfuO/9K39458JvrVh57r3Xnv3Li79/++Xn3Ld66aOX/Pi+Jaf/4pzv3vTj768+tj8BOsA2e5Jwyn8fLbdtWU3TbFhmw7FbNadTtdtVu+laDces22bV0B3DsAzLNG3LcFxdr82L2fMCg+Ytg4OhDbrVstyuoldFxYYfYXW95jhtTavaVrPZANkM9dHmbR9t/uTwoaGdO3ft37vv1VdfPXr0KIqilUolHkeef/6FN9/4A1VgVM3OZouwrtvvA4ZRJck5xa/PNyj9yq7TBj6U1W2naruO7Tq2U7Xsmut2uh2QzQj9LkBi0v/3dxfcfv1zN13y1MrzN1511oOrFmy4/dLnb1/+7LXnPnThd362ZvH665dsWHH+w1ee9esV5z9868VP3bz0iWvOffjyH6+9+7o3rluy7qqF953znauH9kTUSrtugm4LOHZ9YnwmgaQ+/XzP8y+9kiVLeL508NDQH37/3uxMcMP6J4oU+/xzL4eC8U0vvx7wR7dv+/zQwaHXXn0LTeEYSuzbe/jggWMpFN/46FOSbDzw4DqGFR9Z99jUtP/Tz3YHQ/GXXn6NF1S32vKGSRrNUz363apWu6KkN1t9iHO2Ihlm9djQeAJJw+XeMCwCYhJueoFuW2jHhcMwMJLeuweiFO6W+TKUfiFQLbsGUX28wCuogqjBU+FkQdQgVuGXDCsyrKDb1T+8/cdnnnlmbmqcITNTx/Yic0OobygbGCnFp8RsSMlFFTIh5+NMOkzGZ/1De/DwJIQc1ExyIeVweRgDNCgxYSLBX0apV1r0tmmebFv15lXgnGguOs1mInIhVUjMxSYPM6kwnQzHJ4cOf/bxwe0fzQ4dDkwMjx/eN354D4EEAuOHDnz2Ph4eV0sIi83pReT4rm8iJWQRLh0XsoiYQ5VChseTUh5D/RPI7KhIYjKVofGEyRcGB3i8/eRe5h9MEFSLWCUbJSJTRGQqOTuUmhvORac5PAYDAuFfzEWny2gwH5uJThyKThwi47MwJqmSjavFjFrMQGR64URsJqaXcYVKk3FfIeGXCxjMWCAiM/AeCgnADCOFSsNBFzGfgqvWoI2IJxClhIl0ypTzDBnd/uEb77/1Ek0gjlRu6iIemaXTMbmACbmESIQraR+NTolUOIWMlkuRQmZOJ+LdaCz3/rYXL13FHZwszERyc0jucIQ/ihmHSPZwLjVTPLo/tXLR2gv/8afLv/eLNYvXX3POA8tP/+UV5zx0xbmPXHLWQ1cs2rDoR3dffN4v77rteSTMWnq/6oBTjVK33nNqXcdpu0675nRqTqdmNVyjpkumIumyqEmSIsuyrEqyoSiGrumOV1CF7PRC7WGtdWAtTAd+WasB2+7AG4bRhBEomlbPZsvFogjDhmTZlSSHpiW32tq2fec9994vyXomm9/46JPTM4EyzQuCoWnVbLZo2y2KEjqd43G736D063KdBl/QP1OlrmM71U4X8ILa6QBd6ytSv98B6x9+66zvrVqz7LEVCzauWvTYzcueXbXoseU/uu+qsx/66fLnVyxYv3rxo9df8PjqxY9ee976a85dt3rx47de8vwlp99382VPr7zo4ZVL77/k3JvrGgBtILEWz6r9HjANd3bOv+fAYaJQsmqt6blQvdF963fvBAOxHZ/tAX3w6fZdU5O+RBzrtMGB/Uf37jkkChpVYDLpfIWVpiZ90VhqZHTKcZuffrY7HEH27T/S7oBt2z+fmJxDMeI4Pp0GjD1y3OapfmuaZkPTnUazp6hWpwtESa9w8pu/e7vCyYZZdast6MiFxVh4D0QprPHCeVBI0+Mfcg0XZgT+ZVXqVptutTmPqbZTh8UIOHkAACAASURBVA4mVbNFSYfClBdUjldESYcKlRdUtiLRjFCmeZrh3WoTTWNHjx797JMtO7dtifsmiqmQxWbzkYlKOqiQMTkf5bNhkYjCBSaZ4DgsVwq5hMngEpmkEB8enoRtQolMeoVZKN2+DKWDCzUHv/Q2pcC5EY+pUPxBeSqRSQ6PYf7R4Mi+9NwYnQxVsnE8MhsePzY3fGh25NDM8MF8KmJL5cOfb5k8stPlc3wuLOejZjklEQmJSIo4wmfiFSzKpWM8gUgkKpEok44mZoZTvrEKniimQunItFhMe7IYHolMqkVMK6UlMgmduhCoMCMwG5rIx2bI+CyNheRCSiulxTwyb6sMjYUKiblcdBrWfpGZYZjb52XNc3hCLmAwWgGO7kCOivmURKImkzOZnFbKwoEWrZQVcslSKlRI+IVcErpzy2hYyCX1Mq7TBEcixWy4gAZ8oweO7Nq6Z+sHc0cPkfGIwzF2hVaKRAVHymi4mPTTWIDFg1hqnMz5aCLYpHFlZHTsiRfeuO62XozITYTxmURxGOGOoJVdSWmkFJ/Iv/j01h/91xWL/+GOa895eOXCdct/dM+lZ/zqirMfXvaj+y87e92Vix5bdvaDP1n8wA+/fdWm57c0a6BRO+Uotdy26bQsq2lZTctsGHpNkx1Z0HlWFjhZ4GRBkCRJkVVF1jXFMFXVhdLTQ6kXCzwvqw9u/zaMpm134Ao2uEAmn69ks2XH6RIEk8mUVLVm2x2aVgoFnuf1UpkrlSs7du7Z+slnv3lh04GDR02rVixVNK2qqm6xyEuSxTAq3DBar5/q1+cblH5l12kw4Wg+TZ1qpwsU1ZJlt98DJcrud4FQ6f/Nfzr/ygX333jRkzctfera8x65+pxH1ix54uZlz15/wZN3XvnKFWc9dPH3773hgmd+dtmmNYufuvbcjWsufOrmy56+5Kyf337N4//rad8qZ6oCVWtYoOb0mrW+qphutd7u9OrtXgeARhdoZrUPgCTqoA8ss9ZpA2hp63VBvwe4ilyvdeAfNRs9VbFazb6iWr0+kGSjD0Asjna6oA9AqczBzFvDrMKCKpy8FETtVL81db3W7gBR0uGCl14fzM6Ftn+6C2pQGDSvG26t3oFdUujR9XQzTCmCw6awY+rF7cKxGYjMk0+11oJnHlOhIwmiVJR0KElhpRfCdYCjQoWTiBylGxbHVl558flXXngWi/loPC4XUQ6PqQVEIROVtJ9O+QQ8opczDpcf2/tJfOpIJRvVyxmJTEKWGHR2niqFkquQmPsLKB3cXz2wpzoxuFbFGyxBfSPZ0EQpFYB8ik8dCY3uL6UCTCrIZ6ISmVSKGamQZgmUyaE8lZXKuUzM/+Fbm8JTR9saQ2MBhUzoxZSQjQnZhJBNcOlYBYtWsCjsGsK2aDo4mfKN5eO+lG/MN3ogOjPkbWWB1iEv1x6acuGLgMwcQ2aOwZVqejkDI3ahloVNUwrxQW3K4TFYDc4Ex+NTR+JTR7KhqULCr1Bpu0LKBQwu8TZogicQCgnQWMSgCYMmYOFXK2WLySB83fKxOWRmODU3WkbDehmHq9NgnRz+BLmAMekolfIHxg/k4z5LKPJk5o+vvPjHl17cvfnDqiCI+TwRCReTCJtB+Rwmk2ki4WOoCEX4CshUg8TEI8Mf3HbXrvsfqwcxciqanYwx4xh/FKM/T1hzQvgYuuryX5/7j7dc+oMHrjlnw6Wn37/kn+5a+sP7Lvvxw5ecufYn5z920RkPXnzOQ8vOue+802+8aeXaXhtYRvfEvz+n6uhWS7camlmHNV5DrymiJXK6LOiyZCiyAWNMDMe1qjW71tS0KqTjYIHXS76Fy9dUtSZJjjefLYp2sSiSJAfXAOfzFZLkBMFiWa1Q4AsFvlSSCILJ5yuSZKVQvN7oqJq1a/f+ffsP9wGAfg6IUkVxvAqz/dewX32D0q/sOg1G2J9MU46X+wAUCrxhtLsdoMr9fhc8vfG9M/5+xcolG26/4jfXLVp35blrb7z46TUXPrXsB/etWPTE1edtXLHoiZsufuGGpc9fc/5j15z/2PVLn7z3hpcX//D6ZWffeNfNj9siAG1AoOV2A4Ae0FSL48VeH3QBkDXbrnYabZDFC61mv90CtWo7myH7PaDIpiKbFVaqVdugD1hGdJ1mtwOKFAv6AA6QqJoNkVmttQ2z2mqDRrMHZ0zdaqvCyZ0ucKutU+/gbamqC8WoZddlxez2wNZPdiRT2UazZ9l1WE01zGq90W00e9A6BEu4sLQL98BA2eqR9cTGNNhP/R+g9CSaHs/4hbVceCBEOV6pcLLHUY5XREljWIFhOZZmXnr+uUN7d8ksxeaSZALaTREBjzCoH+a+wliDuaO7KMRn0Fm5kIJsUChUK6U9lHo9xf8ZlMIDIXpiKiPi2W08gBWTfmTmWGpumIhMwZ8cnTiUmD6qUKhZxhQyIebjSglTiplKPsVTWa1CpUIzu7a+v2/b5vzxZmRYySdLCR+ficPDpWMsGqlg0RMR/CmFSrPZeD7uKyCBfNwXmx2eHd7nbd4edB550y8mg8uFVHJ2CPWNwD3eEKWwdUohPqhHy2hQoVBY4C0k5vDwZGL6KOoboRAfnEKRC5hCpfHwdHzqGOYfTwcmUN8YTyB6GWczMVjLZdJRPDxNYxG4izQdmJg9snv2yG48PA1LwXA2VKHSehmnsUg2NJUOTORjM/nErJBLiiSmlnL+oSOzRw4f/vTTqQOHpw4cHtt/EA2EiFiCRBCtVCLiQa6EVKhIMTZZTce5g0efXXY1+v4ObSpGTkXT45HyaIo9itK747WQOrUn9IN/uPTqBRuuPPeJi3+09oLv3rf0h7+++IyHLj1r3WXnPr78nMeWnvXIgu/fs3zBA5ddeM/yC39qa8C1wSlFqel0DKdjOB3L7drV3nEiWk1dq8J9U7ZVP+7ga7SdRtttdg27aZ+YDh9c+qZpdVWtybIrCFalosOdEKWSVCpJ5bJMEEw2W4bbTClKgOsiaFqhKKFUkiBWSyWJ47RiqaKoZi5ftOxauwOqtZYgavVG1zQbhlF33Y5ttzwxqmmnOuj0G5R+ZddpcLHayTTleLlaa8uyXano/R4olwzTAO0qePBnr1585p3n/sOalRetu/2K5y8/94FLz7j3pkufvfSMX61Z+vQtl7547aLHrzp3w+qLnrlh6XNXLVh71ZK7/+H/WbD9vSGVaVtiV2Yd0AMSr8HNM4Zpi5LGS7qiO80OYDi1Xuu4TtM0qv0eaDX7uubYVr3bAbrmWGZNVaxSsdLrAtdpVt2WJB4nVqcLUijeBwBCot0BjtsUJR0GNcAm5V9lM0xL12tw97go6X0AsHTu462fSbIBWQ73j3ruXPiQoFSFDVRoAoIaFEYGwvu91ukgMr/wzFOlsNsKf6ysmPCGJBsVTq5wMpSkNCNUOFmUdFWz3GpT0wxJEF984fmhwwdEtmSJdCWf4nNJiBAY+qqSKRoLZUMTTDoMA+ihRFMolMNj6cCYl3XnmVr/hwVe2BGEJPNGMjw9B8UfBDONhSjEJ+QSNBbKx2a8LHghF9OohEYldDqlM2k+nyigoTKeUBhyaN+Obe//vpCKGpUiEZ6VC5hVJvDAJJeOeSiFqhSOhUCDj0iiTCbGZGIiiZYyUcQ/BidYBpeqwkT+THA8HRjLx2ag8wg+fbhS1MMn1Knw4wX85OEtOoVMFXKJbGgqOnGEiMyU0XBs8mho9GA6MIH5x5OzI2TcB1+owSwFl6fgelEKCWD+8cT0UDowQSGBfGwuG5qikACU15h/HPOP01hEIpNyAVEotJDw83hSLZISmc/HYpP7D/mGR6ePDIfGpw99tuvAp5+X09liGiUzQbEcVzIRNxFNvvfRU0uvdCYihj+Vmwhjw0HyaIw+nCzvTThBcXj71H//L4uvWfz45ec8dcH3Hrzohw9evfDJy857dOkZ635y3hNLz9p41ZJnz/rvP1956RMLz7x12aJbGcrpdYBjnVqU6nZXsTu63bbcbrXar1a7rtO2raZt1R37+HC26TQMt6E6Tc1u6FYLVnF1vSHLLpSe3tJvhlHLZblYFItFsVSSaFohSY6mFXgPz5uVil4sijSt8LxZLssMo3KcUSjwGEYVCryquqUyl0AwUdKarR7N8NDPTxXZarXrOG3HaZtmAyL8FP9L9Q1Kv+LrNNsCAzT1UFpvtnpEjmp3gG23WFYzjLZl9kAXyCXwzEPvnved6y5feNcvVj27YulDl/74rpVL1992xXNXLVp74Q9+sezMe2645Mmfr9h0/cVPXHTGHT9ZcvsHv9+tVtqgDWpG3zZaumI36x1NtSzLMUy31e53ukA3XNWoufVeq9mnCowoaFxFbrcAvG0a1V4XOHZDlgzHbnQ7wLEboA9kydB0p90BvT4olbk+AI1mzzCrjWbPGydtdwAsk8KUg1P91qzVehVOhlDvA/DJtp1zvjB8GN7Iihe2AH+TIS89k5FX7IXdUy/SCH7/XyboyR1TGNgLq8QeR6HPyKMpW5E4XpFkQ9NtUVBN03ZtZ8dn27dt+XDo0L5keI7JoXwBE/IpnkB4Iq6SKa2AVrBwLjQZGN5LxmclMllGg5h/NBMc5/CYXckN4hP2BaGS+8sohcF10LAKUcoTcW+ltphH4K4YGJbrcHm1iJXRoEQmXZ40GVzMx+V8RCGjaglRSimxkKzkk2Ipq3NF39ixAzs+KWKILdAMllAKGbNEMKkwlz6+2hOG2lew404iWIll8ahAInw+IRdRgUpRWBAPT0LnLRmfLSTmKMRXSMwVEnOpueFsaALzj2ZDE1Cas5kIhfjysRkIURhmpJXSciHlZTsoFGpXciaDQ74KuQQRmQmPHSLjPq2UhTu6LTavl3EKCcD6LfRnkXFfMRnUSlmIT0hQIjKTi86ScV8ZDWeCk+nARDY0lYvOZkNTmeBkKRXSSmmbyZSTMyIRFXKxSjZq0nkqGTGZEp1NSxRVSKLpSHTHhx9v/sM7RQxnSYJAfZVc0MkmlNnpz9dufOfWezqRrO7HiPEIPhqjjsbLh5P0gaTmY0a3TSz+wXVLvn/v8nOeXHbmxqVnrLtq8VM/Of+xC3/08KXnPnHxjx9fft7ji374q2uXPXrGP6287KI7dKnfrJ9ylKpmWzJbitHSTJgF0bKtpmXW4DHNhq7XZM3lFYuRLIY3ONESRVsUbZ43GUYtlSSISYoSID6LRdEr20INynEG/E6oVqEMFQSL4wxdb8DuKc+bzSaoVrv+QPS3r77ZB6DTBTTD1+rt46NrZsOymnCXlKrWIE2/sR19ja55KO14NO10QYWT2h3gVlsEUe73gWE0KVLqVkHbBL6hzM9v2PiDby378T9dfdn5d1xy3s9/cv5dyxf88qbLH79j1QuXnXfPt//L8ovOuP2RX745fjjRsADoAI42KrRqG41eG/CcrChaq9WBE5ZwfbdhQ2tAzXWaoA/KJQ4StN0CimyqimWZNQhRlhE11TZ0t1Ztc7wCH6SsmHAoE06SwDUskBD1Rhc2L/8KKO2dEMGWXa83upteeUMQtVYbwCgGOAk6mGoEO6bQyut9D2ygQo7CL+Ffcdzm/6QY9WxHUPt6hWLIUY5XvAOBCl8oVbM01eI4oVlvtBrNaDDw3h/f2vzuH/JY3OBLGpsXSaySjYs4ohVQlUwJ2RgZn80ExzH/KB6exMOT6cBYNjRBxmdhE7GMBiFpIE7+goMXBsBCsQVblXDYsZQKwBCDfGwGqrpKNgprvNDyIxdSnnnYoNNGCREIP5WcLqKzAolobE5hckIRL+Po4V2fDu3ZyRJpmy0yWKKCxYxi1kOpkI3BNdqQcwqFUoivnA6p5bREpbhcnCMRjkSyoQkiMgWfESzwQsUs5pGqUJALKQrxwc8QnjaFKhYWgaF/CrqQvEWtUHlDGzCbiSEzw6VUyKAJKC6h4iyj4WIymA5MRMYPQ2sSEZmJTR6FmjUbmiLjvlx0NhOczEVnmXQUGo7gyhdkZphCAhyeYDMRPh3IhYalXETAQ9nQmMngmdBUVSzT2aTGFMViweAq/omxoX37tQrHFYkiESknp00kxBw69OrKm44++bIdTNETYWI8Qk0my8NJdgilj6SkWWp65/SaS+4+41s3X37+01ee9/QFP1x76TkbLv7xuiU/eOiScx69fOEzZ3/7nisWP77snPsWnnXLNZfdDTpAFquOdQp/H02nY1WB5vY0q2PYbdtuOW7TdZqOXTeNqmlUdcNVFIeX7HJFy9NSviiQRQHKTQhFT4DCQi4UoCTJkSQH1SfDqIJgwRpvPl8pFHiGUb0QfMfpcpxRqej9Pmg0wP79Q7+85/5Vq2+Ev5utdt+tNqki2+kCntc1rSrLdrXaVdWa6/bgjvFvUPp1uU4UeOejtHFimuJESLrVtKymbbZdvQPaANQBiYl7t42//PT7D9z5m9tWrV927s2Lzlx98Xm33XjNIw/8fNOmpz8Z2ZuqkI2GCapW3zHbttGyjYZt1V2nUXWbtWoLStI+AJruSLIBx3LqtY4sGYpsgj4QeFUSdcdutFsAIrZWbbtO09BdVbEM3bWtOvTEQukGu4Cwnsnxiif4Wm1wfC3MqS/wWlYTmoagKt21+0CxVKk3utAAZTsNTzpD0jdb/VYb8ILaagNIXxjKD3ME50G33ujW6u0vPF/GVDirCruw0K8L2ekNxkAfL6z9KqoJqwUcJ9RqtV6nOzZ07J3f/S4R8AUnxhDftEzhVqWA+sbUYkanMBYNaaU0LGCqRUzIJTD/aGzycDY0AbNnC4k5zD+KzByDFiE2E4ElXCYdLSaDNBaBNlSotODSEui1gd/G4QmIZ8w/SkSm4Owm3FAG43mhuddbccoTUbUQo9EpkYwKZLSQ9PEFlM2nxg/vObZ354Edn+zZunn84N5SMiqTWSGLQOMun4l6NBXxuBe6JOYRuYjKRVQgkQoRo/Eom/uzhTAnogySsFp7cvcUak1vIhYWhyFBvUqvZz7iiXgZDabmRvHwdDEZhK8ArOJ6A6alVAjylYjMQK0Jzcae3dd73QoJv8nkeALJx+bEfErMpygkwBNxCQ8zqRk6NSPgoQoehEvO1XIaj88xBEKloxUyHfNPfbblPZkp0Xm0nAtTsXFAF7KfbH/y4qukw9NGEGXnkunhYHkGk2fzlZE0O4zxc2R4r++tJz/6+/9wybLT16664Lllpz943rfvXHbWQ5cveHTBd++7fOFTZ3/nF5cv2nDdJRvO/dGaTc9vbrjA1JtfIUoVpTqY6mearUYb6HbXaYFGB5QYRdOq9Ua3SDGOU9U1W1MthhVJkhVkpyJagTjOy9USo3glXK/fSRAMVKVQnhYKPGyCwpIvhG65LLOsJoo2RKCuN+p14Lo96OBttQDPm4FA4p57H5idC8KwM023c/liqw3sP+3m+tOGrr/K+QalX9nl2Y68SsLxMVPLrv8ZSu26ZTVtq95u9E3FNmUXtAHogLoB8qgcmsr7x3P7P5v76I+H9n06m0+p/ToAbeDooGYD1+46ZtMyG7DPD1GqG06j2WVYga2INCN0e0DTqjyvu06zXuuUS1yj3jV0V5aMfg/QZd40qobu8pxSpNheF9SqbU21NdVudwDNCLB66VZb0HjcaPYgR/sA2E6DF1RvvPJUvzV1vdZo9oqlCvyIsG//kTLNw3WqkKa1eseLqnerLZgdAR8nzLVXVAsG8HohgoPBRv9SB6+39NQbLYVi1MtqgBCFo6uablfdpmU5xWKZ4wRTtybGxl9/5bfv/+EPh3bt/HzL5j1bNxdTUYFIKVS6goWFbAxShM1EtFJaodBSKkDGZ6HLBkrSbGgCasoTLcMwrN9Cfw2TjkK/rpBLcniilArBgiQRmSmlQhyegHVU6Nkh47NEZArKXwgqiDFvQIXDIyw2pxcTTMZPZ4IGi2PhqaN7tk0d258KzY0d2rvt3T/s2foBOjfJZREuHYeS9AtRWkoFmHSYy8XFQhIegUoJVGpwx5knK72NLoNZ8x5KPeqf4H3ci9v1bsCmciExR8Z9pVToRDxFEhpxPW8zhCX0E5VSIbh2FJJycB6XJxAai8C0B5PJwUlTaIeu8TmLTotElCeiehlTqGQ5HShh/gLmw+MzpUyYJZNjhz6fGt7HFTJUJkLnIzzmbyeiU795+aUrVlsTYXJoLj8Z48MkMRRLfDad/HSaHku7qFycwff87sAdlz911t/evOyH91x21v0XfP/O5Wc/sPT0X1123vpLzn749hWvnfvd2xf88JZli27j6UbV6oP+VzbsAYMUBnfLWFZbNRq1FpC0WqEkVqvdMs0XyDIAoFAoEFl869Zt7Va/DwBBlBGUNJw+URBo1iiXZchL2OyEShRK1UpF5ziD501JclS1ZhhNVa0pSlWSHLhqSdcbltV2nK6m1WFQEfQDN5twpYzg80d0w9ENp9nqOW5DENXjhv9vUPo1v047yUE3iNL5x7ZqhqbX3Gqz3rGNmiq5htJsVgFog04ddBvHX+1+G9h6V5ebtt6pOj3HadtW0zSPbxDzwmZNq0YW6D4AfQBMq4alc30AYGfUMmtQifKc0mkDKEwN3QV90Gz0bKuuKla3A2yrLism1H8emQoU47jN4/1XzeYFtdHs9QGAiDrVb03TbMCpmz4Akmx8vPUzx21CY5Sq2Y1mD+YctTtAELVuDzRb/T4As3MhGBzoVltwvw1EqddS9fLr/xUohUM4x5fD8ArUo54L6QREobnJ0VRLlTWWEWRJb7f6pm5hqXTI54/6/YHJ8c1vvY7MjlsMKeSSxfgc9PFCqCgUqlCoN20JVWkZDUIbDjTgEJEpCgkIuSRc6ZWPzeHhaQgP6PTJRWdR3xgyM4z5x/OxuTIaTgfGCok5iCg4f1lIzMGCqqcIT3A0VsmGFTKmkLECMsXiYbWcnj62Z+/2DwgkJJaITMw/eXjvzLEDRSQkFzA5l1JJjM9E+WxYwCPe4YkoT8CMwxifjwlkXCwkBDLO5CJlPOShET4Az807LzJ3cJp2MM7ey+aF8zCDWcTFpJ+ITEHTE6Sjh1JvNOjkA//Ii7bwTFsGTRSTQYlEDZqAr6TF5oVckssiZMzP40kxnyIiMyUsqJRSheQsi4eptJ/JRZLB4R2bf1fCIwKFZWPTTC5k5xPqyPD7N/98+10Pd6N4bM8IMR3nw2R5AisdQcgD0ezhMDOT5fz5zBC2+dmDS/7hpou/f/tVZ9996ek/u/K8+xZ+55YrznvgigUPnfmPN37vW9ec/d1Vn340AbpAEmxJ1L8qcjhOt9kEtRpQlCoskJpmi2U1QXZExe70gabb9XqTr3BbPvpw397dm997950/vr3zs92f79zX74NsjtGMDpKiKhWzXJYLBb5YFKHKlGVXUaocZ4iirao1L/DIdXtQd85LxIVQ1/UGnKKBXU94u1rtttqgDwAvKLrhuNWmYbrdHpAV8xuUft2v0/78f+HA+fNgXi9cUFVV09Tr1Uar2WvVgWt3bb1raj1T6dsGqNmg5oK623edtm3UdM1xnDb8gcdLxE4DdixgGRPOUJbKHLTDNJo90Ac8pzh2wzSq9VqnVm1zFdnQ3XYLiIKmqXaj3uUqMhwtFXgVenT7ABRLFbJAm1ZNlHQoSWGlt9HsNVt9mhEgcU/1W9Mw6oZZhSCMJ7B9+480mj3Yx4VxRdCC5FZbDCt2uqBW76RQ/O13PoTfAAu5cOXqySi1nca/osAL50q9FikMOYI63uMoPLrh6KqlKTosf6mKaRquZbiSIKui1G8293+6bWjPTioZ4fCEjCfNUkbJJ71eoLdfbJArXkMxH5tJzg7lY3NMOsoTSBkNZ0NTydmR1NxoJjjpyaxCwp+PzeWis/nYXD42h/lHKcQHa6QQOXBYE4q8k6WeRafJ6CSbCdXkIp2Ozg7vj/smFIZkcihXyFRymEClLTavUCifiapkahCi8HB4hMMjajElkQk+f5ymfD5WygZJdG7e3m9vKuYLsoJPpA0PfjkITtgf9TbhwGiLQXB6Pqx5E7eDo7fe93v6FZbK1WIGjpNWsvF0YKKMhuUCRsaC2UBQylMWzYj5HIenmQxCp6NiIUlngo6QK2C+AzvePbDjXZ3LKiUsGxmnM/4amWR37/nNksuSb20BaDF2YLwYyqBHw4URxPCV5NkCejAQ3zddnEhKwXJhgv/9+u13X75+2T+tPOdvl1/wT6su+OfrVyx5YMn3b1v4vVs2vzn++Se+mgUEzjF017JrXxU5vNQh6BiCO4NF0aYoTjdcw3QpqvTu2+88+ejGzz/9ZMf2LbMTo6l4bOe2HXfc/ot6rSdJTipF4TjLsgZskVYqOrT/uG4PEhoqTu8/5y20geFH8zJyB/kKR1FNs1Wv96FzUBBVy645bkNRTVhC+walX/frtC/g5V/Car1arwmSKMtqs9Vv1oEouiJXq1WBbYBGHRham6IkntO6PQD6QNNt226ZTmfgHF8wbllNWbZbbaDpjuM2YNOUyFGyZKiKZVt1XXOgscixG70uyOdKoA9UxXLshmXWWs1+hZVAHwiiZjuNYqnCCyrc+N3uALYi9QEQRA3eUFSLZoQ+ADhBneq3piRZ7Q6AvdsPPtwKwyJgKj0U355ENq1apwsKFHPPvQ8wrAglaacLen3AViRv59rg3hi32vpXoxSOCQ1ydJCmJ45l6o7IS5pq6ZrN0AJDC6piqbKhS1qv0dr23rufvPPHxMwYhyesIu4whEQkPCsN9BbBXqZnW/VSAynEh/lHPZdpIeH3zKVwPtLDBqxhwsgemJoEG40QmV5p1xtHGQyCYNFQKeHjibhayubj/rnhQ5GZ0VIWySXD0Icsl7Mmg1eyYSo+zaD+L0NpJRtm0sFyOsDiYYGMy8UkTyXYfBQ+2cERnXnb1uYVfr2BmZNp6n3sgLkTcAG4B07P0jxY3Z3XPR0E7eBUrkSixWRQodKwgQprqvjLsQAAIABJREFUALnobBGJiQTb1jppX2rmyITNqQbLZYIBnSZzMV9VLIXGD+z44I1yOiRRqUo2ymZCdHrOTIdym7c8t+CS5kiwGcbRYX8+lEYOBWKfTeF7gvQIRo4l8dFYaTxJjaLMVIkPSvveOPjyva9uvPWpWy6+67bL7r/rusduvXLjsR2oIwDQAobca9aBZbuSIn+F5ID5CYpShRZcw2jW6/1WG+iaPTIytm3rJ2++uumTze9RBJoIzylsORb0iUxl/UPrPnzvY5ZWK4xhWd1yWYWSFObfVqv9Wg00m8CLDISlYy9T0FvYMi+Ov1YDMC/Jo6muN2y7ZZhVx21Ydq3Z6lVrLVkxTqSwfYPSr/d1mmf1nIdSOOR0/Aws9lJUvdFsu9VmsciTpGAa/W4HNOugUQPtFuj3QL8Pmk1QpjmG5Wr1punMQ+nx/4u1GqBpqdMBjtvsAwB7BqpmFUgaJhxV3RbUoK1mX+DVbgeIgmaZNdAHeLYAY48cuyErpmFWGVaEhWLYdvXuKdM8HJJptvq1ekeSjVP91lRVF5ZnQ+HEZzv26IbL8Uqj2TOtWv/EovJWGyiq1Wz1Lbu+a/eBTa+8AT3GEJbQmjSvUepZf/+lBV5YAICjq7A5ehI+/wylumpVGE4UVNuqWWbNNKrwY03VaRTz5LtvvHnk8x0FJCziSToRZJIBPhP1QnE9cQbjeT2PK2QMkw4XEnNw3hGOPEISeAMwcGLSW5wJjwch70AUncwneKiYr84XkZnhvR+/O3Voz8HPPt7x0TvZeEAq59h8ikj4csicRCZEMsqgc1wmIBJRkYgOorSSDcPDZkJMNsTiYS4XFch4hYxVyJhaxKAEh1ISmobgo/JcSJDx8IENPvLBVXHec/FgXEoF8PAkLPB6xVt42xsNGkSsN106iF4vX0IiUZ5A0oGJQsLvcAWY51AVhHKq8vsXttx789oHf/bIb598NTjqcyqSkMtlQ34mgwzt+uTQpx8CV2EzsWxoSiuhfC4khCenn37+w2tvASFCGgthE+HkdLw0m8X2BjK7/KUhpDCFFWZQZgLJHw4Ft024qJYbQstTeWoqd+jdo0Nbpg5vnvn09yPABlUZ1C0gcrU+ABWJo5jiV9VzgaVUGJML4xRsu9Nug34PSIK8a+fnf3jzDYbKgX6TTMfyWDQVmS3iqZEDB194+vkj+4+RBN1wgWv3WVaDliLl/2fvPcPkqu8833l9n+fu3fvM3Lm7d8bjnZ312DgbY2OCCcbGBJOTARsbMBgwIAMCTLBNEhkhkIRyQDm1utU5d1dXrjpVdfI5latOPqeqTqyc/vfFXypKAsloF8Y7u/o/vxelo+6Wup5T9alf+n61ci+zhF7fH+eldXx62h89BXzbblcqoFzuWlbLNOvlStO0Krrh2E6tXGnYzlEfpzMo/fd+/qbPDeYYUD+O0j6mSnKxVu/U68A0290O6LaBXgTjo6G5GezAvrnxMS+XN9ptUK40DdNutjq6VdftjmF1TLtr2l3D6hhWR7eahUKl2wWSpG/esuPQwJFFl1dVC6ALQBc0G0drvLA5Oj42c+jgEceuN+rdgUPD27ftBl1QrbSGBsemJuehbzb09ZyYnBscGoNsdnuCU9MLnS7oAjA4NLbo8kE+fd63ZqXSKRQt26l/sG5zPJHleMUwK73FUNgQhTVbSS4GgtEjwxOHBobHJ2bhug5sJ8MppONbpP9DKIUyv/3lXCj7AKNX4C2WLKNk60WjoBmaamiaraoWzxeyGaGoGbMTM7s2bWajSCGdKCQI1jvP+mZF8jhnsd5j2AuE+gM9puZwfw4PJiOeBOLOEyE4WSPHUei2DQeR0jEfnEWCf9VvDto/tftxOB1VuifCTZVzjw6se/OV8f07xw7sGdzzYZqMFbikkMQhStVkVE0hEu3TEiGZCfTTVDzGUdguFeNhgQ1xdCBP+XNMIM8G4bRwv9E3JOhJxqDCH49e5gpT0jwRgL9LKupGlyZ6LISTRP0aij2+9nLTnqhF/0X41JlcXI6jcNYXPp95IpTDyLf+uO6r/3jJN/7p4kvPvu7L//nbTz7wLE9xPJ1OIjE2FFw8cnh451aJippZlvLMiWSokIkk54Y/uPnnrideAG6CG3WxS9HglC/nZvJThDzLSIsMNR0hJoOZqXB2LJidiIkLdHwklFsgc4tU3ptykpWEO7fljUOeMRrUQcUEjtVNpnJFq9ACzc8KpY7TgTQtFquG0YDFXlUxXQseNBzbtG69f2mBjAUXJofKBY4IuRJYIEGEt6xdPTk8ChogG+edUiufLph6A8oywGbnsWyy1a+ZAPEJ258nELTfLa73AJaIHadjmnXbqZd0u1iytIJhWpVavQ3rRmdQ+u/9/M2JHD01Su1mudzWFMc2O50miFPF1e8eeOT+FY899NZ1Vzx4121P3fXz5ffe9eSW9YcKag10gCJZutWEyajptE2nDR/rVtO22+02mJvzbtr84aLLNzo2NTI80Wx0Z2cWd+860G4B0AUYSteq7Wef+XNBM+NsJhxCFxe8H27fg2PM+NjMkaHxvXsOebyhRDLbBSCT5Tdu2n54cIRmUm5PYGJybt36zT4/4vWFRsemR0YnDx46ohXMz/tOrdWA7dRJMvXe++t0owwVl+B6aJ6T640uXE2pN7rBUGzzlh3lSvO2n/9y67ZdkJfNFugCwMYzcK+0X6IBovR0C7x9NuDlfnzCKx+PXFawraplVgVeFUStWLIdu16rthbnXRvWrhnYvUPOMEoSN/KkQHplJiDTSA4PwgkakQllUHc6tpQnfMdcr2NZzJdAXKmoK4O6M6hbTaJwGQZOx0AM9NxLsliAI8MKE9PimMqiMg2zt7DEhgU6yJF+aB6uJtF+x5i+uZ6YzGIyixG+Rd/USMwzH48GUkRUSJJk2JPCgxkyxDNhOY5kMFciNM3hbpkJyTQi08gJKE1FXVnMw9Ehjg5xFCIwUSVJlHKszBLwnzjmkg0zzjBEr5KIaKnjJqH6J3tPMDPvNZLh1ycQV2j2SD9KoSIgLOR+ojJUfxsVPqvwK0UmmkH9hTRZVbKwtGsLSYGO7Fyz4Rtf/NH53/zF9Zc9eu2P7j/v61f95Nxr1762vpRWJCaTQwnK6939werD2zYD20hFQqR71snhzNjBx845j31/S3U2zE/580EmOuGnRoOJoQA/gQqzJD0VpmeQzEwsORpUlxhyYElcIPPzeOSgW/Bl8EnquXtf/vU1j9z04/vkdL1ZAaVCXVSLbdDKidn+ephxXDQM+zTQYprNWg1YVkuSTF2vt9tA1+s4Fn/jtbf3796zZuXK6bHhZsVKktGlmREhTXFJ6vorfpLAUdABuXgun+BAE+iFarcNTLMJtenhIG6xWO1vfMIyMizt9svz9lQGYckXitFXqwB+PfzeUunopjjcfINDFVCf4QxK/72fTxw7OtWzrymVmgNqNgi7k3fc8PuLzv75Rd+647qLH/3hN37xq+v+dNNlvz/3Kzed99Wbnlu2OoVZnQpwrG6pVFEUs1Lp6HpVFEuVSsdxWrJsdAGAdi7QkuzFl16bnlkIBaOqUnrn7fdKRQt0wfCR8bfefHfXzn2lovXcs3+uVprFgvn2W6t+v2y5purZDH/JxT8ulYx6rb1lyzaKjLfb3Rf+/Mrq1WvTqbwoyoOHRx544KE4m85m8xdfdFkykf2871Rdr3e74I03VuN4olLplEqVWg3A6eVcXrLsqqwULbvaBeDdVWvynFSuNEbHpg4cHKxUm7ZTUzW9pNuGWe63HYUTCuVKo1Jt1qqtT4xKuQGj7NTLTt2xa72wraplVkyjbOhOL/SSDaNUtOCQUbFgFoqWIBQlSS8UHMuumUZFU3VFUouKvHrVW4uzIzS6pPFoSYxmqWmOmcmRswIdzqJBJYFxpD8RmeNpL0d50+gi4Z02uXgS8TLBRZ4KcZRXTQWzuCuDezg6BPupGdQrMojKRnvrKDKNKExEPRYKjUi0X6L9IuWDIZBeCFSRCfFU4FgBFpESUTkZExKokMAKuQTHYPu3rh/YsbmQZ205LybxLIVwFMLRoWO+3LCEGxTpmEgfVSgU6CBP+3jax1FeLRVDlybyREiJk9lYTI0n8iiNu4LxQJSLEQU2kYsieTQoUZEc6jZzmMIG1HhQjYfUeEiNIwoTkemoRH1yYgqlG3K4H05RcWQQ7uPGXOOlLN2bvIVS9VDqqEfNnnkOrPH2iuo9MPdyd/ghxhET8HpFTu3ZsP0f/+6Cqy57+trLn/7uV2684fIHfnreTa899UZVsAUiSbh9MsO6jgx/uHp1zO2Wk0kOjZbp6Ozqdx675LJmAOMnfOwRd34RS0yE8xPh3FggPeRJDfuysyjvZjPzFD2K6IE0PeiJ7V8sBfnkJF2K6qMbZr/9ny789hcvu/5H9z7/xEqJrxtGqw2AoGm8KlcadVlVJE11alW7XhULqqApTqOml8u6UzXLNdup23bTNluW0baM9iled/U6kGWr0QDlcleWrW4X6KXKzNTsE8seDft9isCjSFjIZJoVe/DA3jUrVx45OFCzKqADqlbN0ctFWW/VgV78yJH0BCuYz4pep/uWewal/y7O35zmU98pqXXQApYKbr36wQu+ftPtVzx5+0/+cNNFTy3/1frLvvnbWy999tZLn7n+wmUXff0Xt1+xvGWCglqDjqGwkAjXVODwS6MJNm7aPjE51+6Adge88ea7z//xpe3bdv3pjy999+xzWSZVduokwTJ0cvDwiHvJ//tlywVeAV2wc8feRx95HO6nfvWrX6coplZrvP76myybAAC89NIrr732RqVSAwC8+ebbDzzwEACg1er83d/9fS4rfN43brFY7XbB7t2D4TBVKDiFgmNZDVEswZyy3uiw8bSsFBk2NTk1l0zlugBwvLzqvbUkFRdEVSsYqqZDz9Gefbdhli27Cqu41UrzE+MvorSfoCdDabFg6XpVK5V5vpDO8KKgmrpVVNQUS236YFXUP5djw3Rsjo7OpMg5nl3iWU8mFkiEfXkilCd8GWyRp9087c3iSwIdlhg0ifhlllASGE/7SrlIMjqTJbw9lGYxn8ggChOBun0iGZKpsEIjMFQKUeiQQgdkxi/RPok+SlNIu4+jVEhEhQSapSNsLCCmKDLsmTy8++CH6ycP7y7xCY5COAo5gWc8hUgMLjG4SMdEBhHooMD4BcbH094EsqAm0WKaZoO+YirbUMwj2w7ed9Ovnr532fiOgQKbETBCwKNWjhVIfx5zqfGgmvBDmipsWGEiMh2TqEi/VXj/YgxMqZVErJQlJTaSQFxQTLiYoaDXt5LA4IKpliL6h4/654/yxEc/E/4rPY7qOUpLYXkiUJaScGDY4tmJQ0MX/eAX//yF6664ZNk1P3n4e1+96offuuLwlsFOocajdCoYlhlGSyW9ExPjhw4mMbzMcbrP41nz/mt3/FKc8+VmQ+kZJDMZSY8Hc2MBbiLATQTykyFuLia42cxSPDFLFrwJfjbGDgdTkzgzShYjxsi6uS//h+/deNG953316p9ccKtrFm01gCAUzXLNqlRN22p12tV6xaraZtU2a2apaqWlfKFs6eWy4VRNp+7YTdtsOUbHMtonk3QoFCrlclcUDagFL0lmtwtKRXt4aGRqbLRVqzIEjkWiQi6/8YN1d9x625FDQ5qoNiutNJupmFXQAZpY6DSBXqp8zij9nyrOoPQzO6eNUlsHoAV2bhz72n/50ZXn33vnlc/ceukzt/zwmXuuev3b/+nW3/zs9WvPe/yOy5+76gcP/Zf/60IqVCzbAI7p9mzCGk0A1y5r9c7mLTsOD46KUiGZyn+wbvNzz784Mjyxfduu3y9bDrpA4JVoBAddUK+1b7v1zjWr17eawDIrq99fd/vPfxln06AL/uEfvmDb5Xa7u2bNBxwnAADuuuvXK1a8ls/z1Wp95cpVy5Y9ZhiW41TOO++CcCj2eaM0k1GqVeD1xlyuMMdpxWLZtpuKYkJh3jCC1hudLgBuT+DQwJFOF8zOuZKp3IsvvRqJ4qZVaTS7ilqCmahhlnXD0Q2nl5g65XoPmSeLE1BqW1XbqsKUtIfP/jgepSYvqLV6u15ry7Ja1EqtRrOkakGvZ83KlUvTk3ycldOpWqHQ1HWOJFPRSCYaTUeDGdQrMH6R9fO0m6M8OdwrMlE26ImH/GqCSUf9bGhBS0fypDtH+iBK4eKpQEPqIFC0TzpGU5kKK2RYpoIqE1TYgMz4ZcYvMwGJ9sMJ22MoDXJ0qIdSPh4rcHE8uCQkSVA1SnxieN+2bWvfpsJLPB3h6eN6qwIdFuiIxKASg0sMKrERkQmJbEBk/SLrz2KeQhqXGDSLRqqSyvpjT9zz8IVf/f73/vkb7//pNQFjRJzMRUPFJCFSAZnx91CqsEGFDcs0ItMxmYatzRPbvXAGWGSQQhrXcxRslGYxn5o8WtftjTH3O6KfMMR7bMjoo5lh+HtBZSWTY0pZEjqKw33cipwS2MS7b+z81lnXffusqy/9wS3fO+vi+3/+W8obM3M85XanQj4m4NbzSXRpYeN7b48fOkC7F8iD+w8/9+y2x5ZHdg4wI67cfIwZDTBjvsxEUJiJSHMRYSaSm4nkFsjMIpucJxU3VfDQwjzBjCKZmbjslQIHovde+eilX7vulh//ZnTP4jO/X7F/5xHQAd0O0HWzWNRrtYaiaKblOJWyZhSq7aZqlEqOVXKcT4/SUqnmOB1ZtqAqgiDo9TpQ5NKhAwOHBw7u2bWbIsigP8DSzE033Dw6PNast2qVeqPW1ouWUbLr1ZZRsh2zdgalx58zKP205/RQapudsgFaNrjwOzfcfPlDv7r2uesvXHbj+ctvPP8P137vqWvOefKx29dd/OV7b7pw+e9ue/urf//T39z6LGiDRhMoqg69OaHFGNxa6QKw6PLtPzA4OjY9PjHrD0SW3IHpqfloBB88PNLtgFq1tTDvHjh0ZM/uA+Nj035feOuWHaveXRON4KFgdM/uA88/94LPF4jFsPn5xUwm9/77azwe3+bNW32+wOjo+MqVq3CcnJ9fHB0df/PNt1evXmvozueNUlhfQtHE1q37xsfnAwE0k5HgsmkylYdjxnlOWvHqm3lOmpyam5icNczy/II7k+Xh1rZWMJot0I9S3XBMqwIT0/8OlPaqu58GpYbuZDK5RCKl63q72ZJEfnp8Yt17q4f2HmKjtCVahJ8a2TWxbdXe8V3zwAICyagJKk8EpHhQSyM5YilPenK4P4sGeRJTWLaYSvEklkS8ecLHUd48FcxTwf7xV4WJKEyExwMQpZCmMhWWiZBEBjQ2pMaDajyosAGFDcpMAEoo9FCap4I8ExbjET4e4dhojokKSZJPEGTYMzdyYMf6d4f3bStycZ6OCEz0hI3PYyhFIUqP9mXjQSkeVJPRVNSdjvrVBOPwwtKRiftuvuuSb5137r98c8Vjz8Z9IZVhRCImEOFsbMnK41oipCb8x/6ToR5KOTLcr3/UG9/tCdxDAeF4eJENLWRQbxYLwI3SHB7sFXJ7E7y9hmhfvfejIeF+lMJZYso/m4554FJvMUNYkpBn1Q1rDj5491P3/eKRlS+tDM66HVHUs4lU2KMksATizmCBeMw3N3JgZvhgYGwwvGXLWzfdOvbKm96Nu4K7xrLzsfQ8Sk8E0zMINxflZsPZyVB2GsnM4fEZgh6P5GYQYT4sufDMZERaSlGjWM6V9+wPrXxy7diHcxyqHdkxsXfzgaH9R6pGFXSAVXRAE6hSyTYrplGWFa0FgFWrFW27ZFcMu2Y6ddtuOlbbMTqn0L6Hoz3FYrVSAaVSTZLMcrkrSfrgwNDaNe/v37tv4/oNk+MTzz/73KMPL2s12qAL9KJRceqdFrDNimWUbbOiKvoZlB5/zqD0057TRWm3bgIiIP3jfzznl9c+fe2Fj9500VN3X/najec+e9MP/njnJStuu/DP135/+Y3nL7/z8j9dfe7DX/gP3xPzdrXWhvlopdoSpUKxZNfqnUQy1+mCku64PcGJyTkkgkMbsonxGQylwqEYrOWqSmnJ5XMv+SvlhmPXkDDqcQeKBbNSbkxOzM7PLTWbbcOwlpY8mlZ8++2VU1MzuRwHAHC53O+9t7rTARwnTExM7d6917Kc4uc/dtRoAOhrODXlXloKjY3NDQ1NLiz49+w9tG79lqEjY6+seGPVe2ujMaLTBffd/9D0zEIuLzaaXcMsF0uWbjiyUizpdq/G28tKLbtqO7XT7ZX2UNoPzlOgtFKpcbm8qkiNejlO4Rs/WP3eW2+NHh6S05Ih2IFp7MXfr7rlsgcv/eadv7nmxbHt/jRCm/lEDvfztE9NhdPoAkd5c7hfoNBCMpkMR6PzCxJNm/lUBvUnI0scHYIo7ck4yDSistFTovRoKGxQYYPHUIrwVOgoSumIwEQ5NppnInTEo4sZIuQe2LVlaM+WxfEBIrgop8nTRWme8CUjS0oCy2EITxAyk9j+7rorzr347mtu3fLmqiwSLSZYPU2XUngm6pKZgJYIwZT06EgwjSgMqjCxHB6EK6T9K7DwF4dPAvxFoNQR6ZuBA7eQlHIc5SkkiwXgUO4novSEAm9vohgOBmdQr5pELZ6F3qhpNKTlFD4phRYDgTkXxzIVTSpkaDEe4Ui/nAgJdJDwT3EsouVoIuRSyEhi3/7nL/4xtX0fuX/EtXkgNRcTQ2lyKpSai6Rmw4lJX3Lcn52L8ktMeo6iR5HkhDc75cnNhuKjvtwcFdrn5pfykl+uJRrkDDu/15UOZVyDcy/8/tnxvYeVpJCn+KYBKqVm0+5UzaZZKjeaXUkrlayy3ofSozS1TtorheM/cNgHTvpUq6BYLBMYOT87J4sSjmJu19KjDz+yb89+0AVBP9JqdG2zkknlq06zVQdF1dRLzhmUHn/OoPTTntNGaacMXnxq/YXfuPnWnzx+y6VP3fLDp+/68YpbL3jhhu//8bYLX770X393zxVvXP+D5Vd/95En7vrgS39/8eiQqyfjB9dCoHML1A2AA6s9H5VqrQ33Ydot0Gx0YXuv7NRhUuXYtUq5YRpllkmBLjCNcrPRrVbrAABdN7t9N4MkKQAAx6k4TqXZbPeuO0fnkz/HuxP6FLbbwDAa9TpIJnmXK+jzRR9/4g+DQ2OHBo4MDo0+/sTTBw8NvfjSqzt27h0bn55fcDdbQDccp1yvNzq64QiiCqdwIU17HHXK9dNFqWVWYKO0R80TaHoCSgVObDWarVo1EvRtXPf+B++9Mz81rmRzJb4oxbWXHn/noq/feMU59115ziOXfuWh8/7lZu+Iq5imU1F3Gl2UE8E0uiCx4RweVOL0zMFDLyx78sGf37Xng3USTYs0lkH9PBPOkYEcflSBD6K0kEBPVuDVWKSfo31Z6UcohRO2eSaSo5EsHdPyCdfkkekjB6QUUdbyfBxFfXMnK/D2xo6OUfYoSjOoO4v5HDGVwxDG729qBZFM7Fm7aWzHvlQwUhUEDo3yeLjMxyU6mENdhWRYS4Sg48qx+amYyqJwLKiH0t7gbk8TSmQQuIcK925J3xz0JYXLMD1BhpMVeHtrqXCvpn/sCCoJc2RQS2HQ7U5kUSHOpHBMiDNNQ1UylJCIJmMuKjglJ8NZwi0nw/HIAsciapagwi4gc8lde1dcfm1lLsCNuibW7sFGfWkPExn3sXMIPR2gx93xCT+3iKm+FO9KJKai+bmg6AqnJj3MsDsxESEGg+lpNnIomJpLEeM4NhnFp6IL+yZDo4tHNu/etWrT+O7JoQ/Hg7OoKVbaZaArZVnSof1DySrrVtWwa58GpdYxo+xKBUAthUYDlMvtSqVWKhQ1RQVdkMtkk/FEMp5i6XgsgjtW1TYrpYJpG1W9YDtmzbHrPV1A6wxKATiD0k9/ThOlBgA1cNvVy35+5eM3/+jxh25968rvPHLrBX+65fw///Li13516Rs3nvv8/Vev/Nk5j1919sMP3/bul/7+4h1bB+GiJ9RSgLyEGn6ZrKAbZWjTXam28pxcrjTjbHp+bmn9us3wLR50gW1VDw8MI2G0WDA97oB7yX9kaKxYMJdcvsmJ2W1bd/p9YdMoQy/xVe+ueeXl16uVJkmwoWB0x4d7NFUncGZ0ZHLjhq0Mnfq8UVqvA1V1TLOpqk6l0oHR7YJQGH3q6eeDoWgXAJpJjoxOLix64CRRsWQ55bqsFAtFs1prVWstuNwCaQr3lCBH/zvGjvqru38RpaWCWZQLNE4c2LVr5Rsr9u/ammVxjU+ToUAiRgms9Ohdf/jWFy778TfuvvybD1///T9e8N/uOLhhr5rE0zFPGl1UU+E86dZSsQzqL6Tiz/3u0e9/6Rtf/vt/uvv6WwOTU6VMMoeFBCYKUQpzKY4MSlS4kEBPNnakMmEI0aOFU+aoIgRkUo4I5ckwRyE8HYEozTGonGFmhg/ODB/MkGE26k1igUKePdnYEU9GBAqub8IC7FH1XYkNZzFfMUNJDJ5FI2o8bmRzXd0w09m2prU1JYME0ohXTxMSHVTjoZOh9ASRo557eQ+rPdDC/RnKP094Z+G0EfQrVRJYDg+ebOzoBJT2yA1njqC7AFReLKRxR0yUckwWD+bIQFlJpdAlNR2TEqE05irlMTUdUVJRNY0Vc6TIxrJ4qJlJjD3/0vqbfwWiyezQ4uj7OyPDXmw6is9FibkQPRtkp33xqUB2Lsovkrk5KjERyS+GUzMedHA6Nx9NTIRTU1huPk4cQby7XMWwRE3EDFwSAkxmCVUQ9siGvTO7Zze+vuPw5vGFIW88ktelipAvdjvgOLNeu+k4Lcdp2fZJqQZfcZbVgsugsN5r203HqTQajU4HJBKpUsmoVGrRCL78iT/YVrWgGZZZBV1gmVUuLzcbwNDLZ1B6/DmD0k97Th+lVfDYfW/cdd2zV3z//l//7MVLz7rvt9esvPa7f7j9gpd//K+TzIrhAAAgAElEQVSPXnfOM/de+eatFz17y0VP3XTx8m//8xVHBuadcqPe6KqacVQT365Zdk3VDI5XZKU0dGR82/bdcMuqVu9IokbgzEMPPmoaZQgDryf4u4eWvf3WqlLR2rf30Nysa2J85sjQ2JtvrGToJBojX3rxVduq6iX7wP7DkxOzsI166ODQzPTC1i07Fhc8q95dg4TRgB95+633Pm+UQiVraBlhmvVyuV0oOHDzZ/WaDXPzS3Dvs1Jtwg6oYZa7AKiaXm90oH9hoWiWdPsEmsJlmHLlLzRK/yJKoSLgKVDaKrcO7Nr36h//NDk0oHIJKU2mybCai+cZmmdzv7r+3gu+etUvLl9+5dkPXff9p8/5p+u2vr1eSxE8FcqTHj2PCYy/lMWTEU9FFH972x0Xfu27l3zr3NuvuH720KCRzZLeRZGNfRylxSQGl2EUGultwmh0RKERiFKZCcDCqUQHe4ukEKU5IgRRmqORLIXIGSbHoAd3bFoYH6wWeTVLx2O+JBY4Slwq1MfR0FHTNzJyDFThXiNWSUQEOpzDg1k0aOZTEkNiLlcxlVJomsdihTilxfFikpCocDI8b+XxQhI5htLg0d+Fiaks+nF1pP4ktecx3jM2Z0OumGuSI8OFNMmGXBnUX8rS/apGn3IZJoN60zEP9HPtJcFZzEf7phyeFNlAFl+iglOmQIvxMBcPUchcngkTvrksHlTiOEcghTiVnp9954bb99yzDNAiu39m6oMD5BQSm47kY1liLsQsIIn5UHzKx4774+MhZhQhhnyJSZ9399D85gOlcCoxEaFHwoov22QdGy1ED3lFd5IaC0UH5tML4cjANOejdNoUYjrjya148t1N7+wCNVC3QSYlG3r14yh1nFO97qA+EdwKhTXeQsExTVtVVV03a7VGtVpHkOjvly3/4/MvJuIZ0AWmUVEVvdUEtWq7Um4WC84ZlB5/zqD0057TLvB2K2D8YOQHZ91404+W3XLpUzdd8OSD16386deX3Xjus7ec/8d7rnjj2nOeuPmHTz5446uXfevXX/3HSxyj+4nK+MWSXa40O13w9jvv//ru+6MxstUGslJy7Fqz0X30kcdLRatSbthW1esJxtm0xx1wLXpfevFVVSnJUmH4yPiDDzzi2LVWEzz04DJZKoIu+POfXmGZNOiCN15f+cKfV+glp90Ca1ZvuP++3xU0s17rPPXkc5Kkw53rY1JeTajs9Tndqb0wrWqt3vlwx55ojGi1gVYwSrrd6QJR0todICvFLgCQoJZd7XRBrd6u1duipBlmGVZ9a/V2F4CTEdS2qpCd/Sg9YeaoH6WmUS4WTE3VVaUEK8A8J+tFS5eNze9vnDg0JKUSfIKQ04SYjHEskmeiHEOteuHNi75xyaXfvPby79zxg/9600++fRvpDueJkByP5klPMjqfRhd5KiAy0WIqFZic+cNvlz18572zB0c4nKJ9PoFC06g/jXnhJgzEANwlhToJSl+oFKLQiJnBC8loHvNwuLeYxBQmksV8PHVUgVZkY1IcFZiYwSUqBU4XkikCGd6/Y3xgTxIPc2wsiQVydERM4hksoCRxOR6FYzh6jiqk8QTi6peG/6jGy4aPtXIRgYqKdEykMRgSicp0TKZjChNTmJhMIzITkmh/D/ZwE0ZlozD6xQ57iWMvlfw42hOIO4G46cAC5p6mAwtQE+rj1d2e89oJEhA9R4GeGWqvLZ0nAhzurYlM3D8FzUrp0KycjMlpIkMhGQpJoqEMFlYTjEhgRjLREPjExMwfLr7c//pqezaUOLxw4LVN5GTUdWghF80IkXR03E1PepgJj+Jj0AEXetjn2z2dnA4v7RzWgon0bCw5hfl3zz9xw8Mv/fq5fa9+KHsziUk0v0iQw25uKRbaN66Fk/tXDdx15UPPPfBqMiy9/ux7WCBZM4HI6/bHTTVOuYJ5ghbuMaWhRrXStO2yYViNRktT9T88/fz2bbtmZxb//KdXbKtmmdVmA2iqJUt6qwkq5VMVkP9XjDMo/czOaaMUNEHHBv/6/1103ldvWvbLd64458H7rnnj5vOfueHcp5bdsubSL//myrMfuub7D91w0cPL73n7y//5/JOhtKQ7tlOfX/DgBDs5Nb97z8F6o6uoOhwvevyxpxy7ppfsaqVJ4AwEwPZtu+6841eNekeRi6Mjk797aFlBM0AX3HvPAwKvtlvgjddXQqa+/NLrjzz8ONQd3LRx+2/ufbBUtG2rtuzR5Ypiw/oPRCn8BAoffx53ai86XWA79W3bd8H8UisYXQAsu6objiQXOl0gyYVKtdlodkVJCyOoqukwSYXah9Vaq6TbeU76H0RpLwzdgRzVVB0+FgXVsaq6UNq+dsvM4IghcFqOyVLBJO7Ks/406W1ZChsKvv7MC7dd/vMrz71h+d0vugb92RiuJLBCGhfZQAZbzGCLOdybw4OZGFJK5xJBDHcFtXhWohkm4FXieI4I5cjjVOAheE6GUokMSHQQolSLx2Qa4alQMUNYfIIOLMQRt5oicO/cwa0f7N70/tjBHYN7tu3Z8oFvbtyUc9UiX+ITUopgo94cEUqjfoEOwz1OaNZWSOMnoFRkEIjSY5yLiAxEaUygogIVFcmIREVkOgoHjxUmAsvOPZQemzk6+rcnSNj3M6/H0X6aQgniDOqPh5eSEQ9chukXrD8Bpf11435V/V5Ttr8CzBM+1jdppmMS6Suk0ZqWT+FBLODiE1SGxG1ZzBO4d2RkYN2G/atWL+zeF9i17/077lUHpqz5SGDL0N5XNykIF50IT+wYcR+cWdo3Ro17tQAdPTSXno7GBryeXTNzW4aJ8ZCFScRIKDoQ+PCFTRf+ww8u+eKFd/zgJsmTTk3jgpvGhlzZhaiwhCKDrrP+4zcu+trVl37zZ28/v27FM+9ten93uw6qZfAJ/lSnROkJ6eMx7aGaKKgAgFQq0253JVF7cvkzhu5s3bJj7ZqNO3fsW7N6w/TUQkGzq5VOseDopcpfm23/xnEGpZ/ZOe1lmBRTAHWw9u393/3y1T/9wd13XPnUhV/55a+vfPHqcx6+8YInfnv9K5effe99N/75qvPv/pe/PRf15W2z84kohcswaz/YNDfvnp5ZXLN2YxcAp9yo19rNRvf99z7QVD2CYCyTmp6an5le2L9vAMfoPbsPeNyBN99Ymc+JE+MzB/Yf3rpl5+DhUcuszs0uDR+ZWJj3vPXmKhxjpibnt2/bvXXLTgylDx4YGhme3LVz/44P90K3I2iKZB37MHuC4+BneKf2ogsAxyvDIxPJVA7av7TaAKoxdAEgqXi90YGC/pNTc3ffcz+KUVARsFA0JbkgK8VGs9vuAEjKj0c/R/uvnGzsyNAdmN/DVFUU1IJmNCutjt3cvX7b3vWbEkhYS1NSIpojPTzro0KTSgrR8yxHxUKzs8M7DywMzqpxXqQoNUFoKUxkA3nSnSfdOdybQf1s0CczrMpmVDZTTKU5HGcC7nTMByd4+3ECO4snQ6lChwrJqEwjIhmSaSSP+qAYUDLiEehIMcsko76pQ7uGd2/xTI0QgaW50YHBPdvGB/bMjhwaO7jDNzuSZ6JSiijLGT3PwiVLjgwaedoW4n0o/YhAMKU7/spHSSF0C5eo8NEElA0r7EePj2H1ozihS3oCQT82BhWG4gzQGr2n7A+VdT8RpSeo+fd+LJwT7pWUj14nQ3zMA3Q+FVqkAwtSnMD9bhoJZWiSjcbSGDG57+DItg/ZeVd2yRfYd/DAy6++c+dvGl6sEUoQhxYOvLmN86X5UC445KWnwqGD06npUHzCO75md3YeS86gxFiEnSaRwXDwoD/nygleYfktT/7t3/ztZf/tsp/+62WpGZqZiLWSpuSPY8OuvCs6v3P0a3/37esv+eV3/uvFd1x7v5A0Q27CNjuNBrCsRk9E8KgStdWwP7WI4DF5v4ppVU2rAkfiMZx+4MFHDg0M79p9wOdH1qzduGLFO7t3D5TL7W4XiKIBu63/O8UZlH5m57QlGmoVUDEBaIHHHlhx1j9dcs9Nz57zL9f//hfvXH3uA7/62bMXf/32B29/4fYrH/l//4+vvPL0atAEttn6RJTaTr3TBSSVCIZiNJPKZIVypWk7dVUptZoggmC2VU0mspKo5bKCzxsaGhwFXVB26hQZ37hhK5zv9fvCkxNzJBF37DqG0pk0n0zkDh08Ylu1Rr07M724b+9ApdyMsxk0Rs3PuRPxPLQ9OgGln9+d2gtocj4756KZpKrpgqiKklapNrsAECS7d9+hAwcHJ6fmWm3w0suv/enPL+/ec4AXlFq9bVoVVdMLRbPZApVq8y+itNcxPfUyjKE7Bc1Q5KJlVgqaIfCKZVYa5WaOSAxs/XBgy1bCuySzmJJCxXhQTARMkaBCkzH3iBiPVNV8ReGMfE5LJTkC5QiEI4Mc5eVpLxQOzOF+LUlnY7F4EEmGkRyKyiwhx9Ec7s9TQZiV5nA/DB4P8HjgZCjVWKSYisk0IlFhlY1ymB8OuCYjnkKazJPIxIEdeza8hyxMFHIJOUVnqGjUO4+4Z93TI4d3bZoe2pulEENMRV2TAhM1OUagwxnUC/HGhhaOMekT2NYPOZ4KwQ1RgQgKpF+ij85A9fCpxpFe9BCrsMdlnCcYmn78H5LYCDR16a3BQFHiU2Sl/S40J+S4J3RnRQaRqDAf86gUIpMRjkBSWCRHU3gwtG/b9u1rN4zuOzSx90BsatammG4qzc/O7X/xpffve9jwROX5KLeIDa3eP79jippC6alYcjqCHpy1Qimo28AvUehYYHHPQmyUUKMWO5ejptNKSJ/evPjkbc/88pJfbXlha96TQ4b8yQWKGA8QE77MEprykM8/9NLl5920/KGXV76yGbRApwEEQVcKdr8e76dBaX9WCh8bRkPXq7ZTT6Zy9UZHUUvFkjUyOvnuqrXlSpPjFRSjCSIZiVDNJmi1gGE04Azw/05xBqWf2TldlLY4rhhnhGYNiLnqtg+O/Ob2Zy7+9m1n/acfXX/xg1ee9+urzv/Vd790+a1X3jd6YEnOWDUL2CdxEbedeqFodQEoluxWG3QBiCey1Vq7oBmWWalWmq0maNQ7cIjXMitlp95sdE2jXK00m41utdIsFa1WE4Au4DnNthqgC+o10O0A0AV6qeLYTXil1QQsk+12QKcNyk7LOubWe4JZ0ud0p/YC+pX++u77aCZZrjSgVoMoae+vXrd336Hnnn/huedf2LR5O80kX3hxxQsvrjg0cESSC41mt1prwfmjSrUpStopUNrjaD9NTybRAK+oSqns1IsFUxK1WrVVkLTNq1bNHT6Yi4YsLllMEhnUy5F+KR4s5dAsvpTBXFnMwwRn0zGPmsTVBJHHI1k0nMV8HOWFOkE87ePIoMxiHIEqLKvG45kYkkWDIhPK4h/tlX5KlAp4QCCCuZhXIIJ6mtLiGKQLRyBLI4dG9mxdGD4QWZxORgNCnJCSlJZPJPEwnyD4BOGfG10cH2AiHjlNWkIygwXi4UWRQdQkmkG9cK71+Eyx34blBJTCjqNfIP0C6RUpn0T7e6mnRAe1ROQTo59txyvvH5dQ9i72dI6gF3oG9cMa7+miVOhzVP2I31RYpoLk0mQpRXJULE1gGZocPnRocP/BmeEx19gE4/FpOM57lpwIUlia3/T479976JGlbXt2r3gfPeJe2jUbPOhlJ3BmJJIcDWZGfIVFAt8/VQgmUnMx/2EXPc/GF6S8z5neFlr/x33bXx5070WJiezgmgl8gk0tZVNLSc9BV2TUb8VlZNQVGFna9O7OKy/9eTahW6WuLDqaVq02gFVt605Nd46h1GrYVsMxT4XSj38mNs2madYVVe8CkMuLoqQ1W6DTBclU3rJruZxSLrdbLVAslisVIAg6XEj9a7Pt3zjOoPQzO6eL0ka3C7pdkMko1TJo18DCODZ7BNv49uDy+994afnal55cveK5NYEFErQAaANLr9nWJ3AUuqNYdq3ZAnlOhuadubxUrjRbTcBzcr3Wtq1qo94hcEYv2fCP1UrTtqr5nAi6wLFrBc2wrWqx4HQ7oFhwqpVOrdqVxFKl3IZh6FW9VOl2QKlY1ksVvVSpVbsnGCF93ndqL9odsGHjtpXvrh4bnz54aGjDxq3bP9y9b//A/IK7CwASwR5/4umJydlHHn2cINlXVrwxdGRMlLR6o1Ortw2zrGp6rd5utk46dgSB+vErJxMONHTHtqqqUqqUG6WiVdCMRr2DR2OrV7xEeWbtfLwipPQ0wWF++B6dji3xVMDIk6Usnid8WcyTw71McF5icI6IcmRQZANSPACFAznSn4p6U5GAQOESQ2ZigXTMkyPcyegczwR55qPGIU99JGT/iSiVqbBEhfOoTyRDepoSSYT0zRHe2dmBPYPbN3gmBrU0ZfJpnkbzNKqkGSXLMlF/moxkqOjS5ODYwR2e6SPI0lRFySpJPIf74aKIlsIKadzI0706M+yM9kUvSQ2JTAiagfPHdIChyH7PTEYg/Qob7mWlEKKFZLSQ/ATI9WelvYS1R1PYJWVDrnTM17NDPwVKT1bg7dnA9dvRSFS4EI+kQvMqizIhj5xO+lzzK998w1ALdcNMx2I5JGLTVCHgAQnSWpp+5tordrzw4ty2veuffzN4eAEbQ3hvVvXmc5NE5kjAccfZ/XPswDxxeJGZRvCZSIPrzu6MLL/97Ru+/+DdP336lvMevOHc37z/zM7oWEpAdGQMT3mz5DzBLBEJL7l/7Yfje0ZmR3wTo37QBt0OUJSyIJvVFrCqzX6U2n0oPZlwYG/ati8lret6FX6EFUTVdmrxRBbu3QWCUcOoOU5L16uO03KcTi6n/Zu8IfzPFmdQ+pmd00ZpMssZTtW0qpJggDYAdVDXgZbtiIm6Z5ri4zZogmYZ5DNyuwlyGf5kKOV4pQtAswWghWe90a03unCCl+dk26qWilat2tJU3TIrMDF17Fqj3tFUHXQBHJap19plp2WZdVnSDb1aKpZLxXK9BkShWKt2VcUsFcuWWW81AXw1FgtOP0RhetrLUD+PO7W/V3r3Pb+dX3CPjE4SJBtDSRSjMlk+z0lw/khWik8+9ezA4eFXX3vr6T88/8G6TbNzLhSjtIIBy7zQGeZke6U9jvavmfYnpifI2UPFKEUuOnYNDvTWa+3x4SMHtqzhMa+A+wTcZ2RIhYmoLCoQYSvHynQ0FXWnYx45Hi1lcSURyRMBicF5MsZTiMSGRdafxRcy2CJHeQU6nMNCqUgghyFyHC1kokoyIDAejg5wdKgfpRIVPgVKNTYKB3fh/4T1L7jHDrlGDkzs+xBbmtHzST2fTMWCccSXiAWJwFICCzFRv5JlS0I6HvPFvLPI0tTs8P4Nb7/snz6i5ygjT+eJAPxFYN+0j6b9u5uQcMfEldiAwPiFY8L6xxT2/QLp5Qkfh3uPM7dhwxCohWS0p8xwAu16Y729ZVB4MR5eIn1zlH8ebpTCSi80HD2tsSO4aQOf5173VCRDicBsNrZUSJNiEneKkmt2atXbbxkFLUXi6VhUIVCLRFXPbDW0kBv88Omrf0SMjSQ9oYlthxJLOD4eSc2w7JFofhSjdy3o01hmYKkRyeRno6kFLO6hZve5f/yNO8/5hxsv+tIvrjr7/su+cud3/+HqS8665d5rlqd8Gu3K+YYjcV/KPeRet2L1wsCUllKlrNHtAL3UiiflFgBFq5ZTCilBKparulM9HqUt22ydDKUwel1SqDgmy4ZatJhkpt4G9TbI5CVJ1a1ySyuVW12glcq61azUgVaqGnZL1hyn+jlN8v9PG2dQ+pmd00apXW3otmPZVVW1HKvLZUqNMqhaoF0GnTpoOkARnFKh6tj1gmZUq/VP5CiMSrUFZY8su1YoWtVau1xpwvSo2eiqSgkO6JaKliRqEK5wsRryoFJuFAumKGj1WqdeA4pcssx62WmoitlsgGLBsa0a6AJNNRy7qalGswEq5XZ/XReitOc4+HncqR+htAtiKLXo8pUrTcuu1RvdThdYdg3OHHUBaHfA/gOHff5wJIpPTs2NT8xs3vLhn/788p69B+HCTLsDdMM5mdrRX0TpCSZrMB+VpYJlVooFEyb9u7Zv2/7BOxnUncO9EhtxODaP+vJoQCSRPBoQiDCPh0QyxFOheHiRCc6LTDSPhzOxQA4PCnSQo7yp2HwqtsBR3gTiggIIUHI9R7jjyFQaXcgTgRwe5LCjweMhOMjzcZQqNCLTSBrzivGIlIjK8ShPIbhranFwr2toH4+HZDoqMtFkxMOGl4pZ2lYyfDzGRr3xmE9IYHkmmoh4tDRpCclk1Ds3tPfD1a9vXvmya2Qf1NITGSQd80DLNo7089RH4zkCHT56kfYJjP+Yxn1AZvwK41dpv0r7ZcovkT6R8HK4N495YLEayutz8RCfCAtJRExFxGRMTMb4eERgEZ6Bu60ItBSVqIhAhOHzIBBhOBjMBBdR9zTpn+fpiJFnixmKp5AM6j8BpSKJiCQiUSddhun5k/fv2whE0MzgChsWWCQe88U884vjo7NTo3wuyUSDSpwUsJAQdRewpRq+lNu14fVrfpqYmfKNTOx5byM9H6Wm0MQUiQ8glk8wXBl+GM0MhNQ5NjNNIodDIqI+f//bX//bq67+zqO3XvjMpV+55+qzf3fD+Y+e+883XnDWTa88vj4TMSJzrJGr+KdCrz33miUaTbPRrAFZdiwHaKVqyWrKRbvWBiW72stKj9onW41TcxR+RDbNZqlU07SyJJk8X+I4jRM1TlLtaoOT1DYAeUE1nWbJrBX0Sl4otAGo1EEyI7cB4ES92TmD0hPOGZR+2nPaKC1XmiXdrtU7cDw9k5F0vd4GwDAabQByOc0qt9oAcKIGHadPgdJiya5UW1ACySk3IFBNo2xb1WLBBF2QiGca9Q5MUmFdN58TYQUY1i0duyZLhUq5Uau2C5pRKTcr5YYoaI5dK2hmqwnKTkMU1HqtoyolVdH10ucuZ3+yMIwG3DE3jBosLsHHJd2R5GK7A2r1zpI7EEYw+LQkkrlEMpdM5TNZQRC1QtGCHz5O1/q77DQcuw5X6EyjYuhl06iYRoXnlGqlVdBM06hIYgEuC23bsn144IDKJXIMmiZCUhxNxzwyjQh4gEM9POblMS9sXork0QQOViCPJXYBSKA84esJIPT+Kk/4spgvHw1wsTCPhgQsLBERmYwqVEylYxAkcBcTdh8lOiiwiJAjGSpAxdymkkbd0xvfeHFhYGeZo1UqpFIhhQ7JTEBkAzzjzzKeLO3NYh6RDMFFVR4PcJhfJEMqG3U4NoUszB7aNrjtfd/4fpEKFJLRdGRRIL05dDEbW+DwJZHyipSXJ9w84c6hizzhlmifwgYUNiCzXoUNaPFgkQyUMJ8W86iYv0CFNDqs0Eft3nLxYC4RSiWDbNzPsD6K9dKMN5OKZJOxfBpTOLooxAt5VmTRHBYqJIhinFBJjIuE8khQwqIqFuPRUDHLxGNePh5Ts1Qq5hOYqMHF06gf1nglKiJREYWJqXRMIhAeDUrUcZNNPaZC+SSRQaArKnQXF8kQj/lVNkojS6UcEx4/suqPz+TiWDaJlzKMQkXZwAyfDMTjC3UuvPTYIwdvvLVLssHRqc0r3o1NeHNeNjFL5xfTqk+O7ovc8LWb77vooT0vDoguIzdvunczV379N9d+57Frzn7y/C/ec+05T/7snMfP/eLtV57z8JXn/va6Sx4UmebwPvf6d3e99fL7Tzz6JOiAVqNrGrWeY3bJhFErmf3W38e9jiAvdb3e89+2rBYsLPU+JcOfBgu8hlmB0a8Pc2LAeY6/snXoXyXOoPQzO6eN0ka9W6u2EsmsU25oJbsNQEF3soJStCoFs1xudPKSJmp6pdlVCqZT/eTxXZiN8YJaLNmmVc1kBagj2OkCWL/FMRoOHDXqHUnU6rV22anLUqHZ6IIuMHSn0waNeieZyIIuSKfyoAv0kg1BKwoqBK1tVXNZAXRBQTOajW6rCVpN8FdFacdxOvB1fuxxrVxul3SnVu9Ua22cYGfnlgRRM60q/GyhG2Xo86obZdOq2k79U6K0R9OToVRTjUa9q5ccx65LYkGWinrJ2b9vYOvGDb6lBU3M5+IYFV6SE5iZpVQmLKBeEfeImE8kgjAfgtK1eSLUXyPtqQH0v633tHjyaICLhYVYVIghIhqRiJhMopCmAhEWyaMrMdCXm6cCHIuk4xGBo9PxSGBxbM+GVbMHdzp5RqVCCu6XCK9IeAXSw1GeHOVKU4sZYiGPLUlkQGXCMhMSSD9P+CQ6KMcROjCjZVCeCc4O7Ti47T3v7ICSRevFTGxpuJhCqhIt0T6ecNsc7vAEhy/BQq5E+wTSwxNugfRItE9jQ3xkSaeRcoawkqiAenOISyIDegYT6CDPBNOkl8VcadonZmNiNpZhQyiySGHeFIvkkzEujnJsTGRxJU6KRCwV9OYjiJNJO5m0iMYkDC3n07ODe0NLE4U8UyvxcprIMxGRjaViPiWB8RQC81eFispkRCYQiUBOhlIlEdNSmJKIwYuwpcrjAYVG8qgvifkFJkrPTU19uEXLs1k2KlERCQ9yuFvhI3HBp7FLw7fdOvyz2wCdCY7O7HtvEzrpSy4SWXciNZ9IzCTffujdc/7vCy7+p6vvPP/BUrgruRtT6yNn/+21l/63+3/69cd+cemrF33pt9//wl1Xf/+xi79+72Xf/c2lZ//ytee27dkyuXPT0IYPPhwZmmg0WsWibvShtD9O9jrq1ZD6pYhO3qBpGEbtL6P0OKz+1fH2bxlnUPqZndNGabPRFUW5Uq0raqnR7JJs0rBrbQDaAAhysVLvVOqdaqPbBkBUSgXdOUVKKslFyFTdKLfagOMVSS62mgDWdWkqYRrldCpvGmUYBc3QVB0qC4Iu4PIS7KFCDbBqpZlK5tot0G4B+JW1agsufsCfJgqqY9f/WiSV374AACAASURBVCiF9WT4mbrvcb1a7dpOvaQ75UpTK5i79xxMpTnYP7bsmmFWdKPc42i58skc7UfpCTQ9BUptq6aphmlUREGTpWKzAXCM3rZp8/bNG/IpVuVSbMRfzNKFBKrGEZHwi4Qfys3DDFKkYxIb68s7Q/3v5idDqYBFRDQmohEJi4p4VCJiIhkRyUgeDfB47yccrbgKLCIk0DwbGz2wfde6ld7RQ7mIT09gKhUSMZ+Ie8SjNPXmSXeOWMriLp7wSVRYYSI9vXueCQuJaIL05dJRRaQTbHB0eOemzW+Pje/hc1hZSRWTWDbqYf1z8cB8HvUVEqjDsVBen8cDedSXR308HlCYiJbCxGQsy4QSqIeJuFKohyODGhstxVE+5K4mScClqgxeDPtKIV8Zi1RozOEShTwjpwk5gSlJophlbD5VkbJKnKwpvCNkOSIqMWRZ4gWacI0e3r/tg+F9W0cPbB/cvWlwx4bx/dtjS1P6sUpvLubn8ZBMRkQ8LOJhlY5BlH78+c+gXrgJk8V8WcwHL+Zwfx71ZTGfIad4OhIeGZzfv6vAxYtiMo8G+JhPYcNSFknnA3H34TXnnz95868Bzc3sPjK0fk/chSUXCc6TIkeiyWnm8esf+9b/+e0ffuFHv7jwXsFXlPzm2AcLZ/8/P7n9h3+47KyHrjnnycu/+fA133vslkueOfdLt5/75Vuvv/ShneunM7SephUSSzVq7U6nY5r26aK0PwG1jtt7qet6HX5vn+xR8wxKTxlnUPqZndNGKc+LlUqlXKnV6u1C0aw3uiXdEWS9UHAk1ZQ1q9EGJbMmKqVGGxTNk6IUKtpD+UCn3CCpRBcAQdRgoglz02gEb7dAo96xrSroAp6ToW9MrdoCXdBqAjgvA7ogFiWyGR4unsIdSrgVAy/CnZmyU/8rFnhP9nwaRs126pJcdMqNVhusfHcNzaQq1ZaslGAoql4oWrpRhiiFevcfj5PlpidDqV5yDL0siYViwRJ4FapEVcoN18LipnUfjA0NZBmyyKeUDJWMeHg8IEHjs6PzQVGFiUkMKrGxHix7udGpUSriUQlDJSwKUSriUYFABAKBKD32LX6O9ItMSI5HCwl8aNv6oW3rKM9s3Lcg4uEKH0+HXTIVVuijBV4oNiTRfpHyCaRfosJHkzAqBI3BhURU4ygW9ySYQEGJZ1OR8dHdO7a/d2j/xjyJZKN+lcVaGl+XcyIZyUb9WhyXqKhMx1QWUxhUpmPwjzKLyVmST0a5REzLkbaY0nNULuLD5kbtOFlAg1o4UKXQbjJex2PK4iIzNuI6sGvh8J7AxGAi6NLiuJogkog3PD++ODLAs3iOik0c3jtyYDcW8njnJ9eufDWBBfDA/OzwvqnB3a7Rg4c/XD+4YwMdXNRzjEBHOCwokggs7Yp4WItjJ4g/9KJn6NbvYAolfwUWKYkJPh7zDB44vGmtkqU1Pi4Q4XzMKxL+NL6YSrh9Bze+fNbX/L99oh5i9r+/Y2zLgBDOZFxMxsUghzyiJ7vr5a2XfPHCH37xglWPr6Qm6Qpbnd02d+4XfnTVt+7/2TmP//BLd19/wfKrvvfoN//x+su+c+9Pf3DvZefe2bIBaIKaAyp2q1pu1Go1wzBMs37C8O2p99P6YdnP0WKxWixWofx172tMs34Gpad+/zmD0s/qnH6Bt9kuVyuqVixXGlrBtKyGYTSaTaBIzv/P3ntGuW2m+Z6f9uyH/XD3zszu3dk7O6mnu6eD3e7g0O2cs2U5tKOcu223Yzu1c7YsW5aVY0mqUuXMUIzFIisxgwkkAgMIECTAABIAAeZQxH54pRq1bfVY93jGvvfoPc+pQ7NKJR8dAD8+6f8HezLdrpJM5tJprtNV/sK1W290e4qiUusNxgWdfn5oeAIYyKx1lbWuwmTyolAByDx44Ej/0aFatSUKlY8+/GRocAzkppMTs0ODY63mWpETm42u0lMs84u7d+3nCkK3o2jU+qNHBstitdNWBvqHR0cmux2lLNa+ayjlOLlaawOU9hTlnXc/CsFYo7kG8lFeqIBYN8r4yyj9Mk1PhdJqpSVLDb4kl8VaLltKUazAV0ShUuL4pQXLZx9/qJue4Bkqn8SpsDfht+ewwLomUQ4LZKNBECdz9GSangql2Yg/GwkCiLJhHxv2ZcJQJgyd8OD0glQyjXnZmD8fD2qP7g9b9Cmfg4W9MhUtYEECWpVS0XXJ3ELMV4gG1sWGmMhxNfn1ADJ+dMiZRSGQa8o03swloy7rdN9uyKxPwQExlczHMCrkZ7GIlKaahSwdDmZxhEtEi0SsEMcZNJyCA6mANxvxs7A37XcnvatJ92o66ObjSI0hmrnU4uzo4M5PnfqZCpMU6ajDoBrZ89nyzKht7Jhx6LBp+MjCxKB1etg8OaQb6x87smfy2AHdzMiCSWWcm5ydGrSYNHDAUS2mizSeDLlKFNbgaM/CnG70SDLoBO7fOSyQwwIs4suEvSziy+PBU6EUlHbXJRrA62TQzkaDmVgw7FvKkhFs1Tp1aHchhSPQCoP5M7CLCTlSwcVc3GU79NkHP/4p/saW2OSC+uCMa3Y15SIQo59aiQZVzsxyjFmJT20dnN4+krAhiClAOuLWYeML9/3pN/982w3nPvOb72+68mePXfvLJ676xSO/vfqPV/zy3ofufFlpKWs1pSKuSUKjUCjW63VBEE4XpYCUJ8vtgvdPwufJcQal/87z5wxKv6lz2igFyWi7o2SzQrerZBm5VVdqsoLBrF7rYNO1QrYhl3u9nkJRhUrllL1S4Kq29bOdtkX79IzWtmgfG58pS3WNWq9R67mCEIsmlZ7y+bZdS4t2DI33Hx0Cvt9gDab/6JDH7TcaLGaTtdVcq1VbapVuZdnpg0JHDh9btK0m4tTBA0eSBL1n94FQEBkeGqfITCxKflso/VJpF7xu83yt3uiC7LzdUd59b7M/EAGZulxpgjKvJDfkSrNSbVWqLSBz/+X4SppWa61ToZQvyXxJFoWqLDUEvpJJ5ymSyaRz3fZaIZffs2P7559s9tmXc2RMZEgi6Dph6gm0CwLrcSot2a9EKQW72bDvBEcDbNgHUlIm4jux4OFNI54U4qZRDxP1cbHgwki/9dgRKRpZK6QpnyMT9nJJJIX5KBRKYb405s3gENiYzKL+LArRqIdCPRTqASs368s2lH+1gPoKYW/Gu1oMedpUtBaPpD32mb79utEhv9XK4kiJIHCPc0mt1gwNRN1uIgCxKFpIRIuJBEfEiokEl4j2RI6Lhb0W3dzwkanDe2ePHdSO9xumh1bnNRMD+wf7dhrVo0sLGoN2bE4zsjqvqdFxOYZkfE6/WWudHLJOD3utetxvx/x2zeTA7OQxNOxh6CgccGBYoFXnmUSYQiHMs8TggRKF2Y2zpsljDOZHnNY0AvEEkseDgKM5LLA+wfvlfRgAzmTQDgq8ZMhBR9zZeCAasGcSoYh/WeaohM8xvPfzYjoWgZboiDuP+XKws4R55IRf/8m72399UerT/aat/T6dN7GCY/Mhz/RK1pmMmfyozgOrHaw9Vg6xMRscW4p45xwu9crC+PIv//767//11df96vHbLnv+9iueu+HC3//k76487yc3w+6MVFBaNaVZUwS+0my2q9VqLpf7H7sf11fDwczByXHy4viZAu+/F2dQ+o2d00ZpKBJvdhRJ6jQbCs+tKR1lXhd44pG3X3hyyxUX3f3ko+989M5Br4NQugqZKHVayhc1qU8E4ETf4WMg3+opyuaPP5tV6SBvMJPOPf/cS6CWOzQ4pvSU2Rnt1KRqoH9YN2d64/V3RKFyz92b0nR2ecnx2zvvFYWK0lN27dznckKt5trn23a98/YHAi9XK82hwbFX//QmyxRi0eRDDz6WZYvfFkq/NHDUWp/prdbaglgFuok7d+0PR6KgS3rcYep4i7TTaK41W72/gNKvpukpUFrkylxBLHJlMMTLl2SW4YqcKIlyRZK9TtfRAwemho5FAz6BTaXQYBqHGTzI4IEviBh8QUL9K0dgvoTS43GCo/+2KJlGfamIl4TdVNiTRn15PBgyalfHhsJmHe13iiTG4IGA08JSkQTqSaCeJOql0OMbJkzERyNQHHfjUTeGu2K4OxH1ULg3hXnTiCeP+7NhTyHkKYY8Wc8qvWIV/O4OlaD8Hv3k8NSRQ4u6WadJPzVwaGjvLvVI/9SRQ5P9B2cHjkwf61MP9mvHjs1PT8zPTY1NHD06fGBotM9gnvUF7aGI27akn5w+NjHRb7PpwkGn12WbmTw22L9vddEgZpNx1xILu8VEWE5hIokVEuFcHM4SYYEl0IDds2JCYWc2HcumY2QcTiC+dDSYi8Np1JdPhIUUDq/OGycGrKpRy8xw3LfKUxiLB8iQC0j1nhif/sKmqZ/B/LlYqJhEhBReSITjvtWw3UIEHFwSwYN2loowKYRjop6FuZED27k0TscCSdghEOFsyCGhXtFvH37uqb7rN3CHxmbe30u6EokVHDEFwnoPY4/FzQFU6yYtMLuaoBax5HJUxEpSTMrB+UyoNLbXuumW1678xQP/+rdX/M3/9tN//JsLHr37VTxQUNpKLlPtNBSeq/Alqdls53I5hmFO935cHzv6cn/05CmkE5TtnEHpX4wzKP3GzmkLB3YVhSC5Qr7Z6ypMqvPaC7uvuejhq3/98OXnbrpvw5+uu+ixH/zdpY9veifoYSu8wnNrkvTViSlQDdy5az+GEz1FWespH3706WO/+4PD7kGR2GdbdxQ5sciJa11lZlozNDhWr7VTFINEopEwPjOtef65l0Bb9Prrbi5yYqlYHhocy+dKvTXlwP7Dzz37olSudTvKc8+++NijTwCJ/O//y48S8dR3DaW12lpZqpd4Wa40BbE6NDyRIOhKtQU80mv1zhfiL6P0y03TU6G03VIqcpMriGk6VypKstQoFaVGvZuhs1kmt9bsulbth/ftW7WYCQRmElgKD9NYiMYDGcyf+R9HqTMT9jIwxMAQ4CiLHF+XBEEjEAm7kyFXMuRKRbwM5seX5pfHh/DVBRKyR6GVTCKUxKEUEYpinijmITAviUEpzJdBj/8qAnPHMFcUdcYwVxL3kJiHQj0k4ibDTo6ASwmYDjoo/2oegQqojwrYadxPxwJExOte0k8PHRrq2zGvGceDdiLiRf0r0Ip5yTQzrxmf144tGWdXF3W2Fd2S0+QJrqIJP8XGmHycSuOJZCgWCyaTMBELhUN2OOBIxPx0EqGjwWo2UcD9Ce9S3LNIR7y5OJyOBhIRdyLsycRhjo5mkwgBQxjkiAXcKczPRoMMHsA8S5hnqZyOtYppBvMHl00TfbsijgXQMSUCjnwcLiYR4GP6lSgF5uHA9NQw3j+w65OJvl02zbhYSGaoCEOGfc5548yQYXqwmImmov4k7JBpPO1d4n2OjGFu9113Dd5+jzCqnd2yP+mM+rUOchnNu5OEJYRoXLQNI0xhdC4QNSISIm97Yfd7T2597+ltfZ/OZiLN4QO2TRtffuWpbUd3z6nH7OlYVeYVie+1akq3pSTjdLPRrVbr5XJZUU57or5a7clyVxCaHFfN5+VcTsrn5Xxe5rgqx1WLxRrYkDlR/jmTlf7lOIPSb+ycNkprDSWCMmsdpV1XPnp74F/+9sq7b3xtwyUvbLzslYc2fHTxWQ+89fzRs7934y3XPqm0FDpZlaSvdoYRxGqz1TvUN/D+B1vUGsNbb39QLElHjg5t/XT71k+3f7JlG5PJKz1l22c7d+/af2xghGUKg8dGIW9w395DRoPlky3bQkHk9dfedtg98Rjpcfsdds/Q4Jhqdk43Z9r66XYfFNq1c18kjL//3uZMOrdj+56B/uFMOv9d65Xm82Uwu9tdU+AwbjRZ8WiypyiN5lql2gL3PyBro7nWaK41ml3ASIBPYAwO2qKAo2AHplZvA/HeWrUN2qLrKAVRKkqiUJXKdalcF/gKSFILeSGfLbKZbEWqClxxamz88L59OAyX89ksmRDYVDaJldKxIomSsJsMOXIxH7D/BBAFwj3ZqL+YDJMhx/oOBhgoBR6lqaALTC1FVuZLiQgZcgEpHyLoTKO+XDwc9zuSES+JQCGnlUuimMO6ohr3mNRU2EOhEBJYiSLudCpCU+F4FIojTgJxEWEnGXLksIBEoTwWKKLebNjFRlxZzMNgnjTmTmJOIuaORZ1YzBlNemK0DyU9PnTJGTCjmD0Zd9GkP5X0xnEnAtvggBUOWJJxTyblZ+hQKumlCIgmIYqAEqgDzOKy0VAK85EIlES9SQQiMYjC/EkcSmK+JA5RiVCaDFOJUAL1MFFfNgpl4wEm6iPCTjy4koi40/EghfsoFKLCXjLoTgXddMCdDnoyIW/CuwJ0d1NhDxlypcIekF/6Fw2WmeEmR2dQXyLgKBCRXBymwh4WC+ZjYcLvLMQjuSicjvjquRSDBjolNuFz6Ef7pw7vXdXNRD0rnvm5ySN7q3wmgfusuqnpoUNW/WQ87GKIIIm482SYgp2FkKcR9Mvz1vcvu2rsgd/VTEvOQfXYjoG5AxMrI0Z6BcH0XtISYW0xXAuTFoJcoF+/78PfXvjEtWfdf+4/3Lrhkqd+f9fbM0MOIiInwqLSUjp1pS4pnYZSLnXKQqssNqRyXSrXZLkqyVW50hCE+ldN3nbXF0ZPXn1Zf8HzjVxOoqgCQWQJIkuS+UyGp+liKsUxjMBx1XWUlkpVSW6A1TLQJZHkBi9U1vdNAWXlSlMs14ol6dt+IPxnP3/OoPSbOqeHUlFaK5W7TK5ZqShKW/nJ927aeOVLD9/68e2XvnnLb1576KZPfvH39/zxoX03XfrMT//pxmigorSUU5msAZnpBeuKZWGZYTnbor3RXEPQeJbl5s221RUXENo1GRdCQSQeIzPpHIbGA/6wRq1XekoiTvmg0MEDR4CnKZlMR3HCaLB43P4UxUTCuA8KOewelilEcWLRtjqnNaJIrLf2re2VnupSzmaFWr1T4EQ2Wzxw8Gg0RuLRZDqTF8s1sFEqlmvrSWq11pYrjbJUk+Q60BGU5DpAKbBBrdZaZalWlmoArpJcB7A8GaIgMS1yZYGvrE/zApRyBbEsVLg8X5HqjVpz0brUt/+Abd6Cw/Dc7NTEsaPTI/0rZi2bgHkaFWmEDK3m40EAUQaDgLR6KuyK+5aBMgDIVjMnuV4DhaM8Hkx4V3gKA/LxZMiVRn1p1Bf3OyJOWwrzl9IxGg/EQ64Gl7YbZ42Tx6IBe4HGkqgXhhYD7gUS86SiUIGKVPPxChvlor6Ub5l0W7PQSgl2SphfwiAu7M6GVrNhVx5zZzEPjdjJsJ1GHUzCl6X8LBlgY55mGlnLIEoWV/IxpRBXctG1DNJOwUouqnAJpRDvMWiHDvcYtMegaxSiJHElHlWiWBeLNJCQFPYLMMTBXj4W4qKBXCxQSMJ5MswQQTLqJRAXEVpJI65sPJAlQnkynE9FsmSEIWAa96dRXzriy4QhNgTlglA+COWDEB1wAWM1OuKlYHcq7GHxQD4Ou+c1utEjDObnKYzBA1wSySfCadSXj4WpkCeD+OUMgToXZ/sP2PWzWTxknhyyzo6tzE0HFk10GMrioeCSWT3Up57on1MNm1WjS4aZsHeRIUO5JEyEnSTmifmXCyFPGw5WtKb3Lrhy4vfPNVa8iG7RpbIuDs/Zx42JeX/CFCAMQdaWQKYDudWCezj0s/9y2cX/+Ns7LnzphnOfv+xnj55/1m27PhsXC0qjojQrSjHfaVaViqSUhZZUboKrEdBUkuuS3JDl9smbLV/Yh/kySsEPl0p1lhVJMp9IsMlkjqIKFFVIJnPJZI6mi/m8LIotWe5WKp1qtStXmiVeZlhuXeoEgPMLKAXTCd/2A+E/+/lzBqXf1DltlApyr9ZUmk3FpEV++k83PXz7lvuv++jan79w12Uf3nL+G49v3HnZTx+/57o3z/vRnYd3mnvNU6K0u6aEYKynKGArRq40y1K9pyjNRhd4vwA3TdAxrcgN8LVR79SqLZYpMJl8t6OA77ZbPbA8Cnw3a9UWYG291ga7pwF/WBQqnbbCl+TvGkolqQUUKnqK8tHmrZAPBou2XLFcLEkApeDml46vmVZKvCSIFbnSqFSb6+BcB6ogVnhBBu8LYkXgKwJfAUNGYAFmfa8UJKaiUOVLcqkoFblyqShVpWaOKWZSuVajSyXTw4Nje3bt3bt7j0Gr2fLBu3s/3zJ0aLdZNaIZORj3LYo0AsZbiMAqBTuBah0dcYNUFWjpnazekAq7mIgnDbs4AgazMHHfchr1xf32uN9BBF3paFDKkfkkjvuccdiLBxx0PORZMa2Y1Z4lo3/VjHuXs1F/mULzmJcOLCXc85RngfEv5kIrfMQpRr0FzJXDnDnEWUScMgb1yIiSoxQ+qxBRBfZ3FhcljYYbGU8fPprYvT+6bafjtddWX35x6YXnF//4nO35Z81PPal6+MHxe++efuB+zaMP6x//nekPT9ief9b9+qvwB+8hmzcnPt3B7umrjU4rZpvi8SkIqsRjChlXUvEm5ucCqxn/EumzxXwLZHgll4DyUahMhkUqnEHdRGgliThIxJ2AHTTuz2D+LOrPowEuHODhAB/0F4O+AhpgER/QaDwur4hAGdQXWjGrBw+uGmYEOprB/DQCAfWGLB4SqGiFSUbsVsPYgGFswDo7Bi3oF2ZGA4smKuTJReEigRYJlA5DiGtROzVkt+oTAWcGCzAEzFJwCvOiPmscsaM+Kwd7lUhEGp9792eXzP7xtZoXppb9GSjm1y5bj6kxvZu0wIQukLMRzALlHfYPvTPzi/96ze3n//GCf3zggu89du+N71/w89u3fnxUFpV2S+G5TiFf73WVbLZ88swEqLWUpXq53PxKoaKvRKkkdWS5W632JKnDcdV0ukQQ2XicSSZzqRRHknmCyCYSLMhQOa4qCM1yucnztWJJYrPFJJmhUmy+IEhyo1prn1zsBa8r1Vat/q0/EP6znz9nUPpNndNEqdzhhJYoK9WagobKF5x19yVnPXrNL5578tY9m678dOMFbz583Sd3XfHWFec8cuvlT+/4cFIunRKljeYalWJr9U690ZUrzWiMbHeUVluxzC96PYGR4QmXE6rX2oPHRl968dUsy5HJ9P59fRPjM/VaG+yMetz+gf7hz7ftAu7WkxOzhw4ebdQ7Fblx9MigXmeuyI21rtJsdMtitVQsVytNqVz/rqG0UulkmIJYrk1OqeEwLleauTz/hQLU+mJMiZfFcpUXZEGsSHJdrjTEclUsV0/OTXlB5gVZLFeB4zGAJQAqCEDTQl4oFaV10JaKUqko8SW5kOULWT6VZBr1brulBPyRebPNZlsK+Pyff/rx8oKJSaKpqP/wrs2LcyNCKgI06jgCZnEfcC6jI+5cLADACYq66/oARGA1FXSQ/lWOgBkMCtvNmNuaT4QZPEDCHhrxeZeMcxMD40f2exfN5VwqHoHSFLZo1VgN00TYI2XiEonziD8PrcqIVwzaeWhRCq42cXcv7luLQR3coxRIhYi0Aw5xyUSrxqE929Uv//HIpvsG7r9v4Ld3Hbll46Hrbuq76obDV15/6NJr9l90+cStt41tvHXq9ttm775Ld/99c5vun7vv3tm775q5847Zu+9S333X1J13TN62cfy2jdN33D57513jG24fuuHWQ1ffsP/q6/tu2jB8/ybNM08bXnsF2rMdHT4iO61KgVKqeYWNSoizGFjK+5aFiLeEQdmwK495OSKYwSHUY6URKIP6cliggAWLkWAxfBylRTzERCA6dDx9T8Me4A+Ti4XMU4OqwYNcEiGCTty7TKFQnkQw1xIdhgi/c+rwXvPkkEBFCb9zVTfDoIFSEhOoaC4K02GIxYKlJCam46kYXMoQtSwlpHA6FiAwNxVxJOFVioCi8HIR8SloVO5XffizKwzvfVL2I1EblAtS6Dyk2jEYN/uSxkDaGM5bY5l5grGx1oOOi/9h4yXfv//qc5665lcvXHj2o1dcvGnfnglRUKSyIvAdnm+12wrL8mDMUK40JakFFmDWkfmFBRhAVkForo+7S3+OUlFsgepuIsGuo3SdpqDem06XcjmpUJASiUyKzjIsx2aLBU4EH0zBqCMQQgHjfuCdM1npl84ZlH7dc7oobeVK5WpLSTMVpaP87X/51b03vPH4bds2XvDaQ1dvufkXL1/14yefvWv73de+9P/+H79IhGQxd0qUJggapGLDI5M6/Xy90S1wYrXW/mzrjpVlJ4rElJ6yZ/cBj9tPkRndnGlocMzrCeh1Zr3OXK+1i5y4/fPdoMyrmp0bGZ6AvEG3y2c2Waen1H4frFHr5822dqvHZPJrXQV4in0HUVqv9xiW6ynKy6+8ASawfP4ww3Kg3FSW6gCi4FaX5AYo8IJM9OQc9OSsFIBWkuuCWAEzR6DAezJQwfguyFbXU1K+JBeyYqepcAWJK0iiUE8QdIYpdNoKy7K7dm63mfUkHizQ2NzEEY9VJaQRgNJiMlxIhIACAGAnqPpSsBMkpqBdGvctk6HVqNeaCjtyMV8iuMrG/IANxpnho3u26iaGCBiy6mb2bP1QPz2WS0UZOqpVjWomB6iQR4yGycX5jM3UDnoazmXF71SwgEJGlIS/6TEnpg/7dm1efuppy10Pjlx148HfXHbokivHbtqoe+Bhy5NPmf7wh4Xnn1998/XgJx9H9++mBvqYkYHMWH+0f19ipC89McDMDudmR7Lq0aJ2oqifKs1N8sYZyaQqGaazM8Px4UPR/n3R/n1o347I/m3Q9o+WP3pD/9pzE888OvjovYc33bHztus/vu7Sj6+95MDdG3QvPYXt26Ys6JRERCEwJYHUwr6se4n1LpcwqBgPsbiPirho1HPcKA31ZyO+bBhiYW8eDaSDbsrnyIQ8gKmpsCeD+gQ6uqidmBs9UiTRBOyKBuwpzMcmYOvstGBWQAAAIABJREFUmGbwiHF8aH5qlApBLY5NwT4Wg9ORQAYJZpAgHfanI4EsHs5FI2w0zCSQHIEVojAdckdDjjjizEYhjgwxdCiO2LkIpCC43De98zc3ew4N5v1IyOQkVrGYDR79+CC7guEaZ3YBYcwIaYAFZ949Cj145dM/+Zsrrj33d1ed9+Q//N9XXnvVgzOzS82WIkpKo6UUSrVCqcKXa2CVS5bbsgxanl0QXwYqiC+gVDrJZpjnG9lsOZXiQEWXJPMUVSDJPPhPgFKaLrKsmM+XMYykUmyBE9dFTspSnSuWgf5JiZcr1Va11gafVs+MHX3pnEHp1z2njdK2orDFYrnSbdaUt17ce94Pbr/ritdv/Pmzmy57984LXr33ktcevO7Nq3+56dJzNioVhWfbcvmrJ3jbHUWSG4f6BhrNtcefeMYLhYDn2huvv+NyQmOjUxgaf/qp55lMnk6xxwZGnnzimVq1BXmDn37yeaetNOqdJ594Jk1nux3l/fc2v/Tiq3xJqlaaO3fsfenFV4ucyGTyO3fsZTJ5gZcLeR4oC34Hx46aTYUrluEwbnd4nS4flWJBuRvoBQpitcTLoMxbrbUbzbVqrQUwCUQYQJJ6MlxBngrKv5JcBxO8UrkOUArYyZfkdXaWihLokoJ3uFy5UV1L0wUmUwQKEqVSVZLrAwODn3zycdDnyqZjlWIq5DLpJw5OD+xYmD02P33Mph4JLhsyqJenkHw8CGaO1tUbQLuUgp1EYDUbhZLBFcxtYXFvBoc4MhxYNqmHDs0MHYJdtnwS100M7dn6oWFm1LNk8awsjIz0aWZHvMvzcdcyuWwtu50KjinxqOJxdYw64uBOy6vPDT161557rv9042WfXvPrsZtvtj/4u+Tr7xS3bi/t2F3avZc/3CcPD5YnRsqqiYpRVVuYqy7pBZu2YJllTFOMdTa/rC2uGvPL2vT8LGkcJw2TKfNkaPxwVDPIWjWi2yy6LNyqrrhqFN3mnG1atGtaAYsSWer45sWFKXLiINq3LTt1JHrgs+V3XlQ9+eDopjsG77l18O4N/XffBu/bxRl1Co4qRFT0OamVecbvKFNoKuxKRlwk4qVQiEIhGoFoBKIj3mzEl/I7U34nG4aYCJQKHp88wr3L+vH+VcNMPhFORjwUCsVDzpBzYbr/oHlyxG8zk0GvmErQYX941VamiXQkQAa9yYCHDvtz0UghjjJoiAh6koifRgJsCGJgL4lBVAwCLnIU6YtFVnMhr+IPC7vGjlx1Lzm3kAmgkYVA2BxETAH1jpGim4hqnKwlmDL4KL0fVbkj2mDYiH3wzM5bLnn0tmue/fjdwf17ZxKE0GwraUbq9hRRbuU4SZDqx7PS453RNancAyHLPelEaReIFhWLtfVB3C+jFMwc5fMyy4oMI2QyfDpdounietOUpouZDJ/LScViTRQbDFMqlqT11TIwylcsSXQ6R1IMKAjV6h3wsbVaO6U0xP+icQal39g5XZQ2GkorGIO7ilKRekpL+eF/u+QH/+flr2zad+1Pfv/c7dtuO//pB659+fv/9TzEkU4hXEPsyafYK0WxRE9RXG7/n1596+Mt20Iw1mz1qrU25A0KvIxEonNa44cfbGnUO1K5dmD/4Uce/n2j3olFkwcPHOFLUm9NefKJZ7Isp/SUt95876UXX20110Ai+8TjT3MFgWUK+/f1gR4qEokCd+tmY+27htJisVJvdB959IlAEGl3lHgiBT5B5wsCVywDjhZLEi9UgK4FgOX6YNF6gffkTFQsVyvVZrXWkiv/Nrh7MkcFvgI4ClBayAuFvABoSpO5PCukyIJc7nQ6SlGoFYVaSaweOTqoVqsFLkcTWAx24oFFu2k8sKKdn+5XHds3dWTX/PQxzG0tJELFZJjFfVHvIij2rrtykiFHMmjPoO5CIhD3LWZQNxGyJ4Kr+vH+kQPb4yEXEfbkSFw/PbIwN52JR3RTo0f37+zv329fNrFxRI5jCkUq+ZyyvLL6xttHb71171VXvv/zs1770T9vuehns7+/C931Xn7qYHxkf1o7LC1paw6jvKITbGrBpi6vzMl2fdmhF+06fkWbt86kTeOUbjg5N5KYGyMME6l5VXpBxdjm2EVtdkmfW9bZj+72jR6MzY1nrOrUvCo2NxrVjiVN43n7bGZxjDANRLV9cU1fyngsbxsvr86Wl2cqq6qydZJVHyWGd/v2fDD7yu9233XT8z87a/9dd0f271eCPoUmO9FwMeTKRdx0xJ1E3QnUE0M9ccybwCEi6qNwXw4LMCEPA3uBWw4VcNIRbzGJLGonpvv3RQN2EvESYXeWCCO+ZbNqxDAxlMXDhTiajgRy0UjC54p67HTYXyRwFoNTsG89JWXQUCriZ2JoFg/zKFyKwul4MIl7aNieDK7Eos4oas+FvB2nL7O5r/+a+wvLnjgUjq7gkMZnH192jCxkl3DKBFEGd8roiWtWs8uRrCtWiYvIUmzXh0cP7pgSi0qB61UbilxTYslCuaqUax251uV4+bjzqAwSzZ4sKbKkVGRFktZO5ijHVQuFSqFQWXd9ORml1WrvZFsY8EfyeZlhhPWi7vpKjCR1arW1cvm4tsl6RRfMHOXyfJLMJMkMVywfHziSG2dQ+qVzBqVf95w2SrEk1lHaGZYp5MtirtvglPtvevHs/37dr793231Xv3jl2ff8/B+vevv5T3uyInOtTk05lfV3o7kmiNXX33g3RWfvu//hcCSaorM9RTly+BgQ4L3v3ge3fPxZPldqt3qHDh59YNMjXEEAbVTgtbnx1juB8P2773z44guvlorlVrO3a+e+Jx5/psiJiXiq/+gQisRr1ZYsNXprSpYtfovOMKe6lHm+FoKxzR9/hkeTYrkGVmIyTIHNFvMFAaCUK5YLnAjIut4r/cLYUYmX1vujglg5gdImsEMvFSsg1oePwAuBrxRLUj5fzuXEfL7MFUSek1r1tXajV6u2IW9o8NjovNlGkqm9u/cYtCqRyxbScQr35chgxGWUWbReiLG4N7Sid5qmIKsW99joiDcbDQaWjKjLRgSdqYiXCnviIXssuJoIrobt5jKFArMwxGmNOBasqlHIqkuGXCTsrnIp9ejhg9s/0owd6d+7NRFwlClUwIP1GFyHIWx0cObFP3524/V/+tk5n1x88dDtty0+/zS65X328G55erCqHeW0IxmrGreosHkVtTJfCnpkNCgEvaxrkV4yppb0qQU1aZoi9KOUfiRjGmfN07lFfXpBQ5nVqXkVbdHSFjVhmIlqx4ITA6hqmLZoObs5t2wiTTNJ4yxj08SNQ4R5iLZNsksz2WVVdnE2Y52kLaOEro+1DhUWR3PWYcE+XYP07PyY/8j2uddf/OCaK58+52dHfv8op9coyaiChwXPMoO44rgzhrliqCeGehI4lIwF6GgwH4dziD+PBkqJSA4LEAEHHfGWKMyqHleNHBaYRAJ2E2GPwCTwgEM3ecy/NC+lk6hzGV6xsBicgr0MGkhHfAmfg/A7yaA7HfFlED8dhqiQhwpByaAvGYBSkDPlc8SCjhjsTCFONgZhETuJQXnEX7c7Ym9t6btyI+fwh1b9uD1qn3Fp9qsjen/MGGSWcVztoOeD7CIS1tiPvLunf8th3JE4tndq+PBcp6kUuG6Oa7W7Sr7UYPMSm5daXaUkVgWpKcrH0SjLvYqsVGSlWlFKpePyuSBASrqelUonqQOuoxREpbJWqymy3C2V6rmcxLJioVARhKZ0orFaqazV6wrwhaxWu2Ba+OTXGaaQTLK5PF8uN8VyTRDqJxkMd77e1//Z4wxKv7FzmnulcqPbW0sk44JQVnoKl62Vi0q1pLgX459/NPjGC9t2bBkIOBNyqV3MS8WC0O325FOsRbc7Sq3eGRmdUqn1yyuuoeGJnqJUqq2pSXXfoYHDfccwNCHwlWMDo9s/38OX5Cie3P75nmMDo0WurJszC3xloH9ErdJ/9OGnkXCUSGT27zu8a+dBDE0k4um+QwM7tu+nU9ksy0vlerejFLlyo96Tv3M3QKvZVBIEvXvPwaVlZ74gVKotkmJKvAyy0vX5I16oFEsSmJv4yvi3qciT4/h8R4fnG+AjP8fJRU4ucnK53KSoHMOUikKNzUscXy9X17KFMpcvBiHf2NDw0oJlcnRk387P9eqZD954dbhvH7RiyZNoLg6nEU8hEeCTARZ1pHGHyIRpzL6oHTROHPYv6EKLJuv0iGqgb0E14Vsx4wFHEvMRUR8asYe8NsLrrKWSSY876lju5JlsxK/tPzDbtycTdmcxDw3bAzaVZfbIin6YRlYVnmi4zJ7P3x158oF99274+MbL9tx5k+7lZ1c2v82MDeamx4vqaUGnFk163qTLaWfJ6SlCpcvb3ITBYdk3vvnRN5645sF3HnzlwBvbEMOSGEJTtgXSqM5atJRmmJkbYXTj7LyGMqtTZi1j02cW9HHdVGhi0Dd6hJ6foy1aen4uNa9JmbWUWU2ZNKRJldCPE4YJQj9L6jWU3pA26DMmbcY8lVueJIyHkuaD7NIQuzTKLE5nrGrCMMUsqoIjey3b3t3zwB0vnv+zsU33KhNTSjgkkr5owhlH7FwKScCuoGOBgCEuiadgL+l3pIIuCnYzaEBMx7Mx2DWvHTu0R8qmkmEfHnAxCQT1Ofx268ihPWKaiEP2hM+RQX0p2JuPwyUSTfjtqTCYV3KfLCuYRiAq5KdC/jTsyYTddNhPhX0JxJ5A7NlYhA76ab+zE3K5Xnxi/K7bM1ZvcAlNhTMei/fg5oNinGcguhaTKVsiuZCIaOFX7nl1w3l3bLjwrref//SlP3ygdJRSoScKXV7siGKnJDbX08dSqfqlK38NxFcK8P4FDd7TDaDE++WvotgqlYBDeJFlxWKxIsvdZvOEOtvX/Pqde56c9vPnDEq/qXP6cvatTiaTEXi51exx+Uqtoihdhec6Zb7Hpiv5bLXTUpSeIkv1QqHA8yLYHvty8EKlUm0lCDpB0FyxHI2R3TUlXxDIZAaJxIIBpCzWlJ4Ch7CVZVenrbRbisvpwzGiXutgaELpKVE8SZGM0+Evi416bS0SjgcDWFlsyFIrEo4H/KjSU8pioyw2mg0llxVkqSXwtW/72v3iv2exWOGFSjRGHjk6hKDxeCIFRgrBqNGfbbydmNr/ylifkPyzkNuStFYW1wShXSo1j3/k5+QiJ+dyYjYrlMSmVF0rlGrprJgr1gWpqZqZHTzad2DPzt2ff3po97Ylswb1OYwzw/4lI416SmSExb2ZiJOLQ2IyWIh5sjGnyITKbISNumOQDV4yLc6OTfbtg1cWbeoZ/eSw02pIETBfJNksRsT9sHu5RCezCTwXw3oiV4xHlmdGLcOHGd9K2rWQ9y52EiGFwcXAou3QZwefun//ndfuvO7XfbdfrX3uQcfmP+GHP+c0o5JVm1ZPpOdmMgZNxjCXNujTBn1Kpyc1hooLsx9QffzAmw9f+NB1399w8d9de82Pb9943j0PXv3AyqieD0Qi6tmEdjprnImPHxGtOnZ+jjJpUmZt2qKj5+cSuhlcPRHVTKYtOvAOPT+XMmtBUGY1bVbRZg1tMqQMprR+Ia2fp/UG2qDKLs3E9X0xw4GcfTy7qsK0o6hWzdoXqRVtanmaNo6lpo86Pnrj4HVXTV1zQ/yTLa10KJX2Yv6FGGRj8IBAxwoEhrlWeBJPBp3JoDOD+lIRiEZ8XqvxyI5PEc9qMRWnMDgR9relEuxePbTzM9eCQaATKdibQX35OEzB7jQCger68S1e4FWHeRjMk0HdGdSXDgVScAB8NwMH6XAwhjkSqCNks/F4LI/4M7bZ+T/cPr3p1g6SpeHSqt731vMf3nTxHX969O0NF9y57aU9YV20gnbUu0w//78uvP7nd97063v+6W/O/uzDPoaq8RyYJzrZfPs4UE91C/xHo/QrHdyOO43zjWKxBgrCgtCU5W6ttnYqodP/RdWRzqD0GzunjdJ6rS3wsizVZalRyMki3243lWZdEflOvao060pVXpOlRrXSrFaap0pJpRMasz1FKZYkudJstnqVaqtYktotpVHvikK1WmmtdRWpXC/khVq13VtTBL7SbilAMHatq3TaSr3WqdfWGvVeq6l02kqrqdSq3Vq126j3ymJD6SmFfJkrSLVqt5Avy1KrLH7XLv2WJLVabaWnKJ9v3xMIIgzLddcUkIOCvdKTbWHAZMRpRBUUx9ZEsSMI7ZMraYJQP17U5atFoVaSGqVyK1sQDh3cPzE8EPZ7bEaNe9nSKheKqXiRjhZJlKcQngjno1ABh/iEX0j4i3FvIe5icHsu7uFToUIiEPetwiuW0KpFYkgy4l/QTA0d2q2bGowj7nwaicYgmPB5UJfaMnOwf+fnn737+Yevzx3bXwy5ZL9LSWAKHmHGRscefeT9C3+99dJLB++6w/LyU+7Nr+IHPslNH20v6ZorhqJ5ljVMZ4yzGZOGNmmTBk1cq45r1Um9PmW2sTZ417Ofbjxr49X/suHGsx686eePXXP2Q5f/+LdXn7Px6rOu1B0a4XyByMwkZVRl51WEeoS16gE10xYdaVTHtFMJ3Qw9P7f+5jpQQZ7KLKhZi4oxz6UNelpnTM0ZSK2GnJtmbapacKFg10TnhkizJm2xRVVWRGVEdVP00kzZbmzajTXDDLZ189y99+++/hpo6nAGW5XocNxrJUOuEoXnEyjmWRWoaAxaAf3RRMCJe1cgm2Hs0C7z7Pj4kf0Y5CiQ0SWjdma4H1qxtsUCEfTEIXsG9eVioTQCsXgA9KpPjH0d5+gJmnozsD8dCQDEspFgOhJIRF0E5qT8/rQvwKGhotOge+zmoduvU2KlxdnQgxtevPHCh87//s0X/+DWc/7b5Tf/YtNLd75nPeotBpuPXv/8L//+0rP//tcP3fGHwb4ZpavksxVwYa8T8d/1H/2PRuk6zr8QJ+srfeF+PIPSk84ZlH7dc9ooFYVqrdquVduy1CiLjSInF3KyUGpw+UpF6taqXb5U5QqSVK7Xqu2K3DzVJVittXmhAjLRfEGo1TtAh1Yq18HEKRgrrVXb9VoHDMXUqu1GvcsVxIrcFPhKvdYBcAXtwHYLOJhWi5xcr63xpWq9tpZJc+BbolCvyO3vYIFXFBuVaqvVVsbGZyAf3Gz12GyRFyqgPwpapGDsCKSkp6Lml9V6a/VOrQa8MnrlclcUO+sFN55vyHI7neY4Ti4WKySdrzZ67TUFxeKHD+xdsejX6mUxS3F0XMqRYfdiORPnKSQf9xdiPoEMShQsJP3FqIfD3TzhzYSX6NBSFnNlo1Aa8+bisJQjcZ8zjcNpHA45rTbd5IJq1KoZMWqG5uYnB2cOT2kHl1d0ziWtwzidWDW38EDFuby05ePPbrhxy8WXax/5XeqT7eW9h3O79pYmjjVtWsk8ndWOCAuagmUWnzmGzgxRZjVp1iTndYR5DtepUe0sYTZmlpxTWwc2Xfrwpd+76aZfPHLHxS/fdvGr15/7/A0XPH3jrx/95T9ecv/Vd1kGxqpoJGXRuwcOMAvarM3A2ozZRVNmQZ/QzaCzYzHt1MkcPTkyljnWMsPMT2dMqrRRk9LNUXNaUqtKaqex2UHeYSZNM/DkSHHFXfcnC7Z4YTESN+vgmX7GNJObG2cnjik+p2LWH7rvjq0P3xmaG1FEOhtxxH3LRNBJIlAK84PyLEdERDoadljDDiuDB4mgyzg9uqibVQ0ftc3NTA0emR46ytEEjYXYaDgXhfNxmMUD60XdZNB+QhvZAwZ0WdzLYB4Gg5iIL4P4M5iTwV1ZJJRBgkTMncQ9ZZJEF5fFOFoPraoeuH7inlur/vRjG1794V9fc/G/PnT7RS/dcu6zd1304jU/evDnf33tU7e8jZoYyzH3sc9mJg7O7f20r//gSFVqd9rKt31DfTFOlZKuL6qu+8mUy21RbJxB6Z+fMyj9uue0NXiLnFytdGSpJUuNdkup1zoCL1fkRqu51mquNerdWrV9HFrlZlk85SVYlupgl6ve6EpyAwzXiOUaGIepVlqAptVKC6gUcQWx01ZKRalaaTXq3XVl9orcBK9lqbG++AGiWmmVilK91um0FTDIKpW/ayvYrVQqDz5SGIwLDifUaK4lCLrRXAM5KOiDgiH+eqMLhpxPKysFjwnphJPGOkoFoU6SWaCYj+EEwLlWqxs+fDDiXeWZJJsIM3GYCntQ9yJHwLlYIIt5CjhUJkMyBfNxiMc95YS3RsFVMlROBktxH0ApiXgTEXcs5ML9diYOV3Mki/iWZof1xw7Y1WPz44ejThOPe3PB1WrUr5Rzknd19LUX/3jJb96/7pojmzYtvf4mve9QY0qlaIw9g5EeP1YwqxLTg96ju9HJY4RhKmmeYVfNMeNM1Dgbs8wlrPq4WYsbVITFkLF7dvxp21Vn33HRD+687tynLzvrmV//+Jlzf/DkVee9dNHZD99+5R8uP+uaz156j3FBsXljTDedmtdQJk3aomNtRsZqIPSz6OxYVDP5haz0JJRq2PlJdn6SNc8yRk3GpE0b5tJGTdqoKSybaZM2qprJWlYKC6H5bZMzb48TmmB2xY5qRrLzmoJxNt5/UDKou65FZPDgx7dev7D1w7UEnA2t5nAvhXqALn+JRFNBVy4WysVC/kUDvDpfIBCBjlFhb3Bl3rtoToS8I4f2jPbtFdgUtDSfivhZLJhGIKDcm4uFwOrRCY+BkznqyaBeIPrP4E4Gd2bRAIMGiJibjHopv5+GAlWKyFi16gdvMj7+kOeY+V//6vJbLnj1l3/32G0XvHfjOX+69J9/d/UPH7/hJ4/fef4zW589nA/WS7FGKpIbPDR2+UVXKD2FYbJfaB+u+5192zfaF+ML/1fr/qZnUPrn5wxKv+45bZRWZaVW6Yl8ky9V67V2vd6U5WqtVhNFsVAoFgrFslitVbsVqSuXOxWp+xdM1qq1Np3OtdoKkPgBzABcrNc6zcZaWayB7FaWGvVap9tRctlSs7EmS41atS3wlWZjjS/JIEsG7putZq/V7IlCFUgTAL4CxXYA12/72v3ipczzNUlu9BTlyNGhEIx1ukq11q43usdX2itN0Cut1TvNVq/VVsD7pxGVzolP3H+G0nq9R1E5rliWK80CJzQb3SRBf7Jls356JE8iDB5MhlxFEpWZWC1HZFC3QMLFhK8Yg0oJqBTzcrhbjHuqVECMemtkqJIM5VBPGnEx8UA6GojBTp6N50mECDoxh5WCVkoRX9qxGJoZS83NcGatEoUVOk5Ojxx8/KH3brpu88ab1a+9Eu470Fq0Kl53fd7MToxnxkZz6hlGryrYjBmTBpkeRlRjUcNMYl6TWjTgZhVimMbMmuSikbAZYiYNaTUxDu/nr26/8EcbLj1r082X/Omqc1+9/Fdvnv/jFy771SuXnvPkjb/5/W9+eOWuN7ZGTFbUpKuGPYhqFFdPgIpuZkFPGtVRzWRCN5NZ0P9bUfckrGYsmtzCdMEyXbDM5iza3II+t2DILRjYBYPoXCqtLheXHazZqfngyIPn3HHH927d9uAHgbHpktPKWY20arykV9OqUUQ9KLosY79/ZP61P62FIS60ysX9KdzNJkNsMkyGXDH3EuqyoS4b4rTGfaupCETCHti+IKbjBTJKwFAKDU4NHNqzdbOUTeHeFQYN0BFvwm/PRoPFJJKLBYDvN8hK1xulacSVRjxMBMqg3gy2yuDOLOrPoD4i5kziHsrv5/F4EYsQhqnFZzdN3H3HW3c+d94/3H7PpVuu/tFb1/3krSt+8OLVP/zjzWe/cNPZT1//00fe+/1uAWu79EHNsP6zj7Z53Z58geH5Ylmqn1w1/XdR+uf2ot1vHL2n+v3rIkp/XlU+U+D9wjmD0q97Thela826UpUVSWyLQl3gZVGUymVBFPl6vVqrVarVekVuVOR2RepK4prIt091aQJgZJgCaJGuMwOgFGBPlhpg8RHAtSI3QfZZ5MoApaDSK0sN8AK8U60c/yXAO0wUqlxBBL/wO4jSZlORK81OV9n62c4IEgPWreuO3yePFAFZllPFKVEqt2Wptb6NVyrVOb7O8XUgT0qnslmWazbbGTqtUakP7N7hXTKWUghIboQUWmXwSgZL+pfKZFhMBvm4j8PdJcxdTnglApLi3iJs58OuQsTNhBxpxJUjg0UaLdBILLhaSiFcLJhw2UqwV8nStZA3ePSQMDaieD2K3qB6+OF3zv3VsfvuCW7fFu/vkxYMrG4GnxwOjQ9EZkdxw0xiXkNYtPG52fjcLGWaSxjUwenRkGocN6gQwyxhM6BGFWpUJax60mpImLSkRZ+xe3a8vvPc711/8U/uu/Gil685//VbLvn44rNeveisFy47+w+3XPjkBf9y2YF3dzSSKcyo9U0eza4YotqJ+Nw0aVTT83OkUR2fm04aVIzVAGaRQKwDNWOZK1hmC5bZwrw6Z1FnLdqsRccs6BiLPjI5mtTruWUXPmPZ8ejr1/4/F1zxV7/5w4X3WXYdkNwrBbM+fOxwxTYvOa0hy2TONW976eXF515QMLiMuHOoh4jYc3SEjvkCS3oCWsYclvCyEegFpsIeCnY3i5lkyJ0MudloKJtAg3bbxNEDk/0HSdhTYZLldCyD+lg8QEe8mNsa9S6esAH/N47SEScdcTIRTxpxZfDlDLbKIt4M6ktEHUncxScSTADmoyi7aFA/cOvspnufuvKBK3/6yGU/eP6O87de++M3N/zy3Xsv+nDjr1655J/vP//vNjxw9XN1WjGM2fZ/dqgiVHtrnRKfK/KcWK6tSxetX+ffIkpPFV8wNz3xN55B6RfOGZR+3XPaKJXENaHUrlWUZkORpXqlUqvXq7JcLpW4Wq1SqzX4ksSXqlVZadQUudw71aVZLEmAAZ2uUqm2eooiyQ2uWAa9UqAcC/LRUlFa9wJTeoosNQS+0mr2KnITWGyC7BPUloHbSavwlNShAAAgAElEQVTZAxBd/7F6rVOttL6Dcva5nMgLlVq9s3dfn23R7oVC+YLQ6SpfHscFaPzqnmi9c0rEApQKJ1bg+eMRDsd7iiKVayybE3lhTjW7feuWiM9ZICIcAQspVKSxQsyXCq2yqLvK4FzUW4r7QD5ajvvqdEgioBy8KkTcQsRbjgZkMiJSYTYGkagziTgyOEQElpmQqxaHK2F/fnmhbF9WkHB9fNT+9FPbzr9g/zVXQ2+9xQ0dk9TTjQVDfm4mb9bkFo0pmw4zzcKGKdg8E7XMUWYDNjtNGY2peaN/ctQ/PZaY18dMc6x9MWbSoLoZwjxHLxiSJi09r8+uuuYOq2+58L7rz3/4uvP+cNGPnrzx/Dcv/ckLl/706Q2/eeEX//3qR254zDUzTy0v+6YG44Zxan6SMqtJoxqAM2lQxbRThH4WjCBRJs06UI/TdF6bM6nzptmcaZYxqTImVcqkTpnUlEmTW7SGJ6dSRmve5h165dMb/r9fXflX5zx96W9DYzNZq7loMVOzkxn1dHphDnfrWY8FevOd+UefVAJeEXYWcIgl/Pk0Aq0a/Is6kUS4WJCAlovxcDGJpBGoRKKpCMRGQ7h3hcGDuM+ZI7Amn9u75X3r7BgV8uTjcAb1lUi0RKK5WKCcxk/swLjXOZoKO1JhRybsTqOONLaUwZdZxJtGPImog8CcGRjGl+2KKKQX5t4/55/jn2weemPfT/7mug2/euOqf3350u89+9sL3z3nr++8/PsPPXLt65f88Pan7nwt7spoR4zDh0aUjtLptIpCrtluCGL1ZCHAf/cW+I9G6anGmtaFCWs1pVZTgA3qmQLvl84ZlH7dc9ooFUrtRk1hM+VuWymLNalcazbbHMdJklSvN0WhIgrVstCqVZSy0K3Kyl/ISrlimSuWjSbrzOwcoCnDcqJQVXoKVxCBjECj3q1WWr01JUWxSk9p1Lug8Nuod4tcGbjBACuYfK4E3GO6HQUoH/XWFL4kKT2l01bAD3wH1Y44Tm401+RKU60xvPf+xxqtkU7n1kXO1jNOUA8H6v/NVg/8EfAmWJ4B/6QnW5xWa21JboDPGVK5KQj1UqmeL1ZzXIUtyHKti+FEo94h4onx4aEDu7dDdlsKD7G4L4t5WNTNou4s5inEfHzCLyaDXNQLohj3lmJePg7xcUiMQXzYI2H+OolIyTCDuIC4bj4B8clQOric99tLAXsT9ik0KS3aJl98/s2Lzzt0762rH77BjByW9DOibjqnnkjPjBTNWlo7TagmU3oVbdIlDZqETpU0aAi1Jj6rIlTa5JwuqlYHJ8b9Y6OBqTFqwRSbU2OaqaRBQxm0cc1MQj2ZNBjjNt+WFz65+qwNl//4txsveO6yf33swu89fMeFL/3T/37e/Zc/MrT5UFBtIC1G2qJOmcdJ4yihmySNatKoTuhmAEdTZm1mQZ9Z0IPZ3XWUpi06xqKvOZdYnaq4YJDstpRJTZpU7JKJmtcxNmt2cSmmNWYsq+EJjXrzjsXdA67DI4XllaROTWtU/IJJXDCRJlVoeZZ2GIPvfjB440YlCJXDrhzqKaTgJO5BfIsM5skibjbiYSKeLAplUSiD+sBoLoP506ifS6JFEotCq4FlMxF0WWfHDm/bPNO/zzgxMDuwf1Ez7l/UhVaMqbCLgp0UbKcjznWgApTSiD2NLaWxJSbioSPuGLYaR+wJj6dGpVOQN6GfNv7u/2fvPYPkuK58z4/7YSM2YmdnZ3bf03s7bzSakUYjaTQSKdGJokQrkqIo0IFO9BSd6CU60YMGIAmQBED4hmtb3ruualtd3meZzDKZld5UVWZllnd3PyTZAxnOCnqMIDWLEycQ2RmIRqA7b/7qnHvu/3/j8qMPR074vvl/XXHZNx780Vfu3XrBc9d9/4lz/vuW2378xMXfuPGSb23RHbAHXfEXHn9l1B4PemNJkiiG7A8Hf+F0OVOV/l6cQemfGqeNUrE+7LZBo9YX6z2x3mspQ5V5HNsYDYHAy416u62AfhcwlNJWPhWlBMm12oPtO3YtelerOHP/Lx9BMWo8AWACigg2GYN+bzIaAgRGD+yfOjo13W4N1laDK8sbTz/1nNhoLfnWvYurj/7qKbnZERsKy9SKCDo/p/vVI0806jICVw4dPPruO+8LvGg22Q16y66du1mmJje7XzSUTiYAKWKd7mjq6PTaeohmaqrL9++hVL1Wp4S6vbFqpyMrPRWuKmvV8lT98arXstLrKINWsyeJ7UajU693a2KPb3R5sS002oMhKJfRE8ePzhw7El7zchhMw0kqH2XyYToXonMhJh/m4KgAR2pI9N9RCkcEOCIg4ToSrSNRpQTVMlEstEIm/fVioppYQYJuPh/ioYBSiE3KEChB/JLL/fa23Xfe8e7NN/jeezVy+L2Sfop2aminhrAuVM1zVfMC57YSVn3VpCOtRtJqrpoMmFFPWCyYwVwxWjCzrWqzVx1O1OEoWix5kx4xG4sWU9Vppb0uxuMk7Jaq1YDZHejyRlC3+MaDr/zgyxd/+69/+KOvXH/Rl6//zt/86JW7t02/dSSmc6JeH+o2VxxzuGMWd87lDdOwWYNYtDnDXFpzMq05mTPMIRbtJkc3a9Oq20K4rahZR1gMgs9Fe2yQbga26tFFd85qqXiW6LVQxbUsrIeY5bW8wUB6ndyqF/fYUbuZsJgwgwbTzNIeKxZxo0tm16OP2e55EOTTEhTi8hE0G4Iz/lx8hcqHmWyIhsI0FGZyUTYfU3c06UKCzMWqUJRB0mwxU4ispf3eKhStpiMhtyW97kmtuVetGq9hxj532K09RhdiZC6CQwH13AuRDaqFKQWFiWxQbfCSmVA1Ey5kV+HMWjWRqOcRPBYu2XWmX1y78tgj/Gp5268OXfgPN17w9zf+9Dv3XfL1m6/415uvPe/Or/4f333x4Temdk27tF7TvH3YGeNVWml1xKZEUswXbH2d9no8g9LfjTMo/VPjzxk7aoqjtqLSdFAXek1xBMagJQOOaQ16gKHktgLQMt9WQFv51AbvcAQmADz/wisEyU0A8C2t79t/hBekVDJ3/NhsPJZpSh2S4FpKP5nIvvvOBy2lf8P1t6AVcvrkQqlYvfWWOzm2sX/fkYMHprrdPgBg374DyWQ6Hk8uLvq2b38nm80vLvo8Hu+OHe/Wao25uYXdu/f2e1+4qnQyAShG8YKk01vUPeNNHP7RqlT9C2rFqSJTtQRXK9FTq1L1utcZtuRuo64IglKvd+tSXxB7vNjGqdoEALvdfvTQ/lRog0ULbDFdq2SYfJgtRNhChIOjHBxVrze/VJNHYjwSEeBYDYknFy1iMa2gOSEfbZbTjUKET28MsAwd9AIs14ys+g98OPubJ3feuvXog7+EThzBfUZszVRdN6NLRtg5X7DOFW0LmNNIusy4zUhazbTVQpqMhE5H6oyM0UKYrKTFjpusZYMJtVirTnvBoAsdm0rNzcBGLeaw4HYLbjPjNjNhMVTMhorbLSYgzBc1vz/z4WPvvfPgjt1PfHj0tweDs4t5+wq1skYuuco2TdkyjTtmabcOd5tJr51ecuIeqwpU2KxR2Yk6TRWHsWw3lO0Gtd9bdZpJh5VbdOF2S2ZhLmvQcn5/I57BV8Km94+sHNNHNXbWH+UD/rTuZMFyjFs3VxctiEXPepzioos2aBmrEfeZc/qTB27aGnl7OyjlhGSAK8QzoaV83I+kA3QhxubCNBRksiEuH2ELESYXpbMRupBQt0KpfJwqJOHoej68yhYzIgYzhVQDy/OlDJYORX02+9zhNdtCrZLhikkq/3GP95OqNEBBUXXsiMj5KSiKQxEkv17KBdlcjkqkhVwGcxvmbrzU8+B9g3Qt6SIeve6Vy79x87n/z0++818u+pe/PvvK72155r4XU6v5sDf+4Vt7zVo7GAOxobQ7A1GSReWL5rx02uvxDEp/N86g9E+N00Zppz3mWUWWxqMBaAgjCm9PhkCRgCKBVJxoNQEYgZYMKiWurUwYuvFpj2BDbE0AeOLJZ3CC7fbGEwBe+O2rL/z21Reef+WjvYce/dVTjbrCsQ0wAaMheOvNdwVe2vb69k57WK/JJ0/MP/bo0/WavLYaeOCXjwhCneOEl19+VVHaFMWcPDnz2GNPsCzf6w1mZuYefPDhWq1BkvQTTzwFZQpfsKXer9fbEwC8vrVoLN0QW6oyg2pYoUodNT+xSlbh+rEV1CeeiypflVZfdY+Rmp16Q1EPoYpSu15rdlp9WVJqgsQLEl9vcfUOzSsE2yDoeqvdn5qactnMNQrl0Bya2hDRtIpSHompSRcidDaCQwE2H6MLEa4QZ+C4OiOqJgMnuUKSycWpTIiHQlI2zEWWyx4DQBLQ/NEP7r7lpZ9eoXvu18XpEw2nvRtcLbn1xWVDecVS9BkLTk3OugBbNWWHvmIzVO1Gwm4hrWbcaMD0OtJoZq120mxhHA7cbEa02orZRHocBYNu9eDetGYGsehLFkNONw/rFlCLEbPoYd1C4OjBxPxcybnIrydwb3zjqC1wzE6vpPNWT9nlIXxOzG0qWRdK5hnMOo879EWLpmTTo05T0apLLZwIHT8YOXk4rTm5ydGSTV+y6VWaYg4TajFSLjtqt+Judy0Yztk9R17c8dT199/xw5vuufjW3976uO/QghAKl9zGtGE/tarN2+ZLDkNtyc3ZzdT8XNvlFOxG3zvb3r1hC2bQDAtpLLTCFZLRVRecDGG5GJOLMtkQDQVpKMjmwmwuTGcjFBTGoQiZi6l/UoUkEvPD0XW+nFW9SIUypB5FhSOrPuM0El2po5CK0lMLUxwKEekIDkWInH/zMEwZCaFwhMvn8WiijZWpJeuJn19ouftWKYjBazzkIpdORA+9On/0Le3eF49Mf6hLrxVCi7HoSuLlZ177YOdeMAGjMWiICk5zveEXTeP6tNfjGZT+bpxB6Z8apy3R0JQ6YqMjcC0wBjwzavCgq4ADeyw/veL+n111/y9uecrjjLF0C4yBwMv93uTTHkFV6uiF374q1JoTAPYfmIpEU/fe91BT6oAJePWVNwd9ACZA4CVVbrfbGV23ZSuBs3iVMZscP7vm+qbUCQaiL734WrvdBQA88cRTotgEALz22rZf/eoxgqBarc7s7Py9994/HI5LpcqTTz4tNpQv2FLv87w8AUCjNcXimXpDmQDA8SJFC6osg+qzppp+q+wUas1N8zXVLkZp9ZtyV72vqvWqyr0NsVUTpLbSU5otsaHUG4rQaDM1mWAklOTl9girUnt2f+B1WstQjEFSMp6tl5NMPkwXYiyS4IpJFklQcIzIRjEoSBcSFByjCwkaTqrJICmqmJJZFAovE9loCy9UQ0t00Afg5CCxET28Z/ddW9/beu3qu28KVlN7eVF0OcrauarLhHut5JId91pRl7Fo1SEWLWLRwmZd2W5CnZay3VS0mIoWE+qw4S5H2agjrWbCYiobdaTTVl/3kV5nSnsSselQt7nisiA2Q9luwj32is2Unj8hrHkonwMxG8s2e90fqwUSmGe15HRXPI7KogVbNGJuXdmhLVo0RbO2bDUyyy5m2cWvLXKrHsxlzhnmcoY5FZwqR4tWXdGqU2mK2o24w4g7TDnDAunz1kIJ3bsHtp5z7ff/67lXfeOGH//D1Zf+45W/ve3pnM3XhhLo4lzBNpU2n8C9VtJhgqb2EzMnQDAgzs7tu+mGE8883syExFyiFFxhCpn4sheFkmQ+RUFhOuOnUhtUakMFKpkJEelgNblBZyNkLkbl41Q+XoytI9E1rpguxTbwTBSHIlg6JJQhaMPr1h6rJP0skqDyUXV/VN0uVSUaVHyS+cCmRAOS3yjlgmQ6XY3E2liR8Bqnr7vQcf/tjUApYivVkxNio+U7EbccWKmGhEapk1zJmU7a3n9779xx7Qc79wq8yAsiL9RJlqP5+hdsfZ32ejyD0t+NMyj9U+O0UcoytUEf0KSoSICjRmAA1n3Yd7/580suvHfL1Y+e/73rf/qTO8EIgDFAK2RL+VS1I4oWxhOwoDGe/b3zzzn3wmefe2kCwK7397780rbnnn1px/Zd6olShq416srTTz3X7YwOHTymWTD+y9e/jVbIN994Z2Zac+45P+h1R1qtfvfuvQ6H66OP9j/44MPRaPzIkaMYhl988aUQlHv11ddhuLhly/UIUqIp/gu21PuNRkeoNcsVwunyVXFmMATlCiErvU0rGKHWVOezVLiqGveqsmCtLquVqyi1N6/VEla9qNeanVa3rXRacldqtlWU4lyzyjZ6Y2AwWndsfysdCzGVbDUbkvFMoxSn8tFNlDJIiiokiFysCkXIfJwqJKhCgoCTJJJSk0BSUGwtG1+XCKRNwEx0bVJKAziZnT74mx+de+Te2znjPMhEBauhePIYZdBVdPOM20Z6bKTHgbssqN2M2o2Yy4p77IhFX3KYyk4zYjMUbKai01p221GnJa+dKRsXSoaFgm6mYJgv2fR580Jk/mjOpkVcxvKirbxoq3hsRac5o58LnTxUtMxjTm3eMBubOZbV6QpmU0q/kNCdRL2mkmcBcc0V3ZqSQ4/YDGWbvepyF0zanGFOPU6aM8xFTh4OHT8Ynz36R1FacRr4VSezZMvoZ2CHrehe2fnYq1d/69pbfvDwtd954I6LntvynXt/9q83Hnv5QzYYwpaMWdtROuRCnFpYd1Ly2MDGemdB63/4ifd+fFlMe6LLlZhcHI0HyGw6ubpC5XNkNk1lQlR6nUz6yaSfygRoKEikg3gqgCX8bD6m7pgS2SgcWS2EV+hCgs4n1XOlWDrEFdPpdY9be6ycWFet19WpXRwKfHLANCLAWRaGGDhK5cNkOo4mI9n0Si65rAoHCrkU7tVpb71k+bF7xzku5qjEjfiDV7x4z6XPXPHNrU/f+tqaMb5mjay7wtqTpkqRfHfHrlQqw3JCU251hyOuLn3B1tdpr8czKP3dOIPSPzVOG6U0xY+GgCbFOj9s1gHog6ce2fv1f/jplRc/dvOWFy4677b/9X/5uxLMc4zcUnqtVufT5OwnAGBVWpTaTpfv5PRCQ2yhGNXtjZ0O75HDJyiSBxNAEtx4BMAEaBaMve64UiasFpfN6mboGklwy0t+q8VJU3woFIHhYrOpmM3W3bv3kiTdaEiHD0/t3Pk+xwnVKrF7997jx092u30w+aI1oPqS1OMFSS1MMxCs2ig25a7qDKP2e09FqdrIVdmpVqUqNTdRqv54N1HaktttpaM0O/WGTLEiyYl0vc03u3CFfPf93ceOHhFovC/SpfgKmw8IcITKR6lCQi06aThJFRJ4IVHNx/FCAi8kCDiJw2kcThNIhkAyeDFTRlJYKQUn/HDAq+Ti/Ux48d1tj37/2wfvuDl34AOw5pMdJnzupORxtFeXMKMWc1hQp6Vit5btprLNgjothMdFeT0Vu7XqtKN2a9FsLFlMmMOG2q1Fsx4xzJVMc4h5AdKfiMwc9p/Yv3Zi3+rJ/QnLXNI6DzkMkMMQM8z6Z6fWZ45E5o+uHd6V101hTi3htWIuM2SYzZimiVVL3nkSsh3N2o/DrgXEZczbrLDVU3Etow6bqrurjuwWTAuQbqZgWvg0lJadc9y6tejSEesr1dXwS3c++82/Ou/if/rFD//HvVvPfXnLd5669B9v2v3kB8RqrLrsoDasXHSx6NGWzDO9NU/banTe98v5H/80/MyLQibAcvlSOkhAsVI8klxdYWCYzKZpKExn/GRqjUqvq1UplQmQ6Q0iHRSQJJtP4KlQObGRDfhywSUqH+eQDJoMVTNhMhfjSxlow+vRHc8FvTgUUlF6SkkawqEIm4PoPKQqIhGpBJqMqSjF4nE6mSaTId5vs95ztevB2wBSizkqc2+vnv3X117xz3df/NVbzv7SFc/f/47fljbPLLKYKLDNd7bvjMeTozGoN6URAFKr/QVbX6e9Hs+g9HfjDEr/1DhtlPJco93qc3RTFsGoA0QenPPtm++8+fWLz7vvwXu2X3P5gxec8/M97x/vtACYAI4TPu0RTKZyEwCKpeoEgAkAvf6EYeut9qDbGamHXkbDj5XraUoYDUFL6YMJkMT2aAiGAzAaAgJnR0MAJgAAIPBit9vv98aCUFfkLgCg2xlSFAMmQBSbYkOhabbbGaZTuS/YUu93OpNefyLUmnPz+nyhrCop4gT7aVXpqXulDbH1sa5Fs8MLkuoks+m51hBbvCBKDaUpyo26zLB1FGdQkucaLbk7Npgdhw9PJaMhvJhli2k87ZfRJJXx44UEDqcJOEnDSa4QZ/MxuhAj83G8kKgWUhicqSIQDqcJJEUiSRpOYumQACfYdGCIQqCYsO146a2bfmp+4YnSiUOTNW/P58Y1M5xVL7jMuGmBdlmqTjvmdFZdrqrbVnVaUbuxYtdX7HrKbaU9NsJuKRt1qNmA2y2Y2Qxr5zGLrmrXEU5DxanL6KdDs4ejmuOQXZu26ZIWTcK8ENZN+47ute97z3/yIOLUJ+aPYE5tybqQ0hwv2XXUkj1vmQ1Nf5S3n8jajxc88+VVU3HJmrKZogZT0mgp2EwZ/UxWP486TbjHDps1Ge1szjCHOi0Vh7FkM5YsupLFULbqUbsZcxpR2yy3aoKMJ4tuGx2I7XzqzQu/8pPrz3vo5h88+/PvPnHxV26/4ay73HvNSqKY0swl5g/F5/crUW/NZ1rZ/tqh22567Zxz3b/4JQjFOli2WIpmQkt0PpkLrCZXfAIMM9kUk43Q0AaV8VMZvzpHTWWDJBRgctF6Kc3mE2h8oxBeSa97sgGf2uzNBZdKcT+RjZK5WMRrNR7/aM22QGTDnyjah6l8VGVnNRPGU2EsFa5mNqrZEJmOY5lYKRcuZkN4MlnLFchEuJP0Gx/eevzWn/UTcEgbufW8J6795mOXfPmO685++Mdfu+nSf73BNr364bZD5TRezlfnZjQwXJwAUK7inUG/iGJNeXNI/i/U7/OMydqpcQalf2qcHkrlZr/VHChSvyNNmvWJQAyHbXDhWTdedO6tP7/8oRt/9vgVP7ztS3/7zUQQYUl50gNiTfk0629Z6eEEOwGg2xu32gOaqY3GoNefFPKlHdt3vvLytnarXynjhw8d++D9vb3uiGVqM9MLJ0/M9bqjltKrCZLc7EwdObFj+0652QET8OYbOw4dPCbwIsvU9+zePzerExsKxzaaUns0BBTJfSIc+Pk8/aoZxe8dWpekHk03ur0xTrBWmzubK9bqcrszZLkGzdRqdXmTmur2p7ot+kdzc2NVRenmJmu9oQyGQGn1K1WaZmq9/oTjRf96aNtrb4TX1+tElSvlBCRZh+ONQrheSmPFAlpECCRDF2K1XLCW9QvZAJsLM0i6nEtWkDyJlTE4Vc6EqOxGA/L34wHBZQZ0EUAbH9615fXrL0mf+JB36xHNMdyiYV0W2mXB7RrMOlu1T1cdmqLJUjQ6KlY77rLgDn3ZcgK1niBdc801O2FdwEwaxmEhrcbs3InC3AxpNfIuK27RYCZNxaItGOaTmumsWU+seuO6uZh2NmmYy9m0Bbs2b5nNm2Zgy1x9Ywk265LzJxGLHnfZShYDbFyoOA2Ez1ZaNORcmoxrIb2oT3gNEY8+bNeUfPai01wwG3ImTdFmrrgsBaM+NnMsp9NgDkvVaUf0GkSvo1x2xuXCjFrRa2adC7hdRyw60KVV99TcI9fd/7X//Ws/+fZPv/ffzj3/v39/212/LllWGutB1mnv+hdBYDG86/WdN1z5+pU/mn/q4cr8NAgHQR7iU2EqH6egaCm0Cq24C34fn0sM6DJXjFNwqJr1Y9A6ngsS+Y+V/7B0gMiGyVwMS4fyoeWMfxGJrJO5WBWKwLEVrpyqpDfqKJRac069/5ZQhigoSqTDTayAhFZ6DMbDaWhtkYdTbCFSjPvYYqSaDaDpcCkVyccDRAEi02m5VBGzELG8OPfrR1+/5gqAoslZ1/l/c8WlX7772m89tOWsB6769q0X/tOV+14/GvNl3njuLTiBuKxul2MRTECr3a+gZKc7+tjCSOqpsFGvRan9F4Wiv+iPAqf3Pz2D0s8qThOl0hCMQLVIdaRJXwZctQcGYOGY78fn3vjTS+757tcvP/+7V913+9MC2Zn0wKAFKFz4NJROAEAxSlZ6c/P6ffuPULSgzvE+8fivWaZGEuz8nG5+TlevNRW522kP3tmxq4ig7737QRWjBF4EE/DyS6+Xitjykn9uVrfzvd2VMrG+FvJ513bt3IOh1IH9Uz7vWlPqdNpDlqnXhKYqw/t5PbV/qP+iymezrDQBYHUtuLoWVKeK2p0hx4skxXO8qLKQFySWa6iDRX/c4rvZOZWjp9KUr7cazZ7QaJNMg+NFqdkReBEtY3ve/8Cm01RzaaGUZXPRBpJoFCICkkSLSLlYIpAsm4/VcxsNaK2W9XO5YA3NkyW4Wi6hSB7LJ+vlZAPeYNYsIBECNbquO/HOtRe9v/Xy4J5Xec/8MLkcOfpRTj+DuyzkorViX0Asxyu2Y1XHPL+8itkWqzY767WziwbUegyzHGE9cxXjMdwyT5g1mEmDm/W03UzbzbhFR1q0qH62rJ8rGRagueng0SPhkyfSBl3BZslbjbDdiLrNmNtUtmnKllnUqgkdPbR+4GDk2PGSxUQ47BWzAXNYan5fWjed1J9MGqdTttmsR5tfNhbWzMUVc9ayUDBpCyYtYtFXnVbCbS8ZdcmTx2DtPGG3cC6HOvTEOx2NRU/D48gd3c3bZiWPhbIaKZebX9pIzVvnX/tg2+2PvXLTL5f2HAPZ0jCWrJpM8YMfmZ9/6t0tlx244+eGZx8J7nsHs2lr4WUxHa5lYwwUo7MxMhMpJzbgyGoxvIzF18n0Bp0LkfmA6uhCFyJqUvkoX0oJ5TRfypC5WDmxAUfX0GSIKiQENIPnwhgUzEeWmkSBLsSMx/ev23VMLiEgmXopWytCSB+Hih8AACAASURBVHCdyiSkCoIlAmhiuRjxYGl/Jb3BVrI8WiQLhXGzycElIpHCNkLNFLR68NArN93QDfjTM5af/MOWc/72uod+8srPvnP3Jf+85arv3mA+4iDSlFPrtsyb77ntnnvv/mUyBnXaw1qtNZkAddR8U59LvfjP2yD9S88zKP3M4rRROuiCaoUZ9UBXAXi52WkCMADHDtp++5sPH7r3pXffmsomyXYT9DugLQ+bjfanoZSiBZxgYQQNhRM7d+0ZT0BDbFVxJpdFwAS88PzLBw9MHT50bMm39sAvHxEbyq233FETpFwW2b/vcLvVV+TuU08+UxOkTnu4Y/uu++59SJF7PCeeOD734AOPMnQNysDzc3pJbPe64ypGj4ZA9Zz5vJ/dYfN3xMx6NN0YjsDr27bHE5AotVmuUavLHC+q4NysStUJ3s3+7R/mqZ6mm64yDbElil2OazJ8U2i0hVqTogWea7SVjt1smfpoTzrgF7EimYmoKGXzMayYR4sFEkmxhcgnKA1w2XAViooUgRVyxVSiiRW4zAYdcgA8DchScNtLr1963qE7r4UO7Wh45qQVg+S3haf2ZnXThNvK+JyYUw+bT5QsxzD7XFY7V7KYKhYdYjxZsZ7klvWsd6FsPlY2naRcRmXdJ/uXCbsxM3M0O3ecsGpJi7ZqnK+atbjNiOg1sZljkenjKc1c2W0vOq1lpxnzWNTzLUXjbMWk6WysV00m6OTJ3PxMQTufnp9Oa2by5gV63UOsOFC3CbbMZXUnctqjsO54xTBd99nrizbOaWLsBs5p4l1mwrQAzx6te6zKiru/7uuuLspeh+yxd5bcw3UvCLpAxg9SAbDsG7l9YCUKVrPAFaufcKMfaTZe/8D01AsH777v5auvePbyi97cetXxp+5Z/egNfs08KoaVfAgNLcZ9Jr/H4DROOyxzXpc+5Hfl0hsoHMEKkWo2RKQCbDrAZaN8LsZlozQUpjIhKh1Rz4CiqSASW4eja3DCX4UiVCHBFBMCmkEzgXxkqY5CTaIQ9dl0U3sJKCZVkVxguYkXK9EgFg83SgU6GxfLGR6JNbA8VUhXMikiD1vnDdt/+/qSwcVC5UYexQNx0/t7X/vF3Uooxvjic2+a/+3/vPLir279+l+df/X3bnnyjheg1UKH7cdWYroT2heefuGtN3agJWI8AhjKCLy8+Rw2T7Gj/59H6WfuY3omm83hGZR+hnHae6VSvSWLnUEXSLWBIoJSvg6GYNwDqSiBZGstEYARaPA9qd7rtoaqQO4fXUKqbvvb23ciRey5519GMWoCQKs9wKv0rp27U8ksmIBed1Qp4xxbP3Z0+rFHnxJ4kcCZvXsOsExNbnZ2vvdhU2qDCTiwf+qVl98YDYEi9/Z9dPjhhx6vCc1yCZ8+uaA6yTB0bTgAHNtQ5M/NZO1TzCh6ijKs4sxDDz9eKuMEyW1ak24awqhqDJvvps2t0M3Dpmr+3pebdxRlWKt9XJvW6jJJ8Rxb77S61XJl3673/G6nRJTJTKReTNXhOJuP4cUsVsySSJIthD5p8AbZXLSajpG5DJpKVqJBPhPpItFhbm0QcVmfeey355+tefSelltLGY8w1mP9sBMxTBV0J4tmLeG2s0sectGqqiKU7bNlmwZ16DCnlljUMV4D4zWQbm3VoWG99pJJk5o+npo+XjZrWa+d8zlot4mwLuCWecKhp9yWqtOMmHQFo75kt2BuR9lhLTvNmMuKOUxFi6ZonC+bNRWTPjN7Mj0/XXEY6RUP5rMhTgPi1Ke1J2D9NG5a4Mw60azrWozAaQeLbrC22PPaWN104fCe+Ic7wjvf9L/9iu/V52zPPm56+hHjUw8bn3pY8+j90w/cOf3AnfOP3K1/+p6Dd1374fU/+eiGn+255to3Lrj0le9e/Oa5V7113tWHttyz77pfHLztLtuLzzvfetG789WC/gi9YmhEnK3smlwIMJC/El/Kx1byKX807IuGfbHYCgQFK6VEtZyqFMKl5DoVDwrxcC0ZFRIROhYkoht4xF+NbZCpcDUZLMbWs8ElKLyMJDcqULgChQvR5Xo1Sxai1WwIh0IMHGeR1JJpbtWi7bLVQmg1F1iWKohUQcqRAJtPlkJrCobQUBJNJJhCcdW2eNNVN5zzjXOuv+y6xFIUSKPKRmb3M68/es3NFfd6J8v6jodfvH/Pfdc8+63/+sPH7vjtiimy7gjdu/X+D9563zhvwopVhuLFmsJzTaRAjEdAEJRT/eo3889G6anr5T+wED+Tf1aeQelnFqeN0rbcbzV7dV6pcS0wAgLTq8D1tgSGHQCGYNwHojBoy+OOMmo1exxb/zSUtjvD0RjccuudWp35rrt/eXJ6QR0++uGFF+/dc2B2RkOR3EsvvmY22Y9OnYzH0r9++rlCvnTD9TdjKPnOjl1gAq7bclOpiL391nv7Pjr8zo73AxvRY0dnbFb3R3sPUSS/+8P9Br21XpNbSl89UcNzotz83BpKm76hp364luXBZAJWVgOHj5ygmVqrPajVZVXZ/9TiUh3c3RzZ3dxs3tS439xDPVX+fvNOU+6qPjDqN6kJUo2vj3r9g3v2WOZnuVKOySUEOCGVUgKSJJAUXkrSSJwthPh8kMsFuGyYzcalagnyrxKJuJBJMBtLgMiPYp4D92557bILrb95gtIcbS3qaq4ZzjXNueeq9hnKbUKt+qLZiLsctNeBu80V+0LZPitHXbD1WM50hPdbmCVLfOZIYuY4u+RNzc6xvmVpI1h1OMtWM+NzEx5Lan6qYp4tm2Yq5nnUqitb9UWztmg1oE4L7naiDhvqtBBuO+6yYDY9ZtFhTmNl2Z7zGNNuPeQ1pFy6uHU2Y1vAFo1Vm7btc4FwEAQCwGRv7dqHPPrs+i/uPXDFpbuvvHjXZT/cftG5O3503gdX/GjPNZftueYy44N3Tf/ixiM3/ezYLVtO3n7D8Vuvm9p67ZGbrzl+75bdWy/b/4trzc/+avnt171vbvNtfyf00YHV93ev7t6Lmky0x5aaOYw650E+AOCNesjFBV1U0ElFFsnUGpMPM8UEVU6z1TyJZYlSGoMTaD5azoaR5EY5us5GQ7VwiI+E2FCADm5QoQ0qGqTj4ToC8XAahyJwdC0fWytBoXI2DKc2cmEfX0oR2TBXTJYT68XYapuplOL+o+9vr6YjXbYadJnpfLpNV7FUtJqI5FZ8QODza+vFYLTLisf3TP2X/+1LP/7+5V//u28/etdTu17ZPb9vwXXSNvXmRyff3vfC3c8cfGuuGJFaFGDhzootdnKf1mHwRdbiqXC6mCsNO6Om2Go22uMBkBr9yRjUaq3fQ6m60fA/iVJVIr/R+KL5Df+l5xmUfmZx2ijtdkZiXVakLs9IijgGI8BRHYHptSUg1cY83cZKPBiDttyv8SLPfaraUas9GI1BIpklKT5fKGNVegIAL0g818hC8OrKBpgAnmuUS9XlpXWOrZeKWDgUNxqsitwt5Es1QQoFY4GNyPpaCEyAIveWl/wWs7NekxNxyG7zzExrWKY+HgGObTB0rdMedjsjmhI+r6f290pSWR4pyrjdHtN0Y3ZOV0FJtS4vV4gJAKqivfoaOpWjmyj9Pds1VVDw1Dub21TqlK8k9XhertVlpdWXxBZN8ePeaP7EiaN7d8PxsFDK0tlYE83WS2kSiZPFKI1E2UKIy4fYXJDNRdlsvF7Ms9kUE4uOygioFouaqWMP3Lzz+sug/R/WLQZadxLXTfWC1saSBtEeYhcNrNcO6xaSs9OwwUi47YTbijn1qHO+6JgqOY8U7Sdgy0zJYSAWvcxSgPYFOnFYWIszS0Hat1EwWaPTM7DF2IptoFZNxTpXMs2VTAuISYOYNEWroWQzog5b2WouWQxVm7lqN6JmHWrWog5Dyja/PH/Qc2x3UHsU9Vpq64u1ZYfgMsNHDgTf3Ka99+7dl166/azvv//9849fdpXmxhudTz3kffWpyLuvZvZtrxz/SDAeVxzallvbcut543Fs7iC+cLBum+v4DB2fqela6K8YJyFHP+hgvbqybb7oMhQ8lpTTBK+68ehKq5Qe4dk2EmpCq2LCTa2bWpC/lQ+1kIgERxhoA02swrGVXHQVSQU/zmSgmAqg6RCZi/H5FB+PcaEwEwjSwSAbjXDJKJ+Os5l4KbRWiW0g0bXMhhcKL5egUCUXQdIBPBemCzEkukIXYjgUKsXXmgRC5ePO+eMLB3c38aJQyWGpaCHiJ7NJAc6ymbQIF0vBsFCoVFPFZevylstvOutfLrjtuvv1024kRZKFWg1VCIiB1rJz+/Uz+y2jJmgyQKj2yzm2WuTkWmfUB2AMJiPQafV5ptFsdMEYtJWJwLUkqbfZQfm0fsmfjtJNjjYaPTU/b/b8J8szKP3M4s85DNPtDMEEUGSNpZuDHhj2Qa8DxNq4URsozUmj1u11gcBLktjqfiIn+4dJMzVV50gdQer2xrW6XMUZsaHQFA8mgGPrNMVjKAkmQJ3RZWhB/acxlBz0J2ACYtGUap3GsY1CvqyejRF4iWXq6uGZ4QDwnFivycMB6PcmPCd+jg/u5odrSRooyrjdBt0u0GgsZotTafWrOKOOYimtPkULm34vm28iFY2nfrkpc3+q5P3vOZiqvTV1oEmoNUWp3agrHFtvS60ll2fve+8k/Wttukqkw40ixBXiDBylkTCDhGk4xBZCTD7M5OJsNoHHwu0iIqUSk0K2H14/dO/tr158TvnIHs6gGQXWQHSddczDC/sI+4maT086NcyiraCdT0zPFPSGqtOOOSxlmw51zkPGvfTqHOs3l53GqnelEcwj1pDj/YWpZz947bZfv3v/C8ET1k6y3IxCiG0xrdHiLkvVZcCcRtRhQO1GzGHCHKaKzVCxmUpGXcmoQ82Giklb1s2XdfMVkwZ1m4oODWbVCHajqNdWdu9Z/tUT89dt3XH2OTsvumj/9T/XPPHQ4q5tcd2RwooBDduqQTOfdsv51Sa80sgu1XI+HvIyKZeQX2Iy7mLIlPNr0IS9UVmX8ZAIr9QD1kHCJ8c8pSVDelEPRxfL+UAhF4jFfcVSOBpyRtZNPBoRkA00bJNLAQkOycWYXIrXkSidC1UzGxgUxHJhupSmiikSSVGFJJlPULkEnY0zUFzIpJhYnAiFiUiITcbZTJJMxdBoMO61Q35fLrScWvdkg0sVKIwXohUoSOQjOBRCoitqd7eaCRK5GJYJU4Xksd3vrFi1Lb7KIFA6sEIV0hySrUYj2aWV/Jq/idHZjRgFE9OHF3796EurvkS/BcAQtETQFQEYAjAAGCw0uLFYAzzTU1+ncrPPsY1Bf5KMZ3iu0e2M+r0JR4tIHhNYZTQAijLc7JRsPsB/doP3VJSqlvWfN3v+k+UZlH5mcdooLZeqqi4uXmXABDRqXZZWOKbV64BuG/Q6QBK7aIUUG63JGPwHKFWtSzaHVJtyV9W1Z5naZAxqgqTCstMelIoYmKinWdpgAkLBGJgAAmc4tj4aArX0pEi+3RqUitXxCOSyRUXu9XuTfK7EMvVBH0him6FrqqLv5/XUntqnUlHa6YB+H7z22o4CXFHPwMhKr9efqPKBKkr/EJybe6Wb5enmm2uzQt20L1V3W9Xv0xBbvCDRTI1l6jVBEutyOp7Y88670dXlscSjyRBXSOGpAAeHGSTEIB+PjzK5qIpSIZNAV5YAArdDwROPPfLh1hvzH+0BK0uS21016IsL05RNI3j1uGMGtZ6kXFrWay8atNCCpmS2YnZH0ayHjQtl2zyzpknodie1R5m1tYorPPva1GNXPbb1u7dd9vdX3nbObVvPvuGyr/zwgUtvtX84y63nahsp1GGresxVjxl3WUiPjVq0kx4b7jBRbituM1atJtJqJCyGqlGLGTSMWS/ZTGOvZ+iwIx98uHD7HbsuuvjgVdcY77mPO3GMN8yLy/ZWZr2NJXg8UiyupdNOOOUm8ktM0U/klyoZL5pdRPPLaMGHIasYsgwlHRurswG/Np9zF4srcMotZtfJgKPgM+RXLHDIXUyslHJBtBSD0v50coUkUiyVTkVdiaCNKG4IlQiVXidiy5WIF4stkekNJh9Wj3gWY6tIdK0S8+OpMAPFGShOJsJYZEOAs2Q6icYiWDyMZ+LVdKwQWo8vudFkiEMyfCmjagQycJIpJqrZEBxZxtIB9QgpA8dxKARH1yqpoEyVE/7Fo3vfja97KATqN9gmjSVWF6l0vEfg6aUVDi7xFXzdtfLeG+93FTDogY4CJBE06mOe6zfq4zo/lJug3QIEJU8mACNqFFVvd4YNUSmXqt3OUGwoWQhpSh0wBs1GV6r3aFKU5cHm/sKp2xN/Nko3S1LVuP7zZs9/sjyD0s8sThulve5YbCiqHbckdnlWqfHtTgu0FdCodQWu1e1MxiNQr8ksU+v3xp+2hFiu0e4MS2V8AkAsnpkAQNGC0uq3lF63M2SZWlNqC7zYqMtqGSo2FLnZ6ffGNMWPR6Dd6lMk12kPJLEtN7stpc9z4ngEGnVFbnYHfVATmvWazDJ1nhN73XG3M2rUlc9xgrfVmnS7QBT7DNPsdECzOaRpaTIBb7/9fiKZ7Q+ArPTUmaNNRcB2Z4hVaVV+ofmJHenmoRf1Qh3r3ZxLOrVIVW+qvymVwepUcK0ukwTb6wwjgeDssWNoPlvNpWk402EwMhMRitFi3McV4xJZQNMhupCQqwgRD3WQPONfGyRT1tdf/80Pfxz/cD/IlmS7jzA6SnoTYbdIa17CsYAYpkjXPKI/kdfOpGemEb2BsLvKFmvFZiE9DsJjKliOll3zxLKvYF1+/c6XLv3y1T/75p1X/OPt13zz7iu+dvM139x6/Vk3X/m1q67++lXb7no1POtFPUuq0C5i0eIuC+11EE5zybCA24zwwknB48AMC2XtLGszlRdmxp5FYHIVHnv+w7N/sO2s78/ed09qah+1YmNiPgJaYUrBKrxezPjQ9AoaX8RiPh7aEKCNei7IQwEqsYJGfVjMR6TWKGgdTSyzhWANTbDFcCm5nIu44JgXg9ZxKJALerJ+Jx73C1Cci4Wo4Dod8nOxsJCOcdl4NRMsZwLFQgBGguV8oFaIiVCETwe5VIBNB5jUBpFYr8ZWicQ6C0X4TISKB6looJGOy7l0I5eG40EkE0ELSaIEobkEFFlNBXzp4BIcXUci69VMuF6C6iWIzsaIZIjMRLCEv5rcwNKBaiaoArUKRapQJBddw3KxjUXLB2+/vHvH6/NH95vnjxdiAb6YY7IpPJNs0VRkZfn4/kPJSKrfAU1x0GwOJXkiyZOGPKk3x4I45Bt9qTWWWmNJGTSUbl1q1yRFEOV6Q2rKnabcUd1w5WZfbvZlaShLQ0X5949u6iw6yzUYtn66KP00y+7Pmz3/yfIMSj+zOG2UTsZAbnYFXhIbrabUa9TbUqPf64Aa324rk5YybNTbitxrtwZysyuJn9rYYblGfwC6vTGMoP0BqNVlihYGQ6C2dht1WW52mlJbkbtiQ+m0B2olSlM8Qwuq2tFwACiSY+hatzNqSp1SsTrog83xIgylmlJH9QlnmTpF8vWaPB59blUpy8qt1kSSBjzfwvHaZAJarcnGRnxqalbVM8oXyqrwE8eLEwDaneFgCJpyV63aaabW7gxFqd3uDFWZwIbYUh1MN7u4f7hX2pS74xEQGy2OF9VXG8PWGbbOC5LYUBw253vbd0CJKIkUiskoX843CaTDFivJtUp6gyokKqkQC6db1SKXjOSdNqA0F997755vn82YF9P759AZF2VcHSdKjbUobDDBRi3lNjFeA+3W4XZN0biQnZ8rm8yk01W2WMtWM+6yoS5j3jKdMszwgfi+p9/92TduvOZf7rnwS7fe+L3nbjznNz/6yi8u+aetN533wLX/dvsFX7rixu/c+fZ9b6Z0jqpvseJx5E16zGVlvQ7SYabsRs5trehm4LljNbelop2mLNpRYGXjjdff/LfvHb3kqsVHHst/tIe26ZmAm4HWGDRcKm5k8yvppCcdcVbiS7VcsJb0V1YdZGgZj6zhkTU87qdSQSYTpqEwkQqg8fVydDUbWIx4zavW+XWnNuV3FVMBKOlf8hhdxtn4kpNLxZrZtBSP1UOhVjJJ+tfyPhe04i5EVgtQsFhOkHimGFvG42tEyo8n16uJNRLyN0rxDplTnV9pKFgJr5SCS1Q8KEBxPp8UcLhSSpYKsTIcL6Q3YgFPKuSrQGG+nGWRFJtPUFAUi22UQqtkMiSWsqpJOJENk7mImng2iuWiaDYq0mWmkl1zmxIbSxiccpkXjux5L+y1AblWCAd2bXvlg+1veh0OGid63ZEktqVmR5T7YmvQkIeCPOCbfU7qia2B2Oo1lG5d7tTldq3ZqjdbNUn54yht9k89iLW5zS/UmmdQ+oXMMyj9zOK0TdZ6PSCK3Vqt1Wz2W62RJPVEsasoQ0FQZHkgy4N6vS2K3VZrpCjD/2Byj+PFwRDgBCs1O93eWKg1S2VcanYYWmhKbZapddqDbmdIEmyjLrdbfbnZUfdQwQTUa00EroAJaLf69Zqs3hR4qdMeCrzUlDrdzqjXHQ8HQDVlq9fkptSRm12x0fq8nlr1RUBR4nAIBKHN863RCBw+PJ3Po+pusVqX00yt3lBKZRwnWBWctbrcag8Ytj4cgd85MPoJPtXq89PGjuq1JpiAmtAsIpjaV2fYuii1xYZSLlY0s3PpaLRO4DJD8GgRjm4UIqsiDiPJQD660RMoFoYyS84WnAZ4yb9/7/M/udq7Y7fpxZ1PXnTzL8/Zes/3rpt+/v3EjJVaXK3Y7ajdiLuNVYeGcBowix7WaCpmC+Vyly3WksVQcRiLNi3msSB2+8qU4aazbjj3b6++44JXLvnKY1d985lrvvvsRf9038Vfu2PL9x/acvbDF3156wVfuv6Kr2wx7ZzCfEvUygqk16EOG7vowm3GmtdBWrTtNXdx5ghn1YLwKm2aX9z24vNXXXz05SeXZz6qZzYAX+pVUkRosbhiRf3OZi7CxdeEpJ8KLxW81mrIW0+HyoFFIh2upEJoOkzk4gySJuBkKR3KRddi655kwJcJr6TCy/GAN7axmAwtpWLr635vIhmuVvIcXqpC8bx/BQ37pQLEpaNkLEAlI7UixJUgJBVMR1ZSsZU85MfKUY7OMGSqUgxCGR+U9uagpUJupVzcQEuhCrxRzgfQfBgrRCq5EF6Kw5m1QnKtBAUK8dWE35UL+6h8tBhbLwSW4OAykQzV4EwNzrCZOJkK01CYgv6do0Q2XIUiaDaSi65lo2sEksKLKbKcxUqZwJp7bdHqMWt2vvHSkT27Vj22bDIqMKQiS7IsS5IsSq1Gs9NQug2l31D6NaUvyL2G0m0oHVHpNOT2v+fmGFGz31Q5+kn+nlTIH57aOoPSL1KeQelnFqeNUkFoC4IiSb1OZ9JujxuNDs/LtVqr1RqxrCQISqczUcnaaHRardGnLSH1RU8ztQkAqXRenT8iSK7fG8vNznAA0AqhdnfxKq3I3UZdlsRWpz3YbPkqclfgRYGXGLpWxWi4UBn0gSL3xEaL58SW0m/UlZrQFButXncMJqDTHmIo9Xk9tY1Gr9MBNC11u2A4BIkEPJmAw4enq1Wu3RmSFJ/NFesNpdMdNcRWtzdWr1XZI4LkVM2/VnvA8WJT7vb6k053pAohSc1Orz/5vbMxmyjttAcYSsrNbqc9RIoYL0ijMUCKmCS2Fz3LTz/5a6fZzKDlfCxSiEX6Db6aSyOJiESTfbFeySRK4Y1GPtXMRJrB1d/85DLvjvdsr+188ILrLv1vF95y9l1b/vXmC/7vs3Y++AK7GpNC0YJRjzoMlNtUsSxUrYaCZq5kNBAOe8liKpr1ZYc+b14o2ExyIvv2fS9e+dWfX/uth6/51jM3X/Duhf/w+Ll/d/+l//rYVWc9cuk37rn62w9tPe/Zn37z8e//7VXb7nk2Y3Gy/hBkNFddLsbjRs26+qJN9Fox7bG6Qzf0uxpO7e7bf37n1/+H7d1XeDRSwcKVUgAr+EvRxfSiIaw9Hpw9Ynz3zcX9H3LBlTGGVAJL0KqzmtwoxlbxTBRLRbFUtJqOlRKhtH8ptGj3O82hRXvav4RlYnw5z6MwCWdKqQgUWU/GgtHIRiIeKmTjxXw8n9zIRlbykaVqJljNBLFEoBRaLax7ixsrbCbexop8LsbnImw2wOUCdSTSoyCg4GDEghoM6ggQkCGV72AZpZxWiim5lOJyASa3QabXsdhSKeRBoz46HRDgmFLN15AknYlS6QibTfD5FJdLcrkkmYmQmdDHrd1MEM0EKqlgMRUgi+l83M9gOY5CCDRH4zBDIO0m+/LzTz/xyAO5VAxMBuN+ZzTsjoZ9WWpKkixKstRsi0pHlLuSotajg7r0MT5FpdOUO5LSU/PTUHoqQZt/ikrD54+T/z/nGZR+ZnHaKOU4pV7vtlqTdhuo7Up1FqDbBSwr1+vdXg+IYl8Q2pu/rT+6hNSSdDQG0Vg6Ek2xXGMCwGgMqhg16E8adVlsKC2lx7H1fm8MJkAtSSdjABfK6hRSTZDUelS9324NwASopWevOx6PgDrQ2+9NSOLjPvCg/7k1eKtVYTAA3S7A8ZqKVRyvaTQWHOdVRqpQ5HgRxShVyL4/AChGDYaAF6TBENTqslqzKq1+rz/p9sbqppTS6qvXv3ec9GO4yt2m1FbHmKVmp4ozcImoiS0Uo0iCPTZ13GWxcVh13JYlmqzmsxJNtYVak2E5tELCeRpKtpEM4Kt7Hrjj2csvZqyu3fc89fOvXXHj2Xdf9Z1HfnH5i5d/9eq7fniT/4SlEUkXzCbcY+VX3ZhNWzFps3PTiFZbtVlLFkPJois7tHnzQmR2VkmXn7jmkeu/e/ftP3jp2391+/Xnvn3lWS9/7+/v/cnZT179/ccu/Podl/zLfVvPf+Hmc1+74p/vvfW8G3xTs7Q/WrA6FIYvcQAAIABJREFUCc8i43FX9Ausw8iYFxjTLIgsxfa89eKl5/z6B982PfMIKCWGdJYrx5h8sF6MtSopMR+jgstFn7286rEe3O2dP1rNhMlSqlpOoVg6HV+l0lEuGW2kE410gg4HikuLsNddWV1C15ar/lUy6GejoVo8WotHhViEjkclvFqFc4VUJJsK5vKhfCFYgAMI7C9kV5H0EppYlpEkaPKg1QRYVfQsta3u2rSmtGd/4u0dGy+/7P3N09ZHHtDee6fl4V9aH3nA+fijy8/+Jv7Gm+j+g4rGMFpcBOUMEIqAyMnxZX7DraT87Xy0lvSjAS+fiTTLuUYRIjPRcjyApaJULqGiVM1TUYrl46VMuJKPhTc8yegaQxZDG94jB3fPzhwPBoNgPBn0+mK90ZIVlma67Z4sKU2p3ZQ6KiBleaAoY0UZnspFRe7J8kBRhooy/ERB95T83Qfv/0Pk6AxKvxB5BqWfWZw2SpvNsaIARQGi2Of5liC0FWU8HAJFGTebw34fNJtDkmy0WpPxGNC09GkoVSvRhx95wu1ZRjHqllvvpGih3RmqR1/U/i2YgLXVwPFjMx+8v1cSW26X7/ixmddfe4vnGoP+pIigM9MLH36w7+GHHufYxnAAnnzimeeefanXHaMV8uWXtn2091AWQlSaqtNJAi99Xk9ttwsajV67Der1LkWJkwnYv//E0lKgXm8XS9Wm3B2NQRVnVMO1Tnc0AWAwBCurAZLiE8msrPR4Qep0R7LSU4vRhthqd4bd3rgpd9W5pM2ZyVNHfAmcARPQUvqFfFmdEKZYUW6PJgC0W32LyZ6Mxsr5/KLVfHzfRzOHDi5MnXj9+ZdPHJjyWh3ao0ehFW8XgSLTh3bdeePKe9sJo233/c+f+zfn//zcX33vq4985yt3b/3BA1f/y2Wa7Ye5YAqxO2GzrmzT8UvOikkLzR4vaOYwqwm16it2fcWpK1gWYJsjb1t78LL7L/ny9bec/9L5f/fQBV958przXvvJ935z6VkPX/zdey/5zr2XfOP+i//5oSu/8Zsbzn768q9drn3vQHUlWnItYw4P6XRhRi1t1dUchsn/y95bBslxpdui99eLF++diIcR9x6ec+cMeMbMIFuWGeSxLZMMY3vGzLJlW2SRZbEtZuqWmouZqRmqGoqZuTIrObMyi/b7seUejez2GZ+wZ87M044VGRlZ1dXdlbn32h+tb8Ji3bp684O37nhsyezRHSAxC9xDRac9PTuY94zkPSMZ12B83JKYGix4JsvBabfDEJh0ZMJz7inH2IghEpmjsKx3yBwZtmanRstzzrxrPDHqyDnHiKAHmXVWZqZKromSc7zkHC+7JtDpKWTWNWs2hSbHcv65Qmg25ZuIzdoznqFyaKSedQM0BlK+hGpAuvbTfU8/9cV9D39xx32br7l167W37r5l8eG77z/76OP9zzwtWf60ZPnTA0890fvUsv5nnux/5ulzjy07ev9DB5bcv/fuezfccUPHa88O79ro7zhcMUhBwAUS/rrfhTqHyjOjxbmJvM9VCntKCX8m7Im6J7J+V943VfA7C35nLuDMBM47eJFMOBWeTcc98fBMLh1KxX1qRd/hQ3ubLZDOl4oltIpRKELgGI1XKZbmGZKniRpNCBAM2WSpFkO1KJwnCY4mahQp0FSdpurMd1LpRZUw5H+2rhSqg30Tf2nu+RvDJSr9wcb3plKKAQTVruKNCsojVQEnWxTbpjnA8oBkWvUmoBiQymAUA5ptkMktSKUws2bb9i9hPHVkdOrwkZP1Bjhz+tyhg8cS8QxoAyhqv2P7lwa9hWWEvXsOTk5Mi0Xy4aFxmqoJfGv/vsMEzvq84RPHO3bt3JuIZ5OJXG+PeN3aTcUCOjw0MTU5C8tgsCot8O2/oNpRuw0QhIVZu9VqbXh4ev/+k5FIpljEYeSY5RptABCUlMk1p890bd/x1YGDx/YfOJrLVyiabwMAK1tgKgdsFAP3/jA198Jcj3mtGYLkBL6ViKUFvlUXwMysD8O4JgAW+9iOnXv6esVrV6/fsHbdoT17HAZdKuDPhiOlRKGYKkW8EffEdGDK5bZaBnZv+ezJh2QbPgK+GRBOvXX7k49f+8KDN618+dneO2/ZePvPnvrdnS9ZTiqSVmfCZEsYtO7+c9iwJa2RBwa6I1JRRqdO6xQpgyxlkobUovzg8FS/4e3737z2/7zr6ZvWPnP79lt++u7dV338yB1r7rj6lTuufP6hm99cetMHd1329j0/X/HYtR8tveo33VsPJWzOhGkkrNCltbqiXl0xKCmLyr5t3ZrF1yhXvwFcZuA0gTFtbcJA+6fKQWcxOFUITKa9E5nAFJIO1qrZKYdO3nNKfObIzKCZK2YaaDHunDRKeu16idUkHh9Uu51W96Rlakg7O2qMzI2k/ZO5kKsQmSmGZ2D5SsHvLAZceY8r55oouyZqvhkQD4DQbMNhqIjOenZv7X72ic+u/NXma67ueuLJ0U9WR3ftTx8/jStVhEFPmvQlpSTWcybac7Ik72atilj30Vjf8az0bF7ZG+k5Pbpvl2bjGtWqD0fWfax/66UTj9y76aarN99xY8crz4/t35lU9INcvJ0KYf6Z5MxY3DuVi/vzqUgu7k/7nDnvJGTTXMCZDZ5PO4p6JqeGje7poVTMHQ5MK2U9nZ1HvL5ZFGeKCMPygG+AZLJYRRnQAhjC8FSzRjY4osniDQars3iLI9osCVhcoAmBI+oM2WTIJv01YL4uJFGcqs3jW03SS1T6XxWXqPQHG9+bSqvVWhllEaRWxRscBzgeEHgrV6DaLVBBeY4FzTaoVLgyyvI8QBB2ISotFNFGE2zf8RXD1lPpQr0BDh85uXrNhmNHTznsI/fd+1A+VwZtcOTwiXYL7Nq5h8CZV195E6ngfl+440xXJl0AbfD+ex8RONOog7OdvZ9+spbAWYrkjh87s2b1+nyuolEbzCZHIV+hyBpD8yxTL+SRC1o7/VmPyWS52QTpNAIN93XrtgSDaRyvNZogX0CisbTRZF+/Ycv6DVsMRls2VyZIbnbO39HZo1IbevskJ052Hjl6qqOzp1TGoM0Ko8sIStKM0Abgm9JIGM4QONtugXIR9XqCOMa0ARgZcR08eFKhMMzO+Tm2kUxkS4VyKhYvprM8RQk0S6MMaIIWD8gK2aI4gBPhQat83+6jK97qWrsaGZoa69I/fM3TV/7z40tuW3fj5W/e+pN7D364M2KYmBYps3Z7K+QJKwdKVk3eoIpI+2JyUc6oyhqUaaM8bZSGVeKgWh/Rjq99ZtXN//2eR695b/ntnz9wzZo7L//wrmtXLLri1cVXvvrQze8+dee6p2/f8Og1ax647LVnb322+4uDSfN42jgYGJCklXLMasCtGtGn73xyz4367Wvas3bgHxVmzIhDSk2bEd9IzGUNOc250BSRC5QSHr9zcMyocNn1semxqGvcbTfPWs2zVrPLZJiy6kO+Ca97KOgfSydmM7G5oHvYN+MIe0ej3rGYdyTuHo5P2xJOa27ajvsn+MgsKCZAPECN2t0dR+Qfv3vkiYd33nHz1huvOXr3ks6lSyc+Xcv1SasdEvlrn66/8YF3r1ryzuLfHF253iPV4BOTlWFbTCdNavsKFknZIcubxRmzJGdRJI2yoLovqBrIakSkso8Vn+PlA6xCHDp6sP+dN7ctfWD1fYv3/v6F4dOH+OAMqKTJiCfpGk1Mj2b9rsTcaNI98nUxjDPjc2a8rrTPlfRMpQLT+Zg3GZqZmx6RynrFyj5aYBsA1NtgzpdMZ/F2G6AoVyqQGMLVGMDRbYZo03iLwZoM1qTxFkO0GbLJkOd59GsqbdNk+4+pFLKpgFO182pHf9xMjaL579tk7a+KSv8C68kPdbxEpT/U+N7FMDAcgiI0STZoElAkaDcAQ4P77l5+15Intn9xmGUAaIFsFiGJ73LsoFWq1QaffLoO6tofPHR8Ztb37HMvlUtV0Ab79h5CEYKvNY8dPcWx9WgkKZepn3/uJQJnlArtQL8UtAFWpT5bt6kutCsV9OiRk6tWrcGqFADgwP4jzz33QqmIqtVatUrPcTxog2w2jyIEO9/v83s1+P0hjhzXLldwQQAkVRsYUAaCMYLgLdahXTv3dnb0mE2OaZfH5w1HIyko1dRugboAKLJWLKDxWCYcSkQjqWQid/TIqc6Onu6ugRPHOw4eONbdNeByunGMwTFG4NuJeJameIYWkolcXQAMLQQDMRgznpqcPX7szLmzfbMzPpjP/DU4+gIw+HlQOMfgLIvTNYzkMZzM5MOTroHDZ/oPddrE9t1rDj774OvrXt0w2qWM68zM9EzRbvVKegKKnqi6L6ruS2j603pxxiBJ68Wwd3dKKwnJxWnjUMro2v7Kxkcvf3Lp5S8u/unL91/50SM3bXrkls33XL36gWvX3n/1p/dc9v6TN6197raN9/3shd8teXa4YyBvGcpoNITVGOs9RZrlsye/2vPyE90bPgzoBkAhXA1Ohid0xdBweFqfj4wlAsOJwLB3XD9plMSmHIhvJuwwe3RqKuDnEonQyPCITj07MRQIzPjcU+mIJzwzMaZXGQa6J3SazJwrH3BHnCNY3B+fdATMisqEDaT8IBcCkw5c0qVa+fbpl57c9sBtm5Zcu3/ZEvmKl5xfro+ePhA/dyp49iwIZKbPqFY+8Opjv3zk8cufWfKTRxf95PGnbnlr2Y0vSPb0s/6MT6WeE3fF9aKMWRLT9EfVA2mzKmlS+dUij7I/qBVHVL1BcefU6aOjh/fPdnQkJNJIX6/z2OEDLz+76t5Fny2907RrgzBpBUk/CLprnsmCf9QzacgGndVUMDnnzLpnq5FA2jVZcLsK3umc1xnzTvX3d4o04mqbKwu8L5rGqYbQBBjGl0oURTVZFlQRDlLjf4j/kE5gk4ZvHhdYyv8G8OOuGxQpfF1u9EfHTLoM2oChG1WUIgmepvhGHRTySLlMIihZrbJwQ7PgJubrI4Ezl6j0Bxnfm0oZmseqFFIhmnXAUIDCQTEnnDomv+aKex556KVf/uxmngN4lYfSQhS1YDEMNKr6B2Rd3QP7Dxzdf+BoowkGRPKOM10b1n9u0FvaLYBj9LTLvX/f4U0bv8ikC3294v37Du/c8VU0kvztC7/ja80vd+/7fPO2zZu3+Lwhs9m6bu3GDRs2jQxPjI9Pnj51duvW7Zl0od0G6VReEBo1roF+HVP88wMajjBaqVTpDxw8tm//kZOnzoaC8XSqAGt4ILexTF3g2zTFQ5AEh1VpHGNoiufYRiZdDIcSfl8kHssUC2ginh0aHO/vk3rcQYqsCXwbRchsplQsoAwtkAQH2sA9F+jtEQ/0y0ZHpqKRVLmEMbRwAZX+MXAOgiT+CGiZAC1QSZXNcqO8Q9R/5Jy5R0X4E5jLWRq0uEVdCYM8b9fk7SpiyhpRd0c1PWn9QMYgSuvFWb0sb1RkdYqEShlRGkuDXvnOzhdueXbJTx5++tb3Xrr38yW/ev+mf3t72aKtz9/91b2//mjRv/7+8etWPnnDh7f940NHPt0d1JgSGl1KLi4q+yiTNCM62bXipYNvPBfSibiEB4vNhacHPU5zKjoRDQwnwmMzk7qpQcWMQz1n0wTs+sigJWg2xAcdiHuOiEaKfm/CO5sKe2NhT3BuIuubzcxORseG3RbjrF4bsFnyzina72W9blDMAKwCfDOhUwf6X3th74OLd911Y9+LT8nfesmx9n333o3pc/sRxRnCMIBZlEWLjpyanuzTv/HQ64/d9NKdl//2rqveePKuTQ/dsPauy9997OZ3X1/6ofmMig3EQlplwqjImBQpgyxlUCT0ipBa6lYM+NSSkEnh1Q/4DSKvSjwjHgjKFUWTFTFZ8yp5QTkQ6T4mX/X2lgdvO7B8qf/kPjAzBuLeqns4OWsvhZyVmDc+M5macVWC3vzcdMHtys5M4omAe8K+f/9Od8RPA5Bn2XimRJINqBaCICxFNRmm/QNq2/7/rIjlD0HiHwkLzVPQBiTB+bxhKEFTKlZpim82wLzYGcxJhGpTF7bBuAiXqPSHGv8JOfsGRXKlYlWogUqJY0hQr4EDe7v//d9uXPrgi//H3/0rS4Ncplop4ywjFAqlhW5hvoAQJAfVjtyeILRNs7lyNJK024ZhzhGBM+lU3usJ5rIliuQ4th4KxqYmZ2AxDFalspkijtGTE9PNBiAJdnbGN+1y17gmUsHDoYTRYKXIGsfW06lCXThPTn8pKq1idKmMwURltEqZzA6ZXFMoopDVCJyFVEpTPIGzkDshrXJsg2XqDC3Ac9AGNa7J0EKjDuB5NJIadIx1dw2MDE+2WwDOMfizoA2MBltPt0gu0yTiWfitwkzmP5FK5+sCmw1AEzWmygIOMEXSoTCf23dK19EXs9kqkyOV8eGhjuMhtRifGvQpukmnLaTqiWsHUjpRQi1KacRZnSKrUybVismOsw1vLKCwf/TYm8uue+KhK59Z/O/PvHDv+sdv+eS+K9+985evP3L9+8/c+tHDV7x0/y+WP33j89aziszQaESliitESXEnY5Hbt6/e8ugST+9JkPBj7kmvRZOaHiuEphNzo067OpeYm520DhvlwTF70TMdHRv02I2xqbFsyBNxT3mcw57JoeDUSNw5npmayE+OJYYtdGi24nXOmJSRYTMo5UCl3HS5CiKJa+vOruUvbL1j0Za7Fh17+Qnl5yvGj2z1n9yX7z3N6qQNu6ZmVVYNory6P6mSeMXiqsvbueXoHT+7+5GbX7nrmtcWXfHmPdd/8uitGxdf9tYjN7x127/dt+u9zYw/mrFbozppyiDLWVQZizqiEXukPW5FX0gvi1rVQZMk4dCm7IaYThtVa3J6U8Voqeg1rQlHQdmV7DvmO7X77FvPrbztylO/e7aoEoFsECCJkmswMmymkqF8YDYwOciWUhm/yz9hRzPhySHTkYN7ms0mIzQrOF1GaahbOd+zjKKaPyDVXaLSPw+V5rJlAmfhggDaAEq5VVEKSm3/IcTzx60FLlHpjze+N5VWUbLZAChCsnS7XGQpHIAm8LkLmzcc3Pr54YP7ztZ50KwDkuDgTVroFkIte4Lkxiem2wCk0oVmC/j8EUgGjTrw+8JQgxe0QY1r0FQNtAFN1XLZUj5XrqIkQ/NQDRiq7ELmAG1QyCPtFhD4NpQmyGXLkDmwKs0y9b8UlcLHuliqUjTfagOcYHP5SqsNIHdWUWqeO6ElCmmVoYV5roVThcBZAmdxjEEREqkQBM7WBQDaYNAxtm/v4Y4z3T3dop079mg1prlZ//59R4wGWziUgNVBJMGVSxhsPLcglX6Ni/5+WKeLV0gW4wDTbuKCb2S2e9/x7l273VqVR6ssjA9FzLrhc8ezg/qMQxNQ9Ua1orhWHFeJ4wpRSi1La+QJpSxnNs71DxQGJ0a7lKueef/eX953zX9fdP+Vy59Y9PZD1/7+watefOLm1+697PHL/vernrj+acUByZhIlxwcThp1WYOyYpAGzx069cazne++RI6aQMxfnXGmxodTEyOBIXPSOVLwunL+udDUuNNqirgmsVQ87nFBrZ+AZzKT8OKFOJYO5+ec6dGhyvgoPTfFh6YLThM6NwSKYRDzevrO9nzw3pGnn9l2250H73mw/9kXBteujp46XNL0VQblFYeiopUSOhWmV5VV4pSsJybtSqmlGbMuqNXFbBO7Ptx+80/vue1XT9/y65cfWbLxrus+XnL5B0uv/2jptb+/+5cPr37+A5dUXRgeDGvEMY0ka1amzaqAst8r6w3rZQmbOmJR+g2iqFWVsupjOnVYqUqo1Fm1OquSZeXdSdEpRNfbHNdWDf2mrav2LP/NZ/cvNu/cBLxOUEgUx6xZ5yCdCZWT3rB3NBaYmnM5Qr5Jm1E9bDODFkAKKFHlWLp9EYnCPkV/aU76K8Vf0iqFLqh8rlIsoCxTbzYAjjE1vsXVmrDJMYYzCEpC7cZLVPpjj+9NpalkHm6CWLrNcwApCaAJWArgKAj6iqAJkDLXaoByCaNIrtUEC93CeCIL02fyBYSrNb2+cC5f4YX25MT0ls+3nzzRUUVJnze0a+eeD1d8UiljNuvQ8WOnX3/tbShyxDKCyWjb8vn22269M50qoQi9b+/RJ594vpCvBgOJkyfOHT50isBrjToo5KsM3eBrgCIFpLKwrPaPDKEOuFqTpGr5AlJBCJZr0IyQSOYgWUK7k6EFmuIpsvbHscw/cCr02eIYU0UprEqTBAd/lmXqdQGEgvFNG7dqNSaa4vd8dXDN6g35XIUkuHYLNOp/aJgDG7j+hySK/zEQlKTImsC1CIQqpct1QgACECrkuFr7+Xvv2vt6irPOkN2cmxyK2nRRk9KnGojpZSmDIqmRJZSSpEqeUSkSSknRok3oZDGdOqDW+7WOQ6t2Lv7prY9c99jin9/z4r2vPXjlI5f93S+fuunR3m0nnSLrlMQwqzEGTMaIXp3Uy/kJi3L9BwdefCwiOtOYmagM27IjQ2w4VJmbTU2MkSFf1T0XNTuSQ+Nex9DcxFgo6nMFnCOzg77ITCTgjM2MhuyGgF6Vd5jYmUlmeqI4aqZDw83MJOk0DO/dfPzZx/bff8+ZZcsGfvuS/6s9idPHy4oBzCTHTPKqUUKYZJRNHRf1xiX9cUl/Qj6QUIqTennWos847BHzoM84seW9L+644tGHb3vzzuveenjJpjuu/XjJr99ddsvKJ29+895fPLji8VdGukT5IUfKrAorB+JacVQrCSj7I1pJxqFLD2rCRolX1x8wSCN6ZUynThmMBZO5ZDaUDeqiVkTZZYihJyU9gVvE7SlLdODMwEfvrL/ztqPPPZVXiEAhTvrGki5rLjThnrF6vMO5fHBoyNDTeQovFNskT6QQtswKHCCIOmyxMm+bXqLSvzoqraJULluGIVIoSoNjDEMLFYSAVelw7z6vgHaJSn/s8b2pFKkQzQYoFrBKiW7WAVrhy4Vaqw44GjAkaDdBKoHQZBO2aikvLGMNu3IOiORmy+CHH62a59R0Kq9UaA/sP1IpYxvWf14sIGaT3WYdeuP1d0pFdMf2L4eHxqFcw4oPPiZwNhrJHD/W+eGK1RzbGhl2SiWalR+tzefQ48c61SoTaAOObSXieY5tIRWKoRfsVPNjA+rf8kKbZgQoVd8GAMMZqMcEGRRyJLRQoXkKbVCS4OZDpzjGkAQH46l1AbBMHe5Mk4lcow5i0TSUdvJ5w5l0cd6cRRGSwFkopsjXWvDXfTu+lrO5CFytWSpjBM6CJqhRQiWLVLMoUyaRZLYUjvUdPdZ/5MiMyRgZdaDemcSgcU4lihoVWYs+bdCktaqMVpXTqLJqed4o84s7cjZtyqT3KJRRy8hIr2rfx1tW/3bFu4+/uv7lj6T7O1wyw2ivzKPS1yPx5NDIlEw8cvbkXP+ZgmHg0GtPda74fW3CVnc7sw5bzGZDPd7ijBvxerGAb6RvIKS35cZm0i53cNrl887MBabmAhPBsDMRmCST3kbSV/NMcpPDYGYceGeBbwIZkh394OnXr/uXLffeaPjgdfe2TeUzx4HFAEaslEWVVfclld05TX9ZKyrLerOirorJkNXrkmpVQiWPaxQxrSKoUbiVKrfaHLK6tq/YdftlS19YuuaB21Zcf9lrt13xzqO3rHrk2reeu/2tG//+pk+feSM3Mpmxm8sjlpBqIKzsCyr7Ixpx2qLOD+szg6qQYSBhU8YsyqhBlTBoMyZT0WwpGHV5nQy3qxGLqGLuKxl70qrOhKyzZJQ3xwedu3Ycf+rJzxbfat65CaTm+LgrOKEtpWc8bnuNr+j18oN7v2wxQq1Ct9F6rcjw1I9rlf5VZd7+FVMpy9SxKg3agGXqmXSRpni4Y/5atAbUGwAKufBCW6gvaNJcotIfanxvKhX4NlalkApVzBM02eYYUC6y7SYoZBmaBBhaRyu1Og84tiHw7e+g0ky21AagUETlCu3iO+9NZ4pCHeTylVg0VSqip052NurguWdfLBXRQr6iVGjXf7YZtIFzanZkeCISThQLiN02XCygLNPs61E8t/yVfBbLZ7Hx0bl33/4kl6kGfEmNyopW2IYAKiW6inCZFNJY+JH6sYGgZKGI1vgW5NFSGWPYOkFy851toHHJMnXYA5JjG5BKcYy50KkLSRHarzjGwE44Na4JJ1Asmi4WUOj8gd1y6gLg2Ab06JZLWCZdRBGy2fj2WCl5XjHuW0AyglAHGM6kkvkqSoEWAE2QTeR5kgdNUElmD+/+UtbZ6XHYxlVSIuiZEPf4NdKUSZ8y6NJaTVarzWu1OY3C3XMMGVSmDBKPpCukVWYHhxDnXH5sZlqud6vNAb01bLIXxsYZjztq0kq/3J4dHR7t7bIcPxiQdZv2btz3+2VDR7eXB7UJs5bwuZGAP+50jqo0g3K5f3jQbbdGp6eTbjcSDldDweK0qzgzWfa7Cr6JcngyOKH1DclI3xBIecGY2blt86nHH1552T8df/KewU3v+45uTfcfRo29qFmUVp1LyDoLOhFqUaAmeUktzsv6EJW4alAVjcakVhdWyPyygaBCHNHKY0ZtxGRO2Efjg7P9+3rvvvKR2y57/PYrXrjzmjcfvX3VE7eufPiqlx+4/MnfXL20Z+shfNYTN+lydn1UKwkq+0NKUcIgz1g1KZsqbpHGLdLCiCHj0CctuqRRl9TrUxp1UiVPqkV5vahg7M3pz2V1Z4sWMepQZ/SyYO9Z4BgEFmvH7196/eqfG3atA3EnH58q+AeTgXGsGFdI+8V9vUAAXIUDeJOvCESVnyfRHyNWeolK/2xUWsgjzQbg2Ab096aS+YF+2c5de3ft3vfVnoOHj5zs6RUbjDanyx0MxS9R6Y89vjeVskwd+nj5GsDQWp0H5SJbRQSGAni1zjEgl6liVZam6sUCSn1HaTZVI0juk0/XJVP502e6SmUsmysKXSSBAAAgAElEQVTzQrvZAFiVOn3qLI7RX2zZgVWpuVmfXKZ+5unn47H0ju1fBgNRSBvvvfthjWtm0uWD+0+9/uoHJF5PxksSkfbdtz/B0JqoX+2c9IWDGY4BoAUoolEuUihC/9iP/kKAXVwYtp7JlqAKIFRRmLc+IWXOTxV4BQZQObbB11qQXFtNwDJ1pELAqCf0/dIUHwknUYSsCwB6gPO5Siya5tgGbJVTLmEkwTUboNUEMGfh+1IpijP413cNrVLZTAkmaVeKRCZZaPFtga6pBiSdhw7NWs2BQYul64xL2h/WqRI6TUKrTms1OY0mq5YXTPKwvMMn6WRnx4pDlvHucyGd1qvW5EbG3UpNQKMN6bSj3R3j3WeSVg06NZh2mJ393c7u0+S4+fRHvz/xwUt5szRmkKTHrNWQ12WxWBSKIYPerlV7J0bQdDwT9IadEyW/m4sEyhPDpWEz4RxCxs1ph5wPjgA01PA4dFs/XXvHdRtvu7b/+Sdye3cA6TkwqGVNorjsREB1KmruTdpFCWNfTNubVvfmNKKyXlYxyAsacVohTqpVUbU6qlZG1LKwShpSS4MaRVCrmZEp5xRmZCa1a8Xum39y15LLn3r2vo/vufKl+6/47aPXvnjN/3PDxt+vTtgmw0ZTWKcKaMRxgzysFkXUkoxZk7aoIzpR2DCQsivSdnXKpk1bdBmTIa03pPTanEFbtujyRklK35M2dBes4qxFnDBIkwZlyWIuyDW0wQZmpsf3bH/rhl+efPeFhm+4kZghYm7fuF3cddYz7QYtwGB1ssDwRAspMyTZYJg27ANKUU2abkFOvUSlf11Umohn2y2AVWmZVH340Ikzp7ss5kGYkBGNpT3ekMcbisbS3xEovUSlP+BYkEpZFpTLNM8DhmlDQV0M4zmu/fW9/EOHQopoUUQLr9YhCEwg8BpJ8DAF9EJNzguB4UyjCT75dJ1IrFizduPomLNYqgp10G4B59Rsx5muVhNoNcZjR09t/WInSbBikfzggaM7tn9ZKWMrP1qFVPCNG7acPNH51psrwsGMyTB8/Oi5N1//MBkvWc1je748uuL9Ndk0WmNBqUBSRAOtsHiV59gWLCFfCBcx/XdgvvfFRfjes4W4uOzkfOoszn4r5sOo0N97ngIJDpqe0J2LVWkCZ2HxDHx1/gMhPWNVej40Ox+dhfm6CMHgtTrO8EWUKFVJkquTjFBCCBgxvfiPJwWKbWezVZqq1/lWKVMwK1WyM2fmLGbTuTMBo7Y8MVweduQtppLFXNTrEzJJ3qiIKnuC8p64VhrVyAMKacKgR8bHQxpNxmHP2K0euXiip2NO3BVUDUTUEr9UnNSppjqOhSRn97z8uGr7KmRMx0enp40yk7Rnasge9nsmxofGRh1+z6TfNVz0unLOkbTTUZwdLs0MFscN9KQZzA2BXJCVd0lfe3bt9b/8/O7rdRs+iEpOlDW9ba28rZDwWimiHYiruyLmPr+pb0x6PGDsS9rk6Igho5fFFH0pjTiq6EuopQmtOqXTl+zWkt2cNqiSOkVcJw/KpVmLNaw1hg3Ds4qhw6v2P3DF0l//X9ff+pP7f/a/XPXwrx878PGesGmKcAdTg/aQVp60atIWjVvS7ZMPpC2atEWdNMtTdkXSJs/YVGGNJGXUZEyGiEKZt5iwIXtMKao4VCFlZ3FIXp3QpSwKr7J/ViIqDI2VbFNV+1SoTwymJsa++mLVHdedfusFEJkFWFHf0bF1zXqBaVQRrtkExSJZKlF/ae75G8OCVHrRqjK/aDSaYD6TnxfaLNegaL5cwaHXCmZiptKFeZcsgbOwzxXMMYQaqHCOQ1/UoGPs+LEz4VACtEEVPR8ihcpoXK0Jt+/0wumfl6j0hxoLUimKcoUCgWE8dARBTi0WcYZuMLTA0A2GbjBUax5VhK8iHARWZbHq12v6AlSE4UwbAI83VCxV05ni/GPE0HwVJeOxNOwJk0kXQsFYqwk4tj45MV1FSZJgo5EkQ/OpZC6bKc1M+9tNgKG1Yp6Ymwm3mwApM9k0OjI0XecBXuULOZxjAF7lkTJTLhHfTZDfnAwLPYKwfuub+FM++U+h0vng6LdiPgtpng5h4hL1dV0NvFLjmt+RtvBNoFWKqjUKGFlECZKr03wTIzmM5DihfeHfPJ+LhNFClWziNCDoZqVMosVqNVfsPHTI0NvtthinldLhsx3mwwcsB/c7O84klcqqw1owa/JWdcqgiKrOE8bsQK927x63WOSRiOdEfTP9PQGlOGFUBuT942eOGb/aVTIbGq6R2Y6D255+wHF4K0jOIjOOzNxI3DsV8c9GI/5o1Ot2j/s8Y8W4OzZpRj2jmGekOGViPXYQd4EZO63sOvfkA5/89H8cv++O+L5t6bOHM7LO6pg2a5YXFDLGaI739Pq7O4lRe3nY5FH0Rq2qsEU2q+oe7TkR1Euyg/qYSZEwKsIaSVyrRoeGM0a9Z6AnqhCldfK4ShxTS0NysU8iCSuNKdO4Xz1iO61S7OuX7xkwHNVZTuqcElvUPBYyGKclfXPSvrhZFTco5sQ9AaU4Y9WnLZqEUQGpNGaQRLSS0qClOjpctNrQ4cHqiCOqFhdsKnbOkbXLfare7JA5NzoctQzGbBNz6nHzKRk7HWo6Z8DYkO/Yvk33LDr95u9BIBixDlokOiCAXIGqMu0ixiFUHaf+4vTzt4Tvskphyg9J1eY32bCzUxWj2wCEwol4IkszAlqlGk1Qb4BEMocTbCSaghUNUJMcxkRLxWpdAFWUymZK8ATy6JHDJ7dv+xKKmhULaDSSgklGsLQUpmVUMfo7+sVeotIfanwXldbroN0G9Toolah8HieIej5f/Zoj2YvAMYBjW/Ngmeb54N8ClIOgJMs1Wu3z0u0VhGg0QbmCIxW8UQftFiBwhiI52PUFNoEpFdFmA8BWJzhGs4zQqAOBBxzbYuiGwIN2C+AYV0WZVhN8XW7FUqQA2kDgAV8DLNP8bitznvPmryz0CEJ9vm9iIWt1Qf5ewPqE5uM3ATco37wCw6hIhUAqBIqQMMV3Ps4K+fVCXBidhRWrHNtguQZTa5YxqljBIVnCTHqcYC8sj/maR2sYLSB4g28AkgblMs2QPGiBk/sPqM6d89ktboPap1UlzPqUURORif39PYGBXk/f2ahKktQpwippRC3LmAxpoz6kkPmlUp9E4hH1+ySitFFfGrTENQpX5+mx40ecJ46UdHLFhpW7n1s63bEPpN1hiyw2YaXyMTQfj4fnfHOjBlWvsv+4Z0pPFuawxGhhXF0yicCIHliUE5++s/rn//jV7ddG9m0lZOfy4k7GoS3pFb6+swWbJWwfIvwxbMIbkxkzUn1Bqkv2y1IKBTrqCBiVmjP7B2WdXqvCa5YXJ+25QbNXKomo1N4BUUAqLln1CbUkKOlBHMaEWprWquJqTUSpTeodGct4RDPs7NUnLXNR03TYOBIyWP06dUArS1jUxVGLW9Y/1dfll0vSZkNMrwxrJHGjNGGS5O2ajEVdtJlyZmNIJg/JpWGFZKavM2dTJ0yylEPt18vH+ntj9pEZlW3dq6tv/uW9yxb/9uU7nxrYsAO4PWXJwPiuravuvL1z5acTYkV8OtSuAwSvV5gWWmug7CUq/TNR6XzqLFTJhvIssIUiWqXmDVNYTJ/LV2B3Cl5oJ1N5fyDaBqDGt9oApJJ5mEgIxVVAGxA4C9rA4w4uffjxrnP9cKGD0x+0wYXlpOdnK8F+R9/oS1T6Q40FqRRyJ0U1azVQqTDFItlug2YT/JFVegFwjIO4gF/pKkpBrY1vgqRq8+0jYDPqCkLApmAsI9S4RrGAQDbl2HqpiFZRssY1KmWs2QDQNkUqeI1rsEydJHgCryEVSuABUqFQhKapOlKhigWsWMCwKosidKmI4xhH4AvHDL6ng3chx/X3dfAuZHcuRLEXuXnnPbfzdDgPyJEXMe48vvUiWqUotl5rAk5owx7OMEaLIiRN/CGe+gcqpRolrIlSAMUaNN1imTqot5V9/cNq9ZRW5TFqYlZD1mHKWQ0JrTwg6pvrPpsxamNaRVynTBk1IaVktr8rKJeWHLa0UZ+3mnMWU0KniaqVSb02Y9RndNqMSuHv7mxMDo0f3HH41ac95w6B6DQ6ZcN9zrLfFZkcijlHsKgPDU2X3MN0bCo9pwsN9zcDg6AcrIpOHLz3lh3X/8ry9kuJ/dtZZX9ryIIatUmlMms0E2NT5Fx4xjq7a92+jm2nslYfNRQRhoJgMoIZRssmR9ZqcWtkgwMd9oEzTm1/wKEO2/QJizVtsmeM1pTBGFMrEyp5SivL6ZVhSW9Wp8wZtFG5LCiVxzWGlN4aUZk9MpNfY4/orRGDPmJURUzyoFbsUfQ5+89N9naHVMqMxRzVqkJqadwgT5hkcb0kaZTlLbq8xZDSa9N6Q85iylkNyJjVJerMjdnyk6PJkcmCK3x0w/5f/L9X33TV8sXXv7j45/d8uPTFlFQDJsaLUnHn++999PBjtm5pIVqmKUDWAMK0cL5VZXmc+ptR7PuvgO+i0vmTCxeHVLrQBsDnj2A4k82Vff7IxOTMwUPHX33tbSiIBnP7qxh99z0P9g/IyiWMwNlctizwbZiQyNDCwQPHNm/a5pya42stgW8nE7lMugjL8S+shCH/hH6xl6j0hxoLUmm7DYpFMpEoYRg/X3+WzVYvdN5eiG+zqzgc4y5sRn0hIFdVMZoX2sVStdUGxVKVYessI5AEW0VJlhEokqOpGkVyAt+CZihD8/MWKsfWSYKFLV8InJ2PJcxH/mBiW6sJYJorZIXv6+D93lbm94ytLuSAvdCFeyHmo6QXBTvnCfK86EmFqJTxUrHK11p8rVXjmvOqSfCnLipjhbcMw5liBcdIDifYUhlDKkSNadSYBoZQLFGDbHohlaJ0o4Q180gjX+RIsoWjLFbEssHwqFYrPrJ/XDYQtuiCOnlILc6a1QWzNq6SlAYtIbXUI+2J6mRpkzqkFLlFPR5xb8aoLdpMRZspoVX7peKATBbXanMmc0Ipiwx0EzatZdfGLx67e/LYLnxQE1b2jHWfDBrUjVgQJCNpk9Yv6iobpdSwGiBhEJ/wde/b9cxd79/000PP3j+7bzMp76qppGBklDNYA2f6kkobMu6XHzy3/M7lD12z/DfX/+53D3/05KKX7738oYOf7C0NBsomV1Zmy4p1lHU4LldOi7qd6gFN31GLrCczOpV2ODGnJ6a3DZ44HVGpsNHB2e4zIWlvTClK6xRpnSKqkoWV8oROl7VY40ZrwmyPGfUBrSyol0TNsqBeNCvvnhb1zogHYgZTzjGUMOijWlXapE6bVUF5T8ogK1j1ZYelZLdmDMaoWhnTK+MmTXbIXHKO27p7PIZh1UnpPVfc/9S9by+5dcW9d3x81xXLH7rsntMfbqhPulxnzpxZvWpYJKtmKiTZylX4Kg3yZYakajWu8TckfvtfAd/l4IXtJUiqBmOWBMmVKzgsW8BwptkC+QLy6arPPN4Qw9aLperd9zxYQQiaEWB6/zvvfljF6MOHTuzfd+T0qXO7du49dPD4kcMnd+/aFwzE4DqAY0yNa1bKeD5XqXHNYgGFfl1opRBfCwei1QXr6S9R6Q81FqTSeh3k8zjDtBsN0GqBdhsIAmg2Qbv17Whd8NIfipvaAD5G34RQB7AshKs1G00APb31BqiUMYrkqihZF9ooQnBsHangBM4wNE+RHEVy2Uyx1QTlUrXGNQic+dpaxRmaxzGmLrRRhGQZAavSlTIGa1uzmRJFcjjGlEvYQtQ+75CZB7z4HWlT34qFPn8hLOTIXYhi5322FyUTCXwbAhInZM1563beBq2i1HxFzTcvoghZ41uVKlVBCJriGZLHykS1hLNEDWKeTTH6PJXiLKBYUKoIKMpXK3SdroN60yQSHduyYVTSk59wZIeMKbOqNGQs2HQBWa9f1hfVySJaqUfaHVT25+06ZNRScOhTBkVCK4+ppXGNIqnXpgyGuFYXUSjxYUdGLa2YFO7OAwdfely29t2irh+kg8A7HZaK/P09Zb1OsFtBxA9yMeAcNKx5e/vSW9+78X8eePFBz7k9/ISGGdbklb0FuSTWI3Kf7MdtbnoyvfPNLTf80y2P3fTi6/dvuvMnL/30f7v7lp8++cCNLy65/JEVT3ww3WcjhwJF1RCmG6xozXmjIW7SjMnOjStE57bv2/3uZ4p9p5O28ZDWHFSocxZLVCMv2Y1xrTSiEqUMirRBFVQMuEU9bnF/SKUMqJV+tSig6Y+YxEm7ImlXxSxK10DPjEgU1ZvT1sGIWhNWq5IGdUwnzVvVJYcubVQmtMq0QRdTqUMKWdpsCGmVHrUiMzbqNdlK7rTqlPqqf7jl1l89c8OVH955y/olV71y0z8t3vT8u4I/7JKKJYcOAK7WBgBlQAZrEhwol2kWoRukQBOXqPTPR6VolSJIDq54OMGWK7g/EG22QDZXHh1zrl23KZMtoVWq2QKtNvhs/eduTzCTLYnEik2bt42Nu2hG4NhGLJqempyF5eN+XwSpEC6nu1EHAX+0UQcC38YxptUExQJK4Oz8avYnesguUekPNRakUppuIQjbbgOPJ9bbqxCLtUePnu3vV4lFEIoLIBeL5FqNUasx6rRmvc5i0FuNBpvJOGgyDjpd7m9FNleOxTPhSDIcSWaypWgsXSiixVJV4FtQDhC0ATzn2DoMmkIPBtQRhObm+XcCUBfaAADQBgAAvtaE57WaANqAZWvwVfh+Xmh/K2AtMyxnFurgoovfRLMFvhWt9rejDb4drea3Y6Ety0IfVBe+HVDJoS6ARh006qDZOI/5N1x0HfaRhSoqrTqoUUKN4Ns1wOHfTqUEDYQ6QNA2ibeICgMEUEmklOc6VKePzWhlcYfBqxqY6j8TUPRkTIqMRZ0wKpBJOzrliBqlbunZkKa/4NAio6aMSRHXSqMqSUqvLtgsRbs1bTRG1UqfuM/d24Fa1SWDSLzqrQ9uvVyz4SMwMwKycRAOgbk5YHMUT54e/fCDM3ffsfbf/n777dfKV/wu0bm/qumqaHuKhv68UZI0KnKD1oDOzPoz6ZHIquWrb/2HJff+fNkDv3jxsv/1kft/9uET1656YdG639756c3//MCN/3jHu8vemZI7qrPhkNac0BpLJgtqNAiDjrGDx5696YFFP7nxlfuWD3WpiLloRG+bk8jwyYmc1RDTysIqccasKQ+bCoPGtEWTMKrDGllYIwnrxXGLOG4ZCOp6ZmQdU6KOWUn/nEQS0ZkSJltYpY2oNQmdJqwSp43yokUd10oTWiU6PFi2O3IWC+6aMh49bD59clKu0nX07Vi57cWHXnvg+meX3vbhEw8c+sU/vb38ns3X/+PdHz/zTnxo/MSOL8waGcZQaKMdqnAlHjB1wBHNZolulSn2h6t7uYQ/sRjmQo8XnF8UzX/51YFgKN5sAV5op9IFiuYz2ZJEqjrX1W+1DSeSOV5o5/IVjm1AQyWTLuIYA9oAqjGUitUa14Tx0Vy2PO3yNBuAr7Xghh66zSiahzV4Nb51iUp/7LEglRaLZCaDttvA4Zjo6OhzOr1W66jXG3XYxx32cYd99AKMOOwjWo1RpzVBHjUZ7WaTw2oZsVpG+vql34qjx053nu3df+BoX7/01OlzJ0+d7ejs6eoeOHb01N49B7/6cv++vYeOHT11+NBxiC2fb1+3duOerw5s27rr883bdmz/8vPN2z7fvO2zdZu2btuxfdvujZs+375t9+bPv9iw/vNNm7d8tm7TJ5+u/nzztrXr1m/csGXT5i0rPvh48+fbVn68euXHa76Jj1auXvnxmo8/WTsPePGTT9d9Ky5854XYtHnbps3bNm3acdHxiy++/GLrrm8ev/ry0FdfHvjm8cD+4wf2H/3m8djR08eOnj5+7MyJ4x0njnccP3YGXhnol0GIBuRikUIqUcllGoVcq1EbtRqTTmu+4L4MWS1D42Ou8THX5MTM1OSsy+memfbOzfrnZv1eXzgaSyfi2WgklU0VaYzlSJ4okxdZpTB9F6MahRJLUKBUZIUaQAsEi5LKnh5558lhZZ/PpkyPmRMObcQgT5o0yPAwMz0X0ts8amPYaClNjlenxpJWTUgtCqv7s2ZlxqRKG1QZozZt0qYMurRRn7OYKsO2kHwgo5NWzEp+wtT10asnXn929T23vHndFZsevO+zOxevvObabYtuP/HQg7bXX60c3Y+JOmiDSLApCIM4Kz0bk3TG1X1Jkypo0mXGXV7z5NGNx59e9Mrif3vigcteXXbtJ8uuXb/85i+euGbdHf/yu9v+afnjN7y57JZXrv/XO9a+sb7sy84ahrwaU0Spzcg1YNy5e/nv7v6fN/zmxt8su+U3X7y1NmAay41Oz8pV2UGHRykJaeVxgyqml0d1sphJmTCqI3plzKgN6uQhvSxuVcUscp+mb0bRO6cShXTaoFaXtDgy9uGY0Zo0mzN2a9yg8kt7ckZVxqgu2E3I6Iirv793+9bOLzaPikWDEvG+9ZsNfUq2yAcm0p+vPPT3f3fzLVe9f/XPX/vVPzz8+rJPFKcVfUdOhWamCRItEHipVg+WKKINSBbUyFajwtTLNIt/r369fxv4Mbt+Lsyg0OVGUjUoMU/RPGxOzAttpdIoV2iLRbzRBJFIpg1AsYjXG6DZBIUimsuhpTKWzSKNJiBwKCMqcGwDqVCZdLFUxLOZEse2aIpHETqdKkAjAalQ+VyFYZoMW6eoOknVCILHCRbHazjxdd/oS03WfrTx385vrMgL2/C2SLJFko1KheF5oFIbLNZBnGBohmNYASdY2HkAbnlwgoVR7nmZR5i0VsVoGACvIEQVo6HLHqaDIigJXR8VhCiVsUIRzeUr2Vw5mytnsiV48k0kkrlEMpdM5SFS6QJEOJIMx1OJZC6ZLWSypUQmH42l/eFYPJFNZPLJVD6SSMfimVgqm0jmwvFUNJlJZgupXDGezsVS2WS2kMjk4cVEJp/I5FO5YqZQTudLyWwhlsom0oVUtpTKluBJtoCkc+VYMpfKljL5SipbiiaysWQuW0DypWo6V85kKvF4PhrNJxKFVKqSSBTi8WIyWYzFCvF4Ppksp9PlTAbNZpFMBs1kKn5/MhhMBoNprzfq9cb9/rjfn/R4Ik6nf3Y26HZHp6f9LldgdjY4NxeZnQ2OT0yPjjnHJ6annHOTU7Pw3DXtsdlHbPYRq23YYh0ymR1Gk91gtBmMNo3WNCCSyxVand5yrqv/XFe/Vmfu65f29kl6esXdPaKu7oEL0dsnPnX67N59hyRS5fvvfTQ6MtluARQhz1cSX/C04FQDp4Qa30okcxzbQssUqINSMrd780ZF14mYyzKuPeu1iDwGcdCgRSfnhk7KVj+5Ytl1Lyy95rlnFj1/buvJ3MhszGidkw4kDcqsSZM1qBJaeVyjiOuUCb0ippdHdYqEThOSS8NSUUorzxkVUWWP8+xh++Gdpn1fWPfvcBzaPXH84FzHiUhfV1YmKqmlZb2sbJQmZOfi0q6yXlY2ynNacUav8EvFEZ0pbnXt+WDPzf/44J3//rsnb/78/svX3PXLD+7+1fvLblr7xC1r77/i7cdv/vCp2z+487KnrvvnJZvf21HxlYODM5XZUGp4ojg+NSFWPLlo6Y3/cv3KF94P2qfLsxG3wRa2D2Eed9k1EbcZfWqZVyX2qsQepcirkPhUivz4ZH5iqjA1mRkbjQ86IjZrxGaNOezJoZGI1Z4aHk0Nj8bsg1GrNWAwpO22pF4bUUrjWnXabg2ZDNrTJ80DfXUUqeFVnqJyyWwhW+HoNkeBoDd35rj8yYdff/eVDWs/3BaYTqj61ZvWbCJRguN4ihNwhkeoOoLzKM4RBM+QPEfXz2dikwJBchcutTheI6kaTTdoRph/9T9BqDTdwjAeij8wTBuKM9B0i/y6aQyOC/O9YqBAxLyAA0234Dv/E5IR8y1ocFyA6hMYxlerNfh/zVML/N8htVQxulYDpTLGsi2u1uR5QFI1FGUwnCFJgWYEmm6QVA3DOAQl578lnGCrVbaK0QTBw0WvxrcYtj6f6YMTLM0I5QrOsHVeaOMEC7tgtQGgaF6pNL7wwqsHDpxqt0G7DVCUoelWPJ4niDrPg2Aw3WqBeLzYboNMBq1UqHnapqg6RTVpGn5LDQzj4RUM4y48/75bgUutv3+o8d/O76G+QaUU1URRpl4Hao3BahsiKYatcSzHC/U2TAxrNEGzBeDDBH0IMMQIWxPAR4qkarzQhswKk9NgVfJ8/ACqukMfCHRN1BvgWwE/HBbSwF8HwQltptakuQZTa9bqgG8ATmjTXINkBHidoHmcqlFsnWLrOFWja3VWaDJ8g2R5ihNYockKTZLluXoLotZo803ANwErNOlanak1OaHN8i2aa7B8i2+AWh1QbL1WB7U6YGpNguZpriE0gdAETK0pCACuICwLajXAsoBh2hwHaLoFr/A8EARQqwGOAwzTJskGw7QZpj2vhkpRTRwXKhUGLjrVag1FOXiO4+enOkwogN8YnMDlCg4B9awhEJSsIIRQB5lsKRbPwJuVzhTh3iWTLaUzxflNSTpTTGeKyVQumyvFE5liCd26bdfwyESzBdjz6SoXbbngrpwrV9BmA5RLBF2tlbNFWfe5Eb0sOWedsfV5beI5gyRqtYf143vf2b74n+578MrXHrjqzcU/W/bCkpc1h/sKo66sw1Z0GBNaeUorT2iVKb06bVKnLZqUWZU0qVIGQ0KjTem1eYsha9GG1aI5UYer93jGIk+bZUmjLGGQxg2KpEmVNhuyFn1YORBV9OEj1pJZGxH3FA0K1KyJy/rjSlnObLcdF710x2+v/r/vWfyz1+/61er7rtr4m5vW3/6LN27/xRt3X/HeXb96c+n17y9fsmrZoncW/eKxlx957+T2c1tWbNm6cuPpLw8c3b5j4wcfde47vXfDvtFy990AACAASURBVL3rv+rcc8LYI5s22VRnOla/8vu9q1aOywaogKfqno47LIlBa3p4MGq3Hdu45cjGrYfWb9m75rPdH6/dufLT3Z+s3rN67dHNW45v2dq3/+C2D1d07NqZdjm9NuukVIJPTE50duYcDq9Wbeg84x20h2ens8kYTdM1vl6oVMsoyTBNmm4V89TIoKu3U+Se8kxPzOpVxkP7j5kNdtACUFryD4knBIuRHFR/vCgJbj7GD2frfFL9H3yS359KIZlBPcJymc5mq+k0Ui7TlQqDohyG8fNsShB1DONRlKtUmEqFqVZrFxLtD2KPclwbVqnB/Ay43Al1wHKNGt+C5eww4TFfQGp8CyZtoFUqX0AKRRTmRcLmynAJomgermMkVcsXEAQlo7E0rJJvAwC1ESiah1m42VwZFvsJdTA65tyw8Qun0+/zJWi61WiAYpEkiHqrBSoVBm4j8nmcpluVCiMIAEFYBGG/2aUOLhFwswJPLjz/vt/PJSr9ocaCVErTrWqVbTSAWmOw2YcZtlYTeJbjmy0ApyKMC8Is3HkqhQ9ZjW/BOTnv4oArPnyVqzVpRpjnwhrfgoQKP/bCxJ8LAecDrJq6sACUqTUxkiujZBklMZKDlEnQPEZyJCMQNF8l2CrBwqRTFGcoTiBZHqNYlKAxiqVrdbpWxyiWYGoEU8NpjmBqJMsTTA2jWASnEIyGn4BgNBTPg78OniAYXUIIBKPh51eqFNyVQ/KD+2soc4GiXLVam58SGMYjCFsu0/NPP9xEw2lTrdbgLLrwOkk2CIIvl0kYBUGrFIKeP4ffyUWpxeTXufiw7judKbbaoIIQwVCc5RrzhbDQxzD/3ZYrGMvVGVbghda27bv1Bgv0KCxIpSxfwUiSFFCEbrCgxbWcg47+M4eV3YcC4xrfoMpn1aKz3o4Ne5f8y6IX73hj2U1vv3T/mkeuff6G/3H9l+99VhhzRrUqr6QnppYm1NK4RpHSqzNmXcaqTZlVCaMSpiBlzcac1ZDQKwKKPr+8O6IZSJmkCYM4phNHNANhlTisEkdUiohaFlaJveKuokUXlQ34+7uyOmVcOpDWyF1dZwv2EflXp5ddt2zp1S8/vWjdDf/81k0/ef+h69Ys+vkbS3797iM3rbrv6veXXP7agze8+Zvb3lp8xVP3Xv+k9KSaKwlospz0BsfNZqJQFPB6iwLlOKIXa4/sPNBz/LR3dJTKpVNu16Etn72zfNmxrRsDg7bwyKDm1IlDGzfk3P8fe+8ZZddZ5X3Ol5lvs2b1mlkzb0+//c5L96JpQpuMA5hkbHBjbEx2oAGDMc7GCRswOCdJtuUggS05yEGyUuWonLNUipVvvvfk8+Tn5PPMh33r8XVJJSxaYBrqrGfddevqqKp0dc/5PXvv//7vo7XDo+bwpD026YyV3ImiN1lCxdLkvv2NY8NrV66yRkf3rVv36F13DW3cKErFscE14ZEjBzs6vcNHtra33X/7bZWxEaUywqiME49wzEJKY4QCyZVr8Zeff+36n954xy2/WLWsrV6xVKaghDbjkJ/jIArNaYBSLVf5o1EKn3k9ErVeRxMTjZGRSr2ODIM4jvC8AC4Qy2KGQep1BKytVNxGA9s2B9ae6g893qEQ4xjj0Pcl7PUZjwzTmyxUK1UTUmtJqoRMiqW6kMlkoZorVSzVK1XTshHjEezgIb6sVE1wI4JueEKDWt02LR8oC6Lcl195A5xvX3t9+cZN25NU2Q4Gi1DGo8E1G++6+zeWjUyTZpkKQwUbC3gfCEmEUL4fCqEgF+h5AYxkh31J6+YDbgWwWYFtd+vzWZS+W8fJolLPE3GsOjp712/YIoMoSmIugiRVcP8FeY7jEtPy9RwfwCfsy+C5ZSOAKPh6QM0gThSZ6mIG6EKi2HbwqaKUitjxWd306qbn+AzGmIBHD+ER4dE0lLIgJiL0CLd94lPBw4SHCRB0GkrhHNujLuIu4pZLHJ/5RLqINyzfRRx+iou47VE4zcPieJTCE8tijiMAq7AZB5TCmQhFcF3p5zOhtFZz4Z9vmF694cBzcFGA+yNo3+GtdlwCW28gbr3hVGuWaflCJvWGoxcIvkzLt2xkmK7rEQDq3HnzN23eDlmEmVDKZGK5TUe6LFYqVY3J0ooli++/44Y3fjfn8Ka+0a2bhnrWL338xWsuuPqiD3373z/yg+9fcPvln//xmf/wscdvuNPevWe8t728prPS117qWT3ZvbrQ01Hs7yoMdI0PtI/2rS7090z2dI13dYx2rjq88vWh5a8cbXttsm/leM+y8Z5lY91vjnWvGOtaOdHTPtnTVejtLvX3jrSvHu9sP7pyOdm2HW3ZvPvFxcb6tZM9Pd6ufSvmPP/lD1zwpfd/53ufu/u8D93+75/47VnvueZz/3rDxWfd/Y3P/Pr8D994znv/44tn/Ojic6895wOXXP2dOypHHBUr6YqUSbNUUFFUrzjYj7JYqUxJEhTGxs1KReXx+KF9fr2EaqUt/d1z7vn1/bfftnblysTzaqOTVqlOLT/CImVhQkWIqPR8lWYRJiHCKhD1yfGON5fOf+yRhY89+sJ9D+5Z1bb62YW/vfb61S++xG0rpHRiYsL1EJWRiziTCSGRaeJQqjRSsUiPHDg2cnjMaXgwY6BcangubbXtbL0oju/O0kzV3dLwp38cShGKILjkPAfpYq3ml8sOkEMnWgyDlEr2xESjUDAnJ43JSaNUsut1BLEpzID7I1AKBIVLxnWl47BqzcJEchHDdSGDNM1UnCiExehYEfoIJgtVTOTBQ8NNzR2PYPsIzgYQzkZx82/pbC3j0choYc7c+dded/OcufP37T88WaiOjBa279i75NVlixYvae/oHZ8oP7fghRtvum33nqEgzCwbRZFCKCqXHYSiPFdSKsMgcawYyzwviGNlWQwepVQnGaLe+uT4F2dR+uc/ZkQpIYnniShSbe3d69ZvDsI4SmLKBNj7ISziRCWpAgTqYbPwqW3FqucziEHhjgxp3jRTwFHgLpwPH9+ZFLM6xgL66mQvFbFPpO1R4CiTCSRyIYKEJ4BADwvbo83pm1PRJOERfAfIBkOiWIQZD1LCIzgZ7kSQJYMXbY96WDCZBLESYQbfGbMwTFQYKqj3QF4XbihCKNiPE5IwlsGL+rKHG8G03aWuNumJkoxllMamieHfDslbeA89n2nte+uN0kf80OGRUrkBQK1UTdDy+YhPywPrbYqPmI+YYbpcRE88+cyWrTthMNwMKE0wiy2fW66QUrl24DtcxbldroSetWtt72tPP7V26UrvaLV/Uc9l51z57U/94BtnXnXpWT/43mev+NaZF7764OP2zu1H25cam3rrgx3V/o63aqUDXRODHRODHbX1a8Z7Og+tfHNoxesHli8ZWrFkuOONyb6VlbUd5TXt5YEO6KIp9HRMdndOdHdP9vaN9fabm7YW+gargxvdLTvGOrsKff2FwcHK5h2DLyy/8otXnPk/LvjyR356/odvOf/DvzjrPddc8OHbvvKx2z73/ms/869Xf/HD13z17Ou/cd5NZ3/wkjuvfcgscuaEvoXzOKHE8303iJWLo9FCbbRQoTJKlZJh4Hi2UkmaBBwjzzLNSsUolz3D4piEMonCLIlVlqo0UVGUcC4JYQiRWq3GGCuXi5RipbJarXJwz569fWvbFiwq7TlEy4Y1WQ4pF0zmSpku8qi0PcqDlLHEMBAlkaAJsgnc6CiSRs0xag7BEjxxAKV6twqXwLQ2CU1WjVLSYvWFiTxVpAEpoRkd6heQgYQNJVRGfT80DFIsWmNjtWLRKpXsatUzTaqzMieNrqITLoSC45fvyyDMPJ9BEAn2ajCXCbyEGoYLmV4ILj2fQYkK2vOyXMWJgojWdvCu3QfGJ8pQ8ly0eMmv77l/0eIlu/cMwd81TC8IszhRxVL98JHRY8MT69ZvWbmqc2S0MDJaKJbquVKWjSAGDUMFpGQsk1LpPTfEpoxlrivhvZppMEDrk+NfnEXpn/+YEaUYx54nwlCtWt25bv3mKE7jNCGUQ32UshD6RqDSqRO8jEdQBAXawTmQjURYwGcU7ua66jmtYjpTH2erU1JrgQdSr7AgLoQw0bARBIuGjRqWb7nEdHDd9Fqf100PokkgMSxAJoSblkv0H5kOhsDUcknNcCEIhsAXXoHbHKUppGchAJ3SPkRgJq7LRVoWAYGp5wW6XAQBq2lSONO2OZzj+6Hr8nrdg3fAtHzD9EDzBQIuCCtb0Qj7GBmk0NBmmN669Vvu/MWvX1j0Cvx1veDvWjaybB+iUsbDhx5+vKd3EJIKJ0QpognmWd2ilhNwqVw3dCyehYr7VCVKiSgy8caV/d2LOtFRumXpvvPff+nH//7z//p/fPiCD3zhjsuu3vrGG/6+7SPdy8oDq2oD7ZW+9kJPW6GvszTQXV7bW1rfU1zXXd84ONbdcWjV0sOrlw13Lh/tXjHRu6o40D7atXy0a/lIx/LR9uWj7StH2laMtK0abmsb7u4/1rtmvH9D+7xn7//+1asfm29s3nW0s3eovWt0cOPBni0P3nD/Fz9w8bnv+96n33fVJ//nj8/70C0XffLuL51x8zn/cvWXP37Txefedt7Hf3LWB7/zofecd8/tT5Yn/YCrKMwwxoT5YRY1fILCjKXKEUHDJzblDmeG5yFGx4uFSrUO9yTLcirlBiVShBkWkYuk6RHLJTaiLuIu4alSiVJESBIElYax/8ihhu0opUjNyW0W2zxGATKRUbc9n04Ua5ZPfRZYLmEyESJzbEpR6FoUO1SyuFG1A56oVLkWhmF8x6MUE+nht/UdtjJV53jJlNXcH4dSIKXrSp2HnCrzR1oKAPUOwyC1mm8YBD7ehCRCvCUgOFWUui73POH7EuOQ0pjzVIhMyjyKlY5HGY+qNatcMRyXwJBHIGuuFHj1MR41DHdsvLRj577unsHX31ix+MVXX1j0yqLFS37//Etd3QO9fWtfWPTKM8/+vrtnsFiqMx6Bm+74RBmSxoQGECfYDoaBxEDfIMx27tqPsGg0MHiyMpYVixakcyGtreNL/Rw20LCm0RTy5wDj1uezKH23jpNFpb4vo0itWt25fsOWNFOZygnlMkiAfABLDULYvsEWT9dNISsCGUjXo4BSiKimOSHoPfJMlg765FZTBcpCiCN5kEKJFIJIKmKQHYEsqDVadXxGRSzCDOJLwiMRZhBZAkThZBAu6e/WmjSGWqkuncKZ8FxGud5jagUjPJl2u4GLBGZd6fsLxjFIkAhJPC+Ac6ZFpTPJjnTJc1oCHGFRq9vFUr1as3KlDh8Znf/0wiNHxyAD3BqbTjGYIMw9n8aJmvfE02vXbYKc2EwoJSKv2tz2I0RygnNOlWeLWsH0qn59tN61pPvqb/zsmq/f+Nrjq/Z2jNkHwq0r9vQs7tm8tL+8ZQ89POTt2TTR++bB5S+UepeXelYXe9tLA93lgb7iYPdYf9uxnpXHulYdXL1saNXS4e7VE4MdYAQ/2d8+0rVitHvlWE/bZC/UU3tL/f3F/oHhvrXVbftee/ipH513yRfec8ZVX/za+peWFjduH1+/ubRt76HBHY/c+tD5H7n07Pdd+rl/+9HFn7nrvDNuvujMu87/6C3nffiGSz//iws/fcOZH/jOx99/8S9ve9q3VZ4phKKRiaLte0iQum+5MijarsUlSfOajyuu7wWhL0MT0yhXUaoMG5kmBnFZw8I+i0wkGjaru9RGwuUBkSkK4vFS7eDoeKJUw8eGiyKlCtUGZQGxqZJKJWpo5+FyoZ4rNTZZoUHmYElkajrYw4LQAPlcsti1sGeTJFTY4/WaXatayOdJrHyPTZsgpK+v4yEKUekJUYqwOFWU6gJHa3lCB6atqchWqS2EofDh/0PzU0+MUt+Xvi8RCgCljCVA01rdxkRCpzjclOJEpZnas/fgXXf/Zs7c+StXdXb3DI6OFX/z2wdXt3U/8eSzi198tbdv7b79h8cnysVSfXyifGx4olCsTRaqR4+NHz027noUIlEf8WPDEzqiRViANASUTZANgq4ESB1HsYIKKCEJbBqEUDpC1ZtveAcAmTPUgGMtVGwVLf6hXcgsSv+Ex8lqpRiHSaJWt3Vt2LgVPi6UCRkk8LmE1GKSKqCjRum0qBRSu3D1to4sgKi01ZhDn3PyNQ29IKwVYYZZ6PjM9qhPJAh3NT4BmUBBw0aYhTLKqYiBnUBWHdcCLzU+MQu1fAm+9Ik0HewibtgIbPY0xQmPhFA6bauzuEDT1pYAvUPXdVC4oWh8wj5dJ3tJM3sTYdwUGcGbABcwaPGnCUlggWcYDAwwTI+ycHSsqE+bBlTHJYRKx8XVmilk/NT85zZt3g6ypplQavuRQ9MoU4YTVMoIo4yhXEVqsGPrzT+++9/P+dbXz73iG5/54QX/9u0fX3jnmpd3mQfc0o6Jwub9hU3bdi1/fdfSF8wtXfaW7smupYWulYDSUn/vSE/b0Kqlu5a9tG3Joh2vvbh/xeujve2FNT0TA10jPW0jPW3j/d3j/d0TA33j/b2Tfb0TvT1j3V3DPb1HetdHRfvuH9zwmfd85LJzL7rgA2c9cM1tzqGRzW+2jWzacWT97gUPPnv1N2768plXnvm+b1187m3nvv+n53/0ps9/6NrP/ttPvvSpa88548rPfvyKy795x+rl20KpRsfNKFNERiSOqq5B4gDHSR0RFCUoSkqmg4I4UqrmkJqFDJf6LGJSIZpYrnBdiVlq+4HtBy6OEEupVFgkNhJ1GyMeh5kanigZLm446PDIOA3ihuUnoaJuWJwwVKbiWI2MV6JceTR0sKRB1rD8huW7DkE+B4LmibItRLAEh8gozGFg7UzzaKcRVFdMj0dpU9Z7iiiFXaCuZUDpVIdZOkglU50wWsSrszVQ5jxVlMLCOIS8ru9LzxOeJ0Bbi7A4eGgY/G89n3V1D/z23ocmC1XLRhs3bV/d1t3Tu8Z28NZtuytVE4S7XMRx8pYJCtzKoG0BYVEs1aFDNEmV1v1RFkax4iKu1ixIHa/fsBVi381bdsI1ODHRCMOm7AihCEqkgE/XlZznlsWiSPl+CHydRlCtQppF6V/acbIEL2NJlqnXXn9z776DaabSPAvCOEmbY/agGp+kKooVuAIBHbUoF/S6OhUMQIVShD5hmjkfZCMh/Qt5YOAxnKbroxCVwjlQ14QwlPAIyCqjHLRCOt8LiVyfyLqJXCQJTxCNPBxgFhOe6EdEI8xiKlImMyYzwhOIX2WUR6nS1VPgMSSBQdMEPx2zEPpeoBkGPtk68aK76PR+U9eTyFR2SxdNPS/QdRRIEVOaUhrrrnD9jsHS5iYgmtC1zyRVAMta3T58ZLRUboRR7noUkrrligHuoIViDe6tkN01LU8GySOPzl2/YQv0xs2EUsRyLNVk2XVxIoWqVUkWqhWvDn7zwqs+97Gvn//Jy7593rWXfuaaiz754/PPuPIT/3De/F88fWzN7urOA4WNG4d728i+TdW1q8p9bzYG28q9bYWejvJAX2Ww/0jHis0v/b5z/qNbXn7+SMcKY/umfSuXjvZ3jQ/2jA/0jfR2D61eVVq/brinu7xh/bG+nv1tq0qbNmxd+ub+vg3jOw7tH9x+8+XX/uvfvefmy366s3P9ppU9o1t3Te4eWv77V1a/uGJo08itP77/v//vn7j0C7d8+VM3XHzu7Z/54FWf/9jVl3zxlo+895KvnffT/o4h6iuCFSKZR0OXCJNgA3sN5CIeIB4gHsJgHI+GHg09EiOawJpK6mQUN5+g1jV1mk9in4Qtq6kJIigmKMU4xTj1ceqRGJbPIp81P37NcBMHDM84pG8m40nI9MJGqlX4bdkIXO50Z1pTd3PqKP2TLtumuVKgXkwzBVtA0/IxkZWqiYkE5W25YqRZ07asWrNef2PF43OeemXJ0gULFz01f8GatZsgcwbhuJYX6XhAD0eDCWW6Ob41BtDSpBOuGa0b3u03cBalf6JjRpQiFFEap6l69bVle/YOJWmeZKkMIhkk+sYtg1THnVBAhRdlkELMxHgEtrSgOYKPI5ymu2K07B5ImaRKf17hZB0B65+izw/CDPK3mmSAN5AgQXCp+QegNWzik5CKFMAJ1NQc9UmIaER4QkUK50DyloqYBymA2cOibnog4mhFKfysIFCwT5SyiUbAKpkSIgmhdLVDShUEzS8h2wOshe283raTt8pI6UwobQ364S6g/4+OHB3TE50W/m7xz2/9xd59h6BEBFok0CVCEv5UUdqwJZWqYYu6waRUcagEVvff/ez7/vtnPv2hb1587rWXfv7G737h1qsuuufyL97++fdd8q1zvtn+7JLCpu1jawePdi0vr2srDSw31rWVe1ZW+ztq/T2F3u6R9tWH2t481r1ibKDd2bl5vL97qG35hsUv7Hlz6Z43lxXWb5hYu66+Y5e9d7+xa8/uVW0TGzbVdu/Z09HpHDpaHTo2755Hvn3+17//tct/fd0vlzz18rGtQ5kr167qvPhzX/rBNy4b2zesIhXY6rlHlv9f/+sZF5593WfO+NFXzrn+3I99/5//2+e/edFN6/uOxVJhpDDKfJz6LPKodJiwGbUowTygbGruB4kw1iWuJj6PXxqrU48JIQlBMcYxwSHG4dSjnPpuqd/k6AlQSlpQSslU18o7QCmgV4qk9aKDCp9hekALjVKd43237/XTb/1S5lzEI6OFcsUgU1Z8uVLwCR+fKMMHPgizw0dGP/bxs7560aXX3/DzN5auLFeMOFGUhY5LIGem9Rl4aojKNAPb1jKKlmXp7lLYcMw0pmIWpX9rx4wo9f2QkChJ1JJXl+7ecyBOsjhNhAyFjEECCpzTrSytql3Y7sHnSfc+av8j+KjB5xhe1K9TFgZhBhhoDidxCZymd4utOnUuYsslLuI6nQuFTGhWgZSs1iUB82qGb3vcw4GLpIsksNNFEjjq4cAnoQ5SfRJ6WEAXKeGRTgLXTU9/W6iSQj8rFXGrqYJua9HiIzIlcYR0FrzhIDICRZLjCKgzwRPHESBJmErjhIDSaaG8tuNvbbGHyx7mDB85OjY2XvIRnyxU73/g0Vt+fufmLTu5iCHrC7II0/J9xE8JpYQklhNiqihX9TqiNA2lGj5kXvnNW774qSsvu/DO73zprs996Mdf+MBVl5x10zfOuelrn7jy3Pec8+L9T1S37h5fO1gY6BjteqPQt6y+ZlWh881qf2djsK/U3zve3TbS01Za32NsX3e0c+XEQE9p/drS+nXFDRsPdfYYO/dtem3Z4zff/vD1t+xs6zEPDhsHj1QPHBx4/Y0X58x78oFHli56bd+mPYETSDtsf63z51f//PofXPv68y+v7+oLPRKh4NCOo2aR+zW1dNH6H3/3t+d+7Mqvn3/jzVc//uhvXh4+6KlEmfUQ+SlCiU9in0WIh4iHiAc+k5QFjGo+RRQnBKUEpRTnFOcMZQxlDCdvLZRRnL3tEScUJxTFBMUUhQSHU4+S4BDj2CfHrxDRCNGpXVQLIPHbW1w0VlvxCUtMoRQwAB8PEMjU6jZcgGRqOthb3+3dv92/7dZvmhjuHpC2LRRr4JjGRQxDs+Hfsn7D1iu/fxX4kAyPTEKq1nZwsVRHWEAKF+4h+iZGpppup3Vm63x46xZ2mv75+DWL0r+142RRKSGRjkoBpTJoyotaP0bgCAhVfX1D14EjWAxCeAqWgdOSSND+2KqXgQ2yjzhsln3EwYVLbyTBdxDOb1g+tLhAEwuTiXZOAN8G08Eg4jUdbHu0ZviWyxxf2B4Hpno4sD0OHG3lq09CF0kPC9PBUEDVxVTDRlCXhbwxoBTESsBFQCPMeTUMAjgENOoudRD62jaHLvVGA5sm1UJf06RwMtjETNnHhJTGJ1Q4t/YLavMaysJiqR7FamS0ABuRTZt3PP/Cyz/80U/37T8MN45iqT4xWRkZLUCO91RRSmluWSIIFEYBp5ljiE0DQ1deetvZ7//OV8+56aKzbrvoU7d/57O/vOSsWy786NXf+9w157//iy/eO7eyaedoX6+5ZU2xb1V9TVt1YFW5e3Wlr6PW31ddM1DfOFjd1D822DbU9sbQqjdrmzYU1q450tm1b1X7jmWrxtZtfvDaWy773Fc+8g//dM03rxzasOPN3714/ZU/evXZhZv6+g/t2pvKWKXKq2O7ggKUhjhhLrdrZh7G3MdmpSH9KGWKWUq6SglFTVU6FtYnooirLFSenRh1inFMSERps3AAOQ/MQkokI5LhgOFIw5KhjKF8CpYJwwklEcNR85zmCcdRFkdvXwElASERUHPaar7zb0cpmTJeaL1ZHx+JtqKUYAk1cmhL0yaxOupq1SJQdqruOX/yW3+SKtCcw94aBktADlbIZPuOvT+5+rqFv1t89Ng4tMFAmwrCAtzhtS2R3r7reVA6KmjFYesl1orPt96fmT14Z1H6N3WcQq00ydIgjGGUQWuNU1uH6GAU7uaQm4V+DF2W0Alefd22Zm51nArlUvjIgrcD/EXdtKprGK1RqdbxAk2hXKqZB4Gp7XEPR1CsQjShIscsdVHok9hFoeMHLgo9HE19KVzEQTaJWQjfBGRH8G1Bynt8VNrqWwTPoWMMdP+6CAqRqGlSsD3SASv0xhCSCKHARBD+VhCok6O0dVut019j4yUI63OlHnv8yfvuf2T+0wuffe75ZW+uLpbq0BwMyT1Q8J4qShs1InjKcJBGivvp1rWHr/z67Z/+4JVf/vhNX/7orRd96hdXnHfftz5z58Wfuu6H59/06X888+lb7xvp23i0o8vcsq480GFv6HU29Nb6Omv9PZXenkJvd2lNT3lDL6B0crC3vG7dkc6u4e7+wrqtx/o3jm/c9auf3HT2P3/4wjPP+9q5X3n0Vw9tHdxcHCkKxCZGRk2j7lh2IOI4yBlOIqniQNmG7xqOUa0hx45lIEnoGYyY39G9hQAAIABJREFUSYwVaigVK46UbymVKseQk+MNmL/RHOkKsT5UqUlESUCJ1CEpxQnFGcV5Swo3oZA5gNOaJyRvW1OGxrT5DU+sDJoJkK2vtzoZzYTS1hl5BEvtjA35fxAxTHM70uHau32vn37rpyysN2wfMUyEaXkIcx+xiclymqnRscL1N9xSrZm5UsVSLUmVZfuVqgkGRloaaTu4VG5olfvxhZITAnLahlVroWdROnvAcbJmmBPKjoIwbXWuhzYVoOa07s9pKAUtjL5idRlf97pAuGnZyDA9QoMgzPRH3HEJDNGFfTTEuCA3gH4VHTeAWwLwFRK8QFPdMGq5AmAJ+CQ8A72lT2IPRxqlcILtcRdJw0YQjEJc62EBr2hCa2clwqNWs4XWfi/Oc9eVjQa2LAbVU2g2hS5SkCzC+UBf8OcEAEPAinEcBAoMx4/fLOtgYlo5B946TOSRo2MNw603nAcefOz1N1Zs2ryjrb1ndKzo+Wx0rFir2wiLas06VZQykhMUE1/Yhp/ILGJqaHvhWxdc970LfnnlVx659JzfnPehW7/y4VsuOfPnXz/rhm+dfdW5/9/Zz9/16OTAlsLg2trawUJPW7W/w90wUO/vMQcHq339R1YuH1q+dKRvdXVLf2P7msKagSPtncPd/caOvY0dBza8smLr8r6XHlvwsf95xiff94kFj/+uPmlGLHNMNDZazDKlVGY5puv6QZjZFqlWPUqiOFJRlDCKGcXIcY2KiSwWIoXNzLcy5ivqK+pnIVeRVJ5Ly6U6Z6FegiaMxgwnBCqaRNC33oeMEkWJIm+piiJEA8QkYhwxcIma1u0XQbx7ol0RFGLF1JOAUVjhCVGq/UOaETNQYWoa/AlRylmEp/yuW1mii+saGH+ZKJVBiomQQeJ6BBORKxXFuWG6V//0umt+dsOevUNCxiOjk2B+Wa2ZeMpHHkzZoGzU2sVH3i5mbmVqaxg6G5XOovTkx8mi0hPKjhh/q94OIIRPJMSdrflbxqMwyk8oO2I8Mi1fKx3gc6wbMyAhA/QF9Fo2ApSCsoayUM+W0a2fEI9CEAlZXwhMwVQBwkcPi4ZFTYebDjdsZnvSw5HtyZqBEU0An9NQimgEDTaIBto7EOJUCEzhFbiXIRpoNGohLkSlkPhtNDDke8F7s9HAEKpqowad0a1UXHBsMAwC6V/fDzlPAaXHb5/1K3p/g4l0PQpyDPBzgdtKT++asfHSK0uWrlrd1TBccBmFRJ9p+aeKUk6zSCrfQr6FQhISS/qV+IHbX/j8v/3kix+68dIz773yi3Mu++x93zz7zq9/8roLz/juDRdft/b5FfVN+4wtO6pr1tTX9ha6VjYGumrdnY3+/kpv39FVK46sXjE+2AEjsp2d2w+uajvS0VdYt7W+bWjT6x17ujaNbx9et3Jt+2udyJAqU7bJhMioSDEPwFrYtC0XszxXSa7qdW9kdFIEslIpHT16GCNPZYp5QWXMSoViKMd+Ggjlu0Fhsu65JE8VQZRiRjFjRHIaSBxzEkucMpxgIn0qMIbiZYJpjqnCVCGS+TTzaeKzyGfS59zn1OccTptabyVsWxEIppWwKBOMMcYELE5hBYxI1oyGNUeb3wfxt6EUaNqa3QWOwsRZSgItutEXMm5xCtRQgQ/Vu32vn37r9xH3fOojVihWPZ9atv/sc7+/5Ovf4iIiVOZKTRYquVKuRyYmyyBfl0EKzvLQGEZoAL4x+to5HqXT9qknWbO10tkDjhMOWUsISZqyo7RFdpRkQoZwBULDFiGRVo1rYS04H+lmGEykDJIgzBgP4TT4IyiRTlOTAy+hvAoKXkCyDmfhgw7xa7NvcsonAbpioLsU+j7BdUHneKciS2570nIFhKeIJi4KGxbFLIWkLmR34bntcR7kEHQymcD3hKKpbrPRgiYwuIfcLEiNQHYEKG0VFlkW018SkjiOAM8XKJFClbReR/BKo4EbDQy9MUJkJ8hEkQjRCONQ58OliBkNPJdYhi0YXzMw+OjDj9x7772PPTbnhz+8qru7d+nSN99cturwkZFcKdPyhkcmwQWG8eidobTl04JiQROz7qaxyiNlVZGK1fgQ/uaXbv7EP3/3cx/86RVfvv9rZ9905j9/6wsfvuybn/3BC/c+c7hnw+S6zdUNmyqD/XzPtmpve723vdLZXu7qmuzqnuztq23eVN++ZX/Xys4Fz33/01+98F/O+cl533nm9gdH1+0d3XRge8fG9avXLF+82qtzzwqQFweBqpvIcHGxXh+ZHE1VhrmYLNUJTxw/KFasJFem5QRRGMex53mujQKeRUy5pkRe7DnStQUlURTmgUyQz2zbRR7GPiOIMxxwEguaCZpxmmEMjSthk44sxzRHLEck82kyhdKgSVMmYaoroolPE0RBhRv5LMIsRjycepzCIQ8oCzRHISTlEJjilqgUrPKaKI0xC+GxGebCI4kogYJu81GgiOHAczllYRAoGaSUxj7ivi8xkfAInyI94ZKxP9MN/Z0/ej6LYlUo1uY98cy99z3c1t6za/cBH/FSuaFNvEdGC0DNQrEGyS3oxiYkihMlRFatWaaJbQd7nsBEtr5vTVlfyyuwedUD2uB1eK7fseMfm4XtaY/kL25rMovS03VMG/39tmZnLuIoVs88+7tjw+NRnAsZMx6miQoDBTPzpFRhCKPEMsKTOFOWy+omSpVKlfJwECaKsoCLQMhYyJDxkPGQi0gGzZbTIMyiWIHRVxgqSpuzZUDEpPMwuqjTmsYEorTacLcWNqZZOkBkHEY5ognhGZOKSQWFUsxSwjOIRP2pBkGgqYcDoFdrToxODWo9XphAWej4AZRg4XvanrQ9CcyGHwTMhgUvuii0XGHYzHQ4MN5yBbyuo2efxFTkUuachYJHcuqfhmjkk9jFUZioUtXmIuYsHDk2qnKlMpUJ9vScB15b/Mz6vrZGZXTs6IGd2zaOjxx2HeP53y88fPiw5diGaWMeWB4eL1Qblg9SLxg7NXfe05s279AGLsftr8GwTSIvJDjEKPBc7trCdyPiq/IE/e0v53/83778//zdB//vv/vXL3zmG7fddP+9dzywraffPjo01Nd5rL+9sq5npH2Zta57YsUb9a7OSnd3obt3uKuvtGXn0TVbN6/qveL8y8/+x6/deMlDF55x2Wffe/7jtz92dNuh4qGJhXOeW9ezuVHy41DZVlCqupiFPA5N3/WpaN7OptpUYEIIQs3tl+1g2yKeIylOJFczff7fVs6cqnG+/dafEPB7ank8PvqcajY94WM09dgiLDpu0ZbHGW7HM4KnWZdteTxFdP3JVxAoLmLAD6UxuD0jLCiNZZD6vsxyRUjkelSIDJrB1qzZcvfd9w0MbEpTZVkELAM5T31f2jb1fQmWgb4v63UPoYCQCJzCYEwhIcnUFuFU343//ONf2ppF6Wk7ZkQppFjjRD373O+HRyYApZSFUagEywlJwMFHNzvWDD9MVKpUnCkZKccXdRtTERMqGZeMS8oEJgxhiokgtDkaDHpD4ScylrguhzCUTc1c04WcaYJ1TTIIbeHL1g4wqKpOc/cVMnH8ALAEtNPUbLkPao5GLpKAUtIilNe13tYxNTpBBMEuZinEu5YrAKU62IXUMRRlXRRSkfsktlzRsGjDoobNDJs1LAqv214zjIa/TkiEfMYIZzRAWNg2bVjY8qRH4obNDJtMTFYI4ipTwwcPPvKb3y565ok1HUvHD24j1kSjcJg6Zd8uB9zbvWPzC88vGBsboZTWG6btExezcsOuWV7DcG0HQ+J37rynN27aDlOlZlqtTT7aJQ6mMCaJCgI1OWkcPDhuWWxkpPLM/AVvvLBw75qOka1rjq1pH1/TXhrsKPWsrnStKratMNeuKfQM7Hpj5eGeDeVdx373wNNn/tMXvvXpO77wL9d+5SM/+fyHLr37uvsmhiaefGje4gWLi6N13w5DqQjObU/6VPgc29jFRJ5wnoY2i9HCLkKSU3eHmV2ndzXdu+BSwi2+huAmXW84laoJPeg+4mPjpXvueWTNmm3j43UYnV0uO1KqJFGEJHoiE3SOIRSZJm210ddG+afuVfvXumZRetqOGVEKNc44Uc8teH5kdDJOFBcRoYGUTZ9MyDdKmTOWIBTEsSIkMmwEHvFvDTXjIRcBFwHjEhPmI+IjhjCH4ijUU/UPtSyiq6fAKrhfQweY7p/RExZBPHxClGqjfCCxvlB1Xhdop8F2PEcBpc00TosyudWcb1qPto94w6IQRPokdvzA9qTjBwBCXYt1/ACWi0IIXk2H101SN4mOTXmg4I/0ybYnHYd5LiGIYsQdl9RqbrnmGA73mj9OHDw0nET5prUbB7q6elaumjx6qDF5JEC1RuEwNgrbN/RNjhwqTY7s373jzWVv1Gq1IIiqNbNuuYgGpsdqFqo3HMtGDcOlLJwzd/6Gjdug7DoTSluNVVtt4aDuK4QCgRXc+Cql+pz77h1c8drhjYPH1vWSI3vZoV2j3SvdLeuczetL/b3lwTX2jj21bftG1u688dtXXfjRr17x+Tu++9m7vv25G8967/nXXXHTmraBV363+MCufVmgGMoIyoRQVOSOzyzkIcFmQimZsjMF5APvT32Sxuw6vSvyfamLtbAg6xPFTYu+Q4ehDOGPjZfu/MWv9+49BhUTKRUIDrJM1Wq+HhHRapqvXTlbba7JHzNB5a91zaL0tB0zohQ4l6RqwcIXRscKgFJMJJgvQzwKZpKcpwgFhoEIbToKxZmSUY5ZKKJUBlEQxkEYyyCC2JSygIsI1HRNc0EaQ47X84TGZ6sKQIvlUIs7KJ6ya9E11Nbc77Q+VI3SaWADnrW2w+vw0ScxopFt09YZZNrYFrVYxrcKEDRKgdPw4yCrrMkNnNYpZduTDYsCRwHqmKWQfG6lr+UKyyLIZxhx5HPHJYZNDJtYnnRQ6CKJiRQ8Vkrdf8996wYGVZYho5Yy98D2dZXRQ/t3bBg5vC8WRCXh5Zd9d9uWrZblECorVbPacFwkLZ8bNoFxVPWGQ1n4+JynAKXv3L1FYzXPFVR5g0BhHBsG4TxXmTq4Y+dvbrl57fJlbc8vfPpXdxzoXnW4Z9XEmu7qxsHKhjWFwcHhnt76tt2qbC2fu+Cij1zw1Y9d+a3P3vijr9362TO+MvfeJ15+7oXt6zYSB+WRQl7oWJKQjPDMRdwhhIbhTJk0PWcDJNYgB9MuGbPrXVoRY4mW5estL+OR7eAjR8eSVIHrQv/A+m9/5wohkzxXMBm7FaUg9AOOkqn/7lMf3vk3uGZRetqOPxqlqZQ5FEq1O2ClatoOZjx0XMxFlKTKsl0hQ01TIUMhQxkkQZjqUWsyaDoPBIGCaLhVka/7OqYZ2Wte4hY3Ly3J0e06OpYFGHAR62AU4KTzvUAsreAF+FGRGgYCe1K4yGdq39QvAg6hLAo/SJdOdZzaKhLWtVLT4cBRKOVOa85xUQhRKSWB71HHxq5HwZjJRbJh4eHhIiaSkqBarS9d8saOLVsDQg7s3jHY2SaRdWDnZo4clScjhw499tCDPV3d9WrDtnzD9Go1t2FhXZSt1dxTQmnrBr91hAW0A+n2WdBPjQ2XpMtVogZXrD68ZWvt0FDbogXHNgyMbhw43N9xqKdtfO3A+ED/aO/gxMCG2oYdL97zxGffe/7/+7+9/8ufvOTyi77fu6Kr7bVl/W3tIeXUY8iXyIs9L/JwhGiAhEA8mAmlkNmDX6/VLuPdvpf9ja8ZUQrGlpjIZW+uvuvu3/T1r4N5n0nSBGeaNj9aUdScm62nnGqOziZy/+D7P4vS03WccoIXPGYJiSCO1E0XYCNCqDQtJ0kVZaJeN2QQEcoZlzrHy7gE2VEQZro04rocoUCIDH6uTuq21ko1SnVLNVyB02RHupY5DXK6VqqFPxqlmKVMKh3/taKUycy2m5PLIPbVzD5eewwzzkyHezgiPKMih3SxDjEdP4CCKFAThMQ6kat/Lix9AqBX124pC10HNwzXcQnhCZOZi2S14R07VogT1ajbBPFXX1yye/uO6mRRZZln1lUaOY3qCwueefA3v7nx2uvWDq4LZUSwMA2vWnVMkxo2qzVo3WCWK+p175QSvACn1lk38GWt5sOHyrIYQlGWqSxTDCfEoE7RUokKXKwYMyZGnnrgnr43XjKO7Bsa6BrfsIYdOVTbuLlr7pP2hu1kz0h5V/HQlrFXnnlt28CWvZu2DXZ0jh89qnLl2oizSHLl+6HjC8IjIiMXcUrjEw5M1iEL5P2AoyedQDK7/gxrxgRvuWLkSpXKjecWvOC4xLJRoVhzXMJ5DlN+LYs5jgDnasMg0ya4teZ1yYk+n+/2P/wvZM2i9LQdpyw7CkMFzMO4iTRMpOdTKeLh4VH4phMTBdM0Va4MwyCUUyYAooRyTBihkrIA5oIB9gCljCVwXQEXWwcsQKja2sWlwdYaL6KWkcU6QtW5YohKtcJIsxNo11o61VTDLIa2n+PTuSdEqeMSyxWAUh2V6u/v+EHdJDUDa5SaDmdSafVT6y8GHIW6aUsKOgSKQ1duM84m0rKRY2MpkixR2GeLFr5wcN/+SqE4OTr26ksvPv3EvLvvuHOgp7c8UeJUeA72HWqZfqPu2TZ33bDRoEaDW07YMHmj4Z+S7EhXH/XgVUIScGgCi0RQhTT9KNzAKPo5UxFJx49MqESFnL3xyuKBzuU71/dUj+6d2LZhf8eqxubNbNceb/3W4ba+7e1rS0dKj97zUNey1c889vicB+6zazWOCSNc8JizBFo8qYA+KHFCjkJStxWloDyaTfC+22tG2VGu1Np1m2+97a79B47ogaC5Uvv2Dds2z7LmWAiYL6YHA5O3p3b1UCY9eFx/+W7/w/9C1ixKT9sxczMMkVzEUZxPb4ZJFXjugHKdi5iyABOW50opdcMNN1xwwZcYxUplgwN9SRwKISCvCyhFmCLMMRE6LSyDFAb2MpZ4XhN42oMQCAowmyb2aWJ4BpS2+hG2yo5aW1Na2ckDBXGklgW5KPRw4Ptv0zpB6AnjqFqX/vVMh0PaFiqdulYKOWRQ54IiF3ipJU7TiA5BM6iQdH3XJ7GUOaEB/A7a74LQIArzvXuGbNO7/tqbBnsGJkcmGMI3Xnvd0ldfO3bwqGs4noM5DYCjY6PF8bFKo4YozX0/rlawZUoPpdU6MQz0TpthplAKE1V1BhXIKqWKYwUjbkBLWav5vhupSKlIjR4uS5YTLBmXSmVPz5973dU/2L2xr3F0/1Bf51h/r7Nly9YFv/e27yrvP7Sxb3BdZ2/x2OihXbv7OzvHh0d8F4UyAQ88jEMqUsIT8EyeCaXwCW+VHc3eT/8CVtRshmn1V6IBwmLtus0f+einYLw2JnL3niEu4obhgn6NscwwCPzPNhoY1G2twiIyNV18FqUnf/9nUXq6jpMleKFcMXfe/GKpBkZcjIdhomSkpMylzJsqWR6BLcuCZ5976MH7hw7suefuO++89ebu9lXzn5pLKc1yxbiUQSSDyLJdTISQb9U1GY8YS/TSRVDdxEJaDDC1gAiegxoIpiZBxpi0mPfCGF6NPVAPAcYgAatbPy1XwMTmFnMG6aKQ8ESITGeMYcYnnjJ1AlrDN9fP4fu3xpdAQS0jgmAUrAqpyHVXTKuRYasPMLTHAP59EmMW8yD3SVhtePDPp0RKEXMaREHc3dnzxNwna5W6ytXcx+d1d/Z4jk8QZ0Qil5l1t1a1LBMjXzoWtyxmGKwZkprSsUPPiwwDOS4xLV/IZN4Tz2zesjMIm+1A70R2dPJFceaakWfFnhN5XuT4wvRw3bHqdm3lqqUP/Oauh+++be3SJeauHXjXbnPtupHu7ol9uyXx77vr7lcXv6Qy5TRsu+64NkIuQ/6U9R2NCWn6Kr/b96Z3Zx2vWG5t/4B9w58nqwk7lSBQjGW1mu95QRgqSKRDgwqIbwlJHEdAv6/ns1rdhqteyKRWt5evaH/iyWdrdRt85xuGC64vrkf17Otp613/L/ivuWZRetqOd4pSGSSAUhkpGakwbI6VD8I0DOMwDB975NElr7xkmTXsmUat2KhOxAG9/ZYbgyAwTNu0nDRTmDDDtIMwtR2kLRS4iDlP31otQzcBk1o9q5U+fsvgYhg4A3VQTTiAHxidgAzYR9y0fIgatcJWx3+2J0EW1KrxAZTWai7jUbFUdz1aqZp79x3So4CndcU0HQCmSpvaHx9gCV0xEGsCSoG4Wkis49dW0yVAqelw3QsLE2ziTGEWgy6MEillODE2aRn2zu275s154r7f3n/rLbc9Oe+pkWOjyKMYceILz6Wm4TXqjmViz23aKhkGMwxmNLhpCNsKHCeYFpX+wQTvKV66GXIz7OUE55jmPk1sKkyCLeTFaaBUTMzqxtXL35g7Z8eyN+wtW8tbNv1+7sM/uvJ7OzdvDllQmaypVKlM1SsO8iVGb7X5/s2iFHKbWpMM6htN0NZOX/JnaQIRQoELJszrBVtpy2KFgmnbHH5bSLATkgSBqtVcTCSURcMor1TNRYuXtHf0UhaGUQ4D4KD7vLmHnqFj+F3/j/ivuWZRetqOU0BpMzCVmYxUmKggVkGYySCJ4zRN0zmPP+q5ZhqKWnE8oK5jFJxG6ZEHf+s4Tq5UFKeYMM/Hno+TVMWJgjCuuUT21poaUg9qJj1/DaatQZwKr0MBFcLNZqOLS+DX1l5IaGoGquvRhuEiLMCAF8Cmw0GQzmp5rW6SwSw2DNQw3DhRY+OlI0fHDNMbGS1Aode0fJjx2fq8tfgK4iZYoDbSQNXg1KHqtF8JBEeGzSp1v2Zg6EAlPEMsNV0RpYqK1LJRIBPXRq7tCcxjGQjMVaYCEe/fe5DRwHUwwdJH3HOp7WDLIqaJwY8Qpr+ZJrcsoZdpUohKDdNjPALZEWxEThdKCc4xVYQpIpQvMo/HDhMupS5GjXo1l1zF4d7+gUdvueWxG25a+ezTI/t2hQITF4NX/vhww6rLWCrsRxgFYPdBqCRg5Pa3d0udhlKIR2HUPABVN/v+ed6cMFRCKMcRtZpvmtR1Jec5dLAwlgFZYWiglIqQyLYpdIFbNjp6bPy++x/Zt/8wlEWFTEAQEMXK9ahhekE4q8g9vWsWpafteEcoLZXrQZgCTalIZaTiTIWJEjLmIgjDOE3jG66/Jk+ka1RVImql4clj+71GQeXhD3/4Hz4iuVK1ujE1KRDBtKO3FqSLZS5l3toP2qroazXs1RYNQFA9Tty0fNej2l4f4lohkyhWjktqdZvQQMt5AGx6geWQLkwCzxCNXJe7Hs2VGjp47NjwRK5UuWIAqmFuIjBbPweOaldC7bEwjZQejkDZC+JhACecBjiHv2XYrNpANQPrBhvMM8wzyxVUpPWaTbCIgpggrLI8DaODe4eYT10bVcqNLFUyaFr/2w62bGTb1HEYOABPDUaVrhu6bug4AaDUNDGY4HMR/wlQmngo8XHadH6nicsij0qX8CjLXdflGKkg9Mrl8T17zWPHYtsWnp0Esl4y6mWkEpUGirpKJYqgjKCYUEko1yh9t29M78Ka5kEBDd9BoIRQnOdQGtTlYfB4+pOu8fG6ECoIFEJRFCkpVb2OikUrTZtNLCAUAuR7nshzZVp+pWqWK8b8pxcWS/UwyuNEjY4VXY9C6gthAXkgGZy4ED5rufDHrlmUnrbjZCjlIm5FKdCUyUwmKs5UEEN7DBciiKNg+Ruvrunvwk49YHZ14ogKkZIe9euXX/49z8capXGS1epWGGUnR6meEaYdGCAYhRbP1le4iAGrPuLQIgL5YT0hFZxTHJfUGw7jkfbzgywrkNWwGaAUukK1gYNPQtumSar27T9cLNVhvkSuVLFUFzKBSBTCaP0cipq6GUZrcXXmFr6EOJhJJcImSgG02mcfXIIRTQCumKU8UDxQlhcmSk0UzSRXjIZSxCpXkZDE8VSWWfXGxPC4ylUUZvWabZgeZaGLOAw/t1xme9y2qWEg08S2TaGxHfosp0z2KcxyFzKBBO8pWTT8weXhyMWRR2KPhrB8EvpE1uq27SBGOMVMYqoypVLlGZZvW7bpqEylgdo0ONq9eujwfp8hxbBiJCc0IJQ3afo3iVKtnYaYj5AEIlQdkmqIQivtn/r3yXOVpqpScYeHy6ZJYfARIYllsVLJNk0aBCoIFPxWII+o1W1Qoa/fsLVUbuiZFpC612O9YazCLEpP65pF6Wk7/jBK5z3xdLnSCKMsjDIRpSJUMlFhomSUN1HKeCC5ypOfXf0fKuaF4QNm8VhMDWoXb73+x6ZRh2BUBpHtePWGGYRpmv2BqBRQCsIiyPECMk3LB5ERyErhGtNFU8P0ICrVdg26egqRFuMR8Kk1lwv+t5ilIAgC/S1gz0UyDNX4RHnd+i0+4mGUTxaqjEcNw+Uitmxk2c2ir34Oca12O4LvCaiGLw2b1U0C7adU5IBSXb4F0IL+SHejaot8zLOSQSKlRibqSa6CMKOYWTXzyNDB+371qycefXTB089cc/VPjx4eqVYM0/KDMNOD5wwbmQ61XAYotSwCKIXEIMyrAT8KQKkM0nlPPPMHFbyndOmitwanBDAdBbMYvK7yXEHZm4vYMr1Csep6JFcqipI0UlmkOlfu/O6ld5z5kct+ePm92zdWOFacwqist1D6N3hLnWaVZ9u8VvNLJbta9Wo1H+bjQjgI/9F/6t/HtrllMYxjkNrCzEF4nufKcUSjgcEoDaEIoaDR8KFZwHFJe0fvkleXZbmCMd36wtd95Jj8AYX27DrFNYvS03a8U5RGcR5GmYwzGSkRKxnlIsxkkMggCoQMJE9DccO1V1HPUJkI/LpRPKIidOv1P4pC6bg+JixXKowSH5EsV5iImWqlkM4FHELcaTsYkAlRJrTQQP7W9agMUoiZMJE6wQuXH/wRbG/hCWUhoLSlc7Q5gAWaVTTGprpiRJqqNWs3TRaqIAamLISeS/jyVlA/AAAgAElEQVQSLvXW563mfzoChvB3Wm4ZlEQiVBCqAjuB8YgmuvcUZEfwC9t+UHdlpFSlgTCLCQ0Y4Z2rOjpXrj42NFSZmJCU7dy+Y9uWnUePjCIs0lQhGjiYWy4xbNS6LIsATWFZFjENZDR8w/SgVvoOm2FO6dJFNEI8dLn0mfRZgEGtzRLB01LRsG0qZU54YiPBExUoZVOxY+e+u39xf2/Xzp/9+IEPvfeS88+94f3/dPHzz/ZzqhiglFFMCaF8Ssr7rt+e/qyrVZoLIWC16pVK9uSkUSxa1apnGAQafP88SldIJnOeg2EkkN7zgkrFzXOVJGpy0iAkyTLleYHjsCBQaaZK5UZHZ9+dv/h1rlQUq2Kpjoms1W1oMKUshKIpZbN9wKd3zaL0tB0zo9SX01AaxbmMMxnlPMp4kIoojeI8TrI4juMoiCNRKY69/vIijqzC8AGnNqYy/rMfXeG7npCh7SAugixXjIfQnzoTSjESjIaBTGF+NVDQw4LxCLdO4iURKOmlzMEsglBp2b7nUxAbExqEUU5oYFq+jxgmwkeEMsFFjMCVl0jOUyYzRCPHFzxoRofN+I+lQLh63duz92DDcKNYlcoNxyVgrq2b4XQyGRPJeWq5zMMBFSkPciYzzGLQ3Bo2sVzm+MLDgYcDcBXgQc6D3EXS8QMmMx4oDweOH2AW101iOtRyBTzCgEwHhb5QoVJYJI7PILu7ZNGiNV0dxDJqxYni6Cj1vbmPzzuw/zBGwrKRh4WDue1BYEoalm/YxHSoaWK9DAM1Gn697tXrnrazB9nR6VXwIhr5VHhU+FTANDRKAkZjQROMAs6SMFQyUlGmIqVqHu3fsK2js684adYrom3F9p9d9fDf/59nf/C9F65atl0wxXkzKsWE/Y2jtHXuDSQYymUHJsbDAPm3K4/+hKPEhFCUxr4fGgYCwdHwcPmuu+699NIrxsYqea48TziOQCgwDMJ5ChMV9+w9OO+JZ3KlRseKMA0my5V2azFMz0c8CDPHJe/6G/7XtWZRetqOGUd/Yxxznma5uu/+hx0XR3EaJ5mIYhlnIs5knMk4C6MsjJIwSqIo8hxXqewf//6/Ec/GjumZNZXFd992WxBE4LgrZJOL2oTh+CV4HPAs4FnAE8Gn9Ec8wiJyfIZFFMRKRorSGKGI4kQIxaVKcmW5hMqABdLy7SCJXUws28+VsixSqZpJkhGCTKuWZoGU3PUdxhgiWCllOwgTgbCQMnec5nQzF4U1A2OeMam2b99frTowP3XKUyKhLIDZqyfpi23dK7T6A09bTbExS2BSI+wSKAuhL2jaIxVpw2OBUiLObNeRgiUBf/S+X00e2edUxusTw8SoS9959MEHDh88xAiPwsxF0va46XBAsu1xiIzBwhDcl2oGrjZQpe7Xam65YtTqNkirnnzqua3bdssg1TMG/tO10ma2AzybVK44i1SuLNNXudq/7/DLLy1dsHDRwoUvPTV/wZwnnnnm2d+Pj5UIDrEflQpOZ9vG15d0FcbdLFHNGZwkoEROrYD+1y+XtvZKtlpJaJmu74faakCPQ4Hgj7EM5ouBcQHMk4dyOCEJ/Kn+jL3zR8pC08Qw/jpJVb3uERp4nsiVqlRs8OUuluow4dgwUJarRsPff+DIs88u+uWv7l248KV6wzlwYHjuvKcti+RKFYtGmimMQ6jlcxFXquYjj86DZFKulNYY6mant8zL3u3/oL+uNYvS03b8LzrIa0FpRkjWRGnWgtI0CaJQRCmPUhGlIkpBixSEcRjGrutmSTo6PPLIQw9zjIb27smC4PLvfDcKM5DhaYt5LuIwyt8WlU7xRvA4FHnM84AnUiRCJlTERMZExj4LiIxZmFPRtAdjJJdSOV7skdR0MGKchZwGLFaJjJMsV5ZFikUrS5XKVZ6nSiUI22kWJGmQZqFtm9VqNY7TOFE+Yo5LOE9tjzOZIZqYDsU8GyvW9+8/1mj4kOSEXDEXESaCi4iL6PjWWEIDAC0XkZAxyJ4hED/har1NtE4vPyF3MQtRENuUOwjnKgskXdvX8eaS5/dvW8usklU8ZhbHUk6ee2rexMiwYNxzCaUxyJr0JFTA5wlRWqm71arTMNxqzeIinv/0wu079oZRfhIP3lO9dG2LlIr1NFHI5/v2Hlq4YFFf71qVq3lzn25v6xkdKTg2rtfsYqFmmX4YZILHyOdhkPkeW7G8ff26LSpX5VKDkuCE692+N/1n1/HmA9rvcJrZgtblauJqxELRVM9L0TAGL4uT5RiOW/WGk6RKt3uVKwZYz1s2ihMFo9Shd6VQrIGiPk5UrtT+A0eemr9AS/GPHhu/8xe/HlyzEZQTuVKMR7lShun1D6xf+LvFu/cMgX/9nr0HqzULfrr2ESRTZtrv+n/QX9eaRelpO04ZpTxM9JJBIoMkCKIgiJRShUIpieLbb73Nt508Th66796jh4+EQRqEGVx+gA0ZpFGsWgn6VtBGw4AnIYsliwV/KyRFPKRBQmQM+VKMQ0IiwXIhVJwqFiiZKCSETwkWxLBMy/aNho/9BISgy5e233n73fMenfvrX93d2dk+Z85jjz/+6HPPPee6rhBBudIgVBqmF8XKw8L2qIuki7iNxM59hysVm9I4glAYCyGTIExbotLwbeEpj6DTUaNUr5OgVNO01Wf4+JsaZSFmIQuTquMRIRHyCHZfev7Zlxc+ZRWPEaPglEfKI4cj4j/75NxD+/dxykzDZSzR81BrBoapqCdBab3umZbfMFwZpM88+/tduw/EiWpl/H8SpXmmVK58jy1etGT5m22HDg6vWtn5y7t/+7uFi/fsHgpkmiaKYAl5foKl59JAppQEgse7dx3YuGFbIFPHxn/1KJ3WCdrqdKjVua1WDBqxOniFF9/ucxSdKkobhrtr9wFCA89nWa4M0xsdKxIaVGvW0WPjUOzwES9XjHrDgfiyUKwJmYyNlx5+ZG4Uq1wphEWu1JGjY3396x56eM7Nt9yx+MVXl725+tHHnnhq/oJduw8cG54AI5QoVpaNslzNovTPsmZRetqOU0RpGM+EUkIYISwOoyUvv3L4wFAsg+t+erXverxleqhOe0IdVBP0rTs1lpyEnISMNq8fRAOfBR6VLEwRDz0c+CRsDqVhCaUp4VndoiLOXUoRo3GeOa7PWWQ2/n/23jNIrvO89/Snrb21n7buVu3WXd+7JXtty7Ys2xIlrWlliUlZoiRKJJWYcxIzmEmRFIOYAxjFIGbKzCAIgAABEBmDweTUuU9Ob37fE5/98AyOmwiUhoYMy3dOPdXV0zPoaQ67z+886f/nUMA7K4dPOPbcR+571m5GMyMNrx+sWP62EIox8ZOf/GxmZg4qNET05l9YWvXswI+YzqDZc0an5pCjxgAhJiFS6cKkFRdmlzKA2jVBOh91SloHF2Zv6H0PSmugojzTbgXV+gcIN06Y5ACzjTkh2MjQ1ltvvGbnpneY2/JaE8Ru2I0p6tl33PLLde+s1dIImRJi/EhZLu1acc9OandxZOogSnt20rMj246xV6pNiSjNi/2J0uEdk1oVSSzeWr56aPsoZij9nuc6keCpFJnnxq4TcWYETz03JolMTdXtOFbf375tZMVba6KQVSX8z4DSQYn2MFRYwkWVg0HrcgTqYKpa7zjtQeUFoxRlIyenGo4b1alku2MrXWQ5tNrWylVrywpwIW3zlh1lBeMTs0cf89Prb7hlarrJuBkbn6FMYyaaZuAHpNHstTu2ZQejY9PjE7NRzIsS8gKwJ4raRosF3n+XWETpfjsWjFKcPDLzUZq0TE2ZmhIAtm0bggoeffgRq9c/6nvfF4R6js+oqjPRLIc0A+Tonikp44YzI1kqWSr4/COEG9ydIDKNuY6ITJiWKteqENQksSKi7PlEZlXEORE8BwgjKnkFBdx9y5M7NnTAAAZ3ysTWdi98+aU3nn7qhcsvu0bwtNnodnuOkFhrCgsAJ4iJ0AXA1uFRNyJS5VoDYxlOuuIHO07ELhYqLsVgSJUN9kfrq+l99Ur5ex3L8cmDkA5CtDZhZTLLAXaMj1cAeaFvuO7KoY3veO3puD/rN8aZ24r6rc70xDNP/HpkeGeRlSatKE33RCku5NQcHaBphFmpZQdKF3fedf+mzUNZDu93tl3gR5fRtCph86ahrVuGZ6ZbY6PTJJFVCVJkUmScGZJIkkjBU6PL1FSCp+NjM5wZqGDH0NjDDz0+OjKlZP6fFaWDGWe94hJF2vdFHJt6ebT240StXfy3tS0PbpHW7jcDiemCURrFfK7RRRC22pZlB2PjM0oXna4zNj5z6mln33DjrStXrd2wcduTv3mOUJVmsGXr8ONPPNNqWwhdnAmfmJybmm42W318KseNsCyMLqS4SCZV3ut7QUjxanIRpX/4WETpfjv2G0otywGA4aGdRukTjjvesWyoIDO54EaqXJsyL6CsoCgBR3jes1e6K7QptSq0KrBRyt/bK42Yiqli3CiZK5lxquKIZyUQXaq8olIRwYXUgU8iT4sQnnt01QWn3vq3f/qlgz/yrR9/47xTfnhx2DYX/fyaa6++ZcP6HVBBnkESC6myOOFK5zOzrQIgSIgwuUyzFe+8E1KBa6+ocBYEHKeFd+nXZ1IZqZXUYleoQZTOJ9ZE4rzSvgJxW9ub41rnbiit0/ogYVQqxphtde6949bW1HDJwubYVm9uLGjPxL3W6mWvbVizJvQDo3LPT6QsUX1itwR0EKIDEff7oeNGfcuXKr/zrvs3btqeZvsTpVBBlsL99z389qp1eTbfN2u3LM5MGNAwoJibhgF1ncj3EqgA26XjYzMjOycdO3Ts0PeS/6woHXTaQTSiPSduiO7mCofNUfyx+n6dmO4XlOKF3cjoVFkBrlbX/Hv+hZfXrtvUbPVffW35i7999eprbli3fvNll19zy6134s/sGB6fmW1jBxQfYdz0+p5lB8hXz0/aHRtHELIcuj0X7RHrt9xigfcPHIso3W/HglGK47hGD0ZhdAEVtFodACCEFUXV61lREHqOr3dxBUujdVY6WPL9V46aUslMihTHd6nIicyJzBORxTyNeRqjUynTgklJBKXcj1jElBtGRHCTpWmaQwVVBhtWTf3dhw454uATTz/6hoM+9M1vf/b0n3z9ov/2v31keFMDSqBJoSWsX7s9CkUFEEY0ionrBVybiBKuTcfqr920IZESd3UYy+JYoakqCgULmQmZCqmFkmjGKhQVijOu98w4B/1Tfx+UOm6EUoi7XZULmSVEmCzlnD74wL3rV69gQW96aBOzGn5j3G1Mcrd/769uHt6yRQlJYm47oZQlKj/UM0fzw7rvi1LLDhClmzYP7V+UNub6thU8/9xLoyNTUcimp5qzM21KlJJ5FDJkZJaC0aXgKWfGtgKr7yNxSSIvvGDJn33orx5Y+uh/VpRi/RbXV+iuAaJ+P8blFsehWOmlu2q5dEA7sM5isfy7tzALRSlKoKDQfKttaVM+9vjTf/8Pn7j2ul9edfX1qJSLFi59y//F9TejZTdlenjnBG7T2U441+hOTTfnGt0gpEU5P3aEq9g4geh6MVaPtSn7ll83OBZR+geORZTut2PhWanOMXEciFyrPEsro4tezwIAKfXY2AQAEMJqGVjUca0BsxsqaqwyqihThKqYqoiZkGoMBCqhKiGCJowRqhiXXEiV5QBhHCmjjTEkplCCTuCfPvqNI7985pc/dtxXPnn6id+47thDlnz1Eyd9/u9/eORXToz8PFUAJWgJvkc9P/GDhAtVATAlmZIyNZOzM7OdVo52iWgFFckokoQYzkshil2nJEWZoJxQHlMeU04Sspeq1PtHjVJUD0bl/dr6ZvCvxLguShBCNOZmLr/0gvb06Pi2d4XTov25pDvDrBYYccWF52/fuJFTEUdca6jFC1EaAqWXdivtDqJ0sMB7191LscC7H3ulnGVVCWtWv7v2nY2BT6ACrQopMt9LODNZCthJDQOaxELwNIlFt+OkptoxNGZbAVTw8ktvrFq59j89ShGHcWxcl3W7YbPpNptupxM4DkWCopDQbjszdFeBFwV465x114CSWihK/YBgVVbp4plnf/vTn5302ONPd7rOa6+/1e25She9vmc7IUph4w5oQiTWhLFRatIKO6x4rdzpOnONrh+QIKTYH80LMGmFeSr+TC3Gsljg/QPHIkr327FPlCZJKmWZZXD5FddQpioAnRptMqNLo2FX/GtuqmT2r6EMhlSGcV0XOVEFsI5e3/MDghkbGrwkRFq2T5lKMwhi3ur7AVFElO1+lAFMzHbyAhjXUEEYeFDlUOUAEMbRq6++nMTh9NTEdVdee/O1tx/7rZOO+Ocff+tzp3/j4LO/8clzvvvpi7/w4eN+cuiVR37+rI//zRGvvbwBCug0Ey2h2bDQKi4hzA+DkCRMySCJ33l3vU8IM6bdsblIXZcYA/1+7DjU9xXquThOYtIqillCSV5mrm9xyfwgQYELrAbHsQpDwXmOSS2mBSiVh4E1NFTkx4sMz086XQcl9FDIG88mCZGMa88Lsiy76fpfrF+9AgoddmaT7kzYHFdOW3k9anefeuShqZExmrCqBEJMLV6IEku1hTgytR7i3W2Ct92xGTf33vfQxk3b+fuYle4bpfUsTJ0nJUnKWFaV8PxzL619Z2OWzieanbYdhSyJBQb2SilRGIKnvpcYXbpOBBVwZp55+sVtW3cKnmYpxBGPQsaopkRxZqKQHehz0+8buB7KWIEgxPuonVt7vOCSKNK00wmaTbfRcLrdEAkahgqtV+oqLt1V5hWi2tepMwwFvtOwBFJfJKUZoL406ouhlUXf8tsduwLYPjR6z70PvrN2Y93LLytQuqhLKbgvjq6iiFXXix038gOCv852QvywY7sHdT/wCnuvsZ8u3Rbj/WMRpfvtWBhKjclSVaYKUvU7UCrnI0szwBoOfm4HR1UrgLyATtfB0k0U8zjhZQVz7c7ETMNPuEiBqiIkqe3z2bZdAKxYuebmm289+6wzbrv5xttuuv7yi88/5qjvX3Xl5atXvLn0njtvvv7a9swcZPDNL/zgh0ec+fWDTzniY6d97zOXfOmvT/nuwZf84LNLDv3YiQf9zde+9bXjW3M0DoooMK6TRDFvtjpSKyb4dGMuh+rXTz7RsezZTscOYtsJixJ8n3ken5jo9vskjvIozBirut2w349n5zq9vssEtxzb9b0gpJSmUSR9n2EuGwQcURpFMgxFEHDPo7Yd9/thrxfgBThepGMaiqr9fcu37KDVtlAtAa/chUyl1O+seXv96pVzYzv70+PCaTnTw8pt8X5j5/q3hWddfM5Z2zduJjEPA54kGmWbcK900AynzlAHgYpZKbL834jSJElrRy30AxGiiiKpZPnA0kffWr46S0GKDMGJOeheUUoSGYUsjjjOIoUBHdo++uayVYKnlKg44lbfT01ldNlq9rMUDvS56fcN12XYDcW+JqW5lCAl1L1SustALQyV49BWy5ubs2dnrXbb9zyOo0k1RwcdSevRpL2eOuNYYQkEW/4YqBqfENntuUJmyDzPT3CVpdN1lj7w6B133oe5Jq6+YK5ZPxW+dev5ALRvQqdhLKug6gIKGA32PrDusmcsovTfJRZRut+OD4BS2C12oRRFFbL3LFPqzKQVLpUiL2unF89PauOzNIPxiVmp8jCibpgkXGQVxFyPTbeGJ1tWqGQKHTt8/c1VV139i4mJCaiyd9euas+Oj23fCFpMDW+HyuQinhnZ0Rwbhww+8Zf//KWPfffwTxx35KfPP+O7t3/yfxz7o0OuPfqLVxx1yEUnHXvFh/77QbNTERTQbUdVCXkBYZT4YeCHAZVi7YZ3X3tzuRsmIZV+wlGubHKyJURFaWlb3OqLMMg3bpjwXBVHOedlGIq+5REquz0HURqGwnVJzU7O89qMJQh4GAosF0fRfLLuB8T1YvS9qR3OceY5TkSv7+HyQBgQqOCaKy7ftnF9LmJqt4vE6U9styaHhNW0p0eTfveum26enZhJdRFHUilAS3NEKe6SIjhRELjWBN7FVGLbsR+QTtfhIr3v/ocRpR+gwKsUJEmKqnVo+OX7otVyXCdZev8ja9/ZWBYQ+IQksizAdSIk6G4cpUQlsWBUO3aYmsr3EteJjC5ffOGV1197iyQyzyAMKM735hk4dnigz02/bwwqFmECilceuw3oUpoHgXQcallJtxt2OkG/H6PfJ33vuO/gEuq+5d3nx44IVfjGi2JeOxWmGbheTJlG44dmq79jePyss8+//oZblr+1WpsSt0ix3lv3aOiu6SS8P9iPqBuctdNwTUr8pXha2GssovTfJRZRut+OD4LSXO4FpfOTtzqvA3dPseCDRaE698KJvtVr3sXPpOvFmJVyYahUXddtdC3Lj1UJKUAKMNXyCgDbi88798Jep9ttzkJl+o3x9uQwtbtuY3pq+0Z7drziydimTXmsD/3UV771uZ8dc/gFh3z0hB8dcvUX/+akY7505bf/6YIvf+yEH3zjnL//2y82ZwmNYWS4kRpQOudCTUxNJpQUALfecWcO0Oo6IgUi827PiRPet3zP476vSAJZCoxAZmBoW8f38rlZr9uNpYTR0Vmp8jAUNUqRo77POM8tK3KcxPdZHCvGMilLrcGYefsLzESRpmhpjs5TeQFcpN2e27d8IbOqhDiMHrz3rrffeLUzNerNTYStSRBB0BjrjGyFQi174bmpHcO+5SmZpwa0BirKQYmGeoi3Tk8RqLuCo/U3qh3dd//DmzYPfTCUGjNvpKUUUJpbVuL7Is9hy+adr7/21txsp8ghDCijuizAscPdCDqIUiVz30vyDAKfYHv17VXrLrxgydYtw1bflyIrcsDxJaP/aKyhpZy/1MCU3RigNHddVrc26S4i4iYMpqp1DxWfZOFu3qkQBVIQ33KYjGKaiL68KDSdFzAxOfer2+5+/IlncApX6aLVttBJEEspmGXi2wAxWd8Opp71Mlh9v8bt7yh4LKL0Dx6LKN1vxwdEKcZApRd2obRQuhiUcaglA/Gzh9enqGeLo6Ezs+12x/b8pAJoNLtpWfmERExG0ozPdTdsH5/pBKoEy6UFgNHF4YceZnUbWzesgYy4zXFnZgRy0dq5aWbbOm43SbdTJWrJaZd97iNfO+nblx1+0Mnf+cyFPzr82iMOOvsHX7rsB4df9N/+60Fnn35N5IPdE62GS4lyvcgPosnpqQpgrt1ZtmIlFantkXY/cUOJ04ZS5YSYdivavq3p2nmRQashOQXXLkIfwqD0XKU12DYJQ4VNL8/jqC3u+4KxAoXcUMsN7/i+8H1WZ6K1QTd+6bhRq231+p7rxX5AcAlBivSin583tHkDlFlGw6Q7N7V5rbIa4exoc8cmUHzJOWdZcw2744QBpcSEoYpp5kfK9hhCtF4nfS9B5S6yCs+jYcRwGeb+pY9s2jxUV+0WWuBFLy1CMstKLCthrKgqePSRp3YOTySxqDNOwdO637lnxBHHWi5nBrdOo5A1G73UVCedePqLL7xSFhCFDPdnklgc6HPT7xtovY7juIM2YYP6RPVEbt11FqKSEurMtf63u6Wh+0bsPlHKuGk0exVAo9lDyaFHHn3yoYcfrwBwsRj9gijTUuXoZoif5cGWzb5UunaLmr7vl30uovTfIxZRut+O/YbS+dzUlNqUcpdIr0yLehKh/uRwkUqVbx8axc+tZQc4PU+o8mM602xNNed6QUTTgmfAMwh5OdeLtg9PFwCuE+4Y2nb3HbdEXnv5S09HvWlQsTWyVXSngLnR3Jiwuv50q7Oj9bH/5zNf/eRPDv3Y8V/5xJlnHHX7Z//2+MMOOv3LBx3/zwd9b+f2fpWDZ2vJK99LHDcMwjhKYqnV22vXqawc2jmVsNyLUtuXM7Ot6Zm5mdmW77OqhCyFqgAaw7o1s+Mj0dsrJjIDVQFD21thkDcbQRgazkvsY9XL9ZTmiE8kqOdxx6G2TSwrQnThHwdrbniSYtxYdoA5a6frYPuq3eovf/211uRYc3x489tvcrudh1Y4O6rtJijqTE/cc9ONMztHEp8oWToOjaJ5O/E6JbVcigVe22NY1MUC7y6gCrT+xgnepQ88unnLjg+G0jBUmHhZViIlVBW02/5TT/32zjuWtlsWSaRjh9gKRaC+Zwp3AKU4kcSZ8dwYNRzmZjtY0TW6vOrKXzz4wK8Dn1CiUDXpQJ+bft/AZLQsIc8hSVLHoUmSFgUMroEO+nHiqBHer6UBB1H6+9l27rPAixsp2HDJC1ix8p0f/+SERrM3PdPatHkIKYvrpI4b1Q4HtboIDh/hUw0mqfV368/+bo3SRZQe0FhE6X47FozSXEIh3oPSf01MNQyiFFXvcYu0ruTUggOU6dm5TgVQVoAp11NPv0Cl0XmRA6gKpjv9kelWoioD0LSSMDFzLVsIBVCedfpJktpBbyruTsRzI6Or3yi9trZmpzeuKgMnmWtDXDx+2/Pf+/zJX/nUiZ/8s6O++4WLv/r/nf3Ffzjh43/5nacefRsK8J3MsbgSMDfbcb3AC/w0z0bGRofHxvMKOv0oJkVaQMzKbs+pAIoSWi1HK2AUVr418tXDj/+//69P/e2HDzv8kBP+y//yoW987QROQTCYmw3C0OD8ZD1U4vuCkKy2Xx50xSLEeB6tB44GG0VoNYXLuN2ei+rhlMjnnnxy5+YNMnRy4sed2WBuvDeyJXXbYWPq3WWvjWzYEPbsQpdlAY5DuYS9ZqW7kXWAqSwIeJwI1OD9t6AUp3Ydh/q+QNvnjRt3XnnlDWtWb8Sx2yhknBlsl8YRx6STM7MbTfG7lCjXiXCgt9/zBE93Dk/gEO+119x47TU39rpuu2Xl2R/N2FGaghAVZpxhqLCEqzW8VzJ3PnD4CCmL7tmWleDwUf0Dvx9T9zl2hJ9NvK513OjXjz31i+tvRuxVACatpmz3NXgAACAASURBVGdaKASILVW82sPZ3Xptun4P77HEZQYz1MEJxMVe6QGNRZTut2OfJmvzKM3h8iuuYVQBgDEZTvDukY+C0WXN0d1QatJSm/nCr1S50JVSldBVVYFU+fjEbFnBrx974tZbb3viiSduve1Xn/vCZ2+541YvCnOAhOm2FSQszUpwXdLre61Wp8jTz336U0nQjZ0Gc5vx3AhQG6htjW7sDm9I3U44M9MfnQUFv7pi6a9ve/mow874yJ9+6ajDz77z2ucmhyIjoCphdKQtJUAF3Z4rlQmjREi9afNWxw39iFUVJLR0fU1FmZfFXHO213WqAoyEW2587GuHnfwX//3L3zj07BOPveETf/f9L376p1/49LHf+trJO7b2qwLCIMUREkpzKQFHWAdPeThguWvnL0Njc5xvxFMS7tdqU3p+onRRVkCoQreNKEoevO/ends2h/0OaNmfnYBCQaFefebxGy+/5O6bbmyMjUNWMCKTWPR6QcJy3Cutd0lriHatGKUEB4HqBgKXJWw71qZcuvSxzVt2CFHwAQO499y+552z+20USbqraTox0dy8eXTLlpE8g7KAJFZ5BkqWrhNxltlWwFnGmeEsm/dKI4oSQ4mSIsMyL9JXydzoMgqZ4OnUZGNmumVbwWuvLn9r+eqqBErU+7ye/xi38yElzMz0N27cuXPnrOdxrQH3XtC/Bd8bhGRJovGSi/OS85yQzHVJq+U1m7ZlJfgXxmdmLGOs4BzVBPN9vYZ67Wq3ZZhO13HcCPUThndOPPPsb4OQttoW1oHDUOQFVBVEMXddkhcQx4pxw1gWJ2LwPk7SEWIG3yeEKsYyxk39CNtlI0iIIVTtebvv99sBx89//FjAe3IRpfvr+BM82w78P0gZTRlNk1ilpspSuOrK6zJTQgWSmzytpEjxRI/agVi/lSrTGei8Eian0nCdmQJMAVxnUhmlU2FyoQuhK6aAyYqIstOP3IDhR/fU007s9Wa1jhqNUQB59923nHLycaNjO6CsqgqGh0YlN0nIZ6ebUEGuzeiOoeuvvSJyuyzoCHta9SfciU3B7LYi7pD+VG9iiNpdUPrma25oT7Tm3wAF+H1SZkBpGiYiYTqiwvWiXX6loijh9TfeQtWVKBRVBY2Gw0VaQaYNgxJSDv1Z9cOv//xz/3jcT795/Xc+f9mXP3bWT75+w/cPv/ygv/7uQX/zzUvOuytwQAqgoqSiZLJCmSE/UjHNuAIMHKkNExORlNK023OTmDOqwoBEITW6SE1JiYwjRhJBibT6HmcaKgj8ZMmSy8fHx6MoaLcab7z+6i9vvP7YY4465eTjn3n6CUaTssiKLE+SJI6JNpk2mRdSwosgyZxAWZ6oo+9yvO05rGvTrk37Lrd96QYiirTvM0Iy32f33//4li0jjBVBwPf9gdy7z6VS1dR00/dZmkGeQxixe+99ZNmy1UIUaA0dhiKKNCFGiEpr2Nfz4/pEvbyIM2tY5MAxmQpgw8Zt1173ywce/LVlB/hjYSiEzHJs8gVcyIzznDKNngTvOVkTg9gmiSSJTmKRxCqJRRzJwCeUGM5MFApGtVYVJSpJdEIk53kYsSiSUuVxrDw/YSzjImUsw2dGSPgBSQ0YXVJiAp8kseIsw89XWcD6dVuvuerm3zzx2yQycahdm6Ya9nVJoVWlZE6JcZ2o1bTnZjvtlmP1/YWhiOmESG0KpfMwolHM0qwqSqBMeX5s0tJ2grKC9e9uvurqX2hTcJFGkUScx7HyfeE4iesy32cLPWXvp9vF+J2xMD9akohFlO6X431QKlJT5Wl19S6UambytJIqEyaXaaGyUucVeoDjlyoruc6I0EylOq90Xs2j1GhEKTcVU0AlEAFcA1WFZbsxiZZcekEUdTqtkSRqJ1EHCk4i++QTfjK8bWvsB1ACCRJFtWYm8UkqTKb0xef/fMfWTZr7Y5tWKm+6iltBYzho7ST2jN+e6M3slLF74k+P7TVnqywd3znMKdNSlSWEhPI0TbgKCWVKx4zHCUfnxdm5TllAVUJjrot6sEqZtetWnXP2acf/+ISRrY3rLrzva58+9f/93484+pDrv3rQpV896NJP/9Vpxxzxi29//vzPfezHh376Z5vXtQQHwgsMNApFlNZ8JbxAkQTCCypyJfPAT8KAZGlVFsCZjiPGqIIKZmdauP2SpdXE+MyJJ5y6edP2U08744qrrrzplptfeuXlmCQVgNQqL4uEEqmVUDJK4jCOmOCUMzdM9oXSdj/p2tTyhBMoJ1C2L/su79oU+7hYl1669Ilt2yakhN2kX9/zud23ek6WAwon2U749DMvvrFsZZyIQfGdQVWBfT0/5jeDxUD8UpvSD0iv70UxzwsgVK1bv/m++x/ePjSK13mdrlOLRuFGE2UaVQU8P7HsAKuUuLSKY1CcGSkyJXOtiiwF7NSGAfXcGFu2nhu7XozjcvjkOJeeF1AP7+B4ThgxdDiZGJ+1rUCKLEtByTwMqOeSJFYk0cuXrT3tlJ8ve32N1YuhhCgw7aa3C6W7F7qx1l2bubZblutESSz2VSDdVxQlECq5MKNjU3kB7Y4VhMR2sK4bEioJlcvfevvV195stfvalGEoajc3VMlH+YgDDYzF2GssWGN5EaX761gwSnFMF89WaQYYuDxai5iglua8pMA+UDo21YmYMWmpU3XH7TeXJXftmcnxTTt2vNvtzmhFO+25q6+6IjMpVJBETPGsyKDfdYqszNNs86YN9993T+z1dNSj1mRjx9q4OwFpNDO8Ydu6t6BS1yy54KH77oIq10p4jlsUVRjGrhd5EdEFJEy7YaKyUpg8ipk2xZO/edZxw9mZVrdjQwXdjh0GxJjskYeX/ubJx2OPLH95w+EH/+izHz3m3B/f+6WPnn30ITf98Mu//ObBl3/3i1cc+cWLf3rk1f/Hf/n4xI5YcEhYHtMMK6uoioB/ZMILKkrCi/m/uSiFrowutcpTUxpdJDF3nZASCRW0mj2oIAopVPD2qrUXnH+JbfkH/9NnN27a4rg+ZYJxWQFkeRlGSUIYWrwRygnlCWFxQuOEhoTvC6Udi9TJaI3SnsNsm/T7cRgqz+MPPPDk0NAU7mks9KOLzV3Gje2ECZF33Hnfps1DFcw/1WBLb7edyN2eHwWh6pZePdVi2UGWQ1FCFHOU+7CdcPlbq7du2+kHJMsBe3WoV7dzZDLNIE4EytphLouO1oOgwhkojHbLCnySmqoqweiSUY2gxYJ8u2OX1fzWbwVQL/4isNMM8gKEzDw/wUuiifHZfs+bm+1Z/VDJMgz48ND0m2+sW7Vi02OPvqAEKAFQglHzWemeQ1hxxBHq/Z7X7Ti2FeCa0EJR6npRr+9atl8BMK4JlX6QKJ33La9veVPTjZtuvu3a627Ev4/thFEk6/Wbett132pKi3FgYxGlB+xYMEpTU9WlXfT0xiZo7UKK/4d2fZkOFngHURokxg5oWQGXYsmlF6xY8WpmwrmZId/vpoYHvv34Y48+/+xzkqt+1yGRoLFMVRn5lCZCSwMVPPHY4489/ABxmo3RjZAmaWKtf+tl7ncgpbfddN11Vy6BIuWMdDodAEiI0ConVDl+QmRKeOb4SRBznVeEysmpuUazu279JqggiXkScwCglOd5/vRTT46PjsUuKwUc8/VzPv8PP/r6wecd8Ynzv/h35xx72E2f+fCpX/rHMw/7p7O+9aVz/+z//MLmtT0pAPNORKkXyiDW+EidreJ3qSi5KudmO1KkRhe25btOmKUVJXJ0ZHLb1mGr7z3/3L8ceshXXn1lWRLzU04+Y3jHWBQzk+ZcmDihaE0jZFpWoHROKCdUoshUnNA44VSk+0IpPtK1aasXt/tJz2FOoLzIIEqDQNYoTVP4nSv/e4ZU+excJ80AB1KWvblqaMdYGLHdRmOQo3Uvec/n5zzHcdO6w4e7HHgNx0WKeSGhCr914y9/dfc9D6AuD2V658hk3/LzAqKYS5Uj4Rw3QvJFMZciQ938esQJM1E0G+fMIMPQjkbJvALYOTKJaWiz1dembHds14tRRBpFgiw7sOyg03Uazd47a97VKlcyt62gyCE14LkESrj/3ieuv+6Op5585aCPfX7LxinP1q6luu2Y0XSv2sKIeVT8R88clH/aFzL3pSKE0pvtjpVm1YqVa2ZmW54f4/Tf2Pj0Kaee+ZunnqsA/CAZG5/G8vXgRDFyVMo/mvGu/8liEaUH7FgwSvMM0hS0BqUqIQrOc8YyPOUpVUlZYlFOiEKpSshMqmyvKDUFTDe7QUgqgJUrlt1++41GhlXOKAmi0G8154447HCaMKgASui1vcjnWpRGVp2mBSWMj07FIT32B0eFVqs7Pdyb2dmbG/N7DcOj7ZvWn3fW6YLTNE2npmZMWlKmZpu9CiCIpZ9IJ2RCgx+JuZatMxAye/2NFUKmRQllCXNzTaWMlJJzLiX/0bFHu7a3ed32oKsvOvWm44684pCPn/zVT533jYMv+eJHzzz2K9d/5wsXf//wJcd979ovfupnYzsSzEoxB0X92zAxVJT4CKakEUnDxMQ0IzwjiSxyEDx17BBNx1aueOeYo396yslnXnH5tatWrq1KgApGR6Yef+zp6akmakLZTkioNGmVENG3fMcNtSkTIhIilc6VLuKEx4kQuvidKG33k45Feg6zfelFBrd0cC926dIntm+f1BreJ2vc10e3ApicaiDzNm0eWr3m3b7l+wGp1yIHPa7f59SwL5QWJfgBwcUMk1a4tYzyiksuu/qkk89Y9fa62r0ry6FWe06IdL3YdkKswaI0BCad6O+GBV7fSwKf9Hte4JM8AyVz14kCn7TaVllBs9VvtvpZDo4bdXuuSau+5eN0a0Jku2PPzLabrX6v77Vb/cZcB8nX7XizM925GWtspPHuuuGXfrvy+J+e++G/+OQRh/5w9cod/Y5IFTCydyvW+nXWCTR+uVCURjHH0rQfEMzO17yz4QtfPOzV15affsa5cSLyAnC0Pop5p+tQ+h4ppd9j32YxDmAsovSAHQtEqQFEKXIUIYrsRJQqVTGW1V/iRNLeUFq2rYCbglBZVKWS9PpfXHX/Pb+6/dYbt2zeeMwPj77koouV0JKbnUPj2zaPCJpxknZbbplBEkrJ8rGdU1DCHbfd+fOzTmeR4/Ya3cYkQLb27RXnnXVmv9cpy3LnyJiQaQEw0+j6kUhYGiYmZrkTCKEhIulcy2WyiBPxyqtvBiFptbu+H2qtkyRhjMRxePfddy69/26724vs2G7E/Un6j39+2EF//q1Tj/rlEZ888wsfPekHh13+rc/9/J8/evRf/emhxx9z1dQopQRQMh6zTz9SQayx5IvJaETSINaI2IjosgSjS5JI3JWUInv5pTdOO/XsO26/98UXXnlz2ao8A8HTk0864+1V66ACdHkUoqgAjAHbCV2XmLRiLItiHkUSZynxPuHZvlDa6sUdi1iecEPthtr2Zc9hHYtgr7RG6bZtEygBuNCPLp64/YCUFTzy6JMvvPgKbvrXCnko3zOokLfX599XgRfHnrlIsxy4SFHIQukCpe9efmXZw4884bhRWUG7Y2NRN4xYLQaCkRC5m/AvMpUzo2RelYDWNGgAF4UMKsDf6Adkarp57XW/vHTJVajYjrUZfGGen/gBseyg2eo7dtDvuage3O8FeGn47NOvXXfN7Tdcd89f/vknf3zMWR/6Hx+/9aZHqxy0AJpk+DLqwNeDzVrMlZXMMZl+H5TuK1CzHpdKKdN33b30tNPP2T40etnl16xbv9mkVVFCnIihHWNYGx+Ug8D/KbVE8GL8x4tFlB6wY8EoTQ0YBUqA5JVgpWCl5BXeNwqMAsFKmmSClVqCVtXuKNUllRUR5c6JuRyw1tQDKEkSzE6NDm3ZuHzZm72eRQirSnDsoCwAKggDrgQ0Zm2aZEUGVi+GCmamO3HAPnnQJ1Ytf2N2ZuLaa674/veOvPDC89966y2T5r2+2+l7BUCz5+0Ym0lLmG7YOYAfpyHJwzjD2VrLTWZm2zuGx6XKGs02AIRhyBghNLzq6sseefQB3+vTyG9MTjcnW0GbXnXeLZ/8iyMO/vC3PvORHyw57b5//shR3/nSGUd85vi//4vDxoeiJIAwmM9EEZ8ogIDsDGKNgbNIYWJianq9oN2xbSfkIlW6wH6e68WMm5nZ9hvLVi657OqjfvCj0bFplAhPEt1qOY2G4zhJHBvOcymBsSyKdBiKMFRRJOv7YWIIq/aK0kYn7FjE9qUfp36cOoHCYq/rsv2SlXa6Do7nOG704EOPrV23CUmzZ2f0/fcg9zV2hLY5np+gTbo2JSpQKl3YTphmsHHT9rPPueDZ5/4FyUGoQnF2bUoUksU/+24tybpj2mz0BE+1KlBfesfQ2IsvvLLsjZXYc52ead1199LxidlW2/ru946+4MIlFYCQmWUHM7NtFPBqtvrTM62J8Zk4Yo4dFjlABfff9+j3v/uTB5c+xSls2zxz6Je+/0+f/Opf/8WnL7ngllxDvyMQpTVN63Xb3WajPjBKKdNYiN64afu55130+hsr0G0CJXbRUg3fikoX3Z6LkvqDykqU5oso/Y8aiyg9YMfCUapAy3mUKgFaglGQGRCsTDWkGgQrGcklr4wCo0GqTGnchHkPSmOehlT7AZmYnO13ewBl5Nm+5yQRQWnyN5ethAo2bxrSqup2PEbyzMDcjBUFCq1Gh7ZNQgVCqCuvvPL2228P4yhN87KCCmDn+BQVaUxNo+u2+xFTkANs3TFjeaLncCqhZ1HL4SaH6bnehg1DUcz6llcBrF+/npB448Z3zzzr1N889ViWitmpHb7TbEyN7dy0dWjtNlBw05I7D/6bQz714cM+9udfPvKQk/7r//qXh3/u6KHN7fYcr0qwXeH4HKd2I5LiQidKydeiQojSiKQJy6UsUf5JyAzFb4OQZjmg4GJeAGrzNlt9z088j2YZKAVCVFGkUdk8jg12N1HzNgwVrvPHsfEjtS+Udm3acxhuxdQP9l2O6//12NH27ZMfbOwI4WfSatXb6578zXNcpLipgq+N0hy9YgbV2/f6/Emi97oMYzshDvig8o4fEJw/mmt0cUxXm9J2wl/edNvPz79kZHSq0eyFEcsLKErAOVtClUmrep4Ip3aLHLCiDhVs3zZy2ZKrf/bTk2684dZHHn7i6adeWLd2E9auV695d+26TTiC1Ok6r762/Myzfv7U0y+gxIGQWa/vIa2lSDnTM9OtW2+585ijj3vowSd8l3uOmJ60JIOnnnjjm1/72RmnXrHs1S1OLytS2BdK69Ju/a158C9Q4oCLNE7EE08+e9bZ5+PlBVptY/28rIAy7QekKGF8YrYsodYbobsGjrCocKCZsRh7jUWUHrBjnyilRCmZQwlLLrkCSigyyGSeGygzCHzGaKpVJXiuVYXGk6kBSgxU4HtUq4rRNM9Aq8qkpUlLlVbSlPMoVQWRuROykGouUsY1iWmMa26EMiKxMxT4xLFDz41JorWqtKocO4YSJsfbmYGxkVYUmMasLVXGuKRMUKkY1yHhYSJialpdr+cQP9YJr4iAkOR9X7Vt5kWpG5qxiW5CS5PDzrHZZctWRzETMp1rtCilAOWnPvWJzVverSDbsmVtpzUyvP3t1tQQ9ft+u+U1+8KhpEvXvPru4/c8/fOTl7z9+qZKAwnzwNOtVtB3iOPzOvtEISFUP6i9WZC1iFKUufc86vvMdYllRd2u32o53a5vWRGayYShQNNmIYowVK4rXFfEccZYlSR5EGjfV0Gg9wwv0Akt/TjFAd06eg6rgdqxSD3Na3nCdRkS2nHoAw88uWPHdPp+zmWp4ySYfVp2gGdqnGIluzSbHnzosdffWJEQOTE5ly5YjWjBp4Y0AxSJbbb6aCXdbPWXvbnqrruXXnzJFaefce4tt965bfsISl4ImfW6LooOViX0uu6by1bdcvMd55170Xe+fdTddy0dG52mRFUlpKbaumX4rjvv/9Vtd5973kWXXHrlG8tW+gHB3m2aQRDS5W+tvviSK476wY9OO/2cpQ88uuadDTtHJn91651XXXndA0sfnZ1pQwVSFK5N4zA1CiI/5wSggBeeffsLnz3y6ivuojH4LsfU0+hS8BR1oChRYUCVzHE/JzUVJcr3EsHTOBF4nYF6k5hN4jUHOhtiMQOvM8oKyhJef33VXXc9mGXgebQsodPxsCkTxwpddefr6lgSOPB4WIzfPxZResCOfaKUJFKKDEq49OLLqwLytMpkXpoq9AiCMwwoXrw7dhxHvN8LshRaTdwk8aACtP7QZu8o9WIR8/k6kmCaJkwkXDCdxAL34tHGMgwoSaTgueB5HEklwLWp5OA5gpEqDE3CdEh4kLCIiohIL6RuwIJY9l3qBALLuREt/Di1At3zJJWwdceMyWBo54wXytffXE2octxoarpRAYRhzBg79tij161fPTU91uvNkri1/p2X2jPbRNwd3rimOT6cJ8nElm0TW3dCDr+85qatG7bTWFNi4ljlOXSt2A1EnZL2HWJ7DKu7tQ1LzVEqSoQoOq+hlanjJJYV4SODLqdRJONYxbHxfeX7KklyzoGQIorSINBxnO0ZYZztC6W2L2uVhjo9tX25UJTadozbUKilEMXc8xOc306IfPG3r77+xgrbCTEFtJ2FmqAt+NTgBwQTYpRj1KasfadxeWZ2rvPMs7+98Ze/uvmWOx56+PEkFq1mf83qdx9+6PFbb7nzySeenZyYgwqyFMoCtCo8N3adiFGtVcGZKUqgTCdEmrTKcsDmaBgxnGbH1Nnzk4nJuTeWrVz6wKPL31zlufOm5YHP8gyghCQyvitJXBQZvPDsW6+/8m67QW6+8cEzTrs41YBV5V7XDQOamsq2AlRYxEXSLIWx0Wklc3yRmJTjCNUgRF0vJlQpXYQRC0JalNBs9e+976FLL73m+edf7ffDqoJWyyHESFmiTX2S6EWU/pHHIkoP2PF+BV7B06qASy66rMwhM2UqskKXqS4E01bX85xQ8cxzwl7b0TIrUkgiBiWEftLvuFCB4hlnZl5K0JTSlNwUTOdUZUSmfsITYXAbVfGMUyUSyYmOQkGIQfE8ylRCREIEZRorco6TcF46DhcCwiBlrIqp8WLmxSwgIiDKCZkdUC8WIUlDkgZJ5sepFxkcrsEFSicQE9PdAuDW25c6PsWd/SyHjZu2RFECAB/96EenpiaiKOj3mpvefQMKrzW1af2qF5k715ncvv6tl7PEA8mbE2O333TTSccd35xrFTmMjc9s2T7SsyM/Ujiy6wai7xA3EDjKuydKCS/8SPiRCGJZhx8JL+RBLCOiI6KDWLoBc3zq+NQNGMr5BoFEk0uU+UV11j0jIun7oLSmac3RD4DSKJo3fEZJdEQpLha32tbjTzwzPdMqK7CdsAIIQvqHPjWEEcNXQqjCuiVKJWhT1thDX5RW2xoZnbrl5jvuufuBF55/eefwBPIJKmBUK5ljNdXoMjWV4KmSeVkA4wYluoTMUOsR12AQ2zjNhLLSUcx7fc+xQ+z3k0TaVpTEihLj2pQmWRSYwFNVAY8+/Pw9dz2mBDy49KkLL7icEpVngPL9jOrUVIxqvDZ9+qkXTj3lLHyRc7OdyYk5bAdIlXe6Doo2C5m12hbup1l2gCNXc43urx976o477+v1AsuKqgqEKBCWVQWeR7GWjrGI0j/aWETpATt+B0rLHC6+cEmRQaoLw9NcFVABiefz0W7b6rS6UEFm8ltvvv3n557/wP0PT0/OQAWO5XZafbTvqFEq0n+lqReziClMXxTPONE8ljTWSawYy5QulM6FTBnXlCnKVBhRdPGUsux2Q87BsUUYZ1TkIZUhlTHXMU/9RPqJjJghokx4EdEiJHkQpV5kvEA7gQgSE1Ldd0i75z/z/Cs9O8CTfqdrS5UFQeQ4Xrfbv/rqqycmJlrNmchrTI2s7Te2E2867I1V0s5If+OqV7euXQ6VWXLhee1Wo9VqOW6YlkC46TsxzhkFsa4bpYOVXiz2Yp4aJmYQpWGiMCKibY+4AfNCPshRL+SU5mjTVqO0drLcM4L4/Qq8gy3S+suFolRrCCOGO5qYAtYqr6vXvPvuhq1I1iCkrhebdKGr/R+kwEuoqjWNcf0jjBhKGaMOkUmrspqXULCtgBKFtMszwMKpY4fYX8BqamqqKGT4IG7R4H8y5t8IacsOcKjYcSPHjcgu2WSowHWiZqOHRuWUmCgUgudQASWmKiGJVRSop3/z0vE/O2NyonnJxVf84Kgfbdu6EyrwvQQbt2gzd/99D597zoWdtr3k0qt+dOxxF190OVSAWvMoUoGrtFHM0wwwSTVptfyt1cf+6LgTTjxtzTsbUEc3DEWeg1JVUUCr5XCe4zQ+JqaEGMayRZT+ccYiSg/YsWCUKqE5ZUlE4jAK/QgqSHV2zVVXL73vgTzNzjz9rH63F/pRVZRQwfbtO7TKlS72RCnCT8pSqUqLUrJcJilLDGeZEKj5kAmZcqG4UEJqIbXSOaFKyjKKNOcQR3lCS67KmOuEpUwWTBYxNTE1VOSEZ1TkqC5EaR4mJgikGwhTguXHJodHH386K2HrjpEsh27P6XTtOOFlAVrleQbXXvuLubnm2OjO1tSwTvom7jZGN25Z89rIppX23LCOem5rAgz59Kc+Pjc7HQRRo9mdnOlMTLeRmigQj7zE3HSQozh/hN8dtAtFuKI8bz2mVOeyQaxRtjcMhe+zJNF4vsMWVxTJPeN9UFrHbo8sFKXGgB8QLCfipgrOf05ONZ57/qWZ2TZK96UZdHsuFwtVUl3wqUGbMoo5vh4sumI9ttf3EiK1KSnTvb7XaluYz2UpZClIkfle0mnbthVgbloWkKWA3cooZCisr1WRF4BXDPWwGOa4XKQmrervItI8PxE8xw8UZ5ngab26OjY6LUVmW/7cbNv34iIHz40efeSJLVTzlAAAIABJREFUx3791GuvLr/l5jsuuvCy008759JLrnzi8WeuvOK6c86+4KV/eV2KbPu2kSyFJBabNw1998gfLrns6osuvvzkU8485dSzHv31b3DVxw/IuvWbb7n1ztNOP+e551+qAPDvXwF0uz56xwaBRAdAzsswVHt6oNIPYi2+GAc2FlF6wI6FFnjzPM2ggnazZfctzE03bdh43jnnQlkZpY/89neiIPQcVzDOCIUKlMyULoQuBlGKNGU61xq0hlSBkVXKQQtQspQqFzLlwnChhJJSKwwulJAp40bKUohKKRAKmCwGUZqwFO/H1BCeoTILTiGihLpKqwxg/cZtG7Zsd8NEpsXsXDsvQOlc6Xxo+whq9c1MN7/5jSNnpma9TrM7PdKZHLLnRpnbBB2psDs1tB5McuTXDqWhFwUho8qyIpNDUYE0gCr2YWK4ApUCFSUmqTUmMXDTtGZq/S38MVxCRUkH7Lziripj2W4oxaIcIWbPiKlJWL5XlKKK/SBK8ZGFopTSFKddTFrhRCta5j32+NPYJcVdFMxNhVzoqXnBp4ZazAFdcvFLHOhFKS78FipchhGbnWl3Ow5JJL6ZsxTaLWvrluFe10WC4gpKaipc/8W10Xqop+7I4pUEqkkQqvBXMG48l5BEI1Bx04YkMok5VOA4HmMCALrd7uTkpJQyCII4YrYV4ItBd7m52Y7rRKmpOm1bqwIqSGJhW0FZQGoq14uxsJwX8M7ajdffcMuSy66+48773lz+9o7hcdz/wTy1ArDsoKogy8D3hW0TSvOqAqXAtglWOPDPXqsiL6L0jy0WUXrAjoWOHRWSstnJieuuuvKCc8+58Lxzf3z0Dx95YCmNQiP4Yw8/tGHtO4pRqEqoyiTwM5MqmStVDaIUaSqzSqQlqjqgZRt6t0lZMpkxlTKVcm24VkxJpjmRlEqRcMVklrBUaOASpAGuSsIN4YarnKuS8IyxTMqSEINaOVKWSpZSFBy1I3TW87w16zeGhDY63bSs+pZn0hLnYqCCMKA7hsY4MyM7J7/59e90pqa95hy1u0F7rj263Z0d1VE/I85FZ518wrE/9Pv9VqMNFURRunX7XFqAyYArQAqqFEwO0gASEdWOUNe+jiAxIUkTXhBR7ipKZyFJiSiZAq6BKcDHE14wWQlRxInAzvGgSVZtqjwYVOTvg9LBZZj6wYWilBCDpV10hcP7CZH33Pvgtu0jqIKL24pZDv8OBd4o5tipZdyEEcMlmTgRrhd7foJjrog9RLvRZVlAkQMlCifGUXNKigw3SmvDVJyDQ+kJbMfir6jHfLCyXUtJhBHrW76SZejLMOBaVUUOSuacaSWz2dlGr9cry9KyeuPjo1LRCrI8T9utPlRg9f3RkSkEqhQZvoB2y5qabEAFeEuJGhudRvlr2wknpxoov4B93Fo1IssBe9Wzcx3GjWUlUaS1hiyDPAdUiBxcTKIDKN23NMdi/MeMRZQesANROmCY9d5lmKqES3ctwxiV52mlhNwxtO3NN5ZVZQ4VuI6VpxlAuWL5Wz/58bGCcYAyT7NmYzYzqeRKyVzKUgzUeIUuuClUWnGVc55znkteaQFGgpbAeU5FymTGdSbTQpiUSpVwxrXReRFRkRYQJiotAFkldMVkxmQmTSkNMFkIUWgN8/8tLOM8l6JQCFSVC5OvWL2m5/imKEPCWz27Auh07aIE2wltK5icmNsla66qHI78+rffeXNFJRWUOUi+7MXnr7z4vHt/dXOhuaRkemwKKti2dTQMTVHBpi2TMc3CRPmR8iOBekYRSYNYEl4QnlFRMlkwWeEtoo7IXGiQGagUuKmoKGOe4uNMVlQVVJR4X+hK6QIHaijTWGBEKuwLpfE+UIocRS3798jZewtDqVKV68WYnIURw12U8YnZFSvfGZ+YxTUMXI9Bwb8PcnZgCzCNwj1UQkwYMUKMSStjoHbHZCwLI2bbsWUHvs8SIo2GKGT9XmBbQRxJRnUY8H7PS2IVR5wSo2SuVSV4ymgqeKo1cJHGsQojxlimTSlEEUYsy6AoIctAqlyIQptSqYrz3He5YKWSZRQK36Moa4VZqZR6ZmZubm7OdV3HccLQT5LE9+K52Y4UmH2qmelWY66fxMJzSbfjBD7rdV0ly/GxGduKoALXJfhKlC5wR5nzXKq8KMD14n4/DELqusR2QkJMnkMUaSkhTaHZdMNQ9XoRTqjVgo61pS498ChN9x354u3ebxfC0UWU7sfjT95zMhr8E1OFGmkXXLikyAEtoowuiqJKkuTyy68855xzfvzjn5511lkAoLU+/vgTW60WAARBEEVJURRKGa1TqXIpyzq4mr8VohgMKQo5f7/a7Vt4EtzjgzQf+N09A0c38ZodRzCwIrdy1dqx8ekwYkKmdT1wcLG9LgAybnDj8JGHHjvz9HNOO+X0M08/69mnn6MJy9NCSi244UxTohIik0QnSYqFVso0Gh3jLee5kJmUJbpm1o/XDpcxVUmiY6oYywg3SaK9kFKaDj5Oay/MfX8qMBlCiOL9hKUxy90k7Qey47KOy7oe73oc7+Aj9eM9X9i+tFzqedz3hWUlDz301I4d01K+n5y9UhXqDVGmLTtAYYSnn3lxy9bhXt/DsmoQ0iCkuJXxQU+p/9ZbtNTe83Y/Pj8hJgyV7zPfF2EosOm4LzxghzuOVZyIwcA6CnrEBoFkLJMSOM+TJEVb7zhWUYQ+2HkYin29noHXkA28NjFoJ7CbtcABiShQSgAjeRSgM6uJI8lZhut2WhVxxLGTjfKNu2QrsPGcc2Zqr1nBU5JoFLX2vQQrTK6T5BkkseLMWP2wyCGJVRhQwfMshSRWWhWBj6u6KIWRkkSGAQ98wmhqdMlZ5rkxo6kUGWdZHPEoFJQokmh0tPW9JI6k4PPtcCmKOOJKlo4dMppGIcMpsygU+G+rct70niSaMxNHkhIVBjwKWRzJJBYk0bVPrW3HeQGMZX5AwlDEiSgKsJ0Q7wcBZ9woVSVEUpqGEVO6wM8a4ybLodN1tClxV2qwiFWfLhZRur+OP9nn1coASvMCMNvQpuhbXpoVFQDernp7zUGf+BTj8le33RGEcQXgBxFloigBB4V2Q2kde+GlKISYvyLeM7AGtUcUe6ZiNU0xe8PtOiGzdsfeum2n5yeowoNn+fkRYl0MvsPwebDvhbLp2P+rFx48P8FfMfjuxHnR/7+9Lw+2o7rP5J+pSqqSVI1rpqYmM1X2OJUax5kZnImd2InHO46xZ0wcEzs2hFUI2exgiU0CtCBAgEFghECLjTCL2RexSAjQgjYkvaf3pLcvd+3b+3JOn96XM3987x2a++59RvBkQdynvuq6t+/pc0737T5f/37ntxRvU8FtYkiC5Iq/kumItfiKJTe8BBTPC/vbDhcQEfUECA0sElo0UZ24qXsg0YbG8KEblTZlR5aJqrqNhrlu3SM9PcPdA+ROEQNysyDqIa72ho0P9/UPtWQDry9wSpka5Amaso83EF0PGT1FUs9ZKKqj85JtR5SmWLZEO+KrbUd4EOD7NMVDZtCt/eIYimM74ReqDS5JPTenTkKdxPcySiJdo6bBpKZm6KReayUxb9RlZEyKoxxs6rEYC8ZINhdH3LE9EdRC15yWpI+OVBTZzFJemWwyN5KaGs/5xHjd95IozDXVVhVLbhkIf2EaVFUsNKWptqbagZ9SEsC7l+e8XpMRjRmxqGDXjWAaxPHhK2VbDBmEXBqmCa9WJATWHhmerFYk30uwXlCrtsIgg4W2oZM44nLLgLMTTgGhrPDSAG9saHSQ674paZ6f5Jz7QSrcrqSWnmY8jPKJyUajqTrET1Le1z8kjOrbGPSdeaOk0jkqx0ylUZxbNkkzPjFZJZSFUfLW7r0f/8Qn9+zdD3I1TDsI4yTNCWVhNJWFbSYg+c0EVL4z0ZGPPS9rk8baeNQwKaKj4Y7sPzKM3mGQgnkfd1uR50BvWJJUNRu3rGHS0bEqouM2mioOwZhxLJkO8VO8X4sEXyRFAWhoxVGCcWHeguU9/Bf46Vip1HZTjSSS4Tc0VkQ3Km20bFkmikLrdQOBAzERd5kKI0Vxcs5lxYQMGid880tbH3n0yWqthbxmmAXeOdMTNGXDNnUm5raLIinO3vgs43HdDNwJZhUWQCBFkTKdzBoLt20MYmy/g+twbBfNinSV6SpjNItCztzEsQNKIrgA2ZZr6I7vxR6LiOO1JC3wU8f2FNmUWwbit9gWQygol4YwlozCHOvNCGIFGktirsjm6EgFi+Ig3cBPsTSOeMtJzKsVyTQoQkh6LDZ0gr5gyI1E8YZOdM1xbC/wU0MncP81dCKS3Xos1jUnDDJE2xgZnoRTE7I/VSuSY3t5xqWmhtR7iASiaw4yFoCeTYPC+QrvqQ7xERSz0VT9ID3Uc0RRrd17DsQJPzowmnN+dGDUMCns6XSDeH6CVIPVWitOOCwGiu/ipYJ3bssxU2nOOaTPLOe9h/tzzmv1ZpLmhmnnnAdhbDs0SfMwSvABlrHwEy1u4e4yY5swL+4irXam2DYeFZlTIX1C9ISRCHKVQ6OLaGqEBrDqxM061fs0LyKyK6EBfAlkxdQNghi/UczBDUKoRTuCSgWxCe5s0z8LQhV7xOnjLm9KGgBXSAwVQl5HtDH3lBTrxg7LNJK0zKCpewLvhUohlR46NDRrzNWIkAhBf6SWrqhWzvmSG5bv3LUPS7kIlWDZjEyb156wKfs4U0gxDZkQRt9H+yIzqGitrZ3isGdpvziG4tg+bFTqklSWHE1xXZJSEkG7GwZTbki+F9drrSzljs3ShHssgspXkU3ToIGfRmFuW6xRV8IgAxsRx1dkE8IfJcGhg/15xg+8fVhTbUS6OHigL0s5okcxN4LqGIfgcI/FpkGrFUlqavBc0lQbsmNL0gM/DfxUamrNhuqxGPE0wO6wr4alNyUBkiLAZTlN+OHeAaRTRIMIoSUyDkFCRQ5aEDCA3EqyYiYpd1nUaKppxjHnwMTsmWc3I8cRvqqaneUc0bxhgDY6VkV0FKEcEro0h/gllc5VeT9U2mi2ZEWDDFqtNUCunh9GcQo30CTNXebbDs0594PIDyI/SNq2SFs9Yxt3lVa7UEhREhU8CiplXowMXLiNoJv1/CSKORJboibilMIHschnkEqhpcTOnPM048gdJoRIwcGCQUHVbQpbMU4hxQovTLj5YzzoF2sb4B40he5IF0vd4nV4543EiwlLHJYZTqQYXktzBSSVNhXSkB2BpkIklbY0V1KIolBNY82mhbXSopvEDER5znsPDyAcwfhEvdFUH//NM2PjNRFID6eApWjTck/UlH281wiLybEhVs5OdbO0I2TTmQnOyLupepbxF8dQHNuHba00S7hjRdRJfMZVxVFkm7lJGPBqRUoTbpmUEn98rGroDtS8UlODNAnxFPTjsThLufBo0lR7ZHgSxs+mQUdHKkLuHDg6OhU3xk+FlhUhIZOYmwbNM448tdAYI5FAHHGkfzd0Aik2DDLohBHTsSXphk5cGho6kZqaqliO7amKZZkuQk5apvvWrv2QlZG5D6rdKMxVxWpJej6dbBGaZ9OgiMOMt/++/iHMP8Mjk7CQ7z8yLLX0aq2FGcm03Nff2EVo0Nc/FMVcUS3LZnHCK1UJC08llR7vcqxUmmU5j5OsJas559T1/CAaHZtoNFu2Q5kXuMz3/DAIY0IZoSzLueeHHYGoC50QMQ+s8K7tbFJsJyiqBblT0BXio9qOB7oVDAcaEwwn9KhYnDAtV8iRWHUwTBonvOj2IO5L7ITNKpZp0QtGUpQasR/1MQYI0OhUN0iRSgUTQ1/aEW1y+ZRszSLHTQ0nknUmqbSIblSKhVKYHW3Y8NhvNTvKc16pSpBB/SDd9PDjvYcHZMUUa8BtrwInasr+3VAp+cBSKVS4jhODSqGYFeudYj8qw2G6WztiDG1j+1BRaRRwU/c9Nw88rsi2bflpwj2WQsLzvRjyKM+5ZVLbcnXNgZYVAI/GEbdMd3Ki0ZJ08Ov4WA2xFXnOfS9RFatakaoVCYuRR4+MQGGra061ImmqjTbrNdnQCSUB+DJNOCWB3DKg9U1i7rG4Vm1JTS1NODx944iD3dGR1NRsi+UZh8oXi6z9fUPgeKigG3UFCXEbdYW5UZby0ZGK8DmG8xWE5pakQ7sG2QARtfBWmqRcUa0k5YQGlaoEIQEBOrKcDwyOIfTV8Mgk1l9KBe/xLsdMpdWaZDss53xkdHJ8ouayMIrznHNNt10WBmE6HV0h9Pw4CGPmBcz3ZsL1WAcwn7oedT3qBm1b5kXTRFvcvrMGWaQ0h/iqZoPPCA0QedxlkaJa9YaChKAt2SjSbdGIF+2A1eoNBaFzwMQI4gqlZUfgBRC9g0Ig3eJWFtbCED013RH3N2qKaqpmy4rZkg2h4BVvAB3RZjM1dQo0sGmi22FLc5sKAV/iQzcqbbUcRaGq6kIq7ekZnmW+JiQyDAZTiFpdzjm/6+77DhzsEy8WON/i2E7UlP07wDFpTbspWl03w6ImKHPmZxjcoRHP6+qn1DaGE67I7TpOK5IlxyVp4HFdo76XRSGfGG8++cRzm1/c8sbrOze/+Krvxbblqoo5MjwBllJkU9ecwE+xoqlrDnOjJOZRmPtegtVH22KjI5UozBXZRPgq30sOHeyHMBoGma45jboCJs7SKdUrfnVpODpSGRutQjRUZBP7ozAfH6uNDE8KURWyLzIfNBsqlml1zfFYXJlswkDJthjyAo2NVuOIIz+B7yWVySZaAO+iTZAuzsuxPbAjFGyjY1WoeZkXZzkfHav6QRrFPM14U9L6+ofCKMejNzHZgD8x0gYLG/vS7Oj4lWOm0iTlDvGGhsehmrcd5vlx7+Gjmm57PhSqIaG+HyRBmFI3cJnfkTUpczvCIZ0BMXcmBIli7hYppRDyRsh2iOKGpUfESsUWKtxKVYK4KVz4BdshUg/i+IBTHeLXGwp6EUdBfgWbarojKyZi4kAkhQ0RaFi4WoIsxR4wK2IvIC482mnJBoyPwEzd/q823hJMZtNIs4KW5grKBIl2pFJZcyWp3exo9rVSVSU5nwoKWK21nnr6hcGhcaRPEfQJEX9qeB8anjseZkdt1j3vYzyM5QiqDGERiQoQP0FQqWBQ3+9KpW1jEGP7sK2VMpppiuszHvpcUwlxwpZkvrR52z2r79+752B/36DUVF0a8JxjC0uiNOHw0INlULOhbn5xC5ZCmRsZOmFuBFkw8NPhoYm//PRnIIwODox94uN/vu21HZbpDg6Mvb2/1/eSOOKBn8otA4uvkCPHx2rMjdAjIkyBMhESCxE88owrsqmpdqOuPPfsS7/c+Gtk71l1212vb9sZhTkiUrk0fHjT4/19QxvWb4KHTxhkEHwRTgskDe7E6ilxfLwopBnXDbLq9rshXFZrrSNHR4aGJz7/hS/lnNfq8vWLl37/9B/lnA8MjsUJ/99//fmDh/pzzl9+ZRsCXWGFtXSGOd6lK5XCP8Qh/vWLl0Yxh8zh+UmW845IM55mU5+nb78OyBAJiefFPWmeJVkap0mcJkmai3aKjYsukjSPkyyK0zBKwiiBW4tY6RTKWLHIWlTPFhcJBO9CoQpnrCKxif0dIbX0Y0JLNjoCnNqSjaakwXIH4Q5mjg1UjeHNxBRxzoCskZbqSIrdlK1Gy6xLRq2p15q6pNidIdnNpmUY/tBQ7aGHnty//4ii0CTpNmVHQcBlxYR1/oPrfrVvf4/nJ0Xj+3acoCm7xIcTjhU5VpREnDoJ/D7DgO/a+fYjv36COP7EeG1wYPTccy4wdOeF519u1OVVt9111ZXXvLR562tbt195xdULLrykXpOfevL5k//XZzduePjokZGrFy2+ecWqI/3Dp3339DDIiOMPD03MO/8nLzz/Sq3a+uEPznzs0acGjo4eOtj/o385666f/8Jj8R23r1558+0PrN1oW+yVl7ede878s/71/KHB8UZdOe27p1937Y2KbF537Y0rlt+2ZPGyRl3hOX/qyedHRyqBnz6wdiMI+7Zbf/7Vr3wTLjGf++zfPfrIk5XJ5vwLLrp60eJ6Tf75nfe6NNyz+8DoSEVT7bPPmjc4MMZzvmvnvqU3rTQNOjQ4nmd8x/Y9e/ccfPyxpxF4K/BT5sX3rVnXaKq337H6v/zX/4YX9MsuXxiE2V/+j796c/vu/iPDDvH//cf+k6Y7f/CHfxLF/O+/+FXPT9Y+sFE3SM753n2HYMGL91q80Qrn+5JK56p0pdJqrYU3nbtXr7lg/kXnnnfhqd8+7fun/+iss+d1xPnzfnL+vJ/Mu+CnF8y/6IL5F82/8OILF1xy4YKLr71u8bXXX3fd4usX37DkhptuvGnZ0qXLly1dvuzOu35+510/v2v13avvvecXa+5bs/b++x9Yu/aBdQ+u27Bu/caNv3x408OPPPLoE489/sTjv3n6N0889eb2t7bv2LVj555db+3Zs/fAvv0H3j7Q+/aB3oHBsYHBscGh8aHhiZHRyuhYdWy8NjZeExawjabaaKr1hgIUlxKLr2lJytsoPM04dnbELK8L7wPoK0nfU81jQpzxOONRyqOUhwkPYh7E3I+mPgj40RTynOc5jyI+MtJ4+ulXxsYkxJbrMhVGnpdBT07d8Je/euTtA4chIpdUWuK9wHNzXWWWERiap8h2FHJdoy++sHX+BRfdecc9t6y8fXBg9OYVt9Wq0u2r7jp6ZPjLX/rGL+594Iwfn7Nr575nnn6ROP7yZbcODY4v/Nl1w0MT3/qH/7d1y5vf+8cfbHttB2yIYMVz84pVl136s9GRyg1Llk9ONFbfvebqRYv7+4buuH31mvvWXXzRFaMjlVtvuXN8rHblFVfbFvveP/5gaHD8C5//Upbygwf6zj1nfhTmPYeObFi/yWOxqliLFl7v0vCqK69BRMkozJ99ZnNvz9FHH3ny9W07n31m8wvPv3L1osVJzAeOjp55xrlr7lvne8n//c73Xnl522dO/pxje1/76j8osvmTBZcSx//61761b++hP/vkpzwWn/qt7/Kcf+XLp1ASvLZ1u8uiM848F8/+TUtX5pw/tOmxm1feTt3wP//px7fv2PPGm281Je2P/vhjEEOXLrtl4aLrwyj/i0+fnHM+MdlArj1EHIO7PDSOU59LKp2j0pVKm5KG/y9JOXJUIUxBN6n0XaJngY0UVQdkRWvJaktWpZYitZSe3r5DPYeBg4d6Dx7qPXCw58DBnle3vP7qltdf3fLGlq1vvLrljVde3fbyK9tefuW1DRsf3rBxE7brN2xav+GhdesfWrf+oRU3r1px86rlK25btvzWpctuuWnpypuWrrzxppuvvmbJoqsXCyxcdD1w+RWLLr9i0WWXL2zDeecvEG8D8y74KT6fd/6Cc8+7sCO+ccq3O+Lr3zi1I2av/7WvfwtAzVO++Z22n0Qj3zr1ux3xT9//l44455wFHXHppYsuvXTRJZcsvOSShRdf/LOLLroKWLDgyosvXnTttcuvvXb5ypV3Dw3VGMu7hwKIbDsQ/rtbtr45PDIpXF9KKi3xWxF43NA8x4pcklqm57FUbllvvL577f0b4og7NpucqF95xaKhwbH163516GDfQ796tFZtDQ2O9/Yc7e8b2rF9z1n/en5L0pcvu/Xt/b3nnjM/DLKJ8TqWG/OMZylXZPPyyxb29hxdsnhZz6Ej115zw0ubt1526c+ylGuq/fJLr21Yv0lqamvv3+B7yeq710yM1x/59RNyy/jjP/rYiy+8OjnRePSRJyFKeixuNtTxsZplutdcvWTpTSuzlMPTdMXy2xzbu/iiK9ave8i22E033nzjDSt4zpOYX3rJVTcsWa7I5gNrNz726FNYnd2wftOa+9bdvuruG5YsX3v/hqeefF5VrFtvudOl4Y7te6668hqol5OUf/e00xFmefGSZZhd77r7vrPOnnfB/Itsxzv126ftf7v3x2ec88KLryYp9/zkrz/7hZzzK6+6BrPxyGglCDNFtbDmVfRBL82O5rB0pVJFtSYrTZdFUO1SN0zSKVvNWZZXoYGE0lJRLVkxgzANwtgPEs8PXRbCjAjhkJI0j+LcDyLmRYQy22GW7RbFLyzQ4r8XJI2o6LDIpdNpGossLqRJyHlt6KaCFgrqYjuzYG6l0uOHKOJRxON4Knx5kvA05WnKi966yDBDSOQ4oSTZExNypaIePjza1zeGYzWtmz9opKoExrphlE9WmtBCl1Ra4j3CsSLLCKKApzF37MA0mKG7kxNSZbKpKlatKumavfb+9ffec/+NNyz3WPTgA79csfy2X9z7wPPPvTwyPOnS8JmnX6xWpNV3r3lr1/7tb+7+27/5Iijzm6d8BwufoyOVTQ89NjFeP/+8BbVqa+HPrtu5Y+9Lm7d++i9O/sqXTxkbrf6fL37t6JGRBRdeMnB09Af/fMYF837693/3lTThO7bvOeUb315w4SXNhvof/8Of3rP6/r/9my9mKTcN+tau/ddcveTQwX6ec4/F42O1+37x4ORE49JLrlqx/LZqRVp8/dLnn3v57LPmXX7ZwsceferhTY+//NJrl1+28JaVd9RrcqOu/PQnlx3pH/7Ex//84IG+M358zs0rVo2NVm2L/dknP5Um/DMnf47nvCXpimr94Idn4ln++jdOZV68Y+fe0//5x2GUf++ffhiE2QMP/jJJ+Ukn/Ts/SP/gD/8E9QkN/vun/mec8GefewlOgDDihTBKCo7vJZXOVZltrdSyGSyPmBfDY8SyWbcA076fi4iAmJ0pjQkNVM3WdGTkcAkNXBZ6fuIHCaEBoUjQMbUHgYcU1VJVomlU110BTaPI9EJIhEzFSHTq+znMcWHRA72isDZqA5bZsbIorG2LVrtFF1WxSt8tWlPR4KjN+KgjutWHOZJYgoWBEs4IEPtnR7e12DaPW6wrh1EuFlPFuqxpuabphSG0CTUrAAALcUlEQVS37SiOuePEMH4RCbk6IVJVggArCMjiBymUvSWVlngvsIzA1H2XpD7jlulpKjENZhoMue3ShDs2g4WOZVKY5kLi5DlHlIbenqNpwg2dqIq1f18PzzlcU3jOD7x9GB+Q5CcMMljY+l6iaw7PeRTmgZ/qmrNn9wGQIs85JQHcRhEvCTnb4ffJc16rtnjO+w4PfvUr38RXBBSEnXAYZLDCRWUEJnRpiJ2KbCKm4JH+YeGfunXLmzznzYYq0uJed+2NPOdY5Q2j/Kyz58Eid2KykXMehNnuPQcuv2JRznmjqd63Zt3td6zOOa/WWoZJzzjz3De37845n3/hxdQNr1+8NEk5JhkRlAbCCdS8JZXOVelKpbbjwWPEtNx6Q0EQO1kxDYN1hK67hsFM07Ms37YDQiKwaZGuimEEQADCYlb8OpXLxcuCgIfhlFAVRVy0j8YFobY1DjPjIMzaHFQEZjpi4ihh2lMkP2GLNBPd/Fm7oVvoiZkhigTxd6T2MMo7oqMIDuV829uDcK7tCEWhtZoeBNx1szjmhCS67nUPwxvZdsC8WGTxJDRAHuySSku8F0QBd6xIlamheS6NmZvYlq9rlJJgZHjSsVmjLodBqiqmplqaasGXlLkRoukiFB8y5fGcS00Njp4jw5Nyy0DuvLHRKsRHeIKqihUGWb0mDw6MMTdSFQvsC0tgVbEQevDokRE+HcABUZB4zje/uCUMssmJxq6d+4aHJjwWI+5SnnF4qSLqws4dewM/RaLZNJn6iblRGGQtSQed79/XA3EWxsNINZ+lU/EOJycakxMNqakhQf1tq+7CUmjOeU/v0ZxzqAwRrTPLObzS4UVqWu6Lm7coqjU4NA6FYr2hkGkj/6JgWkqlc1i6Uilef/LpkFRwbLIdD7LgTEBqBBEWpUYhpNp2YJqerruqSlSVCAXjlPxKImSrNs0AMAxf1z1NY6rqKgotehpYVjhdZ4osQXvCF1Nq6cL7ophNRXhlFIE6bcGS2qyTZqKbX2k3CL/VNgjd+DvuK9NhDYphdcm01XE3aldUqyO6MXpR5C3SbZJw183ynBuGD9kUwY+6TIUREnvpBkGAFaCUSku8R8Qh9xk3NE9XWeDnccSJE5oG4zkHybk0qNdaY6OVMEixs9lQXRoi4BFiGNWqrd1vvQ3vlNGRCmgVNkeGTuC7ydzIpSGSzCDKPM95ZbI5OdGAO8roSAUx/AYHxhAyV2pqlAS1agvWtnLL8L0EelcwOui2XpOlphb4aZbyek1WZNNjMSLUMzcaH6shsx5xfIwcIRogHKNZ2OsClckmThNBmhpNFdzJvHh8oq4bJIxyGLLAW91l0eG+QZdFacbh1JdzvvW17TnnYkJrSloUc0IDkZwRbFpS6RyWdydZK2x7e4fqDUVViW4Q0/Qsm5mm53nZO8mh3g2x2GbbAfaYpodD2rW+JHKcsC24Ln5CSinA97nncXjUFdEWnCUMOXJSBmEWBBx5Iv0gte0Auc8c4iPxGc7LcULswXYqP5rj6bqrG8QwmGFSbLFHtNO2bWtHbIvp1dpSrbksmrlFchsow0U7+ExogERsCDVMSPQ+2p9K41XYmqZnWq64JhiD5yfTrz65aQaumw0P1xnL45h7Hp/F7zAMOcZP3RC5PKeSwXW8r8i/5RANJd4HNMX13NwlqWUElEQujR07wHZ8rKZrjtCdJjHvOzwYR9w0KCXRvr2HKImqFUnXKHjRttjgwEQSc1Vxdu3ch3yugwMTxPHzjPccOoIW0oQfOtifJrxRV6KQ65pjGkxuGUiRJrcsxLKvViQkeoPKt79vxDJd2/J5zsOAW6YbBtz3EvRCnFBqarblUxK0JDOJeRLzXTv3BX6eZ5ySSJHNWlXBywEStPGc9/YMMjfSVJKlPAw4z3nf4WGe85c2b+M5pyTa8uobccyZFw8OTmq64/u51NJtO0gzPjEhIeFa/5HhNOVZznXddYjfallBmFmWPzpWTRK+b39PnvP+I8N5zl0WGQZziI+Ej4REU1TqBe+NSoGydC4nUSehJJq5zVMeR9wlqWkwXWWG7iJU5rHC1H1T9y0jsM1QtOCSlNhxR9hm2BGztW8wywhsy3esCON3adztvLptPTf3WDpze6ztfLS3xw7bDG3Ln7mdq/ZL/NtGt3mAOolt+YbuairRVGLorm35lERS01AVB7xLncQyPVWmUtPwGXdpbJuhYwehz5OYm7o/MlxNIk6cUJWpqjjEjn0vYzRz7ECWHMv0PDdnbmIZgWkwRrMk5lLDsi3fZ5ySSJacRl3TVeaxNPA4cUJNceWWpSku7nCXxj7jjh1oimsazHPzwM+pk+gajQLuexmxY8v0MNrQ52nCpYalKo6p+3hSiBN6bh6FHHOsZQSOHVAnYW7iMx74uan7aAH1HTtwrMixA8sI0oTveauX55xnfM/uQ2nMLdPDrzO3aIfYMXMTzGyMZi4FlXppmp5oJvrIl5O63eKBx5FH0LEisCDu72MFiBCO2KKFWah0lkfrmNqfw0e6xCzAlZ+JEz6wEh8JdHvuMEXYZoh3cdsMsRMv5eLBRB3LCIpfqZN4bu5YUatphz4ndqyrzNA8YseMZi5JHSvCVwjE6IXYsc84mirud6yI0YzRzLEiU/cNzbOMAIN0rAgdYYSMZiKNeXFslhHA24fRDA0KsQE/0cI8hlNzSYr6ON+2WQ4IfV6dVAOPBx6vTqo4027Po+iI0cxzc1wHSiLHoSWVzknpSqXFP3XqujvJHFLLLI9QRxzvR/pYpeESs/+PJ3xgJT4SmH0eEBVogV1m7gfl4LPgP1GfTj/daJZOz2OiNUgLqAASRQXBOjhEvCOiZWLHlhHgQ/En6iQgV7CXOCP0gk7RJhgOZNnxmhS5sO3JQkdRwA3NMzQvCjh2dqNStCB6nxq2HZRUOlelK5UKfSwuvbifjvVREYe/R0YU9dswV+0f6yN9YieaEiV+nzHzZVpwlRDUsBOSIi3QGBxsiuRHCwQsOBIQVMdoBnlRyJF0ejIU/PoOFRXkDfpudp9JXcUKs59mkUq7XRkMMo25KlNVpmnM8SowyzzW1suU+rek0jkqJ1ESdYRL424/HRM8lnosZW7C3ES0SZxwln47Yq7an6t+S5Qocfzg2AGeYvEYEifEzo5ABfHgi8pYYcUUIerA62bmV8cOil3g68yRCLg0Fofjs2MHlESYjjqirUGxf+YVmH0iEiNs+9ANbU1Nn51XUulcla5UWrz5in//saLIc8UbYq6oq1v7JUqU+PCj2zwguAHVioRBCyQkiMFjKYiTuYnvZS6Nbcs3DYb6ba/aRUYRrWGP4EJQo235xAnF9CL4EmbGHkvbDgeYm7TNnzNfCwS9ia/iZIsUO3NiFMf6XqYqThTyKOSq4uCsu13nthlyuke/pNK5KidREnQE3LAoCYjjA91qzg6XhgLd9ner80HaL/G7gbg92nDCB1biI4Fu88As9xUqMDfCHIUHHxnKEL3BYzGSlyHSkJgZuvWFCqLf4k7Ro2N7+EBJ4NgeGi8OYGZr6BTx7gEcghZEgxjqzAsiTlD8hCuAY+Eja5ku/Gst0/VYPMscWLwOhSe0pNI5K12pFH988a8VN9ZxfYTmimLnajzHu9+POkoqLfFB8Fsf+eLtVJyI2siVuZGgUkoCy3SR8hMEg5ptBOyx2PcSwW2ogMZti4Hq6DQXokEcW6wg9uBzkc8EIxYJmJLAtphlurbF8Ct+Kg6s48xT5FEQuWN7vpdgDz7M8tx1uZ7lWumclZNOfMD1EiVKlChxQlCWOSonTV3Ncltuy225Lbe/b9uyzFE56UQPoCxlKUtZylKWj3YpqbQsZSlLWcpSlg9USiotS1nKUpaylOUDlZJKy1KWspSlLGX5QOWkTml0SpQoUaLE7wPKMjfl/wM/yXBKRrdSdwAAAABJRU5ErkJggg==" /><br />
<br />
3. España: situación geográfica. Unidad y diversidad<br />
(Tema libre, para cuyo desarrollo se sugiere realizar un esquema previo) <br />
(Valoración: hasta 3 puntos)<br />
<br />
<br />
<br />
OPCIÓN B<br />
1. Exprese de modo conciso el significado geográfico de los siguientes términos:<br />
- Trashumancia - Falla geológica - Área metropolitana<br />
- Aguas jurisdiccionales - Hábitat concentrado - Estuario <br />
(Valoración: hasta 3 puntos; máximo 0,5 puntos por término) <br />
<br />
2. El mapa representa la distribución de las precipitaciones en España. Con la información que<br />
contiene responda a las siguientes preguntas: <br />
a) Diga el nombre de las provincias que se ven afectadas por la máxima torrencialidad de las<br />
precipitaciones. (Hasta 1 punto).<br />
b) Compare las precipitaciones caídas en el noroeste peninsular y las que se recogen en el<br />
sureste de la Península. Señale las diferencias que existen y explique las posibles causas. <br />
(Hasta 1,5 puntos). <br />
b) Comente razonadamente la relación existente entre los valores de las precipitaciones y el relieve de la<br />
Península. (Hasta 1,5 puntos). <br />
(Valoración: hasta 4 puntos)<br />
<br />
<img height="301" id="il_fi" src="http://www.ign.es/espmap/img/mapas_clima_bach/Clima_Mapa_05.gif" style="padding-bottom: 8px; padding-right: 8px; padding-top: 8px;" width="435" /> <br />
<br />
3. Los espacios industriales en España<br />
(Tema libre, para cuyo desarrollo se sugiere realizar un esquema previo) <br />
(Valoración: hasta 3 puntos)<br />
<br />
<br />
<br />
<br />
<br />
<br />
<br />Soniahttp://www.blogger.com/profile/03784012477826443134noreply@blogger.com0