tag:blogger.com,1999:blog-24562620881186662272012-03-01T06:34:11.972-08:00Tutoriels et ressources Geogebra pour les mathématiques et les autres disciplines.Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.comBlogger1221100tag:blogger.com,1999:blog-2456262088118666227.post-34369284964190298222012-01-19T12:15:00.001-08:002012-01-21T09:13:07.766-08:00<br /><br /><center><iframe frameborder="0" height="396" src="http://www.screenr.com/embed/3qes" width="650"></iframe> <iframe frameborder="0" height="396" src="http://www.screenr.com/embed/Yues" width="650"></iframe> <iframe frameborder="0" height="396" src="http://www.screenr.com/embed/noes" width="650"></iframe> <iframe src="http://www.screenr.com/embed/GKas" width="650" height="396" frameborder="0"></iframe><iframe frameborder="0" height="396" src="http://www.screenr.com/embed/H3es" width="650"></iframe> <iframe frameborder="0" height="396" src="http://www.screenr.com/embed/f3es" width="650"></iframe></center><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-3436928496419029822?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-76674837472659351952011-12-24T01:27:00.000-08:002011-12-24T01:31:19.124-08:00<div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-0QqmljF8tcA/TvWbYnhdhBI/AAAAAAAABag/HeVdoS-iqns/s1600/sumo_wrestler_1_1.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="http://4.bp.blogspot.com/-0QqmljF8tcA/TvWbYnhdhBI/AAAAAAAABag/HeVdoS-iqns/s320/sumo_wrestler_1_1.gif" width="320" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="http://benice-equation.blogspot.com/2011/12/sumo-wrestler.html" target="_blank">benice Equation </a></div><br /><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-7667483747265935195?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-1526721954863857792011-12-22T09:34:00.001-08:002011-12-22T09:52:11.366-08:00<iframe height="500px" src="http://www.geogebratube.org/material/iframe/id/2641/width/680/height/500/border/888888/rc/false/ai/false/sdz/false/smb/false/stb/false/stbh/true" style="border: 0px;" width="680px"></iframe><a href="http://www.geogebratube.org/student/m2641">http://www.geogebratube.org/student/m2641</a><br /><br /><br />&nbsp;<br /><div class="separator" style="clear: both; text-align: center;"><img border="0" height="318" src="http://2.bp.blogspot.com/-o6vDEe3aSRA/TvNr1xuJkaI/AAAAAAAABaU/mFI4_rp16oo/s400/Capture.jpg" width="400" />&nbsp;</div><div class="separator" style="clear: both; text-align: center;"><a href="http://www.geogebra.org.pt/index.php/component/content/article/1-noticias-recentes/179-mensagem-natal" target="_blank">http://www.geogebra.org.pt/index.php/component/content/article/1-noticias-recentes/179-mensagem-natal</a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="http://www.geogebra.org/forum/viewtopic.php?f=16&amp;t=19622" target="_blank">http://www.geogebra.org/forum/viewtopic.php?f=16&amp;t=19622 </a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-152672195486385779?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-39958046011411652862011-12-18T02:27:00.000-08:002011-12-18T02:28:20.864-08:00<iframe src="http://www.screenr.com/embed/i6Ls" width="650" height="396" frameborder="0"></iframe><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-3995804601141165286?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-74635106269806681682011-12-18T02:25:00.000-08:002011-12-18T02:25:01.658-08:00<div style="text-align: center;"><iframe allowfullscreen="" frameborder="0" height="315" src="http://www.youtube.com/embed/kmtMoLqF1J0" width="420"></iframe></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-7463510626980668168?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-15650690481694496402011-12-11T05:51:00.001-08:002011-12-11T05:52:11.128-08:00<div style="text-align: center;"><span style="font-size: large;"><a href="http://mrmeyer.com/blog/wp-content/uploads/Diagonale02.ggb" target="_blank">L'applet</a></span></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-1565069048169449640?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-908894679381882042011-12-03T04:54:00.001-08:002011-12-03T04:57:54.606-08:00<div class="ggbApplet" style="width: 640px; height: 300px"><applet name="ggbApplet" code="geogebra.GeoGebraApplet" codebase="http://www.geogebra.org/webstart/4.0/" archive="geogebra.jar" width="780" height="500"><param name="filename" value="http://www.geogebratube.org/files/material-2387.ggb" /><param name="borderColor" value="#888888"/><param name="enableRightClick" value="false"/><param name="showAlgebraInput" value="false"/><param name="enableShiftDragZoom" value="false"/><param name="showMenuBar" value="false"/><param name="showToolBar" value="false"/><param name="showToolBarHelp" value="true"/>Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)</applet></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-90889467938188204?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-9810762716312031812011-11-12T08:39:00.001-08:002011-11-12T08:58:52.360-08:00<div class="ggbApplet" style="width: 640px; height: 300px"><applet name="ggbApplet" code="geogebra.GeoGebraApplet" codebase="http://www.geogebra.org/webstart/4.0/" archive="geogebra.jar" width="640" height="300"><param name="filename" value="http://www.geogebratube.org/files/material-114.ggb" /><param name="borderColor" value="#888888"/><param name="enableRightClick" value="false"/><param name="showAlgebraInput" value="false"/><param name="enableShiftDragZoom" value="false"/><param name="showMenuBar" value="false"/><param name="showToolBar" value="false"/><param name="showToolBarHelp" value="true"/>Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)</applet></div>Télécharger le fichier si l'affichage ne se fait pas :<a href="http://www.geogebratube.org/material/show/id/114">http://www.geogebratube.org/material/show/id/114</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-981076271631203181?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-91566749705960600802011-11-12T03:20:00.001-08:002011-11-12T08:11:16.097-08:00<span style="font-family: comic sans ms,sans-serif; font-size: x-small;">GeoGebra 4 est disponible <span style="color: #ff6600;"><a href="http://www.geogebra.org/cms/en/roadmap" target="_blank"><span style="color: #ff6600;">au téléchargement</span></a>.</span></span><br /><ul><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Création de Gifs animés, export possible sur <span style="color: #ff6600;"><a href="http://www.geogebratube.org/" target="_blank"><span style="color: #ff6600;">GeoGebraTube</span></a>.</span></span></li></ul><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Nouveautés:</span><br /><ul><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;"><a href="http://www.geogebratube.org/"><span style="color: #0a2945;">GeoGebraTube</span></a>: easily share worksheets online (see "File" menu)</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">GeoGebraPrim: special interface for younger students</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">User interface: drag &amp; drop, style bar, perspectives, accessibility</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">New tools: data analysis, chart dialog, probability calculator, function inspector</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Copy &amp; Paste, two Graphics views</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Inequalities and implicit equations</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Improved text tool, better equation displaying</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Filling options with hatching and images</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Animation of points on lines, dynamic limits for sliders &amp; axes</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Buttons, input boxes, scripting</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Export to animated GIF</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">50 languages</span></li></ul><span style="font-family: comic sans ms,sans-serif; font-size: x-small;"><a href="http://www.knowtex.com/nav/nouveautes-geogebra_27168" target="_blank"><span style="color: #ff6600;">Sur Knowtex</span></a></span><br /><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Et toujours:</span><br /><ul><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;"><span style="color: #ff6600;"><a href="http://www.geogebra.org/webstart/4.2/geogebra-42.jnlp"><span style="color: #ff6600;">GeoGebra 4.2 Beta Release</span></a></span> (with CAS) - experimental version</span></li><li><span style="font-family: comic sans ms,sans-serif; font-size: x-small;"><span style="color: #ff6600;"><a href="http://www.geogebra.org/forum/viewtopic.php?f=52&amp;t=19846" target="_blank"><span style="color: #ff6600;">GeoGebra 5.0 Beta Release</span></a></span> (with 3D) - experimental version</span></li></ul><span style="font-family: comic sans ms,sans-serif; font-size: x-small;">Source: <span style="color: #ff6600;"><a href="http://autour-de-geogebra.blogspot.com/" target="_blank"><span style="color: #ff6600;">Autour de GeoGebra</span></a></span></span><br /><br /><div style="text-align: center;"><a href="http://www.inclassablesmathematiques.fr/media/02/02/2339496313.gif" target="_blank"><span style="font-size: large;"><img alt="tangente.gif" id="media-3289197" src="http://www.inclassablesmathematiques.fr/media/02/02/2778190356.gif" style="margin: 0.7em 0pt;" title="" /></span></a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-9156674970596060080?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-37870890356613134132011-11-12T03:15:00.001-08:002011-11-12T03:17:45.353-08:00<a href="http://maths-au-lycee.wikispaces.com/">http://maths-au-lycee.wikispaces.com/</a><br /><a href="http://analemma.wikispaces.com/">http://analemma.wikispaces.com/</a><br /><a href="http://geogebrawiki.wikispaces.com/">http://geogebrawiki.wikispaces.com/</a><br /><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-3787089035661313413?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-7589931458924173142011-11-03T07:04:00.000-07:002011-11-03T07:04:18.267-07:00<iframe allowfullscreen="" frameborder="0" height="360" src="http://www.youtube.com/embed/_LYfmaHaYOw" width="640"></iframe><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-758993145892417314?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-45372147413496591262011-09-22T13:24:00.001-07:002011-09-22T13:24:34.714-07:00<iframe frameborder="0" height="396" src="http://www.screenr.com/embed/svKs" width="650"></iframe><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-4537214741349659126?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-59309702620203155502011-08-30T04:55:00.001-07:002011-08-30T04:56:14.136-07:00<a class="external text" href="http://www.geogebra.org/static/mathlets/BIDMAS/index2.html" rel="nofollow">Order of Precedence (BIDMAS)</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/CircleTheorems/index2.html" rel="nofollow">Circle Theorems</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/CompleteSquare/complete_square_level1.html" rel="nofollow">Completing the Square Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/CompleteSquare/complete_square_level2.html" rel="nofollow">Completing the Square Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Decimals/index2.html" rel="nofollow">Decimals</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Equations/equations_level1.html" rel="nofollow">Equations Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Equations/equations_level2.html" rel="nofollow">Equations Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Equations/equations_level3.html" rel="nofollow">Equations Level 3</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Expanding/expanding_level1.html" rel="nofollow">Expanding Brackets Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Expanding/expanding_level2.html" rel="nofollow">Expanding Brackets Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Expanding/expanding_level3.html" rel="nofollow">Expanding Brackets Level 3</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Expanding/expanding_level4.html" rel="nofollow">Expanding Brackets Level 4</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/EyeBall/index2.html" rel="nofollow">Eyeballing Game</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Formulae/index.html" rel="nofollow">Formulas</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Fractions/fractions.html" rel="nofollow">Fractions</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Fractions/algebraic_fractions.html" rel="nofollow">Algebraic Fractions</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Gradient/index2.html" rel="nofollow">Gradient</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/GraphTransformations/graph_transformations_level1.html" rel="nofollow">Graph Transformations Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/GraphTransformations/graph_transformations_level2.html" rel="nofollow">Graph Transformations Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/LinearGraphs/linear_graphs_level1.html" rel="nofollow">Linear Graphs Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/LinearGraphs/linear_graphs_level2.html" rel="nofollow">Linear Graphs Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Percentages/percentages_level1.html" rel="nofollow">Percentages Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Percentages/percentages_level2.html" rel="nofollow">Percentages Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/QuadraticGraphs/index2.html" rel="nofollow">Quadratic Graphs</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/SOHCAHTOA/index2.html" rel="nofollow">SOHCAHTOA</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Surds/index2.html" rel="nofollow">Surds</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/TableSquare/index2.html" rel="nofollow">Interactive Tablesquare</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Transformations/transformations_level1.html" rel="nofollow">Mixed Transformations</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Transformations/transformations_enlargement.html" rel="nofollow">Enlargement (Dilation) </a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Transformations/transformations_reflection.html" rel="nofollow">Reflection</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Transformations/transformations_rotation.html" rel="nofollow">Rotation</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Transformations/transformations_translation.html" rel="nofollow">Translation</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/Vectors/index2.html" rel="nofollow">Vectors</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/differentiate/differentiate_level1.html" rel="nofollow">Differentiation Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/differentiate/differentiate_level2.html" rel="nofollow">Differentiation Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/dimensions/index2.html" rel="nofollow">Dimensions of Formulas</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/factorise/factorise_level1.html" rel="nofollow">Factoring Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/factorise/factorise_level2.html" rel="nofollow">Factoring Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/factorise/factorise_level3.html" rel="nofollow">Factoring Level 3</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/factorise/factorise_level4.html" rel="nofollow">Factoring Level 4</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/nthterm/index2.html" rel="nofollow">Nth Term</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/rounding/rounding.html" rel="nofollow">Rounding</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/rounding/rounding_and_bounds.html" rel="nofollow">Rounding and Bounds</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/simplifying/simplifying_level1.html" rel="nofollow">Simplifying Level 1</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/simplifying/simplifying_level2.html" rel="nofollow">Simplifying Level 2</a> <br /><a class="external text" href="http://www.geogebra.org/static/mathlets/simplifying/simplifying_level3.html" rel="nofollow">Simplifying Level 3</a> <br /><a class="external text" href="http://www.geogebra.org/en/examples/javascriptAutomaticCheckingExercise.html" rel="nofollow">Midpoint Construction</a><br /><br />Source :<a href="http://www.geogebra.org/en/wiki/index.php/Mathlets"> http://www.geogebra.org/en/wiki/index.php/Mathlets&nbsp; </a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5930970262020315550?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-41235729938122560662011-08-30T04:50:00.000-07:002011-08-30T04:50:57.785-07:00<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/3.2/" width="553" height="542"mayscript="true"><br /> <param name="ggbBase64" 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<param name="image" value="http://www.geogebra.org/webstart/loading.gif" /> <param name="boxborder" value="false" /> <param name="centerimage" value="true" /> <param name="java_arguments" value="-Xmx512m -Djnlp.packEnabled=true" /> <param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /> <param name="cache_version" value="3.2.46.0, 3.2.46.0, 3.2.46.0, 3.2.46.0, 3.2.46.0, 3.2.46.0" /><br /> <param name="framePossible" value="true" /> <param name="showResetIcon" value="false" /> <param name="showAnimationButton" value="true" /> <param name="enableRightClick" value="true" /> <param name="errorDialogsActive" value="true" /> <param name="enableLabelDrags" value="false" /> <param name="showMenuBar" value="false" /> <param name="showToolBar" value="false" /> <param name="showToolBarHelp" value="false" /><br /> <param name="showAlgebraInput" value="false" /> <param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet><br /><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-4123572993812256066?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-2659124902212474772011-08-25T06:36:00.000-07:002011-08-25T06:36:07.457-07:00Des fichiers dynamiques sur les propriétés du triangle avec diverses notations:<br /><a href="http://www.geogebra.org/forum/viewtopic.php?f=2&amp;t=10170&amp;p=76783#p76783">http://www.geogebra.org/forum/viewtopic.php?f=2&amp;t=10170&amp;p=76783#p76783</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-265912490221247477?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-59681872893079117702011-07-20T13:42:00.000-07:002011-09-08T07:11:09.748-07:00<br /><center><applet archive="geogebra.jar" code="geogebra.GeoGebraApplet" codebase="http://www.geogebra.org/webstart/3.2/unsigned/" height="390" mayscript="true" name="ggbApplet" width="505"> <br /><br /><param name="ggbBase64" 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Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /><br /></applet></center><br /><br />Source&nbsp;&nbsp; : <a href="http://geogebracentral.blogspot.com/2011/06/eutrigon-theorem.html">ICI</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5968187289307911770?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-38146504725123906342011-07-03T04:16:00.000-07:002011-07-03T04:23:55.079-07:00<center><script src="http://www.gmodules.com/ig/ifr?url=http://hosting.gmodules.com/ig/gadgets/file/115833159301520744010/valentinovo.xml&amp;synd=open&amp;w=257&amp;h=197&amp;title=GeoGebra+Gadget&amp;border=%23ffffff%7C3px%2C1px+solid+%23999999&amp;output=js"></script></center><br /><br />Plus <a href="http://www.normala.hr/interaktivna_matematika/elipsa/index.html">ICI</a> et <a href="http://mathematicsbhilai.blogspot.com/2011/07/ellipse-by-definition_03.html?utm_source=twitterfeed&amp;utm_medium=twitter&amp;utm_campaign=Feed%3A+blogspot%2FhwYnO+%28Mathematics+Academy%29">ICI</a><br /><br><br /><br /></br><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-3814650472512390634?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-87356083969598678022011-06-30T05:24:00.000-07:002011-06-30T05:27:59.813-07:00<div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-dl4-fgziaI8/Tgxq9OJvy-I/AAAAAAAABIU/d29_SN_E9M8/s1600/pyramide.png" imageanchor="1" style="margin-left:1em; margin-right:1em"><img border="0" height="292" width="400" src="http://2.bp.blogspot.com/-dl4-fgziaI8/Tgxq9OJvy-I/AAAAAAAABIU/d29_SN_E9M8/s400/pyramide.png" /></a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-8735608396959867802?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-76689853026097271142011-06-06T22:15:00.000-07:002011-06-06T22:15:43.148-07:00<h4 style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 0.84615em; font: normal normal bold 1em/normal Georgia, 'Times New Roman', Times, serif; letter-spacing: 2px; line-height: 1.81818em; margin-bottom: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-transform: uppercase;">CLICK THE IMAGE TO PLAY!<br style="margin-bottom: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;" />(OPENS IN A NEW WINDOW/TAB)</h4><div style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 13px; line-height: 20px; margin-bottom: 1.53846em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;"><span style="color: white; margin-bottom: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;">.</span></div><div style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 13px; line-height: 20px; margin-bottom: 1.53846em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-align: center;"><a href="http://www.mickybullock.com/blog/wp-content/uploads/2011/06/Binomial.html" style="color: #237fa1; margin-bottom: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-decoration: underline;" target="_blank"><img alt="" class="aligncenter size-full wp-image-1160" height="186" src="http://www.mickybullock.com/blog/wp-content/uploads/2011/06/scrnsht1.png" style="border-bottom-style: none; border-color: initial; border-left-style: none; border-right-style: none; border-top-style: none; border-width: initial; margin-bottom: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;" title="Binomial Distribution Applet" width="426" /></a></div><h4 style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 0.84615em; font: normal normal bold 1em/normal Georgia, 'Times New Roman', Times, serif; letter-spacing: 2px; line-height: 1.81818em; margin-bottom: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px; text-align: justify; text-transform: uppercase;">COMMENTARY</h4><div style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 13px; line-height: 20px; margin-bottom: 1.53846em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;">You will probably want to pause the animation – use the small button in the lower-left corner.</div><div style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 13px; line-height: 20px; margin-bottom: 1.53846em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;">Scale y-axis – this is useful for reading probabilities&nbsp;more accurately.</div><div style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 13px; line-height: 20px; margin-bottom: 1.53846em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;">Showing critical regions at either end – this just turns bars red – it is purely for visualising critical regions when performing hypothesis tests with the binomial distribution.</div><div style="color: #333333; font-family: Georgia, 'Times New Roman', Times, serif; font-size: 13px; line-height: 20px; margin-bottom: 1.53846em; margin-left: 0px; margin-right: 0px; margin-top: 0px; padding-bottom: 0px; padding-left: 0px; padding-right: 0px; padding-top: 0px;"><a href="http://www.mickybullock.com/blog/2011/06/interactive-dynamic-binomial-distribution-applet/">Source</a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-7668985302609727114?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-57041643055411802142011-05-08T04:05:00.000-07:002011-05-08T04:06:17.862-07:00</br><br /></br><center><br /><object width="600" height="400" data="http://www.inclassablesmathematiques.fr/media/00/02/1460889901.swf" type="application/x-shockwave-flash"> <param name="data" value="http://www.inclassablesmathematiques.fr/media/00/02/1460889901.swf" /><param name="quality" value="high" /><param name="src" value="http://www.inclassablesmathematiques.fr/media/00/02/1460889901.swf" /></object></center><br /></br><br /></br><br /><div><br /><br /><a href="http://www.geogebra.org.pt/index.php/m-es/38-11-ano/106-rodagigante">http://www.geogebra.org.pt/index.php/m-es/38-11-ano/106-rodagigante</a><br /><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5704164305541180214?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-47100842649989722132011-05-08T03:49:00.000-07:002011-05-08T03:49:46.740-07:00<center><div id="__ss_5827251" style="width: 425px;"><div style="text-align: center;"><b style="display: block; margin: 12px 0 4px;"><a href="http://www.slideshare.net/lfahlberg/classroom-wikis-and-geogebra" title="Classroom Wikis and GeoGebra">Classroom Wikis and GeoGebra</a></b> <iframe frameborder="0" height="355" marginheight="0" marginwidth="0" scrolling="no" src="http://www.slideshare.net/slideshow/embed_code/5827251" width="425"></iframe> </div><div style="padding: 5px 0 12px;">View more <a href="http://www.slideshare.net/">presentations</a> from <a href="http://www.slideshare.net/lfahlberg">Linda Fahlberg-Stojanovska</a> </div></div></center><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-4710084264998972213?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-15907658252998650002011-05-04T06:44:00.000-07:002011-05-04T06:44:16.678-07:00<a href="http://www.facebook.com/pages/Festimaths/134431773272101#%21/media/set/?set=a.10150176989473232.326464.101205123231">http://www.facebook.com/pages/Festimaths/134431773272101#!/media/set/?set=a.10150176989473232.326464.101205123231</a><br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-Rm7K9p6N7YY/TcFYJT25-jI/AAAAAAAABHc/rqrHfKjMbxA/s1600/2011-05-04_1543.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="http://2.bp.blogspot.com/-Rm7K9p6N7YY/TcFYJT25-jI/AAAAAAAABHc/rqrHfKjMbxA/s320/2011-05-04_1543.png" width="310" /></a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-1590765825299865000?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-5647059019077842472011-04-27T13:38:00.000-07:002011-04-27T13:38:33.631-07:00<iframe frameborder="0" height="235" src="http://player.vimeo.com/video/21981575?title=0&amp;byline=0&amp;portrait=0" width="400"></iframe><br /><a href="http://vimeo.com/21981575">El problema del horizonte con GeoGebra 1 de 2</a> from <a href="http://vimeo.com/user5744880">Manuel Sada</a> on <a href="http://vimeo.com/">Vimeo</a>.<div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-564705901907784247?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-64894376993975776552011-04-14T07:16:00.000-07:002011-04-14T07:16:26.754-07:00<div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/-Xj2ggjwCG3I/TacBdxZqmYI/AAAAAAAABHI/Xz3E6LB5MqU/s1600/2011-04-14_1614.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="400" src="http://3.bp.blogspot.com/-Xj2ggjwCG3I/TacBdxZqmYI/AAAAAAAABHI/Xz3E6LB5MqU/s400/2011-04-14_1614.png" width="249" /></a></div><div style="text-align: center;">C'est <a href="http://mrhonner.com/2011/04/14/student-work-curvefitting-with-geogebra/">ICI</a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-6489437699397577655?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-29694327539112913482011-04-12T10:23:00.001-07:002011-04-12T10:24:12.678-07:00<a href="http://revue.sesamath.net/spip.php?article339">http://revue.sesamath.net/spip.php?article339</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-2969432753911291348?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-83182688573921126202011-04-02T04:38:00.000-07:002011-04-02T04:39:03.338-07:00<div><br /><br /></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://4.bp.blogspot.com/-06KSABUOyo0/TZcKP4OAMII/AAAAAAAABG4/VsJ6rcKGj5s/s1600/cribe_d%2527%25C3%25A9rathost%25C3%25A8ne.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="208" src="http://4.bp.blogspot.com/-06KSABUOyo0/TZcKP4OAMII/AAAAAAAABG4/VsJ6rcKGj5s/s320/cribe_d%2527%25C3%25A9rathost%25C3%25A8ne.png" width="320" /></a></div><br /><br /><br /><br /><br /><div style="text-align: center;"><span style="font-size: large;"><a href="http://www.geogebra.org/en/upload/files/italian/annarita/crivello_di_eratostene.html">L'animation GeoGebra</a></span></div><div><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-8318268857392112620?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-53870107968480924582011-03-31T09:00:00.001-07:002011-03-31T09:00:59.185-07:00<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/4.0/" width="682" height="440"><br /><param name="ggbBase64" 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yBApHUFMta+52Fp/NlYxLGi4dEbNGme0sHj9FGJppjVF306wEjapZ72T+ujfbkuQsAzp2WWPq8p6rU0RvZIkVbov7HsqthkLNZHfV2kP+9P0zEQr+CH3bGMtIqmbQveJHkJhHTbxnBrVgAjw838nv9lDLEa6UxEZ3Hn9GlAF802xYbZcxftfee53wnPVv6wS73hIC9GxHTKSmeYrsgfRJxEjNVkezZJhwqZwpS2W1QFLzgc76QBzXnW/pbSDugNJ0Vz7IgfXL7juSeX/CVXvdaJszlV/MWfKQTRxmtBoaPZQYjMawuSU2JZdmaHFbbPtbAj9Oqq5DicHT29x0ZDUgphybLP2ZDiXYIGI9/9zDiYa789/56o6PZXrGGFcjz2s9ndXFItviZZ3n78jXoHw8EKdYoQ5jPY8zp+pEzQ+Kkst35wSU+JUemYoeL7o3aXMpoDkkHaOTztSLK8XSPmuS3/8I14HtfA8lBRHOdKyRXfr3181fXFdS6Z2kmhEUg3YpJ59R4I5vwedzgJN4rDYzd1o5H3UmSXFZXrTaKFkALfyHCDi0tPGQgyYwtOxHDfHWJVpdrZ7Zvu3Trybfy1pqw5DvAetaL12kK1zYiG27HkIc24dvmrJv5cSx0IWI6OYbnS7pzzB/954qupKWvuvv0iN/RsI8ms+NYlkzWAdH6v3s+9V+iytMygkhtGml6l2uwL6iLxxGtNWfP3PyzzzRdkGkTNHiavrhix9pg500lhmx4kzNFSTJqrzbgQdKR8z1pT1lzbocgLUkiB1j5meMNFN6czLKIhNhviF5OvjzYdmZaMC7D+e68Dpwz+Jaff4m63aQYF83VPnRCfZMnF/Z00n27Gd6OXP4v9yj4luPiT8J8pDn6Z4jrPolkuQY3TtnLWsdJtlzSgIcmujli8dKUNh5Eq1+D3r5VAv910dtOp9YwSFcIwaLjz2sfzVoVKgPQGo9iSHwUcSyUkDoPLIbQ5czL/OnZeCmn4xugpr2yoncw6CSQWgENvCN0I3q+V5o7DVoTowbteLMNU/mrtpNZJhEaVu96ZQ1VRW0ji7pGpnIiyGO9ryfxlOUDYZxPDjwbuL3ppz9LLy5SFAeVwO5/WAyUGL855+TKAx8qd7EKJgH/AcVZrtgIu2J0jcNBwtCYc20lsHOrKVjagk18oIYez/qZmZxV32vUCuwnPNaYPWJZcjs2HAiF7KvzI4GD7k+X92Vqy/BvPUxfu78bRtbypLZPgvdrr1TkZbqRtYNMIT6jc4HNP+XctCVYs+ajTaRUMnHh2K3Nb1StHsaCCJrBKgpp7P3k7/6sTdTXwg0aCmvstz8zOLYcfOJDHP7R+DP4Y/KcY/wcVLRi0/lMdXwAAAABJRU5ErkJgglBLBwgDJ43tYxIAAF4SAABQSwMEFAAIAAgAY39/PgAAAAAAAAAAAAAAADwAAAA4MTg3ZGFkMWQwNDU5NGJhOWU5MmU3MTRhM2I1MDRmYlwyNDU0NDIwMzM1XzRmNDZiNTVkNmFfby5qcGecun1Ykuf/P3whyKWGaGmFCajBQls1UVagolDfAM1Qsa0+zjVNl9rK8eAjZvFQujnCx54cIk0R21bZstKVhbNE2xRTp6ZWJBShqamoaVo/P7/jfvjn/uO+7/f133W+z/O4Xu/r/fB6Hcf5ceCjAXAOY4QyAIgNAEBWHuDjELALsIPDQbitHQiC9vZ2DghXR8SqVQi3NS5OrpgNHljMBjTaE7+N4LlxCw6N9t7hs8WXSCKRPAgUKtkvaJs/ye+/h0Ds7e0RqxAoR0eUnxfay+//s33UAqvtbCagr6GQjYDNagh0NeTjA8Bj5TttIf/bgP/DIDZQmC0ctLN3WLXicNMZsIFAoTYwqK0tDLaymruyDsBW267xItLhLlHx4Eaeq5+4+JIdbuf15rWcx2/x/of4EnuHdetRbhs+2UTw9tlM+nz7DjIlYNf/7GYwWaFh0fu++HL/gf/EJCR+ezgpOeWIIC09IzMrWyg9dTov/4cfC0pKy86eO3/hYvkvVdXqGk3t5V//uFF/89bthsY//2p58LBV19b+qLun99++/oEngy9GjKaXr8yvLaNT0zPW2bn5dwuL/8UFAaCQ/9P+H3GtXsFlA4NBYeB/cUFsMv/rsBpm60WEr6FHgfE8l41+YjvXncWXrjfb4/w5b9ce4j92WIcnvfhk6r/Q/jey/3fAJP+/kP1fwP5vXIMAAgpZ+XnQ1UAIMCJua25lxu9K/PRYtHjAIbxyJNZp17PzvK0i39zvxvVlGPl6T+jYeGjDRBuQUwBfWzdgtbBb7VDu+RifVapEOLmd6oSOzjIZ5ffDIp0OtjSCfUVYPrWQZC8yXIciIigqNLIRP2NVA4lEmE2OsFtQaJEnY65unh1soXRslDtc5WnHwq6I4N0aako1Giq7vOy9ym+v9PLmiJMxKdDU7Dl9/J5XHlte3hjSHEmBbSNWHu0KFj2Klk2zgY1nswj4eKGxiYQllhBFgV2gxxXsL6mLDv6KxDgXq+YkUjCDjpP3XiS3Nbdbyl1rCVSq3BG6v0EaSG9lBiWoUX+nuQu0Ht3KR1/siEuocy152Qh1o4Jvu5seJvUi94Mi4uymoqVHB2w9drWrxmEmoh66sfhnxZyOhBwpbh7177/2IlQCwGbHJ8M6Gn+Alb4O5Kx5YjKZ5d4ubzb5629DSdXpfykrOghvDYV/K338kP5tQfwUCebfUM+r2UBPRmrQ25VIXQqFEb1Ob3M1JGhiH+cctfFZaBsNNVI08XWM7LFQhcy3048fERIWMWKoDI9ch2lkrAcpRtfPokuADlLqVvmyrS131fH77PpkQp3NLiuupwBoA76V+0SwBbfHaIYkvMvicrL79PpU/3qo/qD1op4C3Vjq/oO2edlnl0uDc0D6Q5tZhKShlRn7EZi1ZDpXcyGm0g4CLJEbXHbhNW2xCxDaELX6vtPx94PEYxaGsYQozyb91g+rfCQegLizhv2VuZZsEIeeg5d6/YwKlsrLnt6dUTYu5SavGoo6UBQKYhpUNo94ogADj90ZttQ4p/GeAALvOOyva4IR6/CIt4GC4vDvz/JEyJz5y/4S4PsLiKTFE/Ul2H8Yw4Lydcau709UvXWFFLdxAiBjLKAztPNk09DGsvTBbMBas4lQhdyVrkGL++WKAnpLzvsumj5WvhS5fVHO5a6CSC0Pd+RxVGZL2NoD4tvyITk/xZcPUN8Sad/dWX1dqigJ4BRLlZqFSAYKPqkl9BXNtnkqF6yqvcFVcgqIGtNWXWrTEVxFNoJCbZTWcJpw7+RZCPc1U6AYKfvNhoVGGjjoOCJY4KyQoRNLK8MCnKK++BG8nerdCVBtvQzQfmXu5Y7bPB37Wb0djX4om/B8bLA4j71ne+gYewuAR+ZwBGe1bZgbLPjtDj0tQu3TyhUUfun6WyecDOJfFWHfULMxTT7yp7tEgqGegoP0USZMVnA4+4PHz9c+37TzFiQovbolo1XGq0vCI5Lcqs61RfrtRfD0cTmcNVm6oB7sOYRzDvKeFQlYsXnielMqSke6YMtUvRJ7vaOd4tsHecTEbXnKcAykGLnkWbDAVToth0zsBibj17K51DvR89/W0Zp1MWc8zKnM4LIJJxzhdhhq6WFxxh9zRkVuSpWbYUaZ8s8ep4vy0LHXKVXFOjLVsvV0wwWCpzM1RdDuZuwufUVFIikqZz4LX8juBWkEz6kS7y+Ccicj15XFSYg9NSnkCZrNhQnPIBv/wrBYWZpHZcwRg6GI+HrvNv4OZBNXeMLV4S+DVASxPgQbcPJ31e4MauCVTQGGtDfeu+qWTgfVullJXeSgOOypLr9vAnkWVkBR8NsxMQ35tIT5KHBmqdaaIOthoqHypz65riKnaNo3taJjm52MYbzlxzoUqSBgx1GDJLkt1uixM4tke0eaqEgLrte4Z7//RaJb1e75nkc3qjqZMXGbQOi1Wyn/ZCKMp42kiwtlxyxDpIuRcP8eT2FkIHw9IAqY6fBayJrHuY2H5bYN9UZNao3lzl5P81bSeyy03kVmtLAgW2cEegvt0P1MKEloFyt5cjB7nOHHDzCrqjJOxM6OdbhtCe3kDQ2KnC5w+f7PV9JRC71231V9seHoW7I+7CCdAJUvdEBuveh5iUcvdicanIO/D/u6IbUpgtyBq9tV+CLIWi06eMqEDISEKq6yiZWPzp9gMKnvXH31XLiAluqJhor7Ncc5x9pNSiHnKk+5fH/RWm1CQwZK5fW2N//YUP2WPjei4LN5pXJfsqvN7+RI/35MCpWbNZr7ejT4F1PRHuDE3VdF/LtX4XxI9WAEyojxlzKy37B9d0NdMkI/zIe/kjwwYelWj4pt+5Ynnj21gKDMTG4zHBILgZcfoosVJnmvL+ZH3EYRbae9Pr78m7t3aNTsEZGNphYw9v18B/+924jiwFzI8pHkVe+mKZPM2pujoNI4pd5Mb0E2BBXsqr92sOIM1NPgorsJ3cCHmESBYjb+nDvDSY1DEkvDmuadavUkkEZu9zxdTWlrN19NfiSyc5vTJOETrqE6gNkNWUd3XIvZuQeRVBgV9igT6ycoCDdePvo+0mbWmGJ4HPr3mgfmwpHRZPWhH+fOQZVU5rRKWmfeJBY9jTiorH8h7ZcjfW54fjH7XlMYdvaPUSdQtsaR6eZGbm/upI6yPgI/4QGGQD67RX24G/UrdTonDV7udn7COsqc1pwZKow1wwq+e1sFM8udYnLTV9lpZHJ/S3fpJK+EbhqRYYaVOihJSk71Ewz1Xfj94QL9b/PQTZ+j12EGo5sKIRaFzqp4pV1zqDFW0ClYCYMJvbJx2umlVXNs2Ka08GBANMsT3ulHwbB9JF2xi+lG6NJ8FQrEm9JtikBPsZysBjBq1tPbJcmrkt3QcSNKmmG1KDDppq8NuTMiPH3TWTfBbXCo3KPoEx4LwkfSJ991mz+rT0Onm7q3Zbx9srIUPre1YNeXQvtm8xCu/Js7/RSLZW8bFAWC02o3qNcPGLDJ97EXY+R5ZuU3YQAG2RVSQTh4N5NSU/TNW8Mr0TSa6Yb6CGz4/plj4UHentuyBE1833mRUGjFJLu4AL5k3aUOwgv9VeHjIqfYZR92tj7Wqtp5w0VcKh2WdZee+763KEUVd6zzcTlRnusbgY4M/ElWwvDLzaoeqoyI9OfkteNvn0D6oAGkq3MLWll2rSuXNVWCdGKXvcmLrfwIfG1rh17DPP74dkjaLGUk7/EWzn6Fz2gAB7HNl7h3+M6N4r6y0mEiefZD/ZvoQ7f/Ec6Pd6aoeA2yDyTNy+ZY6eRDNHpKKh+RS1zImD98BjDv9KR/ZAaB8kTZm3n0B9fTveEzekHE0aPaL6Furdk1awTN8x3enaFBSWLaV7WKxCXV1EJ0j2l4FQJrP8Zi07RGSqc3Ycv2+dGADyTdrRYtgh9qmNK5tlL4fsSBxR7+AT4DfMHIKAlM6Dub95K7mTxYffKbvyQMfoDQeumGwjBy/habAWpID05t1buNVMp5DYJ+AunnLNATOtlX7pqQ6t95Ior1+Xr0MXzxc1en86+AxTQVEkkOXuIIS3ji5vkad2Qq83Z0ebhpRq4wRYZ+AdzuOiTh2xsex/Xa/TVnaV6pmrVuOvWOTABwsqoHoefwJSEIzuyaf+1Pg47tloLwyu81H4GDCigAAQeLgH2LyLuZNYEOkNh519Q2831hsmGNH90ILvTcKGkwF7aKjwAKE9DicVHjeZiwtSuhtPuiBOnUbwnLbl/VPKlMseny/cI3glRAgYl8hQlXUG24+5om9//8AALi4WjH3VFnAwuD7z8qp4UcR2/gDM8SepU+V+2a23U1Ad27js26SiAwMwE3KG2eC+r5cZAnt1vy2eEyXLLCQ+D2nvCQSQf3I4pvm5iuT1syKO1WtZtb85xO7fun6/adRU8whWpQgHnql5tih2rWHS8U7hKB6PlFjpPXi7cvr/coyephJhnE1XUwmF82a8k69TZye2BEvLz+gPAST87Sa0inTkCva5CRMsSrC5kAg3kr8NWpT+vMBFS722LXF1/xTRC5f79Vtfy4edNZ+SuCEoxNVx2qAxKd+QE9+94KfXToebWlmUruDIxce+FtC5Wf/HpHU541oTVgapLxTCHVBfe+8TPJQVWNzLT0wCH+sBc6fVTQrwZ5zYis5ofkhCKGQB8WPus57eQa+2Uv4H5DS30NW/vXW6aAzdPCjj8xk/4x4mrglEtHbEzT8MB51TZ6O9rpYJmorp3gNhEQnccdMGNer3GW26HGBqXDymxjcNlVVrx8yTRFa4Vy+TmRgY6tSBD9ERCeT93/yZ/pKiyXRrhmZLxEm69m6VyPuL8hv7FT5c70lse7dXwW/Y5XGBNxN9TsmUECo1al6h85UuArxzVZqpOKuIHRnVluhui4HdJiaQ9KPZrd6q8lVdDc2scLAkwfNoqEEPQ6wwqFiYmEfpt/0BG9umEWWz9+J9I2JKeWULDfg+7HjE3SsH34T/6Gyu/OMB3oOoKGrL2Uzw7+nuZfDtnktZPBxA33MHJp2JYrQUnyfOrl32kh19i/FHoF/4WQ8JRg+In6+0TEEwCinWTwF9DCLj9tkswGmbzuJx4SpVzOtqpBBy4jgJvSUtwjV3wEApArnKyrK5CIsoWeeeSN2sbg6YWc9dLezGqotF5+cWz3xPo/wZC/dvCJiqm9naCnS08pHTUoROaXR83/CAiU9WCkpwSiB69xU5yeoTpPXBiRCIpylGUIb6OGPiiyqAyUzgj4hVjDjFwY/dNUke8Dq03VZu28dr76PE/+XvOSrJ9RH3fRfRPV4dVMwHC9F24sPz9R/8C6mokvCdhAn0kSS7KD6xOdaWPdFfJhdNqrPGL+NSjuns+JONqsUf1Zxx0lOzDyKwKGKqqBlKDMC4d/zgshRlIM3RLKJzfkedIK1Wrl0snNwE73ymsUlccdad95QiAzZBeTPPYsb72zzCAzmcnju0FlEzPOW107S/BC+k+Ln5XZ4i5xGPDc2mHD27DllZqTJfWrYV8DwRoYUtpXHQt2smDmz1Fkk7FUgUyGJQKCN44Ae5TtxnwkRCQevkj4ZwDlIfao2Pu9WwOzEC3fr/r1ZdgNOFoubaiVG24i4H9DteN7ZD5ulMnyFGggQ9h9TP8PqzX7N8f81FhosSgAuaIc44yaEyMVS5CsTp7Ix722HadAoCPFcy6BdXx2wFqVVEIjqIGpOzw9oQBJXsi/9k0YtAPcWtplxieUc+yi5C3TqjVMmJHkcSF10D4oN3kU+wuXy4anMGgEWGGYHWDT0WYlyaqLtM73rMk2xrPNnlikLYojaKcGZNbIlxyr3qrbbeuEsnTVZ7m7goqHpZOMHpmcGFq0lvtg6lnZaQIebX5eDvnNzo/qmwLpZLKpPsM7VulVljCBog4FHSvY5p63fXpgMTJiYkb/rnubTekdypiyt+nORyCkUxT39ICxcJdlL9ooKyDD0s21He4/+ZBxQzXekEd0QXEvnykkXiTjBZbFKIUzr2eKrHKR/KfOCZR2eP3mBRnk+1IL30XaEVCLU/QXOoqb+iBxwdh3AQ6JLrKf7cD5fgFS9J5JKHW0bBy8ZTfO4o36KxY5o/ggg/wC7l6AwxFFZrvumzBqMx7aO1uVEQt5riwDVWp+KN5cQwyVcQOUwakXL138z511lvbqsTsYOE1lS2kVSJUVl4nP4x5ugz8W7fWEzRui+KkOulXKpvfd8jt1KjMp/zkZ87679LSheFByrTafDKKg18dD9bj+K58CfHvcGBMflzBWEM91YOnQxZYPu0FulKx0CFpwcNjpfN+ZKg3OMvjT6Wf/pA4npi8RCyKdKM0UU7e0VNw+PxkqljhhOkdtRwPP6nCw2Tk1V91gMhblcBIl9sAxN0tY5l2p4HgTuLA2cO0fDcPifkU6EHVugkEb38U7SxkOPFw2ba+lzljCv3ROusqzdATyFu5fi2HvFMtyNtD2JNzL3ii6KcVzq7FUH3iXoIhaeORL2x9MDuxTxYVxu4lf1d0Jq2uNcBU5D7QGTme7Nhi9Gj1Oo40EDTon8vO6KnGXEI2sd6w241A6m2J64AFFQsi2FN3k5UfFzwtobzbxkQzwYCDneIOegj4sizOlz+rDuCaESZmvKED9x9GLe2Iux3jTewsL1Ty7Md8rQU+xlIfbwEfYE6LHXbbNhP6Qs54LjPG7ud5t+pVZZ/4I/BsqObnYC5e+w8FEPgDInwZB2Ellilo+LA8JA/CGpMpOUd39dHprwMxeo7R5nqT69odDTOpuWCqFUDxGO3p1G99PKEwq+P74jGRFigQoxjeWQlHD/opcn8KojGkkC7b4WMKbLi1tBYWRz7c9H9v5ku8Hz5E3/PLGBXLukcFJMFjcXxIo96E/6S0JMLvK91wPFHQyXaX/bFfwVVOVV9yFLwKU2ZO0dljSJUOmSkE8apJ3PLtgRbiUZAOz1V+rTkOlYzsrL/Da5z6UxSVClqbENLEYivGfZB1wpo8NKcu4jMA0knOGWZF0qQO4GiiiwKCjOZxP42wCMqo8V94qU8jtUOzdcsicq5ztUPhNWOz1o+jlHKNlLyF5kKf4QBpvtCgWhV0Id1zKKPOm/9UMEUMQdkB5AYatEKs9DTJE5vjOLufTfzT/rKSYy+3jhhOCRelVWOmtrKoSmh7Pe2gzu95LIJYvp6iKsluFwp4fo6dN45ipvqIXjRhbqHBVEZPSKUwoDxeXjnXLw4zXetOrV7URRJSVoRoW502BpcFLM/Wd8JxFTpEvI/dkm5qipZ5ElolSR1ipVeSH3maZqXKmAKTAEt5Wd1JgVsOG+Ibf2igo6sJDcpp72eoCFPJiq9DEWV0U2sqMnSWd0q0z8UoVlVdArx/IYJBTWLLnmt/9IK9kl+MlIZu3EOnkYWq29tIFW3c4mx9xk4BfFi6n0ILQ8giyhfYeEtgYC5X7wNc2heo8Z9Wc4cTpQAUnTiq5qzz1+NYpdTzz066kq4K+MseWUun4YLEdukTrJGSgyOSjAlo3mr8PIYN0OpHyvWjGoJmC8AnKBJxBXkomZLBPAt6YUwntjwyZNTIXrfHSK2XVJ/fidVc20YLqMFMD0db1e0QtPgYTZ/b93ZHSyYaxkiwzaQT5Ig+kElnwYxPs3TBfzipsrnfz/KI4TOfm5jlHstlw955dG9aq/tH4dq76dUPQTR9Mli5EXBNo5/eEgC84+K4VmNzbruc4HS+PhZY4KLOBrnWHXtwQCTp93Ce5ENwQScOL3CdDNtQYVivkkhJIRGyiuQn6EmycrZJQtBQ9qc8M402Wb+2yJUfNJLleoO5ICOouguA2nQdT2lpP5i95O3lV9XsKo+gHc6Jo60DPtyywMiZ8SkLUY3vjzkFrLQxfdjcdPSKJbPS04u5b1Ygv2prNJQGcjObgD/evEGCKQyLrlqG9L/+BPKrilQg5z746e77jyUqkoKIjdZ6JVwUKc/ftjTZzQ/FBdcD7HcK/qkwlRd2v4ycM8+2t4PfCL6NK5Q3glDqtxO0pCiFtdST5ouVVisUvn0meFMjYESeUZYri0p6+vGb8NLNHEdnySx0FpzkCXsm7tYfXKRiseHT5/V1r81joPMNfdxzJox+kY5CU2Rq8w54k1NxDN7O0edkblo5/f/IMue5/WnnD6C4iuHXGmWKtpuiDFqPlO7jEVkFfaSq5bQtc2L1exSfOJCx2tcCQFCvGB9w1wxvmxNuh8DOdoKuWQydDyeT2akwrUedx1ttTdrndw+yKELHGdGQLs8i+a9pfbKHrwo0DBYKkjK8Im8p5A9iUWBh61khqWPgRB16lq03x2ZiZwplx+vtGzMqZE1jJmWos8kTZxUfFt0vHw6qzKwrez5NEBqjuKDqjmngAXRLhmSiM3mcjTHxVlpRhH0jXj7GPKjxa8MbpX16ktuw/DcUOBJVDAlm4EHOTFypKZkjXu2pOjT2/feSQs9CMG6zon3RRdPPqt3NZITF0qR7DELC2fYZQJYmI+oQwYh4Fp2y54l+URfYIO4nPJIeINbWbUAsnJrL07LIeuR+x+LnaO3Iluje3Pa6ojsqxJxHc6wLTVOPU68qRs8geJdCJTGmkvB/QX7uCYb72GQZQY71d66VFvOGMKoJ744cyZzixfbHbGXnXoEBwZBMg3iOGLvvMc16L8WGZ/JT506qUW4RHEcBMf5CDAPsEint3xgufKNUf7z6ZFVfcD96EnPiFqAUy5ixhSP8eLpXpqmlA4fCItGoQQbE8777w9RtvI4Vs7LniGfQWCV7xhqEv46iCUKXyoonjvvZnHg5A3lV6411KIqg3llO+yJwlD40KWHD+/uC7kfifbaH42/iMORWCTweEHHhsAjppxdlMxisHNL3r7uT5MUO+Ccs4mX9P2BOq1TZP9qhRaHhb/Nge7q6mGemoU0Rr0UuBdul1CEUPbbSRydYwj9h+l7dkWCGeYf6tJyZWeDrLVlAZ1V3486sohQttq1YmXxaUx2bqHwU4xcQtsMxB0YV4n8H9bs2qQ+vAIsB1/MHyTPNIUXzhtaD5kSLDkuoyWAD9Zycc2MwITJpVdwKzb5KpDCdUM6jgvDi1904qSH7oO6Z6rDUSrJ5R9WhEjzx0AAkZl6VZWAAlCNI7xdqatg0wv7R0eGrBVzg0L7S5k6hUcC4PcpG+IQGQW5BGFOFazJft339BeVXudpsLd0r1hp55YH418pNT2042PIt6nfkJ704JPyKGG7ce9jb3MtzhFhwwu8YeZLFZowcyUWo3wAGCkZP1Mf8TrbvN6xO5OCqwvF7hY5F90FSpVn3IAbGG+O6Q3L+9baxZ9TnC5fH1sAfHtPogQ3daKx1bI6eNjb3rsn/tFekap1S8KuXhlaKEcgjsXGyS3L8AyWe+KA7PKcjSgVdDHHbakfUnYyNpqxTG8ihZosJ4XWXrnoULbLIlNidIhMj68aqGoJmOT/nZ7ePFoUD33dSnMw7bZXEe125uCpgDi5lRpf2p8OwabNWPn3Y6pd6NDm2DBn1Ia8Qc4MlcZF1U2kIK8CucHXG0fCdfIMswN+ESMOvRaW1qjMhzZqGnwa4FLZOO7RFpv83SacKEtYeCj6/Jptr6oBgoGLS0YL+NH7iboouNup38VEvN786natvHGQEzszU2Fc+WKR078MIP+3wBxcxySsfzOou8vsjhKxmymp+y3s2sCV/s+vV3GsxlNMUpvAhOteTTQ4OlA918GkyUS5RF5nCpKftSgXMjZ4qOoox5OmGsrT6E7aNVyCHjPeodJaN3eQNRPM1Acst2PzYZ1xX9w1hz+1xVYXjCvWRPxY0kbIW3c1d14upuhRM6zom315CYcBteJqF/Ij95BfvLtM1AJD3+DbhC/BIzAGVy+DxUIqzsPk/xyvdgew9k3jJyyXiJoFfIUfKddvqHMbrYdEx+WBLamc28FrbDkYmMRVvHwtwnHe+zqZY7P6yEo9VJjUucDn0qZydDTsQPG1e4+W58hv6ez4PrbVuI+tSyzfJs6GLX5w0Pwd+4jaPJWlPF3cXot/aBP7/ESmtrDLYTEVcw9OGduczgGjkLh37PC6OZsNWZ1c1knOa2q104ekqq4BTnoeMU77uhyidWikqWcESumCkH40w7IsJX7xmCGZJkHEhpz5S6rc1d+KEe4Ocg0ifpptX1TlcIHJ4sku/L8B8upR31ah7To2d2ezejTYVh3h7/KLB8e2MT1I1wiUq18BpcFKu7Sy8F8YUb/ucI2qXZTLVAYMpQ3X1LGPgUAwkuw7bc7lHWH/30gE1FdWnzeOGRJk3gpyg9xY2unP0fg+2AX045f13Bbl4XulJ48WpyPWdoV0SUqO2noO/0jLnPS05MUcHbwtfrDlTHJtjEL5Y/+vN2Tk5eIKNrAEc2L326wf/9Fn7o6MV9b/2IClMB4GbsuQk95Qnpl81rvt2DuIbP+Lxr9ync9U+1o+Sa60/aKAeX0jQlxL+x9ys2FvmxUFZC8U6P2n8D/Xaa75MayIbiYZeHbuiVbioktxJLl2rdZ5zXof6WCLrM6m2QWFn6a6cjq9Y8vTEkPxm2XdzKk2vcSPBmWUnTnz0OeVGlPV0989tYB5d/HA87EdX6TNFzZ+fA91t+BdzeCBhPhw2ItyCPBjm/VedaAe56xwHakPZBmWrM3wrTiTTpq0NCWVxPY1Sn3WxQFzHgpdx+XgVtkAQfNdaktAgSpToVqpoKgm6qvfWeCyghZ90WrjBdrSeb3heO7bl5ls8QfMhSwY3fJaRmWVWIDD169WBZ4c8Zxv6arCooCvfswmnPCfNLyuu9noAkwtLp7Xl8QAs7kfa7cM3d0o6NouJ6ZSPhJTWFNZhRFALtK1qTK2B17jmqx9XO//JXj8rlNRlblkRFgujVO8cHGy293Uq6abFrnU1VchwYthMgo9dkq7Yz7AyCcohBPG2uYSf31yZv215xwZAzW731eepuWGkzFQyLdLXt5BUEtfzDwAX/NLx6z/RvMpm5gBHk8bPiVeFdGqV9klaP3j4O5bW7kcdDZZ9F5npjmLDMxa4nKDNU4wpGffXr1FBlGM1Xu9b9hzb9EadnUC7ZOMZ224dApekwyRucy3AwdBq62/d9S/CFZpVJIW7l794kUK60JJtFm8IiLIVsin5yttEh283U7YO0G842S/tEflziaG7taPCf9oo1gnZT9+oZzHCtQUBHTykOV7QQgZWBi0les4ELGbULLkvAe1PG2Z9cv0lbaMT3nDikUduFHwxBGGEc9Lc7JaGEm9veKBCyTGpt6l0bn9lP94igwy4KU7cNF7KUwrCZ6Q+ul3GzUis7i34nY53aInqu9RWJZbK3FNWsEQwqyurwjJfqoD21JPgPGcPQXpf+weIDExMBy8bQxh+B5eexnKn5xjGFsrd5Htpu/TDpeocbqEivfq8j49NHpNMGpOYq0sfeUpdUWaYEj4DXE3SE8nDZuSF57ymJXcI7ZL0N+klUV5GTK1T3rC2IT6madGzmVt3z9sgkg/eSsZIEqR615JPJDQBCcKGtqPHFw+K8BVFrSJjN3Nr94hKUUGl1jkz4nlD0V5GNM8ANFL6SzjOMs4uPezPrnikEPU0+0O93OmnCArwB6LvuCQyw8afrwh8AsFg72X8FtSCQ12P9u5w6JQ7XoFYV1dZR3ClUgle8QM3xJNdTBhlW2PMDHh031X8T0iD19Kh9/1eZ40CUwlhCvnT9tmqOUh2cj5d7Y883XHBwsOqO7B2e0XW9EtG/j0X6JgO1r+0tEcf+Msqf3RUmeZzFtI7Yj3eQltqAKL2RBkNMVYZ9bfM0f0VIpnb67w1uRH8om5wXkVfYxNtsA1ZptW2dXo9enOqrkM7wuYy93vg0w2zHjhnLwCtRw9UTFcTynQ6zBHl1pG8WJsJIPypahRCvEFwSCjYlraR3+OAvewqGM6qfKv4w9vRMVd3+Wx/0SjSNvbonISjpclXG+iNGT/lTImv/d05lLj3i7gsZitmt8ibbDWtzwe/h4bbmJl8skqi/58iCP9tuUDJjvkNgs7Af6jftFe9TxHFB3p46zNM2kr5p5rO+85ls/sld4Yd+i0NDSntNXfs1u97Nqk4RcK9Q4w/dLIXhaaqvkgHlg6new9I2M0wo7PKvl3ZlVBUJTeYab0io53SAaTkZNh06XgAPk1OoFjuckkWy7XohO3YcaRwLFX1z7cSTyVCZTFAYxm2PpAOZVhX2Z8d2s5xKHFQ0oBUGgbbaVry13tn7NTLM2LAxvzbENwjr+j5xrhp2cvWjOdQlOXviXpWrJl//D2s5GYDloTzfu5SHr4XQYdKBSDaxdFx/5Gt1HiMg/ReDaI2GgoJqYlIhrQHvy/12WD2TFA72nzCI/WJ5/YEt2xyWu3Z4hBF17o2Wwj45K7ZYmX/Lxy/LFRF5d032Yg9rIaOE2X0+I7StbdmH+ShHlHuDdiAZRiSjkcRnEkA3f59uVW2LgCoEe3oVBvnwFM3O6W/FVJe4u3Ri6Vd/HUqDhZCxlTGQoSUCiH91yuGfXcsrI9nHj5u77OgNA1ieI+JWov4FDU4L+eeQWMavGk05AKxyzm1KXtU21tPkOZBEuI6eBo94k6E4WFS4fet6NMRaJZvznPPoUxxQFIvljdWepbKilu7idUi/HeiEez52pmkWFJOcSm4nDJ7N49LINdDMBDQ2cN9FmKB0vK88gjaAUscJ5BWXIZdqIqZJ4axmwzR38/iDPSRC1sKf2EBhH96v3n+LiO9k/trm7retqGL5bl5fbMmr3bo2bQlVE0+41lEZwz41Iz+yvHyb4sCnGBt+fyFx+rvdqE77K/aR6WbtH/H5sEQrTMByUV586B24b6Ztrrr9I5CcmKCcpd3uBYyen6nM5Z+YTBC5svfiAt1c/KzIgMye7yDZEXXGYc6f856lupi9v7fLkjDwgCjFMfyUkprsQi9uHpcdKqsbZroRLteYQYJcYK2C4uOwSxsSoGKZWDxZTpRDMH4CRgQCmqmOu4uWzc8vpSDCS4YVpUO9Pe14xxbPnpUswGHrTZ4YLbLC+9DXp3E89+zgsj5c8dBi93UQn6DBaUjPi+J23Dck0+s0rzyhup4rm4vYZK1ZzmMd2Aan6yPUKBByov50Ld+X1QmiSF0Dxu/H9hSyG9/XC9rI8AsDTTlxmaSRls1k/Fz8Yo8vm2E3bwmD+9FAzOs6rwgMM/yQ5PdHGgrGL4cj2jdth098H71PqiiV9o6IBr6IXSOUawvsKZHwiQuL3WkeOcpeTYnKhD4zoOE9FR2dqU/kiVsdN/Ht0FZdExSkjPUWlElAnPzfwDWtx5+GWVtzU6r+/TOngAeTfIW3al2HS/+2YWIsef9QyBQYJ/EqiwPB5mtueh+io5OuxXYFzz2zM6uhEQ0yPgPyBqRaQr++U/eg8oXl3WPFNqag55ncKS5wA7xC5D1UqmSeqK9qaLaM7Y01y5lNIQDA4Ad0tbvfPds8pmw9H3hhSjE7/hEYrXY7yCt+c7IikAzEIe2NJFd0UgY1YK465DPC/ZuQHUhWdG/cYVEz+2kjVdiFvwoVF5HnyA832YElWeODilCUGfvOwhqWJZrKYbDUVgBDJzRtCqUS5Rcxu7fZHWShD59XYI1ByjJHu2GZRCjsBrLcDAJdGGAbEaUPPyx9VKm/ArSI6AcbJpKhsHgGtSMIybDHYaijQS/vlBbGwPp5T9yGwV6PmJ0BztRG9dPpMw8kZGMTrFie1QlivAE0AXfZAF16HS1DJG0qNLjFZkzuKe7dDqYKu9Z9ObxLJgJg2FxHwlFs9ciZ5966npUtp98PY4kF8G1E0bMnD7cx/FTvZ1iZRgw1OVhVQjMOd8Pd9ykQURKnp2OtPvS2kG3w0JoSPrLr5IY4aBb0pT66p/Iv+QK+uHlM1jWMns6lVMcJJRGp3jv/hIN4sUIZ2F0ETZioe01RoR0b9CGi6q1iHQ5jC0VsfpsVrCx7IUuAzbrpgCiFTe8zWbYuoZOsckZL7ALpwXc3fGk4Rs1lktbslFDmgsuewfffP56pyohbT6VsKpN2zeo2inZ56w4+vXzg5bSvbwCUcRuf2m1nVKSpB2ke7NzL7H3ICPQUq+2fxvZZQL53vc8mT0CGto56U4CZaWuVwjijU29yAvFzHUAXd4XH+PBVEgaAcm0YpOClPa7+iMTPyCZph829qrAiduc7Y98ZNZuCx15Qo+va5+dJqW3QWzm83a2UjD8WDSPlIYPmoUtYa2WLHp2pftqO0qMjA39ADkPbcFRvfBLZI+xgddycZS+6eLpr223X082dSKGse3WpiO0khBBWFXzp6VJaqpCPnAIepAbZgBphlLQf499dJNcodfLeClpCIbtBRQUVuRN24wXJ7kzU2PC8ihg0peN7xxoWsabHdZCxwuMjClonS0vuTPFvH9JfviRnEC29XetX57nL4tKMpN+G3+Z0Mbq1NqEYnyau08GGj4DDOu1m+fLJGGKe3o0KqAHTCxaGx2JyfmWk5InrjVZL9xntrEdeSjYsYbrarR0KCLs2HIikt5stg4UTMmdXc3kKkATwCrjtJsQ8XLSebAyCdJfyAEXSlKoGYpimJreyAv+UZ3dstdGiiAffzVpC5bzRgO7TbrOLHJflZ0SdJaJrh8tpGESmmPaB+wbP5YJCDvN22Jfu9KAP+2KhoC0N7XHFI4u/F/KHWNDbBQfcgmZYMJPi5OaDP91RzOmuAHWvtUnScrgva7w/uKx1VXEJNac7dVQoKGYP/5fm38RhucKcSMwWr/YgUUTDK6ksobQogCNnP7tQndALZJlKaYPxPV1kqg8IK+4VbrDfIpCNyKXF7Zja2bVDaHsD0l8Xw4Bd17MlpZIsSrBV5DFhSF/k7BwlK9JgCB590NX8trlj237UoayDF0ZkMkmk2FLZJ7lS2//IXHm0wMfeDXJDd9P1+OlDTwqT8TODv7Thi8itwFrhC1rrszNjw+buyw2DpiLw+mX2SPmNuoIsMhRvFodxv3EL4o3RHRWC9vb26hY42VL5qLa4sQ3A0swFPI9tgnEWGGua6dwdqnCOwBE2h1QgUI9lfC4TI/yyouyh8cCTPxKMb3+f3Zy5BhISlsZf2O9ghvB3CA/9cRn5bfyzztdPRg70E5D+MnTC4B/bLiWbPskoo5Cts1dOf8v5z74S3eeO//7q548+jat98135WfZ/DjRlMnwhP2pHAzMu5Q2vyaLeKBcsyVsImcc5STlpGF/e84I3jdvftL49JZAhAdWfU9PGsc7k9zoAUhkTDh0uViAKDvVyV515YCMo/NBE4iLXX7JEEDbTMdTLZCO0Jtt1E9RJLxFm4HvmPuA3JD07xPbbG4TextNf2W7vhfq29QDkObxclWoRV8bEFh5NIv3eoAMyDY9NWIn3UX72qH8H+PKbu6xxmkVq7fDGqVLB8O71Fx632ECoCypXY/E7ZO/dOfOgiGbOmvBlpJyBM5wo1vaHIHgJ1Wo3Vx3JMniEL0ay3QlQZYXlq8hpGk8PxV3ZXCpubl5OdgjVunUgkMGpuQwf0YWFbEAg2lDRYDCVtgZ0AwxAb1VDgaTSAbMauDAsyEvYIx2wmklN2WjOOoP4DubhBpHHXT9fodzHNxsmXVHjxcXt42zInyUrfTmqzo6/x1ElUNoGCuJs6NDLUNcemXmitH9Q/JrZZVXtoT8wzbbpsTWlyRx/OQU6eB7xwOW2538v5P0AE7M+d3mFh3at8U7/S/nTsGDPO15vZIBiHhUSk4mVJCYu91EvZxjSPJVWQKCD3hMWsKG5EwFmkhgAzMmEZ7KKllKttqpYUVy/wxWpud1zk0iktSAgD2FIZgSPjp7QLhYKY8e1Hlnowz/JqBSP/E0/z/iaTElB86rP2nRZgDL/ik/r9jPDM92il+svN4cQMUQWM/K3DqhDBOZPTvGMs0DJE7NiHPElKKsu1YcJ9fAxFwVE/iqYRS1yPkUkIk7GxHfZSIja5k7QtWqzMIF0GqSBV0NNnNUNJqkuXP6LeOGnilOJhTFgOOK/98SK4Ck7FSXbZ2j20+kGGa88kqjXXAHPAs7A7CTz0f48UJl/0+Z5VAPeRqC1lEdLqktC5y17lFrou3l11AxSy6PZSzTJqSf1JMSMHhW0mp6KFPTIU2ym2hadYqg07ieFQe+7IWe1eN95VcL3Jyq8CcrARXmZCOzQwcQdOyTM6KF+0t1UB9biIkcB7zxxsFeXqoIEN5iBaGFNaNDsQ++2eEkEdS/a7Jlwn2R/wB1638yCOLCHxT0Yn6eNrSdX7/0IJCn9nxV6DgOBM7LEhHIkYz9smRnj17CITKFD3Q+c+NrHibfKNpKMco0zY+wtH4ExddpTPQ08EulQNwqxhHsUXYA5ff9WbUDnJBQvRNrkeTVOSncWMXwjUG3VGPh4XPCUQ5am1rMoFC08/HOJ+4RRea9+XZCEPbFwaTTwwN4BGLKxRrIHcrfwSuA9g+/uHSDunCG6CztSyQHcJlk6Aj5BgXA4+B8hVO7fXe6EludfO+Ls8FtXiT36A7Z3hB5d2VKQMnz/jcF45VN0OiKXSEt+AFvh+v2K7olWf6lY51GBvv6ShhpnDZhPw+Y6NtjUQUp4zdQstRvmr+JWuw63Zg7Dj+qDuryZ+U0048V3+dGdEZg7PWLgmLYDBwCoRdl8TfFjmhvusrWK65zANZdH5t9a4VBVbkFT+oiYLygc7tCNyhhojSTOIGjXGxlZBmyOQ/S5FoCO5uT2ef0503dq/evP6EXDGfp3nO0BLv3PKu6QvfgCS3/5bvJ8SHikb7QscWZ4JM/zVpgxCOlty94xzZzRID3Eilk9aRW96iXAZfvvXDYQdVc257WNyWbKd83XNVKCy7IBjRc9JM/bUQeIdJgGFU9mippJOGx817UVulwEjAq7sSyTwMIG8gBF5UGfahsndEK581ycn/A2Wdcts6nwt6oSqDrqXjf3mYbCWKRVa8N1XfanjXLtsI1qN+tCLjUluxmYak2JhU+1f0rXxWmNTZ/FIjLfkFUmrBO0WxRjxwJR4/LGhzuqnPn8gJ4byneud/hV6NXsuWF3Z4/z+DiXrsczvvgTFXtx3Oc5U9TLBypMIl8qWd99Vkob0h2Pk1N9/q5fLD/MMol71CgUxi+Xojrq7obDBKyU8T4kg+1vVXf2tPqzTNPZi+ka02deDU+lEsdVT7hZ5gIBurY95IwX2S3+4XpMC0qrE4YvVfgIlRDbkzHgVglRCZCAyiwh0ni/T9qbtKKyOaZSCdOQ4lslClnsBc7IpIvpvyjWO8qpC7+c1Z3EfXsvkWy4xufuPnwPcTFIOvbl1U84iO+aMazmjn2ddHPT/6yP+vfsM9GDRCwYJHt8BwckPE1GKwA+RTseKs9e8iXuWxnh5L9k0t7uSppTtIwXJjqmXVyM5BKblyzDOT8w1rvLKRbGY4VC0HcevG7YccWrmXyIn7PIcdNoHm3Arcp9UdIwub/KYVVVHOBf3wfzI3GqLpvQCoenw/hbLj5u+qC0xf2YLP6j5Uc/3arJuJQcdfcBuyJCsC/sdm/p4O0aOIsNwYubf//PC+JeSbUw8cv6I1//59R4TpEslbBQHtUcdKZF7Y2jtI+1Mkm+HG2JoKcHfrvR++uHhbGZs9WbDySgzJeNJEjJiQTd0aheG2FCw6i3FXVh0F/EzVYPh5q3DpaNU/32146zvoIlyFtIq66KuKFgZSTxoee3ndkrOZWKc6d3eretKrIP1qkhVQO7Orlw8Cjn2CqZMjC6Ab2DYpH3rgmQL58JzC8aRkrFY+WZ4UZwrE/EfQrB1qd3IslLPsRjqlPET+TsiGskPsP4TsiZCDnucVK9jQGP2CRuynCR3/e1oiikY3+vgRCurexs4pP1VG/QrCVPRkQ6i5UHJFSGz/vGBRalk+6qqEuYfsuGZ1Ufxt3/CMScsUI62RFQJduRZNPGF6ZjvNugeITcqYnAJvbf8vEC3HSeSb09T37EUdrmOnZ8ckEqtkjL/XYkKZAUFWALc+pFlqFXz6wWW3bFIb8iT46zXNOfNryqvED6DKW1LvuE6joqy2XnRpvAI4ftcArhKxHW6WjmG16BnaV5bLZa54Yi9PSdbiO35HSvgo/sq3yhR63IuXC0tc1CAz0BYaa60yidb/IPB/gPkPsWC1wTZDMyAZOdHzRVACzkQ4cGRQ3pOmA5hbUQ8Y+/AunPDtwp4rLmO70PNc/JpP24WjVv8J84shF4df5fPpvpRlKUNusFHZ4Uaihmd6AdStxrdTUQ6yWQ2aDH07Vu1NyUgLf+4+UwrViRiM3WIMW5dclG1Jg+ijF8K6xSd8vbfQNUIJsaD8s2VV6u8rwVcmoO8/ovQ9xU+X7keRcFrwVrBfz8WiyTe0qobPLYrtVSaX9B/KuNywaqn8ASlsn1A4I2fGFWVi+mV6M8tvsyD1pP2YZS3PQH93q/zkHPua7uFfcXxrD5IMo1lfg0j1eYsBcKIJJuCTrc+bShc5PPyuKuueefqIduoD1p9qjwCbJaWr0togH9bQHLHfdb0lVBOLRUgWV10tTtQcpnT5OHd86a3lurEwbSXfMunKpoNMyURzrFxiWWpLCCirKCe5NKrdYx2ikK3plCoKi8O7MIVMsTA2+s1S9F9WIfMrcwDOyFByaN7WmjrCp+Hlz/o+Il106DuRTaSmluG6eVoPgh+eLnIWqfQwGlJT6IfEexCAl+BH4tS8xoZbpfHmqkN7dmzc+qt0CgZ+79UgYwsjp5k+X0RyX+t6n+rJhLd9qjzi6BJE3Q0t2p/itoOO7yJkmW8T5YDoF4r40APFrLgS1wCjVbZTAU62iBTjF2j6apU0z6UzsamdIpjKTrO3SCMHsK9P6K6qeDhCBzQdwbWBzmycMdHm+3nahX3Sf0DInD2ECQnFgAfGnLdodJZZzNpQPIYaUV2jBBGH4LVEm7SiLoLFJDgTtOc8VRh5d5HOGgbNwLEzrcDFZjUBSPCLSDaMhCdw3SSYPh0fWgp2G2Gu/sbxnoGc58jUJPMyJsFKuwKL6Qk0mA9sh7UzF8oowD1p4y4pURKFeRSNNP9Xng7PQNfYz5TGsZ3b2+C0b+TNs2QfWh4xMVqwdLPWXSyYJIMsWyvKLuCnl37qUEpsOS1CjHmSRpZ8jiszIVHDg5eydyPUJJJmDzymzgJy9Ww95uF7f6OIFBivdWdbxvawBPh9+QsfZPIed4tW1sLa5/UzmtDUgb3Uu8HkqQFhfTA3/2rKzhe28djjNqrvh4yhTCDdDEjSZlRC9nOuJrlXW+SlmRYj8kyja7pq+pQ8jS9Cp1MxpxqJhJLaQKHm7K1nYKml0PbKFyv8Ksly1yMo+uli462GlXyTyily6rjj/RrujWHahjLbw2tIJT3AlH7oYVt724I+iWzmcinI4Izxwl4LGNhPIvt3buw+ZEte4zZFoewpY+5I91i3rpM1x/2eJjmRU601z92Tk8TxcWsKRTjXUAm01m5cDDTUinv7XUxW6rHloZw7GHXqI22X4qOeTsC0D7XdGSfUnXXu7dwut/ncKktJ4M+Nw5belPztVXZATRwqJMOF3eWOoVCvV4dEGHtYfikfmkljMmG55VA5EMbJ3wZ37yAz5hRvX1/5Bt78ishIUoBgtmWBMQRd8tGR4n4CvZKY1tONVYAc89lHpH1i048yBt9jLjRHybp0GUQgYUxrEwJg6HnyM5h71kgH0XYl7UG90bWukqwbSsMOYgjcoKLnNuLvwCKyn60xGHoKP0n3u5/5wcBB1S+pyKF0L0qTWiAy6tdrMY74SeWpXZczv3ZFiTpvO3z87pXn4fo4KgWiDFnbt9PpHTF/I3/sLjfLn25o4PyUMQGofc/ut83y8H/t7mIM/tO2d/ryfZPWQHwxz8rx+mJQUojF/sX5Pqdz/hO80l0djNqZKGIIeQn9xeNgSfzYm8mXjs3ZcfpnSoXyHsE9FaKq/7zqXPvYc75jCd9igc9X109qo7Iidyh2PJg6vICDUQF1eq1JSrrI7voJAUOoTPKxQesX7dElx/F1u92iKLxPuEbAcfgbXV1B9eI2luGgAyVnm8e51XHsPevEl8nxa30xxyMOWL/iBjsLL+1C1+gAfbutYz0fg2qODgJRNCqzhmUqRXe+QEQcfo7mWJ6AxCTfLQsHlqLIKeZmOHr1u40YE6Goe0H9vztAxN4D2fUU3zq8SFQpoXh6KPUiaH5BR/BPrUMOBhqKrITkeYrXG0FzVAyfMqk3IALZP3Xrktsae2kRJeEvAZKuf8yTVMyhgrCwdMPe87j3a5Qeg7j3JrBz0qgAeWGYgM21QLTJ3uDJjqk85DMBHHObMwk/mqtyPDDK4qes7uNeSkU4VpVWO9mdTLNA78K5ig/wrUhft1FdUJxHgfCity19zcqEgo/Ah87b0gMgalt65I5nXrjGxiaSv4jTC6sRCj765QLoyejGFzAwuF22xO/r13+P0hGVQE6UyGNKy4EwbPNNkZByIDj2yDZ5sXcyJPHA6uj6sb6+8rS8CvCZh3PUU6bUhIhfP6FGSYDTPkisfmc+ArkNQFgHgJNeffVPcC7nDmWFGypwk9pRzuzp1G0rV60me1B+9f8XQ11AXyWn1+q9/BG46eE9mF5GNeB/k8LX32U/4FFWRMz85St76EKpAVuUeCRSZ+riNUfv9g8o143ktdpB9giuaVdpnRyJT15Pbxlsgsy1+L8x3rME+8VskXWrPHwmF5bp+cKPsUSwnJP8K5JO4kWzHJQ7xPHRe4oYQQNpFtSuKRsfcfnbctOln4zRXSrCGBlArQJpreYbzdjOLKa66IPItEN1WFX10Scs1IowLxP2pxhWHhCBcJmGpd2vbi7x0aakh7jbSEy6C0ucbG+WUbZGnVTweSrrm5qRE2RmjlXzLAXzo0xqw90jr91RYn9AY/J+yHslftR6XnZjdKhEnX+BpSrC2+iAuMs4p/S3g12R/0+GZmumkRaTXl3vfFkW4NhNrB4V2UUd4Yi2EHS108qUz5KpXxzKz2TA2O6lo0ui61qDpVFXfjzF3lGZlpK20gQPDXRyAgxV3QSRkLP3GU/rdwZrBsjVP8pCLyfqZE+MEV2WhRtqgu5f3uhIfIoA8dZ4BqF+lDyFfvTnrE00xpBvThIvwinNuAFrCEFRrPpLEwOtrb8z1nnREvT6Z1VW2JAEvbMZe3v9wPApVhXy5EPDehuU6kH2/+TJjMmK/651Bp8ekJXulDz04bxWls0+U7fzQ1Yi53nAuSzdmIBnatFKar5mwzQXOELqlOa7aOFCG5oYa31N2+/TwaCHhwspaTDQjITBJlVmXDRMBz5jSODyMe+YEHkxuW8sR/RrAVGyKRLKruihfurOs696Y9yN6bziJn3tJKDYSVSvuv7v4UgU6UBJQ+JMB8gNXlO1Y5gKmq992rO8nm4XL6WXI79e1uBPH2ddzSsvcopF7CIC6dJl9z68yxjoVDV+qYTbi0xX/4ca+tLjLLbek0IdX3pNqTMGn+vnEyjE2joJVlQKJLidNBfsDjhvc5vD2dDDbX18laPZgNk+rIYwwRgAyFLc50lzmHtkCV2a8kB9CrJUxKFZSi1UfE05SyBGd2YE/nKjnXyUJ7GUpGvQnsBvYkBGHLmn9qT1Dea0qxG+8MsI6HlvbApH1l77FEZRkCEvlkMW2cjcJX/M4n19S9OMHxDeAkyvNRplc/gUV3fuzMWpytQrnNThY4fCDIff4XRecellS69uGFIGgpaNIICYgbJ7RmzNNOUFDQnSiVKDZT23Ec02bUvjIO5QHTQNIahxDFDmOEOIrY7CmrscQpCzuAVoqhOy0PUVhIpqZillnzuf9Z/61rXeta7/N77ntdaz0v8zkLPHbCMfd2C8yl3XAgJbf/QaBuZiqWM0QGMD/VpM92k95ke8uOUY+lMdAq14fO6MjymitHU8ffNSn2EzDwM6pvMfxLsqB4CVxdbBAEbs1Ed03GsRY7IvrK19M/Z5nOlY0O3ixo7HVenIzjNVqUgp9+AV4BmGvTjBiTXP5+4UWZHh4b8r5v158B4WKbSbhbNOF5K6WoORFOX4is0YEIxI39F9CAAjcA1zUouAbU51ag3VynasghwGZwyvKq+GTJ/GMhAMLyWChbApnKuuqjywVZm+1NwjBAUJdWA5yBEaJOIucCt3KKSb+dDl7bvQOaccMFYyojinsTcu5AMjFL8IGzNzMKJ5XZ2torbuI2Uie42j/c/MnCzs14siGwoIua82vnPu/+Cw5XRae/PtkbAY4D55LHpRqsHxkSQLfMqTF7FBhJn2fGj/muWtIEY28at/pIZM6q6e+HYJTMxyLDtqn6igk4bCxZYfZmRib1AgtqojK8SGGCdncTYHbVf059/eVHSudxkFdpSIruRKfuA4sQNfDYq3gMlnZVo2Hd3Nwmm0N4M1+1YMnH0NSvvs/+19up9MBCkv0PrzPbNomFRd+aM6ozqSH6ooGd114c/Op3MO6OuPb+yYSdWZcPfMNHkHudjM0ql/T0j6apDKbCgQpq9F0LKOlm+NWnWbvDuP3nNdPD+jG4H8zXfW7pp6rLwjD+4D9Eq/XwkhmURb2ePHIkJZhlk/JFsf2DJCtKFSZwutNutCYY7sML7fZG/JrIZGmwI+CuDyxunvDsC6QW4mq0t+f7EGk5Hz5UJr3v/84hRLnsYrpFr5KxwKLB2tQfr4QYov3vchdFJCo153fOVpCB2Xj7tt33kq91tkG1e9l3fiq+MvlvYFDjgvg1fnGhcRPd42WXpfabTLGirU2NB1ak7jXjQkBkxjeVqlfHdpee3K1D6+mQVbnBoA0h/Q5K5y52AxYUdV+GOIsyu8zSXJ/GgIe9z61/85ZOuBpBIlBeVDEeFvXf4hZK7//HpXjMfgxNJhnmVCDl2I2kvjUN0lZx0o5ANt9wPrJmP6UcD3pd1G9JZxDAaMebrWdF6XkYq2TVP7UR0/p0haNVqkrmywfBobPCT5+cqCfWO0U/0S0lr3YqmWkZ6C/f7C4anFPtT7uhFKz7V5ceGk8NMgmHnO/vp3q2bWNDgc3UYi6ra2Jo+cqWUFGfosokvLTHIUh65m+ArAFVCTl6Oa8t88PBRl2qLJ76XuXltul3y3CUqbQoCxCwhRxN/+UmGY2MLdRna3MjTmi77sG+ovlmmeS49tCOBIu0uFC1SeUwBClB/upFA0q3B4CI1eEWaSuA5i8TFhpoLntEkqVx0ynUqqC63O342xJZ+5sjxpTwNau5IwsqMFEuYxxmn9pXPB0+u921NTMHn7jaBVPs55o4ZVC4KwUH7/ngldAtEGXsNNXmuaLnOEUi7jdx6/Q0Q0Ce7BMsqnCFBE1yLMec/hHuh/CJ7fdOgCXYRfHpQYOqnk09hmYdkN84Wjm5UO8UCJqU/e8nwmhFOdk2VopgB0n9wH96KO8MmLzPlNWMW+r2hijKsNRscLvOcAGfTjNmPj2zGD37Opy7oAa/1Bdi/2KfJBBhpjPogm5sFPO7X5K4ImVQz6qY8CV5vxqNtpZbyDMJnRnI9KylxNCjjuXBweFz/mQz5MPNG31PiKhef9UXZo8F6NGl0oHIRmUhSrW7YIQ27erS6F7NIq20m8Je6nkhVpcuvj52oh2l05NDrw+5FYArLxBHfbOwc67OkuCtGyrPet+XH3gwSJk3Mjlfn2hcXKmRQmNo6k73Kw3i2GAO4yErsvXi2O/OMLF0OyTd7H2Gw/PTLrxeH+iFl8FSaM7E+W61oacNcO82pji76PIwC6p1fw4kMDYULj1aJu/zWDKpIBYNlsWEx652eYdrPeR6NG1Sy74MsYKxWpW89ZCljblKCDcFF7N+UIOawdX3zlhkjqFtswgN81vSOMCgNnd1d+rJy35AFMeiOXLBMYG+gnJXwTMn7oT+Z/FaNXdk3ab0oWjBdGZtcPtMb4hyYFHvIOql5pyjLcAUfVcRSSCfS4XWOTWKyrfFhKHGrQOzWxVQkvljIpirBRBA/89GrnwyrpDsi4HfPn2xYNiITIV0AhYM7lX5t5PLzRu+kRZSzz+MGxULWSkB4PgPRuxK/+N2AYoiuzczqd9FV0xudGG6hRggL4T/XUUNr5rw8836KvIopmprKfekb3rWVR/S6mrYVQAdUcCfYYzum+o2PqfvO2GAIRUSj8mqGdpq+Qo/9S3W82KLiio2K6xCxPPYhCMXBf120DO/VJDxQhiooDNSOfAH3YgiiOqYNMRuheBg49G7KKJyIDcR8cDQ4Sr9PXYlZWjg/ms55ZYdfkTNeZTaTO62NNHUOn3B0qpIm64Td25Cq38LjQlUlROqSTam88t41KLKwct3XD5yUIXyGL32UVDF8BXgDKGKX52JNhoEAwAqz3Syf6nzEruUbmm7Cvkxf01ggb0xTWuM2pa4biRN3IL7GzDVcpyMUcyQKputIjULVqkGXV/H4wXV7U2tHi0w8OmYJb4tjkTQdiP1EUTI+Br/8Czhkdul4bigwQtoajzFJd0EUKRxqN+qZrWZw/W/nVLtYg/f/Ba9cM/PF1EyZn9YRhWC+5Hmv4GAXemVj8uPp9MJG7WI1IPqfTISmgoP7wtplSi1jSXcUpo+hPbOw3fBgKU2T1Cd32ST0hqLt1BErSettQHb9dUJwZFHa1NdWlDUHI0PvytSowbXE3A3ar8KbdG2f6Xbb8glNXaSCS2aTObDZ3eDWdvW8VysfIEynN0hszvocHBSLyPXf21F10X442T5PTCvWku2ibZvWI1ZU5R5aKPPDzG5xI//it8A0r5lMM8E/XCjICqA9uryH9NbWm9cfsp6uHpP1uDaC/ePblxkkUcKXml/j6lO2xLbPYr8pxf76F9NdPLv3pvQRuI/2vRPtpYiZ43UyXXTUQG8CNzZoqJv7VmH7usHd+j3cKvJ9s+tJg4JTKX66elvbrbbYoB4c+bNwgtV4QvrSJDxqsq0mh+P4RVHNoQc9WHOD7jfC4Cvcjeqg6DLiNPaxVenMVNoYp1elqWkwcBV0ZJxd2OL2qVowqWxlC+SHmWDtbM67AmSWBjLifAwna0WvNzVpyztSwzkMWIWVJzvsO97fAgnnnRRKlDV8Xi4AO6Hffyi7etTYDJlDzszr9BCSf7lNFHagNQBnd1LHtEebfQnriduhMEqSBR+1cx2/XQC63BtAQwopvW4eMErnMHUMp/ufeVGeyMBw60T5NG/NBKbwpNerXNlBxZl1a49nsugxubQyF0gvo355Bssd8u9YsjLP3XEgVXbwDqCsubGkYOIhBt9sAeyCHuPJyh+tYzbL33S8PBH4/3hs1oKe00gDwq7lgONSP+4ihp7bC6BDD6vfiLxpmurtn+4xFRkts/EFuX1gF5Hwcpd67jbOleoSO06D+qrLkDdw78u6IWpwRgd7t9/TgCNen6rN6+gyWxPDByNMJVPj3VQ/b78WcFpUCyxzeVE7zAey0rzqlwsmJxk8qudfJXt1CPrYBN444+9RYuNd9yFdKK2QbNPwa9gb5YLWZom/3KV08f/VDPY233wa7uSxZIkY0QhrqHydt1ivJGE9lUOtOwe+Wnm7E8F3ZC/gTLK2ij8eG3O+KKKc3ccJK9MQdWdcfjhPX9hMmFjma/MyVzJhGH2ZCo7CtXj7qe6F1VuD3HjACLXfgPjMWxv7OrSoY0HUkKqw0G0sgyweynilmCLWa6nHoNK4y1UvojpjMa0DFaEO+rgPDJu2ZTFseCO1SaCSFbis9BjqAmQvSew+M6IFUuu54VnKqy1iVrCBuSRDaxDhjRoNsRHR72CSF1Q24SMNAaGPfV12wzI/iknYlzJSK3YiTpaGsjoM13uwm5e6tuKY9BNQgdpHAFrRDrkeUSpI77cFUQQ/0/0IWbOENqcHDdNW85erSJS52u/1wEA0ba1G413wY3agtV09DtfftxmKBupeMnY964x9/d2AG5VEyHPr8QeWRV81wUznofdcKwvRAqCVOpP23tJC/UifpelLZMJwx5x8HdJkDCSJpyQuQAPyjh8sCH72/tyuyH0aBZ2db6qzqdgFV8pyFx61IUl2XvCyFNV0bPPZHxFP0iX7jL+UWkfUaRvon7qQevjwFV9fY0OsXFLfcfSMbu5xhRWzXw/uCJyt8Qvd6xGsyKM0gFYUmB4pmSBwr5sBfgTRRUh80pXPP4g2iKmLd9zlbeuYHMjFv68e7HXf7gk9ztA8ikn2Eo2pBX89iIzn1O4AcZcVVVKs94KnXayEpQ3a/77Qx0FdzdZ+w45je6N9U/oTSAvhB5WtaE6X+uruMPNk+K4gDKf46OdnePrkk609yI0mXH/fieBl9T1ik+CI2/kq5tPWXYpqpbxeWp23pWyFQu1SSTFfpBMEraoqB8Ft3izc/jVCaQZmk2b+Y+aT3f6fa1I5xNG4tOTO6eV4g9JwiIH140OrNWV/N5sre7Hm/sW7a9kSnhQd8PXCu+3qnpK1YdEUMeOKTBBoczGu8tFk0zQhBN6yhYHf9nZuYgUAK8s2Mpt4PjyToibp5SaEzyyn6AJzZouTaDZtgiTOjsN1xxBCSvBds0/RCLvhYezlwRSLfKOKt0hjnQPdsUyLH4qA+iv4/8GqDl3CHj/yBsm+AsXcGXawNHiwk/+dyL4tsm4MIzEDKoN2HicgTKsP93XbG2h+hEpL+SvKJlDr858fzzY68uCJVP5SjC9zn4KlqRnmuRtGRHvGmKDaB+CuUZ2hCmXMKj22/jomPfJAHCWwtrGTFOFafDLmmp/uuGhrm4yvtciBFF+Og32xcW9a9IhFyzNU9uJ/7enOW0k+bL+SEctzTmpDPzsgu+6XYCeV8ION2WC8eMf1wXSrXWHE3msDeQmAHlsxXqVBeOfd2ACStJWyrAZVM5UiIYVtVBIwKoFY8zMFsy8+HEF7WcR6IqTDulG8wXiST0wzCYWn95ZsrMq9lVGmZHcudAThqWlxVmp5+O+LDSvCozTz+x7xK3gi/TFS59DK+CRiXcUJcj2xAJfQdbjyuc+hVhXYPlu7/Tm8SUr8kUJXd5li5dLeLDM+Db5ILWgcaMtHeWrEPfXxoxeFm73g3jf2CGwXtgU/UfhNDVnycXry/I8cd9sHCc2XMYXj5jkvYj/8RRXDwWZ3cdkqd+PirDh7ju/atITqn6lTbD+cd6NLyyYUiT+cX/irkXpNJlEOr8RVnVtqz/KopBLr2JmP7ym4yPDMy98eeNvILsSWLZcY1mTfzxZ/mKzIh3cw51EF0qDB7+XRG+ubvC1qgMlm/v/y6L8d/LB4bDahirbN4UAt3Px9f9dCflLe/V1UHxmF+726WbX6+B6rO0HjhxbTG54NVxd8Dtu2FmseFtMaiQOimsRvqLliYkbe+rUQbvYNIyS+569OTC8mkGeYhBIZkRyD2RPoFmw8iAukbrIrx3BLQ91Ar5JnutkQHmfi3BhXCx8daKMCzc3+O4pShLJexnzDbkAlRNSl/LN7QXcSC3AU1XxmONFySHdBmYiymUNufHLn818WgcNMACHlh0dawJxI6aqUxmCxR4/zKF3yNSMP86G1L0wmxOtvj8eh1EE/bxgruRzg22rWEheVOc2jDq3Bsv1JTVHXTZB6nbTk3TmPQs9G9IxFjAK2Q3/uT/H8FhqFvKfnn7VDRMmFMzQNspPkmGUxd/MELdYrm7aHw6Fc7iDmMS1RXmThlCVxSc23q7K2LOQ6hBRdS/gBWaPhbLQpFTN1ubjF1CUWVrL7uAEsp46kUtiY+CKdw3EaYU3N34QnA0p2eEggBGkGio/gVKNzLRtt+aCERo1aTxTjWXsjy23Sv7EvagBtR14xe0Blewe7g89F985zq+F3OuOKNjA0CAxc0eOHsS1/tpFJF4kTTE9IYG9IxlCDzIpLTaiwvkpDNbCzG+iU3tCHd/c/eTo6YUUL/7lbkQ2ygrQsNIQw1Vi84y0g0+3DlJhodDbHgPiTup2v+HXo1EO2b4YKWgpqZu0v+GxaFVgCTto7m1ODPaYdiLk6VkjV0zzxYAMXNpCOtgFl7dkrUBKQcvhs0z4rvNedJs8wXszXwI2ld++s1WEdy11XF8cb60/78VbA/jigj75n6NbblnjUqiJhzZWxxkssbf5XeCb2Tq6ovK+POdrw5hBkLkTePI6gds3X+ukGy/B+g1rq29k3VKvDxqGmU6AaV1PA4Pe299p3MXSoGfIx3rEYFPUhU3kp/G9gQUqCGLu4ugTVfWYTvGRXXcGLI0jG/ZG513jPz4R7nhHQzZLTEVfdL3xZyEWE5xsWwem9IVWXA1w1I0XFfJY8mNQ9RFVQ9XQrKED9iWd+jewChoQeP0vi73pFNp3Qae2ctmFFGm4yY1rgN3Mju6LBrxEuE8TXyVE7lbkq/UkrBb/qI1LgM2+8V+SxAxcDOfW5vtaACVvO55sVt7YI2A7gqvjLR34eFffNcFF7zRSDd6yEtLXL3VTYSnsCI9SMlgTGkgTvCyIrDnqmCkfmFfaG/a2jU0akGU8MUE1M9RHPWqhcKeUre16Ho/WQGKxj6RkTziBwbP3HGKEVogs3K46p7oIL96CApYOdauWO+DFJFWYG0gRqNl030CyU22NIh2AECSSOgHpr6oAPJqjJfQ7nI6qNy+qLvU6mS0X0PsW3vWGJ24mPhh5W3zey/tgNYJsRTZQODxEUgK478diPs2VktmmueCDpgYzzFuivqywKp80kr/6ToO2bdEldAQXA8g9ylFyvXAEMRl9uZOSRYYsNoHqzirjkPu7LaeM0YLkY6PkBf12Ii34HII0w3xBg6N4Ycm0CFZasVb9vD1S2Yojky2aUL0fVWi9yUr5lnQ43ZtJC+RKsp6KTlrPLwfFnbtrBdYgmnKGY810R253Z9NcApxu4Cd0dnVSrNjw/o1d0RGy4g+NhP+NRLqXVy3h0Sfj6NgjxznO90DpFrzkhWQBknXLJHHbcTH8rX/Y+Fr0a3j22r8qboSR9CFM+tdVMtYPKdlRd5TUvxI1XLPLKuwi6sd8fyDrKoTDlRYLBKZzmvfcqfgTHcHUwinahd07FVmwUFNg0NLHRNqRA3cqUjGLvku1YDrgyC+F5wj+BhCRA0fTq3eCn1UkyyVz9NdbXFD/fYf/jLzOl607LewIkTadaIdkQvh1KQGeXlpe3AiVzxiFHXjRJKnqr2Om4sSD6iDRSyknnGs6+34c52flEgcjbytChl8aM+Myi3lRKf7xr8lLC7/Jfj4OzE72hzY0FXSSjALkFBrzrktzBKBUKZU1Hk0WDgIwZ3WsJ+GWszr89KsdgsZEi2UOGSDdbfvMZEKXHuZ7EGvriM89EtCK2ZzP0bR1eJXd6wZmdajJeLl4cliRWDJBIEUONXxSe6fkeWHihsIwL85WvXZ6F2qOGE8OKb9vadkbt6nYkJ7V1sQIdb9+YoQreRdqUskicE6hL8FcQlsyzdd/w42NmEzMoaZmfDGUA2MJ2HlttO1hZOugAu64EfqxsvTAP34I+V0J3/hvZhyk6uJLgu9jMopK7Z76dl/WXOM3fwOnCjuNe+//Qe54qaUe2vKBAILCCyz//DU8dL+Qjp4uvHDgTGmQkIX/G2A28HFmlPLc5adX1Bup/1LzhBZlsIB9shM8wN8qPteIkY5uweTj6zLvHRrJZEV7YTKvusQ+r7q3iT44kd1Lv4N91vWIs1ZrlVhbLqzvS0BlSf0LKVn4hR48Zlm1ovg+9r5U4NfV9zAKKYf0qvxpvJ4O63CtbLnquXbJeX6PJBPLZwZVST/50yFC+rAtXvGWXx2S8OnOAOsFGrW4oNYRycRbV/FU6MzjGmHR+CHzYiP+voUo6lk/EhCDU7DlZXrBIeNeKEifz99GEXKcJ1iH+0IqZwSLTSd93QJhTf5Dfs7mldqouAODNWNqaVD+mOzH8jdvyerRUvgLqv8uGoMynr7YUDVQxK6OyHunMmPG9y+G6qJ5XPl79hxCa7c3Gn6fZSbARtE4O9AAyU1nXAibceEPKgYuq2SX8fstkwvN+sBiLaQiZt3dzJaXWxeLuZUX/fni6/ifJHsOGzQp6U8dARzgu7Ru+5PUdzNbq3eWkrDcOFUWUJlpowXxq0S6mfhq9E7A/dljyf4MRK7/v0tlAmvL38BFEcxHUBLZ6i0b3/PJFVb/NBZ4IVvDLKNIB4Sgksjc8Fq6ZPnOioc+cRkiuU7z43sZLc1NEeWbFfYJgans9VbzCkIfJCVvfV9SbIs4TmPA8oodHePIvbQZRVJVVS9tBUFJxgM/pDjcPmyo1lrQMDVJ5uR7rZixNzAsDI1/6+98h0PbC0Xx+IOh+b3Zrx882PM3EI5yx41qsVscLq3t7J0rnOrxKkmqkvArUuXCWChfbrTGL/+bHVyc7b/oSe6kAhYHmbt0ZBHZ8JVGLu5CKjBzvHBJ4kbRagkURVT0uSlZ2GYeSiSOC+7YbCW+bQLifiJZca0Q3ajIcAHVNVI4nn8PCPqwk2QcDP0r23MgRLqTTM22ZmOyyJi+WG738ocGpcraFup4j6uokuCiPh1084zgsJhsOt5Dh2s923UgbUQg6PN6HRpkkQGTFWyNvNOAORSq4NFm+mo9L5ImbbQwLmxVcCGMss4TrzArV66e2zXOV1pQodph5VEMvyJTe6wPIUjqDeRx+5FCu0XUf7nhpNE7BXBOj7t92Y78A0gcMUv9YK7SJ1ZUE84ZBnhMPhZVrqqPDdy1lBhIAxT9/FOGhKJ1+b7HwOB+5KrbhzuvmWcfS6Q7c0OUHdm+5vOoA9YYBTy42M9bJQaJsBErRNgEooY/MpCwxbYH3Vbk6uYvvvU9PMyIqcghlJHJ72xb5ZKw57TuHz8cA1fA8gcAwC22YOapJCBIeUwNJkYJbcyEMU7ImAifS9c1RFwKrywJoj2FgcWvufGlm6fHK9Nqys+83Zz+9rshuzrq7n+0m+xT8f2ucmnN+ujLSfJpTg789Z0EJ0tLyl6rF80X3MetLfzYWNU9sSVwc/zUzA6fnZhp38wWbLavQvjsZBjRlxPMTcC4BcNu7XVYgn4WQ/ysGkEanOPc6J1P/VmfE7bc6AjJmmvoCyBVwyMqWcxtmHEzrrAenhDmIWUgj7pM5xb7eWA0ELGMkTwmZPCCJBiXn2o9RCv+9bwUAWSNlXvt28hbYQytulv3LSRzIDlWIJcWLqrM7rICm3jLUcCNLy0aX7jn80Eq4HaHarC9ThTrVcgmrys7LGrAe65fs88kQ5kzYU/PkACJpR1pdu7smurr6xs9emc/aqo3JA6Ksi9GniRoHg7hDI9lzeaTnbgG8m9LDhmbMG2khaapD4ymAsPefADXWCQBxZdy+P19C6oMF8ATFXlseZYGe4nGFrHd6FaxrfZbGJhsU1guBLbRbwfvKB3SmZV2oQsQC9vNDN8DxL0qJ3gdR1GDtiYOZPs6xMaS6y+ltlEOzjC9Skt+OLA3GsqVi2d0y/4L0PVO4Mt2NWbPkrte0B/X2WnEZJy7Pd+aqQbE4l5QrvYensB1LYXt60sY87ql3jSWtALyoul/XoHd1/5Q0lSBWnKIs/UgF9Ck8VIE9hPLwiyweB1JYoIOz867WCns4EtfsizJA7239+wR6bAJ4UkK+Fg7rCIQGIGPcEjq1RM76+6f+a+IESNkmIQNK2wqAFHjDPZGMlqHIihW/fMLsxZN7XB+JQO1/9w9VZnibC7/5J8nLdwQIm1XlaTTiQRAIOpUuVgIxKagWDMwrqjg6keypNrQixsl1MIke+jLDSe01axb20xugOOfwgL1HbDEghHH4J5KM7zIH+IMLNu2KVnQQqMVGPcYUto1qsXJ2q93h41s43AKDDCTHMYhG6gnyENQCH/avxFHI3gntK6tL+k1twdtnSehwKiuxf9cQD0tvH9pPO8P2sOLFxFkS+3gv9m7Th5bPSypeHXB0/Phz7lPT7a8iO4ZX/791u3w2t9oo60cRsLG3SJ0hmekkPvh232zV24u/8jS7P0rWTv8+K5PAusha+DRM7KlbW9uII0QVUZqe9Dnbro2QIup6c4gTfhvXbN6czzxUmNUEGqCNe4fVOa7R85ofgfQXoq6VX8Dfwq1BqxN4GKFNflBnmsJWD6t2hPvFmSYW+m55OXgbLBkM6x+igaDiURGqOhYIofxcjs+P6puXnOIWjCpWFBJR8+/LuNyB19ZPrAdwnhBTEZ3/8sezMkJ7cJCo3g/ZJVARu7ucdSidk9J7druLogE59QYtYlAJrbtBWgM9l348iHNNKGaTIH7h8i7oSdLZp8Gh/fpYk7pOlcQf1vAo+sYrvT2acn0Yue7BtxRnMDd9EvZ3V44nbiUVAp3whauP53br9RMxm7FZEalZbsKeQK7bom9Vk+DSe2N1+IIsItb0BTFCS21qA+n2lxueEjl01wEc+Fyk5xQqWGGnMJIW4Fgc93pV3oWJTEyU6pF9/o9CNQXGN4+Uopvkq2Uov6BAD8wSDQz+VgYuQ8jmomXGXBjrVpwtQG7svABwOxex8x1ohzElSpiAaJSty6hkFpcBlK1d1qjiigmDx2RYGPC+wwrMQVePXh+5h5ee2O6q5O6wrXYu6BSBAzpkosm5kasAhlm3ZVw/3KV54Zws4J9uRucPTmQ3zTfmvdCcdchjiAfSoyYWD+2OkuivNE3GowgvRDW76gOX8z97fTRBCjJ8li0MSwd8uePnvh823tTFuw8jFqcE31YfPJ/I25pTplt8/dA434TcTprBQgcOTpvqkHEKAsiWzPx11ZEloPP9eKRsOcR1Fj+UiJT4vrs+VZh0P1XJ8p9ogpEQtIreemwlGvvwSzXH7tKCkqWkaf9hkJvlmKPLhjS/QsihXmvZIpxWdGqWN9MsC8iBcwBwypVxtAzvlUDSvt1IcVsli4n15jfstKA+mvihz8h4Y3S7ZsSd1KhtLTPA/lGivd9yUstxXIe6wcMRbwQyXv5UmhsTkHqGqR1rBYEGReyEgpUX4lJhgcyREmrFu8+cDDylhU5xqOTdepxF8vr7Ext3Uz6LD0qisofyhD1E1o4OQ90EPn7RF+fNGq3PihmT/OqW8LGDZunwdK6FKcNniNZsAqYdu0GZ98VPtPuyWzJba1vy/eqbHnfX2FxpBvOI//vz3X/SneI74SpfXTj40uzCZT2VKg9tMEL8TBEp0NOf52HVmDsue12jQucazxscuBXeyrtbnGUgxPhJk/6E308Gqah+h+TKLJIE34TGoV4IF8Nk1xkHVCDBcB+rR5YSgzPzO4t4tYGx/BYFhs9Kmjc+7EQCgO1e1/0B3TAXPjbkK3yAdytk2DvShuDVgR3iUj3m3AFPVjzezD1mCBhGfcrkVqGf8DxPIDtyL78HWhf5W7dPSw5zVKdEzSfHlDSej2fr/zUPHTua27+2sSiygOT8fNhPaXFJ/xGBym4VzIhd84sOFLmVCT0PYh6dfI7PBukFODO8RkxM5UJv51w7kuk9zqBtfamZopcPlURpJBSycg3bsF30/MWNJferN9JjRW8qHlbcqBD+mvTNXgh5OCrc6V8SRmxOTQ70Eg5BNjVjoOSxfqzQn6fhWoLmrOiLS3bTM+44PTqeIogMSEQsTfmzmYEJIu0oNl/h6+YZe0WOoo6feHaz61rqSDjPjb3emnIILED3ILld03FfQug5NLRjyaPEY/h9adfGjEevawLfsY0UC/1fNsAhLy67mxdTLxQAP8UYZrXWySKvAYpfFogH6wI8HzzT+lOnt1bpP5oIPYjHS0icV9ffFfidV5gnCrU83eQ0hX4G3D6wGpu8A5Y6flYf9ZDHVw8wIaKkhY9JJ+R/TLeTvkIN6EEDvRyFbXplLoz1kuhiwPpiGRl69GDaNskk38dsh9L+1yTieqyXAACth75Ysy/Pr6TIOomTTHh3xElpmkDvXOq84Vo39198KMne+PuIY+R3xFhtf4uZ/h9b1mpFqSLdXKq1jlT8ja+QTZZbnhc+k+kuHUqZW9lR3eXfYYxizXDSbpxUzOeF8w3QOvowyoVRnoGY7+Hzw35VBCq/fJmpkJp39+175LN0LEpaVe22ZpXXNBwcp9FPJkwKgMZMGzsgwErUbIuAJchZbGBxQZyolaHDf988Ex3l0GrNmfhj+iysR/L4wgXYVexPzSRp3OQbg2oXn4cX6sMLqqA+JN94VSnFyeGMoDJ7vWyt7yiFTBPVInneQXInPQRVDonAfRKlomGVaZEWLiUI66Owe1480E1x31Hlrh6b3ZW9g/4nyj2ydrj5hVrovLjnIgQj7q9616N/GS6ov22N6ndejWGd14usWgJim/8cikNl3/ZR6TgPl9tjL61vadKHysYJPwi9vjvrq6vMRIcJP3o2wvdDrKs3ej/eKjW/BgLLfQSfHMYc+7Y7MUz1+uvDtFiBVnSdk1+lx1T6/xhjmU62ytYg/gw863PSCDg5rScs/nHdoyUk90JcRFq1OCcrnGFOWnCS0TICw6Jo20aMFcyUx2eHznpt799v+qjhdQY4Sw5v1tkRDq+Rowu2BtRTyOjizhFbPNbABvsL/ZMx+QTJ5kAO7ZEuIrGSBcI2NJ4XIf/Xp92wGNMclin2DPPvOt9vZes99OHZfWbzunogxBvltqLB/LuPdftXYSa9keAYqcFbrAFFQTb9Sni0Yn2dAaMclC9qVeQIeQN4UsLOhsS3dyvQ5YHXHV7gMhyZTDtQfrSP/9xypCKEAQAAKR8H24krxEsEUtLWhsVmbBlv5c1VuloTuoXf0EF0DsINd47rC114cVpCkjaYXMvHxMqMqsYtAl8p24cPCQwTXsdG1sgNaB7PWB9B1X5gN06jLz9GHkR4X2OwDfipQO3gigr5h16Kx/jUlQbPwSdorhLMpuXkhQYK+Rzq2rlWOQeByOhZ1gDbmc+3GxQmCwYxcFP/rH8eTg15GkZq+bT88ktt3U768nY4l5/8kZJkQI38GaPOV15BpvdhcZk3boVKsxNBcBgJRSGPIOvO02mzDOZ8s6JiFovEPQxcSI8GUD3slipfUyLNqlfUhtUJeRwYw5fkNEsc40+H3sfep+VYPoDw09hcNkf3iZAQ6Q5sGsh0TG25kaZFhuyAkF3KG66xZW6P7G+EAW4D/UFaWWIekgW0mFf0in0CEKFPOtEIuM+nc+TzNFRDdX0aSii7Xn07t2BjIeRtkhljT8qHWRTdriSr4T/b9OShvyIXR62Cuj6qYZS/jASd4w4JnXS9RaDGl4PGVMrMoZinqGXtwTscsjn9oHjq51sypr2DUF6xrVs1DlgAkqO1Jhq9lTHef+sTteicnWK2QoQSAd+BjmSslMb1N7ZZbM3dnbflmReiEJhHGCH+7mDVe+T3YQSeFynNTTzMt4hismGPzpFirIiRwAns9yAhC+NxPTL4iZoms2rx/1TJY+6J5iP7iuD7Pc8QYCeZD0P6W+3yfvlFcEIiEtFTiLU2cj2GylmYLCjQcogpqY6omRXfaqswLzYE0YgkmFtj08tIb51YcqC2+32psudXXjJHvenp/FziLQzk9HmzQwA5/8LHSURK2q3WWUMDMc/Hk16+bMx5fsnGV6lgncqgVPQgLSgE7k7hkd9ryY/hQLgvkTnTu8yn4iDSAd4AdpyMQcpo2NploowOIIUOaABxquMz2m5+i8Ai0Q6pHH0KoSJaldj76DsdvUqVjR35NXZzLQYJ99SYHnLRsWadj1Vq/5wVhgfte2VePn7EGVNalpGetDrkOFQREe3PqKob/XmwO8I9Y1o6s/AIRX4xJMDd/viIX6UpdrgIsynHPodXqBhuHb3JQ+R9MZSYuyAd3+L6fQ5Q1VtSGtWy/nenNR4MecJBtyX1NqU7zfZ3YORyEjGtJogSlFJKIKGn+rl95LVUQUSiyTLJOrS06lbgP0fEkJsNBD4gLOd1PjxCdmrw58WwXhYHIuIiYXHE+UDL345TiPrzPkQ9gJQCvUHPuQDeVbpgGZa6AGzq4qclWcw1gr2E0BJeh3Ohic4EwcrkJhiqv8vqhshe8aLHrViMO+stcEAPn1NODsTn85BqH3qnckWTYk/Df20Afte9ZxREu7gh4Zwq8ngq5uBWE4B9fI9F+4JTVtazX4rAGdpBA7+JOsk83nJ7ZkI2m2FYBUoIh5Rp0GOHSMR3zYCGBfRs8e/4LXtq1vfFo0ns+5DA6kfTWXTO+w2Ovk1Mt1OuBoaVEBFrX2HPCY/RXircZ+breT4gz1Edacf5TjRr5cWDnc1WmGlsYWhb4AhIsp7EzOXs/Oik41mWPtD18K7384+CEqPTM9P2lLHuTLNUoSRfRfQDecTPev2hoN6E0j38LCLb+QDFU5Dwfn8fmozVpBRI+rqbgQk+7t1jXgQCz+rDHksO3xHwos4qPkbcLbU9fUnmA2+H5NHMiS5EVdKarKU47hAR5gSyl9ib0pjJMD9naLjLBi3iEMaK4yn1N4Ly6URuEvv6oUEgm2GxW3rAwN328iRN/p3lGrBLSjDZIIe5XY3U3M1YJeSgSy1sEZ7E2ApSWIhPEJRERwYgUhNKhXAGWrwpKoPlqwDt6WkwZ0pdcnM++CpLps4FvAe79cqpQ+DGRRJBYjK+CHBvv81LKq8oBHIwo3sqMwDla+anfl2PzHoUvR7yHjQmyO3/wPsqOYa94aPpy+M//Tzl1/+RPi2oK3BD3WgZf2VJ+uCd7RsvJd2WftBkhVxuWomaVQXg/5mR8u2TUz9We7hP8LXOqEmhYVqY+qK3j2WH8uIhYHrmPxMkhWszgXnnwJwMC6TRTjwwCbl+Eccwr9TU+q7dVMLKsHPzwgzApGITik+wgS+4jnjDza8P95tW1jO/sLSnmyYdWGvQay2dalnjGkj7Ewlj9tfQb9Werinn2RjMjDSiDy1GdtuuIQ8JgyMT3s/tR1wbzVnjbjTfK0tabGFKt7QeNalV/Km/32l0eOAi8sovkVnbBlhERQLTeXpNxx45J5NRIUV3PY+afeTX0pDZHnywRUEK0kS22hgzDjiXTZxsKVeFeYWBphX6CNJLqVTC5GacjN3mazekGcldX/yW7NOsCIdW/xJz9sQh9ltbPpIUJXeXzUOro5I/CJjjrZygz/JOEMTQdLW6YbzhJb1chkJPDsVjT1KTpI/KFqVmC+6v2CrcPiz3A6udfaquAiA5zXcpZ+vS3B3KvcGM9C+7AUqR6AU9DVu3gEy7o2+pEHvw1hbMCY3KIPKozZnRNvxOJJqdihr0nT09gtOowOCWN+YGGMn25FvLu3LpLzlK3OOHMdkSbd4OjabQPqQ0iAGcLjBd1ENsUjmBzJrnbEM3MPsOQikmty54nl1hqb/vUfzdXCEAdPJ84fUnAls4aftq6Dxvdynp09jlOHJjDEdiihiqcrAL9Hd3vflvn54TsFiPd8eWfNc6vz54A9a/cUCKpUfA64yHElovSALjtytOPg6h6uwwC6RVcwXWZXX+29d8ANxYNjgI3phbP5mEJiMtTW6ZHE7P20HZwpdgp0WXshzEkfSl9jKY1WTWz93Y4veqTnbdgPzEsWiAXlioPrGSloFF3rTa2nhFvU/d6+H/XRnUGp/Odo2PSsR1yKiilr2Sf09pz/BC3+zeL6CSI/dZDFp+S6Xl/3HL8b/bzpUMmIDnC8e6ovw4Rv5Iv329c5v+FJ/FqEa6I1a5YSXGTQZPP/sdc51qRi+stVENsKUrA5/88mZoUeDBA059B3ICfAY8KbTycO2wb7+SwLcWMeW9fG5QNQJz9VODOLGysOJ/6mSfppndtA+6uV5wMyY0CGwJKmXdA/Eyt0JMf3p0D6xUs0LVnsjYjc85GrcUydCBX8NbNumlfXu2A0ujbOZagHg+WXR+0cqQ9iD+Xzy+lre3cWubmp2J/Eav5TqH9/1vFha1L/2rxOJNOMBOg0Myw0W8KV+ZHBuBFc6cEPhXSPICr3v4kbKtN37h93XLyrNbpE5E+VLJvdObLz1gs9qPRRKmuxBJ96AGqMj2IHUt4i0Vrhq9n1eA0crxisFb4P02R+K3AcJY6dzN58coZJUPF4sgEyNdhyJc500LKjT4hOZSmEFiHKindi/lDR8C5NxItrspEPD0JNPJWuczAtIMSWXSrbRAQyP+mlidTkswWlBJXR6HShgl30Q6ldk8WvDwyNw+8xQ6DoBZk3cVEJnUn8uNZsYEJwQXNBDHJs0XqT6Qy2XwjAKoNj/Ru6kPbJ1eXd+ukgJS9kCOo4/uOzHanZy8l1a0QzUqLSxNkS/k4KxPj1xd/oNdcJV5hAGFzGIFaQReJxBkBaH7twbDZA7jReDKtxWBXuCYVEXsPEkW3zV9Y1GjGnah2sbXkq8c/E3s1teS9T9hqTr1yIVtSXgLIk302m3zirhT0avdh1PVwYNmfhtq+WfcnQYjrN18ALkzWvPp2eysdfd5Z1TcTsCnJbsn3c0DMmVfElJTboi7x8yfTkblhY+T08jwypza0L89F6ikVVI8/hm7mPldQm91Bntm1fPVfCvI1+iwLA2UsPX1RwyJankaPmjbvJkHzudX4ZZ6NTAb7hYr0WdCzwIayJjTCM52YC8D5PV5E974DeetaAGu0sw4k6rGiw5aHx8xpWE5Uvfz2whzTkbYKrebPWRwHY/8+wIv/8ftU7DEuUNQUUaci4qKEb6sRvgBNE3paPv8OhTCZNSbt3e7KluS0uzXc02aFFvuD3Adecq7XTGXQHH/7uBacugSVSeWvY3ULBkuuwYp7PeUgPXnYJ5cZ2NlCiKyyFMkgQkloab/Lv1fMMPe9N2TwCK9Plh6nxswVME+FYq+6JFki6fYYxCQAMHiVc3+2iuOb86XT863ELsQGcEtYlGHkmEkWz++8Sh6Xsz85zI9mU/W2+IcqixM6lqWPGTuK2yhGpzchA2CuNJnUamZ0TQEK6woYyCCzfBYz3PLyANJb9dpuzHzCq5Wx+AlKA3K+RCuJWWEw0Xq6xU20HsXd9Ttg/2HszU19KQOI6Tr5CV/FjBlYKWlAOrd4cFdqa+5c89PnnjF4qLU/d00NifP7Odxj1mWKWxZYsSC6biZ/3EtoAMt3ghaerzWlS3AbMIe3w1wO3778qjqbEbNxHl527qjzMnHx6gk8go6+VFNbnLuxm5vFtIMVuUNY2bYrt8Md+kfqXfDybb+i+g0ROMS01mfzO7mYwC+t3qgQxEbuuZVRx4URYmEaCSIwc4IcrP9tR8T/w11NRUHCOj5FekuXCk5EBqP4emL7k54BPlQyI0hSSgUIB5yd64ilNcfJ73rzPDRnXQa+Kqotl+7/uyw0+m/eNHSzkhM4/lJK9j3syvfGK9VLreApVHm++4qFKvgMY9jbNcDXUpfsPv86DdAUsq91XkR3OKnaGnwb5C2EdS0/hFGrV5xDFJ8g480HfjVrKo72NiPLEhDLPH9OnNml18aUSi15vQ2TJUd4MsNvJXrCv4VHcu6xYzSVLKihz4uS9GeONtsT88MDC2+HznroPUjmwYStdt3JaMOmPXM1pCs7hmkb5QfVvi3kWcazrcuKgPX+f2hrTfhW5IaFA8kh6zN8JG3EW9OfGw/paLOU4IyhSk8mXsC6SH5Hwvuf49CfwKi0jLtn4cinwlvIQp77ZN+H3gVy0sqAmwln0VsWaw4TltX8TGNmE79XpFJlxTP1NRJbQZtr3dQJkaVRaT64PgC5hrsJTglaaFyXwsw7jAuVOf/LDhMm510SPtDCfYcSJqA201J3zJ9BYOzf/pdAterFQkXaIexZx84H1bGu4QZ7yAonJ1BpItAUwEo2wrOnQ9MHKfdSSxKKvtpn8BCk28CLz2L/m4Jtw+/ojz5Dj0TRAawt+OV+6UeN9X0FdximZ71lMRbdBfhMLnVxAH7ito+8x1+5IuAWHc2m3zwnCXpJt3LrVju7D3iCDOqOBgDxEMSBaR1/8d73OM8KHPh1eS7tQ5Ncn4hoBK0hcl809OykcQtq2tbzAW5a89X2CnVBpFGVhpP6q46MRG/JACR0rPBSfkIDcDMEoi9YDqzKjkEHGuAZKF/RRhkhVQBfPxMuhO5QsRyGZIswt3xxZGDszLnAxHUpPjQJ2rlRHJMXOIM1V9OJohJak6+G6lJnRw+DrF3SCITI858Yz5LSgOpSdP1uZ0pTOOmBQ71oJh+HRBbY5rL516OeH57315/UZilDr0bbgDK7SBGrkPrjEJG09ouJE11xxV+29f5ASyLLSuztR5m0kOk5TyCtVdqc0rVpz4z457RhJeWIxwqOX8oLBczP68hjZci7jU5V1V77TFN7PtagBABp+3jkkDPVGdUwwIXNO3Kh1Y+5THcSXGlEIZ/Hsb5qDBETi/bl4cBHMo1FHncf1UVBgTvrZw2QajuEgOTdVyQGcshLeNtz9B0CQgb6V6hDwv2M2cJ18WDgsj2Jiyp/RFILENoEJplsspcFQzymg6fSBRsJTfaDkAq9qii1wJv56AESHSvhDqsh+w1PWeFOFKfyl74xMVdNuCvWwqDemm5EfW7MG4LGXVIijF0wW4GrAjmVLHp2MXHZwNTKR3ouYqalRSzU9YKqXxNErQhP8dSjkJ1aUeFRlZ20zQLl+u9Mnk1qQfEvH8qsq9oHGzfMGKPLbBOSot5w4eA1pQUaF5vcF5lopUgBcLa7E3oDFhyXSSJQ92NRACYKqBpQw5+sBpiWLJNG4lVE0yQ9qI0vDaACcnJ35VLRzKl4ZX9Xj9e3M1gxD1+fek3mnAmO6PDGzGelE+h67RpcsK7BoSet8acpOdwmdxU2Oq/kubEceWRNOWbc6Wl+B+lPr2Jcg0TkzNBmyVNdyxmv2+bdjgnJBqwcdiPwIX451cFQM9aiUR0BaymkTSwT7VbltchSjJNpsrW5hQf93MlF1tdlEc7AFfJC31xz6aky/NxqU4DXV+KQ0ZSkq4L1JSsxuSXjNJBDBkad22ky6w6KI+JzxXWdLe6HOJBwt1C2CovCuRfvuqV5cghThFaVHmhYARs5JxJIm1e/RCWYTiLSP06PKt4PGPFU4LRESck97J1l8bnWEBPxskN2B4IVUV29KVytZ83+Lw+W1UGu4617htnjUeEBUQ3u/pncojT26tPI3lFee4cPALQP+qK9Ur+l6gcXMGKmsOqepOw+otvgfrHQb+jwcFYUoONnwc5RpTggWb8NKbNS/HoJxgsu8sbdf/ue2YgmQ15Zxj9Qx6n4tv3T9uht9pb8LqHBC4F7+8A8W4wS4EUBkDifFd9+en4gKF3jeorj6wlvuAzd5A2f/hCiIlPAosVdRuk8WBh6nnK79p7rjk7Mue21mvCxX+KIUXf8rhwYMGtfYltnvu/SNffdhXEvPhp3NFDg0zO5KUHHLX7xrXRaZoULkxdmzGePSuJRg0sjD1762Mh+LffjrwrdfpFs1eDu5ccLy61rM0+o8/kHOtj33xYAz8zIVNxRV96VEkssOKFYso8/eIRM1LWheM+jHj14hfrp7Zo8zWC+TVOU5sDoPqz6KIq6lL/V70zg8iEjZka3fUJiJmHY0XyMq1NqteHqOysFza96LeBM9bmUtszBqBYqFL/TpIIRqYVvvaiYpDv737Qgd8oOERL7d3d3ZaqP7jUxT4qHY5B+jCVIcMCNjag1pxC6prQbVn/hnyD/jOi1FPVUG+a8i2Wkpfncy9jUCofIHcM03Jentvw7i7baHBVVL1oc8BpJBX3jVZNvaN84ptUccx3m/VAYi3yx2AqqQ0aBwjW7Fw8EvdBLnhVEaYy9KjNp8jxxG9yuNuf+yM1Ay9a9Q76YgjJvCnR3X7Zmng812/PYZu4m2BXUTlTdK6fC2AHYxqpMwVzNA2Q0RVytig2jxewVT3PcdY6Ktu++R2armjD0DuwnCXPibGDhk28JfYbznxqKk6ZurJKYUU8fiMvhpdLsiqVPsl0g2RQ7aECMZGW5c+R0tUtKXymUuOdg+xYYPTZG1SG0Gu/DS79frLN7F8SZ+njCtX1kBfrEkg66OU2WQwuKWeet6AuxW2rWo7GFLKjR6Kg4aU6+NnaJLNO0EMQWC+610h/15EfvfnR9PZ9nU0aOANC1r16Y1c9Nqf9m0iSknuQW9QeZ9514PPBEX8KeOPSdxoLvAIMMM77EizWqc3r+TPiJsi36htNLIF716dE10naELXfH/5+ttFVdHxQnRnN+aVHAwxYwSL6k7+pxBmARpFOdjj8F3qXuUNhyMnUWhwDrE/9MYaBEbJN4muk1MtLVTHQDfRdTABjHslJ00c2UAyoIyH36mp/H7cp2xvlfhAIuwSEnMe7Vt5gJmmmkLjLKGZRIIaj5wb6u6ciGAHX1FlKjzsjQcU+YszPf6Hr4UoFApurAr/ISFvj8CUCRH1vd2+CZTv3luA70NfQtCVlo7AeY+XaTck8xW02GDS1NTWZ+SRqK8eKaDjHgs94O918FjUEnsNFE7u5Q+GWkppJJ0haTtFRtIXkifjvoPu8OiGETS7mYWobkLUXf88zkqP+xVr60DmwuYnGaqZEQdhUFWlehP9pDn/XeOw8UEtCiMLeV9RzNgdr0PhvZO3o79Jkis/qAnCQO1KQud2mq1tSB+H5UYgLmWL9aWOSO3xyzCgdJRMJOgkOg2xjb0Aup7Q3w0xcUBsV9JB4EUZTjspWXhRmeRc2p5aXMSPfXhon3VB4xDmkoWF5uwKLKH5ztYGvNuoGlnT8d7eNGUlzv9DgZR+mGLgxEPihBcgWSArskHBnvLlsLDFt1ZtAaTcVqXWXEufE4n7n13wGQmZ6r+6wYqpHhM/lktVc8U5dwhkw3kjc98pFIFkvNRIvCmYlbDFOpJV81h6QpI/WRsuga208Un2hiWzi5Wk4XjLggZXTp6JdO6y3wPE4FK69/PY2BC5cfd2oN58eHSe5Si8fY30qjygvjoeW3wsMzYBHo98uQroJk7kwIFeklGNt3uVhugILUhzA5dkuawH6gXmOUaHVxsunthE3UKNfnH49+EauRJQWfKCj4AqgmN5vKgNIAPYO8Xh07+MRAl8JAv5ji2wRBrmmlzEC9MFDUS82HA4MbTP6lP+cBykz1FIw8GPFfBdxX3ty46o8Tkne+hRfZVI+atthVG6fTMrkuesuZbXOYF0rxr3gWTHkW0LNmEhWk22lfL8MBwauBnpMiduns7ecBt+LK/AZkxJ5LFg6BmTnJSxWSiwmmrkCq6QXF9hLkkaUdiRma+MGgobQJAmh2uhsYB+2n70LgC6LuSL61L847wuV91D6pmeUhhB+0qI4isR2/o8XRXFQXH0EW4pq962pTv6LV8CL4AsqFpyQwaJ9f8bJ9hpfCzZPIKD7ZuPD2Q1m+Jm5KaakyjM7IC9/jsAHvKMmsMh+8Q+n9y289IvJzRPpaMgQ4q3DA68OLkV2vWc//j0mbsTwSGl3K1C/iDuXM/6cOutjgDkIUqVPiLxzNd5mJ1Ca72tdveXx8EksCRPPapDY0kzFf9P0bnHM92/f/wzG3NqiGoyo6ZmHQ23NoyNb07VMJ1+UimKdUtmcphkh6g0c+6gmYkZ930LpXC71RQblUPjRkirLSOnYohOP/d/n78+n/fj/biu1/V6Pj7v63pbofms3gzQNVL7lqvVjqBsRvhKoc7UDyy5e+kL/3UF67qhhA+787PAyua7TMCgpAEpyoHiYNpwEzA/vJm1YBrjqjOxEuDjqkSLdkepVgtV21ZQCJ17USOEwEfI+0JfD3OyXfRPwBzYtgqmrrIZsIbMTMrTwG5XeGP5uQcvykJAXiNYQ3/85BDrT30jHKAUB5uMbljrvcTq0i1n8XC46VmidI9px8xerSflmdMfRo9tNdM7Yq5TEYZYr+KVCjC62sy3eT8wft/Lqi94BsFFQkIryj3ms3swiYmD8sqL+lj1k53ARVXo5XVHDDLxEpxkSQSAM2X4Lqqe60empdYY38st6qJrj4VefY8hUiayhZY7DAbAZuycF83WPBdDPjvsbeXoH7ypSnUGXNwDQGVSL1oe70elF73npxmw+xVe1kugHnosEJvJoXu/PfULWZuIwinNXIDbk+P//DSbvc2PW3K8NLIqXR+y2br4VbrbPbgnBtciZPvbIJbMSvOK3taQLDHPcbN+Pzg91DD+tISQtonQZNJttrZNIpvY1wFKhCBLOf6nJptAMrSNposKnBB/Xt2W3nF3v6Cb1kycRpgNFZTxRnpg7yV4nTxza57DrLe7WE3U/yd2wzCyrliyB2HyHV2Fu++PmuD1XeXHTfJ7MmoM0+EIbtx/9IrlMTcmRBnSZ4dyYP0dE72iTcBOfmjOJyOGbovGsnGSaP295YFbESaVy1vuovV+KRnfuKYLm2YOzU4qNYfMyyb9Ad5gueZTZEPUVlC7wUzS5L4e1Rx2ct9LJLYnj7Uvs2H2HbTknsKO3qdGKIIedOmh8CU1MBx0kGJokud9+/4uPeQPt7qP58UzakKmA6ISkergB5KSVEslmbwjHcCcg8wSY2eRC+o+7SyvUNwHLPdupfPZ67OIhhicBtdpt3spK+rg1fiRz0Sra2UK2D9G/Vdadj2n1XBh3hXC+8nFjBPcWLtEAkZXibcqsjPWQX+9viBDBDjHwmj75gTuN3qC8reb/jc7qEzW0DsP+Mjg6kegJ6fxQ3iJY9y3xhUKLxaEWxIeMYY51Q9szv5sT07mUlSfYThFoYcdrsOtWM5csFix8tMZ0YJn48XhOUs0nuRDdkT1fR9oM3ZmO+AbFSrQCP4CARSmk3Kg9mfciPGRClVyoEpr7s32bO+TjL0vTYqDAfM13LAKBIWpZ7UHxT2dTpDGEbJQVThwkYzJoPklK827RZDw82+H+fKoY5nSGRqPcTZNAgkT9CFBroEdqFX9CQN8rRMmc8g22lDXhZVessL7Umjh/lq41D51246NN9pd/JF91i41eHS5NmSa4P/UMaxvccJPOXi88bwqNlk+X2ciG8eYsRtUi5bjXb25uM6N15knFMXliWVDgEpZTK77EEtSjs1Q/0o8QZuKPHKqYlUZfSARhPGWqFr4tF+C0wZUFsknXrVoJYhsANlkloJ5uiVMBWuiOFgPiFN/E1K+cJXQAceQ3ae0lGqZmnw2ZE0pNEu01XMtDq8pa5HYgCfbkMLtl/5w0EySJJY6RiJIvIKrFCFLmEgpqxbLxPY+JlDfYS2ar3U4Coqa09Chb5t6Rzwb0fXqQlJalHaHEDzIXrMbzOI9Ke5iMq7PqdFZ/sH66YCxF0M+z9dBLApZBThUTwb4FVmY+Q8sPzy9HVhZbLNVfX+jzGLozLzb82Q1kM0lIzCHPvnD9ZM9cR+4Vv4v8vLqaVACTrgq3je7oPLs+WFh93/3UH+M9TWPWlgoa7EOA2ccAcH6JV24qUSzhqFmogygVNqEoZD5MKhNrjfidYxxrgM37KkfaSA+SYqHC5nu14opkRKVlt7k/stsVdjMwjhNQAVrJenLRgLsnWHY5cB3OxiGphmkGJCvTQxeWP3YoXeIDQqTQEc+5J3tB0wb+BGOWjVrzb28sNIUDBjwBRQrARJeLO471d8VoeCy+m/r5TC1VFZ+5rUdNsjGtl29ddhT3WO2+OFs2cToTWbrpwSMKtbLWW64FnBrniDiEQjNBEmlqr7cJ92q87OMsxJIBsKgLk9FZtVj4M/Y7kA/IlzNV4r0fUNCi2OpTjMSlep139UG4doYmO5SmcvDlnYCzS8JRVXQOm2Jvu3d/TeE5Oc4qPgxUBrtNusenHoy3+iue5H1yWJzqRHibNGz9+yk9i78KvoMJADI/LkbTdu8CZUNeKl9SuYBWY3cIY+TM5BBgdEE/w3VIo0k/wLiWX0A9Qaxy8zYyy3fMNtZocFPkKMgIJYrsq7LaAfRsrFtw0YdBJI/35/PluXljHKmvLzsDgCmebzIBqah4WfsOEbHKOqbqd+ULuKHAzEAHnY/EskOT4cKJ9ogqjx+RLUI/nagYqmEbEQugjKAhOqooFjieOIMlXFJonxnxolxRfBSnY1vsgVk35V5P1miOSrLX31A8onGmiXrwjOF892AfJBxnZWdRKid9Ik58hFgFAeH5JIU4Xmdu+xjoW75AFPLBdwj567VIzi0/wI2Ujsk+DYMGNW3MdTC/h/TQhpcjUc3Ci1fgZSfImlSWs7098qTwt2bsINKrTwbeosI3OsaL+Synb90++3apJ/Dms6glOVMuSwKY4nWnzElnjkTmk5QvO2mg1icuSIvg8IA8QWj+cL1eMmC2d14QVnySq8OE3ZHSjBiOD2gt0O4X/rzwelqN1kG5U1UrfIJNYS6YJH9cvh+DKZVm0CohNO7zSdkjufR8CjGGJuY1dsnD43oM5Ue2A7uhjBO31pTX3+ieWLE+dobFCiGNOnLJjtkHBr31oi26Vmr4bN+iyAhJoSt5xoT6XIMQFgxaEBxs8SyIrBnYZb8g4R1mFOEF7/IWzMCOPS69t427WJczudPA4j5bGe5AeutDDLPq7v60VXTjRevaQX15HylGN1WCpfuKfDx/BVWTpvjfTkM9B1fCTsCrv0vMQs35HSlzO9taYa0RH3haa5Wj7ZrzBpjk8JYo3n4QAl8cZYIgkYzNHjCBH5Nu7njZ/crP9kc/txzdLOexqBEGIYjpGBiSVMb6psNpHilJdQxNK9hjt7TA74Ld4n1mfDN/DqkS6D7kWdvGyIFGq4zzD/YeDZuqy6ar8yw052YHRAZlqm/yfjyHK4q551ZCNE5NLrN4pprrHNoxvGmW7RPBEz8jyl+MpIaEul0RWmdtVedQZ0pkkzvS5uT4cAIuXtMrH91qkg3wbgmVIs1t2TeaW2uoBfSossU8RPybEPjfZfeZrpkD94xbLr+jFdXvN3pQ+mIYe+DPYaw/DKlIW2hbcOuHxyB6ssUVajk6aEQAZ50GXks+/2NCOue7UtaIARsLxrKjcWMGOPMt+ZB1JaVI3sY1zxYRa20/nwOE+TSjLGwaMrJ2LBmfv3WG+NOm8DoGFceAfOmBQquslYYGl04F2ABVHcOi/2OGFwDITirOYGn6EpQC0IgVof2ziyG2A2ukZlJDpRCcr2MCBO+hkm4Kbf8Zv8XSd2n9gcJ3lJ17oVnA9PD/fm1357auhdgAAHjF+Cn26XjRaCRlYPg0JtQK2F5JV5Zbg+jSnK6oOAGUWB3Z0e33930KsNDaporL6kMUbGJBa7u5z/fyYdJeVCwzcU2l3FDDwseTsqQ5/V8JsyvUFgC3e8pkZZNnAH5DWEDJ3rU3RqjpUZwJvMyUhEsLrj4WSEe3zLRf4NjWgsAl/MvfndBPmPx49WcTvhEtl2ksWnecDWgH3IqVudYoyXNBwS2VqysBNUMxzAiOJ4pV+sDZAEk80/00bsD3CzpLTj8Z75pLtE9u2zjVUAp3FzojTDMmSRLtVZ4H279HsoS+Fe5pD9bSxweRN4rOGIgUXxeYwt15Qk0I4brWqAE+t6eK6gxBXiaYmzI3P1y6pydXSP0O0Y1A3YFtRlGPzNEnElyDU8oc63QZkHl3LxuIv7DLQEREeHYikLwGRpzkdQZZjuUEDEbv/lW5CFXw7x9orQY1dyb9hlbCQJj5bc/gvtlCvMGuOiqzACdc+Rhv9KJOAJ9VYAa8Iuzvtw5GH529HaIAz8MUIugTD1p7OXoPmO9cdDWW/fmu5x7sE68K2fz4mdoObwP+Sw2VnYC4z8KSiFN7ot5IgRaWlrGk4NI072fRd/eEHgOnbtPeOMnOcS4jcD2d4KvZQEeikURXmGa7hpUb1yaS/9e0XCSJGR6uVx0ZF2FIhZFQ8NYboAkm/HtR2QPBEXbcXRFHs4Ic5zhpHcTJuIVKnrW5eK0DeOyJ6ucgOuYotoRESaCGMzzMbfiE5GfksF9Zwuee7gxpzvQ1c3rbLVjnCPKk19722kp0ejKWT9x4yz3W8+nIzk9/M9UiRIFxU3RD+RustD75K0udFIYPef1yem9aMHP/AbIzE+TvjCR9RpxtJ3DsCB/Jp5L47UG6XO/8JccG20QNF5S+bMh1ukOqVH/LdphGZGxaHZHpUU2CszAQ5SsXp3yH63mii8D1XhxBcIYhpWZPfOCAr+ANHdzm8UlRe+pGmaogtOhOHjGQ1kJFRRs1+AkhOWxQmyd8n7ihysvLgj53PcxBDoJiE0u9gNR7C4vpjD0VyueW50eVwYtjmIESXUVzNInDp48HZgOrQ1ts/Ddn7HHYAFG48Jcsvw87Oye92lFghF5IyxyuzRpeJgfYKnD4QNli259IM6cRiR7lQK9EGxixrmJMHp2dWT3iJlhGnT4S+nTUOwQs3jPOHaIZ4HH/4zTnjKHAKnBRB1lHY2H9bZWIV53uJrymmnE47XECe6PvZs5HDY5JRNcozbXiFm5+5CpK30nWlJ0lOdyY92DAxqmnFd6F/M4c6yZJEfsy4IuHdySKOaYCXuD4J+F7uDD5sBDfbv472VGz1jtHRJ0f9FK2oKOds3IXCzND3zGywg8V/5j5NQ1N0F+w7Jn+PpfQMQj4PbtFsSXhTKb7d/UvRk0fQsIk1B5maKV070/Z6Xn9pUTJJVJT+BS/ncxirAXAPWswniVVVzYwFMGsF81L0gOugYgUw0pXyQycgpVHO3jWi1m7B40Df3DFyluKIXwYF6p204GcniNroUhuc8LFh2Pp2lMC067mHBZPiRoJfpb3wf4+W7wo02URMvx/bu2a9nrgKZZPqDp7+Ou6jQIQ/+Ex48U2/GtszXYdmnskzudwINye9CCVt47dLUlZnCix/Dzge1xBiFUaI/JgAg89iynWIQxJLYrn0TC0dUnnr4nK/C3Q5H+yh+YpqYIVs9GIPq25VWUaKscj2rWf94Q8bm9pQ1zMl+ZN74XhGXCUvw14tCbrszUgu3Mf7tihLQVihJFQ1Aixn4BrnJlQ9BCuY2mhv8UzaO3lMbYJLgH2+l9IkEhSM0H71EpbqzgmfLoBZRV1i/gfn64ln0MY4XCTOY9qcu4fClMTNYcB05dQyRMCJLu7c/1BvcKNCISopcMc3hntolnHf6RLsC7v98PGCdZw2iFx4XGDmyMz5CyEPBqgYeYEBVziYQsx3+0EhVB1yj2SSi2e3WzS/rUKVWYKyOsapO6on3aG6FYm9K2GwzJTdL8rAMypb5gAT9g9F2OSIkC84QUfmxr6M/8kN1x2OunBHW0+oQLDJoM537V7O7lC+QkM2vj91fBfM2ED51renPiKyVtmdX9NXAAis6S3xgONVnkMI1KytQxQ7oaZN9iOx6nLj63jtkFi8Hu1WyvkDs9RVW7rlqMGBtWFpHR2xULAkyIUMS2+VmP0w3v3p8vtUb6N2+yeBK1ohz6byEJCnVGfFejjXooixjdinJdSWgXx5BBqti9uOkRe7cnGmlgpsQwQRzztyVL0hUbm1Sm2B3UogCt9N7mYXP9KS6vmfatCwvrMPmbmZJcX+hjRm98RbRdjEuWnC9uMu2GT0GD9eBvBUYX/HY9F0nVmLkFZJ0tTnJKIM4IlAlP+R1xnR9AI/OT9Bc36mraZcGRuMDhCYodNBfbffnAniwypnyDIWtOo27W17MB5QjuiLbnDSLTs8FsPYk6Q2tCj4sBF3yfID1j4kLUgvwmkmu4yYA8m8sNNfoFHNqeNqV9Te1ehMaDOd1oM+01XXjLh5278AEx0ABMjXGxR0JE/bkTwNL3A9uUAnx3lcVRgSosZ68sLl0RYd6+IKx+hV/6UKbXI3Df+Pua5s/eT/2OTCF9QPBNvh1K8YLw/THX+V7HCAHJoHfSl1u7/NSUZL2uwfVzkiiEk/sGmnXKdwD5ttK793P5xmsHc7hYuKbUwsccoR/IN7y4MOn3Qs/6sQtLfiNzzVk4Dt6N0Ae254xc1EpTrREXe45yPz6sR1wUq64AjRZPmya8elz0E11ZWSUTqzlrEzFOPRmwEVoiQ30Wh0FzLVwRAcAO3Y6OSR5ngowbJS2zNLN7ZT3RPbQ0XJdzQIUTt2a41+yDnX0Mdlj0m9dsc7t70fYJmj4jFlhJKMMZpHdX4ER4NM9l/sAZ9VPoQEk5kBDOlI2AfFoYqrXJF8X2ecVkHTrxBe9KgojWrJMp4dIz/O+iOAJZozhn/tQD/ISPQwse+VX8SuvSP2uPEX5EosEIZU9hUFGZSjnQQ4lIQN13liOfaTkUkzJOMBvgZZBKBagp27m3ETWY3Ht6hCiLwXdM/zSbupQpwc0WhkYlTE8S261sUehCUg9NpfyyNcMgHOYSITK7L3VhJ072FibYZCes70q0pAJotLudGHg3jUH2zXgNYQcDCKlvyo1peRz+RZGNKtZ56UMeAswrz137ZPwsLD4C+UZs9DfZV51hxyhuWla9fogwVA4VtVzzm4arYMIAt8PdntP7uGhzM/F9Fx7OXBSzP9phnla/TFG8b1Sa7dL79DZZ//hzPCSryiV/cYM2KwTMKwuIvTwO6OMVSkEd12ATPkjmeN/aHOcajqyLVhaHhFOU8OgbfMZYYQtRtlAa72gI833b5ZARrYuzuFynvGmjtsxyvALiORSndt24nu4DtqT7xJSmKZY0YkNwE/jidkC8s2OFtnBP2RMRmOvl3bw9ZXpwsp9/ZGcucUl2LvpfsEWj7NwutJAZxukVE9JATHUJtMTsPUt24ZL6ixAAwnqQdScboAHH7lPL3jfCxbxGIH3We0sMnTO99/mpRoQWjTP4IU2GEoq1nKIXlI/QFUPiLL9dBineEWho46SAXVhqo4g1CtGU0BuvTU57RxmnVDRgn9e2L5nJYVMLyipM/M72jmnf7v3FJdMeoaN/68Y0Yzmj2btd51yClgw/C02n5WwiGOVW2lhi50HP60NeQfbFWYeaTnrZkaCFCZ8XJmdXEXtkPxOPMgvlZkMJFS2QL1KXwoBAxk2oa87eb/oSOx2X1+0dQ/ThDCyT1JX8TT7nnOtNyti1fqN/503L5Q4RqMYeJ3FN9XOqQTPt3PL/uJpANNLcGz/yCdPh7oRTAvMHVLzWMKCXl9ihHkpbrTc736FFGz7pXe8AW8Ux9ClPd3nGpIwDYXjVz7rwcPVT89KKkFBUPMyBh0mY5+fqimQW9K7EslMdNrRCR4NBYtnH+tjkoIe9fBMfA0ToZy93fRBEQFTzbNfIDPHLt9DLvVgWnyPbT8lZjsNZjuvTP9EzjGfa9H3CMsXcOOEp3ob6/+4BlZLc6oRasVBw7yOgLbB3J/9bz/NS2EEEAhHI4kiNmrdOzef1WmJCdu2KaSRUGgERghSqF95aDc3Y/1l38oCuBwzmuxInQoRZibfm53VY/3S0Kmj2J1SGREUfrT3x/P7lurCd82HDllQJ17YFPSDaHf2mpGbcGmHSs8II+Gp5lDNQTm1jwfVBq7mE4SttVCmRTwPiiW5fWgiEVD8PJ8PzKAGNjIai3SQb8WukqTDbBqffrrb7QnXu/ntZUJrBeH/dVdO2C+feXzS1YeMLFR/bZQ+UK6NCEcm9g6Be1gBepKCz/RtFncLR0ni278JC2cEQwHclQ68rqX26bdcH2Ojo28q3NwIM+jiCEcqXbG+AspakzhM0V4K6oa5Gzwqe37/3oABH+BakC4AFLsnySutLQlM/IwiXH1/ilL4nsqPLLsW2Y0SHsaIPngkxWWgR8rWIkpWzd1OA469AiLD+/Ai4GjeOK1erfh404TlwYT4i2vCxa+9s260TOjEA1oU1TpPnQVkSHT5RGmt0AvPY7e81Qy7zXy/XGevoWbpEVAHGq7Z0lEc8EetcHLzL4HgA81ID2ny6EEeB0kbzFSkjxSVCxHzxXYIR3e+HpzBCX0cH1N2fOYXtIthjGJfeqKv2MB2yhOLkGzTyzzIGJYa4uPiBSysAF/vhPZm6CLqf8kGwPj4qNFzfzpKW02ZtszYhVFm1CRwjE0drZk8dq1Ho/wLWEyr1p6xZxUSMLxrBS4Sb3Vkm+1h/kzdI7tvDDqrnRbiTEvqET+PSIrzTEJ6L5c73Fz0Xlpk+Y2XsV8WSsSsUDv9mGOfAM+48XyPzc70y5ZIuZcDqysACXbBrBhEkMZg36X0ExbWgzFUUS6kqBkTAt4hadnIXZrTdv3rN+LomZ+xH0thvk6b3tmpMqQpt6CMohB+GFOR/Bv67MWvvSf/+GxnjVBuu0eV8WPIPW309VdwP6sum1P05n1xOXw21WHJh+p+wtQlDUNJenjriuijaLqXPM8IeuXA9PLKaV+RctgtnsBC+ll43P5KBZTO4mo6xguf7rq3CGfX5rMKYnDiW49tyCBKu3nprDdNXWS2/cZWksy88j69YElZu00WXqOXpOEsfyH9kkyuoCzlinhWtefrszfSkn3hTs7Yt4epJWoc4xvMQSZZatR3m277qfNsVoYgFEU4tdlXEi8bAiShC4g/brh76Qvu0Hwhlo3Tr05GlXs4H+CyecAGQGyqmZfepz2eYwtxI9Lc3UEJko29zq4r+jlB53BeSx4OeI7oFtqMJVx3P1M5rkX5EataXZGPnPj7hBxGX2QoT7hc/UFS0so9DUuOh1upJ4szWqZgjgj7KDFrfv2+j7dPs68fMwQ3wLqpOMiKsuMriclQ9uCfocR43XN0X4F/B/edix2KZeYcr46Bg3x7rrAozx6iU5U+Ra6k5Jp/8LceteXxK9kFV2CQJarWnGvI6tt7Q6oPSkcanc8PMRd1WqUBykJ9CmW4dGEN+toDK+4rse81HFr8ouAYuAeJF1sYOWX5HQK0XZmUMLXU5vjyXXgfKTqbYdUDiJ/9mziPgXFUeL0lTRgBce/0DYHoL4isT7TYXy8G6y82piC+Tft7W4XT5LUi2Uaqnj9Nnn8W27RkfuGtblV8IkSAa023aVhEO8x2ninumwbUi2oj+XDzbu/8uN6+L5t/hmpe1GClVxDz1lBeeOqVfADZonxzlwoQJGlFUPRy+IP6jlsaLXDsP/8OBbUfAlOLR5iduL1WyBWQdF7pHSTRWkGjetgEW7lnP1so1izdrmAEpVj6IWz4Sv/ubnSEpG2SiDWtzQAHY4lsDmzP/icONp2wL1TET3J7cj+I0iTYYvDVRIEmoEYpyFvDpdOXn8K4w5E40rkadsesISZ+rUYTlHAjFsqSM8LNFuSMczvKHtOX6iN5H25/cO7IKwpyReMs1u7zoPSu9j9mNLd0XGIeIb8mJ5d9baks4pl0W97UdjRPdi9wj4Qvms3z5AzYIDKFnaNPufKyx94/SiGOhCMVS+QKQ3PuMiZ/kr01Z1dtN5qcbZJYOpCGf4yPK4nMMVlZB4vCEDzM0VKtBtfHIxiNwT5Me9VDefRKUx+/ljfC0tylR3JQkMe2Ewi2Kmcz4kFcBSrK+qJOPtXRos/0FJPx35LplTcPCqtPR/AIW5F/YtNlCr0kBfTS7t9fDTjeK9jXouqSlRWaJ+SrBneqY/Jmq73GnQ9K1+tLL7y/2eHDQ3DhCJMXLR8mZLtSviRL0fSh2Io0IQb1WmduXIK0KWDJvDcTY+5V9CkMeBsQ4DN3CSUfWT/RWac0h1nmXqPtvGdRbz7kklE+fH1SjeRihk529Dpnef9sokKuY04mUSCZbfgH4siG30Le0Of7rPCRNhsgKPsZ7nlHhatIhTa2ylrhPWzHIIOVY4PcTdf+1nUgm+WeZjxa1sDe7/EtmfaCvmr2jCmlhLdYI2A9bvBTAS/duWPctEwA10AR0TQkOj9NPNi2M7z+VlR+qnNzHFH4kyS7JG2YcqIovywEocyjXipF34YXFwEIZCoWzCvS/vcO7/r6OfWKQT+wrf3KiWGnegltwlHul3pgkLxk0X3mZ8L3NVjpyEU2IdP1ML/YjZfu+FdBb7imDdUtrpvCz3hZzSZpOwkl+JR71yDp++W9a/6p8sbw7BUTNWHqXWyCbQfn+3DXarVkbA8FLyYlSW5CYpjYPnHxX6GHvnOtehFtE5XgZhOG6n4o2IG+aAnyrv927bEE4KRGdx+19PAXsMVfbJAjVNV04BJJqdF6nAJSQMH3g4M7Mxu7gbC4jmYlxYvvYsARP6rYaNLwKhbmF7asHXYtiOgccFFh8lBEih6X+LwjUEeNRKyEEtNyXceQsNIR9wBC/Tc+dh9GybCD8fbp8CdJz9aZN7VhhE0nBmc2ghTj52iAblDo8bBdxZlt1j8VhE0Z157vCALvWU/6PdoHgYHGU/FQNoLaMpeqPk6Hoz6WhO2ISpSmZCAEIN0P3TQdmIBElMr9d2KMYSHj4t9NpqHitxy50r2ORkP86FeO//MtQIvOpoW/XRCPyJodupX9rlPWnWa8Flq9Cm7fVEFPt1xhe5ui9mG6XTfrdpXXTebbtwzfBlv/N4ABWIShwXO+GzFwFayjNXA6lr1DC9FgDvZaVxGWYc2qw0/qSOTUe3Jvx3y8KWWU5ogIHJIiWj36ZyKpaw0HoHLtQH7BatBuUo9lOMEbE/aTSXm3W0tjtLVVpUMicj5nCiELvglpWGqTqoefKOS2TnTtb6mu+rykzxk1hhIbTqI9dDDmAM8c5liHATfUITfnO3cJo0HWAw0UEzp/v9mcQ9+2pRAhsrS/AEYsSoeOGhBcNqAFkXYP2A11ZNKahRcVd2szeEA9svZGhALZc69ITf/SHWyYulQ0PNzrOefDDv/TB0gtmXDK7X8R4/wJOZIeHc4o9C0Mi0PL8Cji0caW3p0hi7IJA1jUGtkwIHDy+jxg/GaGA+dwE0cWYpo0eWmQ95D2mKTTh5GXNtMRpKnxjtLfQcrwJWcpg+6gQC4qgLDhcMssidhAaZwvtG8G4adbeFrtNB3OW5WH6jBSqp6ks8F1GmKESGEu7z/oE1v8BM2qGWpLxGpH1T/gUhpaTu+pKR6jjm7o+g/47e+MgEG6kWVxfTsSZl20jdeDVZiHn/xzfs/o1Xl8Qa7m2u9eMMqYVvSeUuWFgnX3UNavZsLyAdRbzUh3bDjUENqhz407dfqsd+NJXFP8QdWWFT7S9W/5tNEQLP7t3BvH3WuyBMiS1RP/hpefV5tMTvoLBZwudtsNM0GKLKN7x702N2j9noJZUrehooEXUAa74nvy645RkSedGQc35EwyBA8miuQXfItTpsEkNeT1vKyGsBMYG3GgQaGY8w5GJlrbTgn8oBVFpksWtN7La96vmEl3D5bYjvts5g0FMa4xBXyhFACh5fVs3sfa5kcaKPl4FEzJxfPCcElxd5YhFVcDvfWjc+u/+ddMHUBDLe7ctIOGqwKYEuPk0Mde05KegDqHd3dkdRZnZwjrdKOQrx9CrVW2Hh5cuyuxj9qJNxLucA5+c2fQsEdzjHyRdQA3ZWV66FH3aAu16sW3VEk+lRI7Qbqpx3207OiRBOWQFxjpOdqKsF2+zChPUTwmhNZZu+cbrvqoiOFyKv3D0AyLzH2SSWU+zy+Xf0C86552SOqwp2ysD6/hhhdrjm14amvARbGrDciMkYaW3y//V0VDNolBtw+qt0l03+lwrzDA5bqX3+UV9Ie+ROSLzLfVF6dfUE5q2T64O2idDYqleI+rMBuUj6xNlMOxoZoOFj/knB78PhzeUoLlhmrKQ3CRpMoe4301X3SNXxE/Mjt7gnMZ0+XuORw5PuXwhS9Q2a51DaSTI99sqRnzpHV2P0neERpHBHB8seO74WQgYIccK/3LITUIY0va+MI0KR7L+Pp2FKWC6Xz+RP7XmGz1XJ6Vim7+nwEcUQy1xrdEz9N8v0Mh14V3elzLidXHQ8mSNWFsfbNI+TVbVRwhbOBMzULO1AJivbsaFV6q+9EWYi8xH9ICIfibKZl0XA+ZABBDqrHKMkm7K4a/wA+umu3cu3FuBkq58vG7etr1keV+0laf/c+t2Ne/HxF9CZZ5g1YnG1yJ9gQgm40PR6/RRclKnb+1jUEMynXQyH8H6+pqWlFOBAmC6UpAIiJs54LpJSo4hg0RnAvx3eEcFJhtGglGPYVQve52E0BVKXYSAs8pyID2l+Uog7cSrC8BamDe5TlyuiwNbF8Y/09NI10AAtzB+nKXtU9pCn6cVhA11NR29dU76NNGIxKsbCYfdmejPc9VAa/H3VNWBkvurBNqf/weLw1/qxPoavUM98nsLaHtDjBPb1tyyOMrl1oM/T+63UXDnf2A+PmjNy+O9nUiLTVS7vdG5HbkIrkfEScnUpxhLbwUj6Eo4rW+pRRVYVxHq25XYfu/9vyVX7xvQZH77qw80u2+8/Kq2Www1i3LBodz6jhuVID+QKnUsoHSYTJ5nHsj6evD6eYyth5IwzCIeP9F6LN1BCvU/Rz/vjo1CzGkf22f2P5tV4E9xdz65FQSX2SB9fx6873JyX376FBNG64C3my2w/w98PsuGnjv67/n9gcwumbXh9PS03/FAg2iUAHDra8z4+OmgsSJnk1SHER4k37JL52it7MKEfxIIp+/Qw5/3KbXgnq8TxD+kL5QNxm4/d8XO+nSTrs0vIHlzgTAIdgREZ3UH+fxZk7IQpXTVlCmvnq+azcnztmsMO99qjKO0Haz+9gvoXQe/nkM+lQ27agjb9nrEa0oVZtAAppw/DQIL3A5LqfTMpM2FV2zYNidDWhO//2E/wbOMaV6hHcnPlMUAGuAXsPJJ9qbwwF/xm+nsY7OXNxctWPjuTMB2OSl5SdYIeTR4k3N/njXbG56ZkasXYpy6MZPi1DGXv7izsJrCyD+kd+oRCVlXvovWZEj4Y7jVCFNA8Lb8wy73PDqPr8qgLqApT29lNgBq4Tqkz7c3MvK5Fm3mSNKPy3V399G71t8QUsJtLo0woeQ6+W0bbMtm0Znjd2YHzGWO/WgaYEtglTgdbrpex4/xXSrPS5fOMAxp/h6eyCSZuNnaI+ltd/Dukeh+rZLLUTPWERn0S2WfdacPgHe1PqaPY0A78KrX8Ruxg29ns+R5vD+X1ebCPG5x02wbZpOfuveRVg1rn2Wj+t136gYbJIykYpH1ffQ3PEXW7dJsYs3ubVk0tgZHgvFd3oyYQ5NdRiGwvSg3i0qp7UjFyBy0RFTxLh4SAQfnTRTqQlQYWUhyIOuFJiR0o1HJ7LDZyZq/XOMApdUJTBkoq9wO12btSpvsaNuVCMlhx0T+b2hKr0vHSxtEXPYiO3RCXfyBnJWg9KMXlVbqwoT17QAOBTdX9ufzaCM8nW3YdIJPlzNlBvdRhuJMEGVJSYdeBg2c+9KCFjSW7/6m5IlxWkw7ndWo77+hgW54uPV0I2568oB1mAq+gjy3Q+BrmUI9ZhGf9W3yotZHw3UyPFzxmu1+vUGZQSStGtriiQNddnhD92bS4b6c+It4t7efPFX3R4AU7+WJQ4/fH/wxteR4scPyFxCsHe5vE7h7BD8rL9XLjvmHp9I4jraCNMuVRxIqZEEcz/PCI8e9z4cIltXVfs6wpqNWJ6iwGCPSyEqvT0hOVuoleZMB9tPqI0tT5pIMa8ZZYgCXJBS4QhSWl93wnfE6pofUi29XCTDwBPzmW+aTXykKY3uvZG7AxjhzrpW4yuz7Wl+VKv4e+6999eBsH9eF8vMTg6ZtfoE1x7QTuxyWKUkh9J6cwvx2eGLoyEUFLF+q3CZUbSzKzsmls4bu1JyXiVw4kdGzd8Xu6irHXFgs9gemdX3XEfys52ZOfeUn7Q2WA8TdfWGc6f5sNpYjYPS2hs+99ffTv7Ip3bfEPqlAqnP8ra/YGK/4Mu7uF++S0kM1IvsT8GM32NRMSM1klzODMm0JeraSQwqpUX8xazRf9vnu0jeygXZjTiAWPBdBuQnwlYPMNV+HWYLbYrMhfMtsgbv8Rv4CCsV2Tl4S0ubDEREcMvZUbGJ3dJ09i3eQ12gW4pOl3UB6x9cnwy/JbOKWKjfab8DhlHjH10gl95KQPrF3ZsNhOKnjxYJGGIbiZIW1Vzql09mMz1gfD65iXpoo/L2hh2gTBhW7/qDiW7RpWX4hSLIDS56tjdIH1LhuM2mBBpYIxckc/8mrZ8mL+Lt6khbMuPBLb3ViItcsmjTg2rt7CwPwymI/OwBQmE6SbLA7c/3Nhb4AFMJh+hMm7ACJ6mx+DRxvDu0XwGB7EPGdGyDerKfViBX6PoG3UG1JI6Pp0WAIb7Vcg3WQnNo25L2ntDTSJ5qXQ9btiAmKvTEON84Yu/sQoUbNCz1jhp++OSVl/IjsMqIviNVUJROvfIRsNLfRCPeYHISqIgReVO/OHIn5DI34MhzzvdLIansYj7lxzzoZs9RaiRIkU668nVOBJ0ZLA3vxshoxmGmGWTXGCVYVSMCihjSubZEQlmvnwu0xsg4P4sF1wPWuQTVrpDBiN6LYj2pBS3dP8/F9mysWyOrf+zhVk2EpkUfWP8d2WMlv2dT7k11oZAnutKp+gmgdZ017txzUgB6M3oeVdPkD+gFJqiU1Xz6zw64B+DLtsydWnBVyUXip2dMcjBYcsD0MiaUNsnw4sStG+xfc/RJuda/JWQkYbPYOtQPyskI0pefYOjFG537PW75o1tBxMqzbjLVJdi4Xy5NtZf8hmTbXYsbzuYgvGZd8bR6cPzqYI3X4QV3zZ86X10m47nLbEShEZdotCuZ1XxLBwlssMlKN+vq+kH5/+jI9as8WVuAcawCydG/83O6S4rpa6zM1DNsfmC8ylJ3uX538UNjeo2G/Kdf80XJQmQS3Ttasi7ZdPPrA9RWXDLkGtbo24f1burDpTjVkPOT2Imsw22gyMCmq1bjxu0Ow3cR1J98j1qHpXQbJqn+bftfbtBfL7GqdbukYutwcOeZz6fqft8m8qvQDjSHcJZGuGueNRqT8XprxNulbwMiLd/RyAr7Nfuz3SPShjGFI8R0IH/n9y74igvGyoQ3vzNtr7Qs2MZhfwNmG7DNhOQ9/duCrHiXHZc8+zv5fa9EHj1TS/6b+gFw3fO1dfAttvrRYejfQptDu58s42GHzpF9A+JcVisHv/8wb3kFeI+o8Kv0388Fff8mT/jcX5JI14Nh73+9Y7EvHQE6BUYf16ySze1WVvM05w1p73P7Z6Na1PIaGGKqpVbd3z0SbDK6mTU8M0P0U8e/t6N02O67/NRXqXAvyV2Z99Mwjlvw4qk6EL/v+XIT67eXOuCLCmuOih1oyyzb4vV4wtPEsfvYw/PeXDQbDY+fFY1huzoLMz+xWTJzcIeEFZ2kn79u1sZLkxrAhwzdK5qPEoZG8jx1O8rdvjZBvZJOHRjuG7A9f+E0W8Ieeldjv0uua9xYu7zzEw6pok3cE3VNtju/8MhKtbmIeDPrqp+dhZ8YR9GX9zKqxOV9tn19AqtmtOw8C/9ed7L7pGvqp6LfZ8FCYBz+G+Glb42HQofwvn5wPhun7q9vbNq7/8PTP9YUzp4nzvpYk8aOWHC+PH6Bv/3rHv2/Y8yL1Cq/ANcg2VFSbU48rWdYrW0i+xbHaHf0dPICGZHigDGql9NnVaBJKluk5TJpvjTHZrlWZ19M30tmUcwdyiaNxKwgdecDcYJPTlfThzs7GwMwyRbjJoS0nd1ygeEFdF0uc2sL//Suy6mUEROfspOxc09kH3Y07g16F2q3zeZtV8pd2MbtVaalNiLY8Ch/k9JlIbfvIG4++OaXKzps58unQgLnju+2A/S4S/oXgX7/jfh8Sb+LP7Lj+2h/3ncoen9PD2SyW3zU4FkZqQMVcQjCheLNn//fADAZz5i5UpA2HXUX/yMV8iItN2N0gC4hs8iiQ+X6Tnl9df4H0wJHf6Xw20RVI2RY//PHHZ1W868WJw5ub4tIUuaNoLgZ4cIYlq/gjaIus8baB4Z/gjm7yaF0odnpO0+n/C9jxd8Q7hFGV43DlyGlUtbXgacGhb6an1zK5dCZ+LPN6Zmml2CwcrYoG3OokCKs7ftUllrZN6yVmWoA0xT/4OKd6UzKfEg2dUfGUjmVFSgRmckRAdXL6y8JzkwE70sQJD0lJpsTACIkLZovvWmyy/Bmnzxtuw4GrT3ViggS3Z1s+8Ju9rfYEU5yyySRL0L3FEWrOlGzHHqtgSoWOV5Ki9/XRmg4FvTdjf0QMJKJ3SEw6WZFGenkmyaWW27MZAm7KmiQPbijHW7bt6iGPmOQahYA8wpqlmoWW7mhtR9MGBCJhTOAxq4SkYH3rvhmn2lFvnIcs68QKNS3ibfcVehaMCDMtrNQrWb4OzV27QXPvfZzkDxXXNI+f4WR0i7oEiRd1OXxifPtGieAVfdM//fTY9X9rYrwDCNRk7toj9/WEoUoUqnIz/+BNJUSjc6sCb7e9ga8FGncGFUaGwHyVQnEEG6TNyOHlr+6oS5wjeH6jGZ3FdDnLBp3Ky5slS2zKpwfxE/L0kLAYJYHW7jizAU4CswlOcmOQklX84la0nQ5+wTHsI84KM+kZb5BRso/pbMU4fd/7VWvyRXHKgL6PpvzxntAwt2dXXlz2KMDDgaz5Nu1kNWQO02oHLE50izZZfx/2SvULkVT1RVrPDSqbbTcd64moNLtz1tXWKg0z1IqI++Ryuqj/2SPNOia+Rd1rBmk34Ol98p/wZZaCrZFjxYjbuG0HNkwZ0EaPxTgjwrUYr72+x3qmPtCd+BoYFH/oajoY8tlX+cT2yO4OS7xy4JH76XUd3WI/L68YM9q7YtH27EWEXVKos4px8ID1x/jPDH7vY43U0+ocFcwmgfGE+X3ke2PXLbBd2J5Fs/VSHR2y26OtdiXpScrJAzhcx8kYqvg1U+6jQEJjaV57tDclyaL7/tgA5s7LBS9i9u2+FB5gqaNCcCayieXZThF4vBSjjP8hjEkqjT5oX/3CudDJ9LRhwQ4sm9ZpUFTGkZGpEsyQd2pw9L/fZF867ik0IzGnxWMI5FiedfZbGp/iEC37Auv7GKKkhXAVH26RXHT1aw/D2y3HDZ86PMiFEt2fXR0yilrJiDTviiGZS3GdunXfro+Fc+oUGit5QTENLiN8FUafDcqa8Nxko2A+4z3e8HdrhOr8ME8jtkhJLM+f8Sg+R3lFtqPzsP0Cjvzn+Kvv73aDRwt4o/psI3GV1a6RWCLhq2jIzj+WxlWazZ4SVYge2INCLhKoZTN4VG+ej9flRtl7svZRo7voHj6lQb7vlMV9LGuiLyi2tUjCgFGnue+NcCtjOY0GbDCsqfIqyWx1o9GjXICIWOwQRT6rJ7sVTbSGM92Ltpds3erA9k8lY4jAgrpPkF9E9sEhm7urgHBELLaHRw3ZhSHEYAXOQSycJeN0XmhgC5hH9/rZMDG8tWjwnGyXEYBYHCsqMOGDiwPOuebS27svJZTYl46BoSXdwUe2lMhQ7NY4nHBtwhl6N41zAGqRPnrAb0tYukSh7FuliU9Ku2OQVKMLwcfLBArwUJnhoX1IlxX5nT1rWiPuuwTG9GWywAUKRNyHwqaXoQIHedmOV26HrJTLvTpTM8odjIAmo549xu8SkO9U8rWkIW9yK+Vxv/Va/wpE75Ud0wUqLo3nKz41SN3iV7Hf8i3G6IXa/Pu5YeqASeacrhLNdwDt0+bmPmnP8BXYGXnuu3sA+nvBHsAboPfFi9C7cxtU8/Lq7vIQjxeu96/WQn/b3zZvZbcOxQ/TSbNp+90FEl2iVRfGTEIPidbugp9HxBAIf9gL72sVNUsm8/yeG2rFgMzbZb+AP9Jb/8beWY4Ngs9AGbTsAjB//lkGpfMhYCkeqvY89zm4qn1vdo01qC85bGWxpLbtJOnmEP23Jl/r0GMzwsDiqmDWTds7oV72hkD8L2DDwMT+v3M/DJxuReD0y9AA5907t39LT5Xuf/2oTVVtljSyLvmy1r0DW+IjKwvko7gtu2NbPJFHSr4fcF5DEMTn2v6PoijYKfVy9+vP3LEr9GjV9FjRz895kS9ZC7+AhdRtN4fmPhyNRh6v8ExrH/JZ+fAw/w01wV47fzF5UPKX5JL665Ev6Dz/o6d4dvPndwyC4GBZzcT+hsgDXS/vHHhe09WPM/mWQ/G4+TFsvfGzeTt1cqz7s8r60NoDO3d9bzzFO57TLjOpnVz4UDA9s3PHlTxp/Sb/t4efVcz2PvJdc3f0ePeaL3GDjP/9ArY4zR2dYl7tMDJ235Er+MnpL3aIfkaTtyY8eH5xLXxgB7Dzo1arusbt3+DRfjgpR342cOlGtTtzXWx8Ida0jP3bpajMRAq2r9D8od4wJv6E7+m2oGFe3XGRcOtC7Ym18vX7kiBYk6xCh1x3/ZuuQ3VX7EPYeHt2U8rV4Eu9Xmyrh52WrXde/qG6OJ11smovHTrkfumz6B+Xpx+FiB+0AU354JaRzn/4+9+PJbldOPTMSHR0vdyzfHk2jXehQF89Jjslk4saC/bneMKRxPdnQu1S4nn/ggQHWoLNYc/nLrX+14VYGOX/u0Xw4cLu2g+8za8Np4vI8mQ24fdgg4r7M2sy/703HHX6VUX8n1k/m89MHP4SIuZDnu212TA88FP7wL9Tjo+yQ0ZGX2yxNNHNVxkxOh9h/q9w69JvCz5V0x+DtvSw33pv9TnEQt7BQycyxlR9oXW+OrmzCeboxOzbrIluaPGLqonGhw8S/vk77a+IEZMz15oi6t/iVvqN67pKrle9v/nW+fZR7s/EsXzKtsNHam2zW9cfmrfOzmrM26xYglavc05JH3rhm9a0nl6Qr1IPzMatI6dk7682LjBmvjTCgz9hKAcLSh9zP6uifcNbOghYHuMwt+PPT96Q2rc4So+X2OZqCEeDrxwl7MJYhG1laHfgf2yjHv0hDnd6XZ2NN3T66bZwy7nrvqvi3mnQ9VK8TGE7UjG503GLgO5aqf6fCS6ojpb14ua+3zcZCiiuz3EvjInuwddnd6lAW8O2/XDiMwLO34v8Bby+v+6oVUOie1bzdmsaNV7TeLzqL9VBcKyb/bmmCaGd/nsDw0wZ7k97mTPQVVUw7o9IzbS5sOPhFYIOeexctUdvinnAzo+V7R7jMJjO3uD0FfMHVlGxDAToyOac3LcvfNY9WMcKWuEfNLIUvTSJuWHKJG3Ddd9Pweh3TCzDsnGBAi/c8MSh4rGzE+0di2WRWx+AqmauXBs5TzDq7S/dcx9YK7H3Dxotar338+X2/elQ95HotOTkoMBhvAZv/ufDkpuv35jGIhWa75O/eWKex397I477t/P03cNnOJiUP/TQaFR/vp8PZI+ljtFvB51nlHiFSUa2cWedE7an0DJD9eRjluOmCXbzQ4peB0THFXlOoK8y7bInYMB5SBCYv+fcjjuuhQ99Qj4+8O8cyaFskUBsl5lw9crhcx3c8yEC325GTkhYwtMT/zptel77x8OZk7dh3nKRd2aXcQPBd1iwfVOEegzt9mNbeEE6KPUXcIhwTfXp97qozwXD3SFs50MR6UdH4B1hXD4ydRt7e8H/YSXqpx7nPoVsd7M8yJHGpvolbO7aNUZ/9SnEDIK8g8hirH+v+1Lqa/n84m/3O85f7N4p1XUrDhbt4gdyvNSuVoU3nqSN7o7VSbydmdWBU2dk26ETtJPz2vY6Owu5zx8faF3/C5j892A8L9QihhhjH9k/dL3l/97c+r8Cn+1Ngitf/I5ilGMrv4BtVERo/bYY6lPM/lqIrSK552b54f1JUYLi3b0ZRq5sf9E2LMJUAlEliDoC7GMNaDLHrbtOSO5IpyV0LuVj/MdkZGnVJkQYHlozfWC4bqEFEc4fE3CLpI/hpvMRloB4epNnBGeYEEnE5voHZqdQ/XJV/LUpjY4rg/GRYeGAl8OwWakLfuLdaL6tDf/ynTaovhDp/zR4d4/pcSLTCwa/XF5q+CfXUMlcs//gj49rvlKm4RD1Z9Hl9ym6L5gyc5tvvSyUChIGn9y3ZDpQg+sQSaS6BD3Lh/6FH/xruhvstNGdDVYnNFMmdfdj8QA9Yz+WO/81z7OeOHh6pgto78KScYcDjgmI0BrhmRp677vCwB5eVbH87pmtf9nF0uu0kgUamDcYjpMtiJazGiybJ57H3ssum5f6+2mP2WVPv3PrW4dfrgcJhKeLc+OzU2pJXdiGGUJSp885Rx0JHtdlLy0MEkLFJLlAxraa6FNt3GMMMtR1XfijYeENF/5JDKF3um6dypWwadwgkkv9pVL5rS084ri7846tu7e1EZfp7zLsDdRfr6vyvG8P41GElunAGX1JGqp28w2bPbF9sTuS2RU2CNXivT9znjLLGPN7kROufzaGnhmoBOFbCFT72EOppvwMkCHsKCJuQRxzUBi1HlVZMWea+wnlFgaAmkYuls+1HDr47dvBFzl/fhxGX7gw6XfW5MlI6EVo1fqZA1N1/8s5trlkyz6Bnk3qJsrl6bBn9xSGfFDA3QLrygu37vvMBqT8NYWXWWeVlA+fDkhoPK8Mmrcs5f0p3Xb3uYrLLT5tazrNzeQkRMV36oxPBbIaE0sy0bGoBsMCSDFJftNDwU6UiVzb95lm3XqaKi8drf5Wa/62CcynOPrW2scSrSMaAw78RjqVho6nLYgdQpnOPJjzWbb8/GTx/sD4w8OZZ22MvTDPrflxlrXeI+3KVULYVqtSRieuuqx1cq3Y0cbvmOHPQq7JJAlSa8I+1gjm99IKoHBCG6Hn94aK1hqN5UPyrhftZGhUWCEpayet6I1Cn45Y647iae7CSg3CfyTbioY81JMLGhE+kMUaxpVnH97PtQ+zAZMHjqz7+9rg6ZdSqn4tzlWggXevYfWpFsW16I9gprvzb4N/GsI7dkpT7SLhXUdVC4ui9pexbvnMU43WEcI2dyLjAVFi9LcvAdsXdARlwCbiLZoCsthm6h4TKeaI22CL62py5mjW3V5vDqpxYfSAKEfnGIoYajxTK2ep2Sj4rE9oq7FLkEbnyvvhj7hu9+B4eCg3JTnjf92jUY+h0X0fzG+rSzSOK+P7NpKsEQpV2BNqQtHgf3PTXB+/LwDYxFXr3gGcoQ2Lg/eHDPScOvCXW5BAY892Vg8MFXHjELy6Ke4pb5Rg8J6yJxLzNKcFtZXNoHGXzMZ4JBliya1Ow33hBwR76D3j+cx63b1eN3pl302cuauyCjPEXH9G6qJxZB/+v4wOs1opabkQ1duf5nN2c5LBzgqXeE2S0b0s9QSJJh65FLjhmTQLVe8SRjmaFXznoMzm+paHXkHCPDZ0iZfYtg/ZWHf+WOSqW0ggbf/fiGEYqudQptcxnaaHVLfXMZ26Pzq4D9OmfLuMqpzevlhkoE/lYLIvHIvLhSsNp+bgtDwmOTllzdH6p5knw9rOoQIS7J2feDcSaNMZmdnHIx8eo56kns043/Vg/h8YK4U1Pfl/X/44lpTz1tz/LnJqW9q2UcUKpbfy0uPDeyv6LTp+AcmJDxvg6dZ/sbJCyXbuRXFOSxX/I63/zevAtwBjY41LLM7cqqsRa5x+VPAxAzQP6X41+nVq29e+V3mjd+8cFeaZrIeykwO3xG39a8o/JX73hf9VcLP+HxtA5L8eBhRwx+n0qF7wzSSxSRA7UBXdxz7H1qrHes8kziIJsH3g2M+2asW5iZC8qBGdSFQckj/69Z8tg1tZkK27ySKFQs0ilwFGDwefxqIA42uQCD9CKvW0Gx1wwEcZwwLcgY6CpXtoXwscIZ8/vHfPB9M96rmIcexV06yiurpFYgqDvbJx8vfmrF26T3iW0I8yJXJbZkbwOgz3GKfqA8iAxQoIoyu5uM8+ma0fD+nm2ja6mPzsB5eeoz3PpScklzBGK2RdhskiWIq0i3DlnG0A4T056f8A160IMNeMrw5TbhnkbJJ4OAO/HWmx29w08cO6RlZdzS4AC468DvXH32pb7rbbjyYo3KKAd+7nk575rKK52ap21sdZrLOgiu0eEDHlzFuAEySuSO30qrIGubfEUsVuqEfvthVTjk4U/wAzxSwHTdVhmQSsGmba0cw+ZD/DgDsMD6U1YLNrS3aZ3v5F3IqElBx04Pb3NC0VimrlSXT0jURyHeJfmM7yH5ie+0VFpGm291cSmOeZkiPLIpVTj3PWtGAzTCC5S0lllKlBtJCqemCcdAO9WJYYLa7VTDJE8v7vzi2RyOdoHT64ocmtLkJLczZoGTzXeOeXc+YoFfYMf7o5NWktiYEubnTkLk4RWZRt9Bk1qLaafDeJCEKzshVWI3MwA6k/41Tg03VLpkmuHctFJ+6M0gwB67FGM/jUc1wcXb/IW+kNvZbnhjST+HaN+Pf2FYMU8kkoF7Kxjbg7W2D9K7Ca2jihkMUK3kp+WSPICn61kW2gXt3dyT3MUVvCc7lUgnn064xRCUUncJRblZ6mJcX0ksktrY2wjhTKqsQyW981Hb2KzxlWDQgJkEhn3t6H0rto/DdnGgMJYSYO6dTyf6VkXF3HHPLAI5pIoTjYhA3Y601UurRQ3C3xHOrEJY8O6xQg4J2n5vXgVZluha2yp5km6MHOVxjPTg9eK2LS0muYEaS18pVOY4wn8Pbr1qSfSbe8PnvJuLnjMQcD/d44oc11JSbVzAY2uo2u2TVzAQv3SpVWJ7MAM1NBDp+y0ju7+0IA2x+WjPkZ7k8Cpk8OXNtdL5UUU5ZiFMqfKvuV6CtSzv4tMiuEuZoLy8jXCpHHgIT1XOMflVOWllr/AF6FrsyveS6pbymxhUDGEhlQxrERjurYwcema4+4mWwnZHaC6J+aRVOVVunBHetaO7jvA9rc20DuZS0bklRF/u5NXFfTprY6fPK8hbIa8dl2oT6E9ape4DtLRsxWmmSygvormViWIUywYA45APSmJbNJp/2mPT3WVhua5mYFB+dbaQ2+l2Nz5qx38cIIhDyFiD/udAKxJ9ckvdONrPFCi9FKjCoPQAfzNNNvVCa0aQy41RHjhUQ75FAzIgKgt6e9Edrd3djJdssqMD8iInH/AAHvUC6VeGNJYo90THAkjfv9eK6W0hhguY7m7uGWJUCIZMklh1PTge9DlbYfw6I52wN7b3DXFzblY84aSQHj6D1pdQ1aOeAQ28RMZ53OmOfw7ik1C6u9ZvJJVWRoYyQqRr27ZHel0q4iTz/tE3l+WMhDgAj/ADir636hKOmxVld2t1kwsQBxkdGPqR60SFvtS7hEwGD8uAuO+eOv+Nad39juIyEkVg2AWUcD8BxWdsVLoJC65QqDno3qOf5UJ3Emi9cTxxIJYzAYiNpWQnPtj1qm80M0LyLsRiMbByG/Ko5xaQzEPLI6tnC4HyE1Wh+zPcsklu0isPkKZUj3x0oSSWguW+w7zGMIxCqqTlmTJOPcGpprZygCtCVUbsp1YfQ04WEs8jokDQhRnExxnntxUBCxiXyi6eX96J27+oqvQd4jYFVTvKhR1LKCQfqKsQTR3LbZQoYcjtnNVY2a4uAI0RHIzs3YDVYuLeKM5dGhk28KvIz7GpcUFk2l18txraRbSkqpZHC7iM5U1SbSZPmMbBgvY4FWoGk8wOXlJb5cZ4/GgTtGzLwCeoA60alXktmZBSWLO+JseppquwPO3HpW8Z3MSBlBB4YAc1Cba0nG3aAw7g9aObuUqvcyQ3fd34p5JYZBY+2cVcOlZB8uXnk4Y4qrJaXMKFnjYqP4gM0J63GpRYgmG3GDj1x/OnecOnB96qh8Hnj8MUbs44GfrVX1KaNBXO3I5xyKlWcjvg/Ss0OQe3vg4qQShQ2Mn3pWuS4djUW5O4BuBnJ4wKuxXb7/AJjuAHfnFYSzZTLMQB6dD+NSLIuRgnHQmmjOVO/Q6KN4pI9rADcc8np6c1DPZMVYptbJzhxn9aykucHAzjoKtRXW1jwQRwFP/wBegh07bELCSCTEoOeoOCf8ipUBZgVIPrxVtp43QiRA2cgcZx+NReQAD5BZQRyCOM/XtTeuxEnrbYi2suSOQDgYFG0CTIGT79aeu5c7vlcdm7/T1pRFgZOVOOuMVPqQ1bR7kWSCMLz6g0vJAKj2qTyz97d3waPu4XbtB985HvTuTp1GID8u4jBOOopwGAzKpJX3pyx7umBj360qqwbOMexH+NC2BNEIyHzuwD12nIp4bGWUY5xg04/JhiuM5zjtTCmAMHJHAB7UwvrcQsSMY7cUrcrwMnOODinkKGwR0xkAUKUySFP4etLUVupFu6gfe68809juTJJJJ7jpTtoRSR970I70gBDA9COTgdKE+wNpjVB+YDg8bh0z7UhClgNxHuKkQITzuO0fnTvl2jjcAO3bmnqJMjIORxjtgmkJBU8AHr0qTaGzkZHWk8tgdxGU3Y255FJMduqIlDAcY59aCMKOfyFSmMgE7SAevpTduf4efQdqeo+Z2GLEWOTgjHG00o4B7/WnKpB3Nu47elN3HBLAZA4GOaNRppsCNw+nrmmYXG3oRzketOG7YAOCM9qUrjdgjOMjFF2C02GqiIMcnr3pGO0gZIOeQT1p5OQEHH+eaaMYwi56E7u1F9LsaVwVcsD0JNJtwG4z/WhiQCWA5pck4ZTgHjilcOuoAAqcggZziim5HTv3NFVd9xkjZBU4JHr1pxOZMDAx0qw0hQEHDMfbp9aTCPgAL5g6hu9Z7mab6lcKAeScdvamlCCec81P5eWABxxyB/KmtGVb5mIwenpQpajT0I/4cKwA60FCpKDPNTsq7crgbunrUJjZwMAD0I4zSuh3toDJw2wc9Mjn/PemBCQenTnvinDeo44yO5p3zkZJ4PoMH8aL2KcthoBXGVPB447Uscfy/Lwe3HWkbO0LnGRjHvS/MAR3KmqZKkJjbhhnGenanpG45OAfaoy7Hh8j0PoaUSAIUb5znNK3Qbi2OjUZ3HG7OARTsIN3IAPOajD4wQBkcjHNO8wjJOMdu9DJ1Y8htjEE5ByWx1prFCVU/fbHOegpvmNkneAD1AHWlEkYAXqWOAcflS2BWFbYWxkAe/ajZggAAt2Pt603JA2kA89SKazO7qV9eeeDQEU2PCM52lsc9TSmFlJBAznrmk8xh/vDjrSGRickBQB/DTukCT6DiBkhj34HApN3bbuPfims7sgU4xjPvQx3MAHJA4z1pX1D1FOeyjJznikJDHGfl60bCPmX1wKQqSCWXOTxTG0mPRlwRuJI6cdqBtI4GOc564pNuASG2jjqP603OSc/Kf4TjrSTuNWHspZcHkjqD6Ui4Xtn69KPlz1JJHNPKHOD04OBRzC5boCdxOFxnOeaBuIBIH1FDAEsRjB9e3NCseeAwOOM9xS1sJgg3MV59QBT0HUBcgcjd6VFubYCPTgmnBskHGc9vemrrQXKSlcclgykcgHg00ICCy/KR2JycUbxjHT3PNBYpIFGWGeNveh6aDXkHGBubAbp+NLLaQoouZZv4flVSdz+p9hUUhkUiYlRGOFOTyT6DvVK/vJDKuHxgEgjqKpOxpSi9Guo83TCJgZmGTgKrtjHTHWrLT2cVlHBOJpctvQowG31GT71mQiSVckAqOeBjmtMXFnEnk3Nr5u0ABgcYHXOfXJob6I2ejH6Y+n3V5DENNLqT8wknYqvfJwB2rUhuIL2S6mtIZPO3nyZJZPvE9F4HHA4/KqVpJaJbXBsBJ5rIQFZgxOeuMdaybZL4SjY0sag884HFDavYVk21cv28dzPPLLeTywCNT0+UKPbH8q0LfUbm4lkuflWziH8WCzAcck85NZ01zHfbLRrl2cnlgOCf60TCOKFbaE/Iv32/vGi/QVrq1jPDsZg+S7sec1vHy3RvmUbWUlT2O3n86qWFshulL4ZYl3cVZxgGN2OZP3jkc47Dnv2FQ5IJa6LoQlZZJXiYpsyTgHr/npU/ns1tHuYRsBliAAcf40xI8pLlTvZv4TyAKNhkYyYIGc4bHCj/wCvQrEuyWxfgRVjVeME87vU9/f8ad9p8gxhZGVS21eMjg9vXNV1YEtM7AEADjsKli+zrJDHOGdYxwPQ9c+9Jsa8zo54raZBbsPMlwA5xwAef/r05rqGKPNw08ce8DcqliQD3wO9UtNuUvp5SxwVVUYY684rf8nz7fyUJUKeST1+lYt20ZSuzn/EOso6Rx2V3MEkU7lQbR+Pf8K5xApcKByzAHjk89vT2rstd8OTXEMMts3mXgQKy4wCM9fQYpmiaFLbQG4uLOVr5Xym9hsX3A74rSM4qGgNSctSNtNhhupb63BgRPLwqYbey87cnqxI5PStKW1htyLzylVZHAmjYElQ55x7ZNVdTjnBjjv4Fm0+CFmmMPUtnj5eoH+c1S0nWLJPtV1JG0dmUit0SVt+9AcN16kbganVovqRanrFy9//AGbaW0zQscS+QWUykcYVudoHANXLy7XQreB5EM17Mo8u3difLA9T7Vp3n2uzvVtIYhKxwsJT7sYx94/zqjH5F1ePZXccd5qapkSE4B/wxQmtNNB277lM3urX0y2ZItZn+djAvUH3Naul6ZBb2c0CyXBdmy8zEqWI4yKkg09rWSGaWQmfGw+USEA7DHoKtO7qgVmAdzgFQW4+vaolK+kSbdWUoLG/s3eK0SJ4WySxyWJ9ya1LC3ktbDyY4445HYlzsOMevfP41Tt9VR5riIQtHHbgbpZCMGo4tSgitWubzUd0E2dhxt2j0GOc1LUnuOPLHY1IUt7GJT5skzRqcAt1Pf2rHiMN3K8k9rFbsDwEkDE/72OhqWfUANP2R28ywzZWKSNOdv8AeO7p+NVYhawxwRxw7No3BzyWX1J9fYU4ruF07JFllmeEeWeXBIGcBR+NTWVi8cEkamVTuz5kjBt30waoq1zPJPCS/kIdwdMfN7Y+lWrZFuLZVliePZJuQtkE478UpXsLS5dOVjHIkdW+VyMjP0FY9zoBvrpbqado2B+ZUXAYVtTSo0bGKaIFARnOcfWqJzMrxeckzsuSxyAv0xURbWw2k9DK1KxGjWv2vTLKByp3O9wSdg9h61kWB/tzUA2piFoYkZjkYC+30ro5tPe4sp7TbOBK4LS7guCO4HpXL/ZnGrmxgu/JWHgPIQxc/QfyraDun3Dt0Keo/ZlHmxXy3BDFQq8gfTHT6GqlqLLz1+0wzyq2CAmFUj3/APrVuah4bm8pfs3kM64KjhOD1zVR9Mis7RPtd/Ckyk/KjbgPatFNNbkqy6DLFbS9lltHmeKN2HlxRA89euc4q41lPBdLF50MoUeXAt11X6YPIohhjinR7lleMrlWKAH65HJxUV4YYftEltIZpUAKho8hQPUnrQtWJvoiJbS+065UraRRTKv39uVUepxVC7NxPsL3ds4mYglFAz7ninibU7hvPDTl2wC20gY7fhR9kuheRzRCNow2BJJ90+oq9hpWeokV1DYXb28eHjJAJC4y2P5VSK4ucBXOW37lbLA4q+8UrX0xliXDHJIPB9Me1QTWv77YAxYngnkfic8URa6CbV7feQ/bYTMBd2scg+6GU7T+NK9xd28gjgtxCo6AJnP1YdaabCYBmaIKgzhtxIJHoetRvJOuFQusIUHLEnj609AUU/hL0VxfvCWZuVbOwj7wPUc9BVafTA10k2ZI0kyxUL8yHPfHal/s67vGDfboXOBzvJOMVBJbTwXwjikkOzGGBOM9zntSv2Y0tdGh76YJpnFvPuxn5WI3ZptxdsIls/s42qAFEg+b+dOmaKe5VnDu4HzyKcD6U5rt4gR5AYqBtkYBth+vpTEk9twi82wRsW7AuvJU5I/Cqk8bk+ZuVweW9QfcVpNDNLEUMiO7DLPHnnmq1sYlMhMCzBByc4K/hQnbUd/tFFIpANwViDwO9LH1cBGOOcjtVqB5IrpWhlLLkMVTjinvmJ2klLPDJnoT970NU276jul0I4zH8wBIfqAR/nNXIbuUKGRQxYDCZ5OPaqUReJlnjhVwAM99tPWeO6kZnZYMncjY3AEdQRUtdwcPIglaOZiZYFBzjC8VA+mxyviEMPr71cVodpYXimQd9pG786QymUkqCWGf9We9PW2gK8XozLm0+4gAJCEEdQelVS3UDILdfU1uGWSNg8mQ/Byy4B/CpJLFbkZa3wzZKtHjBpcyW5ftGviRg7yoAJ5pVcgdcdzzVx7AA4VxnocHIP4VWktXhYhs7egYDANUjROLCKQjBPIHap1uR3wB3OKqLG4bK8+nalbkjCnOelHXUXKjSjucqAq+9Wo70ggscnHY4rD3lWIYEHr7ipo5Cy8N6DBpkOn0N5nt5R0TIPHU/lSGOSEkH51xj5+30NZrSGMopfLcnANWI7krHlm4bqad+5k6ZdjkTOPQAc+v+NEoGVKsQDzjOTxTf3M0f3tkhxyB1pdzCM+Z0HdP5kUrdjKUeUlRg+TzkcgCmHaM4G4ZPU0BVdDtkXjoadJEzvjGccfKDUdTJ2SF+VlG8AnHc96Y6qpBBPGDmlEZDAMTk8YHSmhSJTn5uce1VcLNsU4EuASSffilG3zCuRwfpSR53naBzz/n1pxhUYcsVY8cnOTR5C+YMFWLJVjuJ47elAVicrw3sen1pwiTylU5JIyeelGx+SvX2phu7DDncckEj1PSgAE9l5z07fSlZG8wEZVu/GeaV4kEg+cZPr0pD0YijnIJYg4bng0I+xGbAxnGKEBGW2gL054pfLTgMSckdGwPrS8mFuqI/MVSW+YA9B2NI0p80HONvU9akcJtyASO+QTikAUrt43k8elPUfyIfM2IQeST26UmQDuwQw5GRxTiGIDDBz3xQoRyPm5B6Zzii4abpDcFt/TJ4AzTXJH3ec1LtO4qCMHkcdv61G3zEnoOyjpQn3HbuNOMFuBu70qkb8HhR2HWhhuG5c5z35pWyQGYcrwM4+tF+gyPgE/Ic+opxJVzxgDjNPK5VQ2c5OfelZVTHGRj360r3DRXuRg5DDOM9KKlJC4ZdpJ6DtiijQfyHHGV4zg5PfFGWGSuATyfXFIrLtGOuOjClLq3y5AH0zS0IsJ5g2lSASvAbqaTzGUK3C9fxpWQ7l3gFT2zTcMHB4K5IBI4oTK5NL2A5dnx0/OlLcbSOc8E8UuMH5ASVHJpNqkBzlV6cGi4W7gwLY4A685pV6EkHOOnoKQQsQSM89DjvQEcAHquOuPzpXFpa6BWA7AkjpmmlDkkseOCRUoj3KWAI7U5FI3YBAA6sKG2DSREYiSFC/LjOc03adzLtwcf5+lS7PlZlyx5H1pFVkPyglj1GaLlRaZGVYY42j1PBo2fIGwNvYjpT5FwwJ5I4JFJjcrHAGSMYHIpJk3VrDMBADjjGfX8ac6AjcCcjqMc0/cWYKp56Dn+lCxHBPJPcA0OXUSd2NZVA3ADcegJ/XFIhULI+TxgAYpzAEEFuFODTmUeWyjGPT1obG2myLAAyRwfTt70oHnKBluDj06UKqlSxG4r1GfSpfLOcDIBXJPp9KNhp2fqQK+3ooYHqadyc5GATwacF3BQvGTxnilcgKMkkHvjkUNom99ERfKxyCT3JApfcEjPIyacxCkc4OMc4NOWNScDbzxjpjFCv0KdupGCCuGwMdiacrqGIOcHoAKUxkEqcAEHJxyKSTKsAOTxgetNiT0uhVjwQx5JHIPJpd+1SCMBunt9aDGV5kOOMEk9BTZWLZCsBz93d1pCTjuOG9VA3Db6560FAp+bgYyAe5NIkU6qMqpUHHB5p7R4IyeBkjBNNlX102EGWx0yPUc0mwDI5xnp1pWRCpO47j25IqeO3cx48ztnDDFJk8yRXZBjG9iOuBSIEYncjKo7ir6QSnO1VDY25YHrQ8KpHiQKjHvn6+1PoHOZM0pR5c4ZWAAAPA57e9U5IzJ97J9MDJ5qxO2XfLZIwFPtzVfYMEZwcgVWjOlaJNaClzbIAvDdR61Kn2e4Kb3CHoQ2cfnTEVG+SY4Qnh+60x7GZN4Vd8YGdy80bboq8WtXY1JIzY2W+3+Z85R152iq1lc3ksnlTmV45Ac5qVTNDYKkZ+bnAzio7a7vZTtkyYxwykYBotrYiLeu36iRiytCwjk3SNlQ/wDdNSpAzIoBJCnJYnC4PvVY2CtM53DYvzZHpVt2SYeWSwTjbzxRsht66MvrsRB9mYFMctg/N6j86tRo4svNLBJgAT0+UVQtiwTZDt4yRuH3QB1pjK4jd52DKSPlU46cZrOSJSu22aExWEW/lhs7csDgnpnkVAiFYmiIA4AJHfuRUrStcytLDGp4KgjqwwOo9BT23y2gECgOXxgD3wanbchSs7WsRyRfZ0iCqfmUngZC/wCJFMnlH2yOQgrhQSD3qyptXla1in6Icu+Rzn0PQ4GKoSOrtBK+QmSp2n8h7E0rs1XmaWmJNGk5ycYwNoy3rj6/zrSttaFqwhWZnwwyShPXrx2rIAhuAfs24uhB5zl8dP51oTm8lsn+xTMkoC7lRyMJg8571TV9wSu7nRQa99qdbeGTBaTaxIwQPWtuK4SQ4XqnC5ri/wC1DE1jYakiuWgQrdg/OpY4yGHUDjNaFlO9rdyxzSbm3bOc9uhHqCOaylDTQtVGtzfTTI4r24vIyd9wF8xW5BK9K5bxPZST6hBZgxrGkbPHFEh45yTgd66mXzJIJJYJGD+UwCjoTjg+ua8zvdRvrpreO4Lb4I/KA5BPqSTzk06KcpXuOfLa3c7xNTkk0OLUEUibC27rONu1hwHP1rIg8OxPHHIwlF0ZcyT7yN+Tk7RnpU9pKtxfy2sJRYLu0ErsGLAyjG1uegBH41VuNNla/g2pJIG/eTzBiFTHVV9KcfLQUryOjmlaOJy6FyE+4nLGsR7jU5rLyLRPs07yYIJ+4vr9akttXt5hczxsUeNsMjNkr6EAUk+vwwJbymCXZO2N5XGMd8VKi10CTT1vYsxRubGSDzkMqriRmUHPua51NCv1kiaOBn3ncNwzt/2j/hU+qavJJZAx20kSSucuDgkL/KrGn+IpL6eGxEDKXB3Nk5AxweKtc8VdEvlk9TZlla3090nlaYDKsxHJPp/+qqVrFH5CrHPHG7HhWGWGeoB7VPc6R9qlhuTdMiRRkbSMjI/iHvVVzbxJGxu/MiXoFTJz71mrW0ZTbW5chsjbqwjuiCON3BIpZrKaS3WEXpSPJ3cYLfjUU+pLFPFHHbSSK+NzDgLnuc1Hqz6hGR9is0mQIdzk9PYDOaFzXE7bE8GjJa2z7SZpP77j9MDtWZc3mqL5yQrFBDBgGVx98+2f5UkWttYW73GqReVcSfLDAi5O3354qKOCz164tWmvVG7LGzXrkdarXVy1BJMj8LG8l1OSea5LxImZAzk4yeDg1fu7PS7dpNSgsbiacHeBGDgse/8AWrMVglndz/ZLKXeYuPm/d+y+5qtYWWstbyNq10YoJEOYlYbh7gjpScrtyuCvbYxLaz1HU3kFve3DouPOE/y4PpmmXWi2WiQfbrmdriRjiJBGCu/1PPODWvP4ftbvT0WwvWEMnzM5O7zPrUlxZrpemrZafALidgcliPlH9454/Cnza7jT3MawmE+lyXUjBJ8lRI6Y3H/CqomaDLSzyzSHky2yfIOOjetZA8zzGinZk55DZx154q5bS3pdXtJDHEh+UMcJ/wDX+la2sS1fQ1Le7urjFtfpGok4XA2lh6YqvLqwhumszCgsk/dkY+YD6j3qzdQwajBHP5kfmKApkBPB70yytbC0Bmd4JjnHmOeh+h70lawlJO7ZC92r20s5i2xbtkbqp6jsf89qrWOnwXAR5JyskYG7gHPuKt6zDJLFCtu/ylt3l/d2gcms5IBdu2x3UqSX2A7uPbvTW2g09NGWPtMckgtoD5y7znPHHt6iq09+LSbyfLaRc4KvwpHtTnt3tLZmthNM7jbuaLay574/Ss7ErBo3LylD9w+nfmqVhKN7MkvI4wYZYgYyw+51Axx1p9qZkt5l3FnkyFA5bn3qR7eKWOP9xOsRPAJ3EfjVdUWC4b5XjGcAqcn/AOvTT0C6ej/ESyR4WaOREZD99m6j8atQ21ujtIzmRCp2ADIPp0/Wqd1MVwikgYB+bq3PpR50YhjKeYsozkIdoxSaG1J6osJqxjlaONE8s8rxzjvT7RYfMuBEk7iTPJXj6GqNvaZjM0pIHXpuJrQZ2hiUxLmJxkMoJx6cCk7fZCUdLFWxVY7gkv5YwcMo6H0q6wOoRTCJwGHO0nA/WqRuY1GAWDdOTzUkqLFAwQt5pIAfOWptahZvfQrQXEtu53AZyR05FWh+9wxhRd+cMy4BqvOrwmNpiHPGBjpj+dN+2SZAVVbGd0f8P4elO3VA48y7kz6bBa/vJJPNTnhATg/yqCAQhsQNKW3Agg8Cp/MtmgfypDbS9WjPzI34GrFveCP90I0LMP3bRnAb1o6DvJJkN4YfLxPIjtngq2fwI7VDGxgt5GhcbD6nOfp71VkBluyFjMZc/dH+NaNqYgpWWMFEGWjdc5+h6g03ZaE6pXK5uMZXcoJHYc5+tTIFYsxffx93GQf8KnvvsxkHk5VcchNvA+lUPKkt2DvHmJhwT6++O9SkGjEmtI2RmOY89AB0NUpbOUY2sWGRyBWj5jhg0QGPQ96ezKH3NGfm4JDUr22Li2tTKfYQy3EWH6ggYJ+vrVcqcjy2H19K3f3MyHepxj5d9QXGnQEBoidrds521XMupcZbX0MkEKSfm3DpUkUjDdnOOhwKlaBlzwdvTpxQsEDkAM0bEfUUX0G5JoclwASd3PHUVaS6+bOVxn+EVRls5YzkfOnfbUaSEEAD5h+dWn1E0mba7XAaJtr5wcEYNSLdsMB8x84z1BrIScoeG/Srcd5uQK+ML7c01Z7mMqV90aizgDBHB6EHoKid+STux0HpVeMg48skknJXGKkdVYja+eOp7GptYwdO2vcsJJGo+906DGRTSwd2Jx0/Oodh39OAMFiKUbVPIB+nGKCfwJDIFyvJH14/OnCUKdqk5KgHgc/jUK/MzZBAPfFBA6ZxjpT6iWhO0qFPlchscrjufeml1KjeQe5IP5U1VYLuUNkdsUoiyo4ABGcdKWoSJVwwGN2MZHTFNkyCwX5vqOgoAH3jnkYHFODjOFX5evSnZoHvcac5AJODggEcGmvHkAlgSvGG44pXfJGSQoJ/CgkMMLk9xx/Olaw3rqhnkySIAgUAc9e1KisqjAAwec4p2/AKlcqMjI4p28lEYxk8HB9RQ0g21REVOcbDkdSTmomUFcg4BPb/AAq5vIBURhiOScdaZ5gDgGFWIPTr+FGoN7FRVBXvuB6dhT1iLZxj6Zq4DC5J8oKc4GOOajlG0jJyp9OxqdRO9yAI6kDAwCMUc5LZ5A6GpWjY4UAluuKjdFXJJ5PXmp1ZSdnci2gkHBxnJA7UVIIyqD27H3oqhN6igqVA3ksOeRgfhR8gYDg+p9K0VsLcucO7t90AfrUT2ShwEcKfVj0+tK7uHMr+RSc5KKvPc47ZpC5DEMOO1WpLG4XJBDDodpqKRMAqytkdAaV0gSTImxuxg9jnFPA+XOc5444+hpgYqBww3d6XlAoJyMc44oewyZNgTPzb93BPoO9NIaNmBzj+HHeoXfna3AHt0qRYy6qd4Ge5zTtpcLO9iQsQBvQHj5cH9KSKZHZoy6qM52g8e9OWMKwLOCWHf/PFPxGNwCDkdm4pWE2mI8SrnY52+hprBAHkLnPIJyMn8Ke83Dr5alehz6GoN/ygKMrkZwOT+NO/YXK+oZIk+U5XGDxz0pCxXMfPqO1Pb5QrjJb/AGhj6U0vtOXJU9hSKtfcjRTuDg4yf1pWAGPlJPXIpA5GeQFxj6GnhUcArkp9eaFcHqrtjC+Ny8AY546U5QVj4AwOckgZpdq7evXOBmlTe23I3dMDPFJBeytYdHtSDG1iWHzc9qVT+6baoVm46nJ7/hTGQbjs455yfzqFizYJUgbcDnv609Ngsrk4MhRV42g8/SmFVKMFY7z0bHb0qMEAehz1NGQXVcZAH+fxo5rDSsSJMEIAYkk8nGePWnvKCyt2IAJA4qLeSm3PXkGnMNxC7s445OQKLi5dBwfLDJGDyaR5EKhEjwQOSDyajR43fYSN3sMZp+TkquGGeCRxmj0Go8r1JMecnl4U4554OPr3qRGRIhsUboyQDjP51CHGNpfaD1GKkWdY1BBII70bj9ERkEQ71bAIyVU9ce1KZCUOQcgjHr+NI0iyuQo+/gccCmDcucthR6DnFMhWLCRORu3Zx1CnkD6VOkUqtG7KHiVs/wC1+PtUCHY+ThiT3NPN18zKANo6H0GaBPoy9LOwh/dyZAwAGGf8mq28yuTJGrkZOfT2qLzQmdoDY/rTwyiUg/Mw5Xd1NFhWe7KM0DuzMiZXoMDqaY1g8CMXibawB3EVpC4kXcqMC+OQRn8qQuqRl3QuXHAZqWqNlUaVuhlNBGyn5gMjPTGKhyV/icn1XvWlLAAuVYgHsR1PpVUA9WIyOTkUXaLU1LqRpLIr5CsB6ZqSKcDO0svPzEjmjbk5Ee5hyRUwYeWM7wQOR0p8yY15r8xBDG2QD8uMgg459akm2xwR7SGZSAcHOB60iuyqedw4A2n0phkVSzkkEdFPUj60m7j9577DEmfBRXbkjAXoaR5c7gABn1Gc+/tSBxHJkAAEnt1zUTsUY8ZA45FIpWsaCzSJgJIdpXAwM8nrV1ZGtrZF8oOG+dpMnPB5WstcfuyrEjOC3cVJJNIEYEsEZj/HwfSh7WIlDXU1SLeO9mkbDSzoHVt5Cp689+1UruFljWIFh8y544HvUb3KTIQy7JxgkjkH/CrFyr29uXTLRvg7lHA77TUWsP3073J7S2hjTMkTTzBiq+gxxn2rQsDHNcKtyqRyLG3CoRhRwc9jmqOlyGeOWFYfMDKQ6t0bv17AcVsW9tHdJGBmO4ibcFGWBB7+pxT23Kb1sW47aHyvKWCNzbwFYHwcEAcD888dqhsp3vLKC4uU2XCZRlAI3L649jj8Cati4eW3EkCiN4/9auc7D1I49aa0U661b34nU2S2wDkqAPU59M1F+4tDW02aaaSJhMixx7lkTGST6g9q47xPZ3FrrU8s7M8crb1lK8EenHcV01iybllgJZJBlc916D8ulal1bw6laGCeESAHKgnoR/KoUuSVyrNxsc/otig0uK7UJLMy7o5MFSP9k+2auSRxSXP2t7tY1Zdk0O4lWfpgN0HuMVpSxHTLBIbVUeRBtK527Bjt71QWBY4tgC46knHX+VCl1DbRmC2jT/a8RNaxKWLIiOu8fQHrWtHp8VoiSfvyIASu9uZGPr6067skuYZdyqHKFVfPODWfY2F/ZpFG88E8CL80EuWDN26/dI9R+VacyktWStChqkFxcqwCSyPC2ZUDALGGH3VHeuj0fTorXTdyxNBdTrubf85U9vyqOOK0g2zR7Y1kl3PvXzRv9j9e5rZtoh5qTxSGZZDzLt3ZHpnsKmbutCox1M26lW3spbRrhrm7C5OF+Y5PHA6VHNbR2NoiwbGuyMpGfX0q3fy2WkpNcOoM8jEbcEl3ABHTnvWKttrs91NL9uihlnTKqFPC+uOxpRV1fYLa67/1+JC1zd6RI/nQI4/1shaTknHao5deS/sI5op/ss7uVwjFtoHrgdKn1bSLW6itpZNSWKONfKY7txkbtz65q1axDR4rXSUtElSQGS5lkIAx9O/YVWm9tRbKxz0utt/ZxeVVuLqdivmPH8qr6r71b8J6c5lN9LiPAZYgwwSSOo9hW3deQweDNgqxMPKVRlkyOeOxqqJJZGFvp+pxRyQgGRWj3YBPGDTveNloNXTLWiWV1YRyx3U3mPK24vvP9au4VVKMSFBOSzZzWTaXJvdXkZ7KdfIG0TyOQp+g96L69eySaaJHvBkDywDhWzzyP5VDi3LzFeyJtY+wCxb7Z+7tTgO6Erg9gMVlwW8Mgubm1vGzOoELyuQMAd/pVS+8R3V0y28MSxgjEyuAcH0GadaaubnS7m0mKG6YlYwflwuOp9KtRklYHYqakk9vaw24u0uLiUg793zAf4GqUE90si2qoryo5YgjOaTTElshLdLF5/lsI0UNlSx/nVvVblxfwJFJ5JeMLJwPkJ681dugJX0sQ/a7i6uFjtRFFEvBVOQc0++gtYpbYXCbQTn5cYP1FWWtYLOP7PHCJZSgy7DofwqpcWEj3dtbzo3EZcvEeCc9Ofyo5hNpvQvXDulpNmNY12/fz3rJikW3kM4P78ZKhc/Mfr0NTajIzumxpAoGXjfnp0NFrp8Dwi5e9KSY3MkRG45747U0rIFH3bmnZG7kt/NWNHd+THkjb9aym0mAyvPLOtsjN/qmYFwc8/h6Usd0I/Mis7meYPw5fnP51Fb6XOLhJpo0WHB3GTG3j1otZO4K1+xJJLDFF9kt4TPAh3GR+NvtVeBlkJmD+XHEw2p13LWhNa20lq7uqWkBYbSpPznHpmooruKG2k8jcyIBtyCOOnSi+lkhbaoyruVridi6hUBIAAzikjVXt/3UDblPUqDk+1WJr2S4xmNFBGHIHWq0TlmMrblUDAGec9quxXLboWVmdYgfIy4655//AFU2K8lMqF0ZRjgKp/SoLT7VKzz7v3anB+bCj8+tSCWKRB5cirMPlO9uCO2P/rUrdiORLdXJZbaaSYNLtePGV3rgjPTPSs0Okt0pkzkNjdk1fXUMXgjWQuGwGbGQv0zUN19ga8ZGL/Ko2uBgZ96avqi0mnZ6kdzCLd282dWJ/u88dc1YaJYo3lilWVQQUOM8Y6VQVTIWACx89SeMVZtVy3kqVBJ5LLjim3oDWg1Wg8xJHyrA5bIyPrVuVLUztcRiNoSpKoSPSs4203mN5zELn6k+4FNtnWNmR1DRt/eXOcdKGle4N3WjL3mLcQttssRwjlc4P/1qru7zDzPmSAEKNxzjjjPvUghvwB5R3A4+6clQetVms7ne0aB2G7aTjAJxSVkCcW9xcRl9g+ZRwO1W44zLECvzSdCpY4cf41VtVlaKUxlGZOqEZPuRVqF0OkOhDrJuJ+UAED1OaT1Y9SSWyYRSTqojj/ubt2T7GqXmLDOAdyj2qdNRntoWgkhV1Yc7uTyOv1qONllVbZDlg3yNnB96ettRWfRD8tNH+7IV1/hIxkU+Ft4LS/IycE4yD9ajVJkd0DEuufY+9E0huFZflDZywUY3cVO4a/InkCoRLGVb2HHWqzQwzybVjCn0HGDUIXa2AAG6ZHSpA7GRRLgnHDMMj8+1FrIb3GNbTWu1o5FwfQ4prJFI2biLBPdDyDVh5oxgI2GPoc1DJISWj+Qjru2YzVa9RR2s9yE2Ksf3U5J4wMc/pUEtvcW4DSRsB0zjNWAAHJRioFSxXbxIyAq6k45HIPrmmrpl8zV7aleO6AIIyO4q5Hcow2knpxgdDULG1lzvG3d0K1E8DRfPCVdeSCODTi7ak8sZPXQ0yWYDD4HtSbm3DBwQeMfrWbFcmMkZ+buMVoxXuCC304GDTuZuDROG83JYbvcGnpsRizBSAeFxyPamfaMuecY5BJ4H1/WgnzAuzaXbrjrRYyd1qyQS8YVcjHJ6HIoEhBIGeT2qLbg4U8HrzQTlT82enWhk77ErZdtwPIPGOgoyVPChTweO9RqcSAowLA8c1KZWdiPXjjvSBxdhkilD94jPOM8GnCMBVPOPc4xTCflOVycfXilTDAMCB/LP0pNsGkyQAu3BADdcCpgI4UClyMrx0z+tVgWUk8ZOeR0pkjySELvDZ5yBQEbjw/loSFPXKginxRBm2hlAI3Et16+tVmuXIaNmJGMc9vSmIzRgneSOw9aTuxchdn2LIVBA9scf41Td2UAjJHTOcUNkyMQD14+tOG9lZmIPcjpR6FrsMDkqOobOD6mkZ/kzkE5yc8UgwpJySPqc0pX5BxgE8k0MGk9SaGUAMMqO/wD+qioVAK/K3yg4+tFAuVf1c6KNVVNpIXI6Ic//AKqrzwxidNz5IHQDJ57U6Uny/lk+cY3EkY+lKpSViO6gEsp6n6VDuZre4kaHYGa4PydRkcVIHRU2od7EfwLnNC7dpwdg5IAOKqTPlAUZsowJx0z+FV5MaTuh8lsLgYXao53EjbgfSq0tlNGhYDK9gSKmlufNO5Vdj0AJ5HrioJpXYdTkZGe2PX2qWlcIpr4SBgMg+Ww6ZOOAaeo6gBOuQD3ppkO/9534IzQR0kDYPQUXtsN6O1xyqVbOVLA5IByfypwlbJXG3b3I5oOwQsxIySQOKaOdof5uCOKm43Jrp+QjE5GTn120qsR82NnHy89+9Kq/OzEHjG3t+tPYvIxjdkKg54prUlWvqR7XkLADty3rT1G4AOMKDwwOc+1JLGwL/MQcAEse3bFSho5Iip3dODRdPYGV2iKDAVsE8A0wp5YY9DnkGrIMZYghhgZG3jH506RRvCMpDHJDdgKENvuUVZmbO0kZPQZqQpI33VJycYJx+NXVjURKQxLjHft6UhUyRCTeSgIBOB1p6W1E5a3XQqPC+BuJAXlhk80ioSoPO0Hsask+ZkM5ZRz8wpg8kKwOVG3I7c0rroVtqQGDcnOAw6g9v/r01zvAVVGR0wecVKgMk24cM3foMUoYxyxbFDFiR1Bx7UaDVmIoWNThOSuTk5/Kk8vcoA5HbkDP5VaYMsWx4yTgncpHTpVceXtC7iqj24I69aL30Ji30GMrAFUUhsYYgUxFWJQuCXJ4zUplVmUqueM+n40B0yScDDYIByfc0FRb2sMXl8sMg9OOtIyYB+QgYycnn/PtU0TLswrHb9cmmM4ZgEQYHGScU2+glcj2MFzyCRxxnA70km0YUoxJ4GODU+35BnO7oR1+lPHdCdoYY/Oi6KbatcrR7/8AVjPBxgnr6U+TjhhnkHin4VXUjCtkjI/ixS4H8B3YHLU733FdPVIRCO2eec9MGnGIsygBSfQHPBqusyLuLBsE4w1OZ4omBQYyPXrTt2BppeZKAw+Vc7iPXp7VLAXkBYqeD82e4FQRyIGbJGX6cdavQyIq7SQxPHBIB96GmF7LXYY7PKVKFQgz/D0FV5lIRSQpHbA5q+zReWxj4LZChcdemTmoZ40RsbcY4wcc1PUbkt7Gbjdz39M96X5wW446fe5qeQIojLYznn0qEqPnKkEA/nRYcZ6CEu244XGc4Haonjkf7gGfY4qdHEfJzu6HvmnpswcnJHJHc01BXKlUkV/IuQFOQ3zdc9aX7LNksqdTkgnoauFiSNoBOOw61Mo3ZzySM+go5ROs3sURHLuO5AGHHy9jUbAuGD5wOxPWr4AZy4288n0zUbAODuBGOOBkUrWDncviKYaT5ZAVKj5SPapzM7QpGMiNSxwDzTmgZjx1I5wOuKls9Nkvi6yMbeNAxaR144/yKnY0VpaGlZS/Z9OANs0gkAY7uh98DuMda10upbG4Z7ht0Jj81CxyWXAzgelV47CWxtLYRSrIr5DAk/MCM8emK040huLBEUpJciGRIgp6gEfp04qW0Gu/UfJLDbSW90so8m4XacDjJ6H9KkFqpmuonSSSC6jwyLzs77seh/Tms2123OmXFq6K88QD4jJP+9gevWr1vIJ7e2kjmV2ixvd1OQp6cjkc8E1EtB31/r5j9NgtYrJ4Wuz+7kMiuTho1wAcg9vrWjBObbUDazlc7fMUq2QwrHS7knvvsN67QXD58tXxz6D/AGl/MVbt7izvbGSKzO67swwaAjDKv8Sr647Ck1d6jTNGW7gyPOZVdzhc8EmqN/bxXUL2zA4cHn096zE1mJ1Vl2uo4GRkirK6pG2Sw4PoelLla1RDmpbmXp+mavp0uFuYJYC43I4JGPb0rVurgRiT960LsuEfblFbt7dfWmieGXiJm3DnriquoRx3Vo8MhYEnKnJADDkE47Zq73d2O5Z0KTWEV4b6FDhl2ySEHI7gY/rWvb308drLcRwmR5JXEYRcYUcAkZ56Vx1lqN/GzRyPHKsiiIZJGT03AfTP1rpYViBthFdyiKJQI0RsAgDHPr605LW7KjJ7oqeIb3y7PeLaG4WFtzyTHYY34yBjBJwe3pUsOLrSllvojAHUZY3JOR7t1H0qbV4Yb60EckDXTY+RNxCg+pI6YrKTw5BLpy2Jun8xcuUWTcAx9R6DFCasrlX1fUgngh0ydo7LLwSrhNiFgjHuW55oa9tRcbHutQuWVdhMaoFdeoB74q1p2m6fYlfLvW8wDDMk3ys/+7nqPeqH9oW+n61cI1qJ7gYC3aDAU4/iXp+VaJ3JauyzbaWdRiaadjZxKD5ccZxs4z178d/5VRhtoLW3jEdxcyRpISXtuQ5HvitO5me9sUYXkaStHyELLuAPZT0rOEN5aWzmQPuSP5DDICM+4oV+rFboizZW+2Ce803UJHaVtrG4BGPXg96W21+JpXtfPaFGUjzSMHI7+1VbLUboRiMYlJ5VpEOEb1J6Gs+9V2nywijlbkuqEA570ct7pgmlaxYurTR4ftM7PcspcBcDAPGeD3rPmjeG1Evl8SAsCvOBVuRZrexeF5VuVkxIzMCQnXHJ71VMt3dWqWyykqrfKo4x3wapE7joBfWMalWmiV0YoE6H3xVbyAsLTzKZHLAhyTkHvmryl7J2trwyuuw+Xtf5D3qmJpL0xwpIiRdAMkLTsFuw+3idrkXsTyttOZ3bjr/CMdqs3tnNezIEuWVYlzH82SfqfWqAQI1xGl0hUrho0BIbHbNWbeExzZeZowVGWddw+gpba3Kd9xwhQCW4+bdGANrHIY9yfrUNvewxTTOxmtHddqqqBwPz5NXoZ/sgvIJWjliVgQ7AqSeuPfp+NTTGzuLAi7ihS+iYoikFMjGRn1GKXlYUd9dSrHcy3kAsWjhgBPMvlgMx7dPamywXGnmWCWV4klODIBuVwOmRVu2sptQUN9oKeT95Jl2hY/XIFRwzS6haz20ST3RQFt6tkbffPamVrexV1BpZoLeBirllDiRV6knpiqLGS1YIy7XPIDLgkemK1LDTpp9SFtEYIXiQOBcvhSRz97oKL6Y6rdOZxBD5QODGC3T3HXP5Uk+gtLf1/wAMQfZ9Plha4k/dP1kEX+HQVnXckEqxeSrhlXaxyMH3+taMc8tnbpHb25VXBMjyJ98en4VSktI2CSQwiLccbQSR7nmmrBaz8igW2KF5IPI3dPyFOaKV4y/lK+T/AA1MXK7kVmBHbGc/gaIIp5BIBFIkiklSDj86pspJ2IpISJCGidGZc465NRwQF25kVUB74/SrTFlSZXkLSYDHBJFUkCvuCxuMkksvOf8ACnrYE9RwaNJ2BbKKDhgMZzTHLNmQuFYDhRxkdKleOIyDA27BkjPU0krwkFMHb1B9TTsO5GUPDFySvUY/zmpWlX7GY0PzBtxXkEU2NCY1MYbeBye2Kl82FY/NABlOQyseMYxS3YnsQQ+YzrGWwr8MvOcVOyXkTNkzCIdCDkEdqitwWj89F3eW2duamnuVuJUcjBPVVJ5o6ivzSGrNfRHy0QsjfxbAeKIi5m2SMYA/BdY+o9/apGuGeVmjEm4DAIbO3seKbZxNcXRilkbevO7dyPYUbIUfdWqsQSY5R8FhwGXqatLbXAnKq2R8rlBINzD29TTJk+zKymNjuclS3Qjv071LbWxYBpG2/wB1sfmCBzRJF8yeowxk3DOHkfnAMw6j3pheNuFASQNnI5FaUssck2ZNryYwCybOPp3pkhk6wmGJMciMZ3e/NNp9SU2mtClGs0jFo1JYA54GPwz/ACqTaZMNIArE/wAXcUoDhXgd5XLHIwMrn1B+lVzauoJVRg9NpzmiyYXte5J5UCQs4QGRTztIK9f0qFsbxs2hSf4jmpVt3ZsRoFPDDPekeC5B8xo9xJ7AkH8qVkL5kbxR52nAw3OOh9KFaIYj2gDuwHNOSRBN/dcj+Fcj8QaYZotjeVtLMc8r0Psaq1x+Qr2ZHy+XnnPHUfWmGLa/yuc+lTQyCQ+SUBY/dbHT/JqSPTZm3Mzxr6YOahtLcLyvuUJNzfK8WQeN4NVssHIByD0rbFn8mHKZHII4qF7GKWXriPbnjuaFNBzx+RRWdzwzEk9KkE5GNjYPfBzUNxatauV5KHoT39qiyeowBjPAqtS0k9UasV4WZRIPoR/OrWFK5Vvl6A4/zisRZGxhhjA6+tWoLkxYK5b6mldmc6fU0SC3DLj0yOT+NGCh4PXsR09uajSeJlGSUZRznpn+lTFWQnOcEcjHB96XkYSTWjGhSD19fanAogyMnoM46UrZxnKgYHA9KUqzYZiQOwP+NDfclK+o1wGGc59Np4pgAGDyx9M8ilzsO3ADc5J4/wD1UJuJJ4U5Jznv7UXsNIUxDb83J6jNJ8rn5Uxt4AIp2CYyfL6HBOf0+tAG08sAD6f4Ubg72Q2JFJIbORwcmmtkn5RjngZ4FShwvAXco4x7U4RhUAYLjOcY5xRzWC/YqsWB5zj+E9cUqwgY3AjB6k1OY2kQrtyOSMVEEKYwuMdj/wDWqWLmuIqEuV3AgnIzng0U7PmEHGBjIGe1FTd9w5u5ZRnUFiwbjjJGM/SmFljCrMS4zltp6++akzCYnyqFs5wynqO9REESM+QAR91qd1cLeRPHcRyAiVHWKMcA8n8aYJEG2OIlA5OM4wAe1RBFb51kBcnAFRqVJZcEHPOSPzo5lsOWpOqtG24SboupBbFRyTh3/doTnnOeMdOKPlVyu8biOOaYjOMFsE5PXrSXYEr+Y9mw2JSyZ5zjr/nimqGVFG7g5IBx1pzgsuQUDMARg8/SkjRw2PlB4yGPBoBbFyJ4pYASyxuBgDZ8v5/1qCKVEcxtgkH5WXpSbDwdwBOTnHApgVsEbfmz1x+tGlyU0y1FBBLKElkaNyDkn5ue3+elOnt4YyscUol+XnA6noaosSFG4fKQOT6UrEFywGMDs1Ta4cupLtAYxld7Dnk9vrQG3SEbgCDwB+tAlJj8vYNwGcE8mkbyUjOcyOTwuOn1odx2sSKdqZyOVyQOcmmb2BUnLEnBqBWeJ9h5x0yeBT+mMFSw5JHrRcIxsSKyBSWV2kfsDjbTDIFUIc59T0/L9KRXEibVXDDpzzj05oAZgqbflLZORRcHZ6XHoFZt/mjzAcgGl8wNK3mhmUk9MYJ+ppZIWKO0ex17lBg/lUMSnYC3JXnlcClcFrfUkSUrGFLfKDjAwc/U0rOiHbGgJ/v571E0byMpY9ehHTFRFmJ3Dd977w9fWqv1Go30LTFtrZBweu7jFRMUUHG4jIPBwMelMfzEUL3dcgseadI0rIMMyn+INjBHbmnzDtfb+vuFzlRtXoOaWKEzIPkxzgZBqJjhcOAxBzw3Bq0blcJsbAx64P4ChNdBNP5iCBYpAkrct90jsaeLVT91hnptI6Hv9ainnEituUZ/hPQA59/akNzvk3ADcQDnsMdKNwta3QeYgGySdvYEYyfb1pyrv5Lg8YB9M+tVnuWZ1LklVbOGNIZwRyfl5xmhpWKimnpoS/Z1K7t5yD0xn8aZMoBXBbB6g8DP4VGmRjozHnC9/SpWPKDdjbzk8H8qLgo2K0oMjRgvk59OgqUnOQVxj0HQU/ziQEUENnAYjgUoxEyofnJycHIB96LlN9F+ZWdWTByQOxHTFSwsQdzOFKDK88n2qTeFAEFAvr8YG3Dfw+poK+Yp4CgDOAc4p3ZKktRVuWcjA5B3DuBTzKCxdjuLHJAHFQvCyxCSKQ7TyOME+tIC25mByp4Oe5xTTG7P1JS/mclcD0PemkYBAI3Zzz3puQUCtke1KQNgUZJAzyMGghK/qKFHJBHJ5P8AnpTwgwMMGBPSmx4DYCY9s1fsrJ7nc6ARw5G6QjIX6epovYrRrX9SNQgPJP1PNPjgmcr5as/GBtXOa6C0t7G0jDSowb+Fpk4I/lk+1XpLVJD5gmlCYygRtqr+PtSchqDavfU5WTTbk4LW7KM854/SlGmzsHZsInHBGDjsRXVWaW0l39nV3LHPKAsCw9SRimOLYZ+0S3ELFvlUrnt7UuaWxaprdMyrfT7dWRt7mUEtu25yPoPf8a0ljje6LqrKzH5sklScdh9auWEcEtxuDGTIOdyY/UHGaikimiaTnIXkYGfpUNu9iuXQrxQzQxiKPapVQU+UYB53Z9v8aqTXwsmguREkUIzhAdxz0Zf0605tUk80M1s+4qU3bsZ/DpVS0xdzPaEBEnRYsMc4P94e/wBKfI92hN3asT3WbDU4JrFrZEn2yCSQkFskZXPf9KtjUI0uLqFxF5MjGP7Qh2qD12k9M89e9U9Vlt9LnTT7qRL+O2yxglBjGTgAZGc45NYdzeMVjDDBk3bxnrjgceo7UowursJN3sdDcaw1iVgvLeORGc8OQdu3j5T29cisq7uf7J1qPU7OdpEm/eBiBnHdT7j9c1QaYNEYi3mRn5lyMEMO+PTFQs+yNULbguCOMY9c1XICk7l7VZVS5W/sSTZ3POwH7jd1P49PY1FBq22Py2XavbkYBqkJCqsoAkQnO0HjPr9ailUKMowOT0xyB9Kbj0C3MtjdttRQsrHjjAI/SrzXUcvzCTjrg1x6M/3VPQ5yD0qZbqSMcH7pAAFTZC9m7XR1kFpA063j5WTfyzEHj0/KuihMcK79mNwAGOmO1ebJfzDD7mCg8c8datw65cIFUv0PXP5VLi2JXR2s73txK0cM32KAMPnA3O/POPT8qin0iGCWW902ONb8DCmR+DnqT6n61zS+J7kY3EuR7VKniuQD5lUA4wQtL3i9zf0vQvsk7313KktzIPn2RgAZHIH86qa9btZaU62beSkRMhXH3uc4z1qhH4oCr865PtxWXqd++pyOXupUh2/LEOVP1qldyux3i9zUhDXdx5sNx5QCKoV03IzEf/XpZLGSGZPtxkSaZ8I9v2+uKztMuvJRQHiEmAC7KCcD2/KrNzKLuJlfUo364Vh1P4Vd13FJ69gubqG3uDDFPJLtTGwHOHHc9qiEF1PB5luFnGTli3P0warQHzJooruGEQ9C8Rxitqya1geUGTbbBSsQHPXvTbtsTJWsrlWaylwsjRTIwUb1DY49qqzy+WiSxy7ty8qTuOe/PrVgzXF1MIoLxSAp8vKlcj0J9aohxZJJFd2bKZOVIxx75pxuLV+ZZCpshWSLaZGPzKzLx346VWlW0Qb9vlqASQrgk++KeuqmRFjklxt67hnP40xrNZgohR5C480N32/Sn6j1uV5PsmP3KyMgIDMWHIPoKuRxWzPHbR+a8YO7b5gyCf1xTUs5luIri2ItwOxIbnuB/hViwspYrh5nOZ8EhVUd+uBScrIeltxs01k6I20yK/8AGZCcMOxFRSurs7XNqrSRKANpKuM4xz6VoyWUYu9yW4Ab5mOTjPfinX1jLcOjQGMkDPIxx/dJNCmriuktDMWWO5UJFeXce5vmVjkemDjGRW1pNhfws0UcqJZEgyGPl9o7Z61Qn0iVII3hR9+QHDKFwemBjtzWrZWdxDqZ2QkuiZSKYYyp4J9M/wA6mTuty7q5WTT1e4mZoJjZqGwqrsKE8YJbHrViaLRbKxe1lhnWVByyxnLN9ema6SQzw2SgKjlBscSDgg9PXoePxrLv4Lt9PGLW0mUPgoYgShxx0rO99WO1jjJbuewMijz5oZBhfNbGPfAqjbtIbpJ5gZUd8MDnGPU1rzSLCNs1jBKFYr5a5DL/APWzmqsN5DsLqo+Uj5FyNo/rW+tiNdXYr3fkJdSBSgGBtMTlhn6n+VRyGIQffZZFG7KvwefTFXopI7h1jiht2LAsGICn8f8APNOlSKW1WWKODzBu3RqvOB79jR1B2S1RkMhncTSZjXABYDGafHmFWSNZAhG47fXpx61MVSZGzbqUXvtI/lUcMKyuw8nbnJUgnGe1F2NtL5EZtGYsYwuxsKC7jIzUiIYXMQMbeWBlcg9etKFMk7RiJWk4IZsdPemN9qgd41VFPI+6OnsaPUak3oQ+YySuodBgfLtO8YNRCEOTGVPdjgH5vpVny5nTynZUKtjaOMj60z99EhQTyBs59R9Dmq5kwTbI/ImjX90rKCM9eDUcYMUe2SEc8KzninSOSnmrJyD83XrU8DySW4R0QoQQD6Uc2gLmSuN23DusjlVB4BjHU9O1KGij5dZsjrzgj6Gjzo1txFtGwdt3f1FXIWt5FHmQIdvR1zx9c0PQV9bdBiPbGPDnD/eBXr9aqNKN+6ORmbPXPU1ZWOKKX93CJuuUkGeR6EVBLflm2QDyU6MiHAY+tNOwuW7vb7xrXJlCnzcqDgFjmpoipL5kVGHRSu4H/CoXmtYwjuqSsAMoBjP1Iqr5xSZiq7BngA9KG9CrK2hoGdUGA5wOBzjH0pscwjkLSNsB6+p9xVBp3c7M5A6ccZqPDIcnlaV00UoO25spdWJG1p5FIOfukfqKlg1GG1nxHeebCx+bcpzWGCANwIPqQeaUZXgkfMO9T5MFTXVm5fXumXEZ27xIq/LIB19j7VkMITtKhtxHzZx1qNSu7djkZ46UpJZiSML0K54/WhXWxMYqOwwFyr4djj6UhDqPmYHnpk0v/LRhj5c+tOCBhjsKZW24kV5LCFG3K47+taiTwzQ+YjBTwCh4xWTgM+TnH1pVQkjawDD0PWlZXJnTjI2ZY1uIDHIARjIYdqxZYWtpyrrkA9R0NaEFw6gFQXOcEA1bNsl9AVZQGU8HP3frQpW0ZKk6bOe2YORkADjFAYqeewq08MkMuGGPcVG8fybQmT79aryNU01rsCvvbJxz0q9a3eyUJIflPClv4T61UtLcXF35RyEOTxWn/Y0eSTKxGQMDrUN62InKEXytlpkACyk5VunPOfQ0wtt5CkAdPXNSpCohC7WYjoT1qTYI+Bhie3ce9F+5zaX0K46glck+tIFDNgnk9Kl2Fcl88jkZ5qbaFBZV+bGM7c4pXErJESxfJGpJOM4HaoX3FztBYHjB5xn0q0TkkF2PTimlFDAkhCo7dqNgTvpsVFdlBBJyOKkikA2jC4I5JPSn7cFg3BPPJ4pfL3qpKnGfvDGKHYfNoMLgybdxUZ54x+FPka0Ck7ZN3anmEJli3J/hU5IPrTdoYtufLYySRzn6Urke7qVcKkncrjjnnFFWHRRGzcNgDORnH5UU7N6lXT6Eedx3Mcuem5aCm5mUsSCOCDjAqZoJpF2oqbjyM9aX7OEeNZAhJx0/qagOhVOQyshPcZzz17UkiuG3DueD+NarwKwCMwBGTgHio/LiMZAUYDdQOntU3sOLTSaM/wC664AIPXPf1xSFUIYjI29SOp9qsBgrb2CvxgAjcKFjUSMpGcLnKjv71V10G7xIFRpAWA3HOcAU7a6sGHHqf89at28JdG8vaCjfKe+OuKbIcSgHKsWxjB9Kq+pKlpoiNpQMEDGTnBByB34oEUcgUMCSclm5/wA4q5GivNl9zsRhvl5B6cUzLRSqjbSCcZ6ZFTe+hN9bLQqvayeU7jAC8g9Qwz2zUOyb+LcGz90KeK0p5YvKCquE3ZAxw2aRnViwC5ZupyBj/OKlN7jTa1KRQKBk4JPVuM+1MIBOFYKd2M9OasNCxRZd2TnA56H/AD3qRLeIL5uSw/g+nfNF7lRbV9CqsTq+2XDEngjgY+tSJBvxtR8dT35qcq3mww+SQG+6WPGM1biia2cRyFUOcqw9PTHr7U09BJ6XZTW0DO/BZtvzEAHqfWm7dr/PGWwNu0njPetJW8kO8Koyl9qhzg5x6e9JdQebf26u/lpJjzNi7gn+NTzO9yea7synHEcgqpVWXAK/xH2+lN2klgpVdgxuHAJ9ati4gjtIIfPBEbSk4yoOD8p59RVaK9WG0KoiOTnccfXAo1FyNS16DhFGsexU+dyFYk8j3/lTI7LDEyupjD4J7D0qHzScp5QjOMkHJ7devNT/AG10iLNxyFIK9Tjp7etO5fK72TJGtFlhLoF3gjJ747ce1QLbQbWZzu9ckYPPp2q3H5UsQRJV8xxh2+7g/wCHWmW6WTLJBdP/AKnJLo+Nx7H8AKFcUW5XRVuhkoq7fKJy2OpPufT6VC9uzyxfJlVHbqRVmaS1VZI4tzKzADJPSo0uylsRJ5Y2EgNtJYe340Lcq0rEBijDbvmZgMqoBwM0kglwNgVs/MeO9SrcBQ25SJCf4eBj6VEZsqyr0IJHGcHvTQRT3GvGucsBhugbqffNMaBMOucFe3rSibzD++LZA4A/woX5MnJG7nByART3L1T1G7AwwTlgByBikwAFwq8fjSklm8sAcnHJ70qoAylnAzngjvRqx+rFU5XjK55A68UgfcAWJBxgDbxSMD5YKuD2LA8D8qaqsAWKsD2GOlMnTcesoEZLIduc/XmravCls3mFjJuG0YGMc5NUcjAHoOn+NK7Z5IDAH0oaC3W5MrAkjlVIIGR0pCcAkjcD0LcUxcghmJRiD24pcg8lsY6cdaEDiPCIU3Y578UbN3Oc/TnFMALJk5BXrTsYIHJAPygjpVBdtXZNGqliAcYOCfeuktYxCmDHLHEygoVdeh5JbP6ms/TI5IIftpgSVXcJGsjALu7n8K2mtpLXTJjshnYfM0xcNsyOVA+tBol2J0t5pW8yF0nj7kMHYccADsKcst1AyxW9vOq4G+V/mY47enSsC3tbm43tbwEylN24Jt2ge/5VvwWcyabBbzSyBUDmSRTgFjz169OKJJLqVF32Ec6xLuuEuGjQjAQuFXHvU1iszWEv2qWOebiVQBuCg8cH1rBuLKzTaJb+VtyhhiPK/wD66n06C3aG5gjupFJdGLFdoCqSTyPr0qnFW/4AKTvd/mb9oq5SNCOuPu4C9+1Q61f20dlJEt+u9k3Oq8kD/PpVpILT+0JJ5UygPyleQy4+tXYmsLaM+XHDEcfJtQAH64FYve9jblbVjhUkuLkKI7S+nDH5nWNgNvryOKqNpWqOvnXCRQqSdu+QbvwArobvWJ5L3yUlZznbiEFyM+wrInivcky+asXzeW7uFB54yOoFbq/XQy0WxBLot1f3Mk8d7FPcFd3lkkO4A6AnqeP0rEVssrZLjqCc/Wt8QSorruw5UqWBwQO+M1nXulfY7C3v4bgFJJDG8WctGQOCfYjpUW5X5Di+ZFMgrtZOCOeTmmHcNyggddoPcn2oyGG5T0API64qJpGcggfMeOnamSktrEsT/uWOcgAgkClwgw44PQ7T1FRZeJQp5yOh55p4UhWKMArAcjnmo0GlzLQV1GAQ3OOCOhqLyepUbiPU07b82AQG7ehFIy+aoZxhl6naTxRvsFmgiYgAMvTt/LFNWQgEYG4DPzcn9e9SHD8ZGB36H60blcnh8DjkUMavuMZs56HPcDrRuPDHqPbNSbVEm0sRk9SB/P1pmwHkAEfXOfzpDavr1DzG9jz7HP403eW/iHBOAKOAFAyG644pSg5OfXGeaLC0YglQyYG7IAGc4+tKJCE+8VA4HPr9KTKF2LN0GBnimpGZPunAPYH9aGgje9kODtu5GcHbw1PNxknDdPU1F5b7s7SRjPHrQyyFdoH+1zSGmPSUkgtJ35IPNTNdzMw3OSAMbc8VV2sU6EknB3DilKFVHAHHYUBo1axP5/lg7VC4PQDnFSx6ncomx3yvXDDHGc9uRVJwvUg5zxSfKpUjJ45J/lTBpX1N+w8Sy2LyOttCfMPzBQakj8Twi6eWS1GJFw8YPGfUeh/GuabsPUYPXmgg5B9fbrSsJKO3Y6CXXYPL/cTXEWSOHIcD25q2/iGBo8x3E0UhA3eZGrKD34rl1UAdh9Tk0xoVCg9iTx6Ucw1BbnQjxFOkrj/Rp0yMHBXj8+DWtB47KkC5tC3b5JgePxFcOQudoH1JXvSYXfsUliBgEU3JPdFJJbHp8HjXTpSqJG28g5SQDAHoTnHNTvrVnHdT28d2giwuJElXHPvnt0rynYHB+UORnjoabufdt4x0ANTaPRDvfU9DvrKxTMkc+5p+UlSQOPcEjpVSTR4rhgu9HAON8TDr3BI71xG7a4CttHTGcAUGRxwsjgEEnJqkyHFLVHevDYMJbRpkDABSdvzLgcc1UFnZ7gouoscZJYjP49jXH+dKrZE7j6Mc0DzvvCQnHq2aLpaE+zvsdebRXTbbXSylPm2hgSo6ZNUXjtJCT526XOdpcgD/AArnUkuUBCyupzyQetIJJTljIc9ePSndD9n2Z0CWlmZHERX5sliMk/nRHYIJV8mcMD0Qd/SueV3VSPN6rz7Z7VNBeXcG3yZnUei9f/r03NeYnSb2ZsT6QJGVpQynu275cUyTTigZB5ch6cOMnFZL6lfzr+8nZ1GcgnoRVdt8uXc5ycZwDQpLqCpy6vQ1209FRWkjK7hkrjOPf3ohNpbB/KkdsjBA4x+FZL3EscYQSyEDhRniq/mtyDn6j/GqVrbDVN9djZfULNEIMYIx0ycGqq6sscqyxxgspyEXgfU1nApt+bkj5hyRTlkiU7hAC3uaG10RSpqxYl1i6kDpGVALciNQBn61ASSoLDHOW5pzSSfP5aqoABwBxVeRpOWbcckHnjmjcuMYp6KxKJF24Xbz/DSqynGRg+nrVXLITkjOPTrTmZ3+YnOe4/woS7Al0LDMowA2D/SlXLcoQMn1qJi0aAkEMT1zwfwoUblwFGc857/jTdwslsyZVYNggAHoSf50u4L04OfTOaYATlQqnAyeaeEMYGVw33qNtGJ6EhL5B+Xj1WkJJODyp784p0ijAAJBPpximHcVCtgN0GaSStqQ5XYpChc5G7pgelNMfTqD6HtT2yHTIC9OaUfOuGOV6e/51VxNjdhVQMfNnjaaTYyqF4ODg89KnyAdoVsgc9KijHlswzknJPvST0Hd6l3TyhuAkjbFbrjp9KvG6hM7RqMRdFLLg/jWRA4EuT0x2FWbXBmPI6ZNTtdkSSbszUNvDcWxWaMHjr6E96wpbcpM0WQxTow7itCG8bf8hAAOSh9M1sXNlZ3mYi6Rybd4ZTjGe1X1sZq8dOhzthkXw+6cqQcnpx61rupICZGTgj3qlcaddWUiOqrgHhlPI+tWC7njAUKM496lqzuKouaS6ksbtASQ5DYxj3qQbPLZ5FDHA55GPpUaqZsnPfjBFSuh8pd7Abj070GfKncasikMQcMvQFalQrIcMMnGQAeCagmifKhdq55yRjilVvLTy1O/IPfrikDXVj5dixh055C5xwD7GiFBMWBKggc7j39arCYKOSSc5yf6U9VLlTjgj73QUNCs2u5KyDzAO2ck5qRoh9n6qr+hPNV1UyEgBTjjrTZHuWiOASueSMCkCVrJFlDsRjG4Oc7lx1+nNVVd2VgEO0nIB5x7imeeY4yoPGOM1PBNGY0WXccfeHt70m7IqMZX1RAqv5HlLtAzkN/SiiWZXlboqg8ACijULr+kK1w6uAseO+5yQT7+1RyXBQho5A4J+9gGpisUv3nY8ZJIz+A9KQxQlSIgiN2ABP4mk79QXKl5kq3C+SPmPXhievtihppIgymNNh+YknkVWCCH5wpYngknv7U7zCwZQqq7HqR1H40h6N6ITzvmQL8gJ6r1/wA4qV382Y/veMd+MVAxEK9fzFNkcggrucHGCVwM076C5U9b2LAJjUMHAG7DR9x70kpYPHOp3hTzuPBNV0LuSQDtPXPapEB2qhOVbG0DuaBbaona7jdMwnyCeWJPQ/X+lRSzfaPLYh2IGGJ5J/8ArUrWQJkctnaOcnr+FSJGZGIiTLjBzn7v/wCuk3ccYqLGOfNQbv3e3oCOARUAZgQd2Oe3f15q0EYFpnK91AJ7d6IohIxRn27R9MY7VN1ccXfTcrSSM+EUDaTnAOOfTFT/ADxPswBng96QLFJEfKkBYHkt2P1qOVn2Kw2sU5GTiq2Gk3oWTdtuILEMihBgcZ9AaBJLOxZN5l3BjgnA4xwfpVffGyqhBD+nPJNOilKyAxsBgcnHT1+lNb2J5bK5bAJud7bpOBwDtLH/AApcz+Y5xtbk43ZC/wCRUYnj2+a0mZMkbApPFRNdHYQFVd3XqSw/wpKJEVZ7CSuyRmPGMrkDH65qB3jYFAMKoAXnp/jT5H3qxkBVjwuBgCoVkC7iWJ7Ajr9KT1NYxtqhVP7tMjAQnJHGTUeGGWfPzE4GfWlyDu38hmxtB60GQSeiqo4IOfwqrXKktLE7q+4zkgHjHOeO1QPK2dzMfMJ3ZAwKJ5BsUlGZc9D6011eYg7SSTxg5xSfYEk0KsjLgYbjoSaPOVU2NGCxOSW6/UUux2wGxzyTml2KAAv3ickjniizYJoYrM3LE7evvT4494Usxyp5x2+tI6EH5TgdAO470pbCleCxHJx3qo+YpNWsiKWJTIVTIHHP+e1SGRS2ecjGQV74pd7xgsRjjHuKJJMhZCEyF+bb3FGi3GndAAAdzbh1GM9BSDcrqcY45zzx2pi/OzZGBn7x4p7DavyAYI65peYrXdrCzLjDrjcOo9aIyzYI4LDJXrSM5eUYUMSPukZzin71IwV+boeOce1MNVdsbsYSMH6YztpdiA/KAT7HpmhDvY72IORjI/CiRJUwAxROmFHFC2BtXsiJvMMfXO09OpFPDAhQAec9fT/PalcqWIbk+1Ky7SuDx/CeuPbNTfuVboGTjj7uc4HSlDOThARj+IdBT1+eMENuPI5P9KeoPliPB2kkk4/SncSTvZG/Es9jpVtcqvnPz5aFcqFx1+pNbEC3K6R57W/nSGJhJGOpY4+8MdPasxZStlbT3EixkZREQfO3y8fgDirNvqEUE8X2h5EIUbYd3zc9WJ759KuzehcX3Io5tSneOe5vY7UxcqQuCw6EDjkUXOrLNcpb2sMk7SAeYF4AbuB7CrV8lvPcAyvKI0JKEx8R+vIHSobGOw8sPbCdy54IwGK9OnYZppq12hu+1yG6s4VmS4ukgQpnfbvNksPYDv7HioY5/tiyLFL5VvFzsYYQ9se59qS40tp9SEKXJmkdz8rZJUD14+lTxxW8aNpjTFSsbSSELzvBywz05/HpVJqwrb2BES3ht1tLxGnCsrAuQgLtkjHc+lN0oiLU7vzrqGRjGy7ZG3APn8hWXa3Nokik2eVXlnZs9O+K1dVlWOGJFJa3ZPm4HXr+Rqmnt3Gnpc2jfRYiiKmLaMgKePoCKwtRtVlXMNy26MhWiGWJPsBmm6ZbNA5uwJ1toiG2g/eH09Kv2V/ZXccwtZW8w7nDrGAyj39h61NuV3iO/MtTOgs7yaJ3ks/KI5Vp2AJ+ijmq50lbkPHJfLCEI5ER69sgnpXTtK0ccLCVbmdOf3kfy/Qd6nlaO9tHbyRuI5CcA5+oqW31KUbbHm1/YzaXciCaRGBQMJIzlWU9Mf5zVfhnb5iuBxk12N1o9/qGlRRZjSUS7gZ2xgYPQ9q5S9sbzS5GjvLcqc53dVY+xHBrNtJ2GtrkDMWyCu0AjgUm7YoG3GTjOaARIy5UnB5GelOTqd4I4+lDdhcr6EZcMcHqTg89f604yZBIz0Ax6f40pUMD3J6ACmEEAHHUkkDNJsLdxpJwGOeOd2O9OV1OGDsc8E5xg0AEKGwcdMetNwVJXAGSOMdqBW5UPY4UA8jHekHTJBx7UEqoyV4B5yODSEdwMEeg4pXsVqwUHIG7n0Hemsqgkktke9KGAGVzgYwCcY7U0nIALAnGMg8mmNpL0JCCZCBwcjHfFNPyrwo4wOR96mDbz3IOMg/jSkjaW6A0XElfYXAIbscjAz0p+W2YLjI5wSTUJ3Ko4HIx0zml64xwe49qB27Enmsc/wB0ds0vmyl8rkA/3hjNRs64zuJzx68UA4XjqB0p3ZDf3j2dwOR9RjpQpJzkAHHGRimfdIG9iC2CAetHCk7QGIJGTnNMLEv3QG2/h0pisE6on1oDYdcr14GKYzjHJz3HHSlcrlSHvjOSg24znpzTSwKbiuMcY60wt8oDE89eR17UmVL49TjJ/wA8UgS0Y8zpg7k49c9aTMYXJUce3J9qj3L94gjrjcO4pN/OT97HHy8UNDaW7JYyuTjgd+cYpVMfOeWHUjpUAYcnkD1z1oyrKAuAxPPXmhlcumhMQjtknbjHIpNqlvvEejGot2T97PHYUnOflI564o20Eo9SfYMDBBxzTSQowAwJJ4HWmAgElTgj0GKDLu4ZuW9OaOomrEq7S2NzHA+lRF9zYQEA9xQuHzsG5c/QmlX5hk/KQeOOlGq1G9tUJt53KDjGTxmneWHfDdOvXv8A5zSjCgk5we/cmms6nG4gDrxTVw962w/dyBkY789BTGLv/EB6Edu9MbaZdpJCnsOKCvVVyMk/X8apFRWvmRRxebjJI/2sZFJIApOXDc4xg80/GI8AstR7SSQVb2x6035hp2GYO3cHySegFNXeP4m2nuRUmGGNpwM45pzhiFJZVYgknPWknfQd7ka8JgMSvXNNIbAXd8p5AzT5EKoGBzz1xjP0py8gtJ3OD2qlpqHNqRc8YUEjqMVKkIVgxYqTyMipVh+XunOMBuSasQ2ZfbkSEeoGaTZLasVBHtfaWyvTI/pUqxhCqsx2lcDPFap05fK86KQoCwQxyrgE47Y/+tUdwsSNs8mRiCB8p4z7UXvsS5x+FFWKB9+zbgH171bVliXDoCoPPGMGpmDwtGSrkOBgbOh9DzTZtoYCMIXxlgG/xpxd9WZtjJHjAztBU9cnrTEG4GORSVPIY8lR7etSxeVCVe4UMrchT396VoQV3OTkDOAcEj+tXe+iB92V/IjEiKxbDHGSMVL9iQGTy+VXIweamjhjEAdSw2nJDAnP+FBeBZd6Ehz1C5zn8KT1ZKlZ6J3KgsWlbaJVXJ/iU/zFQTWzW7bHwep3A5zWwyNJEpYEEj7pXrUvlxzW3kyx4K9yM9e5PWluxcz0UtzBUgIcLg9M560/esSHBLFzz9K2W0uEBg8bBiPvREEH3GahfQ7iTItGWQngKw2tjPr0/WlexSaepmRDa7OgYnOBz1rThuFm2ABA/R8jr6YrNmiurSQxzwGFwf8AlovH59KfE2WiyqqV5OD1pX63Kcea2h0cEiGULI2QRtA3dRVeWNDmSFgQDhlHJqhDMVLyPIowSQev8qjiuAXEgIJzjBXn86q25jyMuBlyFB4Hpz+FIkzEk5J9Pap2jS4UzI6rL1x0yapuyhsFSG985pXZPL16k7Tl4yrbSD0BH+cVEZV8sgk7h90H+hprKflbDAHnrin+SMA5DMOooTuK7vvYRJcQtnDAnksMkUjTuw+UfKRge9RlRJGM4U+vr/hQBhc9gc8c5+tK9gsLHuXcQyjPbHNL5n3lOeecn07mmiNTnnjPU+vpSlG74x6Y4pJj7XGhsncM8DIwcY/PrTCehJC4HSg/KNo6dz2FGCG2glTjnmhsq19gDbVJZAVYZJ5opq4PHIB6+n40UXQ035Fx8YUrlsjA3Cm5Zg2fvA4ySMUQqGkAlZggHJHP0FLNbrEN67iG53HkGpMmiMgkEyNtCjI5zn6U/wAxNjFtxPYcfnVaSUg7V5xjlh1qSQL5auHBY842/wCFTfTQfLrruBlJTDZ4OADnpSpMwjYKxRNvzE88+wqMpKzcxsVHfp196fCBLsAfgYzz79PrSvYpKyuTACNghb+D5sUoiKoQ5X5RkEDofaozIRNIyg5JO0Z/L9KJf3gBOf8AaJ9/Sld7om1nce7l13FvmYfMcY57CrNuZFtzBCWG7mQqOPzqrGrLOUXbhcHGc5PbFTx3bx28kSNtVuoBz16mhakuy0sQndA5bZhAflyep/xp4nVYy2wNnhgeRUHmNIrt19CBwPoPenRhydqAAgANkdj/AJNJNopx6smMhO3bH8hGABgAHv061Wkj8tySSMjI44qdSxztcnOTn+6aik3uqp95T/XvTbXQUU11HqruuyJhv45Axn3pHPOM5ZVOSehx/Wmtthw8LEED96B047VN5arGWL4jYZ445oK0T0GRSyB3ZMcqDlu34UrLIJHUH5cY5XpmiKVHkzgFSfvk4P8A+qrUsZnJmgjkcqMv5YzgdKu73B9SEorNszwO3XJHb3qJ7VY2eZlUKSNq56H1/wDr1aZWUZCEpgE7Bggn+VV3SZ5XXOWIzhFztrNvUUfIYIAYD0PToB1pMCNEIGTn5h6VKyyKm6X+EDgDH04qsQ3m7WUZAySeAB9fWqe5S8xxbzNoAB6jGMCmuzDc2PlGRzxT0UeaoGORk56U8qoO0t8ozwzdarpcGlYiXaGzjIxxjmnfcRlCgFWyT1HPSlZ1835IgMHA2j06093yFDSKVKqNvrz2pXGk9rDTGYiDnJcEAjoaTyywJPzLxlj0FLN5jMg6jJAPQAelHlqx8sZwRyc9Peh76EXehH5bDmQ9+w5I7Y9alNskUZYnIPy4B71FMr7QhcsR8wJPT6UgPl4JYbSvp0zTb7lvVkggJDYkAHHQ8/hUARFlChTgr68Zz61KheM73YcnGD+VNlXBG44C9BnFFwW/kO2KEwuC5HB70gdYwRjOfl3d80gZs7Isu3ovX/69C+YJwJVaPac8gg/X9Kd0K1twVyZGUjcOgJbpQQ6jaTyOAPep2hdX3q+Q3KgjoKjIPmspzsbAbPXPb8c1LloNd0RqUkcqwOcdTxSu+Ux0Hrjj9KjQBGZnHzKSAMZB+tPX5+W/AdqE0N3GZO4gKBgcluQ1SRtuIGcKOW4xmlf5FYiQE5yMDHFLGzI42KenfoapCmkzcVri+8qP903mAsoKgABR1zVuS5l1G6tzDCgwqo8ijOWA9e46VkKTK9nHDIUaWHySRnOCTu/HFdJIYNCjjkjMgWXd5SqOhIGSxPpirclsirK1yQQzREQ+jeXLkYUnjBB7ipbaytI5LqORdmxTv8s5ZcdAVHbntVXSbySWdZpijRopAkf7mT6+tSX8Uhv5LQ3c0lzIN6/JhMYznj34/ClrezZWlr2EE2lwXDrHEwdkG6VVO3nqPYd/wrOkRlmivD9mS3YsqMn3pT0//XV9dR+z6cwt7SK3VmxJ5qk7FPQge59ec1kyaZZKBJLO0hLguXXaBnv04FWtNxPZFS6vHWbP2JXhJAA2k7ucEip72W5afdHHIyhQysORjsPanXC3HkbLWYsqckQtu4x1HtUJQxWe2Z2U4BCoeR9fXrVpk7rctg25tglwSj3EYcBjwB6EjqKt2Vvb27taSQzYC5Z4+OSOx9Md6yoPMeyW3sd/2hS0kiuB0yAMVZbUJrI+RezF2xtzFywGOBxwaTV9EUld7FhYZrCCOaLezPkJE7Emn2Ml1dzytcO8cSKGaI8Bixwox6VMsbGzRixfA+8EwQB6g8jrU9rYSxRLJaSeaJB5jy7uNw6D6Dn86nnshpMulUWMCUSSZ+8AcqP/AK1OePz02Swq8DKFeNuVPpxioZYXurNkeKRZmGHkSThgPahp7i2h8u1BlVBkkkuQP5frWb10NNjifEejrot0hjDG0lXMTsc4PpxWOXjJyeuckjNdhffaNfsmtEjRZzINhduhHt2znrXESxtb3EtvIcSROyNznBBxwfwoUWtGJNTV0TiQA9ehwMcGl34xyMZ4OcZFVfMCk5BOecijzy4BJG3t60NMrlkWd4OQcgtyMng/jTQQFzxyehbp+FReZjknJI4YjpTVkUZZScn1FTYHHa5NuIULuyBjBBppIKhsEEDj61G0oBJXj0J6ihpNwA6luPqKLMVtR5cYGCS3XPcCmllQ5J+bucdKbvDE5/MnFIXjKjjjtgnNOw7N6grqO/Xp2p+4EZGG9xUTMdygqWB4HFB+U5Yn+lMaiSgKpwrZ6fhQWXJDdAf4eBUaEhXO4++D1pDIScDovGD3pddx2SRNuwDhsZOAffHP4U4fMMZO4HrnNRKxyQRySD0pSfLUhh+J70asmzfoPLkgKQM9c7qcFJG7lgOp9KjVggG7BGBxig7lA5x3Az1pgtHcdlTkkjI9KaTtYEkj0yabuYqCuAy9h2pd25N5I57GlZhaw4sNjAHj3780wqA3b8fWmu6hXUnPt15qMSeWxIG7I6ntQh8o93wuPMGCOOuM+tNXJAbqoxnmmvxh9p65HoKQjAXDAgjIGOaNlYq1tiUsZHLbgB6Y5IpokBwSvQnnpUZdd/J5xn0pyASyeXzuxwD3PpRZj1T1JFYYyeTjGB700n5m2nA6EVHk5ZQAAfXtQ7EueFwOpTmlYLdx4K+YcM2OOe9BdSpIb2xzxUfmGRPTPGV4pQ55+QjPcZ/Om1Ym3ccjjHzHj2qXKgA7cfX0qvu+X+Hjg4o3gjHPHai3Uat1Jd5KYLAHHYU0nK45JHHBqJWJYq2cVKseU8wYxnqTyTTAftGCoyWHAGck8UkhAQoQ+48M1MR/lJxjn72aazAt8jMVx9MmqQ2kSblGCpYPjjmmDKkEHDZ7iowUPTAz170K3qQ3saT21FaxYjXc7N1UZOQO1R7XnYnacDkVIGGWTG0EdfepYgmfkOGAIPvRrbQlaNkDy4URIpDYye+TUmE8vM+5y2CADzTYImkkDYbAORUiQvPOQoIAPXIwOad0tVsF9b3JrCFbq5VRF8o5YkmtZLQpI2+5hiiB4Xdn37VnmUmL7Pb5AHDEDO41a0vS57+cRsm0Yxk4HPvSbSV39xFr63LzQkaa72QM/wA4VsjkdwabDBOqh7mWNH2/KjtjP1B7VJNc+QBZ2cvkoThmY8H3OBVy2tGeAjyBs4HnMTz75od0rMhv7RVtbC5Ds8lxE1vgkqpyCPf0+tZIsVa5EZs5hIzYBD5/pzXT3mmJBZxNDdRxw8ozo2S5+lZAitXiAE0wbfwc+1EU2r9w5+UqvHb3d6LRmA2ZjTAI3HsPSmRLHNmB7eXzYgRGD1OOxrWGnR2dwkksrTqwDZC5C59fenPHM140wgDxnGCJiMe//wBand9B31Rkq5kuFaSKWLnHfFWSqI7PhSDyCeOfetJ9DkuHWaRyTKcYQjP0xnFW08LXEbbmYsvv1P4VMpx6sGtLoyI7eSeAkDfhs5B5A/rUlrFGLhI/L+U5Dbm5H1Fbo0eRVBQKremMVCLS3tnDzR/vCckButL2iasiFfq9B2nWfnxvCFfdECyFhkMPTPenxSp5u1o4AvXcIcH8DmtBXWNAfOSON+gQZI/HtVK/ne3lCyPHv42lurD14qormY9kNudQjd9rBNqn5maLIP4GsO80uwltJJ4AyPEpZmjQhfbPb8q2Pt3DbYoyCACeSQKxdX1S38ueAyzklcKquMHjuO1XCCb2E7vVHNI37vGCAxycdPpQpVW+9gD270mE27V49M0Y34yxyBkgnrQ2uhpZMvR3exwwYkDjaOhrSldL61D9JRxjpxWEoLMMEDvUkUhQg5JFJStqZuCl5Gnt2LjecYwAe9PkjdChyNrDmrkUUUkSM7AD/aU8ClmtER0VXXn5uOAOfes0+pjdJ2ZQjgLo2QMgYwwySKj8piNwGQpwc8cVfH7tlO0DkgN681HMTvOF56Z5GRQvMHd2aKMuAxwwXHT1qYMuzBJG08Ad6kaEhcl0KkcEDJB+tV3R0j+Rfu9DjmhPUtNW0/rzHOqEhlAGR/F1qIRiT5uQ3QkD9aeoZuvrx2z2qSLeG4jJxnhTmi4Xu3YrCLbvDfMvqPWinN5kfBidS56EDAoodr7hJO45ZdwBGVJ5YD165pWuNzBJjlOhCk8nFVslDwTyeh7D+lDyiVyD8qheQe5qebsLkW4S4YKyZG84AJ5oU4kKluO2O9PmkaZotqjCDv0NNO3Ik6KeGA7e9SVq9yUsAxDOenyrT1H2VA4AbA+U9tx/wBogZZHVGUAdSwHOKVwbmYFFJTO0rjoM9aUydNrEMCgGVtuSQdoz3pYdyyFHz5eOOhNPeJI+N/z9yOMf41JAuwcv65BOcj8qNd7DurdRwhJXy41KvyRk4IFEFmZY2VgQo+XggknPFIrCIrHGwCN/G3GRn/GkM5WVmRBuPGfX3Bp2S1FzSWhJHb+SrLu/eD5QoGRt+tTRxQNMqiTAGcIejVW5DdCqNwM/z/nUsJABRR87sCpJ6Y6U+XuJtyZIrIksokjAUOdqqeRxxiqTTMwAwjAR8ZGSMU8oyRFlbB8w8kYH50gaSRyZcu7YGe2BUJWQo8t31FaENDGowrDBIb1z39+aleMpI0ZaKUKP7x/WoFDSXAkbLjoVPGPqamRpN7AOExzwcU7pbDfMt0LJbxzDDMSVPzBhgDPuauIJILMiCQ/P8mMnB9j/APXqKIm4UwyRs6x9WVsc9s08ymOIovzZOVyuAv0q0mKb1Vy3bK6sFupE3Y3FV7Y70TNJHbtLHyWGSzHkE8DiqZWO5gZzKTM4wpAyVI61JFDHLb+cJSPLXy3GM7ceg/rQ9nbcSVxoTz8xRuqquDKWGSx9qhltrcICZkYjnbn+VWpLeFAolRVH8ID5f8cVGsyXBdU2hF6FjktRbQUdGii6RxbsP8/BBHf1p8kIhVXf94XBOVPXjt7VCSGUKig45Oeh+lTmWMxL5ZZSVKgYwT7D2pdC7PRLUgkULKBglcAkD1obasSjacEg9MkjOaWIskLO3y7227xzyOtQsdsqKXycDAJwP58VPUuK7Ild1IGGCKCdwXnmnqqMCVlCkAk7vSneWkIHmsrOQflB4A92p/lsYN/l4C5OxTgf/Xo5raieqvbQry4OwDc2Pm46dKbIkYjVCu53XPByB61ZSP8AcKU+9njsMUwqp2gkbjkbgf05p3bYr290iijwQuSueUz/AJ56U142Y7WbryGz1q0YmicNuCkDbluSOOKdAo8oux6Ln5ugPt/jR5jTb1KkCgsWUsH6lgafveZGDc7Txl8kfTNTeaJArEhTtyR1PHrVdmVHKJnnqegJz3od72Y9d0PhYPj+EhQGbGSf8Ke8IZd5fOR1bnPNNghUNHHHhieuT0Oe1aEmnXUMiorRcjgk8Zz0waLu1mCS3uZW0i4JVmYEZxjj6VMIjGoLAncCSpP50828sbhd5inAyRjKke3sakaBpDEQo8wY4bOG4/lSTQut0U5owJi7FuF+Xnnj3qa3MXlyKzEHoCRnBNSuyOAJY1QjgEtnFQtCFt8sFzIRtAPT3NO7uNPoBtjGsU0Tksp3jnt61p3+rTalJDaKUW3UqPM2/Nk9R/WqRfykbczbcDI/u9sYqq5UTRlJTiRhuwMge9aQld6lxbtZanbz6dbx6ZNLGUEKgbEXpww5PqTtqhd3H2O/8t5GCrlcA/NgnPJzxknpS6hObbRre2S42kP95epHP+NLFpn2htOU4aOZfMmOM5IH971JIP4VUdNWN6vTyJZGRgbc2qmWMgZOHAxz696q3Fmkl15z2iwxMwVwqEgZ74zzmk1WJ3j0xSjeYzssuT87jf8AeOO3A/OhrOefVY0u5DbxTOyOQ2AdhOPoKpNCe5HdTQ6ZarDaRrmTDC4OMHHUD1Prmo/taQmFtQMZgl6DGGI/vcdP61eNrcQpKIIo7uOTMbSSgCMc9cdzngGnssPkbplQ3gJGZAByOAFyflx6U01tuFm3cju1j0yZRbssahRl933/AHOa0dO062u7aO8uoMvN+8SVE+ZV7HjrnrWZHJqkxaH7DHOiggieLjPbqeKv315d2R8j7GklqqKoKTCJ046L64OetS037qZcYq9+n4Ef9piOeS3kKKyEjzEyd3PGCfXjik0y/S+t7mOJGt50UuJUhJV+Ru9vw+tV/ItdNWO4likuYnRZFeYABAeo44zn/wCtTLrWopmm/s4SxgxFfn5HUcnPTvzVKKa0XzEn3ZankuVuJo5JFYoAQEyoGRwMHvUEsEpso5otyxqcbt3A+oBpBPKLSL7URJdBuoI+ZfTnriq940sbLcW1yAAvzINoP5dKaRL6kN5cRgELOXuAcqVOMe3/ANeuNkBWaTJffuOdx5zmuoNky3CzzbzI5DAjv/wIVTuNPOoHPlxIRkEoMFv8aGuw4vc58g4AA5PzZqLBJ78GtOTR7hYy6FGH93PzDHqKz5Y5I2ImRlPoeKhPoaRadrMZwxPHfnA59qZuOTnHXn3qUFvJweNpyMDn3qInGdoxg9+ppq5pdoXe3BDED24o3EAEYye3rTVV8nnoeh6mnMMMwycZ+tT5BrbUM4CkYORnBHejcWIDAemPSmkY+UL865O4+lKyL8ox8wGDjqaFYLIXexbcOg6c/rQHZQSCdm7GTTAeOF4zycUhDbf1OecU0MkUrnAbqMHigyKxGV2gDjrxTFByoUHjqBSjHIKgrjp1xS0CxI7jHHQdOlKzg/MM7j2zioguUzuBJ7DnFIGPzBVwcnkH9KLdBNJ7kxfAwGyBzipRLuHLdOfmOc+1VVbjbjJ7UcAkE8Z60W6MNUTOxUgA/I3AphcYxuIJ4xj+tJxs+9ypxgnqfao3O056EEjHeh6Au4pfGSRyw6Hk04sCnOcHoR0zUbc4wSDig7MOQzE8Yx0pDHGU/dPzKT60KwbG37wHIpjF2IZsZUAdBUsK7x8uAw5JzjjHSk7DGBwVIbO4nIGaQt0Gce4FG0uCV+9jP+cU9IpiHdcEAd+4o03E27CSSmQq2CGI5Pv60bg4LcDjoCfmNPlgdIULDn0JyeelQhWAz3HpzR5Dv3FL9B3HPH+NKsm1g2M8cjPWghkGSuM85I60m0LyxBBHSjQSSELBtx7E96dvJYAqR6n1FKLeV2yqHBHGf50qK0jhScc4welO66gCuImJVQ23n86jLhyTzyfyp7wSLvO0jbwcn8qYEfbwpKdAScc00+qGDbu/HHX1FSPBIIVmZf3RyNy8jPof/r0wx4+aNztGOQfWpYJ5rZ8q3DfeU8hh6EVLb6CfkQiRfMACsV4zmkY5BGFzmrk8aPbCaFNqlsMoGSpx0z6HtVXClBwQ278BTuCegmTGw6HuMc9atQSIzHp1ziqikspBPyk5OfWk2kZf34xQ7AzQPmMMq3fJCj+daEA+0Wz+Uh87o3GSfeslJWhP7yMkt0zwcVesrtYpPkcqWBBxjkd6m76GfK4rRGjBFbaan7/95LgYQHge5PetPS7ye81OPcyRjoqjtXOuVdg4Ylu4Par+nOIopG6OV5/xptLp16mbejk9WbsNra2LNdTr5zglgpHy5z0x3/lU99rI1CXyIYttrIigNt+cNnt2ArDkvGuIk3F/s8eeM8qT/StKxcCzikuGMjZ8tFwBlRyecZqrq97XYrcq1L2p2UVzDbxQsqW0UXzSZ79/xrIhNrHIVlBcAYBHT/69W9fuIpJoBbo8cDxhljH3RVaIzywqJcGCIYjxjIzzjP1p/ZSCXdmnbW8t1EzWkyOCcFCSpH4dKvxR2yLG6xyQhRhw3Pzfyqu6M0awoQrhRuKED8OKklaS0hWCFEuY5sOshUlW9SPcHqKlLm3F0N02hTMcNqsnmMMADgj19KuvHbToVlcpjj5exFZGWv4oGjc28+4KVyUDkDjB7fSrcup21rGLe5YzTHg5G0geuf6Vm6d7W3N9PkXJ7KJcPaymQ4xkHJ/HNYmoWMCKzzWcbzn64BrWsvsrq06eYkYPXP3j+PNNuvs9/I0bHg8jB2kn0NTFcrFKKaujl4IpYoWYW6LG43AYGT+tMuZzKYzJHH8v3Gzg49PQ1e1m1jvnKQnYFABjJ2sO35VgLYSJcCNkJ2gkKx449M10x7vcxacSzOA+DG64jGWKcH8vSsrW9Ma5vPtMLhWZFyjDGPxq6s7s4B2xqvG1eAPUUNOrufLLIOR8x4YVaVtCYtrVHLSQ3Fs372Ig+oHH402QYnZBgkHPHeupE4kIY5A5X5cN+YNY2taZFbhL20k3I/8ArIxwUPrj0qOR3si4u7szL6gr1PXrmpo8M4BcYbvjqKbtMkamRxyevXH1qf7OxCdAemG/irNtFdbG6jxiBAJGcAY25/rTTIshVWbLLzipLSxuG007owIycq2ef/1VC0DrAzYBbAYlOnHvilF3Rz8sevUheaGNFI5PHynOCfapIPImdy7sxYcEckY+tVSxY52Btv8AETkfSlgOHwcJhshc/wAqGHKXZofIXzkidoucsfWqxUAIdxDjjIqKaeYqU8xynUgNQ8j+VGMHPBDY7U7IIpp3ZIAWZ2zvAPrn8akRo48hmJjBwcr+dUyQxwDkZwCOCKWQOodM44/WjyHa90OuHjW6Q7SVHU4yaKhEjMenHB5UEt60USaubU4e6txHk3RoqKAe/I4qJwdr4G7/AGj3p7qFcmMbj7rx/nFSbV+bdkkD06Vm9dTLs+5Xi3MwUEgf3T+tT+U3KOOM4Kg81YQMsYTywyt/EpyQaZ5ivG5B+deQSOfyoYPyHbcD92AGIxgfhSwwyRZKI27lWAIPHfio1uPLlDFf3mOAfr2pwlKTbvM3q33h2NTv1D3tmhRBJsJJD8kgkY49MVJFBFO48zqR1yRj8OlIZZAirKSdnABYk81HC7xqSSwLMSDjnFVa2gXle6HPAkEnkISVHHHJHelZWjLAsWjJxuA4qDPnFi3yqBgYA/l3NPx5gChuEUDB7e//ANao1E0+u46YEosgwEDbSO4pFOIxhgOBjqTUZKb2XJZCfmJPfHWlWJkOY8MuOeOQBTbdwsk7Mmd2aOQsykA/Lzkk9c02V9wHB59fvDvmolTy0LqTg9yehp4Ufe6ZGcH0prmBxS176ixu4Vx0LdcHvTiJSS8ToI8fNkZzj2piSmF2YAMWUkAnp+Hem3DGWVV3fPnscU2+gJWZLEzliqltpByfu7vxqceYduSMdOGzVUyyLsBIyucEg4I6VIyL5RLOykdlA/L3p37FyT2Yq7Q7LG5C7TuIJ49aR3eAmND/ABAMB0x3OaimlKGMkr8owFzgkemKjYu0+CSUJJIyQCe5zTTsJxbu9y+rLLbyzxuzMuVjGccCq0WcZIKtjA2nk0i/uiArhNwAJPAHHYU1wxkxlyw4AJwTx+lF76gkyRLKSUsSpCgg4B/SmeVtiLMOckZ71ahmT7MSYGRuBuLZz7VBMcEghducYpNW6ivJuwpbbL5KA+Wo+YKMlif0ojVPLbMYJGSV44HvTPLlWIsFVI1OOTgn3odZCQH257Y9qlpvcp+bJ7WaNJxIFRh5Q4I9D+lLPcyeTLMgOJCVBcY29PeqwgZHKouGLYCn+L/Oasmzu3UBAFA+Y7Tyff8ASi6asQ9Ny9NHBbyLGJwfkBJJ4rM3RtcMyMzbieMcZHcVK6q4KMemTgjFEMRKI+3nedvPT0obVxx0InWYqu5g5Y5HGcUm4hQRGcgckntWhysZAY/N69+M1EbXMSSSEKueY8496NQT1IthKKzbSeMbicZpjqApwxOcdQBj/GpF/wBI3KjBQx4UnHParUMFvLNHvuQpkRzIpQkqV6fjnge1GvQN17xRiuGgQbY1L56j+IZ4z71Z+23DZuZm8xW4WFmx+Q6CpM6fDtVV8ty3zMCT6Dp25yfwpbSVba4ml5kXJCF1+7nvg0XlsJkkqteKJlkXcF3jYvyqfTHXpULyXDWokEZVlHQ9Dx1/KpIrxkmllSRWLKCyhRynTP1pJ54hYgHEkjpjjOfTNPlJXM7epTWU3MyxsCRknaRnB96SXzFm/wBofdI4xVh4vssodXCy8Bhye1QNIhVcKWLEZVc5JBpJo0UovQhu42VfMYbiuDjnkntioBes6SQCNVDnG484+laksBkUrsdTuOzIwQapmxCAK5XcCeCO/pmquikk9xkF+4Me9iShwocZHpXSadq2bQwu217WH5QAO0DEv+eSQK5ae2cJvc+pwvPNJZ3D291HvUMpKq3rjPatFJPcq11zI6mHVJY9Ze6eEyyIiI27jy12gt+tF7cve3AvCrtAM/LnjHXP61jTXhWCZXJLyymQkDkjoAfb+tX/AA20dxeXMEjnyngcOx7LxnHr0rTZXFq1Y00eaxntkWJg07KGBbIkQkZB/wC+hz607UE09b6USI8/mlhGHOSFB6ntj60BjDq1tZmbcltJEkRZeq9Sc/iPyqhCd968xJa1iVmZxxsJ6D37Uk+oeRfivGvk8xpF8+VdvmxgggZHDpn6DIqO70+aJlGoMLgA4Yq+VyexJqtc3FpDJG9jvcbvlRgefXJ6kZ6VPcXMmmrGsEXkzyHIVHyGHT5s8Zp3fQNHe5BcqY3WG0l3yEZZVbhR6HtimWI2M629uqTbGZmUYVx3NWTYpcxTQW0Ahu+HcFdglBHb6HsODmr9rZ3Fhossctz5KSKoXzgQ0TE4b8DSlJbBy63MRradP38026NV3FuDk8Dv0q1NFZrCv2qJI5SCBuOCR2J+tMm0u62ApPGsaNgSl85P0702WJZwQ0G8QqFYoSXz6nHFPfqTsNia4EIit3tpYV+ZlGSFOfU1Xnkja6BSFtmCfvdfx7Z5oaOFJJGkklTcoCbgCox1x79Kkt5p4gxjkbJ6MFUgnsarzJ0btcIsS+ZJCTFGo2N5o6nsM1XuLG1ZCZHIGf4Yy2fwqRpLue1gmlEaymSR3ULjJyADiopb2aXIliU44LJ8rY9c0WTLtroZ19pdsWLWkiIMDamDz7Z9fb3rMm0+eM5ZCoHOWGK6KK5SOMqLUyNnJO7JNKyp9kuGeIRFkyhJPBz0/Gs5QtqhqUloczPbMAuQPXg9zUPlNO5VQwDDJJ4rTkMkjGNk+QHnA5NVH3rJwrYHTOePrUKSsbe8tyiFbJXHTsf6VK5ZMqMgHkE1ckiEsglwGyMuMYxn0pGhLRb+SVO3PfnkcUNp7gpJspybfLD4xztAHc01Iy6kLz7VaOCUUsvy8fjVcxyR4cITg8Z/xoTTQ1JEGPmAGfXBNSMjKq7hjcM59fSp5LcoQVAww64pGWNlUBysijHzdD+NO/YfMkVsE8cg9iTxShc/KGBHQHpUvl7owhG3J5OKQoyvkknHHSncPMYMIUw3XrxSBMAMwbZzxjmrHlhU+dd4PAHpR5LOTvc7PXP5ClzIXOtirxuICnb656UHcy4ALADOTVo2oPG7LHsO9TwxGKPcHUOBgce/pSbG5djPVCVwM568DGPakQZ6KWJ6j1rUneQQKzzv5nT72QR9KgQmR9p+bJBzjn8xS5tBc3UrRQtJ8ueSeTjrUjwTLJlwRtxV4RKMRgDaBzjn3yKnMaL+8DDpwM8A/Sp5iHU1uZE4j+QBShPXJxmiNih+ZSUOOc4xWh5KTdV74wv9KnbTEjQSluSwGJBnJx0NCkirq1mZUYHMQlJRs53DnPbFM2ggqw5UHp1zWo1gJACcxsnLOV6fl1pZbPLHDB9+NrKMZpc92LmtqZaqZyFXLEdM9hUYjLcbec5A68VrNBIFKiM4DEOCP0JqU2IgaOVRuR135/pT5xqS6GZHBKn3wQCg+buQf8mmeUULIVJB59xz1zW19lVUJTa4wSVx9zjP8v5VWjgRnR5ASHICkdP0pc77C5zPkj3RhsnI455PtSrGqYZ2b1AHY1feAwTNG+VYckE0qQqXBwhydoyc5ppi5m0Uvs4f5ySMqcHFRiIjlxgH371rmOPcVBwFOdxPem3EJfOELsDgnHB96afcfNZIpWUZG5JAWjkBHXuOR/n3qkqZkO1eD6c1oIjC4Teh4PAI4Ap6xb5NpO0YyB2YUl5gpe9oUBa/uzKS2B2I71EUYqMsApPOenpWpP8AMAoGFHU+tQlN0gDRgBR0I7DvVN2DmaWpTMLBDuJbHQjkfhUghWMozht2N2A3QVZWLzMEhgpOeP5U5dzuS4VsdPVfxqebuCk76FdZXTeGUgjPHXj0FTJeqE/iye+OhqJrcoCV+ZsHBz2piR7xhRzg8mrutw0aNGG+PzKAu5uGGOtaulajCr23n7ysbYO4j6/zrn7a3ZzkuQq/NnGeaYIZjyN3B7j+lIXs4vY9I1lY9RtrWC3EIWSUKSo4BPf6GqGrGO2Y21u26NFA7DBx61yVvf3kaARswX+7u649q231ZdS0dbdVjSYNkkL82fr6VdOyaTM5rQczGOIRXCDe+HDA9B/jWvLd3Ft4UR4zndcNhuvtz71yt1M6zosh2yKuOD2Fa2magk+jT2MrEbHEwyOCO/41pfWN+5STWrL+nS3VtKst7lUlBLqOrDHB9q0rRw5eOaTe2NsRlXOD7sOtY8My6jcrLFdoEaM+ZG/3VA9f88Van1aSW5eytYo0tE+VWbnLD0bvQ072+8laas0ZtRvLJwkUjRyY4RgGD/hVl5PJgD6gYLeRuohc56enQVlWmtLbhUJeYucAbQQPoKdFc2UshZIHWRslfNcFQfb/AANKUO6KUk+o83Tzt5JuAYs/I/lnI+pHH4VQeK7luCLkg7R8pK4ye2GFP1KSZfLeaVgqsVKknDD2xUZ3WoEQbMsn/LIuQF+tP06kaMptJLkxy4G3J3CMZ/HPWqxk8gqskTkjHzK3b6Gt6K3lSdpLm2WPac/I/GKWCK1lkwoB39NxAP8ALB+hxRz+RNm9zHCQysTEzRj/AGmHNTzxLbwut00Lvt4RVOSD056VtRaPMVaFCkYJO2RFw+fxrm7m3aGeeJ5WuGjOGljJIOeoPuKlTv8AIJKyukVDEik+cu0rjbj+IdqRNiwgBemcAY6VKFQKgAYkfeJ54/pUbptwx3FRwFx1H9Kz63G1fXqSQ3t1Em1JGwRg5PI/wpftcjQmPbkcgMOlVxIhfCqyqOAc9aQGRVcseM4J9PejXYTS+8EUn5SSuScjPelnYrsBckE9NvI+h70qRZHzfUcc5p6xRkAncCOhpre4StcYjnqVBB4B7ikcgLu5wfQdKVoTEQSOepOO3+NBA79DyBS2eoNJatkLk7mbpkEZx1pCGKupbv1Jp0n+t+XcRnnI4/GoWbaDyc/3fWjYbVtxRhAC3cYwf5UU4bGTKRncx6gUUFWHu7um0ggdTjnPtREpVNxwgYdR7irKEXBMQTC/3sdOP61I9u8cUcflsNucMSBnNZSbRknql3KyykRlMMvHAJ6GkK7wQwAHbpyfTNPEEZC/O6GTgbsnj1qGeBYXRYwxAI5k9Pw4p76MrTdO43ytrhsZC4JXPQ+tOZt05fAJJ4Jzz/hUksSQxsC55464yByM1HFLFHuVgCD8x59qUb7dgi1vckxweoIweD2PWmEGRlUE7QOff0qOKUox4OzHBPORU0bY65z29x2FPcXwpsjds3KxqSEPGAOv+NTRpKkjMoZSgA+bt9f8KiV1SZnDnO75eMbfcU/7VJEW2jzQ3U5zgetJLQLWVugsoAw7j5VOSO5/GgsIyGTdzwVI+7UMikqCoyByu7t7UJvWYK+RkD8TUpJj5drMmcbCEOASB0I4qJsFyWJH0Pb1qWPy5BJK8bswICKOD/8AqqGbiXZkHAzx2NWtx7PTcVCDIxjKjA6n+XvUDFBJIdxYE4K56/54qVvkbawUY52gU1VjePJXHYNjvSfcaskTK7rEAFGR355pi75nX97tXnaAKaHDODk7geRjg1JtX7+4EA9R602x3VhGY7vL2jHTkDGKTCrEOW2k8A9Mf/rzTyw2N2A9O3FCmMRDemWwMEHiiIpav0JY2EB34/eZ6bdxA9eaVHEe47R8oyysOT6UyT5o3aIfMB1PJ/z2oOWkAABkYcjPGT0o5rakXv6jZI23q2T5XOeO5/8A105WG9pGQhRnoenHUVIY3WKRJHALKOSOntSDbIRGzfKo2/K2OKL6gncVdrgsCSAB944yCPT0qKJ/Kd1PzKGwF6kUsCdmmAiGN2OvsPpSrCfOeTzBtLAccHHvRKXUE4pvUsKRJdfIhd1QlVHQ89amjkuI4DJJLn5wiqeCuB3H41Tt5Ck3mqeudtL5BlkUsMED5zu4JoQmtSx9mmbdM5byidyserfhVvyoJRzM6yD+FlwDx6/lUCzJbwtLOJJl4C/NjAHtUUUwkiWOQB2ZzJgHJx0x9KFpohWdr2HmTazkuGOAFUjO3tUUsi7kJBLAkKccf/WpblVwsqoU+bjklsenpRtYYLjMZXIPtSVynJohnCybdy9Bk+5psb3EUsiwuI43x5nfgdMU+QCO42NnYw3AlvzpplVGLIyk8fKP4uetNN9ClqrLUaZNgk2Aq+7dk/xe9CshtnBlcOwwcoSv55qKOUSO0n3VHUHnP+TUuR5QA3ru+8Rzmp6sLPTcIZCjmQLtK/e5+8PoalLsqgjJGNuB1H0otNsqlnJVF4JHXNX0lPlrGwWS3kG5SMbjnjH1yKad9A5rbkCztLG7I6h2Qbsck1EWQ4IOCvJAGM4prwJbzNLD8yL8v3vmBIz09KaFaYLggl16LwVOecilqTZJe6P+2hVXBbeOoHf8ame9hnCIEKKpy2cHJH0qssLLujIA+bsf/HjT5ITAmzcx75PWm5W3BxSVl0GuVOSDuHTnpVcouUL/ACk9Me3tUsTFNpkG3dyM+lSNGFLEorDd95lzTvYE7NX1KCySwOxaMFcbdpPGD3ra0eaKLe7FVLJtIB6imNYwtGFeMlCuMjqD6/Smx2kSt8qOqqcAnGc1am+pble/QsS3Yjvo7pWDMjDBx6D37VVdmFuu2Uj7QACpPQ5HPvUhiKtncePUds81Wlt5IyhJA3ZbjJwO3FVzoW1rMvRSbLu0lhU8TCJOAVIA6exrVWG2gWW0dyTJIzO7Hd5ZzkPn0x1rj4rySyulyjNtOR6fl2OKvtqBa0eFFJkkb5Rg5VfSqk01uDi1a5sExXsqRWW7yz8vmMeXI5B9fwrRttVu4bSRZ1lkZGClTjJX1AbtXLSTj/Rnhl8qSNQNoH8XTJ/WrltqSfZXhn8ySYfMtwy7mU021YabT0NObVUuoFhMgikAxhE+XHowP3T9Kzdr2bG5jkdJB80e1wVkXuOKYnnf2e0sjRSRNnndyDn88VVt5XhyI2G0rkjHII7ehqk0thfE7mgszTt94YaQBVVQdx6kD0+tJI8kTxNHLtZQWEafOAMkNnPeqPnuUS4jkA8sbAq8fkKhkn+fC5Yk/LITggnsaeidhLU07aVWidigXcCplZjgdunakWeAROxfIZSq7l7/AFNVZnjidrVFLRwPnaB1YgfMf1Aps7tFIyyNtwOEbkFfT3out2DVkNWR05WaQAHoDzge3pSEiSV5WZXbngnr9R3qEvI8ZlZGK9RgcD8aSNlcqDExkPO0Z4oU0Nxf3ltgheCPyjGhBbYr9+5/+tQFiaRlaQogHI2gn0FVZWMJCKxJxkA9jUcrM2CTgZHG7gVg+W42rk37tpN6AFY+Bn+I9sCopNyxsqgIrEydPQev41AHIdl5wRtY9CR/9enytgFcnYemevpWdkXfXQjjgi4JGCR3z16/iKe8aiPttPNRKzNMMNtI55/lUjqSexcDjI4pvYLjAgIVGCqe5J5/GgW0Yky+HBGeAaiAzgEsACckjvip4AzEBjxwSW5A/D1o8g8yB7UqE2YLPkgLz8tPjsnRA6rk5PBHSrcAEUqtI2/Yfu7eoHalE6RTSyGJmLNyhOMA96L3WgNvm2M9LRnbcwIXHJz/ACqR4NpOM8dKtR5cSJHt2kkgN/CKap2uoIbOeST+lDY7vZIhhgkZNzLls5wBUvkR+YW+baB93ripknaPJjXoM+v/AOvik82QDGBtz0XuPpSaG3Jp6ES2RZ22g/P1yeP84pbZLRXMUgIBYg4yef8A9dXYZVl37pyuARjyxyR2NU45ZVK70QJ0LAYz9SKTi7bkXXoiwbaOGWWMfIA24N6gjIOai2lwCVJGMAdKdGAGPnSBC3KBxlWx7imyyN5ygKcZ59ADRoCfRELhUfagDbxyGHf29KtwEZ3TTMAhDHAyTx1pjIirI0m3jvnnkVDZTr5wYBniC7WOMe4otbYLXVmWlnLyyIjny2YsQDg4PccVOscSxhU7JjJ6jmmRMVdZVRDuJ+93qeQFLmN7hFBIAHlnqM1LTZMm72WhXJ8iB2XyxO0gG3qSuP8A9VRRKdqrvXI4PoK0Lv8AdNFMoGwuQQO3FLFbwxzoy4/1efnUnNK91oJ6asbZKhaSQqrtyrAHjpjrVR7cxja4ZR1XI+U1NuCtLlMIzZypwSO9Xo5rcgQXeXV/usmNze4FHwheS9GUktY7q3aaRCjxoABu7dOtVvswWRmUAoqlgGI4GRWu9ukkhSIoIiMZPUD3H51BqFnNpw8y5UxxTJz8uNwyOn6H6Ur20BTfQy/sjSReYS24tngY4p9vHvZkIbcclV6/5Nbb2XlWSM0rSI7Ejb/CMZ/Os+exkgmRzGrq/wBwoclx7e1NTug590VXaM4Tb84Hf/PFRSQ+WpCfITzgVoLpzK7+b8jFcqM8n2+tPf7K6xg8Lkcnj/69WncpSSehlrbvKyAYXI4LcmkEALrFG2ZF6j1NXpI2iAwA4B5cYOPWkks4wFfkqeAQefrS1uJTb1KkatG4VlYSDoG7ntTmxMpeRFDjjKjn/P0pZlYCOPgkMeeQSOoxVm3to3k84l2O4ALnjPpRewN6XMx4XEnKHYV4OOM05LMEkkbA3U7c/qK07wq9wYT8q9+Mdume1VfkgRRFKWLZDKDng+lN9kNTdrldodoIgRiNvzZ54NVvJug7GQMqZ+XBwCa1CsRUKGVsdicbabIqBCokDAjcpB79xmrSJ55N3ZltbbxGwVolIwQeST7U9YDEu6N+SSRWiBsG2VsggYbGTTEt0i2lWZlY5U46ii9ynJ2uyjJFJMfMJxnjOeKLd3jdwEYbhtIHf1GKuSReXGykbfm5IHehIwFZzkA+2cmnzMfMMsrlkbfFweUI6H61bklIjiQcQx8Ak9/Xjvmq0UKmRgdqE8jnBHFPSHcojXqp6k5A9atTsmTN8zLFmYZtSRbslIc8sj4I9CD2q1dxzNO7u5ljP+rnDA7j/tY71nqUtCI1UtkHLbsD6gelTwX0LQpbmAoASwfHX3o9o2G6sXbXUJ7YeXGpGOcg+3p0qfzI7qUNPFtkc581O/8ASss66mmzqkMP2p2ySCdv8uDRceJ7u7BWLTbaN3HAAJI+vSnd31svmNKTRvvp8wtllZHngU4WSMEkEeopLa4jgXbMCpjPykR/e+tc1/bOpf2cyy3bRSS5VI0bCkDqfY+9ZSSXUrqk1xMxDbcMxPPpReLj7zGo3+E9PtdXhijWW4VEXptYhlYfzrl7q7B1O7m01PItZTnC+vfFZGpTYaKFdwCds96jjuJEhBwm3p7ioUkl6g3JxsjT+dlMhyrcnNRywqYiQw6cLjv705YuY1Z2aN+QfSpHgnhnltZFO5Dw2fxH8xUOauZLWVloUvKMkbKRluegxQGPCycqeAcYx7VZeDYTt+8epPA96ZcwkfNycY/AD+VF+w5O+rE+SQhlDL1AIPUU3YFTGWI9R696Yw+br8w68dfwozvb1AAPBxiqUiXZuwrpgFuA+OCKYHUKQVJXggjjFKsjqPLPcdhzTdwjG0ndz1A7U209xpu2jFeKPcGDN83UZ4NReQrMwMjA9wakjTewZscH7o4qRlj2I2duDjFK/Yd3a6ZWlto3XKzMcenFFSNtVywCkDP3un1opi5r66/gSRXHlRngKSD0POPWpx+9tyXuF3MN2FY/KPTmqly0XmxrC0Ry2/GM49ATUbzeVLGXjEgL5KAdDWad/dY7X2Wv9aDgSjhnlyVGBj0qK5cFmCg/Nj73Xjv9asqEuEdnZFAHygj7uBUBPmKGc/dGAnfNPWwrp7jnYlFRhuxyDjn8faokUA7ioGenr9alUbQqMuMnAJPX60PA0v8ArpgCrYCnOPrR5lXS92w0biRFGMYPOOfpUikhlRkwQeQe+f8A9VMJjgkVhIWcEkY6U5ssxaQgNjJX1qb2d2KyewkzQq5MgVAeOvTnvTFAkVWjUb3ydvQtipmCTRHcU+zj5hxyagZRvjm2tkdPTH9BRKXRDitLIhkfywysCWY/Lg5ApyviI7gS5457VJK0U2SoXdnd06jvTRHEVZmVypPRecHtzTT0tYa3uS2kzoojVd+AflB7+tROoLEKSA2D/jVi3V/I+QqqkbmPBJqRbPYxIYEkdCpBB96Vncnm5UVfKfeCigrjB9acfkA+TKZycdzn0oVlIYYA45fGc00dNh+cf3gMAfhT21KW2hLJEyAOFHzdGqEEs2Q/C9MnGTU0xcW/CnPQMFOKRbYKw8wNjAwMdqTetkK/VleRi8OFBOTnIp0bOildxBxnk8Zq6LEdt2T2pBaKiEgHaTjHUrTldIp2aFhtWIRy42kDIYgA0IjyStLblVEXQAcf/roijeadvlV4gcKBzn8OoqZYjBMjKCoIw/HSpb1E27Xb/rzIIJt0h3n58Z+fnmkWLznRsKQoyWI5x3qWWIBzIkUjsBgkHCj601LW4clkiDccFSQAMc5qboSSTutv6QsUEavhgCDxnPb/ABomVl/dlCwH559fwoggIjKEgk4x64p7Tn7kn3lUquDmiWrE3Z2/NlZVyFR1JX+8Dz1qWSQQhRHJ95vmRRnA+tRSRoI2DAtlTzjGD6HNRMH2YQeYygAlV7VSdhpXLh2XK7fmc4zkkjnPH+fapkRYoEl3JmLjBJH61TijMM0eW2A/fAH6e1PZ0+1FTjyW+9t6jPp707KTuhWaaVy5bEam7yOoCRAKTjOPwqVxFB+681ZFB64wPX/Iqks0VrJN9ldoxjA3DduqLZI8fnFl3k7lIPH0x9KbEoq/kTt5VxZzCSQBkPBI4bHOKvjSYhp9vOnmPNLymMYA7msF94nLkcMuAFOBn/Oa2bZ/Lt1RnKthfvfwgdFFCipFyvFNoa1kDdCNGVR99x0I9B/M1aGlW8hDoqJs+RkDHn06VVDhGdRgs4yBtPT3pqTSW9uQFOdvDdTuoUFazM7vddRZU+xnPky+Qx+fHGT6gdTThtmtkEf7yFCcZAUgnrgjms2R55mHmknaflz0WrKvHHEqllL8E4PIpcupTi7eYoSNsL9n3cFt7Pgn29zU9lY3EVy3lqsiqoYrnj6ZqM2pmti7StvRS/rn2q6Z4o7aK4eQA4wAgwWNNJdBtpbDmjgaNpxhHZQMnjHrVB5V87IG8EDHOM05Ua8lPnyFI5PuRdMnHB96fLaYOzy3ZtwJl4x6YAouTaz1HBldFSRVGCQAaj27VzCxVwdpXOAR3OKkcRQ4AQHPIUDvVwKZNPmnSPBRBn5cZPYD8aNw776lITs/lLIpROVGG4J9vSnzMxkEayHZtzgDH0wav3NqltaiP5pF2gsjD5l/Cs2Zh5qLBCSzDGM4zU83VitokMM7xqSVLZ5HY5/wqxZCeUl/KKuRnLHB+n0oW086CSR3ImB4BIAOB6U23aC9u1yPIjCbt6fIT+VOLb3C8dyo8e67KquTuJ25zg9Kd9lDglg+7G1QM5GfWtGZoxBLHHCjTAbgRjn0yfWoojJLbrIwKc/eJ4P0pqK6iMtrY+f82Am7BBOf1qG4inQ/IjxsoDMAPr39sVry3cEYVYz9/GSB0NV7krBuWWEs5GEd/wBTQ1bYuLd72M2ESvauhbHG4qMjkHH/ANepFDEqinAPLE9DUz3cAiEMa5A6k9zSkbkU7SSeTzx+FP329WPmb95oaZsWzomWVyCEC+lQCNzKcjAU87RUxcKwcPlwCxPf2FQyzyIzPvy2cjn1+lU5NIEnHQa8p+2NKjNuOMn/ABpZN8zBQfujJB747Cq7TSsqgn5APXAP1qR1IX5ievIP+evSpvfQewslzNCm3eED/Kyk8UNLJAjFC4YnO6mFEdlZpNnPIx7USNK5XCbkXjIOc1V+pSsJ5jOQ7DPOSSeTSbwRtGdq8524/Ol2uw8vy3A64AxSIThwQoCkAkYzUy11YN30HJIgb5lIz0I6UTOpIA6g9OhNHlPxtxgEEkjrUkSKAruWIB2n5ulKzG1bfoV4z8zZGF689RUuMRnrzj6jjpUs0QUZR/fk9R/9akWRWCxkBgOmBzmnZg7Pcgjx5jK4wCemM0qq43bSPLPIAqYuTEzsoVlOCfSq0gnhRnKhAeelOwO1t9Cxgbj5b/MOGHp7VJHGrMqYx6c9qqRy7UBIAViev+eKkDMdhQD5vzA7UgStcd8gkmiBcyEkDJ6ccVD5ch/djhsjORyaljQxpuPBY9Tzk0pfynUsrBmyRwDii4LQQKVGMDI6YGacnIALd8Ad6WJfNwSw3Yzz3p4jVsEB/XBNFri5ktgEYdBuTLE+vXmoIkdS0SsXVTkrnG76VKz+SmcYx/eOasqfmi+5zkHnP6+tGwO+zKiW5ZSw2unU7ux6dD0oSN5MKQWVQTgnlR/Wr0UiCQhUXCfe44Y1UKSq3mNICSTuCnAAPWhqzJ1dugmZwxjkH8IA3DJxUmx/M/d7RvXkIOvpTGeTbudeVGDz/nNMy0sqJCx78Yxk0rdRpvoTwLC7sjSeWADyMjn2FS2wY3Hlu+1c8uRnPvRHGhKow3NnBAGRn605bG6Gpu6FxEBuDEdBipktHdibT1XQLpty87hErenGf8KlErmSPIwjLgrjB5ps9qGMT/aMuWxsK8Y9fWpWuGS0Mciuvl88egPPNLroWnaN2v8Ahyubd40KSA7l5wOcUtqTLciNjgR5KEds+vtTWlXJEQlUlhs56+3NXbCJZIpYru7ELkZyF5K/X2pNu1upDuSIHiZSyvLco25GwG6fzHtV291KbU73dqVqFVlxHCucRcc4Huaq7lt5IEt7lpCAHJkIBUev0P8A+utrT7hJ5pZETdIwwWk+bPrx2GeaTjJbomN1pcymiC2sVpNPIqRjG1uBx3/KptOtILhpoVm2bB8ozgewyfX1FPnfT1uXivLZnlLZyjEMfYe1Ek+nzpKzzvDJESIowS5/H1/lSnCTVkTZ23uVfKGoRCG2TfNE2WZvvdaht9MlvXBkOxyCCzDOcf1p95exxw7zbLHOGU+Ym5GOOxHI/Go45pJTJPHKURzwvoe/P1q+Vuw9kpLoF7ZxLNEobJVPvdO/NQFXhGxmBTgc9CaklaYuqSOhmClenpyKrLdQtbjzHLBeqopJz/KqjGwult9yKQQNcDzZcR/eCqMbT+HSojcpbT74v3isvyqxyQfWp/IiniaVGGCQTk4xz396rDTJ40N00RML871zuUf0FJpa3NPXoSKxkCSTOrZO4BskZx6U7zz9pWV1G3+6ijANSeSPOAmbywcFVPA/OpZrOV5FjSIh37Gno1dkpK/9f8MZ8xVpzxkEnnJ61GreXI6sQVYYZSO9aH2WRcmUAHnHzH+VWF0u2UCWSQPuAGM/nxVehakk2ZtxmFrcKu/6HqOxqdLHUbsYED7RnacYrZV4YwFiiVYVHGODmgXuI9odiMc/N0PsaajJrsRzLQxf7I1HO6VDzxt3AH8qatvIhIkVk68NwcitsXmzA3HA556fnUct9K53ShJArcFl7U1Td7tjcraWMDJ3CZwMHKlhyB+FSqJFDsqbpDyAGHQ/4itEXccjZ2IFA/hQA/T9KmS9AiJS2QlRjOwdPQ0OLbCUum39dTHwqxuHGyQHKg8U+U232eFVR1mB+bcc/WtnfZzSD7VaQseu5QVI/EGifStPvQEjMiygHaA3De3/ANejld9UGmlmYos7Eyhpd+8kYbcNpoNkqXG2U7QV+U9c+uT3NX/7Evo4wQyg4+Unr9DVe9W7aNDOhjZRlD/9YUtGGzV5FCTTTMY496LGoG1ge59jzVi3sXOUmB81MfvM5yB0HvT1mMkeSQwYnI7itKxZZIgXZ2TkKucGplrYPaOMbFOHTvtLrLdbtpP7th1x6mrq6bG+6OQmNQRk4wevf2NRm9/cmzEW5xyp/pmp4Lm4WKMXTMrkD5SRk+lJqzs3qHvNdkTxaZbRuF8w8nI2nI/KoblXEhmiIkZQAS561YUQl9u/Z33HP45qrFdCG9khZHMbdAwOCKaj13I1buyndpcfZlnDQyxcfd+8PYg0sCAo2Y5M5+7jJJ9QO1TTWqxAyWqkKTlkHPPbFTSXccoVlYq+MouRn6UNN2Qko7JFF4SvysT1yAV5/GoQm0u7BsnsOcVdedZYi6Oqu3GWOccVQm823jVJGjIPVkJ5/wAKGmJPVkKpu3KWLscDP8qFUsGUHDA89qjeYEg7scYBJ/WngxyREOrB8ZLLyGFO+uppuh5ba+5QA+OenNRFy5IVsH17VAql4wyvjHAGTyKWNiqHDtnPQrjNNvoimveuy15ZRCcnO7qe3tRUALGJV3Z59aKStYnV6/5ks0bLIDGo2hevpTJrc/ITkJ1PPB/+vUkjFLY7ZQSB/EOKRiTGN3JONvfA6Ucq2QX1TG+QpYEO4XHVcdfrUiRJbuzNglwQOOlNmZV24fCs33cdv8abOrM4dCH25PzcZ9KHawk5N6sJMyOkSHHGWbPb+lJ/q5y0oLKDwcZyfb1pY9pEjIVjIA4I+965/wA96gkkkBJjI3MuDjnBPb60mx2elidFdmWcgBpSQATwq5pViZRKhkVyxxuH602Nifk2kkLnHTP+AqdZcwbTkKAd/wBe34UWSKd77EaQiMxxR7QMcg4OOePrUzQLgySsrK3B2r+VV1McpyU+WMgbmPBPoKkmibYyxM7ZO7GOD9KLqKuybXdhQYYkeKNUI5y7jOKrh1hAUqoLNwB6euKkDHJWRNpGAoxxz3p7Qrby5GS2cAg079SldXK4aaZ/kCgKf4j04qZpX8so+XGeg4xUtvGVL71VuQTkd6eYQFPzKQXz8xAH1pOTS3Jdk7f5FBuEC7QCxPAOAB70/fiJXjCuBkA9zVhNFublgplUFm+XGT8opfIht5Wt5HDbBkkDFRHpbc080V43nhCjOQD0A6fh+NSGZ3Y+YrLnkEDoKQziGFvvZ3YAz2z1pGCAsQ0nzDc7Z5Ix0AqnJ7ENNvYsecTLHFk5JO4A9R6Ux7t4nViI2VW4+nvUaAeQAUOxW3A5+9ToLcTgZkXZ94qewo52JxSXvbFyJ1mulkH7p+eQwx9BUyEZKzQ7ePlI7/8A16YkNv5QVD+8AHuKLhDPHh48kkAHHNK+hmkv66Fwy2rWbQrcIX8rDEdCfTI6VDDORarZr5a5yfMZug9D/h3rMEflW2GYphunUjHrTVUzPsdyGPKs3APPWm0rmnJo9TRucQTwyWjKREpDEdDVR5DJICUy4G4rEAAD71G7eWy7VTCjL4PX3HtTgluRuVnUv94+tTZbBFcqIElEpdZWGN/AB4z2ojm8qcpkiPJztPJP+RSPCUBELbmOSWzyADyalS3jbyxJzx0HX8KI+RTUXdMAXZ2I3AdyBx+VMkhkMaMBtf06U/yWE2MERM2cOeD+Aq1GQTja21PmyuOB65/GnZbkyly7FQM1wksbFgcg4GOKZA5VNm4FlHQjr+FaixhkO3G5+OBk4qv9jEPDdG/ix1FNOzuxeRWkWKNg5G7bgjHc1PA8hjJXbydzM3P4Cq7wvIUIK4BJIPTPrmrkCAkkK/y8Es3HB6+9NSXcppKJC+EDEKVJHzFjnj+lSISspilLMwGdzDhfwqNso0mG8wSctgf55p4y/mu338d+O3/66pTJd3EjmjjX5GkcDABYdMHvmleGJSu05XcDux1FRzoojDTAjdz0wTx60lm3zbmycHAxyT+P+elJ2G9Y3TNQToyAKmAykYPAB96rW8Wfvpu28DPcYpLX9229idpOFz6c9qcs3mZC72XOMxgYXHSqsnuCT2RNOpkkgkaErGrBQcYz9BV1JAFUPIrj/drPlkaKORAWfPIBXkHPGTVqCbzJm8wjY6h1yMEY60tL2JtZFiC4tiu6MRlhz7/Spbq7dYHLYj27WIK5YgEE8j6VSjYzK8xARIVYgr1z2qvdXpvLQwo4Dgggj7sigc/jRpuNXa8zorm5nnkaXfG0YUk5Xp7j8K5q5iHni4SQCRhzFnBX3qzFfNJa+VKV3BFOFzyOlRRi3ctIxBJBTIA4z2xSatqgcne9yJJ8KVBV8rkc8/SqTKYzCQxCjl1XqMnpn0qxNDHbRGJUO0cAM3GKXcTEjKgiCYBxzg5//VUb6odnHVCISsmzerY52nOOamN0ZbAwZ+6xGQR0zzilSSOCXy9hYbgGY9WOOOtOkQSQZKASZZj8vAx0X6U07IGlbUqXnzlD5ihl4G0YGB61BdymRADI0uT1PQH2q99jUr5rj90eQB2HeoNojkK/IWkOVI6bcUX7FRWmpmBWjuPLRCUBy56AH61MZymBuUgZ6k1MjO7PGUIQ85PqRxSbFjILFDxwT/D7U0NtJa7kMKu7yYGwABiH44pQql2IbaQo5YfyqfeXfduCq42+xH9KanJkcKducDjPTpQ0GjemhVSCVsDGScHJGaJo3jlPRgQGGCePerByVYqpUhTk5wRj2p/lLJKq7RycknuPejzQr99CqVd9shI2u+GIB/KrKIqqFXeFboRgnpQYwVw7jdjPHABqQNEoQJyUxgf/AF6bWg1K7cbkDRMk4LS5Rz83rnFV3hPl5cEO3RR1HNWJTKFJCMqE/ePQVDFKxuFBIwpxu9QKUrLQpPdsSffbrsJyScH39aeQ0ajYF4BVgTwKSYN1ZySOQR396i3ybSgPUjLCjW2oKxKIBycBm6gnjOKiEwD4BYDONzD/AAp8ABO05L9CQemO5p+1U+YAOXHAxwPwoBSiwQxfaN+5WLZPzdBUjo9xK+Gbb1PHOKI40DJIMrjjA7Ub1j3lXJ5PzE+nTiqb0sTFrdFd4FRzHI2BjhlGcfWrBTY2Awxxknp+FOihU27yO3BTggdeetRFlEe3IJXIGB0+tJWQ9WhVf5QGPXsO3tUMj5f5iCeR60ryshZSGY54XGactnPcSZ2FRjJJ4H/66OZFbadBQwiQrvBHpjFJIXaIPg53AjnP5VaaB1LB/LJxx3qF4pWIkjJK52lQcjPtTFdPW4LFJLl5GREPQv1FTfZ44j+7fL/3weP1qLzLjzDGY2znoo65q1FZCaNJPMIPHyj0p6Ck9RhKE7i2FPzHtzUjgP8AIuFG3155qKfEJIxlf4SP5U37RyQihAeM9am7EopErgO8agBWAC4J7etRl/IuPLkyV2na2MD8D+FOnXfDw43deOo/E9qS5iZQizXBckgBs/z9KT00FdbsswQStxGQR953x09RnPP4VPFC8LMRcM2VPBBxioPOcBo4X8zYAvyggH6VGi3SL5gVmhK5ffwR7j3HrQ3pqxOPNuyeO6MbsY1Zi64CMMbfoe9P8oTwyXCsDJEeY8cj1yO9RCGWd4ni/wCPYqdzA8g9uabebbbE0TskhBVsr94d81Nnsgsk7Jl2AW0V0puY2VkI/AnODj/PWpdfnjlMMEGGcnIAxgfj2rD853vmkdyqkgMCcnjpUst1Gt0hDKD2bGcj0p2S2QJNWuWoy6WnlwOhjK4+bHU9gf6VEkt1GV+zllBUZwcduasWdhJeLKN3lxD94ruwz74B602cR22LmFV8yLhyDRDRaBzKO5DF+/3PcPNKxON4Pb0qcXd3ZqkIwoxuDFQSPy61WspUuJJndSWC54PBJzz/ACqa2jS4ugbpmL+WR1AAxyCPqKfVsHq9fn/wxNA0l2wfLSZyGx0BzyKk1Ly1Cb3OQGAGenHHFUw7WVzutxIIW5+bpn1ovi0kwcKWUncMjI6U1e7vuS0nqTLZQ3F3A3myFZflO7HJx2q1PFYWStFA299wxgZOfesX7RJgJuIEZyMH7p+tO3GTGZQsjnIZvXFFru71L+LQ0YLfzphLLJEVPSMDAFXjPMPkjjVlA6Z4x/jWYkvlqqEASE9uB/8AXouLrG1AQzZDdQAKqK6kNO9rDbdLiBpbeZzJbOMhWXdjngDt+FPmnuVhCYYwqQybj8y9sflSQTNOzqVXaeFwCfyqOWOSWMBxI235SSff0pXu9B69WWFKkKwQNnoQOce/eoRIzy7ZMhEOQcYOPf8AGpsADapY+4P+c0kPy3bibcC0Y2DPX2p3bQlZaPUUjdENpJGBtAbJx75pHVnyEwV+mMVMUfJ8tQExzu6UbGXG5g/cYGRTTFe5UZF3bDnAHBzUBllf91gNs7MwOBVpoHVvMB49eufcCneSHHmqpViCCAcEgdzRfsVFJFVElbghgOvyCpUSNR8rNnPIB4psckbAFAQvZs89fagN85Bl49OhNNDfZ9ScgBMlcrj5dp7UeY0eXjccjBAbt6/WkJYsARtJHytn/PWmBUBy5xnqMUrk7aFpbyUo0bkMG53eg9KTzZiisZAyYwvOefaq5IaJyAck8kHgYpEkZlxGwOOoBzmquFtCSWKIxj7qZ4yuMdPSqKRXUU5jiBZG53Rc5xU5bdgHgD+frTXUxEEZOAeScYqWkaJuKvYknd7V47hl+UONwYYzn3pDJaeezvEHf1BOcH39aclwrqRIBJEwwFJBzmnypDLG2BsdRt+YDmkoEXWnSxVtJCryqsrdem7JK9eKv2mpw+c6l2PA2sO/1rKCBY2MocqASXHNQRbWuNqqSe23jJqZaJtou3MzcaaOGFikhIZuQcbsmsx2kiOXTO7pu64/ofeoSGVBKd4AzgoMimzFgilpWZmIOHFVdNWJUVZ9SXEbszE5G7JBzke1Szx26Q7k3ByRjJxms5hIc7UIYjIycZHpRJcN5SefG2F6MvPFSnrqW03o9i4IDtB6I3Gc9DTxbBC+4qhI5OCciqqzEMRCP3LKAT1z+FW0kPCs26IYGem2hJITTWnQhaJIoieCScZUZwPXFPEmYsFcA9ccUyRwkmFUjqM5zn6+1Nmy4CADnkHHtStZg2r6jdoZCHXKE/LRToXWKIxSfMCOGB7+9FTzMfMxy7miREzv4Jz9aJ5ApXdgSEcbe3PQ0Qrc7CBH90Hnpj65pIAbkMW2IFzjnH4U7O6Yoq2v5C7lclSyoMZUgYwfrTYA0h2LklgdnqRViDTHuXdRE6hBy3TGe+D2qaO0+zKjLIrynP3vlBx6Gk3ZkbozSDujVVMjMOT0596l8vy2ZpNwyeAOTn2q49tLCwkUuO5G3gn0z3qJQ11kL8khPyxsvJ57H1PpUxd2F21drQhVhLKkSAqeTjpn6/rUixCRvIKvGDx8vQ8VsRadD5DTCIBxywb+E++elVbeQSkoEDyE4QdNxP8AKnK70QOSSutyhLhJUUqRHGCFHUHPcj1qU2sjQoxKpxuHtWhDpzATrMvzoyqCpxkscd+2KJWWK/EUcKTxx/e3PtQnHdvrUxu9L7icnoZpRpojGq5JYoST1OO9IltBBIFli3nOAU4B9a1wLW0vEMjwlJPviMHarevNU5ZAl00o2m3Z9kKIMsT3xV2tZsbd7roE0DbEjBKW7jq1Vo2SOeNJUAIYfNkEYHbFaVzMXtggjwQ2B2JA6VlMzFhvz0yD75oSUZAttVobM155bq0Uh8pUIG44x6/yrKvZ4WIltoyjdGPByagi/dyFT84A3AE989TVmNvNYMyKA5GGJwenenutEC0k3/WpWkgnfy3dwCBgDIwD7mrsNoYAsSBTK4+Uk5I9c1WaNBujVRuA6k5z71HDDKX3x7jxwQcAexz1pqwtWrX/AK/Muwx4ju4ZADICQH9PTHtSQwKyee/lxiRgF2+lV0mjt5JHkOcnDegH+FPtpYxHx3JODnpzjrS5UypKVt9x7bbW4jSNlZSclifzBqwkyRwNvLAZO1ieoNQsEuCzOm1QQAR1P0/z60940jtWRkdUxnJoegnokpEOxLhZGiPyBshm4NWFg8x0cR5QfKpbrjHtSOdsTRhd0gAIjUchT707y5BahFDKAMleuPes1Jbsl3toQtbkZY7R/A2fcdPaq/l+a5VFyoHc9B9avvCjW+E3En7wB7/Sli0658hECxRln6b8jA6k0BFpK5TgtZpF+RV80EFvUL7etT21m8l0R+84zzjjn+vNaWn2E0Ql2szpkqJFHMhB5K598VpWbsZHhkR45jGr4bj5h1/Cmu9yne9u5iz2KtIVIZlVeMHH1qBGRGdYyf3KE884+tWL2/EdxMbZg4D+XljjLdzjuO1ULi1ieSVwSxK7mwPlJ45HrzTdwtbSWxCZnD+cr7c565GPp6VMGkkQKQ+Ez85B5/yaZNEVijaKNflbkEZCj1q0CJ5IzK4aMOD8ny7jSirqw5OPQieJmVn3HYMAOnQe31pfJWOJz5gUuOAR0+tW2fzyISxaGL7wU5BY8gfhRLbRgFxh1xnaSTnrTs9VchNbNf18zNnjbyMYZtnzMEG3gnn8eKcgQQhQz5KnGORVs237gjzmiLY+UHcB9fSoMorrHcMIgnOVOSy96a0lZlXVhjW0BXLMQBwq4zuPrUUmIodqjDhucnj/APXWtPbyTbHhijIblBjBP41iXdvI8uyEYwTwzZyfaqloCd3Zlu2miOwSIH25wpPWrEEnlElondWbB2jGPSsfEpby1Q5OGIJ5P41oQvLBC+8tl2woI6H/AAqlYqaaaLqmNUuolQ5A+UnvlapMt20UaL+7iKYUt+HX9ak8ySCJ3AQHbnk8Mf8APakieR4gZAvzA5A9PWiyZktdSJY7iKzKFiwAJxn72KilMMi+XsaMInCVZYzDmNcEcDAxn61XW3lmmZnUqTxkcY9qHa1i1re5Et7GHyCkZKhTg54HGf5mrH2mNCUjz+8HDgcqex/H1quLZIxIYtkknQo3JP0qa2iZY2doQrEY2tSv5DcYu7X6FuBZbhI4zl3OScLwf69qeISIJ1fOZNxHPJIbaP1xVDzpBNGskpRh0YZypPHArUESSyxl284ZLfe5+mfc0b7EyXn6Dbu0dII4RDmQld7k52nu3+fSkMm3KOwDqADnnj6VenmWKDfJlVBxyMkn0HvWdflFR5hbTQscDcQPm+tJqw1q7sd5nnblJVVwVO08Y9KzsIWZkZBxxGD+lXLSKC+tyQj4A+ZwcE1VutLeGUCI/I/I9RgZNDaK5Yp66BJGTMgwqgjB9Bn/ACahkRHuW2lyB8uFPGc/SpbZyJCsfzjjKk4z9Klt2EcDecAGBJYDkenX16CldpAk18JRudi2yvFKWfeVPcDvmiKORo1VpeFB2getWpo2a2ZwihmYFUxx6fnUUcbLI5PzEHIOOMH/ADiktXYbenewyOOQ5ecEbQOMDLdjilbYYg2cNjBwORS4mLqrEErn5mxznpTTFtLLuLEYORmqBsIwr2xPLuDkEntnpSqS0TnfglsbTxgCliUhNyYC9xnr61GEdZjKVGw5wCfei6QISOCVn8p2YqGJODnbTpItsmMbU7ADj6UMPL/fKxCnkZ7+goRXeYO+0bslgW6VMi9F8RH56GQMxYhvQVE5AjJj43ZHI7VPJbwKrBGIO7A9PrimqgaDPoOD2PPf2qpX6EKStYWMbYgo3EkcAcChGJYgoo9T059qAZWISJTnB3DGRmleUxMCRhBwARjmktXYu6+Ysa7nUliMDkY/zxTVUxPsmQFASQc5zTiOR5bljjJBP60ryRSLySjL97PUHtT1ItpoTSAxFWJyvGd3HbtUCDcMqgALZAXrilWfq8qlmI4XsPpUsO0MkwQByMZB6Ad6WuyBrrYuiKPZjaiqV5DDB/P1quZG2Pgrt3bdx4HP8zTxKdgWbbvbjI6BeecVVmlzEI4WKRDOM87j2qvQW+pcjt1ALhHYno27tVuO0ECtJuKjBYjIrOtrwB0CMV42kE+nerF0Jt3lxS7Im4+bpnrVK1iXfYlRGNoZpMI8gBB3dM9APamJLbR/uWYAJz9fYetVYZB5qGQvndgluR+VWpY47qRR5aAxNkuOi5p7i1vr/wAMSjTor5WcjIODt3EU1NFt2UmJWYKePbHtVkSyCdlt7hJDtBJdRgVQvJry2kO642b/AJ0aLGAw6H+lQ1rqOMpX33Jn0hiiY39CMsMcZqWewWadLB2Efyb5WZR8gA4p0fiOaWNUuI48kKwdTkEjrUFrdRtfzXU6b/MfBXPBA/yKlp20KfNuW4bNkkVI4JDDkAFsjf8AQelWJ4pl+8qqT0Ucg+1T3urj7LGyRqoDq25W6c+1Jb6oZUeeURliTgN6fWnGEkiXZ6MxpLCW1VtoB8xgABkAD6UlwrkeUyBWKnO8Bs+wq3eakk4gaJWZlkDDPGD6ZrLvbsOqyuN0itkgHhRmqs4le9J6/eV4rGWPespRh2IHb0zTri3hZY3xskAw69c+4qeWUF1cnBb5thPT0qrNOsqjKNgcHOeKVlYE5NruWLd4hITcMv7tRsDHJx6j3qgbh3EjkbUcDuMkZpZ41O1VQt8u4nuBTJAyoAxVj0xjOBjrSWisNXvdjLe48iQGEH1+o7jFaJugWjkDDepxkjGVPBz+dUbbyjkSZyRwTUxt90Rw3XoecfSkk7A2pOxfWZJYiN25kO1Rnp7dabll+8Sy5+72XBqqihDu5BwcDsxxRK77SRInABZcmqWugrKOzJpkQXEu4sGPzBcj9f0qtHIFkSRx5gDEccfSoxKypvRfMTPIA5z6ZFQpMYnG+Ek7uGz+IFS7MqKktzVncPGAnyszDBPaoGLsFVAzHdgZH51EZJWlEePJ3ZIUnNCqy3IQSpy4KsDgZ70SbtcSSv6epu2qShAE25+6RgDFKYzlmwBubkEZPH9arNGIrQyQsySDAZw/3h3q5bzQFE+Qq3cNnn/GrhotjF663uRS+fESYgJUbkADk/4VHIrvD9q2bHiO7yyMZHfHrWn9oR2O3YSe2algtZJI9sqrJ67OmKbfcu93fexVRSJkmVn8plBGOhH9Kn8shtyKTHyR2/WmWzR28cNgv7+YSPGUzyACcH34q4LG6NsrwyFWH/LOXLIe2Pb8Khu2jDfRGfM7wJ5zJuiH8ar8y/7w7ikyJVbhQjDO5OMg+mKstdypM1vPbxpIg3NCG+Zl/vJ/eH0qGdJdOlSaPy/sUoDeUp3FQe9HMxtdDNaFI4WEB3AZwnU5quwCvGkkZRm6DPH6966O4sHJjmhjDSSPsGXwHXGQaqvabYdt3CyYbbuABUH3Pb60ue47vbUpypJ5Cl1wvVWAyfpipYrZZmXHDBTuUr1NLd2kloPLAU7xkDPT3HtUdlLIJVdcgAlee5qnLTQmys7kPyykYjKso57fj71G83ljbsG7plfap3iIEgO4gKTGM9qbLFGsEXysTIOntT5kK3mV1uACUADOTkZ4z7U0OGPmDg42/d5pLmFk+Uplc8c8j0FPZWiwApPrgZH+RVXLUUnsV/LYsZCvzY+UqacWG0EltzAZB5xz0pWyDuR2JxnaD0p6Mk6L5ikFfl+UZ3UnKwWaIbmQ7SE3EenvUcMbqA2SX/i9farwCLGAVGBnI9aRztIbKg45z3otzWFzWRXV3R8eXuB7kk1I0aD50XYxGFHBU/UHpU8ZEuSPm2gnkY4qEYCkgDIB64zmna7syb7WM1wyyFGUdfunp+BqVXXaoYZLdu/pVh2Lr1UE4yCACKrtDH5JkH31bGf1qZI1TTV7D5YBgN8odhwQev19abGVQty4J5OfaoldWBR+GHqcDn0okiUuuXcEDGc8VLaego+6iUoruoJ+U9wetDIEuQFYkLztYnBqKBhl125CDHXgU/dGSA5dGByrdOvrxT7g5Wd5CNMyEhkAXd0H8NFJAVVyJlEhzxzRSvYd766m39mltESaYoYmcgEHvUCyx3V3JDAu0o3z8dPeltniZsTAurcFRyBWlDZzwEzLBmQE8ZCgD3JPpUOSvdvQwTW1ho+0xYg2gpt3gAjt3PrTTYSOrTGIyRO4TGOMnsB1osorW7lmnv8AUTG7AlVjBAAHQehI/Ko5bsW5ZIpZ2X76FlG72Iz+NO+3QGuVqKL8MDlJlEDoUHVu/wCA7Vk3hkfeQirnIXaOc+1SG6ZLYNvbcV2kE/1qOQA0QMu/pyIY1AjYpnKqPugjv/ntRK979QSXMrdSveXDpprSHAIAVxu4b/8AVUNlMqJFJA26ccqobkH1Pqar3DmaCOAylo/vEY+77CrkdvDaSgIx2nlgQMjj1/z0qYykm2y4pctl/SLt1I07KHkchlXzATzx0yfxNZ08LBwZSUhXkDOR+VKj7pF/d5ODnavWr9pbyOQ/lqyswC5HGfT2xU8z3JfupKxXtrd7i4XIkSLbksy5bp0HvRMrSu0iABFHyBT9wf44rXuJYYbeVTIHmEeyLa/yj1b8BxVa22XsaK8ckMGwlxtIX5QPmyepPNEuZu/YFzP3mtDNtLZiA0bMchtzMfujpirhtCImRIlOwZ3n+VT2VrIXEy28gjZvlbB+Zc8ZPQCtZLIRkwzNGA5wpX5sduntQ5XRUm73SOY+wxInzIxdgcFTyR3PtU0NrHLEHRZHhj+8Tj9fxrR+wTHWTBcFDG6MqPJwCAfamCyuNPs5Li3ido3BJk5Cbf65qHLlV+hUr7JmUy7vNdNyrjjcB09aihhnLDcwbHK9hV5Ip2s1uFhLhSFO1chfw7mrn2Ld9mhhmeQyg7mA+932jPSri2tgvbWJktBHJbttALZACqAQc8Gn2cHlWgE8bu+CFVerc4Ga2DZRW83lTyqNrZwgyeecYA4/Gob3Yt1aw2qia7KkMqtwoI7n1x1qnptsybu1rFZI4rYxxSKizStt2gFtvc8/Sr6eWw2tgoFyPRxVO2Nl9vnudUEf7o+VCkWWHrn35/lUZS9kujJEjGVhuRZuAR7etDlfQTprZF63QMTLAiLEPmkd8qRxUF5qiSRpFFGXXOCM5GPXJ5rSvY5LHTTHdr5rykEurEKAex981NcaQoijMKK8ePvMwLEYzn8/5e9S9tB8tldo5+WXhWUFVb5W2joemQav2tylnp/2JSkjrhE34zgn/PNVbqOH7M6xxSLKzbgvYAcfSoY2Q2MayQqlyi4BJxu/+vTTeqDVRVjYhgvWUys6LDG+IkhGDnsKz77UDdM0pZluEGwZIKqCemetPfU7iayRIdsbgbPlOME1UuLoeXbo8QYRna4IxvHFXKLtZsTeqGwSymGK3McRhQk7mO3cfX3p2pNGWaRWwpUBm6Dj0FQXk0txPHEpxEBmNW6Kc9vao7WNjMsM527cyI3QFu39am19OpXJb3v6/MtWqCZkhuCFdjlUJ+6P/r1C8L2rr8rxruBICn35FX2Vb+381ciTHAQ8+nWqtyS/kJNsRhu3Et1xS1UtRRk29Ni0irbmMRRrJM3zFd2Pxp7Tma2dnCoQCDg9KyIoLi4jaVSI7ePO8EZJrVFhG9kisAGKdR0GemK1VmglGz1ZFchLciberKRgA8cevpUjXlnDtkwJQR09/UmhYJpYXglPyIQEBXhh+HWkWwtkYwy2C7Qx3EdMU9/MLJaMpS6w10zpGxibO0gkYI7YxU9qY5GXDq02OyYUY61ag8v7ecJCsMaCPy9oznrnJqQvG64VvmzyOn8qdm3sJ8q3RVkjgQlkJV1++QQ2fYVmzmSIJumWMuSF+bPTua2FhiV/M8sKvP7tcDkcA/lWPcRebMpb5VDEqMcgZpPTYIKz8ieFHYRyzEKG+7H3Pv8AjUyZyzKm1AByWzjB6Uy3cLPv6qF2/MM4q3A/mq6EfNu4Y85+lCYp3T3ImmkTkbDkdOn4e9Nkmfdloty9Mcf5PNW1sIWVDJhif73+FRXCSExrFGjI3G4kjHrVNjTbWqIrW4kaSRDCgWbbtl2/MpXqPx6VYvYmkiCjamR94Hp+FQSQPbQqoMcyA7sbemfeok1BSmMBmGd+eDj/AD1qVZjd3okRuZJJP4Sw4/epx+eadYNctN5e5FxgZ68HtxS3Ana5jYrEwdirFG3YHvTLiIIoEchGDkEDH5UctnuFnI1CzSSPIeSMpH7N3I96gvo7hI8S3Cyc/Mr8HHoT3rOhunZVgIw+CWBA45NWbiZvKDhsk4Qqg+79falutxa8xNDfJHEYZd0cvTJz0PtRdj7ZApt5FMsZZtm7kgjHT6VEI/3g3qZYMfMWPIHfFI8Yt4HZyrKOY3I+YHpjPekrpWY0nzaImhaJ7eOONWTzAGJJ60TQIwR9+WQ4AUdat2yiNIrcZCsgchl6datrbJvcFRvb9KLKxLvfQw7kJDbhnz15LdR+FMCGKLzJAEU84xyR61av9InMLyyn5QdzBTyBxz+VJJDbrAys6yhkKKMY+lJastNLTuVZE2hTtBWQBtuCPcfpVa4eNUBwMgHgcjHbnNL5yxxpD5+UJyqggke49Kiuo2iIZRwx+nB9KTdtSrJNIhzsG05+VcnjpTrCTzFbzC21TkYPT/OKkRCwBJGAMDOOcGnExMNnmqMHlcYyf85ppu2oPXQdcKiIMMZTwGUnIIqJZ2J8vfu2AFcnP1B96bIJFckDenAHqfyoFusltJPCuGB5XqRjqaXPdD7EmGVWmU7GYnG48EVG2VIVlUiQ7SM9+xHtV6C1nFrG4VWUgEAc5/Cho7eaXaQqSqwyhHJP+FPSK0BtJ6lR4vJ2sM7RwRuJwKRdwcAoChPOTmr01uh25yydSMcFajuYYiSIXLADg9AABn/P1odtiXJvYpNGBMxVkVcglgOBT4orhVbBQZPPc/ifxqqkkZnXeGYDAA/hz7/571euJ3il8rgpIFY44B4weKFqV7yF8vyCPPAGeRjkCgELITvAHXI7n0qSLzS5gkVQTyhIHSlNhMxLBVKIwXIPHvx+NPmSWhMm3K8iuVkeV8/M5wcDjI9KfKDJKDHHtIjwRnp7GlW1Z7kSGJ2DORyeKVtNaGQeaRghm3KtKOwbWdyAvHG+HTbJuBY4wW9TV0khBGWJUHJ3dajePZAQjF3HG0AH8afbL9pUBjgcB1x7VSa2Cd0RhYtzGM88Zckkd6t5KxlVABJ5x3qtHGbeVxuXnofp1FWRlixOwYGQM9BTTtqKSuQvcJGQEByckHPFIFkmkPmklyANucgDtTjaLMD5zHj5hzggf5FPVEZ9qso/4F27U73DT7LKkUKhCoUBmLKyHoMc0yNvs+1XDbGPBwcLV2W3WO6Rl2vkYcDvx19qUw+bHLFvIHHGM1Lj2C66/mNuoS1tsjbaTgD5u/enxXDxDyyhCbeM9F46ZpYo2ihCiXzHA/iHXH8jUErktGpYg9xnjNWn3JtfbVEjNv5lQEr9xcg8f41UmiMluF35GPlBHHTqanCAtuDdVIbAyKhhtmmiDBwpX7uevTpmk2NpblSSP5Y3c5BUH5SRjNWbc+bEYmQlcn0702EhW8sDcBnbk1bSyZSSrsCo44BHNQnqNvS1imWjQOiIRgEKc4AA7+9RWsJmUymT8ByMfnV2eGXaAwQLkbnCnn2oSS2RNrEYJyo2/wCeKG76dAUkldIgkgMnz42AD7gHWnWwlkT5wVUk8Lg8+9XGMAXejgfMcFT/ADqJ5UQO2ADnBHrVpCUruy/Qp3Vo3nq6v06ruxz/AFqIbsqxAVehBPAq4yAwlnfEjdfYVA3yKWdWZsbSoPDD+hqJa7Fxd9mMi8y2Im2nYcBwp59jinSySSMxChtoyW29R71MYlZC64dCMfvGwV+oqFVcL+5IAA+cMOCKSfRCsnqyATzINrIpj5AI5pEwrH5Sw+8GBxU6wK8xUhsKO3OP/rUw2zW+QGG7J46j8aH3Luk9Rv26XmGSIJu6EHr7VaW42MAJXyuOcZBH+eKi2k/fAO7ow/n7VLgYQ4IYDAJ4yfrVcz2IaTWrNFNQhdBmV42HOB0NTafrMqGRbi3EyM3yFOB6cen0rJbyoj5hLbSvKsMj6igNGkoELAFvmBHSqcpW2FFJItpfXUWrvMqJ5aSFkjY9MjkZ61ozeIHNv+5CiRhkJvzz3A561grGjuzOcMecHvUaBUzJsbcpyATjI9QfWjn95ySGtbNmg95dXkitextI+DtdSFMf0/zzSW96QqxSo7nlOCVxn0/wqHZNKyymQSbj07jHqe9RzNK+9iM7PlYkdPrUOpJvUHTUkjcW9vvssCXM25bR98ePoeOaji1e4mnjuy+8LJsKMegPY/5PWsJxcI4jjnZo2IY7zmppklUABkby+rqu0EUKStyj5fM1bm7jWR2hDIq8KvUKO+PQe1VVkYoWRtrHgf3M+pHanIS0caxsrrtJYMMhv/r02VoYmjZY8o3ysp4we2RQ/e1RDio6LUkluCETemCWwR1ye9TfI9sqswQA4yvOB9arbFkIDORH2bHp60SSRQvjeEBODznJNQrsiUVayWpfaNLiOD7NIHmyMopyWOPQ0qSNIgaOHbLuwUIABPpiqFr9jndo8/d+YlTzj3rXt9NaW0lkaQeWSMAjlcU1OzUWU12buZVzayvK7ONrdSRwo9ulOtoI5ULvvREPJxksQeMVqfZfJsdxmbbnJB5NVLuK5lZHtQpQcFV5XafXPelK78hR3st2VFwsj9gPTnIqYQboxKFAiJIIB7/1pq23moSUdAeTk1dggS2tWU5IIBAPPNWp6JdRJJK19SjJH5bZUkcdR/KoUjWbejKSyjlR39DWh9haeJp5iw7CMHvVOOOUSSeTjfxjjI+lOVTS66FJFfyoioyvyt1BH9ajlhKELEXaNSdyk9Sa0bVFncmRACpIIB7jqDUa201xMZPMODzkqalzi1dB7zfL8zFVf3hZsqB2HGBUvLxl8ZB4xjkfhWi+lOwdsncueQvT6j0qKRHSMsygN0YqOlPrZGnMnoihHCUbayrj6ZzUrgiI/dLA87qGyuOgye4OfxqeN32blXJPJxycfT1pK1xtNaozHmCyBJBgE/eHPFFXHWO4cLJHtYNnYen6UVUk7gkbkdlmOYTSiBI2Pyvxn1Oe/P8A9aqKNEIHZlACht7DGXPtmqt3qMsrmK5lMjIcqy45aoYbq5jYGKb7xySy5+b2PrSUEm9dyGnJastmKSS281/NiYttHmDAC49DzVSaYxXKEPu2nGSeoqQzsbxftwLKR8w3E59M1DMTNOwAA3Hcox0GKLNaxHa7tJIsMgnmLGZkjBBwmSSO/FK4Vo3ELOVUHaGOGHftU1kiiyZjFsIJG7OAfXk05o8iJo/lZk+cqOOD3pNqOiJT132IbS2llbC/u1KgSSdD9BV8xW1vCwXa92wyhznrUDNGEKhuGByfWomEU20YBbBORwT2HNRKKs2ha9tCdoXtnSdZGDD5S0YBxxyf1qzBJNbgTgHykUkBG43EYHH41UsppLYvLGoZMfMrj174q7LayXltE9tFy0m5mGAeO2Ke0dBtvRMjtLK5W586ZGkaNMMgPTsAe3r70sl7K72lk85ZJFCtGqD5FB4GfwzSWslzp880UrkO2TsPzfORgA/nUh0yzs3UnUImulBDKATg+wFPW6tqhpaNG7HcM1wMzFlQ/KrL8pPvj04NPNvdXAEst3CuxyVQQcfnnmsdJlgifeimd12qdp49hVye6ls4YbS0tzNdbclgmVQ4ycmqdhRabsbA8gXbTzpHtjjEOeAoHU4Hpn+VVJNYXUbp9Nti4h2Z3gABh0zk/dXt0yazZrO7a38yYN5nBMTsFXOOBjuT706K3uY7mZEmjNy0Cb8kDaBnjHpzUqMXoPnd7WNOCPSbFSiRxLOuWyCWyeh5PWsGZVmLyWqNFOgJZQTjrnIx0OKku7S/itpJ2liREIYZXnJrK33kKfaI1LdGZs/mMelCcE9GN6u2wt/fKHk+zMYkKg9CH3Ec5Pr71HZyWNpBFI6NcT+ZufuoXPQDv+NU5ZVlilaAspz8wIzjPt6VajnKxoqhScYOeP8A9VJb3sDUev8AkWYmF7E48uMIsjSeW4wELdh71Na6pc6bPCriOdEzHG5HIzg4Ge2arRyxsHWbCOykepP41VnPnqkKhhKuAATjdVJKOwlKV9dvyL2q31xdxFJQWy+7KrwuRwceuagj1LYLeKWXakfynB46YxxT0vvKXMYGEwGDE/e+v5VmsSJSWwJGyeeg+n61TcoO3cEpPfY03nLtcybGO0AIofGR7E8cHtVaW5e+ZnCuGjGAxX256e+aq7J49hILxhty8Zx3NEVxMiiRAAWJABHLZ/nUpp6CUVHWJYhDqzwSho1PJGSCKderEJYvL+c7gNxycCoZrsuIV8raR1IGcc037ROXHlpiPsy8Efn+VF1azZfvXvY0Y5YTut1Z5Pm+/tx/kUj2i73R0BOc4GfzqO1d0WR5EAx1YjpUK3ssgLFlwzYyxOfbn0pq2ljJq70/r8CxEXjjXymZDG2DH1PXp/8AXoG2a7Bmw+4HarHGCD3FQC5RZDKuC6/fUfXvTHDMiEkFTxuU4+Y84zSfmW7vVsuyXiPM0apui3BSEGN3uM9uKvM4kTzPKKIR2wSP6VlQFI1Tao3DjawJ3Hr8o71oRw3DhTI4VDnA6Dn+VUpEu12mJHNM0gCIwUHA3MODU5lnVgJLeQkggENupkWmusu9Nyup+UB8/pVqEThd8nzAn72Krm7iSvuZ11Gbe3aQxhI5WA8wjkdjn/GpWmQrtiy23uAT0qxLLvGwxRleuHBwfaiO6nDAGyOz7oMYyMevODRqhpRat+pSGoRxqZSgHlkbg2QfzqF5zcQvOdske88DB+Y1YuLi3uneBUJIGZFbp/8AXqCztlijd7eInBLlSuNwHWpcujK5V1IC7LI2NwBbJJqe2BWLzgx6kHYc81sSaZ5ttBciNAroHMbOQQPQgjrjvV2z0mFbZJWJKuxcL0wCehqVJplNNuz0MNSGt9wcK54O4cn9ajeDMgIlOAOmOAa6l7K1XARUb2PP69qrHTrcsx2suR0Vt2PT8atTI5TnVkCjE5AJxnPHI9PamXVol1FiDmUAlWXp75/Wt240WBkzG7bwOGbt+FMtYLFrnbLDMtwB84BABHTOe4odpIdnFoxNOtrm3tyjRhd2BuHIb2qCSJWkKtJiUPjbnqP71d6lrp8SwooEbvwuOTnGaiudA0q2ge5UbrhiIgSS3LMAMD6ms5SfmNwbu9DkhpsnnRqpVQRvzjBx6Z96l/smW2TzGhWPJBOTnIrr77RIZTKsbeWEYRj/AGlO3J/WsvWLOW0huoAxeEReYhAPDZwBUKSuTKLSfMZhs5GeSJSrIg6qQcnrgVYtNKSSSSJ7pnaIhh8uVHGef5VYs49LksTayzZERIaTkEnPJP0P8qgYWumzyTadcyC4WbYUjPDgKSc+oOCMjvVave4Rirp9Cxbxm5jDqo3qzxtIeArMeBj2AJrU22lpBL/oyhoJUTfJyWBx836ms5Z44lsIimEuCJpWUnLHGcfjnFJeXbP/AGjFIyIJ3WCNf4h8n6YzTtdhF8q8/wDgGvdyRW4fzWUIy52kDBrkrt4luiqRl1AG8NxuIGM1anvIbq3geSUTXDpsbjIUjjI9Oh/OsmaWZJ3Min5hgY6/56U1FLSw5Wmy60eltaSXEa7tpOFYYz6deRWW4ikjfZD+7IyIzztPt71Wlu1iYR55fg8jn/CpY5FZm8vc2BkuT0zVciXQrl0V9vmFokT2xE0LGRAfmHr25NLHpTjzCzktsEm04yD7fSp4ZVhhZAudwzkD8+tSrOqyqJn4ZCEKYyD6VDh3JvNP3UVo9OcqztKDv5VTnrjpimowjmlWeMLyBlOAxHt6dqtx4lZnjlURoA2CD17g/wCeauva+ZbDbGZQiA7/AO9nnn86XL3Bz0szNtDIrNb8tCAcbmJDKeR9KhnJgnMiAl1H7tmPb/CtxLREhjACATKCjDJ9mGPwrR+ywqyRmRVLAkLt6gAfl2qU24hHWTuc9DMZTNcDC7drhQ+SMnkVm7i8kgYEbjl+ei1qX0CW9yyQo0hY4cAcHvnP9KpxLMwP7hv9IyECsAeOx/nRd31CCvfT8jKvYil5dLDGFjkjJVSOmMHj3pba6Ijt1dSxXkHPXNa9zFDA3kBJLdtuSs+cH6dqglhjuAZI9iLEfmPG4ngED/PNU322LutEyIOJ4ywRm2N8vzEDHpUyXV3GrsscIVpWGeuP/rVprZfZ4k3yKq7WBIA+6B1PrUWlRQ3EEjrcgLuIVWGC1OLe6I0tZogaUhULRtEwGSR82c9/enCRLrEiEtt5yw6n/Gl1Foo28goyuVA+UngZ55+lP+0MFQW0YhCqAu7B3Y6A1fN0JUVa/UJJlG1htDMcENwfoazYJpLSQShNwDlSrDgip/tkkWoFp03FyrsoHsRn0IokvuZoU2rG54AHJPTipbvsVay2GRRTSx7o42Ck54HNWS0qIv7oF1ONxGcjvVfTdSnt5pIwDtI3HjOCOuBV+0iRkRZ7vEbjO9Rxlsnn34pKTeq1YSXQbA2ZlhZCzPkkA9Pf8Ks3L2tnamSWMO5bCKB1P+e9FgfLWSf7M4U5+dv7vbH86pTTfbtUBiXzIYR64Xkf4042SvLUmO9ncuOS0JkPySuA3t9KpoVMxJXcCM5XNWCktxEdkoMyKXV1Hy59MelUY5gLVJFY7wCHTGMH0yat6DT0ZPJHIZ8xq2c9c4Iqq0FwhSYRsxzkYHYdqtwT7myxVlYZBToKhFywuWg+Y+W5YsM8DqKHsG+liSSW5OHFuxUndwMZ/Oq8kjxW6BLYyBjnJfkZ9farpYvbeYZApYY3HtUQnZFBGxjtUjaeD70a7iT12M+Bi25xE8RVtxXGV6+voavCVJLhirYdl5U8YPaia3aSEBwSSd3GAOacF2NtVcMAMt0z6fjS2fqN+9svk/8AMCuGMYjky5ydx4A9hSvZQOpOGXIycN+tXIo3ILMctnp6Gg228AyAnOQVHP4Gq0e5LlroZEECSq7BiFIO0Bgenemkqzb2XdsxgZyT2/nWv5UahY4o1wOwXP51SvLSRnRkARDkHaOQfWs3Hdlq70K8jW80UI3lpCRvXGMe1Qzj5GI3EBgOB0PrVx08nyI2GWLBT8uAaoXAZZ5FdSFznaOQCP50dAs73E/1pG4hQvGAOCfU06VXVAig4YDYcdD6E+9LEBIsf7tlZcE5Qgg+p/SrMSplI5WIRlyT7f8A66Wu45WTs0RLFKLffNtBHBIODUTsiXjRO2185BY8E1uQ2Snb50gKIQAWAweOtZyXEMNyMxRSFvm+Y89+nvT1cdhXTlo/6+ZXRftoCjYAvBXofxoltJvMVISX2cEd8n+dV7qcyXxeFthLEg/0NWYW8sGeWB/L45ByM+/pQ3Z2bHJNWdhfs2yBlwSR95P/AK30qsQvyyQ7RsAzt9O/WtBHAlabzNpCgsmcgjvg9PSpJbS2RlcPmJxvb3zVNXWiuTzR1uVYgEPmMdyt0YckD3FK8WXCYIQDHTt7UNIEg3qoy27YB35p6PcS26ssBUAY2Y5HcZ9jUrTcpXXvJDp1AgtztzG8e7g5PBIqFQrMQgbBXGC2c/StpoVngt1xskCbFXPI5J6VTbTpba0gcTxgzSeV3BBPHSoUtNhK7Xn/AMEqG3S3iVUY5kHzYHPrjFSLGlqiO+GgPDHP9K1L3RZrWFFZlkkfA4bnP07026sd+nzXLBB5YCNHn7p9/Y1F9VbqRzO+u/UzEZIkZYZACwPzKvX8PpSInmKwuA0RcbgoPDD1Bp7rbWrpJ5qzQuN3oynuP6Va1aexljt5tPkmJTqrgDa3b/IrVczXLay3NdG+5nOyxoM7y4OCmOfxptxCX/c3AEZBBHPTn8s1CZ/L35UyuxzkdD+NQzXBlcvI5Z1AyOm3pRFXYo30ZoSPEpUjaHJGXwc1eGpFbSUfbNzMNuwcAep9/pWOHDsD5mwHn5wOKkXdkykZ2HHzDgjFFlBoaV5WNCa9hksI4NrMRjcwBY4plvP5AaBWCwtziTjH0NZ8paOVWgzGg6nd8pq1Hay6jC/99ByRg4PX8RiiVRLRhyrdluR42t+DwpA69DUgvmM6Kilgp+8y8A1mR6LeTSvKkqGF23Bd2e/6VoQ2s9igLws+fuFjnaPfn9efwpc99EOcVbSxtQ3MccEslwj9R0rmri5dL6SaI7EVv3Z9e9W7i7kSLhWLNx5e7O3HcY7VQmRMJIImUEEHjjPtVcqUGl1M4Nq3fYnkube4YuZWhuGOCpHD/wD1/euh0u3LWxniljeEjq3UfhWGslvPaANbxuw4+YfMPf2qnLNc2czwxLwQCVV+Mf59ankcrSY0lflNnULy3hKt5sbnp8nbmqWpKstsGtQSzH2wR7npVGOVpHVw+wEbc4Bz9alt5yjqu5jCzAuMYzWvPFO6Dl1LMYT5Y3UgkANlcn3+lTiCBXcxICT0wOtQtZW8107o7A5zk0jQNHOwmLoR/qmzjd9Cf5VlFJaNEttq45oQJGjO2Nyu7d2oqNpDIWUnecYIx1PrRWlkNKSRmzLYPuMdzcCVeRmEBW9f4siqL3UeEAUgA5XI6fX9amdOS21RuwDvyOPrU82nORG64ETcK/AHuBWavGz7mjSlo2RxjzGzIDg8j0x9KuWsW8CW4J2qwVABgufT6U6KK4miWLKNGTgEg7sD39K07Kz8m/juQC9raIXKFc5b3+rGlKpFJu/9f5szfKvdbKF1b3Nzbwhv3bMxUBRtUew9OKnsmTy40k+eNG8tm/vZ55P9adC0+qfaLeRtju2+Ek8N6j2JB608RG3tHgiBLEcDB596iUmk10E2lG2zK0FrI48pV3MmdmzqcVbiCw2DLJMN0oZiqAnAGOM4FNXzFtgsTPk43j+8TxirsGmSRBlvDmI54Rss5IHyj8hk9BTnNxVhfFe+xnabB5s7zbAYWdI2LDhckcD1PPaprm9FtfXDxxKIo5WwIx0wSOK0tPtbkyJNfWqwW0XMEQJxGO3Hc55yeTVe6s2S8keUAtk7VYYGD/nPNNTlzadhy01ZiXN95s32jkuSGyBwP/r1oRSzTQGQkIqgs7BedvYD3ParyxwWitNLFFIw+cgD5c+tOa7lk0xbkwKf3hL56c8A46UnUaVlsOUlJqxjTzS8TPvXawIRTnJ/n35rbmmljuIkhuGWTYJJCOFXPb3NU4WitfMmZPOOPkUcgyE559s1UEl1OpkLMoUlnbB5b0/D0/wpxqa2ZN30ZLeXHmyySK3JUbi/PI9v5VFpWqTWl2ht1DXEibXdxuZeacjIg3DaOMgsP1qCOFYZI2jx86kqTyN2euP89qfO1uXC1t9ehaaSe7dYZFU3LP8AMxJJZifl74HGaq3Ul5DLLHeReVsYrtHGT6f/AFqin37lIZ1ZDyRn16571YMG+aIwFpnALFuy57/rRzre/wCAmopa9SGNORNIqxs/AQDGfU+lROZFkZyw2lsj5f0qW6hnWUSSFgM7UUDIolUtF+9UZ27uRx+XrRF2VxtdU9yBo5Zni/vOflHFVpH/AH+Qp3I3J6/SrjCRYPlT92uDGT9aP9ZemOOJo1bLg9ySP8anmuyr6kGXd/P2ZLYGPT1xUeD5h2rgMfuevvV6WN7ddy5dmB3cE8fSokgg8zeZCofIOF6e4H507sUeXRrX8SMvIIoS0rr8xBXj0/So4f3M0MpfcIzwCOgqSDMiMDjYFwWI9+tDxoMJASct0Ixj/wCtWnNfUrltpckknHm5jBMefn9AfX61ErzDzACxUncFXjp0NMli8pAiqx+Y5Ocj3+tTRyK8UaIG8zGS3qc89e9F77CcUtYiLK5t5YnOWLYwp5IqEWUS7WkdmR+AUPKn6VMkGLxY5Q0DhmLHrgehPapApXdvTcucGRTwfrWd3uhyVr9/62F+xq8ZWMSBiQMnjK+9GWgjVCwO1spnof8AIpZcybBbnIXvnKg96fb+adu7y85zh1G01o7bIjfVvQtWsah1GxjEeCS2SAf5VfnYQ7nEcaxtxvLluB7GqxIk3mONlyQpJ+7jPvTRLAhK+ejAZBCnIx2z+NVGUX6kO7dkdHbTW9xbC5XAIQYz61LBcwJbwJK0cbMiny34NYEN/A0X2aBMzx8/McAf1NWE1CBftUd6ftAARTvXIwBx9KbiaKSbNiaK1NwFMX7wruXHOQPb8ao348kWyIETfOsfAwcd6yE1D+zZo7gn/W9VJ+4uen0/rU0mri5uSQpH2fc6ZXqx+VTz+JpKNtUDaauaN5Fp8cUdudse5l2kf7wqvHcpazgsiiOVyuccKccEexH9Kp6jcGQwSQCOQq4wG+8Wx1/nRCZLyBbaWTyssVLtkqMHNLlSJl3RqT30rRyC1ESHndJJzj6VAb2RYFEjMWIxjrn0qhGimNoWmwqkM2OuOuKY808tyBEpUsCAz8AAenvVKwX8zUk1V7fLOVTsGfpVQasZpGZElcg4+XOAaqCOOOZfNkVsfN8/OMH9Kt2nyoypkbJWOFGT1z/Wnr2By0uTR3xEJdoJSWJJJQnH+FPbyb8EGZmlI/dspwQ2MDPt61IrbryWIuBHHFucsfUn/A1MLSynt1aZUXaQw2jkDtg59Ki7uVZsQXiQGL7Rb+TLCGOOueMZU9xUY1OS5kWEoqXKSJLGuQQ+PU+3eqmqXUM11FCnzsgLDcc4Axyfx/lS3iSNZ21xBCwnDb3bHKyD19j0pc1tyYyd2jb02Qw/bZLx/NleVl344wMEADt/9asjW722vpp4JJiWhthjD4DNvycjuMCqz6vJJdYCEJ5oLKR1z94fhiqK3Fo93euyjMp8lWPAx32+tJavzDnsmi7YiKHWPLkgZ7SckLtOdhzzz6YqC6LQPFaWpw9tMwWQYyVOdv8An2oimVF+5tYfe2rgBsfpWXNMond9w3MgJDdOD/k0nCy0Yczbt16liC5Edo8SykSwTb03dBtHT+fApYrw3E++4C+ZJINxfOBnqcCqHmJI0sgUIHXO3196ZKsguAwIwF4x1H1ppu9n0KSWy3NC1VLeXUEiuUEcEu9D/fBPAH8qS+aOa1W4dstJk+SWPGehJ/z0rOZ2Fwm1RgjB9euaR5SkLREFsMCUI7DpimrLYbhzNNjD5UcZlmQPKOo/hpkWoE3HAYRnOAOKrzkbmVtys3IHPT1ognj2xo2CU6Ejg+g96a02NnG6uazXCM4B6DoP8aWTE5XG4hW5HXFUYVQyGTB3Fsr704SFZWLgMp4IVuM1N09BWN+3vi0RVRGkijY8cg4dferWmXv2eIIUBDHyjKDjnHeudjYFVDIqoxxwemB1qZpIUXzIQxyfmBJxnsaaSZlKDvojopHmN+kenws2yYTlA+PlI5GD75pl1dXEus28jIYwgcMGwDxjg/lVHQNSiWWRr5WaZF+Q4zx6frWlc3j3MokmgAiCFolzuYkev+FCT6bBJOG5H5dt9qkinZWQ7sHONpwCMenBP5VnkwzGUu7q6DMSg9V6bqR54r6TMOAGKhnPYeh/lVbUtsDLOygsq5UqPvKTgj8OtS0m7MiKV7Pdk8weXePmeJgFXeMnb1/E+9UHgitZWYSH5eDH17c/zq3c3TxRfKm3bt6nPP4VR/tFJ3VJYzkdCF5H5Ucmt0zSEZLVL+vmX5b5J2tfmMcIPzMeccc1qW1nbRSJKmEWbOFC53Y5B/SufltRAEkU+fEB5hVl/hBG7itJp45bm1kaVnhLttCp90bTjpVLXVibSV4vRmndyiaL5yPm4DAYIrOvo7eZYgiqAJASTjkdaje+WaR47Xy2To5b+I+wqYIjwBmPLDaq9OfWraS0W5m007lPUojeOJ848pcbegxng+1Z7w+Vh2Yl0POGzn6GtCVJLpVjfIOPnGfSoD++lUbwYx0XGMDOMCsZFRl0KgfzJGJZUBORg45q4N0UflO+YjgqCeo9BTLu2lWNSpA2DdjbgsBUeHkAlZQ8aDbkcY470Xe5peLSsT3eq3JcWpcSBlJ3J37DjtTLeUxwLGW4BJfI+9+VQg7JSfKQlcYyeh+tTRyp5UhZkQgA8KRmr5m3r0BpJaItLcRbZxaxEZACgL1wOajkMMl0jJk+bEGIHYj6dzUcEoCJgjAAI2gAt/nmmgArJkjKtwM0N3RKWtzSuo7a2V5guUZdyrjGc1Sa2aHzlZt7NjcD0Bxz+XFMlkbdFb5AQHdjGcY7GoMsxlJflPmPv7UnolYlX1XU04gE8uNQAnAPfBPtUlzc232jY6OGQAFAn14/Os6K/jjmjZwfUdx0wDSRTu18J3VnXI4xnP1/nTbSVwS1NdIraJopGZo/MzuGMHp29aaZYYboiNy6nkbx+lVp/Mlj3jqpHX09aoTwStIrDAYnHBwDWnu9RKHc2bXUUS9d9uUlAG3P61O96zh0fYq5zx1P1rJjs2Rw2x89SWOeO4pssZa2cjbj0DdapWYSVtjUGoAuzLEgA+UAcjHrUJv8p5kgBAfBQjpxisuRFjVSsjRr0yDnDU5FmjBXcGPcY5PvileNrg4aN9C5c3WdPCR7Q5ZWGOvBzmo49Q32apKwJSQk9gT1qoBIVbzLdgA3OR/KmxRq5i3DjnIA+8aiUlZWHy6WLpuDLay5mxLJ261Sk8q4t0y0iuuVIAxgjtT4Ao3psI+Y43YOfSmXO6OcMcAHhsdz2ptq1hx1dkWraZkiki+0M5IJBkGDgenrSf2g8UCIirJIg4OOahW1jkIbeeOApPAqb7MqvIUj3KRwTzTvpaxLUb3bIQI1R5yB5mOjfdPr9KrqhVTcJuVX6DOfzp8kwdFAwARknGajicQzBWBZWBHTGD2qJJIuOquxzS+Y5UMI+hKL0PuKkhZvIaSS4xGrYC4z+NNjgaaVYzsUgfKx6ACkeMxLiaTgnb8vce/FJX7fcOy7l+1R5nGQDEjgYXHJ9a23mVFZWK/NwBnkj0rnIpJ0woRgiDIbbu//AF1YjMVwoS43IZGyrggg47etNNPWxnKLWnQ1lZppkMIUqkZBJHHP9aY0E93bRrNcxiOKQlCv3ST1x3rJW3EMshTgAAMN/wCo/wAKmSf7NpHmylg4X7pPQ9qcIu9tbsSSgtH/AEy9qN2UmiE8/mODnep5UCq82oNc3bWlq3lwtHsZzzk9c1jrNJOj+dnDDBVeSadb2sgG1/ljUcDODjt9aptLSOrKs1uOu7dYEkWSQFimQRjafwqur7LX927k/eIxwcVavYf3aIiBGyCRjqKqysBi2iGecngnNJrVW2HHmWgRymWNgcIeeh60ttZRzokjoqnPUZ6U5Umt0OAobHPPJ+lFu7lGgUrvbLZbgKT3qb93oU11iyVLZUkYYVlxwdvJ96ZKBA0RyQr9QD1qaNHQBWkPmAZ68f8A6qZtZw5maMhR0X09aeiEnrvt6FmzbJmiL7GbB+UZyPalW5k064cRlGWRdhcrnj3FNt2zhWiQPgnp94eue9OJVlQMeAeSeeKUYKwNu9hYtUmt7d4oh8pIJY96jtb5n1ETSTkxjIXHG0+tNk2IsUKxDzN2B6AdetV3t4RJudGQ/dyp4FO7s0Fkve/r8zYmRBqEJ2EbwchOg71mXcsbSNHE7cNjA6Ej1qFmeKT93MxOMdePao1jkY7+N3U5/wA80Nrd7ijFjknBykmQQcqwPPNWVvBHKeMk/ecnOfas2cOYt6oMFueO9WgwECo0eHHVjwWrG93Ypr3biNK0cnLBNx+Xjse9KPMeYIZBgYJ/wpJlCQJ8zZXg5Pc96rRySJJukzj7pwOo7Vbva44qztc11kltW8wZMP8AECc8egq5PcrcWyxKw8v1PXGO4rPS4R7crIQRg7WI647E1d06CO9tZGWYDafuAckAUoTcddyeX3vee36lZisSMuTsJBXI5U/X0oqU6cbmCQ2hbb1ZJBgn1K0VfMl0D3erJFSzZ9115Zt4xu8otgk9h/8Aqq/HHFeMJZjEhCfKI14VfTGeBS2UVnbX8KTQI9tKxCggHBxRc2KXupyxWkMTrCuHKtgAk/z/AK1hGpFPYyvF6J3Jljs7lFmZpVUDAPAUgdyetISFtnVJG7zvgcsMYQfTqasNoMsa+XJJgEZYZyBirN9Z+TDLFGVEDhXOFwSQOB9D1/E1nWktLambi0trGeltEojmaURMpVW28gtkYx9anuX+aW5hjVZFkKRk8855J7cVFJY3DQwyxr5U0zx+SGHDg9xn0wSavmK0nj0+FXCpKx8xSedw7GpcHK5cYyerX9dCjp0s7zFZbmYiNssyrsz9D2z61FPc6hcu5jVAhICBxnA6AA9a1FuI5zdwSopueiuOF2A4GPzzU6y2ttCtw5CxphAzdz06ntVqEtGlYpQ6CuHNvFFKoVVzI7KDyduOfxqndTQ3M5hkAEr88nGPc1qLdwlGllnTYVLKF5JA6k+1cy14J5WeUMHu3CgoCTHH7D1x/OmoTu09SrdE9yviO+uChbylKbVLHjJbqT0AxW9bJb+VHbqVmjlUodnc4zk/kOacNSjsNWEDQgwPDtj3lVZFB6t9TWZf3+Ekm02A2EKFlYyAuHbOD04U9frVKDt73Xrf9ClBJWT1JdZ05LKza6BAZVygjOd0jdx784rOuQ9pax2+cwqdzEjuev19Kn137Y8VnGGQw7RKJQNvAxjiqNzeG6Ri0a7MYUNyAB3qFGyaWupMkkk/11Kwldd7ZBAQkKPTpWrp9q+oSGOAxCQx8sxyI1GOP/rVzjyPEyxZfy2wAQOvOcVpR3UkM7wwlkjn2iVsfMeelaJX2HKnZbl6W3AmeJJBcyrhBs+6gHJbPSqdpdSQfbAEPnkiNEHG5cnJx3rpHns9OsdlkpJT5nzj58dcmudmv0g1ZpoFKSK3mfNzjjnHtT9nJtDVtupOLgP+5IO4DJLJnbx1P41QlLOWd2LZcLyf89KSe5keeSdycy/Pzxu9BimwXCyW8aswUKzE5P5mq5XJEKL+QNK8e5jkowwQScY7HHapBNH5KSHCyDCgDnIpsn7+UqjEZHAB4FQyyFFSKSRVQNjp0pct35ji7q+4sN+2yRZhuYn5W6D6VPNGwTJXqDknggf4UfuEdbeV2mMgDfKOo7fj0psV8vmx7mXfvw7FTux/kUON7LqUpPeOwyOFZER1CgkYYDoR71JjyGAEkcZOCDuBbp/9fpVl4xmQefGEcj5hywz+lURIsEheRFcnKlvvHjt+PFPlbZKs3fcntYxcSqJZAME8KnU/41YvRHayxeRgAsrHnOSCKar28cCTR4Ujl1diM/1qvJdxvcQzlNkacFegHOeKrl6dSb9tjSicvLftIsaRoQGXGc57fyoknDxtFb20UnOCSAUA74z3qmrLc3LQqrbpnwFXkDpz+Arov9FspY7cfcXAVf55pJXVrArrXY54xT2cTmNwI3zGwkGGQnvSmSIOPIZ5M4AZ1GP8/Wr+reU7uLdxL5TqHAfABI4H+faqLwsvkh4xGJfuFj1xUpdy276MqXLzed5/nFmwQRk9M4/z9KZNvjgLLHu37ckev/6q2LPSbiWXbhRA/PnMR83uAada2aw6mbRwrKU3K7HPQ+3FJO+kQ2toZ1qY5bgSFdjgYBA2447+tQyObmG5nkGUTaTt/iO7+WBXSz6Qbh1Mb7Qow2V+UjrmqUXhzYqEFZgcliRjOe1Xd7Meg6Bba8nuJ0jSWMMEUEZGOpP5n9KIrWI37Aqq7FJO5urHp/n3ptvYmyQW0bNhSdxzwDnOOKSzLXLSTthoy/AxycCqST1Is3p0EvWjtZbdXgJLvnI6LVaCeX7ZcW8MDJIWMoMoIB7YrQ8wMoRCMjjjv9ar3M8vlSHYVA4HTr2q9bjdlr/X5EltGXEplPmOzkll4HHFR3LssCPJsyrZHBzjoRVC4jnhFqtnP95iZCR1IHWreHmBEigKTuye9LYmTHJ5HnOrByWfcM+nFPhlaC5KRyZY/OoYg5X61V2szZZiCPm3DnPGKhA3TMRgMoIKnPftTV+okm9Yi/bJHvrqO6xGJCqkqcjAHAB9KuXk0MKRIkILAEOpPBBHesW7lRkYyIC6gH5h09BUMcs0twN8hAI+8DkAVPNbQtRe6X9eRoWM62QnjZBJDORGnGGXGOlaZvnn/wBHd/LEkhdpH5YY7YHTPFc/Cux/tBZ96uRggHr0IqxMzC3cNIxLZLEdee1KLVgadtULPchWZg373eHUepPBzT4o4xvhJ5ZTH04zwcj0rPiH2iQPubC4Xgg/l/jVibeSPm+YjJIA7f8A1jU2WjsDVtiR5CD+95kOQwGOo4zUapBIPmIbDbeTzjof1okZxjyxk5HykdAev403IO/zBhiuBjp9aPile4k7K6Ev1W3TzCn8WODj9KrPM24lm+Ygde1XEYX0kcM5baoJxjqRTZrNEmZ3csAScAdvehytqaKW3NuQx/OFcfLgYyKW5KvCiRonmDKsxbn0zTDH5sv7ll8vaDuPAPtn1pwhNvcr5fVl9eM5B/KlzdxsqXts6zKpP73IwACTimsAsiAYDyABgPUe9aN0gvZXMcm2Q4Tf0JH41nywMiNFw7r91gKTlrqOM3az0BpHRoWTiMgbGPA61bH7u6ndlULvJXd0OfSo7UkKI5YyUXBGedtTi3LCVUYyAtwSMEU9nYq/QsiSNQGZlLdFUjoMVBNtMqgZBIGDg96q7XTkj8qISXQoQ4cg/Of5j1o8iety3GxDoBn3I7VMkkzxHZLiRMcZJHeqsSmJAOd+3b14I709xI1pJtYl5GABbjvQ5uz1DltZIeqyW2Zyx+YjMYH3T2ou73Lr5/zLEMKFORx/QjNKkzSf67IZMLIvr6YpyIGllQIoxxgnOe4pKVtL3G9XdrYntpvliR8ZjypU88Y4/SrZmQxEAZ2joV59uaz7WVUuCjIcsyr8rdODz/Kpd4+6245JdTzyAKqKWpi/iGtFNFdLLb4EqxkyKejYxke1QSSYMaIoXyyWAOclfT8Mn8Kn8+KSS4aInOOO+D3HvzVO+iMdkjqd0hJBBOc/WlYpN7N6bE8NwkkDTxoIpGYg46AAdDn6UzzGMSJlgSBkj1/pVa2t38ll37cYO3uM9qlhbc7JK6gjrjoD2FPToNwadiVlZ7gLudgyn+L+L2pYI3MjxlcMpA5GeM0wXCyzPHGpV2GBk9qWOdkaZmZtxXYCD1bNS9NGDbauhxLXEvlGQLErYDDpn0pqlopI4AQEfJIIxgjnH0qSAYgEYXBfkFhzkd/xqGQjeBKzMy/Nz+uKblrdsXM72ZXjjZ52AJwMsx7e9WAwEewlSD26ciljkVIDIAArfIcjp3H59KqT/LJGFRyWywbqAKErttlpOT1LqlZpgrfu8D5SRwPr7U0iWNisgUBiSeO9QA7WCuDzk7fap5iTAknmZKtg8dqEtdCU9b2/EgdwlwzbGbK4BOcUGMISjc/MSQMkipG/1pKqdoUOzE57UIJZZCwcoMgABOcUPdMErvsMC/MGZSVX5RgZwPf+dLFcSRNuiJBHYnIIPrTnVo4mZ5SxP3kPHGfSoDgRbD91zncD/DQ42sxJ7pMvG8nADOisu0DcgJ4HtUitHcuRG2QM+XnjHrUMUaNa7txJKkgg8j2+lGi3ES3UilVdQCfu5yfQ1Sk2rhyJK6RL9oleKaLeAqZycHJpbiPZAoXAYgMAe/tT70LbWmwDLMRkE/pUMdy5DbIsqBhUxkjPeqe+4KKauieN/OgfaAMr8yk8g1Vhhd5kUOUV1GGLZ2+2f5Gktt4ukmeBynIYKMAVfRbYW3l27hgrDdvbJ4NRrLRCSa6X2IXeVS6JKGA5Z884A6VBCokG6M4wOM9j1NXS0KW7AxEbm4PUfT1qk0csJMkRw2SrZGOCKcm7q+wOK6CBvNmMSPuJG47On4/lViS0i3iJQu91yc9/pVe0mEF2piTG1cnJznI5qWSdftazZ3FVwSRx7009W+g05NL5gqwwtlDt3D7jduafJMkUzKis2PlyCBg1XfaFkJwWIxuHFRRuSjDIOeSSM81XNZiSe99R4QceXlXB4x3pbaMyM0Uwww6KB/KoRvWQueGAAOB2qZW3uUDAHPBU8/Wla43dbvUZ5W2USS/6sHaTj7vpTtkct0yqQqY3E4Bp8ZeNnjZgwPJz/hTEtzCPOVTs5BHY464HWn3SC6vZk0ADbghzt5wD/k0s9rskS4QhNx2lBz+fvSWQjlikZdpLAqM9QPUGhoXu7eONGIdSADjODn2pqzWuwrNdSRnVpQx4ZwR6Z/8ArVTm/fT7ERzGgyy9s+1XJ2a1KrN5chJ5wM5zx+FPRSPnwxbOAyjA/Gp5tNOo7pO71G26xzY8rkAc5HKn0qN0Z97EEjryeetSLCPPLjcshHzc449aglOwPMv3yMEYOCPX60Rai7Il6u/5la4aSWdQBgAYB64/+tVUSvHcbV256ZFW52UxjewSTHyt3H0qmIZsEu2AwyCD+tObVrs0jtctiSV7cgAscYLetRpApQKI/mP8RbkU3yCy/vDnaAAUbBz65qcySIdqtkEDasnUmp507ILOzt/X3DpAUmKuhZFAC45OPXHrSiVBEx3BlJ+VwME+oPvVdbnCl2jYMQQFB+6agllM6STKoxn5lAwD7/WntqiYw5nqX2VnXzlZl8vhYwcEn/PNMMjyRK6SEzg53jqB9KjMg225+b5FHJPT60OXc4ypDcrioUr63HFJP0BZ5d7eYVY5zjpVm2I+0k4yrj5kI6fSqYXzEBxtBPUD2+tWoSsMXmPIQgIG3B5qZPS3cbuldC3iQyx5ThgfTp+FVpvMjKPF8ueG2nI+tTgGaUBFVkI4PcfWnzW7LiRUUgHJ2nrVtrZBy2WupDHFGJAG4LDJx/F6VNMDsXyyMkHgjJ/OmhJS2MFCGyQR2okkiLGAncUPBXgg0opXvuGvbUrrG02Y5flY8DaetT21iIbgK8qYxwJOPyqDZclmBXIHRs/ypzzXTzQrJiVl/hPUih66XGlK+nUmuLU72WNk2HkBWyD/AIUWxmhkMAIWP+LHXFTI8V4diIYcct9aZJbrbMrrKsiMCMKSSp/wocdU4oTutPwsaEs0uzZAyYH8JH6UVRSQS2rBQfM6A4ySKK1jNJWI5ZLT9EWbrU2mhjjhi2qhwOmAT/X3rotHuo9PthDEqNePhpJNnyp6ZPp7Vznl3N3Yb/JOI3ywUj8h9K6PTEiMjQv+6kChthb2/WsoKPvKwR3VjYWSHyJLi5eRoscDHMreuO/sOlSx2oe2Bld0VgGdGfJX8f8AIrKju47i5VjNvZcpFGrcIPXHqf5VV1nVBGI7FJyXlIVmX+EHrn69Kbp307lXViVPEWnXuuzwSI4S2TbbSMcKD3Ye/p7CsC4lSWS9mjGCSGR19KbfNaR3BtoYQwU8yMOSf7ufSs/cY1ki3jcT8y5/QVOm60dgeq5kXfPRnDkuQsYWPYTnPOcUlxrU17pklvOSsoXACrwT6n3zVSMsWEQmVeflG7HNEqtKrnIDdCo45Hp6/Wicmlr1CNlt0saNndRR6O1vI7/aZiqsxOPlzyCaWDUY21P7VEm2GEFVOO/49ay1WNIwkis7uw4I+UH/ACKvSIjhCIgrbfXn8BTcr+8Ctf8AXp/mSxTobqe7lUvM4PB6AH/JpkWqPbJLOoDQO2DExPz55H86hLxpJvmUCRFGeMg0zyFvYlkZjGRkt2x9KNlsJcq0bHfapG2JIAP4hCv3VBPQf5xUNtdNHdFHf9wWzuI6D2HeoQjyzhFfcyDr6+1NEBMyGRXxuG4kcChSXNqVa60/r7zQmkRZkJRy3LKR8oUHpn8KjWEvHlAWlVio5IGfWqzNcS3twscjIWYuUI4K1YtZLmGG4WQYaP59ynnn9BxQuXQm0oosBJWhdTcHCZDtjp+dQXKXDIsyt52QFJ24IFaKSIdrIAOACCM5qBC1ti5BZ4Wb5lznGfT0pyUr2b/4cmO97a/cVRKJYYQfvhzHtZckj61CgjjuGhlDBQ2du0ZY4rYlige5JeMElM9enPWqjWKC7DB3KICeckkn8Klp3u0UpJrlQxRGgQBV3n5RnjA+tJtEs8cNzaMYfvEqOAakmUPGsqruAHTbjjpirOnz53IRlQ2AR0zinHV2EpderIrmREmhdYWZkzl1HzHt0PSorieKZXmt48TDI3sORxzx79Kv3+kpOVm+1yQtt4ZD1/Csq7ilhkSVTISrbdzDqMflUyS6oF01JEi+1QIBHxrg5U7IFZl/1YI4PrVWS3Nou9FJYN0HTp/nmraNKtrvRPkVTkerZNXppUitpZYbdWi42E/eGcdutKzbsmVdvS112Mm3jgu0HLK7cn3H19af/ZS3S+WrGOKI4OCT3qzcj7Lci6aTd5rY4HY+vp1q7pRSOGcDczFiOue1Pf5GabWq/Ey4JI7OVEjLPMEIyrYx2qUysbvzbl/3aLhQDwD6e9QpEUi8ySLLkZ7UmoL5luvlqQoIxk9SPShVGl5Gr+L1LPnKGit4kaSbJaULj5n68+w6Us9zKk+yeLzps7NikHCnkbfT/wCtUdpaCeLzBM6ls4MbY4pzQJBfWwUlsrlm7mrV7aozaX9XNOe4bVGRLhWhtwowF4Lk9cn09hSPDBp08W24fYxBWNjuz7e1MkucjeQQRwi9/wAqzbgFTvmyDIoIGfuj09/rV7bhurXOnhuxlmeQ+We3HWnPfoJojFuMXUjHf/GuW+3ReUgJAR+AB1wBnmp7e4M05nd9sKcJEH5P+0RRdDvKxeude36j5dtbCZuc7TjBPXJp41eC22Qz2S2ity8i/Ouf896pCO3W48yMgFeCB1Jp00YvYwPMeMkcc/L+RoSsrtBzJOxqNNG1rI6TlRuypRFB9ufpWfI7zCNJGDxE7iTjnis+O3MbGEsZEA3MoOBnNaMkjR5TPHGNo6U0kwt2YyR0hbMahSBz24qi11u+d8bSMqvf8afM5dwmSS5yW9FqpdO6yonQ9c46UXfQWy2LJmO0YU9MYPYU3z9yldpwOnWoZAsjYDYYdG9KpfaBG7xbtwLEg5xuqrrZlctyZ8SztMVzg7Nq8AcdaWFAFYBMvG2NoJ5Gf/riolvk2To4CENnBX6URyxmWYRzFm2/cHfmsuTqVr02FuWbzEdNq4OCFHQ570rs7SpDywfLEqSQB6GlndI2LKSdjZBI5zTYJGjmaRTlnIOAep6VCTEmtPI0JbRPsxwAqAjC571nhZpN7MhC9Dgcf5x/Krl3MblS0biNVcAHtnPU/wAqHOR5Z+65ADL36dKOTSzYpTV3dFJ/NtMo2CnA3AetSbVkwxTKYA+9yfep7iRDczhQApbp6f8A1qpBhDDIqnOSpGf4f8ai7W4rvRdx8KvE7ESNsBMcZ9u5H51PI0j5jQZwBljjB6fmahBle3PzblIJG3oKltYRcQPIX+cnGwnPaqSt6j10bCFQkDYG09s9Dmq+5zuiDEBgMZOTx2+hqeb9xaw/OQCcsoOQDjBpgkEUvzxB8ZXJ9f6UpJydh8rRVOYUZS0m88nnqf8AIqSGBnkkdpG55dCemfSrEU8FwdswCquctxxnvUkvmRbjdIr4YBHTp7f0pN20ZT00e/8AXyKzR7dQQRbgAgchehx0FNiyshb5xJ3I7VNJ5kLCWRWULGSeOxNS3BCQpJERuf5iAONo70RvythFS0i9boPLV+OC/wB5sd/rUF0SUBAJ2jIP86lgnEUcm4DJ5Hr9adPCDcIobqMhuoI/+vT8w0vqU0md5nlGRhOc1O84jQfP3+ZMZGKLWLY7lckA7AGXr3NOdCQUcxkuPlx2B7Uk2tSWorqTynzo/PQplvlBx1FT+WAqYXbI4ILYyajSHMKxPkADaBjOKlHDKC4Cgc59RVJK9xO2zV9StPmFi2zewdSGA7dKm8pEdpSkjhQNoJ49D+OakWCRo9/mIQjZwvBA96SOPzbnBx5aqG6YOe3Hehxd9Nhcy0bD+ypBFvVlXPzEA9TWZdWsltdKQ4KMcKByCK6crhmIfgD0BP8A+us65UXWo29rI4C9XAHcds03dIqnJqRmb7e2aRsO+cZbG3B/Co/Kt7iUyxHCBSWBz17DNdDeWtrJNHBMgXcMhduQQMfr0rOvbG2tY2ijUxn5W27uDzjr+tDbWy/Ed03pe/3lFFj2/u1cMnzbwBu70kMK7YS8gRixO4cn8q0pbS2guAdqOrQqdrdTUws7URiQpvyuQc9P8/0pJtqyQnJLRGWnlR+YTLu3dCBk5B4/Si6dC52ggsAVBj4I9K1raBI4lMcYG5crtA5rOmEvnNJLC7eWeCeMfUU5WS1DmUtSnbRMIZFDBuAwyPuHvj1/+tVoWUhkHlSwnJG3ap59fpmp3t2SJ5MAx4yQvX1xS6bJvDkkefGgDKB1x0OacWmwck05FK40ie5nEkk4Rg2D8uOvpUkVlPbgpIQQ2F3Z9Dz+lXr6VXcRhyZGj3Lg9D25qpHeb0aJw0kmR8x9e9Nq3Ujmk4tWBnQRgiInJ4b0qG3N1JMdoLKG4Ix6VJGkjO9v5gGZCgDc47jmplzEXRm2yImMqeGH9DUObWq2LlaL3KEkV80wLrtOed/J/Snpbw7tsrjGOCP4T1P4VJG6Xcsu8lEBG3H8PrU0MEPmmGdWU7WML9MHrg+xpy1lYLtrXQdbxxxJgDERBBIPc+tSjT7eGRpYkaJnwd2cCqsSXNvbbkbMfXBGfl9v8Kct6gIMpSaIc7D/AENCURXk9mWJY0k3xyljyBwTyPamQgW21ZAwV+Ax52/UU37dN5sc0G0wLj5ZOMUk10s00p+b7O2N6jqo9auW930Jctk2PxNGVYIQGUjCnOT9KgWcKGVtrF0BDg8jH/16iErQ/IkpkUnCtjlfqf60O0dpGScO5zuHfHrUNtOyKS3f5EmottslJAY/eHY4p15ebrVG25dcA5/h9s96rfbEeMMVOegGM8D+lPcefFlQCfQHFVfW5Sj2IZJo/MWWIAOTkZ6D8Kk8svtDDZnlsHAppECSbMMcDgAdKczs0bpna65xjtRG4Pl36iOoXAyRuPQdPzp8Qj8rKqDz8x68+lQmQO0YYdB0z0OOaWGTlyn3euDxTfcLLexYnUTzDYOX4OCTg/0pI4p0BQ4ZPVaYk21hFIuGPIOe9W3uS8WCFVsDAXj86VrvQlRt7pHChLs0Q+UA7m71em08y6bBNaXYkkbd5ke3/V/45BrKtZSkAw7ZkbDA9Kl+1tbkSJnG3aQp7Z46U3Lq2U009F+JZtLRGgEaP5k3dlB49hVyCwkUMtszMw++cE8elWdCv1XA2hEzmRiMlj6VrxajZG6dLC18wdWdOn/1zWUVKSdtiW3K6b/r/IwbjTXggY3K/uDwdo4H19KqxSRxwn94GaM7WPXPoa6u6vrKKPbPEQjdV2k81wd4qWl44twY0Z84IHK1pZ25mXGN9ETvdiS4QZA3HHXOPaiKMGRnLksOgOeR6e4qs6xyXHyMVPGc4wrepq7FGGky5CzoMFQTz75P1qJS1aFy2V0unUqNZh97NnAPAx1phhfJkAYY64Xr6VpC2drZljwyg546ioJo5JiFKOzquDtBySO4/wDrU1JPVgr3t/w33GfBvuzlZDlDlh06/SppLYzPwpWXk/O3bHP1p0dlIhZWim8tv4sYb9PQ1alt5SwhlaXgbgT1z2Oe1CblJ2YS01SM2SFYjslz5RIOQOn1qR7YzLGqYUA8tt4/z0q0trdeWQ8yscZHmdTmkeCVoSqsSjjvnKn3o66feNSVuzIZ4HhhiDbS/QlfT1/Wo1kEcThW3NGMlf5c1aWEukak8oMN16ZpkumCKRmEx3uB9BSSSWqFzJbspww+bLukGA3YDNWbhUGyNWJUdefU1KMK6wldsoH3T/F7j2qRrNpCgbEeeflPPFNq+rY+3QSOG3jbcHY7j0xgVNGH89sbMEDAzz/9em+T5YdUZm2nlXBApm9IoRgMW68nt3q4JJWRMlfd3GX84kUxAAYOGbgEClCW9vApQD1B7n25qDyd8BOcEn5QRjr0FASaW2jQqFkTOFxjNKUk5JW0/MbTUbXJGkeaLlGYckZH86cmn75UkZjvXrtbkVYUtHCFEaZPBZgRViJ5GkIcofcDv6Uo6xJb5XoUbu32SARMFzxvwSefpVRreZC/AcjjeARgVptM0VzOjEMmzcOehqoxmwJNxUdlz1q3p1Ki7WaRUti0d0PmJVvfIFFW5VRiJACpXlcHJ/GisJRcnct1IP7L/EmTUXW0WG0lB46FRjNTNIkiZuCQqrhsevfJ71Rs4hM4Y8cgAD1Pr7UxnJchwDhtvHHfmtG23YzUW3ZF6G6tbaLcoI3/AN3jP9arXzrLIkwQKV9R0pjR53McbRyAKbJbSyYdGVQnTrnFDk21Z7D9m76dSBbovMdrEGM5/GpbV4mvZWlQvFJJkj2pVtmEibSm8jlivrxSSWtza26mW58wOduNuMd6V19orlSWjLccVvLKSbcCIAknqT6VH5kL3bBUIQLk4Y+2B+tVSR9nDc5DAHnOc1JISJbeGP5POGWI46e9TZaXMuW7s3uWpUO4okW7Z09/UmkhkEchjkYtnOwZ4z7mpzaGV5GWVxIQTyeOnpVNIftFrKnAkjxuf178VN3HVglqR27B7txM21N2SvfGKvOUkSVYwrMw4284FUbWK3uYXDRnzUXO/P4Va0+5iVWiCERgYIAHP+FaK7TXUuW10RoksEeyNGeT3xx75q3FJGunvGQGkVDlgM5pjhU06RgCQxO0E9B/jVa3KLZSDMgbocYwQalt2aJlG+rZZe5WWJJBbtG2zAfcDkegqK1tjO0rPHg4ztJ4Ip+nRR3dzJE+4JDHvwPT0FWmmaykBX54yCQDwVHPApXvLTQX91bizyBLeRkzvGOD6fSq+qywSaQnljZJKc5A5wBz9Oaku/LnjSZQxEn8L9uOahsbZHi8xhu2FyVbkEAZxVXeq6hFqyk+5NayPJa+fIOGUANnACj+tDzTFS7usSHtnBPv7UsCRQqGAZYkTfsBzz+NQIFmuy92WkVD0HHHpSlJ3t3BtNt9CSKG5uVYLJlS/wArg9P85qS3gEK3G5wWjHATnJ7nFVnvZbdZY4lRUeXYoH8J7n/CpIImbTZ5I22kx5ORnIxn86UU1Z3F303NN1IRVkVj/Hk/Nn0qrdQKbiX986+TGDt5IyTk1raQ73UeOAIhtyeSeKo3zxGRiN4MbBX6cjIHFXNPmsKd42vuVIpoxaEGUOHB6jHOOlWzEkyxvEW85Y0QDqBhec+lNuba12qPJ3c7vmOeadp7eRNMy5I+7g1LjzPsw5b7DLlEm06aOW3AljjJXn+IHk1Hpsvk2ryxMZJGwNuOOnU/jUslxueVT9yQY6AkZ4qvZv8AZ4njHIHBJHJxxStd3XYFZqyIOYbVhMz+eEJI/wA9qVI3eCNVPms3BjzzinNJlQQM7uDu9zVxGMU8DIT5mGJYjGRxxQtQurorJb3P9oSG1xCGwCHGVFQ3u9dSjUsCyrhiDtAJrYE2/JAIYjg56VRkbyd80nzln2j27VslLRIrVpaIgX55mLynKjhhjP5+9FzCkzztIxKhRxtyfSpZIRInLH5+n9M1DNL9lllRhuwCAR9OKGlsyEne6IILQQBTJja5O3J5x9Keyq6hotykDblfrTZJhNbxvtwVmCgY4wB/iamClx5akLySCOMVEVa77A+Z6p7lZXnWR12hl+9wMcVblcGxiaEgoHGCOtMjkkEMb5AYkqSB6CmTW+1/IXaN564+6fUGr5tNS03ez3LUMciHB2MGB+c5/EUwF03AnYyEqSuTk0kRlSzZpJS5DZHb9arNLI0k4facsrn6n/8AVVeaJlpceJh9q2uH3ZZic4Hb+VV3Uyl5MfKejZxkD0qwYXndGV8bMhc9smmC3fbErFDGABtx1PqfWp5k9DTSNpWKfmoJUCvy+SMjt6mrB8ydZIkQFjgnjkHvUwsVE5beyhju2r0x6VD9sDSgKrB8hQc4Ax7U9ZCjZPQoTWzlXR3Csy7QQOozz9aRWmfHlna27DODjIHQ/jitK2Iub2QsMnO0AngDGKsPbpEqqiqMFcYGOMc1m4Nj5ls9zFhhudrMPudsnIY1ZUujbzhCCCQavRw+ZCBnABIHsKyr69Te6RxsGX+In+lPlfxIIyUnorMkRpJYSS65bJfnp71PC7ebGGYBfzzjmsyOTdCAqgMf4s81fspMny9oBUbMj+dQ2ugpR0bZEweWdo5GOwt1IyQccjP5mmvGSJEyc5544NT24Leeq4BZwAfQnv8ApUtxAij5c5U4yT1FDfQq6W5BaowSVvvFiCCOFz/jUsLPbgF1yucbgOmajGd5dcDA4FXZIwtowYA78ZqVe1xuLsQpDH5m5fuJkbGOOvIomRMoAwDM/K45H+NX5U82GFgSGZBuPqRx+VRW1ulzN+9AJVhg47+tNSbWpmp31M8wNBNsjYPwScjntxU722+ACTdIPu4PU1fayRbzzUOC6HIxxzRPaMLccj52G3kjbg1DTWoSltoZs1uVYJIxKquCxONoHTnvTXKyw5jZiVxuyOSPWrwgjuLgLKMp5hjIH6EU60gS2v3jA3xnK4brgg1UpPcryZW06GOdX3R5kjwp/vMv9aR7cwX8CqhEMiAAk/d/+uOKuwWK2VyWVvvyshA+mR/Krc9vmAByCy/dIGME04u6DnV9NjKMDGWIBtjF25x0IHf6jmljU+YVwgO7dgdzWiYfLtAhCljk7vfBqrAFMsknJIOBuHf1qG7LQjm0dtBZXdbc+WoJDEDjAFV/uRPKTuOOQOQauIokXDE4JORnip4odkmzCsGULzxxWnUrVaMghhWWNYcBBINw2HtRHY+SsryOhix8w5+UjuD2qzCUju44pASm08L9akvZDJbPZqSplYKrDsCRnPr1quYTuna+462hWa3kkU/KVVlOcbl45qO3jTzZfKG7PzfMO/fmpAx05L0qAwW3UkZx3wcVVXMVnJKrsJSFi3exOP8ACoUru78jOyvdbEV55rRJfRsA0T529cqRg/59qndVvoiyJuBwfl7+1adlZQ/2cyTqN0T+SxT+LJAzz9araXPuZ4ERY5EZlDKMg4OOaE3JXLs21bQpW1j9plLuMeU2ECH8asSWKyJNBg/Zo3Hzc7skZOPXrTLgDTxd3w+aRXWTGODngj9KvRS/6E8m0FmYuSfTrinbr1B/CrkCW/liOL5XYj5VOAMVWe1MkK7ZAN7EZPPXtVjY2oabJJE5SS1ZjE5HIONw6flVIoxjju1kYJcKr7CPuPjqPr3pudlZjUeZcw+yb7OzQrHl8/JngHn/ACKpXsUmmeIHcn9zLH5jovQA+n0NW0QXVqzOSCWY8H8amaGG+0WKdywMUrR5wCSMZx9KT0irBFtbmbcQy71O+ElmGGReQD0yaopbMs8nUOmeAcnmt25051gciUAdUIXBHfmo7SyEsTTiRgWXewPOR6U2r2dx3tuVrPy3E2/bIwkDnnGO36U+5ijdFnYiKRCRzzwff3/rV+GBTOBtXcerdz/nFRrbxXE5LoMZKYH161WyIbu0u5gRqsUfmopdVY85yfr+FSTzK9t9ojkDE/I3Jzn6duK17y2W2RUTA3LyAOKpTWsUaDZuVpiCwB+XIPBx9Ki7jp3LjytpPfoUUcO8bNIWUMAQvIApjKtpO0kZ3xZAIA7Vv21jEkZ4HQZwOvrT47BItxVmJYj73NOza1Gpq+mxhSRXEk0csSOImXGcdPYirRtpXfhdr7drA9xWqoEhZjlSF5Cng1Uds3Ky7QQwwAx6CrUXbVkOabVlqZf2KbyBtAUqSHUHOQOlSy20ccI3IGY84PUfWrssog527izc5NRiENN5YABIyTin7NIalJmdCnlnaE2EHK454p7nZNtKKA3UgdamkWNFYgMSCQMnvjOaglnJjLMBwB0Hqf0qVGyLb5tUUpJPKlXPXOc+gqUTCQKTlVI4OeM9qjMJa8UsQQw5FLNH5AKgkqAQ49fpTTL5fkDlFLFstngf/XpIxIYSEAAUByG6470+RP8ARRg4LcZx71XkY+Zs9UI6+lJvULP4uxoMx8oAtweQ+3qPajKZVGkzkZO4VHGgaFYj0BC/gaV4lM4iChW24DD6d6aaWondvXqUwX2uF3HDYBHQc1Zifd5SvHgjltvQiqsaus8iMwKPjI960IbVPszydSBxn1pNpuxTi7XW36k8N1JFGYkJZWBwRwQPStew1NkhxDhcE5B7f5/rXNRsJZlEeVBPINWyn2cPPGzKTGRjOefWqTS92xk4WV29TXfWTNfwsUYqgI3Doc9qmW5hIb7QiSgv8hZclQf5Vi6fcfabGKYoAxOw/wCNTufMaZTyyJv5PGOmK0dpOzWgpdbaWGTabGZLmRJNqE5QNzx3qjCfJlVg5lViFBOOvcVqNiGLbGANw6dqqssazRIARuyxwcdOlRKKtdBGUm2mXPNtwqrG5Uq4y5OOP61KLgiEouZWVi6uidPcGsi7K7eQdrHB55/OpTdT/wCpjfblcH0H0p2StEHB/Mv32uK8J+zofNx82ONvtWcplurlcueVyXOCce1PjvEtrCVI4wWPDMwHIP8AWsm0u3hvx5QAA3ZBHUen61MlJwutEEIq91/w/wDkdJJC6pukcl4+MnrVBbgCRs7gJB8u48Z/wp32zzpC20rng4PoKpFwsDqy7gSGU9xzQ1ZJFRTUXcvLLkuxLKxbG3PWpJopJ4BFHIQRhmJHWs+2lzMBjgcfj61oKxCPn5kB2YPX6/pUqTuNxUVf5imEXQDBv3i8gilhluIVH2pCWAO1uzVJHBmBiHYEZ2kdcDsasGylaJQJA6N90SZ9O9PZ7kyWmpVE4cGOYEHHPJx+dQCASRrMFKgPtUA5z61prbhYTCuArke+Km+zBoFRWKdfu8dTSc29CXKz0Xb/AIJnFEmBDx5H0pgtgJFYFygGQDjH0q4tq8bAiTI6kHn8jUotly44OBkA9Kq8dhtuNrMz87CSCxG3PPY+9PiYmIMQCSOm7jNaCWSZLMBuGTkVXtYl8+e0YnCPwR6Gm5LoJK0XfUx7iyDXrTMzDdwQDxUkQjkYJjcOgbPIPpitOdFVmBAIHP5Vj3gMjeZFiOROdw70ptt8yKjecrMnYKiF2XO07ST6UVNBbeZYbzM7ZALbgDnPWis4tWFL3Xa/4H//2VBLBwiLVjlQY9kBAIHdAQBQSwMEFAAIAAgAY39/PgAAAAAAAAAAAAAAABYAAABnZW9nZWJyYV9qYXZhc2NyaXB0LmpzSyvNSy7JzM9TSE9P8s/zzMss0dBUqK4FAFBLBwjWN725GQAAABcAAABQSwMEFAAIAAgAY39/PgAAAAAAAAAAAAAAAAwAAABnZW9nZWJyYS54bWzdWeuP28YR/+z8FQN98rV30j75MHQOYjeoC9hpkHODoggQ8LGSNkeRLEnppIP/+M7ukhR10l1oO3HTAj4vd3d2dmZ+8yI1/3q3zmCrqloX+fWETskEVJ4Uqc6X15NNs7gKJl+//Gq+VMVSxVUEi6JaR831RBjKXa1f5MV30VrVZZSom2Sl1tHbIokay23VNOWL2ezu7m7anZ8W1XK2XMbTXZ3i+XWW19eT9uEFsjs6dMctOSOEzv757q1jf6XzuonyRE3AyLXRL796Nr/TeVrcwZ1Om9X1xAtRtpXSyxUKKoU/gdnLZ/MSlSxV0uitqvHkYAo6vZ4063JiWJVRbvafuSfIem0mkOqtTlV1PSFT7pHAC6UnGfV5SDmfQFFplTctMTV3IrdZx26+1erO8TVP9koxgaYosjgyLOHDB/A88z8jjLQjbUfmRkLh0gzcDcwNwg1yAltd6zhT15NFlNVoIJ0vKgSnn9fNPlP2unbhoB29RJFrfY/EyGsCzqIo1yW5FMT+OZUG8gcD+akR7gNQI5UdOBiZ8UG6uWinnpv67TQw/4WfKTrvROdD0ZHxpfnzHhGfDm5tqs1HXtpd6QVsnLXYZynZq8hEeHwfe0w974kLnb5j9KNyYFJJLu0/+3dyo6RP6fjbXTmfdcE0b/0P6pWhbVFs1Lo2EcVDkKH1M5DonRJoCB46HjCgEgTOAwwdH7hZE8AhgBAXKAdhYkqaXeEc1QNJwRPgOW8GLkByoDYeBWD4AbPRSIFxpJASJB7xDTcbu9wD4eGMByBQKoxv4HgGH/FeBpwCN+eYNCd8YB54hh8VJid4gWHJwCPg2YwgCAgKwt6IxAFwc85rraPzctO0FmmNnKzTzjpNUfbLSI4Z6pAIXcY6ypPP5lkUqwzLwY1BDmAbZcYb7VGbfedqk2Q61VH+I6JiThgUoU/GJj66ZCzQQ6yMSVFU6c2+Rqhg9y9VFejYlE+Z51NJg8APPCJRn327ReSUkiD0mO97kjDcqZPIOBkNpsILhEmR0gt8QTGn7h/fs3er7Y1qGtSohmin6t4ay8o48WDyt/pVkR2WykLnzeuobDaVrY4YkpVR65t8mSlrHevDWKWS27jY3Thf5o7X+32JM+IkiJevi6yooDIxg/tuiFFRKR2FEaynIZaEHFMYpj0FDZmlsWPsRkuFwDnRWlVppyYl3UW6tsGL7I9cxsJuqt4m183bbtLo5Pagqjnw3WYdo8d07mX4va6K2gSgaRHKotbGlb7B9Y738cX0i148nz1w11P3NcnFMQf7aBzwCa+V5rbWUbmbtQ4orSD74ey8AzoN/iv+Z/zJeI4dR3kg+Z39zxnjy7vfl7j31PvqslJRWq+Uas6mz0En21pscALtv1nnnfnaE758io6OpGMj6fhIOjGSTo6k80bS+SPpgpF04Vg7jwZkLCJ0LCR0LCZ0LCh0LCp0LCx0LC50LDB0LDJsLDJsdKyMRYaNRYaNRYadQUZlpnsrcoDVTVIVWWazw3bwnFgG9rGyrxFtso72BXaONr/91WbptmfH+Rt3/JXp3A+rP55dfYVMa1V9j6++2eHdBjec4G9QD3V04Afkbxehz6dZVtzdYBuqo+zbVDfF4YXBbr3Hvv+9Lvv8q/69wd0fcNCVSo8y/cBwrWAAqVpEm6xpT9vEfJKI57eqQgVc3c+xXG+KTe3a3wH3F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name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m -Djnlp.packEnabled=true" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_algos.jar, geogebra_export.jar, geogebra_javascript.jar, jlatexmath.jar, jlm_greek.jar, jlm_cyrillic.jar, geogebra_properties.jar" /><param name="cache_version" value="3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0, 3.9.202.0" /><param name="framePossible" value="true" /><br /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><br /><param name="useBrowserForJS" value="false" /><param name="allowRescaling" value="false" />This is a Java Applet created using GeoGebra from www.geogebra.org - it looks like you don't have Java installed, please go to <a href="http://www.java.com">www.java.com</a><br /></applet><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5387010796848092458?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-55842669808656368392011-03-29T04:23:00.000-07:002011-06-30T05:26:13.004-07:00<table align="center" cellpadding="0" cellspacing="0" class="tr-caption-container" style="margin-left: auto; margin-right: auto; text-align: center;"><tbody><tr><td style="text-align: center;"><a href="http://3.bp.blogspot.com/-5kEg6mpVh60/TZHAhv9KquI/AAAAAAAABGk/Yg_SL1PczFg/s1600/la_noria.png" imageanchor="1" style="margin-left: auto; margin-right: auto;"><img border="0" height="320" src="http://3.bp.blogspot.com/-5kEg6mpVh60/TZHAhv9KquI/AAAAAAAABGk/Yg_SL1PczFg/s320/la_noria.png" width="277" /></a></td></tr><tr><td class="tr-caption" style="text-align: center;"><a href="http://recursostic.educacion.es/gauss/web/materiales_didacticos/eso/actividades/funciones/caracteristicas/noria/actividad.html"><span style="font-size: x-large;">La Noria</span></a></td></tr></tbody></table><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5584266980865636839?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-55100994521897452812011-03-26T10:42:00.000-07:002011-03-26T10:42:24.477-07:00<div class="separator" style="clear: both; text-align: center;"><a href="https://lh6.googleusercontent.com/_FCRvlIFo_1U/TY3gAf4XfQI/AAAAAAAAAB8/Id9HZnv9e1U/s1600/hyperbola.png" imageanchor="1"><img border="0" height="300" src="https://lh6.googleusercontent.com/_FCRvlIFo_1U/TY3gAf4XfQI/AAAAAAAAAB8/Id9HZnv9e1U/s400/hyperbola.png" width="400" /></a>&nbsp;</div><div class="separator" style="clear: both; text-align: center;"><a href="http://www.geogebra.org/forum/download/file.php?id=7544&amp;sid=f1f8c82d74bf4a3ca0bae7b584023b68">http://www.geogebra.org/forum/download/file.php?id=7544&amp;sid=f1f8c82d74bf4a3ca0bae7b584023b68</a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5510099452189745281?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-12998075342373616662011-02-20T02:56:00.000-08:002011-02-20T03:00:38.582-08:00<div><br /></div><br /><div style="text-align: justify;">Je vous par­lais dans un article pré­cé­dent (Geo­ge­bra : pre­mière approche) que nous appre­nions à uti­li­ser le logi­ciel Geo­ge­bra. Aujourd’hui, j’ai lancé les enfants dans des réa­li­sa­tions concrètes, au-​delà de la simple décou­verte du logi­ciel. Objec­tif : réa­li­ser une cible et une fleur. Une fois les figures réa­li­sées, les enfants devaient modi­fier les pro­prié­tés de chaque objet pour en chan­ger la cou­leur et le rem­plis­sage. Vous pou­vez d’ailleurs vous mesu­rer aux mêmes défis sur la page «Géo­mé­trie».</div><br />La suite <a href="http://www.enseignelibre.be/?p=4719">ICI</a><br /><br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/-ktXR0x83pZE/TWDzFbY2VAI/AAAAAAAABFQ/_kVYk1tTBmw/s1600/Geogebra_003.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="282" src="http://2.bp.blogspot.com/-ktXR0x83pZE/TWDzFbY2VAI/AAAAAAAABFQ/_kVYk1tTBmw/s400/Geogebra_003.png" width="400" /></a></div><div><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-1299807534237361666?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-82765241242815273892011-02-17T09:23:00.001-08:002011-02-17T09:23:51.340-08:00<a href="http://www.geogebra.org/en/upload/files/Polish/yuri1969/aaaa/stozek_przekroje.html">ICI</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-8276524124281527389?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-29053185979116487122011-01-22T01:41:00.000-08:002011-01-22T01:41:33.264-08:00<div><br /></div>Applet pour calculer la proportion d'un mélange de concentration et de volume donnés<br /><br /><a href="http://coxmath.blogspot.com/2011/01/mixture-problems.html">ICI</a><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-2905318597911648712?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-87785933391160314052011-01-19T08:01:00.001-08:002011-01-19T08:01:59.193-08:00<div><br /></div><center><br /><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/4.0/" width="753" height="488"> <br /> <param name="ggbBase64" value="UEsDBBQACAAIAAeIMz4AAAAAAAAAAAAAAAAWAAAAZ2VvZ2VicmFfamF2YXNjcmlwdC5qc0srzUsuyczPU0hPT/LP88zLLNHQVKiu5QIAUEsHCEXM3l0aAAAAGAAAAFBLAwQUAAgACAAHiDM+AAAAAAAAAAAAAAAADAAAAGdlb2dlYnJhLnhtbN1a627bxhL+nT7FgAcIzgFsiXvhLZFSyE6KFrCbAu45ODh/Cl5W8jYUyZKULRl9oNPn6It1dpeUKMmWLUVJ3Bi2yV3Ozs5+M/Pt8DL4dj5N4UaUlcyzoUV6tgUii/NEZpOhNavHp7717ZtvBhORT0RUhjDOy2lYDy3WYxbMK/kqy38Mp6IqwlhcxddiGl7kcVhrbdd1Xbzq929vb3vt+F5eTvqTSdSbVwmOn6ZZNbSak1eobm3QLdPi1LZJ/7+XF0b9qcyqOsxiYYGyaybffPNicCuzJL+FW5nU10PLc4kF10JOrtFQl7oW9N+8GBS4yELEtbwRFY7sNEEmQ6ueFpZSVYSZuv7CnEG6XI0FibyRiSiHlt2jjFCPu8x3GWOeRxCMvJQiqxthouZEbf1W3eBGilujV53pKbkFdZ6nUYgqXbTyRlYySsXQGodpheuT2bhEbJftql6kQks3HSvjyAnOWMk7FEa4LDCAoKUn9gm39Z+xqDM96cxYl7M9J2yn8xz2tOnoRy2QPbg8+sB8fgddgiEE+I/C7+rA4Hd9dEyTN03XNL2m6at/wQ6rDWhPAYk4HaMd+0T/6r9tr+wKhOPNOOi3ATloUILqWsk2kVCLKWamDSwAJ9CAgIMYOkACcBEhoEAc4Nj24QQ8YKqPAwMfAuwgDDjHo6OucoOoCw4Bl4NrYAfGwWFACEpQDkBtoFSdE6DoIHAccHCIp7RRpYC5wF1sMR84WmWjDMMxeIrzUmAEmBpHHTXCA9cH6oKrVBKcVDnXoeDa4BKljdvACXA9owfUB6bGuQ06Mitm9Roi8TRpT+u8WEKP0pjkKy4xSb9ONX3NUgMxi1OZyDD7DyKv5JSnYElaKo9a0uKubWk74jwvk6tFhe6A+f9EmWMmcLfHAocGDmfE5YQjjSyaS7bTY4T7vh1Q1+OE4qUqDlUkEdbDPj/wAt/xXY8yTMfFw9f05OLmStQ17gQVhHNRtcuflCpOm/Wrxg/VWZ6uuopcZvV5WNSzUu8iuK5SLWuUTVJxpWJXxymyefwhyudXJl6Z0fXzosBWs/pocp6neQkY6dRxUKA5RuaoZZRlSylby9haotGhlC6vk4BqCX2MzFFLpTIzpjUrJe0yid1OIyudn6i8GxZpGIlUbQ6zTNYXbaOW8YfVSpX8j7NphFHRDlPqzsu8Ujmm9twir6QKlxH2t0Cuz0s+57yD/kawDj6IMhOpCckMY2KWzyq4CdM1YxMRyyk2zYUG2lC5/d9opelNxKQU7eJSXRQY4PXVtbDf6B70WyOUDRUuKFakh4uu1YJHshQwxQWiBQKSlyGu7fUML5dh8ef/79TiZ/V1jlHwPsWNXJRwISazcIH7eljjeEvrnU7DLIFMs+0PWY3QYR5bK0oI7aE1V2ihOjK0FvpU25zP6lZgZMxttKnUT8UUiwOodXTrBFm6cKS1K19BHv2Ks224WDfMDNGvy0h2uQ5kdYjMIUyL69C41YR0uMA1dlHVCt+Px5WoYT60TinGyEIdnc71yzy5xxeVGqAjRg3QJ3emXNQyekUqkc1I1u3d8mIDxhbc57KMU7GB9cjg3KZhB+R4N8gYIjJeghg/AnIniLsor/PJUyHegnDFLvU1ZihWhJWuh+qG7PTJ9zJJhN7CDfnKichu0NK8rADmdlOcL+zGD3dtz5y0HlmQpuuOdHyD5Xop5zBq5Uet1IjiQCxx9Dlr1I54q23kdFYqfsvMAirDLmp7k2MZ7/boTzrQ1x0abznybJ9sOTsoW9rdw3jSIYe7MsyQXzTt4J5cKAWKaAshDEUvPVqgQr37dSJrlUmnQc93POoGHv4Sz2e+TizSc33mEC/g2MtoQHZmWXBQlj3NJ+e/kH28osQPSjBCjWP0sdnWv7BvSEtzn4blLpAL7ue4BvM1P4S7vaCIZQlxeFBqHIniOrHd4kdaAFfKDuHBDeaR0yKVsax3o3wpyzIvN3A+MziHWyi/3SfW3x4E81ED/VEiOd2PSY4WyQ3Cb7cQjvaI4+h5xDHrMdezmeMHAaeu49M1UmCsR/COySfER4gpc59FhDdMEm3z+V5s/nkr0l3hTYKeR7iD97ss4MxxPa+Nb2p7xPWY7xGfuAHx350S5xME+U95upjk2f04q3CnCi8I2X1RX+Bg0pDOL8QIR/oExRM8YLEVmRuVx/xjrGg9YBQfGnD779Lq2cTEFE4b6UX2cW0X5vUFVmKiWqu97OCC4mFTPyIKt9l0cT/3fsrdTodWqiqX5Y0p1jrbd+EfhCjUY5T32c9lmFXqib2RafP26W6InpMbNr1A6S43bBK053w1Xkmer0+0R57mkK/HHy2FPxuvPEBYXwNfre/OV40nnliFit277KZfxWcsRFeP5VzDaoz/jcrUT5N086JEw9T9fAP4pQXYObT+KU5Al0DQB2L/y1qvYvuPlLeXX7i8rcswFuvLftyh2LvhyGPUurtgencYnx0PpyM9zuE9wo/6PGcXaN99/HPm5/AIjG8+wjnuTdX9tP3O0PZ3W7Q93o+2x1/0WX93F+68MCHc7v44noGVk17L839PSq7FvBak4eWXv83y+vWFMK+A4RJCPJuVEEaxrCqBYyCR5usdOHsLL/9B7Ne46WkZRC3Psj//QClTToXqfV4yW76/05/fVEqgCEukfTOZtc32yiRrw77DN3Jdn33kS4NxjsZVopTj1acu+q03t1rXtbfmdVjW+hE9mPKauMxziW87zHddzzNMRoIepR4NOBZyAbWpw7tJ2nVYv/umVH+K0HyI9eYvUEsHCAonrWUhCAAA+iUAAFBLAQIUABQACAAIAAeIMz5FzN5dGgAAABgAAAAWAAAAAAAAAAAAAAAAAAAAAABnZW9nZWJyYV9qYXZhc2NyaXB0LmpzUEsBAhQAFAAIAAgAB4gzPgonrWUhCAAA+iUAAAwAAAAAAAAAAAAAAAAAXgAAAGdlb2dlYnJhLnhtbFBLBQYAAAAAAgACAH4AAAC5CAAAAAA="/> <param name="image" value="http://www.geogebra.org/webstart/loading.gif" /> <param name="boxborder" value="false" /> <param name="centerimage" value="true" /> <param name="java_arguments" value="-Xmx512m -Djnlp.packEnabled=true" /> <param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_algos.jar, geogebra_export.jar, geogebra_javascript.jar, jlatexmath.jar, jlm_greek.jar, jlm_cyrillic.jar, geogebra_properties.jar" /> <param name="cache_version" value="3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0, 3.9.148.0" /> <param name="framePossible" value="true" /> <param name="showResetIcon" value="true" /> <param name="showAnimationButton" value="true" /> <param name="enableRightClick" value="true" /> <param name="errorDialogsActive" value="true" /> <param name="enableLabelDrags" value="false" /> <param name="showMenuBar" value="false" /> <param name="showToolBar" value="false" /> <param name="showToolBarHelp" value="false" /> <param name="showAlgebraInput" value="false" /> <param name="useBrowserForJS" value="false" /> <param name="allowRescaling" value="false" />This is a Java Applet created using GeoGebra from www.geogebra.org - it looks like you don't have Java installed, please go to <a href="http://www.java.com">www.java.com</a> <br /></applet> </center><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-8778593339116031405?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-6332359800726297082011-01-11T09:28:00.000-08:002011-01-11T09:30:47.522-08:00<div><br /><a href="http://maths-au-lycee.wikispaces.com/">Wiki composé d'animations GeoGebra paramétrables</a><br /><br /></div><br /><br /><center><object data="http://www.inclassablesmathematiques.fr/media/01/02/367961242.swf" height="490" type="application/x-shockwave-flash" width="800"><param name="data" value="http://www.inclassablesmathematiques.fr/media/01/02/367961242.swf" /><param name="quality" value="high" /><param name="src" value="http://www.inclassablesmathematiques.fr/media/01/02/367961242.swf" /></object></center><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-633235980072629708?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-6359573508023371912011-01-05T06:39:00.000-08:002011-01-05T06:39:21.511-08:00<div><br /><div style="text-align: center;">Cliquer <a href="http://www.matesymas.es/jm/geogebra/espiral.html">ICI</a> pour accéder à la page </div><br /></div><br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/_NxB_F1GNmYg/TSSCQ09xb-I/AAAAAAAABFE/nYI4DjjQ8NE/s1600/2011-01-05_1536.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="399" src="http://3.bp.blogspot.com/_NxB_F1GNmYg/TSSCQ09xb-I/AAAAAAAABFE/nYI4DjjQ8NE/s400/2011-01-05_1536.png" width="400" /></a></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-635957350802337191?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-90355216132924777832011-01-04T23:49:00.000-08:002011-01-04T23:52:04.400-08:00<div><br /><br />Le principe est la même que pour insérer GeoGebra sur un blog (dont la plateforme n'avale pas le script.<br /><br /></div><br /><br /><object width="853" height="505"><param name="movie" value="http://www.youtube.com/v/v5MMMVouZjU?fs=1&amp;hl=fr_FR"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/v5MMMVouZjU?fs=1&amp;hl=fr_FR" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="853" height="505"></embed></object><br /><br /><div><br />Un résultat possible: le wiki "<a href="http://maths-au-lycee.wikispaces.com/">Les maths au lycée</a>"<br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-9035521613292477783?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-42317032328813922662010-12-30T14:14:00.000-08:002010-12-30T14:15:50.670-08:00<div><br /></div><br /><br />Article en Espagnol : <a href="http://www.fisem.org/descargas/24/Union_024_016.pdf">ICI</a><br /><div><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-4231703232881392266?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-20526792783266094952010-12-30T09:08:00.000-08:002010-12-30T09:12:34.093-08:00<div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/_NxB_F1GNmYg/TRy7ppIEzZI/AAAAAAAABEs/p4CgW6zH0E8/s1600/mod%25C3%25A9lisation.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="198" src="http://1.bp.blogspot.com/_NxB_F1GNmYg/TRy7ppIEzZI/AAAAAAAABEs/p4CgW6zH0E8/s200/mod%25C3%25A9lisation.png" width="200" /></a></div><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/_NxB_F1GNmYg/TRy7w8ePV_I/AAAAAAAABE0/JlDEakvFfmE/s1600/Calcul%2Bnum%25C3%25A9rique.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="224" src="http://1.bp.blogspot.com/_NxB_F1GNmYg/TRy7w8ePV_I/AAAAAAAABE0/JlDEakvFfmE/s320/Calcul%2Bnum%25C3%25A9rique.png" width="320" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="http://3.bp.blogspot.com/_NxB_F1GNmYg/TRy8DpiIBJI/AAAAAAAABFA/n_6OwViVr8M/s1600/groupe.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="191" src="http://3.bp.blogspot.com/_NxB_F1GNmYg/TRy8DpiIBJI/AAAAAAAABFA/n_6OwViVr8M/s200/groupe.png" width="200" /></a></div><div class="separator" style="clear: both; text-align: center;"><a href="http://1.bp.blogspot.com/_NxB_F1GNmYg/TRy76CPXcNI/AAAAAAAABE8/0bcLKmS6D_U/s1600/Donn%25C3%25A9es+Stats.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="183" src="http://1.bp.blogspot.com/_NxB_F1GNmYg/TRy76CPXcNI/AAAAAAAABE8/0bcLKmS6D_U/s200/Donn%25C3%25A9es+Stats.png" width="200" /></a></div><div><br />Pour leur utilisation, c'est <a href="http://maths-au-lycee.wikispaces.com/Apprendre+%C3%A0+apprendre">ICI</a><br /><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-2052679278326609495?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-56953820066024083662010-12-30T09:02:00.000-08:002010-12-30T09:02:52.928-08:00<div><br /></div><br /><center><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/3.2/" width="632" height="793" > <br /><param name="ggbBase64" 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"/><param name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /><param name="cache_version" value="3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0" /><param name="framePossible" value="true" /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><br /><br /><div><br />Animation trouvée <a href="http://mrhodotnet.blogspot.com/2010/12/doodling-in-math-class-stars-update-1.html">ICI</a><br /><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5695382006602408366?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-59019147638663851262010-12-26T09:19:00.001-08:002010-12-30T06:09:33.494-08:00<center><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/3.2/" width="788" height="491" > <br /><param name="ggbBase64" value="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"/><param name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /><param name="cache_version" value="3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0" /><param name="framePossible" value="true" /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><br /><div><br />Trouvé <a href="http://lanostramatematica.splinder.com/post/23787021/costruire-un-pupazzo-di-neve-con-geogebra">ICI</a><br /><br /><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5901914763866385126?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-37264027509453588062010-12-17T10:15:00.000-08:002010-12-26T09:28:20.465-08:00<div><br /></div><br /><a href="http://issuu.com/conica/docs/totconicadefi?mode=embed&amp;viewMode=presentation&amp;layout=http%3A%2F%2Fskin.issuu.com%2Fv%2Flight%2Flayout.xml&amp;showFlipBtn=true" target="_blank">Open publication</a> - Free <a href="http://issuu.com" target="_blank">publishing</a> - <a href="http://issuu.com/search?q=geogebra" target="_blank">More geogebra</a><br /><div><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-3726402750945358806?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-61530754829077874052010-12-14T08:29:00.000-08:002010-12-14T08:32:30.293-08:00<div><br />Voici un exemple de ce qu'il est possible de réaliser avec Geogebra pour faire comprendre un phénomène physique. La source est coréenne et non traduite... <a href="http://geogebra.or.kr/lab/bbs/board.php?bo_table=lab09&wr_id=5">ICI</a><br /></div><center><br /><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/3.2/" width="677" height="395" > <br /><param name="ggbBase64" 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name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /><param name="cache_version" value="3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0" /><param name="framePossible" value="true" /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-6153075482907787405?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-24219901032807726392010-12-11T10:55:00.000-08:002010-12-30T06:09:56.575-08:00<div><br /></div><center><br /><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/4.0/" width="751" height="560"> <br /><param name="ggbBase64" value="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"/><param name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m -Djnlp.packEnabled=true" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_algos.jar, geogebra_export.jar, geogebra_javascript.jar, jlatexmath.jar, jlm_greek.jar, jlm_cyrillic.jar, geogebra_properties.jar" /><param name="cache_version" value="3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0, 3.9.122.0" /><param name="framePossible" value="true" /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="useBrowserForJS" value="false" /><param name="allowRescaling" value="false" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.5 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><br /><br /><div>La source est <a href="http://www.geogebra.org/en/upload/files/english/Math%20Bu/kaleidoscope_oct.html">ICI</a><br />Des Kaléïdoscopes <a href="http://lanostramatematica.splinder.com/post/23805563/costruire-caleidoscopi-augurali-con-geogebra">ICI</a><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-2421990103280772639?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-91497923800592274742010-12-10T10:43:00.000-08:002010-12-10T10:44:56.585-08:00<div><br /></div><center><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" 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name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /><param name="cache_version" value="3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0" /><param name="framePossible" value="true" /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="true" /><param name="showToolBarHelp" value="true" /><param name="showAlgebraInput" value="false" /><param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><br /><div><br /><a href="http://pwp.franklincollege.edu/RTalbert/NonEuclidean_Applet.html">Fichier original</a><br /><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-9149792380059227474?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-80550668914017218992010-12-05T01:06:00.000-08:002010-12-05T01:14:53.541-08:00<div><br />Tutoriel utilisé : 22<br /><br /></div><center><applet archive="geogebra.jar" code="geogebra.GeoGebraApplet" codebase="http://www.geogebra.org/webstart/3.2/" height="540" name="ggbApplet" width="585"> <br /><param name="ggbBase64" value="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" /><param name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /><param name="cache_version" value="3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0" /><param name="framePossible" value="true" /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><br /><br /><div><br /><br />Résultat après quelques heures .....<br /><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="http://2.bp.blogspot.com/_NxB_F1GNmYg/TPtV6hDe1-I/AAAAAAAABEc/iOymknx9Njk/s1600/onde5.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="http://2.bp.blogspot.com/_NxB_F1GNmYg/TPtV6hDe1-I/AAAAAAAABEc/iOymknx9Njk/s1600/onde5.png" /></a></div><div><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-8055066891401721899?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-57346542728023698212010-12-04T08:01:00.000-08:002010-12-04T08:03:14.706-08:00<div><br /><br /><br /></div><center><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/3.2/" width="882" height="519"> <br /><param name="ggbBase64" 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"/><param name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /><param name="cache_version" value="3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0, 3.2.44.0" /><param name="framePossible" value="true" /><param name="showResetIcon" value="true" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="true" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><br /><div><br />Animation trouvée <a href="http://nbenallo.wikispaces.com/Geogebra+Math+Applets">ICI</a> et sélectionnée pour son originalité!<br /><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-5734654272802369821?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-8763840047452743102010-11-27T09:53:00.000-08:002010-11-27T09:55:12.625-08:00<div><br /><br /></div><center><applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar" codebase="http://www.geogebra.org/webstart/4.0/" width="672" height="585"mayscript="true"> <br /><param name="ggbBase64" 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name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="useBrowserForJS" value="false" /><param name="allowRescaling" value="false" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.5 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet> </center><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-876384004745274310?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-78492989356240513802010-11-27T01:56:00.000-08:002010-11-27T01:58:52.989-08:00<div><br /></div><a href="http://geogebra.mat.br/?cat=10">Un site exceptionnel</a> sur les principales courbes planes ( cycloïde, deltoïde, cardioïde...). Les animations sont double-cliquables. A consommer sans modération !<br /><center><br /><br /><br /><object data="http://www.inclassablesmathematiques.fr/media/00/02/3874006458.swf" height="320" type="application/x-shockwave-flash" width="450"> <param name="data" value="http://www.inclassablesmathematiques.fr/media/00/02/3874006458.swf" /><param name="quality" value="high" /><param name="src" value="http://www.inclassablesmathematiques.fr/media/00/02/3874006458.swf" /></object><br /></center><br /><div><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-7849298935624051380?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-47925487913783702082010-11-27T01:28:00.000-08:002010-11-27T01:29:09.485-08:00<div><br /><br /></div><center><br /><object width="640" height="385"><param name="movie" value="http://www.youtube.com/v/w7lgMx8-1c0?fs=1&amp;hl=fr_FR"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/w7lgMx8-1c0?fs=1&amp;hl=fr_FR" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="640" height="385"></embed></object><br /></center><br /><div><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-4792548791378370208?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-72016309883606643982010-11-22T10:38:00.000-08:002010-11-28T00:10:20.303-08:00<div><br /></div><br /><center><applet archive="geogebra.jar" code="geogebra.GeoGebraApplet" codebase="http://www.geogebra.org/webstart/4.0" height="505" name="ggbApplet" width="708"> <param name="ggbBase64" value="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" 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/><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="useBrowserForJS" value="false" /><param name="allowRescaling" value="false" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.5 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>) </applet></center><br /><div><br />Idée trouvée <a href="http://index.hu/tech/2010/11/22/szexive_teszik_a_matekot/?utm_source=twitterfeed&utm_medium=twitter">ici</a><br /><a href="http://onionesquereality.wordpress.com/2008/12/13/voronoi-art/">Voronoï Art</a><br /><br /><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-7201630988360664398?l=autour-de-geogebra.blogspot.com' alt='' /></div>Olivier Leguayhttps://profiles.google.com/101639560075872417983noreply@blogger.com0tag:blogger.com,1999:blog-2456262088118666227.post-57875344962838882602010-11-20T04:28:00.000-08:002010-11-20T06:23:15.784-08:00<div><br /></div><applet archive="geogebra.jar" code="geogebra.GeoGebraApplet" codebase="http://www.geogebra.org/webstart/3.2/unsigned/" height="463" mayscript="true" name="ggbApplet" width="583"> <br /><param name="ggbBase64" 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/><param name="image" value="http://www.geogebra.org/webstart/loading.gif" /><param name="boxborder" value="false" /><param name="centerimage" value="true" /><param name="java_arguments" value="-Xmx512m -Djnlp.packEnabled=true" /><param name="cache_archive" value="geogebra.jar, geogebra_main.jar, geogebra_gui.jar, geogebra_cas.jar, geogebra_export.jar, geogebra_properties.jar" /><param name="cache_version" value="3.2.45.0, 3.2.45.0, 3.2.45.0, 3.2.45.0, 3.2.45.0, 3.2.45.0" /><param name="framePossible" value="false" /><param name="showResetIcon" value="false" /><param name="showAnimationButton" value="true" /><param name="enableRightClick" value="false" /><param name="errorDialogsActive" value="true" /><param name="enableLabelDrags" value="false" /><param name="showMenuBar" value="false" /><param name="showToolBar" value="false" /><param name="showToolBarHelp" value="false" /><param name="showAlgebraInput" value="false" /><param name="allowRescaling" value="true" />Sorry, the GeoGebra Applet could not be started. Please make sure that Java 1.4.2 (or later) is installed and active in your browser (<a href="http://java.sun.com/getjava">Click here to install Java now</a>)<br /></applet><br /><br />D'autres illusions <a href="http://www.geogebra.org/forum/viewtopic.php?f=11&amp;t=19299">ici</a>.<br /><div><br /></div><div class="blogger-post-footer"><img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/2456262088118666227-578