tag:blogger.com,1999:blog-59323727525404337622012-01-26T13:32:28.017-08:00El blog de Luis G.Este blog tiene la finalidad de comunicar algunas ideas con mis alumnos e interactuar con ellos.Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.comBlogger48125tag:blogger.com,1999:blog-5932372752540433762.post-36273310949936312672011-12-09T11:11:00.001-08:002011-12-09T11:12:20.336-08:002011-12-09T11:12:20.336-08:00Un ejemplo de teslación construida por mis alumnosEste solo era un primer bosquejo, espero que su trabajo sea realmente super sorprendente:
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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="4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0" />
<param name="framePossible" value="true" />
<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="useBrowserForJS" value="true" />
<param name="allowRescaling" value="false" />
</applet><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-3627331094993631267?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/Gt5b6i8bBw9rqLLIitWLKZ_jvyI/0/da"><img src="http://feedads.g.doubleclick.net/~a/Gt5b6i8bBw9rqLLIitWLKZ_jvyI/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/Gt5b6i8bBw9rqLLIitWLKZ_jvyI/1/da"><img src="http://feedads.g.doubleclick.net/~a/Gt5b6i8bBw9rqLLIitWLKZ_jvyI/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/9xbfhCzix7M" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2011/12/un-ejemplo-de-teslacion-construida-por.htmltag:blogger.com,1999:blog-5932372752540433762.post-82960323300026580192011-12-06T08:11:00.001-08:002011-12-06T08:11:23.834-08:002011-12-06T08:11:23.834-08:00Un triángulo<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar"
codebase="http://www.geogebra.org/webstart/4.0/unsigned/"
width="501" height="355">
<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="4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0" />
<param name="framePossible" value="true" />
<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="useBrowserForJS" value="true" />
<param name="allowRescaling" value="false" />
</applet><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-8296032330002658019?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/lK6XTTuD2UmZvO7lggDXpJH9EwM/0/da"><img src="http://feedads.g.doubleclick.net/~a/lK6XTTuD2UmZvO7lggDXpJH9EwM/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/lK6XTTuD2UmZvO7lggDXpJH9EwM/1/da"><img src="http://feedads.g.doubleclick.net/~a/lK6XTTuD2UmZvO7lggDXpJH9EwM/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/LKxonpmBmEs" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2011/12/un-triangulo.htmltag:blogger.com,1999:blog-5932372752540433762.post-62178112755136585992011-12-05T11:04:00.001-08:002011-12-05T11:04:50.606-08:002011-12-05T11:04:50.606-08:00La rampa en un camión<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar"
codebase="http://www.geogebra.org/webstart/4.0/unsigned/"
width="686" height="363">
<param name="ggbBase64" value="UEsDBBQACAAIAGxohT8AAAAAAAAAAAAAAAArAAAAZWNhNzhiZDc1ZWUyNDNkNDMwMzQwMGY5MGJkZmE0MTEvY2FtaW9uLnBuZwBLQLS/iVBORw0KGgoAAAANSUhEUgAAAP0AAACSCAYAAACOl8xzAACAAElEQVR42uy9d3xV15U2fDN2HNtxZubLm5l53ySTuAKmqksIRDFgDAaDwQZTJRC9995xAVOFpCvp6uqqITpCIIRQvb13dYleBQhJgHp9vrX3kYRI7GRikt/v+97oj/Xb5557+tnPep61djkioF4EtIjQClFLM1uuEjU13cAnI38HpWIPSoqiYNAfgrf7rwA8sDTWlr/Ltm8mq21upBKixhaIqutaRa10jPp6iFppXX1DCy8bm5tETS2NooamRv67hbZh50JzmzW2lbQfmjpZbSsvm6vomuqbaLsW0a2iKyK0tIgan1bz/Vqf0vqG5yU/FiurWoTlejwvqyGqK6sRfrdbbUPbuVuen7emRbDGTtfSdq1Nz2qeXzdbX/cnZbuxfWvomuqFe0B9s2BN7NgNdL31fJvaBzXDO+6j45rw/NzsXuo6XVt9p3ti29WQPax7t2P5WauwT62wfdXDp++C3g2zanbt7Lmzd0DX39p2X8303ppq6ZlWNQr7tlvj8/tueNbAjwF6p0219B7Zs6D/W2hdHb0nVjaw994qrGcle9cNjUL54GEFmti5IBivI/S78nHLu+w6W+h6ax93ur+Gtvul41Y8Lh/O6ltNXbXoWXWVyGSzo4+rG2b4z8TmzZsRFxeHjIwMjBo1Cg8fPjxVW1vL7/GnWmtrK7eXOcb/140qQpPwcukBtzTRC2ysEaVciMWg/r+HURkFfVYENBkSfD7CExnnz6H6QTXyLTeQa76NqjKcSj9vQ6GtHHmmcmSnFqPIWYUTsSqkJFpxJb+S9i1A6jk9Lp8zITFBgfPHdGD7nDurxvkLOsizcpCV4UDGZStOHktD2kUDEk9l4NIFNZLOZEGeYUHmZT3On8tCWqoWSYmZSLugQfopLRIOn8N5aRZke08gPYGOdcqIywlaxB48A8VZKy7FK3E85CJSj6ogP2OBLtmJ5DgVwr6Ogfq0FvpEDdKiL0O6KxKqE2pckqYiMeQ8LWuRHpMF7WkDMuPo+F9H8zIzLgPm8yaIt4mREp+Fy7SP7OBJpNB9RR04jqyzepyLSUVWohbh30ohp3uU7Y+DMkmNxKgkpBy9BGumHfpLRmSdo+dwRovk43TcJB2Sjl5GysksXDqbjZSzmchK0eBSEi3TfV++qEYa/b54QcGfizrFhkypEnKxCtajDmiijJBLtJBLdUgNU0AVb0FGtBYNN4CMeD0uxWiQfcqK9GNGVFwDNJcK8bQCIiu9N63uLkquNOBKSQO0mjswGR+g9D5w9xagVt3C48fYk5aWj5u3WpCb9wRG6wNeOh3MnsFiKENhQT0vc3OqYTc/pvIZHechHj5AhdHwALduAmbTQxhNbN9n0Ovuwaan89C1lFjrccXWjNtOIF9TjyJDAwr0z+BQ3YFDfxW8brY5K0Yg2So1/vDue/CfFYC1a9fi7NmzMBgMHPRlZWXz/qeA/WcA94+DnpizhTFSm2e/f/Muvhj9KXr9928xzLUfuv37r/GZ92B4v+2Bz32+wkc9vsSQHlMxtNsMfNQtABO8VuML340Y/uESjOi9An7dFmHy0F3471+MxFif1fD+4zRaPw+feazEiA/nYci7s/FJr8UY5bYIn3gsxDtvfoQRfefh/V+OwCf9FmJkr3n4pPd8jHVdhiHvBfJtR/RYhGEfLsJYt7X8PB93X4qx76/GuHfXYq7nXoz54yp8/s5afPqHlZjhspvb2LdX48ueWzDq98sx8vfL4Pn6NHz0Xwsx7v11mNhtPaZ2XwMX0ccI7LcJS3x24/PfL8L43y1EQK/N6EXrp7y/BtO6rYN/z02Y0WMd5rpsw4BfTMD0HqsxtecaTOq5HuO7r8XYd1fh03dX4LP3VmHih2sxpd9mTHfbgtk+uzD2vcUI9NmBj383GxO6L8MXHy7DqD8EYsx78/HxH+ZgsstqjHg7EKO7zcOId2ahx2vD4O+3ke5vNsa5LMboPnO5jXVbiM/cF2G06yJ86rYYX3iuxByvbfzaA102Y67bVkyj61rq9x3Gv70IX3Rbjr6iTxDguYWfd/Q78zHLZxsm911D516ITz5YiAHvzsHQvssw0mMNvN6fjaG9l2KUJ/3vsx6+3eZiuMtyDHdbAc/3ZsG7RyAG9lkAt/f9McxzBbx6zOX7Duy+CEN6LcNw19W8HNBjAa1bgP50P+y4vj0XYFDfpRjmvpLKJRhM9+T5QSA+cl+Cj1znY0ifORhB64b0XIT+b8/BkG5L8XGflfR7AZ1/Fj5ym4SxQ78EI6TmRkE5njx7Bu7eXpgZ4I+NGzciJSUFFosFY8eOJQf1eDir1A0NDV2g/4ugb2Kgbxa1Ngigf3a/GkP6DofiuB5xO88gS2yFOqIYyd/lIHheGiwxDTiztRg50c1I2lSCkAANQmfrIZ5rQ/SKEhyabUboAifECx0IWWDCwgEyiOcZIaZtpAusWNE/FkvdZFjWS4plPaRY2UOGvYMv4+BHCnzjcxl7+2di3n9GYa+PGvP/IwHfeujx1c+jsOC/zmPGW8fJTsL/l6cR8PoZ+L92BvPfuoAZr57C3DeTMP2Vk1j868sI+MVZvm7Wm+cw+41zmP/vKXyd/+tnMe/fLmLWLxOx9D+Taf0ZzPnVKcx4LR4zfp6AQDqu/y9OYv6/0bl+fhxLfnORfh9HIJ1z4a/PYeYv4rHqd6kIeOMYpr6agBmvn8a0V09i1lvnMP21kwj8VSL83ziBwH89hak/j8W8/+cMne80Fvz6NMKGlmDKK1Ic9LFj1usyBL4hxT43FV1fBKTDnHQd4fjeIwvBfjoc8FVgX385vvfNwr4B2dg7MBvf+8mx10+J7wep8N3QbETOzEXcomJE+Fuxddh5pG8vx5wPw5C89i4W95Hi8oYHiJ1pR+KSElxccQNHA+xIWlQC5eYyZG96iOxtj3F6aQnSNz1AxpZS2A+14MLq60jbdI//vrjuFnJCgLj5TuRFApd3luLMhmuwRrQicdMNGIKbcHF7KYwhzUj9ugym0BYkbb0NfXA9MvaUQ3mwCpGLbdCJGxG3Kh8mSQtMkU3QhzXCEtuEbOlDBK8llSMtRUrIHcRsyYU+vgmmE62Qy8qhOV6Ky7F2jB8yFVzuc7ZvEpksRrh5uGPq1KnYsGEDEhMTOejHjRuHBw8eWLgiaGzskvd/Wd438ofZXF9HsRXF6uV4d9KgAOjii2GIuof8mEZYgxthPwxcWv8YqesrkbquAnEzcnCFKoV8YxUy1lXh6KzbiAu4i6xtgHTGDaSsr0XcnFvYNYTk+Jqn2PuRCsf9b/BKe87/PkL6axHipkXMwByEuhoR7kKV9zeXcHzgbQR3z8WmXykgcynFclE24j1qMFeUjo1v5mDNz23Y+DqVP7Nhy2t52PFmEXa9VYKdvyzGKpEJ298oxEqREbv//RrWv+rEulcc2PhaLnb8qoT+t2DDz3OwRKTFutcsWPOqARtet+Gb/7iCRSIVtv4qH2tesWL9aw6+zY5/K8Z8kRwb33BihchApsPmXzrpmrTY9EY+Vv+LA9v/9SoW039b3yrCMjrvjn8twtZf5mHtKxZset1O/+fQ9Vqw/hUdlooy8f1/FSKyRyl2/aseq0UpkPW6ie1vyRHerQDf/5YcY+8ibPm3dEj6FULqVoIoDwK2WyFZMSSeV7gFeeViz2ALogPu4Pjchzgx7xHi/O/gZOADpK+qR+aKOhyddB3a1U2QL67GqS+uQbu0Dvb1QNrMh9DRupvfA3cOkIw/CJyfdhPa5dUwrWnA9b2AamklVMufImvRY5TQ72LatoBMvbEWeVRm0vssDqZjra5EcSiQvPwRSsSsfIDrEsC6n7bZ/BTOI+CWufUZrz+pG8pQFAGcW38b9jhAGfEUZiIR+9FWaMT1MJBj0JFTObH9CtSyMsjjSjBx8DRwFVpXw0PP9IxLcHHpi3nz5mHdunUIDQ2FSqXCZ599htLS0oqXBXsLU75k/1eDvrG5khaq6UariOlbRPWlDRVT/ObCHEueXlqNnMPNuLyyDFcPAWem3UXxHkBBleom/dbQy09f+Bjy5bU4PuUOsla0IuGr+zgbUIEz/mU4ONSMi4GPIR2dg2MTruJ7LwUkwxxI+uIOInx0ELsoENvfApmnFUe6qxDnnU8ALyZgpSCiRxG2/UqJOJdHBFgLAY3i5t5PsOvfGajV+JqA//UrduwQmbGdwL6NbMfPLNj5L1bsesVG68x8eTuBeNu/WLCZAMmMLe/8uZX2J+ch0uDbt3IJzFn47q0CrKHjfvNmHrbRPhsJyNtfteHrN3Kx8xc2bP4ZOQj6f+srBux+w0HHsmKTyEbbOrD79XzsoHK9SI+1tM1Gcgor2THJQez7lZN+y7GVnErIfxYj7P9cxe7X6Lz/qkV83xvY+GoKEtxv4dvfKBHeIweyfgWIJoBH9stFrFcJor2KIfMpQYzvVXpeOYj3uwH9QmCPjxln5lYhfupD7PEzI31pE/YNNEO+tAVBA61QLGhE1qxqZM58BuXsamgDa6GbXQvLvEY4lwPGZY1QLarmzoCZenENrn8LmFY1IntBJa7QezasbcKdICB9USUyyQlkr65GwT5y9OtrkEmO3sEcwIYq5NM2aWsrcDUcSFx6DyUE7Etry2Am8F/e+BgOIodCUgtmqjMpGx8hh7ZzSgFtUA0u7biNi6QQzMGt5AzuIk9G5w1thj7yCbIlRQgYOR/giU6WZK4VqVVZeOedP8Lf358zfXJyMsxmM8aMGcOZvrm5+Z9Ssv9NoG/CUw761tZaLu8rrz7D9AELYIi4gYvr81BKL4F5+5tk2sWt0C0hsC9uQPHX5PlXPsUtYgrVsnpoVgInviiFfjVwdko51FSxzk8vR+ggK1QLGxD5UQ6Uc+vx3YdZCPU0QeplQFg/FbEZlX20OPhOJiJ6GRDxoRmbSaqf8L6Fda9ewDe/JkXwTgGB3UBMnY55oiRseEWJbT+TY/vPsgjoCuz+uZIDafdrKgKfEtv/JZtAlk3bZBFIFQTYTAIes3Rs+Rc5tr0qx9e/UGOLKAPfvqHHOlEqvnvTxLf59g1i61fUtK8SO1/VYNfPtVSq6JgKfrwdr8ix4zXa9xUNgZ45AR12/MJA4NeSU8jixs65/9d2fp4tdM6vX1dhz1sE9DdVOPS/zJB9UEIsfwZ7/4PWE9ilvfLJcrH3t3IcfkeLbb9OhqSvHdGe+ZC4ORHpTs6gfyFCXWyI9MpDyhdPETGkCAmflyJ7EZA0tRL76JkaVwB7+2mhmtsM7bxWqGY3Qh3QAOPcFlgWAHayXHp/RWsA3cJ6lOwipidg3iEgG5Y2EPjryRk0QL+c9lndTMeuQgFtw4CfuaQKaUueQLG6DoUE9uzVz3CN2P4KWcrSR7hKjJ+5thIFTBGufIBcAvj9eODi6lLYSFGkrnuEAlIDJQT+qJkO5IYBNto3n8o8Ws9CCdO+VuTRbzsdyxHViKObszB14EwILRa1opaGindTLpxF927vIyAggIP+woULHPSM6f+WRN4/OegbRC1oFmImip3uWh5jWv/FcEbfR15oBZx7qlBKL0VJ3l4x9ynK6WWmEZPfpoogX1GJ7GVUGRY8xYlJ92HZAGL0+9BR5Tv95SNIhxchI7AGx8bcwJkJ9xDkbUKItxUhHlTxvR2QulsR5WYjKWvmgI9xsyPOjeT+ByT7idXi3AoQ65qPBA+SuX1zIe2ThwSva7yM7M1+5yDKpRAxHkWI9bjCS/Zb0jcHkS4FkNK+UW5FtJyHiL7MhPXR7oWIpTKmTy4SXOnYH+ZQeRWynvk46nINcX2vIL7fVV7G9iniFte3mNaxshDRfenYLlcQ0a8EEiqlbteIma8gvDc7dzFiPOkY3jcQTscP62Xn54t2L0BEHwdtl4MT/ekeejlJyjsQT/+F9zTjmE8xQrppcbx/AWTu7JmYSAHZEe5qQpiLEZHedojd6Pn1MyJ2YAGCehsQ5UPPwSsH4Z4OiGmfMA87Dveh5+hXhAgvJ4LdzQih/UNJSYm9bPTcLbyUUEh1yF0D6RA7ooY6kD6TYuj51bCsbEHhJsEB3CUnr1hQhdvkENTL63GLgKshFXCF1iuX13AloFtTjeLv2PpnyN3NFGA5bhGQlavLcYXVk2X3UED7KSgsvEXsfpX+u7DkOgqo7uSRc8ijUrWtHPrdT0gxPMSdGAojCPzJa0phDauDJfouZgwi0LMmw2YipaZKYvps9OvXj4N+/fr1OH/+PEwmEwd9eyKvy/4K6Fm7aVPz87byYvUjTPNZBlt0KfLCn0C54RZuEJvfIu9uopefOasc5rWtODq5EDfIK2etrMGFORVQLKN14+9SXAgcoop1hEB9yNOM6I+KIB2cj2AvC0J9aL2nBRG+eRC72hHh6kB4X6qsfawEUDtVdidiidXiPXMIAGpeRvYhVdBPsHBWoamCR/Q1UqxLrOdGx3K1cGCwMsLN3PE7nBxKBFX2CNounCp7GG0bRiBg66WetK+LmVtUPwud2wqZi51+2+g3A6YD0a45vJQS40r6Cf8zByVzoWO6sOM4EeoqWJg7gdvNwZk4jLaReufiSB8jxd8EeG86jocVEncLPy+7tsMUyvDz9bGRo3PSfZnpPHTcviZ+TVK6TokrPTsGUNqPgV5Cy+x+GOjDaZsYD3JQXoUIek9DzsSGhP4liGTP0IOebV8zVwTMCYSQM+CAp2sJIqdxmI7H3kGwpxGH3TTY10uB8P703HzZe6Hn7GfHEXc1tPMbYFneCsOSJuiXUYg3q4KrvfsUo98gR3Cd7FZbPuAmAdu0vgHXqbw8vxTXCfCpC+7hFjG2at0TFDMHsOI+iqgsIaBnr69EIS0rNlVTiNCM6+QQCmn9xeUk7+mYdrIciu9lKy8JoG9gfSQeWpoayodfunQRLq7uXN4z0DOmZ6Bn8v7Ro0d7/m+Px/8uoOcdKjp1/ihSV2Bq/1UwSO7BdKQc10mOldALunmYxXh1/GWnURxfRC8/eVkZ0lbVkuRrIaZ/CM0yINS3kCqTA2HeBThIgGWV7iCBNZjAJ+5PrDQgD0HujLVyqUIXIZyYL6wvsZ5bHjkA2q+XhcDlIAdAgPEg0BGIpVRZY1ildzEgpLeS5K4BscR8sQSmKAaSfgbuFGQEqCg3Wkegad+vvWQgkrgauaPgoHInR+Fp5qBiLCqh/RhIJaQ2wuncke4O7jAi3QWwMeCy7SM9zHyZrWcgk1IZ5SGUEjpXJB2HKZhoDzsHMGdscjrRdAx2Heza4pgjYFKdnAoDbwwBlN1zrA85D3JobH92LK6G6DgM5Oz62DK7LokLGSkIpoIiqYyhUtzdjFjPAgR/aBacKT1fMXNEHuSUiPXF5IhCvRwIIWUQ5pPD1x3qp0ckOyfdT1BfPZkOR+hZRjAnQc+S/Y4eTMek+w4fQMcZYEPm7DpolrRCu4okOEl/6xaqB3MrcZPqQ+riZ7hDRHBqlgDw9NU1cBJZJATcwA0JgXpVBfKJ7ZNXluMaqUcnOZFrtD2rS5ptT5BLYL9K6wvIWSRtuAKl+BqmDZpBMX0dKdFaHtNrDEZ0+7AvZswM4E12Fy9e5Nn7rpj+bwA9603V2tZri3nUG7ZnmOy7Atb4cpxdn48C8sLpawnk5ImlE6xIX/EQ6m01ODHnCpdi8g31iJ98HVkLmxE5pBjfEUNLPHN5xYsipmYgiiZmP9Rbj3Cq7IxxxN7Ebt55kPoUEYMVcFaSeufzbcMY8xKAQmn7drYL6qkkttMjYXAuIomhwt10BDhie2JABnZWRhMoGLgY6DuDXcqBaOJgby8Z4MPcjQjzNPAy3MvM1UA4AZMrAo/nJQM8X09gDSVnE+4hOAumKiRtAG83rjxcTNyi2PEINOLeGgKpgRvLXUQQ0JhDYE4trLeJOw7G/AzsYnKO7J6ZimGKgCkDZly9MGXiLjxTKYVAzDkepZCAAT2KVEkcY/3uFB74XeMtIeGkJMSuVq48xOTYmPwPpWsOpWtmxkIAFiLEDCik49v4cWP753U4l/gBBfwZHOmjp33NXC0cpnfAQoMwXwcO9rfge289drsoEDGykKvBhEl3uOpjMX/G8loO/IxVdbhBdejsvAe4HkGSntZlbWhA7j72Xw1vAWJ5gNSVd+Dcz+raMxTTdjlENpKVqfjKbzoYIbU2PRNV11W8e+ZiKnq5+WKmf2BHO73VauXt9KxHXldM/z+R99wzNgqJPGL9sutPMHnQAqhld2GVNcNEYC9gL4u12QYKTiB53XU4aX3MNDvOzL6GAwPlONJfzxN0Yqq8pwYWI44qqJRJ3F5aAqSRZ+hl3sRu/Vnl0ZKEFCzYg4DhoecW5i5YuCsxua+TA50BVEKhAbNQVz0O91bx2JZL+DZZz6UzVVQmgZl8ZwBtl/XsdzgHrk0ALwGZr/cQgM9Ymx2PMbfYVQAyDw1chX35bw8hdGDbR9C98H1pXainhZd/aqFuwv9R/Z2Q+eYISoKujZXMiYT21XPVwZRLrI+DO6OEgQxwesT4sHPr+DIzpkqYMUfCVARTFeyaBHbW8fOE0LHYclR/O4LJqbDnFuVl58+cOZ8oum7mACPp+THnwxxPWF+mmvSI883nqiKcnGcIvat25xXaW4d4ctZsOaY/KQQXweFFelsRTNcXOSAHh+h4siF5+K5XNo540TEH2Si00yB0kBkhfgZcZwm/RVUo/AYwb6R69C3F+yurefNf1upmXFpehathLPN/F4WkAG5JST2Q8zix+DYM4gbIJTcwdVgAETyro/WiBjSIMnQWfOjuh+kBgbxH3rlz52A0GnlMX17Ouoh3gfqvN9k1CbKpufUpB3/Nw5pTXw6ei4zQ67DRS0ha+xC59EKch4Tky8n5+cg91IyTAfm4Tr8P+WXhgGcWIgYaqWJouOyW9CI2o0olI5aIIZDEMklMFSSY4scob6rAxNYR3gaSmxpehlOFCXWnZSoj6X8xMTkzzsYMmN5tTMuYm0DClpkUZ8DmjNxubQzNGI0BWGA2wQS2E/5jIOEMTs6FMamYhQceTGWYBOfhJoCd5wnajDkWwdpUAk+KWTnwWWIyrE0pMGksOBcBjMzYMjsfY0zmQBj42bmjyEmGEVilHka+zMAu8zLzkq1rLxl4mQIQQhOrEOP7kkKgZxROTiLUixQCK91pex8bf8YM+Nx5uAgWRb9lrgb+PpgTZu+JJQqZMxHTe2LLrDwxqIAAr+GOgZ2XL7uw52ThDq/dGTNHyRwZd8h0bubMj7io+bUwRx7qQ+GChxoh3hqYljdBs7AGN74Gbx68yRh9cT2uhTCGL+OJvUsr78FB7M+cAGP6xI23INsox8TBU9FS1yBqaa0XNaFFlKbS4w8f9ME0/9lYsWolTpw4AY1Gw0FfWVnJK/ULEr/1H1S+tLEehu2GF6z9/xft7xnT85M2CQduaRVVlT6t+NJvFgzRFdDsr0MRxVc3Q4TEjXxhBUpZNnZuBUq2EtMPteNA32xIfa0dLBjL4kUCPJfXHdJaMM7abcZY40+t8/+CWV4wBpg/XfdD/3cuf8z+0nH+J/aXjv1j5/vz85o6lX/J/tr5TR3lnx638/N/0X74vtrX/9j/f/lanr9Lnv/wZiqKnNsAByyLgNs7wPsIXKdSsbgRV6guxU7KRzHF9EzmZ6yp4Mnhi8sf82a7jKBrmDpyBppqn/EOZKyumiim7/5BD0yfOQPrNq/H+eQLsDsdGD/hc945h8v79kFdL1gbeNrLlrb1P7V8GeOYqxc1gzmyJjK8YC1obRv81kjb14kaap/yfaqqagTH8JPO2dYJiY7T4Wn4ymZw0E8a6A+t5DHStj3mcZluzTOUbANsS5vgXErl/FacGFqC4N5aLrGP+hUIL5+WWfKJMefLgqrL/v9vLMRgYdHhD1WI9nEibkAerzPRFMqE+JgRNNiAA0NUKCBJr1hXBfPOVlwj9Zi+6glySF3GrFFj0rDJqHn6oKKuvkrU2FgvyriQDLc+PREYOAtrNq5FwskT0BoNGPf5eJSVP57XwcY/Cvqmvx/oX0IptLaNVGXqpaGtFKyZQE3W2CBqqqnhY2M6n7N9BOtLgh4/APpZUIU+QB7JrNtk+30vU8wmR7g3xeF9VVzqsZfHwM1eJgM6i1OZ7GQvur2Jqsv+ea3d8bP6wJZZ3WB2pJeGhzdB7nrs7JmKA34qyNdU4TYxu35TI66S9D8x4zqKiPFjVmvgP2Y20FrfIXN1WdkY6OWFWbNmYdW6tTh6LAEanRZjx32Gh2WPTrV3qcWPyuSmjqHkLyvvW9tk999eCs6DJdB5kznrBo9qsqf0XxWdo6Fj2HlrldCq1visRdRYWyfk31D345L/R8D+Yt/79otoG+Nefb8KDPS5xxpgOdiCLIq5vnE5D9kQFg+ruYQ/6pfHgR7rm/vCS+VNWV2A77K2PgmM5dtbIJixOsPqC09qkuQ/7K2HZKQVdpL7KXMfoHiv0AGoeD/rtFOH6OVqfD5gAuG0TlRfXyt68uSJSK9U493f/x4zZszA+o0bcPZcIsxWCwf9vdL7+PMBMz8C+peKkzvH4z/Fns9VIMw90MTB3gqWk3jC57RAQ6MwL0J9p/kVSKW0tAg9aIX7eAnQ409AP3lAIHTix3xwBOtgETxIgSMeCoR5kDTzERI+nTubMIvpn8NZv70HWVfF75L27XWDEUH7MvvvUC81TwSKfUw46KXAQzFwdtotaFbWoWQ3CycbYf0OOLnehq+GToMgyYXRczaDCd3feQ8BM4WhtWyUHWuyY/K+9OGDitaXBuTfYk0/ydDG9O3zWAgYbOQJdeAZB35zdWkFWqpET+5fI4xXiFD3RFT35IEFzVVCS1tbjuPFZOD/wJG18lF2nWIVNpvLvRoOekd0Pc4uuQnNhmoc8MpAhK8BMb42BPVQ8YwvAzbvAedmfiF+a5f4XRW/S9631w/G8O09Cxk5MLJgdYQ1/R0iMmF9/7PmP+Ej/hTza5A0/T6P82UL1Zg6lPXIq2sb/QZRVmoa3Hr3xZzZgVi9ejViY2OhVCrx6dgxePS4bA+r+Kxb+V9i2b8H4PGy1o65lhcTfGilOB6sO/FdbNvwFT4b8T42rZzAZ61CS/m7rDtyTfWTH1Ubf1XF/Bjop/jOgVVax7tDMqZnoD/YT85ZnrUTs55j7S+uHewspmcvmnn19pfcZf+8xuoEU37tEp+VLA/UnvBlfQOYA4gcaOHDffM2Cn3+r2wFHOuB3D1A/BIjZgyfjZbqGqETGVVaeUYm+rt7YnYAxfQrVkImkyE7OxujPv0EDx6VcqZvbm3iSbLmH20Ow8sDvjNo/1bjyqVKkOmtLS+yfgtj/LJ5UeHLcHDvBBTnhmHnluE4vC+QLru0or6qspNsfw7yP1cULS8yfyfJ/wOgr+OgN4ZX4YYMyPkWCBmogWywEyF9dJB55EDc28R7kLW/0HYv3u4IurL3XcaMgZ4l7ljdYETA6guX/f1MiKZ6xHpdsk5Z9lXE9DMf4z5JessSQDm3Fso19UjZUoLpQwOI/IR579j8inaTDe79XDDLPwAb1q3H6dOneeecsePGkLynmP4H2r9/MN59mbbu1k5zIf4U4/F5lQD8lk5zLvKSDX4rmzdi0G9gNx1GgTMIDsshfPzRf6C18QbY/BeNNQ3PlcGPAv+vgb7dA9GJn9x4ihmDFsAsqUFeMJC5vBLhQww45KLiYGb9xKVuDt47rKtid9lPMVZ32IAjNtAp3IN10tIhzFMndIsmpRjiZYJ6dSOiA9WYMmAGUNckzN9IdVSt1KD7e+9j/GfjsGPbdkRERCAtLQ0zA2agrPzRnvrGOl7ZWUa/oKAAFosNNosTNqMDDlMe8iyFsGod/Lfd9NysBhtMWjP0KgO0Ch0seitf77Tk8P/Yeo1cC51SD4vKjAJtIYrVRT/JCrX5sKv1yDNakWNwQpdthTaTlk35cOgNyEg+hkGe/4lo8VLIguchJmwJtq2dBKcpFa11T4Wmu8Ym3q+mtbkN8K3NHcCvra/qlD9o+eugr7r9DAFDF8Mua+ADH/JJZgUPELrMshFjsd75COsjdFftqsBd9jKgZyMWeQ/HdsB7CqMjQ7wsfMhuzBwdvvCaCoEZ2dx3TSJFthxuffvh83HjsXnjJkRHR/OY/otJE3H/wT3O9Cz+/+KLL/DFhC8xf/YCzJ46F/OmLcS0z/wx9dOZmDh8MiZ8/AUmjpyIL0dNxqTRk8i+ouUvad2X9N8E+E+chcDJgZg3dQHZPMydMp9sLhZMX4RlM5Zj0sDJpIinkE39m8tJA6dg8tCvMHXUdEwbE4gvR87EpFEzMPvLeQicNIN+f4w+v/81xg3uh49c/xsf/Ocr+O1bIowfMRjqtHR0zMjMZpzu1GZfW1stam5u/JOkYadwpDPom5tb2w4CUfnVx5jkG8hjess+4CaxPcuwsu6VMi8nZ3km77tA32V/L9CHE+gZ4/MehW523rVZu7IJR+dRTO83G63PakVNDULXWqfdQfK+L2ZMm47du3cjMfEM7HYrxo0bi3v37oBt09TQKJo5ZQYun7+M1NOpyEyUI/14BrKOZ0N+TA3VSR1fzjyZhaxTCmSflpMpIT+jIFPxMvVoOi4npNF+WXzf9jLzpByKEyqoYtTQyLRk+r+5VJNlxhiRGW+m67Ah47gJacc0UCQaoDqnRnrCJShPpiL76HloTqVCffoy1GfTsWPZFiyYPB/DPIdj6/It6DxNe3N9Awc3A/2LUv/PZT5faGpqEeZBJ9A/vPIIE7xmUkz/FMpddSjYCwQNUCHMx4RQlrXvxwZwOLtA32V/F3n/w6C38tmYpDPVmD5wVgfT19TUiZRyBdzdXHg7/Z49ezpAP3bsp7h//y649CX2WzBrAbat2oZLCam4FJMKQ6IR2bEE6igVlNEEsFgCeZyCr8uOlf9ZqT6mhSpBDeVRZipeKuLZPkoOeF2UHsZI008yndQCtdSJ7KgcKGNz6JgOpEcbkB6jRXaMBhlSck5RCqiiFVDK5NAd1UJ7TIdLkelQnzJAd86IPWv3YLTvSPBvJtS1fZ+gRhg0x/o0PAf+D4K+RdTU0tzRTv/0zjNMGTwPJmk1LAeERF74R0aIvY18pJXUw0mMn9sF+i57KdCzSVPaQR/WAXqLMLya4nr1kjpIpykx1de/A/SsnV6tUsDVpTcH+bYdWxEZJYFCJceYMaPx8GFpBY9xKVT9dPAoZJ3JRFZCBgFWwUHEmFYXaYAl1gZDtBHaaJ3AvFEaMt0LpUpKoJcS4CM1vGTbtW+vlepgjDDCFG7+SWaMsEIf6YAywgYtAV8fkw9VlJPMAX20EwaZAyaZHeYYG1QhpEzCtFCI6TqijFBEm5ARRWogJgPaJDXGD/oMezZ9h+anDR3Nfy0tTZ2Sez8A+tbOoGdfFLldQTFHICyyWj6ZYdFBiumH6HDYXSUMF/URZmbpAn2XvSzoI92ERJ4AetMLoDeuakHCHAOm9J+JlqdVopYmQd6bTQa8/94fMX78Z9i6fQtCxMEc9Ezelz9+tIfHuOQkVs1Zie+JDbNi05EVmQnrURv0EXoBdGEmmCQ/zMImqZkbWzZIjNw6r2dmjjTDGm57KTOGWaAJMUAfboGBWF8TZuNmlBDow+wwhNpgFtuQKyuAXeJATlwBOQobTDEOaOMsyI6m8CQ+DYrT2UhNSIEqRY6OFoBOmf0fAX2TqLG5gWdG2Q4Prz3EOM/p5GlqYCLAXw8B9npl4oinRhg66mFDaJ+umL7L/n6gF7L3L4KeTc3FQD/ZkyXyhERUdfUzUVrKBXR//48ImD0DW3ZuRrgkFBYbG08/BhXlZfPam57nTQrERekFqEmWW46ZOeDNYhNywnPgEDtgDiHwii0dZgmzvmC2CHuHMZCydWw7U6iZmz3c/tONmN4ZaaFj6+GINMJOZgxnDslI66wwBVvoOnNhPmRGbhiVh03IleZCF6Ilp2CAWqKCmX3NKTKVAz94WxA2L96A0L3B/MMg7Rn9v8L0jXw4H1tRfqsME3xnwhRdieSNpXyW069dUyAZZOUzzDCWj/bO6wJ9l70c8F3tbROUmHjmvn3Ck/ZEnnJZNaJnqeA/cA6EmFWoxFaLAV6ergic448161YiNCwEufk5GDlyBJ8jj4O+HiKW8AraeAjpFAcbYwwwMWARs+ZG5MIeYoOTgO8gZnWGOdvA6GwDt50D3ComwNP/bL0tzAF7qJ0bW7ZFsG0dbazt+EEmZ/s+/215wWzhJjgI4PZQLZV6Dn4zSXgbqQ9nJDmXUCM/V444h9R2Ib9WKzkptp8lXAdLlB6qCCU0MSw3oYD6pAqXYi9i9dxVsKhM6Ojl90M99BjoGdiFTgyNotaWBtGT0scVk4YGQB15G86IVtwmiX/ANxuhPhoE91PzdvpI165EXpe9pLk9n6zkuROw88k8g3wMyFpZjth5Ksz0XQRUCBnqpsZ6UXLyebi6u2DUqJHYvXsnpFIp5HI5Ro/5lM+G21DXyBXr5yM+R9T3MmhOaTk4NBE62ClmNgSZkC/JQw7J5xxibidJaEeYhYPTHEFMLmkrgwwois7jDKs/rEc+gd8ZwpwBsTRJbiM5ClOkE5ZIYmKS5GYCv4WcgUVi58YBHmnjoYQ+VAdDuAH2aIrTo0jOi/VwhluRw5xLCAE8wgxnFDkciZkb/z86B7ogcgR0HGeknW9nCzVwZ5ErsUJ/RAdnbC7kYgUyItKhPatG2slL+Gz4GPAQp0Ugcc767SWtY9l9PspHAH69qKW1loN+8jB/2E+V82mIHSSzDvspET5Qy2e2iehnJ3N2dc7pspebhMS9bQJSN2uH3Gdz/PNpvPvrcHp2EWTz5Jg1cAUabjdXtFY18S6rcqUC777/HmbPno1NG4QBN1lZWXyUHRtww8OAyhrR8rkrELI7FKnRaXAk2qEIU8Mmc3AGdoQJQGfGQCWA3UKxu2Dsty3UxEGpJ+DlxxQQ0JzIiXDwONzAJDgBUR9mhpZY2UzLDlkuFAfVPIRgxkBpDjNwMNukdByxluJ3WicV8gk8jAglQEtzyCmYyCFQXB+igy1GcAxaUgHOaAdyyXSHVcgjB1JMjsBJ5zPsV+Fq3FUKM+g6osmJHCOpL0tF1tl07Fy/HaGHQyDk6FpFTXWEazZir80JMNbnsbwA+kY+JdGT+xX4athsZIYWwRpai6SFN3BwgBxiXzWC+sqFiRf7dvXI67J/JOg1uLT0No4v1+GzD2eAf4abmL7m6RORwWTEH995m3/LjnXOYT3ynE4nB30l/c+Znup0wKRZUJ1XIz0uE5o4NQe9NlSPgthCHpvrCdw6qdB8xoz9ZsbAz1i6UEpqgKS+9jDJ6cgcqI8YecbdEF8Ay7FCWGifHAKzjcXhZIUETgvF3EUyJxxiIwdoHjGyLUTPGbo4Jhf5BGxrmJHAakTe0SKoQ0zQkoPQ0Xb2+DwoaH99hIEDn6kCdZAKuVF2zuy2YDr/PiVK6FoKJA7oD+h5MlAVoUV2tJwz/eVTqRg3Yix6vP8B7t++g44OOU3NLwzq4R1zmltb2uT9c9Dr2MSYBHo2C+4+n0wccE1HjJ+NT78c6drVZNdlLwt6YQJSYZZiSxvohSQeA33m6geIWSDH/I/WAezb9dXNfKCKSqPEO++9i8DAQN73nn3WSq1WY+SoT6BUq3hFr69qEC0KWIw96/dCflwJbbwGepnApvojBmJy2w+Cvp3lGejNBHKmCvLjSjjY1RQaZBFrZ8Q6kRxO4JQZCKAKYn01sb6WnIWGnIMBJrEG9kgzjMTUJjGFFOy4xPhM5ssPKKATk0SPzUcWAV8fmwdzQgFU5DwySQmY4on1o8xQkyJQ0nF4i0KEEarDBPaEYjgo9GBmpGvjeYMYJ3QxRt6vIPNkJj7yGgKtXM0V0Pq168A6KfEmPCpZ60d7go8zfTOfSoj+aK7joJ8ydBbUkpvIjWjhibx2pg9xVSHGp5AzfRfou+wfBnqqa6dm5SFi9iVM8ZgP8NljWqny1oqMZgM+6P4+xo8fzyu2RBKOnBwHPhs/Fh8NH4Yhg4bis1Hj8L/e+A2+GPYlB70yWgHH8Vyojmh48xeT1YK8N/HkmDXC1CnRJiTf8mKLObubKabPoHg6KzYHilPFSD1egKwzBcg+ZoDyGIH/jBWKBB2SQ1PhTC5EukQJzVEr1DEmZIZroI6zQ8X6BbD9mGxPyIMqIR+qYwVIIUBn0n8ZMgvUx3KgJVPHUZx/Mh/6eJL7rJ1eauamJSWRTkrAEJcLdaQVOlIX5hgrtLFackSZmPjRBDwtrURjbR1OnjyO7t0/AO+k08bwjfUNHc2eHfKeD+JvqhdV3inH5MGzoI28g/Prr+AGgX63y0WeyIsdZMeBD1SI9S7uAn2XvTzoPZ5PnMo76rgJswi3g37rxxIEDFgGPoNMkzDRxJnEk/DwEr5w891330Emk4J99cZv8EDsP7gPer0el5PToLqshssfXZF5NBt6AqUiTAkDATwvOp/H9HkE/DyKpZ3twO8EeqYEjq0/iy8+mIap3QMw8f1pGE3LY/sFwu+PEzHObTZmDJqPj94fjZEfjsP0QXMwpveX+KT7BHj8+0DM6D8f030WwOWXgzDsD59jTM8ZGN1dsC9c5+O9Vzwxts9MDPjdaEzynINPe07m+/j7zsP+uUeQJVZTeK2B7UQhssJ0yA7XQxdHToFCBE1cHjkTA6zkFLJCsnlPvT0rvsW8KYF4WlbJ+irgcfkD9OzZA1VVT5/PrdeW0GPjEtqm60EH6CtuPwabGNN+9DGswQ38k0Qhg9SQ+Bn5zDm8Y45LF9N32d9nNuEfA71skg6xi7Iwy28pUNk2JLW1QaTWKvB+t/fw8ccfc9CHhgbD5rBi6LAhUGtVMBgIEGYbMi9kYHDfIUiJSuVMbyTmZXE4S8pp96t55j5HLLA8S6y1x/SsAwwzc0w+Jr79Fc4uPomU5YnI2JqJlPWXkLk2DamrkiEJiML5bWm4sD0dobOjEDQtAvFLT+P06gsI84+BZHY8xfLFuLhZjsNTomAPv4qTqy7hu/EhSNqSidMbzuP42lM4Q84lfLYYkjnhiF0QiYUugRj4qicC+/jz0MAmZQlDkvMyUgHhVlzcr4SVpL6CYnnTMVIT0RmIOxCDjcvWofzhIwrf6wjbjRg0ZACysjLQ3DYar7mxpdOAm44xx018Bs6Km+X4wtcfKvEt5IW14uoRINhPg/39MiDtL/SNZt9L6wJ9l7086E2dQG95AfQnZzkRv0SOad7zO5rs2Pfpleps9HHrjTlzZmPlypVISb2ILDnFs8OH4tSZk8jNzYVOQ8yYqcW4oeOhPq2GMk7F+8qznnS6ID2KoguE5jpieTOBXk+xvYakNzOd1MaNxfBuP/NBwT6S3isuIv+AHZkrL6L0UDGUyy4iJ9QJU5gDumACZmQeiuKu4uz683BKWDNfAc5vukgKIgemEJuwXlaIzL0qpH6dBaskh4cZmoP0e1syciIsuLDhNJyhBiStOc7LmDlhmPr2RASSSsiPzoWRJf2OmFBw9AbUFJoYYq28p6HqhBK7VuxAdGgUHpTeQ0XlI9x7cAuzAmciIlKM50zf1kWXJH4H6Fv5HNstoprS6opJvgH8W3bJ667hXiTwrUuqwPTu7IMVhrZPKHeBvsv+caCPn2ZGwjIlpnrNE+R9g6BGz50/A3cfNwQEzMTmzRtx8VIyshVZ+GjkMCQmnYVCoYDNYkd6cgZ8ew+gmF7OQc/62rPMOO8cE2rpAD1jed2fgF5DZjxaiFG/HQ/l2kvQEkNfWHoGBUEOGFalIW3pWYTMP4KIzVHYt/QQDiwPwq7A3QhZGwL9CT2+X7IH+5bvQcLeOHy7aCe+W/Y1NGeVOLBhH3Yu2Yqo3VIcXhqKA4FBCFsigSqEro+YO2nLKQK3Cpe2neV2evVRRPgfgWyuBHmRJO/3aVEcex3qwwZ+P+y+2P19u/YbSIIlePDgPh6W3UfZk4eY4T8VoWHE2O1NdZ2m5uo0I0gTn2O77n4tJvnOhj2mArkhLbDuZPJejzBfPSReJv7dM3FvSxfou+wfKu+PTrcgbnG2APqa5zG9zqDGO93e5n3tt23bAnF4KJRqBQYNG4yklPP8W/UmgxlmjQUjvD+G6owa8hg5HyjDQO+ItAtt7p2YnmXJnzfZCfKejX5ze3MQ8g5akL7qPBzRhZjpugAT/2siFrgv5Gp4+rjFGO49ESN8JmDiSH98Ocofw33G4MvR0zBh9BSMHTEen348FiOGfYJPRo5Bf9+B8Bs0hJbH4WO/r/CpXwDGDZkFr3dHYJTrRKyZsokcRxikG6QwyHQwRRlwauMJSOaFwb+HP4pkRdAfMFCIUsQH/chjFMg8mokdq3YiPCicDThC6cO7uENM3w76jo9//DXQT/aZBau0DAVh4N8ZPzKQYvn+OoS6avkou6MDr3SBvsv+oYm8pPklmO/yNQIHrRSYvpq1v9eLklOS4OLpik8/HYXt27dCIg2DSiMn0PvhYloK7HY7LCYrtNk6DHEbCvlJBe+qqo8VwG1hbd48iSdYe+ec9kQey+qztno23HWS11yc33AOqsNajPSdC7E4E82VQI66AlbdE9htteRkntI5a2C1VuJSagEKi6qhN99FlroYllxSy5lmOK89xAWFEeard3BWoUGi1ozT+nwkWa8hPsuCU3IHzmZZsXrzQXw8chr+z2964vIJNb5fdQTaBBP2zw3CHK/5kC6KhlVMakNMYUqUEap4NbKPZWPXyp2QHpHg6ZMKlDN5/+jOi6BHJ9C/OAV2E+++WHO3Gl96BUB95BauS4GTU4txxFeDg/2yEO5l5KA/2E3bBfou+4c22cVNoW1mpWC23wqgvH0OuQZRZnYGvAZ4Y/yEcdi4eQPSMi5RTJ+OwcMH4fylJOgMejhsTijTVfDrN4hPlsFAb4gzCiPkCOCsnbu9Nx4DeHuHHLaOKQC2jeZkHj543YMn/o5vPYuBQ2dBkf8E1oIaPHgEWJxN0FrquTmLSIy0AEmXr8KYV43EzGKocsqgL67EyWw7TsitOK1zIkFpwRlTDqJUBgSTnb1xH1KzE9EmAn1OEWLJUZ1TW7A3NBYD/cYhPcmAb1ceRqZUiTO7kvDJ/x6N85uSeQsEA73uqB7K4yoC/W4O+upnVaiufdpJ3oe8APrW1j8FPZuFs7FFVH37GSa6zYAtqgLG76pwn9h+v0c2pH5mYWCEC8VafiVdoO+yf2jnnKT5VxG3iGJ6z4VCO32jQEwGkx7vfPA+b5dft2EtLl1OxuWsVALlACQmn4Vaq+Hz4jmMDozs/wkUp5R8GCobC2+MNPJsuDXSwaU8i+EV0RaoZIK0Z2B3toE+VarH26/2QfKGRJ4A7O87BYmqK7hxlwBvqYCzoBUaay03vaMOZ9KuQuOsgi6fmJ7Y/qyyBKeI7RONV5F5tQzRSiuOGvIQq3cgymBHtCMP++UqhJvpWRgMiNLrEKfV47zVgSS1EZkqG/p+6IegbRJkRStxYvtpFBzNx9R3voJFbIImQg9tvAHyBBW2Ld7OR9hVPCzHE2L7xxUM9NNfAD1vpesMev6DvCgamkXVt6rxhftM6MWlyN7yAJlLy/l0WWJvYncfM/+C65Ge+i7Qd9k/tBvuqVkF2DkqBpNc5/KYvuUZa1JuFF1OT8N73bvhk9EjsWXbZogjQ5GtzuKgv5B6HhabGUYjyV85k/eDkX1CznusMdAbJAY+CKa9R1476JmxXnnPQW/CycOX0eMtTwpxLTi38RR8vCfBcrUKDutj2I1lUGofweCsR85VQO2oQra5HMmqO0gzPUCS5gaUhZWISXficmEZglP1SDCVIFqfi1hzIS7dLoPMnotwiwnRTnICdM0SgxZROhVOmIzYJYtGIl1/EGN8j0+xad4uWM7kImZ9PBb5LEbI7FBo6V60MUYo4lXYumgbgr4JQunt+zyZx+L6Hwa9MLiuE+hJ3je1imrvUEzvFQjdkbs4PteJgu+EOfLC++sR1E/FwR7nW9gF+i77hw64+X5oKmIXqjjo6281CRNEEOi1xIguHu74fOJ4bN+5jYNeqVNgyIjBHaBnybzUpFR49fBERkImnxZLH2vgs+bwwTXBJt5Bx8YnrRCa6FgXXCbx2zP6afEmDHr/UyTMjYA9TIeJYxbjdLIJRdZy3LBXEVyA/CstOJHoQA0hKUNzB2rbY6Tq7uBURj7k+eVQX6nCOfMtXC5+jDP220gqfICgDDMHfpTJChmB/pAiC8eL8hBt02FdvJSkvhqxWiWSnU58HRYFhb4QQ/wmIPjreKTH6bB/aRjmDFnCu+uy5CSbvmv30q8RsU+CR3ceEegf8KnA/xz0rT8AepbaZ8MX7zfw3kEW8WNcWHoL6lVVkA61IthDg8O9Ffz77eEu1i7Qd9lLDKu1tg2tfT68NrJtXZi7E0HeJmQsL8Oifvswa+ByIXtfK2Sh2eCafq4umBngz2P65JQLyFZkYNiIIUhMOg25MpvkN7F3hhJ+rm1Mz+S9VANduI4zvSPCwYfWCqwuAJ/H9RGshx7F/pEknU870O31vkjdcBY2sR5evUdSHH8PNaVArroUaZeLYLKXw1FQi+S0YmL9JzAXVENhK4OusAqn5SWQFz5FdAYRZw0QpSCm1hYii8LnaL0TEp0RR3MciLVbESTPhNRqJPY3Ij7HQg6BWF+jxClSLN/LEvDtkRh8PmE+0s9bKH4Pxsc9J3BlwoYLZ8kU+HbFd5AdkXF5X1b2EI8ePcDMmdMhFgugb+0EerR/tbYju0dxU9XVJ/DvvwiJa/OQsbIC8iXPEOKt40k8iZfw+aqwfqauittlLwV61vQb0psqev9c7P9QiZiBDv51JHEfByyLhTkc4uZq4D+Afjxr/0AERIknz8Lb04ePn9/19U6EhhyBXq3CkIEDkHrpIkwWM0xmK1Qkjxno5QnZUBMwrDITn5mGjXVnQBcSeSbeRMdBT/G+WaKHI1wLq0QN2wkr+rzaFyeXnaBYuhCfDv4SWkMhcq2VuHON4nqS+fUtJO1NpbhXBorrn+Jcegl0uTW4QDJfW1QLZQHJ/qKnOKEpRrwqD6nF9xCnsSHe5EQ0xfJJN28iykqOz8TiehOkFhv9JudnNiDaYkS0To0TeiMSVUa4DhiJ7/dFQSZOxCd9J0JHcb1T6oA6Voddy79BeLCETSKCqupKlD26j0D/mQg5EgyG7+bOX/hpbRYm0WhqahISJdUQlRc8wlS3OTi/thh5e4FzU25D4mfB/p5yBPXR8q+WdH2gssteFvRsMhamGGP8CiDxdRLw0yHzdcA4E5D6FPOJMbcMiMYsPwL9k7bsczNEhTlF+O3//h2mTp+GtevXIT5aBptWh2F+fkg6dxZs6K3F4YRCrsVAl0Ekf7OJFQn0UlrfCfR8kA1ro29rl+egj9SSCiDAS5R8H49fuKEk5hoOzQzFaL/PkZt/G3bbE+TnNSMt8wqsOZUwOSugMj+CrbAeSVk3kG2pRBY5Bk1hHeIv50NZXIWzxutItF3DMZ0Tlwpv4qiRgK7TIy4nh8BugcyWgyhLDoHfhkiLA2FGAr3VBJlBg+NmIxKUKoz+ahZ27w1D0mk5hvUai6TN55ETmQNVFIF+xbfYtnkX7pXeRemDO7h75zoWBgYiLDgEzfTcGlsFEz6R3Sx6Pn9WB9NXENMvQNQcLS4segDDmhZ83zcLMYNyET0gt+PLo13WZS87T16kuw3fd1fw6bFkAywUPmpwbvhjiF3zoV3WhDXuEXzgyrNbT/kUUDVVtaICZz66vd+dM30UAV4aHsZB7+ftjUspyRz0emJRpUJgekW8nAPYFmX6m0BvTzBy0J9YdhomCgcmj56JLLkFFnM5bt0EzLZK3LoPpGQW42kjcD79Ci5rS6HNrcVFzX0ocquQqLuNi7ZSnNJdQUr+XRzX5+C0tQDxBhtiLFaetQ/VGhFptiPS5ODLUeQAIq0WxDms2HQ0BgBRQK6/0WolzhiMWLt7P7z9PkV6ihHvvtmbg57lJlgyL2pfLCLEUXhcUYZHZfdRQ2y/ZtkyRIaFc9A3QTAO+qZGAfRc67eBvvpaJQJ8FyJ6nh7m3XRTgWU44qVFqLuB4i3zC1+q7bIu+6nGvnzMmn+l/XMQ5m3jHb/YpKspo2oQ6XUd6sUtODbHhsluc8HmvKuuFIaJnko4CU93D8yZNxcrV6/CudOnkEcgHz5oEE4cTxCa7IjpNWojhnh8BPUxFQwyVQfoGeBN4dY/B73E1CHvbQR8dYQcHq95wBLkRPKuNIwaOB5W+1VcKWmGyfgUecTsBnsZbPnPONOrbRVIVtxGhvExB3xWzlOor9ThuLIEJw1XcdpcgosFN5Ggd0CmNSHe6YRYp0OE0Uqy3gEJsX+Y3syb8iLMJkToNYg163HUoENcthzrvzmIUeNm4MJZJe+9d3ZDIp+6y3LcgZ0k78Uk76trq/iAm3t3b2Dz2rWIjpR2yHtmTNW3NNR3An3bR/mqrpdTHDUfUfM0MBLoL85+gGAfDcQexg7QS1y7QN9lL5m97yeEiNL+ToT72BHiooPUOxeqL4GEwWVInVmNHYPOwN93BWru1p1qn+VVr9Zw0I8Y+TFi4mIhk0Qgx2jC4P79cTk1BXqSxlr6rVLqMchtCJ/zXh+l/HOmb+uBZ2Sz0EQ6eCLPLDG2TVSpJUehgc+bPrAeIac0L4ozfUqqDjaS7jZrDcyOJ0hKzYWZJP6dx8Al5S2oCehZ1gqcU92GPK8KJ1RXcCnnAYG+BOccNxCrsyPt+n1EqOheTSYCuR7R9lzEENAZ6LnMJwvRaRFp1GF1VASX96m5efgmWIrho7/Cjs2HMKjbJ3yaLTahpyJSg69X7UF4qBR379/Bk6ePOdOvW7GCVFDEj4Eez791xT5gef0xpg+YB3FANk7OvQnVqjp875aF2KEFgrynlyV178rcd9nLMr0BMmL4vd2yOegjva0I7UfgmwHEDXgM9SJgz4hLmOG9gmfvqypqeAvTxaRzePuP/42A2bOwas1qnD5+DPkklUcPH47zSYkdMX12lhq+fQciOzYL2kh5R0zPOuZ0TFzJQe+EnoyDPkKYpZbNTsv6vvf7WT8O+sStKRjmOQY2Ai6T9znOBty8BxTeaobWVgYNMb7Cytrpb8FY3MgTeCnWhzitvY4T+qvIul6JBGMhEsx5kGmsOEZAZ012kWYzj+MZ2x/IVHHQR9Bvqc2KWLsFR20mxGrV2CaJxGHZcfgO+QzioAR84jIB57dc4JN2MtBvXbwTWzbuYJ/qxsNH93DzRgmP6UODjnB539wpmcflvZDIaxC+ClrbInpYfBdfevlDtlgP+dZ6xH5egLDBJuzvI6eYS4VoL0cX03fZS1u0F1VuiuWjfHMgG5SP7wn8sQOu4hph/EC3YigXALsGX8CcQeuFvvctAjnJMy7Dx9udf5r6SEgwIkJDYNVoeSIvKzOdJLgNRqsN8mwNBvTz44m8zqB/YbbacFsn0NteAL0+Sos+or6Qf62DMdyBcUO/wuV0IyrKAYO+ElaS8KdTHLhGcb0htxKW4gYonJUk7Z/itOIa1NfqcUxVgvTiCoSnmaAurUFYlg6RajNirQ7EkEXbSeFoDDyZ921KBncA+7OUiMvL5fKeJfJ2HI3DCbq/fRFxGDxiIk4lpOEzr6846FlMr5RS6L07AiFB4TymZ6CvKH+AwBkzOOjbmb4jpm9P5HVO5lXeeIQpfnMhnqtAtH8hzvjfwiFvFcL7m/kniKIo7mLWVXG77KebiYjDiHA3Hf+AymEXPWQE/jBXkrf97iOm/2PolgBLe5KsdqWF6vYvtzSLtMpseHq4YOr0Kdi6fRsk4lAYFUoe07MmOwuxpNnugFZj+ssx/Q+Cvn0KLVIEcVb0FPWCLTifM/0Qt1FQa3N49t5iroItrxoa20MO+BT1dWhI5p/JugJ1QTVOKq8ghyQ/Y/lYVT6xfDExvBNptx4i1kKA1hkpnjfw5jmxzoQTRVcRpNDxhN7mM0kd2fsYkw5nHDYcp5Dm6yORGD9pDkIOxWNEn3FI3nYRhiADNNEGbF+6G0cOiXmnHCbv79+7yUEfESruAH1H9r615c9BX136pGKCzwyEzMvG0fnXcWzaVT7KjoFe3E/HEzCc7bsqb5e9BOiZvI/0NEJGIWOIhxmh5ASO9LbiqFc5KYAHUBHT7xx0Hp+8O4N/7KK+qlHUTIpULc9Ej+7vYfSYUdi+cwdio6Sc6fu7u+PC+XO8nZ4xvV5n4TE9k/caSXYH0/8w6HN5hr4z6J3HnOgu6olrcXdxYv05nsjLVlh5TzybrRq3SwFz/hOcSy/AMwKPLo/iedsjaIqqkF3whEv7C877OGm6hpTih4hSOyDT2RBjzuGgP3/rDo/pmaRvj+kZ6MNYE57Djo3Hj0KiUeC03YrTegP2iKPhN+xzSEJP4uO+4znTs4FDhngLNv2/7L13eNRXlqev2ZnfzvbM7MxuT+rk1G0bMEE5IBDZBgdsbLDBBkTOOeecRFLOpSwhogLKWSpVDqqoLJIDbeOIjcnh3fu9Bbjd3bPdz3r8e2Z39MelVFElqt5zPufcc89ZuJ09Ow/ImP6TKx9x9atPmT1tmoT+/oPvPL1noM1D6O89uC2n3CiJkquXP+ON4HdRrdCSOt1F7pQOEoYbifJpJneoW0r7dD/PQYneL2/v+j9dWcF2EgbpiB6ok9l7JV+UN+wi2smQF3aV+CFtnFrQ7Ynpr30n753CA/br+ywzZoWzd/8+mb03NDTKmL6w4DROt0tCr2TvZXHO78h7pQ/996G3/pvQmzIsBP23wZxacRZLqovXhk/E4bogwobztLXdxd76DV/fQsb0Cvga55eyEu9UQxenNT0cV3fSeOEb4endnLD1iHi+kzSDg1xbG2kmmyzIUbL36S1OuVWXIJRJtlPcJ64nm01yy06J6ZNqq+WW3cGkLJnIiz2aLffplU46remtcuz1/rWH2LF1D1c++0Ru2X34wfk/Db0yz+4+92QW/+tPvrBOGPIeC4dFE/eumbxp3aS+ZJcxvRKDJfbX90Lfu37wShqkJzvUKc/Pq4a4OPCbaunpu5dB/MALjxN57/gs8pThKgmpO3e9mupqGRY2REA/k117dpOVpsKsbmZEaCjlZcL7WcyYbXYZ0yvFOY/26R9B/4fZ+z8u75sSmvH7q0A60s5xevNZRgeNo7HZwldfgt1+DaPlc6zuq5TUdmLruk7HZWEA2kRsf/4mNQ6hVM5dI61WvI9LX5MqFMIZ10Uh7dvIMDnIsbcKD++Q+/SKd1fAz7K3ya27WI1B7tMn6zWodGop7/dl58hE3sixb1NZomfMgNc5te607OqrzzbLLbus9DxZnKPI+6+vfva/h/7RHOt7D2deXf3084i3hk9n7/RCSjZfIXNyKxGBtXLIYHpQiwQ+eaCxF/re9YP36eMH6skZ3kGckPvZYUJFBjpJ93kf0xxIGOpilXc680as9/TIe9jjraaiEn9fP6aFT38c01tFzBsaECBj+kf79HW1agl98zFPdZ2nJ73h9xJ5/zb07hNu+nsNEJ6+CGuag9dHvoVeAGsyXRbrC6z2q3x7Gyobejhx1obz3C0a7YKXYjPa7m843tyB62s4bT1Pts5NrqmVigufkKqzSk+vlN+mmEwyplegz3a0E6PWsb+ylkSjgVynjXyHlXyzkbwmtdyyU+R9RkqBhF4pzlH26ZWKvLzYExyOiOK3n1zmKwH8n/T0yixrD/RiPbjr9cWVT0+9Mfw90jeK+H2Oi7zwbjm1NnWIRUKfGWCX/cx6oe9dP3SfPj3QQUqQXcb08T5a0oKdqN+G9JBLGIWq3xF2nCn+82VxjlI4puwwdbo7eOqJJ5kzb66EvvjMaenpX33xRbllp3j6R9Ar8l5J5Cn79ErhjQL94y27x8U5j/bpvw+9XqXH57/40pbajTu3gxH+YzC3tHJPEOR0Kp7+U1q7btJs+i32zut8dgPONnZLT6/rucbJ5k4aer4Q3r6F2otfkKG1c8LRLeV9il78vVqhdJxO6d0V8JWKPGXrLtFgkfI+3WKUMb1SnJPfrCEqPZ/RL0/mZF4Vr/hNomxHudynr0tqYsuiHRzLOSkTeTdvXZP79P976IWsv/cQ+rv3b3l99vEnX44Pm0LkokqmPhfPmfmXSHrJ5BlV7acnaYBBgt8Lfe/6IStvSDuJg0zEDDJI6FODPRWfZ0ZeIXagk6NBGnaPPM7sYctlC2xXi5tTJ06zf9c+nv31c7w79T02bdlMwckTWAQUypadIu+Vo7eP9umV7L3uhFZ6egV6Rd4r0H+/DPePQ1+4p5DnvfqQs/AYcXOSeHHwWKrr1CKe/0J4+s+wO77ik89Ab7lCS+vXFFS4MbZ/TaPjU2qdn3BC3cYJXQf5+jbS1XZq3/+cNK2NRLWR461dwttbyXI45DadAr7SQUeJ7VOF3FcSeWlmg/T0hS6HzN5vP5LAsDFvkZtRwvA+L8uuvkpM35iqIXZnIrt37Jee/osvr/x5Mf0j6G/eu+F1+cOPGDt4IvGrG1kSfIyc8A6ODGkgyk9N5uAW0rzNcvVC37t+yIGbhP6Kp3eRHGgjc3i7nJOY6GfEMQ8iX7BgXvOAtf5JTA2eJ7P3qQkqpk8N583X3uLpJ5/hjTcnsGHTRnIy0qW8D/T2Ft69GmXApbJlp1TkjQoag/6kTibyzCn6x8U5njJc0+9B/7A45yH05kwzwT8JwZHoloMqZ06aLaG/fPm+BP63HwvPXubm+h0oE3G9sl/vvHiHvLIW9ELen2xup777c44b2sk1tJFtcJFtclP90WdE1jaRabXLRJ4i6ZWqvCS9lf0VNUSL60oZrtJUY8fJY7I4J6OmluT8Il4Q4YqyTz9paLiU90pMb8prkZ4+6kiczN5/9vnHfzqmVyS9Avwdsb69cd3r/XOXGOX3BrPDjhIf3kLezC4JvdIYMzXASEaAlczeRF7v+oHQZwa6PX0Zgh3E+OpRDbYK6MWX3cclZH4bkUFqNgam8a7/bFmckxAVI0dTZ6dl8cxTv2bqzGmyc05Z8Vk09Y3S09dUV6I3e7bsdDoDY0LGYJDQax5CbxTxuU1OunkU0ytZewX834den64Tnr4f5VsqZL/5N0ImoWtw8Pkn4LB/KQ/cWJ1fY7J9SYlytt59leaWK8LbX6WwoY2Oz6FQePqa1svka5zUdH9MVrONbE0L+Ra3MAAW8mwt5Fg8FXoqrZEEtZZjThfpJiPH7EL9NNRw5NQJzorH7opMZOLkOaQnn2Fon5dkc0xXuhtdtoGtAvpdW/fI4hwF+k+vfMSs6e+RpOzTP9yfv/+wc448T8/Dffp7D9vjXrn4CW8Mnk7swjqy5newom8O8SM93XCVuCsjsIUUIct6oe9dP/iUndL9NtBMglhKbzylk47SQUf5bsUEaIh/pZr3Bs2SxTnbN60hJy9Fzq5Tpta+MWk8O3ZvQZWShqahmTEjhlNZWY7O2CLkvYBB20jIAB85vNKoDIWMVePIbhE/GzGkmSTsLUlOAb5H7ivy3tM5RyiAVB2N6Q30++sXsKe6qNhey+zgZbgrPuKi42tajL8V8f1VWtw30VuvYhExvlKhp8h8reVjrO1fUVQjFETrx5yqtmI99zlFTQ6a3B9QrBGSvO0Dzhgt5DQ1UGAR8Gt0nDSayVQ3k6vTc1p4+h0ZKRQKb3+yvo5Kg4HIpAxGv/gmhafr+NVPnqNgV4kchtmcoeXQ2sMkRiXJ5hlXPr/Mx59+yOo1y4mLiUUmQAXbN7696XX/3h3Z9doD/e/0xu5q6WJi6CyWjkgi8T0rZ+ZdJCKwUkKvCrbIogqlOKcX+t71Q5bS8lr5DinNVj3QK+2znGT4ivuEx08JtRIxpIC5gUvgynWv1LiDRMXsQZWeLMdajRo3jO27NpOZnkN1WS0B/r6UiZjeKGJ/U4sArKmK0P6D5Ox2Z067kOgG7FlWtMLra1UGmbW3JLsfDqy0PozpbY+hN5824/0//Dix6hRnV1fx9i/nUbRLTUfdx9g0H2K3fE5Hx23crddo1ryPxXIZg+EiDudv0em7MZnPidvbhHE4R1mlHkNLD406N5UNNhoNrdRqWyioqCe/uIZTlU2UNVkpa26hxuimoFZLnd5OVHImDc0Wqqt1rFmxnQljp1FfbOaZn/Qne10+3afOURFbQcTKCHKSs/n448v89rOPZDfcxUsXsG/PXm58ff1xv3vPGRvlaO2De153lP54ykH7mw+87Bo7U4bPZ0bgYRZ5Z3F8ZjfRYY3EBWlIFvJeKapQCnR6oe9dPyb0SgVo5MhSwr1FTP/1fS9V/CGSUg7LXu79Bw5g/Fuvsj9iH5kpuTgtbXIbr7y8nAaNAUdrh/T0w32CMRwzC9gF9AlGeXxWk6rHmOE5XWdJ9hTkWFLMjxN5So88BfralBre8ZtC3sI8Wo92Ub/JytKAbbzRdzpTRy8gqN9owgJfYcCzgxk99HV8+gbj3z+EkEGDCfUZLC6DGRk8nGHBwwj1D8Wnvy+D+nkTKN5TwIDBDPN+iSF9xzDlxXmMDXqHoQNfZ4hYgX3G8fzPg8UK5Pmf+fH6kMm8PngKr/lNpjHXwu45UUzxm4NV5UIdo8GYZ2bfsn2kHE3iy8+/4MPLl/hYePslyxZy8EAEt67d/A56wfqD+7c90MtR1cqcqzt4dVg65B81Z/BR5vVPY82AfCHvNUT61hPVv1FCH9tP0/vF7V0/KvRxAXoJ/aLQldx8/wtyVDHExO2T89meff45XnltLFu2bKHkTBUNVVrGjXmRoqICnO1dGCw2mhprCRsYTJOIzS1pLgG90i7Lgl4lpH3Wd33xlOO0SgMNk8rT/16J6VtSDFhOWun/X71xRruoW6Wh4/Bl6jZaOLG+FNW6PHTHrMSvT8Z0ysqRZUfR5amJXnEI8wkN+rx60rfEc/pgNpbTzSRtiBSPr6Mhq4rsPSqMx0XIkWkgel4sJ7YXkrnxOKbcVrK2nqExQ8T4+4R0P+Ygd+cpEtekc2rfWQr3VlCws1JWD7719FQ5AFMZbKnPMhCx/CDrF67j26+ucefOLT774hPmzZtDfHw8j4Zc3L1567G3fxjTI0dWK3de7rrM5OFzJPTJ4TYBfR4Hg6pIGWokLcTTIy87xN37xe1dPyr00b4aCf0sv4Xc+uBLkmMOEB27V4AfKWP6iW+/JaDfRmJ0Gm4Rkg4ODKK09CzVjfXoTEZZqBM2MIT6VK2EXhkYqSwFbn2q5SHkZtkE05RmkEMslduUvnmKIVB6z/n9bTBlqyp4P+ojymepuRT/JW3J5ynZXEnJmmqKl1fQGX8ex9FWyleUcyHlHGcXF9K4sYbGDdU4D1qoWF6M65CVurUVnE/spn59DfUbqylZdZqezDZKN5bQkd7B8ZWncKS2CpXhJmVhJo6sVo5vOIlLhCYFm0tojjJSuLGCki11TPzVdFrFc4yJInQ54aI6rYaJI9/kq8tf8NVnn/P++xeZNWsWiYmJj6Hn4ajq70F/+7ZH4l/u+Yg3B0/nXe89bB5RzMp+2ax5OocovwYS/fTE9teSNKi3R17v+nGhTwgyEvtiJROffU/J3nN0/1aSU48QcWgfz/V5nvDwcLZt2U5O2glc5g5GjhjG2bIC9DYNFpdZevrxYa+gzX6YtEtskS2vLSo7xpQWz2Qblekx9MoQS8/AC7O8XZ9vYcxTr1K5tpqeA+fRLrdz4egVTi4opD25i4pldXyU+CmVCxrojDiPYZ2J6gW1fBD5IZoVWq7EX6FpSQOfJX6GVlxv3dGKc4uL1u1tNK1o4CNhIArnH6M73s2ZBfl0JXVQtaGSjpROzJFmVDNTRajhRHtIS/2eBlpinBStLhdG5wKhXqNo3NdM1/FumpOaRQijZ+V7K0iPSuPe9XvcvH6LNatWk6K0y1JGVN/l8Zhq2RjzsaeXY2zx6nZ0yX3AJSPjmPFcHOu9j0tPr0ytVRJ52aFuMgJ7T9n1rh8X+tQhLRwKK2JOwGL49Ib09EoiLzk1gV8/65lPfyjiMKWnqzCqTfTr+xsqa89gamuktPE0xWdP8/KQcXIKjFEpt40zyH1tW9p3Jbceae+BXptulm2l5ax6cb02S03IPw/HdtSOeoWGCwc/onGVjq7kTmzxNkrX1+KI7aFkdQOXMj6hZHk1XQmXqF3bhG2/i8plNbyf9BHF88txH+ykab2OnugPqFmh5lzseTn6un5dGecT2oQC6BTgC09/2Eb6e+l0JLZTtbGc9kQ3FSKccAngy9dW0Zl4noq1DUx/ch7aCD3WpBY58daQa6A+t4GJIyayYck6Pr/8OfPmzCc+NoG7t+94PZpR7xlZ/XCf/lF73Fs37nrZdTamjZlPeMB+lvhmsnbgMY6G1pE8xCD73id6G0kXH1DvF7d3/ZjQx/hpiRpVxkzfBRL6/TvWkZoWKbP3v3ryCWbPnim9WU1JPeoaNQEBLxA+/3X2xq1mR+QKdu7ewKBn+lOXWi9BdgjP7kqxSej18SbPPn2Kpy/eI+iViTfK6Ctlln3TST1P/cVzlKwv4cOkD6hfrqb1SKccc6U8r2BdCXYh1y3RrdIAtES2UrmxUYB/gaq19fTEX6J4Ubm8bNqkoyP6AmXLarmQdJmy5ZUCcDPqbVWo3k2iPd5F+ZpScdkqoC6jU3h9BXZ3nJ22BCeVG8poT+ggZXKGAP8SQ7xGCjVglWW4tgxhwHKsNGWr5QRbZWz1uGFj8R8UwO6de/huVuXDJeB/WIaL152796X2t+tamDQ8nFkhB1jil86yvulEhtUTP1hLSrBZ9shL8+9totG7flzo4wMNHBl+lvnBy+CzmyhbdvGJERL65/v24bXx49i3dzcZSRlYDEaCBvdlf8wKEk9u4XD6Gvr0/xWz3p6BJk+DNdMsvKIOl4jlbULaOzNdUurbJPieRJ4cHiGgV/bwNZk6ak4089zf96dos5DzMa10Cq9eLuLywu0nMKdpKN1ajjXKRdn6atyx7ZSsKKMn+SIli0vpiOqkdlUdnZFd1K0WhiDqHG2HO2lc10zH0W6qVtdQtK5IGg9FfSjwmuPEe4mzkTkvC7tQEi2xZiq2lNKV1sbZtUXYYxx0pp6nZE0N056YgzupjbaMNhnXK0M8dNk6Ocmn8WQDNWeqmfDyBMpLK7h3797DPpj3HoP/EPr7Xnfv35MWwWmw887ImcwM3i+hX/FCpoQ+IVQnB170Qt+7/v+K6Q8OLfTI+yvXiTm0kyOROwX4MfzyiV8xd95M1q5ZQcXZcrSaRka86E2ZJpWur0Xc+3kFYyeEkZWYQXN+o4BeT3t2i4DeJA/dWBLNEnrPwAuTlPmPoFc8vSZTI6Bvos8/DpLDK6s3VQjJ3UnVjgq0qnocZ4xok5pwZNhpzXLK12zNcJEyJ4merE7KNp2lO70T7YFmKjdX0KnqwJ3oomJTufz59PpTcszWoSWHacpQYzvloD5ZjSZdj1m8T6VrjylNh07cdmx9Fs4cG85sJyZhsGyqVny9AtEe1dOa2iqTky3pLRgyjNSr6qjLqaf6RA3zps5Fo9byqPjuzp1bjxvl/AH0LpONyaNnMD14L4v9VawakEXksFoJvZxa6+/pV977xe1dP3ZxjgL9gpDl8M0DEiL3kpB0kKycdBnTz5o9jW1bN5KekorZpMU75Akufq2m/dtCLt6uYezEISTGJNGYWyNB1UXX0J3jlNl5W4qQxUkOzzw7JVufYpZtsJWZdorX12ZoaDjTzFj/14ifF4ctzsLZdWepP1yHbJPz6S3UBdVSgfDVPSqzC9EV1KM93UBdZjlNudXUZ1ZiPqNFmy9uy6hAL4xIypY4qlWl6Is01JXUUlxYqmTXKS+owqVvRVOuVQ4XUZVfwSVLt3hcI+0NNjoanLTWOrmgvUj0hgRe6fMG5XsqMEcLpRBrlX9PS6ZNvG9hKE6I0KRAzazJs1E3NvPobI3C+b8JvcNs451R4Y+hXzMohyNDq0kcoicxwCB7k0voe2fZ9a4fEXqlU9N231xPcc7VezJ7Hxu/X8r7X/zql1Le7z+wm+TEJMorinnl7WA6P6+k/eYJWq8VMOL1QCFvq6jPq8GYqabzmAA6Vo053iggcUroH0l8ObP+4XgraQDSddTmNfDuiOkU7xDyXtUmvGqH3Bfng/u01Ak4b92gvkZAe+8WHS47HfYWLOpmLndfoNVo5Zy9nTOZ+ZTmF3DR1QV34FJbD+0Wpzwv8MU3n/PNvWtc+vgSNred4uJiigqE8WjUcL61g9KTp6gRj7vx2VfEHjhK+clS+Rqblu/g9eCJssJQeV+2uBYZGlhTW2Ro0pyloSKrkqlvTKW2uu4Pof9deX9LqcoTN9qMZiaNmCqg380iv1TWeucSEVIuoU/w16MKcshx1b3Q964fO3uveHoZ0wuHGnt4F4nJh2Rxzj//67/w2uuvEhsbjUqVjlpbT9grA+i6WoXz2yy675UQ9loga1ZvRl+oR5vWiCa61hPTC9jtKW5Zc/84mffwtJ2ytacYASWjrz9tpt/fDiR7cTaOKCc1W9Tyebc6bqAva6Ld4aDgzHHB/HWufn5FeOz7nGvvRF1bL+B8wJ6teyg+WUynsxObwYZVb8aoMWC3WCksPMM9QfAX167I915UfJrd27fRarNRVVRCdVGxeI27KA35nAYjhcdOUHW2ige3oPBEBU/+3fPoE/UyVHDE2YW3b5F/j1H8fdosPVVZNSyYukjIe72E/g63vW7evvGHnv7m3TuyBr/FYGLi8PcID9nDQt8k6en3+BdL6OP9dLLRgTKZpBf63vVjJ/KU2vsZPvOVAzcc2bdFVuRFRh/mH/7HT2XnnPUbN5CVeUyOqg4Y/Tw939bivpNNyzfHeHX6WGEQjtF0UoM6rYGuk26MsVqsiQKOBE8J7qOKPLk3n+K5TZH8iiEw5lsY3/dNOgRYtWvqaYu5wGel3/KV6RsRN9dSd7yKdr2bu1du4mpy0Nbk5mPnb2UiTXm/V7u/5hPXFezVDjp1PUqfP748f5Vzlgv0mLtx6Wxw4z5uTYvSJIROtZMb4n6uo3QKorPexv3L1/mq81O6tB0yrKg60Uzl8WZZkluwpZiWaCuueDeuxFZhzDwxvzmvBe0pA/MmzxfyXiuhv6ucor13+w+h/56nHzWNmaH7WOCTKGP67YNOy5hegT49xCWbH/RC37t+TOiTQszfbdndgLgju0nLiJb79E8/8xsmT3mPdes3Eh2djL3VQf/QJ+i4Vk3b/Tza7hUw7M0wDh1JoSa/kbrEWoxJWhxCvjtS2wXUHR45r/IU4sjKvIen7lwJDpngs+Q5eNrrOZq2NdMR0YN6vYXW+Euc2lKEIdtMyqIUmRDMXpJJd263zObbk12cWV3A2Q1lWOIclG6ponBjGSVbRfwdb6NkRyWNR7SkLEiVpb61EaXoohso31YovLUOa7Se+l3lnFmZhyvZwqnVuTRE1KCJ0ZK0MANjehtF+5sZ94spFG8sl16+O6VLFvTYE1zyCLBymKg+q4Fpr0+nrqbxMfSPO17fw1N7z+/E9Ir8mDRmBrOGRLDAO5UVAvqNA07JNtgx/jrZnzxhoLH3i9u7fiD01ofQ/+7R2pbvau/9jRwdUcaUfjPgi9tEHtghgD9KXEI0z/z6WaZOnc7BiKOUnK2ksPQMw8YPYn/OAlrv5eK+dZqglwOprtLTeEKLIUOPM8uOIUYnQLVhT2uVJbcmlelhVZ7p4dFah4TeKR5zamsBU56bTldMN40rNbTuP0fNGjXtaV0UbyqRBTRlq8q4mHKRylXV2A86KV9RxcWkD+mI6qFqZR1tR7vojD5Hpfi5K/YCVavq6Um6RFtUB9WrSsX9LRTMO05HpBvNhka6jrZxPqaLmhVlnItpp2FdDe4jDlkVaI/uEKrjQ/IWVzDjuRWUb6jBHml76OldOEToIdVLhp3GrGbh6eeibhKqA+U47R2vu3fvPz5JK/4Rbv/BXQn+nTt3vNrcrbwxYjqzh0YxzzuThX2zWO9TQERoM9GDjbIUNz3g36eRwp+1egH5fxt68V2S0IulnOLM8DV75L24PXpUtay95+p9VHExqNLiPbX3Tz3F+HGvkxyTTEaqCrWmnNBxz1LblozjRjZtN4oYPM6f8qJ6atLrJNxKrO5UtWBLNQoZrPG0z0o1fbdkbG/1JPdE3G+Jb2HofxlO6bJS6lbWcu6ogH5pFT0C2Lp11biiHdRuVsBzULGuks6ETlpjWqlaXUVnbDflyyqEweihcYMaV0QbNSvr6Y4+z6XEDylZWMrFmHNcFI+rWlpBZ5R47uFWjDv02Pe3ULemRv6ec9GdVC4vpyO6nbpNTdiVGv+Nwos/MZfSlZVcSr+EJcoiK/PsmW6s6W708cp8OwMTx02gsbGcB3e+FIzf8Yyiv8nD8/Q3lfO2d2Ubndu3b3q5XA7eeimcWUOPsMA3i0UDslnne4a9Q5qIHGIQH5KI6wOUJhrmXuh71/859H5m+R1SPLwyqjopUJl2oxfQG6VBSAq2c2RYhSeR98Ud8tMziDi4h/TMNJ555hnmz1jA9g3bUSXGoTdUCnn/j5y7UU33/dN03Cjhlcmj2b5+D7p8I44cp4DY4knSpTZjy9LJsdTyNN3vQe9pj61Ab2Pa0+G0xXdSu66Wrugumtc30SO8d8PqOi6mnyd+chydqV20J3dQuKxAev/iZcUC+k7q1zXIIp22w+30CMAbVjVyPlp4+yXVXIq5RNOKOmoXV0qD8mHKR9SsrpVqwbBTj+uwk7IlJeJ3dvBR8iWqBeC2CBvVG+twxXUx1GskHfEd0vAYI404M1tpStSjTrTQlvMRGmHcZrwdjkZXIxj/Skh6Af2tR9ArB27kKRxP++tr1696tThMTH59Bu8FbWe+XxKLBqWyetAxdg2uJlJI/CR/g/ywes/T964fE/qoQSYBfZUszrl7+RsSj0ayddsGMrMz+Kd/+hfmzVjE8gUrKC0oQK0tZeSEfuzNmEXHnRO0Xz9L6Fh/UuOzaMrR0hyvebxF58q2YXzo6ZVqPMvD7L2S1JOSX27dOdDGWXj719NJmJ4h5H4nZQJ8R2SbLLMtWVGBKcLM+bRzFC0XkCd1kR2eTXtcO9VrqukSYF4UMr5ieeVj6OtX1Qnpfg712mbc+1tpFFK/80gHF+IvUre2QQJfs8FzWbe+gXMJPbQedZM1OYOe+G7Op16U1X+GQy2E/3omZ1efpjPNRXfuOQwiHDGkOdEIY2US77VZ5WDetGVCATUJT/+1F8KZS+hvPdyyu3vjnteDW542OveE9rfatbw6egLv+K9hXkA0i32SWDkwg+1BZQJ6Tynuv4u871290Et5/8ehTx3cyv6QEiY9N1Um8g7v3sP2HZs4EnmYX/3qSWa+N5fdW/fLxpjN2gr8Rz7BxVsNuK7n0n6zhPFTx5CRnEd9ViOOY24Rzyue3oUuQYct2/o9Dy8TeanfAa8sXYKdEX//sggHOjm5uhRHQhdVW5qwHHHTlXqJ7Jk5sh5eOW9fu1EogcQueVjGKbx0zdoaHBFOGtY3cjFBwL+0UgKveHXHHifWnRYuxJ6nanm1iOs7RAghQoHE8ziFUanfrMYtPHz9hnr5Wo1Czncl9gjjUkJrUjdlW+tZ4LMYtxKKxOsxJ1jQxAtvf6odTaoWdYxazrebMWUhFTW1cE8Ar1Tj3fEcqFPO2Mhs3t3rN73u3rshoP/Wy+po5u3X32FyyCoWhkSyLCCBFT4qtgQWcXhwo/xwlD55/y5DDH/Q6gXn/42Y/vehN8vMfkqIm6iRtZ4y3Guwc8NG0jOSiY2P4YknnmLC+HfYtWWfJ6bXVfB80P/kw3vNEvrO2yX4DHsOXaOJ8tRqGuOb5R67krlXzqlrErSPPfzvQq8k85QsvrJcWT28+NPxGKJsVG1rpGpTI+Ui1laArFpXJy7bZILNetBGxpQMziedp0d4Z6X2vj2yA/VGNefjz1O+pEKCXyXA74nqRrdJi32PDffBVk8IENNF0zYtZ4V6qBVxu0u8vuLxFQOg3G7ea6ZyfY2suy/dWIM+ysHkZ6ZSsPY4HZk22RgkZWkSjWkluItq0aedoKWgijdemcBxoYIeJfLkCbuHnXE9Z21vKXt4Sm3ut15Gcz0TXnqDd4esYFHoYZYExLJsUAprfY+x3fcsRwbWkuxr7IW+d/2o0EcONLI3qJglQ1fz7YXP2L1ps4A+hXgRw//857/kzdcns3rFeooKz6AxVNF/yL9wIHch7tv5MpH3ypRhrFu5Ac1JESMfb8OYYMOa3I4+qQVzxnfz6H8XeCWely20kj3bdyP/egwdqh6ZqHMccmDd20LThibaj7bLphmK5G7a3ES3kN/W/VYp65XY/HL6b2VirkJ4cAVujQC9/VAb6nVNXBJyvlFcfpzxMa4jrWRPzcUV1S5hz5lzEnOEXYQKx2RjjvczLlO9vlbmFUrWVaE7aqNsZ5MMO5Se99rIJmxpLcQu2MObPn2Y4PtTJvv/A+MG/g+GDfUhKT1FQH/zMfRK89u7EvrbAvhvroq4/luvW99eiThbeFwOCZg2ZCXzgw+w0CeGxQOSWD4oizX9T7DvhXJZmffDwTPLltq9kPdC74He+F32XkCfFORk+dOpTOk3kwcf3yQtLlHE9BvZuXsHffr1ZfasBezYvoe09GR01hp+E/gPdFyroPXOMVpvnCHsNW8SouNRH2+S02qsKS6xWrFmChmcYnncHuvR8iTwPJl7R6JDboMFePlTurRYbqF9ENuFaYOaD4W3blxRJWPuwiXFtInby1cLNbFJLWR6OZeS38e82yKl/XkR/ytGoie2R8T0tQL8VhnbK3F+qVAE7qNtaLfrpVev29yMM6qDoiVlXEj9kHYlc7+qWhgbl5T8psM2LuReJmfpKYb/ZCzGaDvOVDdt2XaSl60ncuUw3jes5nr7Ji7bdhIW+q/EJB3kwYNvhZq/LsN3pUDH4+k//pAKYREWTh7P6ME+jAwOou+/vsCMoWsF9BEs8BXQe6tY7p/NGu989vhUyBFXyQHmH+7le6Hvhf7fgD7Gx8KhoRUsCFkBn94hPT6JAxF7iImLlj3yxo17hb1795KUHEtFw0lGTRpAofkozps5dN8p4uUpwZQVF1GfV40524QpyYpV5UafaseQbn8MvSdjb33YFfc76JVTcTOfnCbg7qBhTQWdIr6uW1rK+wLMppXVMkPfnXKezPAcWmM6pbfOn3mC1sh2KdvdwtNfSLxIlTAQHULuK5n/c9HdYvVQK9SAsk2n3tQsH6/I+dboLtqFcShYUCxAd1O3pk7uGCh1AvUbGnFEuSlYXSIk/QXe+Plkqrc3YYpS+vc3k7xkITGrnucj80S+sL/MR7YZvDj6pySkHBKe/oaA/sZDJX9HFul4vdbnSY4smkPEyvlErFvBtuXrGPSvAUwPXstsv/0s8hNePiib2S8ksNo/n/X9ThMTopTkGlCJDywt0HPiTjly++i68vOfgj7FzyTHZGWEWOWc8iQfg5yKq9ynjDBWXitZfAGU9ej1EwYZZAlwloj3lPtl6y4fE5khTrn+9O/tXf+RoFe6Kif6e7bnlATxI+jT/WwkBjo4HFbJwsEr4Yv7JEXGSHmvSk/lb/7ub3nllVfYt28PCYmRlNUdZ9jrfahwJcl9eve1E7w2NZTlixfQdLwGY5YGfbxOdpA1ptnRqYSnF95eiYeVqjpnmkOeVFOSYspRVWV7z53iZojXEKq2VGKLtFCzsUpukb2fdp7kt5NpOWKjdlsDJWvL6Uzq4ezKMuH1O2RPvbaoNumllSIcJYOvxPj1a+tlWKBcKsBXK4ZDGIqaVTWeHMAmDS6hBGpW1spsf+WicprXNkmF0Cngr1hTRXfGBVLCM3jv17MoWitCh2QX7lQN8XPfI3LxP3HV8TJXW/y52jGFMWF/jUoVxYPb14S0F8DfFzL/wW3Pll36mgVEzZ/JbvHEAyuWsGPJBgKfCGPu0M2sGBHD9H5HmTMomeWDs5nXP4W9Q2uICtGID8kqAVfgk8MLHgKvXP458D2CPi3I4/FVARYygm2eybhixQ3QSZCV11O69WQNdknYlRLgRxWByv1K+67ofs3SICi/V7n+yFD0rv+4S5l+nCrAT/QXgAfZZK8GZTs4TXzWKh8rsb42mcib6btQZu/3b9vJnr07iIyO4h//+Z+YM2cWGzauprK6kPL6E/za7+/pvlaD6/oxOm8V8eJEPzJTk9CfrsOQoUytNaOJ08mKNV2qEV2cnq68TgG5DVO8EYfKKbvq2DJcckqt0mJroFcAR6bHUbSzgri5KpIXZdEUY6RiTx3tGT3C01qp3lbLmZXFlK4ToUViByWrSulIFCHAVrX04s1btbQJ2LuFF898JxPXQRfNwsNfij9H45pauo52SCVQuayKD5I/FIpATXtEK1eSRTy/sFz87Ea3VUNHTAe58/K5kPc+Pl6BVG6pFtDbaFOpSZr9Hqkrf8UN52tcb/HhC9sbjA3976SnJggHf91TnKNALwvxhLyPWzCNjDXLiF69kO3zZ7NzyWae/m8vMNV/hbCyB1gRlsE8vxSWDE5jpQB/ed88joQ0C+vs8b6Kp/1dyJWf/xzoFcgVz67Ar6xHPyuvpxgPBXDFqytLOdWngJ7kLQxNgFMe7VXGHGcEO6RBUEB/5PEV+JXbe8H6j197/8egTxeft3Jf+tAu4saoCfeeD18+IDkqlh07twhPn8ZTzzzJq6+NZfOWNcQnHKXZVM2oN/1wfVpF2/UznLtdyZBxA8hITqYuu4SmJOFtj7mEdzfhzHejTtRgStB7ztInGDwz7ZLMaBMNQvq30JRqojnbxqyRK3nNN5yw30zgtcA5jB44lbA+b/Nu2DKm+yzg4DtRsq5e2RWwJbqp3FZDa3I7J5cV0BLlkgm4gsVnpcevEx7+XPx5mdRrO9LGxTgh81dUCvgvoNmglom+yiUVfJTwEeqVjXQf7MS4QUvPIWEwIj37/0o9QJuqk0CvECzRetpVJtxJ9RyZNJGUxc9z3TyZ+7YxfG0JZ1zwz2VXIZTW1wr0yoEbeSmgT1+9lP3h4bzu14dtC+fg9/QAvH8WyNSgRUzz3chc/0hm+8QxJyCW2KlqVg08QfJLdk/ppI/pe9A/Al5pk/3nxPWKZ1dk/aOfE731EmLl/iRvs6zIywhyegYd+rRI6FP97HIp4D/y6IqRyB3aJtVBVF/149foXf+xoU/xsUjoH8n7FBHmKXMSMwNcHB1g4mBoJbP8FnHz0lUO797Htm1bSE1T8cxvnua18WPZt3872TlpFJUeY+g4H7q+1ND2TTFd31Tx6qThpMUlo8mvEzG9Bm1cEwYBuiZZyPxsK6ZkA22ZnqYaLSK+t2c7MGW2YMxxos6y0HTMQXmGkdqTTiqO26g45aKywMXZkw6qT7iIXprGvKDFTB8wB2/heWNnJBEfniwr+ep2N+JKbCd9Rg6XMj8U0rxGluZWCynvPOCScX7NcmEs9plpWltHt4jblfZaSrzfsKJBAt+wrI7OA600Lq+VqkCBXgklCtYUE/IXobjFe25VaXEmVHPw9Qkkz+/PteZp0PI610zzGBf0NBmJuQL6O56KW+nt73mgj5i7kJkjXuT25XNccBgoyDmB9xP+vOE7mRkhq5gTdIDlI1IJ9znE6iFZ0tPv860X1tnyGLjfl/V/jqd95NFlo01hJBQvrUCszCyXnlx86HnC2ivAR/c1COBtwgC0iftccikKQPk9isdXnqdcKuArtymv1QvW/52eXk5F9hWGfXC79PRzA5Y/lPe7SU9XSXn/m+d+zdRpk4WnX8eZ08dp63QSNi6Y5DMHMV8u5MINPSNfHsreTQdoyqnDnmvAKTy4sr3lEB6/MbEJmwBcOYSjjm5En6TDlusQikBDTYKa5hwLdVkmmo7bqco1Uy9gL89voTjfJKC3UXPKSUOmBV1GC+okE5ZMF4emRvFev5kE/1UY832WUrSuhPbUbhnrK3v5Sja+aXOzrMdXEnxKfb1uezPOQw4aNzTJ25WsvlKx90HcR5w73I19u4W2A24R91fJuoD6XWoy5ucy8clJmBOFUklqFDF9LbHvTSV7WQDXNTN5YHmdL7WzGRf4LBkJ+cjCuwePoH/gOXAT9Iu+HFi2kZ4WLV1uHQGDBrFg6gKWTlrKmKdfY+HwfcwNPsSsgAMs8o9jg28BCSPsxAd4oFWAfQT8o/XnxNSPFIECvwLqI3CzB7cS119P/rAeIp4WxmVQCydGXJSXCQOtZId0i/vNZAa7pGdXnpczpFW+xiPl0evp/+OvDH+7HGCpQJ8Q2CK7MsV5a0gWn33SADMH++qY/Y/RhA/yxPS7Nm4jPj6WpJRk6emnh78rYvo1ZGdmUV5eyovjR1FjLqbnGy3nvjYz8qVR1BVpqEqqwCg8oiaqSe7LNwiPb893yEM4TbFNVERUED07mve8pzErZC7zhy+h/3/1ZdDfBjJ+0GRG93mDlwZM5MUBkxjnN4Xp41awa2EUdekGjHkOGlJ0GIVKMGc5ZJJQE2ti9fCNTP3NTKLejqUj5Ry5s/Pl1p7i7cuWVsgY33VEyP9ot6zeU+L1uvWNQv5f8LTM3t9O7dJaWve1ykq++vV1GPabpZefPWAhCXNVMgnZkqzFnVZLyuzpZCwdyA2d4unHcc08S3r69KRcEcY/Ks6593BqrYB+YtgknvmHp5j42igSk/bx8iuj4K6QAZ/d8Jo+bDoLRm7l7X5rmRmwh7VhKlb2zedIgJ4EP/NjL6+Ap4CvxNYKyAq8fzqmb3n8XAXY2Bd0Mkl3Zsz70stnD+7kyLMaTo38EO3U++SHXSRhgPD2gZ0kezuxzHkgPbt13gN04TdxL0Um9PLC2nuz+P9XJPJsvwe9iXgfPSkDDCQPtLBLGPyjw2oJ+Kth7Fy0hUmvTiAgwI+Q0MH87Bc/5403xpOuSuPMqSJsLS5e8BlAwChfhrzZn4Cx/Rj32husW7BTNp5syTDTmdOOPkaH+1grh2YdZZr/DIL/PpSZwXNIW5PJ0dlRxC6Il8Mj9ClazwCMh5eOXBtFu4rI35RHwuIkZgTNJHzIPCYGTOctv6nsmHoAjfgdVvHaTfHCGCTZcKd3sMR/JYsHrpTHYK0HhYHYrJHHb5XaeqWwp2JNhfTgVetqsB8WUn6Llsrl9Zh22DgffYnmdRpZpqtk7nsy3pdn84P+ajjNcWahWrqwyu6+5aQueIekhT/jhuk1cA7mhmsyYwf/i5zoe/fODQm90jdDWQ/Ez17jAyczcfgU/vHv/4Z5CyfjF/gCd+5e9+L6Ta93R73DJO95rHrpKAuGRDDP+ygbvAuIDhHxvL9JTq+V4AZYyRrayumxF8kf1U2Sn1WejX50RlpZj07MKY9VVqLvwwSdj4B+sJvYgQYyhrTTMPUG2cO6SA1qpXUlaGZAop+LjNAe0oI6hYE4h3kupIhYP14YjBRhZCzzka+XE9omE35KX/5Ho5Dl8rU/zAU45Ur2c3uWv/Ph7S0PDxF9t753GvD3C4oCjH94/791IrD39OAfN/p+38X0yco2b7Dn/zdNnqd3cGSAhaMj6xn/9LucN3ZhUOuob2wgOzeHn//yF8yYMYMNGzZwtrgcq8XB0BEjKa4p4lRVJqcrcwkLHU1ziRVdrl7CO9dnFitCl/OC1wvEL0okZqEAPEUju8g2JTRhyjBhTjdiFJ67RXhxk4j93SK2NydqsafqxTJKz+oQCsGSpqc5XbyukPx7Zx1k+ctrmRowi1nB89ApNfGZbeL5DvRxNinHpz0zi5X+62WBjXqnluIVpbLKTzmWe3LhGWxHnVxM+5DipeXyLL7SMjtnyjF5FLcn4bx8fOHqElYN2cChd2NwZHdiSmoVyyg8/lkyV4YTv+xprtneFWsUH1vf5aXQn8rs/d271+Qe/QNuy6VU3XrNGLKEKSEzeDF0BNu2rSF4yECu3/rC68H9W14TRr3J7DAR1wdu80DvF8WiPjlEhupl4i1Z2ScX8KcMthEnPrAkcZtKxNNKF5T4QDvaBciDE8oHa5mD7LqjnnObBBHDJQngYvqL/6DFUDbxKjHC8ldN/RbrKjgsJHrj/AckhnWQOvwc6nniucMuYV6EeO1zGIXiixHQa8Rzo8TvSgoR/wHiMYk+TtqWiN85yIlqoI0sAXa6byuxzwuQfTrJCrokjEI3CYPOC8PzgXh8N7H9HaQr8AsvkxNkROWtJnlQswd8CajdY7gCzLJMNDVQ41n+393//cvvL2Xm+h9b/9nBT1Zid/HZpQQ45PdFFdzC4r9MJVNcj1eA97Yx7Z9imBW6husf3eDjy59y5YsvKS2rwNcvgPCZM1izbi3JqSk0NasZMWqkMAo1fPDheb767FMRos5jy8KtRK+OpP9fPk/igjgMiTocIq5XsvWK99cnqTGlComcZxPesx6rgN0srivHb5VLbXwd9kwBebIapzAKpsRGz6WqGWOOSfajU9pW69KEo1mRwaFphxnk5ceyYavlpFxNvFkA2oE+wUr8rFRWDF5DsrhsT+ugaM1ZzqnO44xu9fTMF3DXrK7DEeFCu1mHK8ItS3qVY711W+qJnxLP6pDV8uy8UlPgUM4IJAgVk15KzKIZHFwcwIfmzfzWuZYLtp28NPRnZCQeBmWfXsTzd29+PgaueT24+/kYr2n+y5gv3uTYoHFUlhbzxpsv8e2tT71u3rrq9eaLE5kRsoIlIQeYE3SQpaEqcmZ3c3BwEzHeTSLWbpMfllJRpYAc5Wei/J2rxAUIqAXgSiMExQgcfUEjvXi0+KBjhVXXC3ir3r1OWliXeJ6Lff3Fm18nAB4qYvYJPcSOsVI4+wrRYyzs8K8h/iUHB0N0nJp8mfiRTs5M/YRT4Zc5u/ALapfdpGja5yQMddE48454P20YZjwQILcR08eEWxie/CEfkhd6GUM44sv2kXjfN8WX7VPx2CvCAHQIY9COapCONB+1MBLNQsEYHkOvqAHPapHFI38I/f9+PVI6vdB/f2UKo62oMpVQdCql/sJbL26zyT36nNAu4oLbOTCygbHPvMeVc19w/ds7/PbTzzh9ppjfPPs8gUEhDPLzxcfPm8DgAPr374dep+Herdt8/ckXzH93Dm+Fvc7BZXtpzmxEp1ILAFuwq4T3j9dQF1tFe6FwHKoG1Cl1NCuTcHJ0cinFPKZsrVyGzGZ5W1NyLQ2J1egzlFNsajRZatTiPk26VvapV8ep6TjeISC0c2R6DAP/IoDo+ckYMxw0JhhoPdZFZHgs016YTvrCDNJmp+OIdQrP3yyLe+QAzORLaLfqse23y/19pab/7PKzZM/JYWXASgyROtlf3xCrxxBtkCW4BiHvoxYuYbz/TzmwZhiblvmyacVQRgT9kuPp8UqDTa/73wrl/kCR+YoB+NrLa+nwnUzzWcGLA9+gvLCCwUHeFBXnUF5ykmmvTmdu8GZm949gjm8s83yS2TemhjX98okdqmbLk6dEHKYVMtskLLOFpGGdHFJk+8Pts7xQB8aZ14jz1ZIxsoMzb35K9bu3SQ87R8QgLYeE59SuvEe8gPvgsEaOz+phab90lg5SkTJDT95iET7M1pM130zmfAPZ8wzkLTSTs0gAN0cAOk88Zr6TvLnt5Ezr5OCQZizrhQoQUlEnJH+G+D2muUqs76JFKIE0/8tifYJRwK+bCa3LRJjgJ4xMX7MwEhYyBNRZQWbxZWz27DAoKsLfLVarVCYyTPle+fAPaBryn1ze5wgF+Aj65EAHUX0bOTG8g5jnm+VOTXJYN1sCzzLhhTl82PZbtGojBotQhnY3FqsNl7sNtaaZFruIn9uE0jMZcfnAlgAAWkxJREFUsNusaJuE99YYeHX4y2ycv5bm043UZwpgU2rRpKixC0D16To0+VrZKroyu4r64w0Yzhqpyatl34r97F2+T67tC3fIy63ztxG9OYZDaw9Te6yOphPNNOWrqcusx5hvoCq+CtuxFpkPMAAqQNW/ZVg8xT8qC8nLsxj35ARSVmSjE1Lcomqh+0QP0/pMJ3NhNiUby2nco5b7+orEtxyyUb2+nnMpl+T+vlJ6mxaeyfwBC3CpWqWXlwk8lYO2zB4M8VY0CXXkbo8iYvkMXhv8M4b7/4SXhv2C55/8n7wzfgKrFq1l4cwlbF67nrrKMoTe9/Ka6buJtS8epd8/BJGbnMXggGcYMfwZhoY8xaBfPsP8wA0s94tnWUgWC/2ymfV0PDtCiln1XC77/KqIC9KRGCRiYuG1Y4NbKZr0FYnBdgGQ+HAHqFEFaMke7pDJv8iQFiHL3dTPvUfcaCNHRzewK7SY3cOLSZmmZUVIIquGJ/LW8+vo/xcvM/75Rbztu4L3gtYwe+gG3vZeyLv+S3lz0HwG/GQ0o5+awezQXSQsrCVlvo70uS1kzWijfNkXxI2yUDv/tggVLFiXCskf/AEWJRfg/THHhlwX3v46kX3aSQs8R/6w88T2U5MijFNc/wayQm2eNk4C+oQANwkS+t/JAfz+gaE/ddl7luAPVqIAXsnpKNAr+ZnsUOH5B2g5NbyH9MBWDg6yEPWyjvF9ZmKoNmM22GhxCi+nt2Ax2yX4RrMJq60Fk8WM1Soke4sFo95Ad1sX77w2ie0rt1GZU4qhUEtzbjP6XHGZpqYxq4mqk3XUlanZtm4vk157l1dEKDtuxHjC35nHghlL2bJmN3u2RLB++TZ2btzH7PcWMf7Ftxg7/HWG+Y9m+fSV0iCYiy3CgDSjzmiUr61MrtFnituUHvQqEUJk2nizz2Ry1+XjyBLSPUpDm5D+a4at58g70Xx4+hOOLTvFuaxLlG+sxRbtxh7Typawnfh7BQtJv072vzPGmXBkOLGmec79K4k8TZwwYCoRbhxTs3P+Al4N7cuKea+wZN4bzJ8VzvyZi5k2ZT6L5q1h2NCR5GTlytHVXlMHrid80EbeDJqMub5SwP4TTMYILPojvD60L7O85zK/337m+6pYEniM1f7HCP95JBt9CpjzsxSqFlxl429KOOJnlLI+WrHeIoZXEjJtArasUCt7nyunbOoVkke7qJz7LRFDm4h4qZi5Aw6I1zzMbN/dLBq2jzf6LkC1rRRb2fvoitqw1vZgrmsXH7oDa6NbvD8he8qFOqg0UXVKQ+UJA6XZBuaN38ZLfecyLWQncQvqiHyvjqJVlzj8opqSuV8KVeLGuRqhSj4QEvIblJ0N/QywiTAjbqBd7hxkCYOUGWIkc7CJOCHzleKj+MAWsZwiTHFL+JXkn5IIVD1K/ClzAPyNf8blH67/7OAr8j47xGNIY709hnD5/5cuPf3mn55FNeI8E//7QenprQ12KsqqqWlopK62ie6uC9TU1KFWCxluEt+FqiqampowGoUaMBior23g7QnvUH66jMqTFVTmVVJ/rJaKtEpqM+o4sCpCdt55rt8A1qzfQllVLacKSqhXa7HaW6mqa0QjjEttozAUJht1TRosNjcFZ8vQGVvEexAqMyGH3Wv38GrIq0waNpG9C/agzlFjPmGiLrWRxjQt2mxhhHLtWHNcTPeeyfT+4bRntdJ8uFl2rl0QtIzp4u87taGE+GkpqISMXxW0nlCv4YKNJbQkuOTMennUN91JU6x4H1k2NEI1KMDbc3qEurDKybxZEcJZjh4hDNVyoo/sYtPajaxfu4P16/Zw9GgKL419FVValgf6cJ8tLB26nzEvjKW2MIMXR/4X3K4duOy7Ge39dywMmc2W4UlsHVvEXJ9MMue62Bx6hoOjm4THr+HQSD3Ro4QkHmwmUYCfG9IqK6oShaVWsuvJCkwC9uhQNXsCStk/sorUmXqmD9zA7CFrmeK/CE22G/UxG46qbrRlNorzqqgpa+JsYTlFRWc5deoUp0+fpqKijJKyIrR6HVqN+M+t0VF+tpmaEhNNJW7OpDbzVuhyJgWsYV7oQZJnN3N25UecnHmZw+JLZhFyPjnoK9KCvibJ9zwdq5CeWyndzRvqFAagnozBBuL8GkkI0hMfJAxZkFXC72nRbJc7Ad+HXv9nwv/9x/6nhz7AIb19gojhU4VhzRnikp4+J9gtFICDo+JziRjVwMu/mUZzmQ6TwSpgrBVxu5mTJwpoaGiipKQMjUZDY2OjhL20tFRe1+l0DA0NY8PqjWhrNOL7VEz9mTridsbxauArvCpi/dSUDM5WllNZX0+jToNaPP9UcSFlNTXy9oq6OgpKz3KyqEheP1FYKK8XlZeL91FPuTBCdZUN6Gv01JypJfzlaUwePpn10zbI0VKaYwaasgyUxdTSmKyj/XQX0eExLA1aTEd2m6ztb8lo5fB7MQT85RDC+8+VRT1p83MwxAigU9qwp7VJCd8UrZXhgTPXhTVbQJ9ikDUBxnQXDYlm6tLE/89ZAy+HjmTHhrUc2CvCkt0H2LXrMBu37Gb1us2Mf3MChyKjuH5dQD87eAfv9l/Dm8Fv4dCdZVSYFy7nBrpadzMh7B+Z7TeFBf13sSQknbeeiWR16DEW9E1l0bPHiHvVzdwnczg8XMPBgRXkhbVgeOcqSX0MwgC4BTRtFInrRwbrOBJWw7IX4lgxLFp8kDN5K2ga5hKziKfq0J7VCs9dSenJEpKik5g/dx7DRoThF+xLYGgAL/i+wNN9nuZnT/1Mrl/9+klCwkYwa/5iomJTqG3QceZMGeoGE2dyK6g5pePQKhVjnp7OiuFx5C/p4PiMjzkY3CE8yDUB9KcYZiNLfWXNvpKE7FOHKlAnvoRC3g8XRixYTXywRiytHKb46Cix3FKSx0J/Z/vud+S8xxj8kcvHqxd6ZWUJ0JMGmUjys8lciXLuQunIpFTqKYVYKUO6WNX/uEzk1Rc1yf34otISykqr5DZddWWNnMpacPoMhWcKhAEooVwAWVZRSqEAdMKECWSmZ1F8+iwpsam88/q7THx5EvmpJ9BUaykpLhXfmVPSoaSkJKFSqZg/fy4DBw5kwIAXeO655/i7v/sb2YTzX//1n/H19WXUqBHMmTOHrdu3kZ6ZQVZ2LifzTlFRVEldYS2lOSXMfm0Wbw+bQmVGLZZiJxrhhZXtPdsxp6z9P/j2fhJnJZC2NANtgkl28lH29RXPr4+zygGVytl/U6KAOqEFa6odp3CKztxWao7UCtDNcmlTtKiTtbIwyHJahEOrDjLcO5SkqKNs3LCGdes2sGnzVrbt2snGbRuYuziczLx0bt664+W1cMR+lo06yM+8nsLUWM7IIX9Nq/MQTusRxg9+mvnB81gacJRZvgmsGXOG8BeiWB6QQ8SLenYNVnNs2vtED9OSGKIkv5rJFRI/K6CN+qkPiBvcRUSIRcTtNeQvcggDsp3JwYuoFzFQTkImabFxHFOlkRobLWOQ5379BM8+9xRPPvMLAgb70W9QH3xDfAgKC2LMq2MYOmoYo18ei3dgIN4BIXI9/fzz/PypJxg5djRbdm4mI0tFSnwyJccqOJNUxYyhSviym7SZQh5tgj0ihkwY/gEpIW10Ck8vK/gGGsgP6xCXOiHvhaT3bRLQax6vpCDtY6CVvuwZD8+C/zFwldv/cJn/AP7/7NAnDzTJeoo04dllzYZy6nKQnhOhHfKMRYyQ/QeG14mQbxb5ySdJjE+htLyMjAwBclEZqckqigqKxWWKkP7lpKenU1BQII/eFpcUMXRYmDxvX1hYzEsvvkJSQqqcbVddVktcZDwpCYns3LqFt4UHfO6Zp3nmiV/x7NNPMTgwgJAAf0aJ5/sOHMCrY19iZNhQeVuAj7d8jI/PIJ78zVP4BvszY9ZM0lUZpCWkkRmXLgxUA7tW7uHNYZPYsXAv9ULyN2Sq0WYI75+skaW/gX/hJzy9UZ7nV070WVR2zMktnlN+Krc8+y87+KTYZByvnA6Us+tOdFAXWSdHb+tS6rGI0FbJH9SlqGk8rmak7zB2b9rKvl3b2bNnD9t3bmNfxC627VnHS68MJjktkhs3/ld77wGlZXXt/09ubmKhV0HpvQxM7733GRh6HzqCCqiggmJFsYD0XsQSjbk27BWQPsCA2KIpN8UkRhONDaR+f+dz3tnjywSVaFz/+18r71pnnaee93nO2d+9v3uf8nweEjI+/WZVxN+o3LBhevmJzUqP66I1S6/SyoXXKD8qWeMir9LEsMWaGL9eQ8OXapTbnp5wvzZW/FaXd3tCt0e95Cz6q1oTv8vPi39p0CfOKr7h/OA3tDLzHV0X96JjCRuV3eESzZ22RhsWbHSVs0yrly3SmpWLNLBfsdOmLZ127aSIyFAlp8QpKzdNGVmpyszOUF5BvtIzspSakqm01CyVlfZXclKW285VZFS8yvsNcOAPV1RipJq3aaS2XZrr6llTtXLpIj245kGtve0hzR23ToN7ztGKUZV6YOJ7ujlph7ZOPKb1SQz53a2NjgEs6eaEMfyQ3/aTeZxlZxLI8mhn/SMd8J1AbnQuwuoeldoYdcgPIFnQfZs2JL7laf/SsP2Opr6utdEBesr8gMU9dune+Le8RVsfc9Arl43xh7QqPDBVmJGLjCBkVOKCrlv0UMa7fggxiuhbx67HVHm3xEZF2noG/8poRJsWbff8K1OjvxXUDJxy5dSe+ci+n3fhFOcqP4tyv/8oKlOs1zr3kFl2uFBLnXKeGfZzhf4kWfcvuU9rV6zzQ3BXrFillStXa+niZdrofNRlS5Y7QHN8hdauXeuX01q7fo3SM9NUMWa0snNztHTZCv/NO+7dsP4+XTXjarVq0VKRob0VHxmt7NR0ZSanqjA712+TZ6WkKTc9U0U5eSrIylFOWoY/Rp6bk6X03Ex17NVZbTu1U4MG9ZSdnuEYxSrds3yD1i++R/ct+5n6pg3wVn/zA6/qlbWbtddZfcYFVDlLvXrSKi2uWORn9+1cukuvrz+kSmf599C375RAYFGPfT4Fr+fHYp6VLN+9YZu2r3Qs2W2zEOYNE25WWUqJbrpqtjN6i3T1zKu0bMVSXXfDDN1wywz16Zeu2XOcf8u69xUp12lQ5NUqiBqjZbdvVGKEqwQHvCbn11GbczppbPQtmhC2TCOjl2ti2j2anLRGFd0XaaprkHnOT1+Xvl8Le7zkG3OtE2S67p4a9pnujNqhOVFPaWbqzzU0fq7mXLZGyxbdq3Wuce5Zu0jxzoJj1Vu3aaHEpBhl56QrNy9TJaUF6tevr4qKilRSVKyCvGINGjBUJfllKivop7I8IqiFSktwCqCkXKmukRKTE5SVn6HswlTnCrRXhy4tNGLkQF0/+1ptXPqAfrHsea2a/YTCzumjiug7tW5Mle892D7hhJ/CuTbGga3HW7ov7k9a1esdpwCcT9lpp+5Jeltr4w964f1Z8rta0nW3Hoz/X63o5iwU4wB67dW6uF9qffw7WtDNsYD4d3WHu291xBs+MVzYKxEnxMtDK303FX6sXzGmenbioh7b/NwBwD+/y+YaYJwN6G3eg6Xg2Y5nA3hLtk95Z7cIyr6zmlthk6/YtsVWfO4s+3qCvf6z5wf9R1HXxQRAzyy79dGHnKU/oNszX/KgX3nbCmcknPysWO6AvV4rl6/SqhWrdd/6e73FX750hZYvX6577rlHS5Yt1srVK9SnvEyTp07RqnVrdfeSxX5K7tLly1S3fj116NBBaUnJHugZSSke5MW5+R7cAJttjgH4soIiJcXEqW9RiYY4A0PeO7SXMvOzlV6YqYzcdKdYstSta2e1aNpMA8sGat1yR/2X3ad1Czfq1hnzxFD3Vx/YpmeXPuWBv3PVq9q3bq9G9Byun135oF5duE2vzt+qNx3Vf/vet7Rvxd4awPuBRKelPYEPdazcqr3rtvvuwT33H9CDd/xchTH5WnDjPM2YOl03zLlR119/vWZdN1Ozrp3qsBWne+9ZoiOffRoSMjzxKg2LvcZpiYl65tEdyk7LVXxUnNLi05UV3keTU+drWvJ6VcQt04jYJRobtVyTI1ZrbvrTmtbWaVpn4V8dcUR3d6/UkohDWpnySy3OqNL8vK26LH6l2oVkau4V67R80QNO48zVTTfPVodOLRUTF6vUtCzl5Rcrv6BEcbFJ6ttngPqU9VdudoFKC8o0dMAwleaVqii7SEPKBqk8t4/65fXViPKhKnWUbeyIUSotLHLgL1VGhtPCedmOHaQpLSNZHTu3U+PGjXXDNTdo6W0r9fCKJ7Xqhgc1ImO6xiXeousTH9Vjwz/QbaG7HPD/6KzOe1rW7Y9a0+t93R/7d92f8FcHVMbxv61lDryrI97S+sjf6O72h7Qhyrk03Z0bk/ZbH7tYxOi/JKcMIt/SxuQ/OEH/rbNur/t7l/dyFi6CtQEOeKvGRKGljC+vnihkE43YBnSMbzAgflOyWYVYUdhB8DyGs7k/WEGYVbb7zoZpnC2TsIlV9n9+JmV0VU1sxEY8rorY6ej9dq1xrAgWtczR/nGtVyiyTqYeWvGgA/0qD/oFCxZ6K49QL7jrbq8AFi9cottvv11Lly7V3LlzNf/uBX6k3s1zb/GJmXlpGamq37CecxtjFBvv5DvNWXIH7hwHbAxHkQNzeXl/9e3bT4WFxTX5gAGD/DbXlZSU+WW6xo4f5wyMUwp9S5SQmugZKdY/PjbOY6d1izaa4+Ru7nXzdMOMm53SWqXc8Dzte3yPNq9/2Q/6AfRM9Y0OidBb976ufSudBWc+/5Ltem1dlZ/y+3UJ4B9gUU/uWfOatq+t0qLpy1WW0EfXTr1Gs6+crRmXz9b1c27Vdddd75cZKyvL0b0bVuvUlydCQvpHTtXYtOuV0LVEb1b9zj14khLi4pUUm6ycmD6O0l+til53aFDYPI1NXK5LEtZrSq/VemTMO1qatlVjfrpMd4c7yuv85F8UfaiFSVWaE/ukH7Kb3Wmsrrl4vm6YNU9XXXWNho4arCYtGyjWWfaMzDwH1CIlJ2erqLBcpSUDVDFqonKzCjWofIj6FJVriMsHlA7QtImXqDAtR+OGjNKkEWM1vO8ADYMNOA3bp7BQ5aWOBZT0UWFBqVMkGa7sbKcAnPYuLlaXTp2dIsvSrGnXaMFNCzVryhwNTrpYU2IXa3Hxbj094TMtTHDgjn3fUfBP9Eia8/N7vK+qMfJDh7ePkAP0H7Uy8td607Gj+xI/dhbqL7ov48/a5s7vcGlx+OuqukTaMkxaFu4sf8Lv9UDqn3RoirR7tLs/7h297rZZAOS5Ph/qtzMDsQQDLoDYMuRTD3gAwiSibwMUYH8k93894Nk22ny2y4YFX/NDgN6UEEyGd2K7Zip1NCPv3P+HVfq+eqZJL++9TUt7bPETbmBGi6MPalHhdnX7UbyumXS1Zs+cpStmXK45116vmVdepVlXz9Y1V83y+9D1Sy65RLNnz9aVV16pW2+9Vddcc00A9M63bd+xgzcISSmJKiopVHxinHIc4PMcgPs4QBc7MPfrP9DvDxw0RJMunqIhQ4dr5KjRXpbGjpug0WPGqai4VAMGDlaBUwZFZaUq699HpX3KfIAvOSlBGWnpPqUkpapTx24aOWyMk/1b/BTfpTcvU9OQxnp67SZtu2eL9jKcd8Vu/fyqhzQ6rEKH1h/Qbgf6dx54S1vuevk06/7PwN+nAysPqHKFcwPWva3NjhnMnXin+qcO0FVTZmjezbfrqitu1I03ztfNN81zivA2DRpYrsUL5svPpx8Vf5VGJ12tTk2i9NyTLyg6OtRVSqhiY0OVn1igCanXanraUo2Om6/RDih8s35q6AbNT3pWS1Ne1aLkvZofV6W5XXdoY96vtTBti66IWa2i0EmaNXW+rrjyGk274hL171+sunV+6jVuUVm50tPz1bfMWeziQSopHKCi/L6aPHGaBvQZpOGDRmrU0ApdPG6SRgwertHDRqhi6FCNH+VAP5bjozV25GCNGDpAY0eNdOWUK8spkeKivs7nH6jyvoOUmZWnuPhEp1QS1bNHN/VzjUQ51868WjdOvU0Del+qCeELtO9O6bbEnaq8XFqX+HdtHeyAnfCFdjqwr4/7s+5J+ZPWJv1Br46mu++PWh33N62J/0BbRsn7nQ/mOQWQ9SdtrXD3J/1Ou8ZRjrve3b8q+pc6MJmxAFXaN1F+nPmGxDe0MHS7BwHgBvj48oD1Z2m/rAHgt05NdRb96dK/1NBxYgSAFYCdzdTi4OXNama+VdP7f8t8+WqA39X5lRo2YdOfcW+g9yyZxfh7vx5i+A6t6LXNz6eH3i929L5/vdvU/b8SdPvV83y/89WzrvKAN+p6xRVEqWfo2muv9T7snGuv07TLprvta7xSGOQAHB0ZpezsbB+Vz8zMVGJivPoP7KfSsr4q6euMTXk/5Tk3cujIUT6NHDNWQ0aM1OjxE3zO/ojRYzR24iQNGjZcg4eP0LDhI51BKVVBQYGKC0uc/PXRQFdOH2d8crNzPIsgllCvfkMniwM1Z/ZNuuLiK3Xd1GsV3yVWL93zvPbft1evLHhFh+49pPEx47V28hr/oQr89jfve+M0P96D3+j+ysAinrsXE+l3rsDaX+rVtfv1i4WPqSihQAvm3uGV4e23LdbMqx2jvf52zZg522GjQKude+NBPynlJuevz1R6aJke+/mTDuy9lZUT5yonXLHdEjQi6gpnFReqImK+RvZepOmx9+rWtGd1e+xzzkJu17yYHXpp0nFn4ffppoindM+wneoekqUbLlmkMWMnqWLKCIXGd1L3nm2UmhKvvNwixcakOBo/QHmOovd1dH7ShCkaPHCYKka6Ch5WobGjx2lMxViXRvtKTHINlRAfreiYcCUkRjuNnKlRowZpyuTxGjx4oEaPHuuYQj/1Kx/sy81Iz9XgIcN8BDe/IFvxCdGKjOqtsN49dPn0qbpy8gzdPm2FOoYkaWrKct07+k3dlXxASxP+14H6r86yf6z70j7WTmfFdzmwLk/8ldZn/Vm7nLV+0YF/ReIH2j/dWXEH6C2OESyOfl1Lo9/SzvFOYaS/rxUx7+q+1Pd8t+B9ab9T5QT5/ui1ca9pTdwBP8vQ/HZyrOHWoZ95kBgwzsZSoyyCAWXW9F/xybknOHj47wrkWaCRAKUtdGL+/SpmVgaB3isfejTCd2p92F4P+uWO3uPT9/hRgsb3H6eJYyZo/MRxmnHFTF0+7QoNGzZMI0aM0JgxYzz46eYd68A5cvgoJ0ejvQy1aN5SkeER3vqmp6b5OFG/8j5KSkpyMp6tsj7lGuoMAQlrjmVHbggOp6QSYypQsvPxE53fz1j/iydf4q+pqBij4UNHeKPUt7iPivOKfCopKNSA/uWeUaRlZSrauRFdevTUiOGjndKapbmzb1FWbLrmXnqzNq/aoqp7DmjHip3ON9/nMNPDr96zffkO7Vq1O/AZ7dWB9NV39iyw54zIcqL7Tjmsf1svr3IG97Z7VJiUqZuum6Vb5t6gOdffomtvuFMzrr5Rt96+wCmoPK1csSwwOGds1PWaEDdXeWGjteWZA65yshQZGa60lHQl9czXZZmLND50iUb3XqYrUh/Stcn/o+ld79W8xO1akLhfS5MP6vbIzVqctU23pD+i+HMGaljSJRo7YIKGjxikAaNL1LDNOcooCPg+JZlOKxYOVpnTkkMG9tXQQeUaMWSgpx/Dhzn/qU+xUzzRatOmlVMU3Rx9KtH0mdPUqXtH5Zflq2JihVJzUtX8omaKjI5wdK3YN9ioinFeA/Pd8mEjhjvK5phEebHiEqOUk5+h/MI8de3aVZERsZowepIuHjFFk/tNU9cfpWp8+F3aOvuIYy/Ol3IWf5sDK5Z7TdK72n6x/Ii+Fx1wb495Uwsc1V+e8RdtdgBfnfauXhh1QmvT/1e73XUrE36llXG/dszgd3rV3b8h5Xd+9t+GpHf8pKN97prtFYf9zELzdasmBrYtig/osNpnQ+9twZDgRUssmn+2wTbux60wYJ7tGodnS+8pH6VmZfvjYYHo/Zrq9Q+9sqkG/breu/3gJ2ZdDm0yX11DYjVl6GTP+IaPdEAfNlLjxzq6PXq0JkyaqKGOAY4bN06DBgzW0MHDNHn8xaoYNko9u/RQ53adnAtYqH6l5cpISfUGZIKz3ASIR4+qcMphlM9RFtmZWerQrr06d3T3OPByriAvX+efe56mXnqZRjmr3+rCi3wQLys1UxVDKjRuxDifT3CyN2rICJW5csv7lvkgYpGT4xxnXXtGhKlL1+4aN8YZqL6DNXZwhdJ6pGjeuDu0d8NBP8Ju6/LtWnrxCk1KmeK/xrMbf39tpQf+mdbn58McfG7bf7jjnkN6Yc3LuvuaWx22UjV96hgtXu7c6dmzdN1cl197gxYuX66SPgVavMTRWlbDnRR/iy5Nnq9WP4rW9hfedNTgJiUmpHrfvsX5HTUkZobGxDh/PuFOjYq+VeOj5unS2CW6JMr59qHrdUm3Vbo6ZoPG97hVE+JvVEmvURrb5xINKOrnKX2L9g2VVpigxOwEFRQVakjpcPXP7aeSfNcAE0ZqjPPzx44d5gA/UNHOGpf1KdLSZQu1bccWvfTK83rimU1q26mNH5DTLaybNr34jHZXVerZl57TzFnX+CmWHTp29lp5/ESnaEaOcMdG+HJKSvNV2rfQB/YY7JOQmKw2bTs6yhfnG+niYZNVEDZQY5wLc03ePbp/wuuaE79Jd2Ru1h3pL2rTlN/r3hGv6b6xb2pDxZt6+FJH98f8XtenvqIHRv9aPxv1jh4e+xs9VPEb3ZL8vF6+/BPdnvqyHhrxa92R8rIeHfM7PTTkLacgn9LCzBe0adyvdFfak7orZZPuTn9W8+Ie04KUp51L9KzuSnpSdyZuqtnm+DelxRnP646EJ/z1i9Kf0/zkp3R36jNndW/g/hfcfc+7+57W7fFPuLI2uePP+GMktr8xJT/3jWlh6gu6O+V5LU5/SXOjHtNdic/o9rgntSjtRWcs3P8kPedzji9IfVaL01w9pDzpGONTvvzb057zX1fqck6URvUb7QE9eOgQx/CqLe1w5/aNHeOXwmZuPcwQ6z544BAH3o6KCA134C5VUmyiH503ZMBAFeYXeBo+0lH0CpcAe05GpuJiYv3+448+psqdu7T55Vc0Z9ZshTor3aVDR2WmZ+il557XKy+9rE3umjnXXKfUuFSlxadp7PCxzvV07sBw53Y6lwBFUVxapPySAuUU5io5PU2pmRmqV6+BY7QXq79TQOMHTVDnc7tq+8Y9enHVK9q2cae2rN+mwq5l2nFvpbau3aFt63f5vv2d6/b4tGutpUqfdqxhbP8uX8bWB1/V8w89ruKsVN184+W6ds40LV6xSBdPnaqb5s3T9KtmKK8wSxvuXaXDRz4NCZmYeL1I5ckVevnZHeIDd/kFRZo1c4auc/74nOlzdf3UO6rTXbpu2l2aM3Whbrp0uWaNvlNj8i5Xx3Mj1PacnurWLErlOUPUJ8f5N86/btq4iXr07OKoVLoystJV5vyockfD+xaXuwqY6OjZMI0aOVx5eTl+VZQVjn68/PKLfvmjysrdPl+1ZrU6d+3k7s/0q6CyMOLmrVu0c/cunzMEk5SXl+d9qYqKCp/GjXMNmpPlaU1JSZFSUlKUnp6uuLgENazfRIP6DFZplnMJcoarTf2eand+hLJ7DFHHc+LV6aeJyu02XL0bZiqlfbm61U1RTo8RXjF2r5+lNj+OV1Gvserw34nK71GhzuekuOtHqstPklXUY7Q6Oj+0w49cOT9OVF6XEYpslOvyYWobEqVe9dLU6b9iVNh5mLq7+0m9z0tTn56j1e3HCcptP0i9zk1VmSu3U0iMzzs7a8f1PX6S5K8hL+oyXF3/K97f1+VHcTXl9fxpsj+f33GI3y5xz0XOvp0Pdc/bLSRZFfEz/VLng8Iu1fiU2RoefblPo+JmaHTCVd+Srv5eaULytf4/x6dd694vUaE/TVNeh8HqXSfD1aNjhV0GqUPdKHVrFal+JYOc+1buA2mFRWVejgjSMuoOvxrazjZ5YmKiLrroIu/LZ2RkqL8DOb78sCFD/fnhQ4f5UXVYbrruUACM5jt08DU/uKdq334/og+XICEhwSmMJPXo0UPPP/uc9u3bpy2vbPZK4alNT3tXIzY6zvvyQwYN9jIN60AR9Snv61ko8/zTMtL9yD4S/n/fwr7O8A3SYIeVpzY+q62Pbvcz/G6cfIvmz1yol+5/RS/du1lb7tuql9e/ou0P7NALK19U5UN79eo9O7Rlo3MHf7ZDT699XjsedTi592ltXLpOOUnJzo2Y5hfPuPKKqZp97VVOAcz2g3QKinK10h33H7sYEnqpxsbNVEFMX+2vfF0fffx5NmB6etMjeuaJX+jJTY/rySc26WmXyB978hk96tJTTzynba/s0M82PuS7+foW91NsRJzSEtN9d1tkeIy6dOqu8j79lJOV6/PC/CKvdSdPmqJBgwZ5ita0aVNdeumlvuKZOPHWW295EDOGeuvWrR7A8fHxmjhxovLz872Gf+KJJ/Tqq6/6CRZMtKCxmHhBtw0NTsUPGTLEX9uvXz8NHDjQN3hubq5SU1OdQMQoune80uKyVZzd13+lNz0+R4mRacpNLVJMr0RlJRUqtrdTFPF57niGu66fEiLS3T25SorKVHZCobLincCl91VZ9gCFd45VfK9UfzwvucRRrX4qzihXbM9kvx/TI8nvZ8Y59pHVX0WpfZQWma3ksAwVJJcqL9HRwXhXZmy+Enul+fNxPZJ9nhmTp+K0vipJL/fbZZn9lR6Vo6gu8cpNKFJGdK4KU8p8OdzPPflJJb7s7LgCJYSm1uTcnxNfrIgOCVo2d4PuX/qo7ln4sH6+6kk9sOwxv79x0S/8sa9PnH/ke6cNdz+stXc9qF5t4xXXPV15SWVKic5TTO9UJcdmKzYqVRHhrp1Ss5WWni2MUWZWjo+oZ2VleVCWlJQ45Z7jAU5ep04drwgwACgCztP2XD9hwgQNHjxYI0eO9MNqX3jhBS9jyBvj9gE1Y/iRrS5duqi8vNzLaGRkpJ/78eKLL2r79u1e7shfeeUVfz8yhTwjZ/3799f48eP9s/Tt29cntkl0IRNUzEzP8hhpf2EH51K7/396i579xfO6/bo7lR6ZpRcfceU+vk2PrX1clU/t1dafb9XzG1/U5ge26JX7N+vlBzbrifVPacsT2/XYxk165uHndPNVN6pvfonWLFuhK6ddqmuvuVJzrrvaryN4tduGfSxfuUyfffF5SMil6TeqIvoK5Uf30e4dVd7SHzt+snoxvS/9FzFYIN8S38LiI3jHvjxZ/W17hezcukv5WQVKTUjTwL6DPLVq2riZwnqFO42Z6QGPNoReXTrlEvXrW+4DMOHh4erZs6ffvuOOO3yFA3YATAVXVVX5SqeRFi1a5EGMFn377bd16NChmuvfffddf54KLi0tVZs2bQLa3NE+7kVZUOnkND7xikZ1GyvF0bNkR9MSopOUm5Gv6LBY5aQVKCkmTXERSYoNT/R5SlyG0hNzlZmc71N2aqGfhpkUla7wbjFeWSREpHqFkRqbpaie8f54SkymMhPz/LXx4SmKC0v2eXZygTIScv0+SodjWUn5So7O8MdjeycpOtS5Qxml6tkxXHlpxb5cjqOguAbFxP9TBgqLfe7nPsqz/+HZCjPL/P08C8/EfTE9ErXrpf06tOuXqtr2hk8Hd7yl13e/owPb39RrO9/+5rTjne+VDm3/lV7f8WtVbXlb4Z3ileKEHQWbk+LeNT7b131GqlNszhXr3TtcvcMi/Pp4YRHhCo+MUGxsrDve2zG3OB+YQ446derkrSnAAvjJyckehCh+ZAFDgIy0bNlSbdu29ccYr79z504vb36G3ssve/njPF2AjPTjvxj8s3//fh08eFAHDhzw96AI6EUA9DBJ5Oviiy/2cQZkdcCAATUKB5aJ8brgggt8eb169vbd4m0vbK/zf1JX3dp3V+c2XdSjnWOdzdurc8uuiu4So85NO6l7i27q0KijIttGKrp9tEJbhirc5d0ucnmnSIV1Dlfnizqq7k/P1QWNGqlZo/q6oGkDRUa48y71DuvhFxu5594NHt8hw3pP1aTk2ep5QZTePPSrswa9368GPV++/eRvn85re2EbdXI+c5f2nZ2fFO/7zkuLy/zgmeLCIu/vQG+ItBJUo9LJu3fv7huIfWZIoWkBMxVLlJYuGSZEzJw50zcmWpaK37t3r28oKhkBoMEpD61Po6HZaXBYAjn3Av6ysjJ1bN9JvbqFOqBHqUPr9g748Y6pxCi8Z4RiwmMV2StKcZHx7nyM4qMSFNU7xjVSilcQiTHJ6tqhuz9WmFXk7otXfESC2rfqqOhegevI4yLdfaHRThmm+33ui+wZ5a+PCY9zlixRMe6aSKdseveMVLw7z7Eod45tzmU6FhXtro9w/0UeFuqeyz0D15NzLcfZppwkp8i4tkvHHv7+0O7hSkvOUs9uYUpwz9WpfTe1a+0EqVNPvXnQKc/9b/i0d+d+Ve056LcP7j307anyje+cXtvzllM2b+uX+3+jN/a8oy5teiqie6zCuke5eo9WuEvEXRLjUxQTE+cpeyRj32OdexQW6vOoqCh3LkahoaF+OywsTHXr1vVtDAhJtDOAg/lhfYn2m2LAkmPt27Vrp8cff9wzTCz3a6+95q03LGLOnDlavXq1Zwzr16/3MklC7iorK9WxY0cvb/x38+bNPehRMpMmTfLGBpaKkuF+ugxhmjwjZcMe0tIynAKI9+yXvv1uXbo7mezt5CTJy1No515KiUpWszpNVZia71NKRIrKshyrS3HMNalAhelF6tkpVH/78wcCk8cOs0rOsZAvne/OZ6xO+k9ZHQ/57ItPQ44cPRz4Pv3ExNka2H2yciJKdGDfm+JzticB9LeA/uTxUyE6Vp2458sTIYeqDnhfqlGDhgrvHab83Dxv4XOysr3W41NEo0aNcNqvwGvdxYsXe3+LSoIeAXwsPtr2jTfe8NoXRYDWvOGGGzyI2UcpkH7+8597ZQANo1FJUKi77rrLj8zCz4cpoBQQAKNbCEROdqZ++pMfq2OHdk4jhql7125+IE/Xzl183rF9Bx/J7drZgaSN88fadvAJZUHerk1bf76zu65Th47q0aWr32/XqrU/1626jI5t2wWiwm7bcl++ExgED6vTunVrLzzk3bp18zlKi4RgkiOsMBj8UO7lGPfbNsKPMHM917FPWcwW417cHkCCkHOMfYQXBYr1gtqSOIalI/+h0r7K/dq3q0oHKl/zyqZL+65OiXZzdd3D1zV1Tp1SD7wfvUlt27ZWez8hq517nw7+HTiHweBdsPS0PcofkMEIASCWFtYH8Fu0aOHBi0xgmVECbFNPUH0sOYaGZ6QcBvogd5T90EMPeeZpSiE6OroG1NQpjOOpp57yx5E3/pOEkeFZkH9jH/Xr11e7Du2dAuvtV/al/Wgz3olyaGNkCDlp0fwCH2gk4JjkB80l+h6J3LQ8ZTkm1LNLqP70u/c84MHq4S8+8SAHvydOHgn54rDtnww5ceKE/0a9A/11Ysms0sSBeuO1d/XF4eNeG5yVpUezfOE0CUtms3/iZMhNN9zoQNHORzzpBiktLvG0fvRowDvUB+86OKA988wz3oenEhg1ReXikwNONCEVixBCq6gso+nTp0/3xxFMGow0a9YsP6MKVgC1o+Hw+/HraGyUBUoG5YDflZvrfMLMdF3YspkaNayrLp3bq2WL5mrcqIHaOeFqdVFLdWjfVu3btfEV3/qiVl4I2zhAk3Oc67p07uivI7Vt08qn1q0uVKeO7dWgfl01a9rYj8nmWo5RPufpjmTt9tZtW6nlRS3UpFljb70YJkrQsmHjBqpT73z1CO2ueg3q+mMdOjkaWPc8b+kuaNnc39+1exdd1NqV1661D3K2anORzxs1aejPtbjwAn+ugaN7lEk5zS5o6v73Qj9MeefubXply4uq3LfLp737d2tf1R7tP1Dp8x8u7fUBs8rde7Vz+y4P3pYXXKi2rduoSaPGvp6RkVaursi7d+/qAN1Qbdtd5BQdCqylp8mAh7xBgwY+4S6SkAHACNhwHZELFD3UG5kDnFhn5IbRexgS7lm1apV3GwE/wAO0yBfKEhZgLBR3AkN05513esWCFWf72Wef9UaIspAz7uX/cTl5Hu6zuEOXbg7QrVv69qdN6tav43Pbbtq8iWvvc7ysxifGKMGluIRoJSbH+S7t9NQMJcQl+zr88MMPJ4DTY0cDn6Q+eeLLkOMnAktf+09UH/sy5OTJk37Ne6ka9CMjLldeVJl2vLrX0/szW/qTp4H+xLHjIYc//eSrc+66j/7+4cMTxo9VeFgv9e1TqpTkRL8+eX5+ri65ZLLTgIPVo0c3bdy4Qf/zP//jwYv2xNozbhrg0zBoPiKoVD7nzzvvPA9gfCIajONYchQE2vi+++7TjTfe6CkTQRYUCjmMAQ0K4FEaaFuoP8/DWP2Cwhw1bFRXDRrWUaPG9dS4SX01a95IF17U3AsZs6eaNGmkhg3d8WZN1MiBtqkDMsf8eXdf8wsaq45rnCbOhzq/zk99TlnklPdfPw5R02YN/bmLWjlBbXC+P1e3/nlqdmFT/einIWrSorHqN6mnBk3r6yfn/7fOrXeO6jWu6xPHGzVv6LcbNnP3Narjc9uv0/B8f57txhc08olyyLmW/PwG5/nrOH5O3Z/6/d5RvbRr3w7t3Ltdu/fv9KnygAP9a5Wqet0p1apdP1hCuVQdDFhV2gnlB4Cp23r16vi6pY7Zt+1zzvmJ32/WrFkN2Bs2bOjapJE/BpCgz4AQcKHgMRYAHvcOFwAaz/+99NJLuvzyyz0jwKhgMABoq1atPOsB3AAey4vlRpFg/bHyuAu4m/j6yCv/SVnPP/+8dzkJChI8xJ3kv2ED7HMdxzByPHvjpo08uC2nbWhD2oY2b9qyiZ9eTnczk8l6R/RQQqpz+1JiFRUfqaSUZP3+978XICYi/+WXhz3A//EJq94GPnDBUvbHTxwJYLga8F8yn35s7DUaEzNTHRv01MH9b3l6f2afPgDsGkvvj58MOXXsaOAbWQqc7xXaQ4UFeZ4+M/oJKo+FHzJkkKv88b5r7pFHflFD0QEmCgBAA1w0JFoRqsp5NCzjqJs0aeKtN0qABsA6AGR8ruuuu87T2pUrV/rztmwSPQJUNAnKRQNY105hYb6ystM8cAF6fSyzy88//9waQQPsJoz8P6DHopBznntRDICafRSAF1wHaK4B4Bde2MLvN2/eVOec+2N/XRN3Pda3eYsm3srXpxy33wwF4iz8BS2b1mh6rHadeud64ajnysPyN3RKBVaA4rDj5FxHOQ2cIuO6xk65sM//BdhDoBz223dsoxe3vOAt796DlR6Iu/fv0q4927Vlx2Z/vPLAnh8kJx14rUo7dm3XoTde82wk8LyNapRtvXr1fM8OYAbYUHfAXbdufb/NsfPPP7/6WF1Xzxd6sKPULWoPywN4ABVrjjwEuzFMxeU4IMY1hFpz7euvv+6ZpoEesOMGYcUxNFwP4JFT/gegcw1BQWSP/8EAUTbKhGdABrkWq4+sorB4Z6/EXFvC3s457799HWTmZSg1PUkFpXke6DGJUX47OTNeHbu31ZCRg/SnD/7su9+OHv/Sg/74SfKvaH1gjfsArT969EgN6D29vyzjVo0Iv0LFcQM96I8ek6f3R/EFHOhffOEZbd3yira+/JIe+Z+H9dRzz+qxp5/Uk08+oaefelybnnhEjz3qjrv99evWqLPzt6DO6emp7gWL/TTZkSOHOw1c7q3rrFlXO2u9qaarBKsNVachaDT6X/Gn0K6A/f777/cVjd8E7QfoaFkqDq2O306gB6uBpqXyrUuF8qFwMAnug5JhAfgPpkMy8QLQQYOZckkj8CGF8+oAIgfyJk64Gjd1gHEKoFGTmpzjftsB6bvmCDQKAOFFyFEmKBkE2o6jOL5rjpJCkSFcAAnlxf8YYGBTfDwCy7Z3fwAIu/bs9or20BuvB4JV+/Z+Q+5AvG/Pd8/3Oxfitf3atbdSDV1dN29xgVNKdX391GvAszrl1KSZA8UFHuhs16lTz7kBrVT3/Hr+vSzxPoAMwEOtaV+j9rQ5YKZbF0tPAI53JiEjMEbcRui/xUiQGwwEgGcf8BJ/4hquBcT8B4FlZA1DQ7kwBAKCGDFkmP834BvzIJZAjlLzbdGgsc9RbikpSV6WGUiWmprsXL4IT+lbt2vpR5YOGNxX73/4no6c+MIZ3+OnpVO1kmrSydMsvf9U9ZiYWRrWe7qG5ozTvj2HhCY4fOSo1xhHP/8oOzoqTJkOrMX5eRo+bIgKS0uUlJGilNQE5eVmKj0tyVn2HOXn5Qgrj/+KlQfggJ6BMcPcfVj5hIQ4p11XOyu8wwdOECBAD1CxzCgCtCcVTaVhkaH1+Frz5s3zYEfL4o8RnOI6qDuNhNDSkJSBXwbFRxHQWDQ616HNqXyoVt9+fVRYXOB8205eyJjqG9q7l592GZcQ77uIwsIj/YcVIqNiahL74RFRPo+IivxOCQFlOGdEWLgPfMZGx/gUExXtx4oTBI2KiPxeiXJITPdMSkj0/8M+5yLCIt3xBFf3B7R3T5VTunv1xqG39c47v6rZr9r3mj//9fmB75Hv96vYAvr9rx1Umw7tfXSerrjomDg/USo6OtYpdlfP4TGKjopXvPNfyTt16KqiglK/HNTVV1/tlToKlMClAR5riisHuyMBZuQCOYMtIiuAFZDyLI899phXEgT08N8BO2XzBR0Cy4wjAbxTpkzxwUC63LD6RvmRXQLPyB/MlH3cVGQ3mOKbMoLiN296gR85mJqcpqyMbNdGyX52K22PvGLg8N2ZIMSgmr9/9NeH//bx+/s+/+IfIScdNk+dFehPnhn0w3pfoStyb1dmr2I/OAfQQ/GPf+ks/fFPQ9q3a6WoyHDFRoYpIz3Zr1LTyykCqHFqSoJ69+ruwc81deuc5z86kJUFxSr1Uw4ZEXfxxRP9skIXtrpIr2zZ7GhdwCqjHUmAFoBiZT788ENfmQRHADuUnQAJPhO0iYAJ0yhpTGtI6BgVTbI+V6793e9+52MDuA5UPg0HOyChUQmqcI4IelZWjgNjtBe2zMxsP3IvISFJyUnpfsWe9LRsv3oP+4mJyX6QyHdN/BcjuYjEpiel+am/pMwUR+sSUvzx3Iyc75XofoyLjFVaYqr/D7ok2beuyTYt26pyd6Cbbl/lAe3eVunz/bsdWzrwhs9RAF+fV32vvOrgAS8HLF/dOzzMg51BN9R5uFO2CfEpio1JdClJKcnIF8BPUdcuoVq2dJWX0+PHj/uPMgJ4gAKjs4EwWH38cowIUXrcSAwBBoEBXdbfjrVHBt98801t2LDBuwbEl5A7ZI57YAgoFyg6LiiWHcXBfdZ9h8whj5SN7BGUxlUA/BgagI/h4RjP1qBeQ3Vs08m1e47vFqabmF4Luu8YxzLjiiv1y7fe1icf/8O94wn/AUqAfPxYwOU+9TXpjECvlTzoR0dfpe5No7Rz2z5fmYHo/ZchRz77YF+P7p191Llx/TqqV9f5jE0dpWoe8FtbXNBEDeo7H9TtN3TUkWh1VFSEo+kJTsulaPr0qd6Xx6fvP3CAt6KAnvHyaEEou++ecDnWFzpP5aGNaTgqHloGhUf7omFRACxmiNbkPNqa6ZU0COdxC7gWrQ+tosGwrGhYKp6gDuXhMkDV0OzQQ4APVTz//LpuH2oMdWxcQzGbNW3pLAoR/ub+eH1HP79rgro2rN/IU7tmDZv6gUwXNG7u8+aNmqlJo6ZqXC9wzXfNmzZo4sunPMptVNfR/IZNAv/jzrVv1cEDsGrPAb1x4E3t2V6pA5UH/bHKHc6C7Tt0lun1fzk/sP+Qt7RYe0AIw4K6+3qt39DX/wUXtAzUdYOmTs5a6fzz6vs2aNK4hW6de4eOHyd49aUXYmQI6s0AGNoUkJHw6eluI0JvQWJkDdcQlkiOLAB2DA90HHATLEaukCUYJzJI1J+AMd2IPDvxAEb34ZIibyRiAFh0epiQY2QLGfRzA1zZsA/kFtmm23dAv4G667b5WrJoqfbu3Kc/v/cXnTjm/POjgd6wUye+6jkD7KRjR4/UgPrUabm+EeingX5S0g26LOMWFUT3U9XeN3TM+fSffvZFiE4eDjn6xd/mrV2zQsuXLdGGNSu1csUSLVm5VHcsvMsBbrnWOarOdL1VK1nR5C6nbWM8LYFe8fJoXibBMDFi3PiJfnpiA9ewLGBAJUDZqWQoOGCkgbC8UCsSxznPIAkaglF3UH6GTKK9bbAFDcP2tGnTdNttt3ltbN13NDIAR4Pj13MMS4/rgd/EIocoqjvumOcaf51nF7gRaHvSsmXLqtMKny9dulxLlizx13yfVFPukur/qc6XLw0cX7k8cN13zdesWu0j0yuWLfc55aMkV61YqYUL7vZDkXds2+m7fN445EC/q1L791bpYNVrPt+7Z99ZpqrvlDPWnQ9UvPTi885d66Vbb5nrKbPVPQtdUtd3373Ir2+3fLl79lVrtGb1Bsfo9sgEGGuP3KDUkTf8Zdob+cIQIBsoe+QExYCMEPhFlpATQAm42SbCj9sJK8CAYOkxGtyPQTL5QzYBNAAG4PQgUS7MAtnnv5BHZI97jWHyXDZgCJzACDy4HVsB7IF+9FM1NPyzTz6tAf8Xn39aA3Zv7U99RddPy88G9KMir9KoyBnKjyrXnp0HPOjN0kuHQwKfunVa9fNPQk6dPBpyDIrhO/qdz//l4dMehokzVCCVj8b1/ZP9yr2V71ve3/vIPUN7+1VIAOWCBQu8IAJ+5kTTcGhMNDAVxUAKlAfC8Kc//clrV8pGAVDxUHQqD42OciCSj6KwBRZodAJWaHUagf+kkdHuuCAZmSnOf4zyc+5t5BJ9msePH61Fk/5Zk9I43ycFulr0tTnXnNSp75xTzgl6V4KO+9GWx46FfPjhXz8isLrpicf09FOb9OILz+nxxx7x+2yT2P7G9PgT3ys9+sgvPOAJDtPbc+pkwAc9efzEafUNqNmmn/no0aOB93LgILH917/+9SN6egA0Ch1Qme9MDAdGiXXGmABYjiEjyBTgJ3G9DVgiCGfjR3ANXfkeuMgTyggrDTO0ob0M1b333nu9zCFjyH/wICruRe6g9hgeGC2Kied55rmndeTIkdMsdeB9T1b3q1db+iA5xNKfPHHstLEz/5S+DfSjo6/RkNCpPnpfueugp/dHj7kKPYG1/7y6w/+k//IloDhy4suQL08dC/gZ1Q9y5Ejgmpkzr/RajMSaYn36OF9m9Fhv5VmogABNWZ/+atuug49iMgoP0NIYjKwi4MJAHRQB1Al/isAI/jughsbbeGgqncgrGpT+VSob+kQl09AAG8pOhJV9EwKsfXl5H5UU57uU53zGcGVnpYohiwxdDCi5434oI0ruq3Tc56rxr05+r3Tc1ScKlG+Gn6imaMfZPnU85Cj/7btHT36v/Lj/Hnlg3/7n2ImjIR/+/X3HttI1aHAfFRZlqbQsT/36F6tP3wIVl+QoOSXGH/v6VOBS4XdOZaWFKirM1YC+pRpYXqbSwjx9+tGHDzOoJFC/x2p82Jr6corY5CwgewEB/uyzz0IALHKE3GEkABWGABnBgCBTWGYYAXKFckAeUBBYdOQDHx3ZAdj04xMfAqywTOJLKAIW3mTGHUNxkVeL+huTROYAOs+CAeK5OE4gEIXAc2EIuS8hKV6bt7+iQPscD7QTMnjsiA/EHf4yMNDm00//4fvgj1X78idRjqdqDYO3dFYK4GQgen9x8vVqe14vVVX+UkeOBQbg6NTx6so/FnLk8KfVg3NO1Fj6wJC/z2qsIutp33TTDR5oWGMWEQT0rEQyfMQojaoY46Pejz2+SU9sesr77Vh6o3P46lSm9/VcA6ARodFch8VnAASBEqg9FJxGY8IDPiGBFSp54cKFXhGgNNDYNB4Uioa3GVY0JD0KuTkZHuxRkb1UMWqoTp44EnLieADwBnT//gHLGTTmp0VCvxJCBO97pSAwAs5g8Nc+/l3y2koguPwjRz/3/bhHjzkld+LzkJOnGJN9xH+pmG2OfXM6XJ2OfOdE3R798vMQVmcNKNmTfv/0ej5eDfSv9k8aI3C5WXsUvl+iyoEZAwKwsMIkFAFGA6qOn80QbdwnrD0yg3zZ0GNkDKOAHHItvj4Wnm2uJTYAcJFPAsjIH7JJeVh65Nj+h2OwVig//49xQmYBPPhg2bjte7YJgH9+9LN/ir5bCgyuCbwz4Oe9PVMMBv6pfxH04+Ou15TUm5XWrVyVO94RgD96MqhQE/qaEXlBwlRNs6CM5GhCfCgq37QuDYDWpQHwcRjAQAUTZafibIqs78ZxlQmlwh/Df0JT4o8SSAHs0HoqH8qO5qZBoGlEYSmTsmwGFOVxH6AnskuZVD6aNzCoosgvu92xU1stX7FY9p5UqgnWN9H7f0c69f9R/n1Zyr81GX09pTPU8zflAYYJEAgcx8RE+fUQYXEMvMLqwiQBGwYEPx35IEBHtB05YZsZmsgOBgbqTiwB3x65oSsP4GOYOA8lR3ZgnRgaegCQM5QGZSHPBARRJLifgBsLb369TbklEUf68O8fzLNAHMbT2DMG9Nvr7nv49Fj6ob0u9x+72LfrN6o9tt4G79u+0ZGjx4+dVhCgJwiCdqNLghe2PlMLulk3HFSJLhKuB/C//e1vPZ2iomzGFLOWACq+lfloKBHcAiw516FEOM59pjiofD+pwykQwI/2RQHZ4BwaDW2NT8+4ZoJ569evVbCbQrzi3wnu/6R/fzKrZ7EkgE9bsnAKCp12ps2RIXxs+8YdMmeDaWCJHAPMABHGwCAmG7CDHGMoOI8ho3eAQTUYEfx/ZAz3E7lDplEs/A/dgJRH/AhLjz+P4kF+eS7KIugNdf9K3k6exiLPGvTfIYVMTrnBWfoblRU6UO+88b4+O+z8iRMnvhX0p2oq/8uawv785z97C8wLGuChW2g6tBwNQPDNJtvY6Ci64LDathoKfhZ9r2hMNDJWnmANlIlBENzLsEtAbP4UdA1tjDZHoWDloVr0CqA4UDoWXeUeBg/RrRgREaaPPvrbPAP8v6NS/5N++HS0uuuKdlu6dLG3nIA+OzvTAavMAwuQ4dZhgAjYIUfID3KHkcAdBNjIJswAloqBwPIDYGQKubM59oCYYeKTJ0/22/jz+PyA3qZ641IidygKv3afYxvIvzEOyscwwkjMNT4a1A135iDyvxn0rJzDnPrW5/TSzldfP4OlDwzeN5/hK18xEFHFwtsMHiKPgB6LzssBeDSbjT2mnxTKbhqRyqKSuI7jdJtAg+hXR9P+4x//8BVJ8IRoKNNPGfxAA9CY+HH4WXTTMewU/4rGxMKjTPCtYATWV8pzGOgRjt69Q72w1A5IBir+P8D6v51O+uAWgHn77TedbHT21h7AM6EKubPhr1haGKItrUZsCLkDjBgi5A4gE5xDhgAwjBTDwwg8YkEYEuSKngD8d0aG0k1H8BlZRi5tDQgUDPIM02AUn7mVAB+WiXzTxV0b6Fh8C9j9oKC/LPN6XZZ5o/IiBmjH1oMe9EeCI4T/BHpVR4GPn1aQAf/uu++uofg2swhtB+DQklhncnx3NCL9nzQONJzKZBuFYWOZ8algB5RFTqNAz7gfDc49+P0EaFAeKACAj6W3lVJoNBqYHI0Oo2CkIICfOvVS/e1vH+yzyvyKav0HWP/XQf95dXcxNJ+RoICeUaC4bih35MNAT1QdP90mbGGckB0bN4EBYRSdjewEnMgwygKjA6hRBsgfcsa1yB1KA4DDXqH1uA8YPdaIgF0CdOSNBOPERUCWDxzYr5povHXHOcBboPcHBX1F9FQN6jlJhTEDtXv7IX1xlK6kE98K+tr0/vDhwz531jnEKL4tIADoodloPiwuDQBo0Yz472hMtC1BFGYdEezDSsMEbGCDLX5BJWPpGXpLxB+tCdBpBBQKFU4jos0Zk80xaD3PYMwD6ocfiKBs3bpZVuH/off//0kGDKPG8+ff6Wc0Mr8DS09bA3YotsVxyH/2s595K8021Jzx9cgl+4AdpYCxQUaRG84hz0Tq8eGJA+AWIJd0IeMaYORgj7AI/tPWf8DKI3ec47gpInqTLCZhcsf7mMH5wUE/InKyxsZd7kfk/ebdP+noSbp8jgdFU88E+sDADxukEjw66vPPPw/Bl6IisKo2YAKNa5oPmk9fJvtoUvP5ofDQI7Qq6+ChOal47kerwgIom4YxjUxF22QLWAW+PtQfuk//KEqCfRrVRkPxn6zGwlx/Kt0q++OP/z7hK5r/H2D9X7f0lr744jOfs8AGM9VQ6FhWXERbIpuEn42BwDAATDvGWA5bIAMaj9FBfqHpzLVHZulNQt4APQYF1og8IXMEALHiMAfKs9WekGsbIWjLeCGn9ELZs399b9EPCPpxCVM1MmqKOtQL1YvPbRUDQ744ERzUOjPobdQX6cMPP3zYtum+gwZRsRYB5aUtgo/FN61nyzcZhaLSbVUcEkyAe6lAgng2mg6lYJMmuI6AH1obpcEQSHIUC0AH8AzaQenwPLZIJssv7d+/97So/ekW/z/A+r+cUNTBFhHgLFu2xMlTG0/vodG4kYANuUOGSMR4aH/kBLDCCqH7AN363wE1lp5zBPMoC+aJzGGUMDokAsdE8gE8rNLGg9jIT/7Puoh5DpsfAisODt4FFsA4+U9BvR8U9GPiLlVkm0SF94pVXnG+/5LMVyPPzgz6U99SMC+JtiS3KY+8PFqQRoD+2NRZ/G9bDJMgH2BmXjJ+PfQIFnDTTTf5ikR7EoShcbiWhmCb9fLwp9Cm1shcSw7QbfEMGhxrT6Q3uE/UBOizzz6pqVTiFDaTK3j4rQ0NtcEhdt7iGsFLE9Uetsu5M523/7Jzwf9Ze+ipXV/7mtr/V/uZg9/lbJ7Z/teuDX4Ge5fa7xB8rPY7nenZzlQPp41BP8N5G6JqbWdMDcCwvBZ+vS2JbbQexoc8IHdQbLYB8gMPPFCzpoPN9CQRsLNl3JBfxofABmCfXIeCsJl7XMfYEVipxY/Y5r9RPCgFjBeuKIokmKkYrScFW/zag7n+VdB/Ux2GDI+YqC4hEepQv4deP/iOPv78HyobWPa9Qf/xxx93QJvaEsA0AFYaCw94bW16LDDaEt8Ki23TH9G2BF4I5KGdiYCiOLgOJmERWFu2mIFBaG5YA1aeSkfrWjcgWhaFgKblWVjII9iyA/bgSmecd3ClIWjEL4JBGSz4CHdwRXP/mQS+tvB/XeMYwILBbdeb0gm+lv9jHPcXX3zhU/Ax2FftdwlWWlwfHJep/Z+1/8vAXBvc3wTm2ooluB5rK7R/hd6bZSQnvfTSC2rfvm3NEFmMhs2qNJqP/BEUxlXEUGDlzWUEzMgVMomCALQoAK6x+fcAn2tIDNQhLoV8UjZyzX1G65E1ngM5BAdf1euZ/XZk8Oy67U6XI1OWZ1OXIdNzr3WWfqqahrTR4488o03PPqmM/AxXLqvcnvrOoEfg8F3o+wSI/qsf1auU0iBoRBsLT4UBSvx8Ai0AH1BTwTQKyiNAydvWBPk4TuXTW4DygDGQY+WNTQRm05XWLFzA/3MdPQVU+ldW/fQUoFtfTfKoLczBAm9AqW39z2S9TDHYdm0QAD5cpT/+8Y+BFW2qV6tlAAhBS4YWEz2GVhL4xIfE72Q+AsJHTpAKV4deERLnGWxC8AkrY2sUUCbl8z9/+9vf5pFqgzGYJXwTS6mtuHgPqxc7H1xnNorz6xShjfA0dmLpdGV04p8AggL/4IP3/eITUG2b3IJhQQbYhvkhd+QYBwbZUF/04WPtkT1bVh2w2vRbDJJ9CIOZdxgZZArlQVlE64MXzLDxIzwDMoe7a8oVRfxtoD7T0O1/xdIHG4jabebo/XRNz52jdnV6qDCvXBXjxmrGtTO+N+hN+KlsEsC35YyoUBoCQEK7UABoSLQqSgLLzj60iZl1CC+DJFAiNA7H8NNpEJuZR6XT12qgp9JhGTSEfdIKjc0goOB+XgsEmfBYHjwb7ky0tLa1RVBhAn7WlLsOoSeoCeP5wx/+4NkJwEVYAC0gZay3BSqNDaGojIpSB5dddpkXSpQbFJN3J4cFIYgktlGGDFrC+gBoBJNzDCXF9eF/bdowiemg1q0EGBBO6ggBN6VMNyj3knC9PvnkE/+uvBfvGewaBNeNtT11EhDw0xnJmQzEmY5/E/2vDZDgEXrsI0OAjXrlfbC0yBeApI6N6vP+/jsI1fPrUZA2dZqRfFBy6paeJcaEIE/EobDuGBnaCiXCtq3VYKvkkJB5AP/3v/+9Q7AirG3doffInqWvUwTfBPpga/91ioAUMqDHGA0Lm6z+aRWO3v9Knx7+IjCh5htBf/JbQW+NSW6RfITKoqrkFpizQB9CTsUBWgSRyqMPlAEQBOcYPEHAhPLQogAGhsB9Rq+si8Sm9pqyga4RODRhrF3ptbuAzkRJzUKZlcIiMyYARQS4CDbifvAs/vNFzndE6HhXBIxzgBdrDXjpBgKgWBgbJUYKXnfeVgxGaVgfs01KCk42KszWfwu+j3OUT7m2PJn9F+e5li7Q4PHkNs8Bn5auKYTbVqQBPCgFlBasAdZFmdSHWbMzxQ/ONnEvskM9B1v406cmnx65D/btA70wCgGcyIGtvWh95jy7ffHGPkxBmyF7vJ/NyEPmMDYso0Wg2daKQFaRM5gCRgdLjwxa/AA55zgKAzmgS7o2MwwsS/31Ufvagcp/mqVZy508Ux1avQUzTbZDpmbN0ZjYK9SpQbgOVf1aR46f+LeBPth3BKR+0T9HmaBFtlCgWXtbtNJmJZEbXaJxTDPTMCgL6wmwfnjKoIFpDFMqCCnaHiWAcmGYsFUUlUogyCKnRPBpBECPpmX+PiAA0MQV5s+f74UfgaFclAnWEeHhObDGWImNGzd6BQCYSXQp2mgtfEIoooEcsAE6AGegsy5LA7JFitm2ZMs1BSdbtsl6PuzrPzYWnG1bnswWcwTg1mNCXITc/Faby2CU1p6X6xhjwTuiFHhvYie2SClCTv3DZFButqQZbAeBRybM+teOBXyd+1B7HYKAUB8Nqd3tFeyuoXyYa49MYfVRvsgazwgDNNcPxQxgg4fMmnsIm7SAsE0aQ86QQ/uABvdYhJ535x7kwk+fdUqC6P9XhiZYAZ7uw5OCx+Ajl8GTcMydsf1gRfhNQdwz99NHXKYREdOUE9bPT62Fuh9mXvP3BL3RX2vgv/zlLzWr1gQmHMTVBNhoCKyH+fxG+c3/sokTwQth0BDcY+OmYQXktvwx5cII6MMnUUlUPMIAPWUhid27dzoa/KgWLbrbuQaT/Kq9NgknMD24xP8Pq6PgPwN8BJneBqPWWESj0VhuC0aSOAf1hmqT2OaYUXH28dO5DyChYOxeK59k9xtlN0r/TYkyKM/+1/7TnovjppxsNBnX44LwLOZKsc39NnyV81Ym56wurNwHH3zQz3yE9eBK0Y72EUfa3L73xrRqKDNlAs7a1NQCoV8vwF+5Z//4x0fZBpavZqgFroOmExNC5mwuCDLC85j1R7aQOwO/fSAD18oMErJm3XHIIccBN0rFZI9rKNeWdkNeLIiK6/fRRx+FfPDBB/PIq6pYnHOnq9eXXZ0+7eqTtn0ssMr00096uXz++Wf9NQwzfu+9P8gxmA7GRM1ym2vE/5yp5+RMvU8hI1Mu0ZD4iSpMHKDtW/f5EXknTFt40NvU2tNBf7Y0zbScNSZWngawKYZYfwAaGBpbUDMdl22Ew5YbBvhcRwNwHjDaslzkFqWnfDQ71IrG5jz3mnUmcQ3TL5mNxae2APucOdf62XYoAFbsxYrhA5MQYpIFwThn+/h/KAKO4TcziMgvUxW0NBb3+KWqqssjAQpyaL756cHXUX7wM7Bt+/YMwedrX0ewkv+2fb9klvtPcruO/+Uaco7bclXm+9sz+eW3qt+XMtgn3sJ/wII4Z+XadSRAbc9CORaEtE+U2aeeLJ4ACwSEKFmugzWhqGAKsDTrlQgEF4/WWL/aPm+AtX21ht7777/vy4f18V82GQcFhBIwRWDfXADUZpBsVV3OYdU5z/XIm7lvgByXgKAgbgAuqF3DfwQGg0V6ueR9eRaGgbNkGysYsVo0n3sjIYt8Baq4uNCfZwAZssoEsfj4WD+ojCXebBFQ/gfFClYI4tpqVChgFDHKmt4wVwf7rPcppHub3spPKfFfZ63afyjwAcsTx4O6Zar93FO1g1c2H/rEV+t2QTuCKMpn1VMHjzjte6KajrG9dvUar/X5Gml2dq5ffZYVYouKsNADXEUV+sR3yEtL+/g8KSnFX8uKPFEsR+0qEZ+L4AuVzOo5gJwIP2WjaW0xTBQF0WtbQMHAaAA1wbZ162qDNRiMNrcaYeZaRmoZwKwcK9uOGVDteAB8S31atWqFT2yz7uDq1SvFrDE7T1qxYllNYp9BKMHPF/wuBloDuL2TgZLr7Rhgt/fluF1jawOyDBQARZC4FjACBuoetgV1pV6pi2AlZ+XY/1sd2L7VIWUS4zClwX+hTGAIpuSt2wtLCmgAkCl7KDa9E5Rp7MNcIJjle++9x6QtzzJhMpRhi7BSDsDB37cv35LzbiY/9lVcAG0Dv5j0xXJZlMM+vj/nKYu6MSZK/IZn430YBUgdmqxZPQTXSbCypm4C6zFWr5tYy5CY3FE208oJdNNzQ73BfAMLxQTYrrERm+5OnYTY4hLkFAzlYyKMTRGE4tkCFhyDjvmFCPbs0r69zn909IPtV7du1rZXt2iLoytss47ac4627NyxTU84qsIabCygucYJ9cK75/vocUpKmqu4LmrR4kJXiQRNOqpz567+2EUXtVbr1qxv11nnnnu+03KJzkKn+v3i4tKa1VHQvgzcwd9mOCWCg3CSWLOciiDnHBVF8Mn8b7q9uJ77SWzbumkkzlOhUHsqlyGZ3Mt1+Kx2Dfda9xn7rPlHpNcGd3CO3P4vcO1stz3HbV/nt2EabJPY5tyNN15fk9gPTpQVXB7PReIZ0Pj8N89LbrPCOGfXkAAs9cNwZeqF9+C4lck7cgxhRqkSSAWE1AXl0AYIFXWNIJrw8b/WpWjvzvWUR+JZ7L94Putu5D7rcrSPR1Imx7iGNiMHUBbXQTnYsuY8CwnGYEtiw+oIBGPlATKBYeZ30JNjQOa9DOwwT4sD2WhQsMH/TZ061T8POc9v72h1b7JB4lmtHnnH2vJg9cx7I7u2ACzHuJb72ed/TO64j33uoSyTAXsWewa2aU+rN+oLBcl7OVdAIdAXAg5UFuOG2TYqRCWhIRj0grZlHzpDRSYnJSguNlp5zgeOiY6syXNzspSRnuq/ctOzRzdFR0UowdESPoDBPQX5jl5lBbruaByjQfYFUSwz29ApKtu0uQX3aGT2ATxARjhsoQLO8bJoO46RQ3ts1ZLggIzFDAjCUQaVY91Y9gxscx+NwjbCbeOqLZjDcRsMZLEH9k04OG5DQO3zxYGg5HBHcfEf2R/pYwqXXjrFf/Pv8sun+WPQPZYP5xuAUEA+Asp106ZddtrQUhtwYsJpg0R4N2g0x+y/uYZzPBuCwzZdnTynBa94dmisLfBos9W4hzIBCXMcoK7m35qfjIDRFrQR9WkTrTiGBeJ/mIjC/9J+wUExns8ElH0UEnVJGxjozEhZO7BvZZMH14d1yZHbJ65sIoy1sV1ruX200q7lOLmVwfuYDNVOlGkfVbW25zhtgJzY0FzK4r1QtpRnI/jY5hj1wnvZCrs8J8dtyTfy4Pa0L+nYfxGLoAzaEbnmXps45KOKFpE00Fl03CrPGspoCxVLpY9wwsgXb8Y5n3iYE8rRTkgHDxqgUU6YRzqf5OJJE/x+BX6K2+f6QQP7a6wT8qF+LfxAVJSXt6GLBnqLoNI4aHCbi2wCZo1uL4mg8qI2DNIawLoBbdUc3sH2rS88GDB2D9f6d3TblEfOe1O+PWewQNn9pqSsUWqXTRk2+QJfjW8C8FEQZoWR48cxz5+ceeEcI+7ABBJ8Oj4Vxrhy9m1JMpJFpKF05NZdSb3ZeAX+E3cn8B2/whoqyrb1N3Mtlo/1/7GEFsi0mIh9VpsyUAKmdDAWUGFrE9rNIuAmR6ZsSNZDE9w7Y3IWHKzlHlMa9uVhrmfb2sGWozKlgYIwoBqoDXzs87/WliaDJtf2QRS2OWb/Y7LA9bbOIol9m1NiisGSyYC9C89n8m3BQVM2lB9clmHAnt/kNFj2LLdnsWewe4MVk8kd18gGz0CR8WlMgLDAaHqEB0Bh9a3/scbPcsLZxwluelqKB3daarIGDujnLT1frE1NSVK5E1y2sezk3MMnsvr36+sDGcyIyq7+BJbt8xkfhJogBkELghhE1Fn/DDCwzffx7HPE+GZs22qobNsCiVgo8wk5FgjgFdYM2uA8TIbEu5G4DoCYLxeIPfT228QPYDvkCDrHoIUk+zACgzY4T05Qh0EfAAV6jNVkoAb3saZbZvU3/1jBh/cF6LzjAOoxN9sfQzFg8bHyWH9LBg4TGBNyCzrx3hatph1pV+vCpK7wj3leqC9Lk+GnshQUoKdvmuPESvBhWUKKj0Xiv3LOcuqCGArvRzCLsrmeerYvudgYeBukRZ1DoYPXqec8TNOGbNtcduSQ4zy7Ta22ZdhQSBa4DR7tyXvb9+JMCdqYCRQV5fCctkAlZXMfz2DKMrCcWlZNII5zVp9cSxncZ8mCgyZPyJExWFO4pnRt0I6t62DnLRhtZfEO/I/FHcAd17Jt41BsJR6TWVtWzoa72zMYdvlYB7//BzMGDBgG0CVLAAAAAElFTkSuQmCCUEsHCKK5SoOl2gAAkdoAAFBLAwQUAAgACABsaIU/AAAAAAAAAAAAAAAALwAAADVjOWU0ZDc5MTJjMTRlNDNhYTdiMTRjYTRjNDgyM2Q2L2NhcnJldGlsbGEucG5nAXQZi+aJUE5HDQoaCgAAAA1JSERSAAAAUwAAACwIBgAAABnGhBQAABk7SURBVHja7ZoHWFXntq4XvdtrjB0FRBZIlw4iRY1gQUUQQQERKQoqRaUoVUEEUZqCitgVC6KiYlcUjdFoTCypmmxjS3ai2Saa9wzd9+x7z9337Jtbojlnn/k845mTNf8555jv/43xj7FYCsV/su3pDw+9fuvYZ4+e6P/r8S8Pn2l8e+a2muK/tv/a/t3t+YuH2T+/fNL3t4z95emTfi+fPtj66pgXD/Pu37vC3S8ucPOTYxw/tpEtWwrYubOYlvM7uXXnBN99f4t/SqhPf/r24r8eP3r4KO/K5Q+5fetjPv74DLv3lP5aXDL310WpU35dmDz5ZV7ujJeZaUEv42d5vViQMubF4iWTfklM8v0lPNrx54mhyp9nznN7nlUy5XlRVdzz85f2PP+nBPrdk9tcfr+R9evySEoOIXzmMBIWDmdRri+ZS0dRXTeTktXBpGf6sHzFRFaWBbF81UTW1EVypCWX8x+v5uiVAnadS2fd4bnkrp1KbPJ7VNak8aeHl/85VHrjo7McPFDN6tI5JCYOp6oqgqajmWyuj6Z6VzD1J6M5eXUhXz5Zy5cPqvjk82K+uF/Fgx83ce+7dbR+ksfHD8v5ll3cYwc3f63j45ebuPOint3HcxkXpCQ1YxIvf/38PxfQ+/ducf70YfbuqqVuXTEVpekszZ5BeKgdKUnD2L9/HmdbFvLJ7aV8/biMy58u4cxHqbTeTOPMlWRaLqfQenUBZ99P4vKNTG5+VcDZa6k0X53P5ftLuf60lA9/LuXaywpus1UAN3PsahmJmaPYWp/1Hx/mw/vXBFw+eUuixWaQu3g6c2J8mRnuSsbCALZtShW4izjatISWc/nU1k5h48ZADh6JZeP2Kew5NJOjp+eyY3co27YHs3dvOI0HZrBTVNvYFMnF64s4dWUehy7FcuJ2Eh98n8uNFyVceV7G9Zdb+DOtbG7OIGiWFSfPV//HBPri5wfbmg+vp7gwjqrVCRQXhJOxyI/tW+Zz8fxKjh7O4vChLA41ZgnQJNaUzWLxovEkzRlB7AxXZkyzY8F8LzFPUhJcmRdrx3yxpWneFGR6U1Y4mq21UznQGE3jwUgOnRDoF2Np/TSVm39eytWnRVx6XsEnv27nxvdbyFjtz6z5Tmzemkp9fZ48u4qPrjX/8eE+evw1JcXJzIpyZEtdgpQwu7l5o47Ghkyq10SzpjJK9rFUlceyqngWMVE+jPI2Y7SPFaO97fF2tcbbScmkkfaMdDZmhIMhY9yMCfAwJmSkGdETrClaOI5V2QFUFo5j05pAdmwK4uDBCM6ci+PC1UTO3EkRdZZw42UVX7GR299VsXX/DIpKR7N8+Vgqy8MpXBpCXKwP+xpXAY89X/n+Mw+2/cKTfn8IkI8ffXuxoCCLWdGj2Fu/gN275jF/nhuz41xIWzSWqVOGMsp3MBFhPgJxPEETfXB3scTF0RoPZwec7GxxGToUD3t7vOxtec/ZCR87G0bYWTPG2Y7RDuZMHm5L1DhnIsdaER9sS3GGH5vLp7CtOoj928I4dSSGplMzOf3ZAm7+pZi7P67mV1mcfmEL974p4asvVoqV03ohl1WrApk335Wq6hhaL63nzucHZPVv4fF3f4A6dV11Jf7+PpSvyqSkMIZRw/vh7tiD4W6G2Fv1lL053h62ONtb4OnqKODssbW0ws3ZFU/3Ybg4uGAx2AILEyWeQ11FmZ4Mt3MRsC4EjxpLqN9YRjs5MtJ+CH5Og/G16U18kBM1BdOpzB1P2ZIRVEsKqCp7j+17Qzh6Npbz5xP45u4ynjws5ofHpaLCHWL1YkfEmmk9n0lBvg/Lsr0pl7Jr7apw8nNm0nR439sD+unDzxg/bTz9BvVh7MSRuHhYYqp8FyvbAQw278tA096YW5mitDZnkPlgzMzNMBlsgompCZbWQ7AZao1SORhT+czWxhoHu6E42Njj5uCG21A3RnqOZKyv/2vIvo7OjHKyZ7TjEGInepM3ZxJLE8eQF//q2JOKwkA21M6gZkOohP8cPvlkGdeuLebCpfk8eVwpEHf/N2sUO8ZPf97ClTMZNNfHsWedpKFVc8nLTae5+eibBXr50mVWH1pPwOpo2rv1QtFegVYvHXp6DKTXCBM6OvdA27ojuubtaWvbEz3TrrRRvoOeXS+0rDujI+f0bDuha9OBjnY96OrYj3edBtLDbgA97Y0xcbdFOcwRcw8HLIc5Y+nmiLWLPU7udnh42DDeTxasEB/ipnkxJ9SN9NmjWbx4KvOzQ1hUEkn+qzy9ey6V++KpPBTDwY9zOPt1CXf+spkfaOLLnzbxEwcE6jWxq2Jf8Pz765SuLKBhf8ObhTl/wXz0/N/FIN2UdvED6TTFEJ3JvTCIM6FrmiXdFilpP98Y9bDu6MwYiHZQP9SDeqMRPxjdeUboJfVDI/FdVGK6oRLRE0VYfxTB/VENNJSxJugFm2EwWUmnECvaTzBFf6wRBuMH0DXQiG7je9N9bA/6T+pNP78uDBrTnSGTetFjdDu6BXbHKHoQxvJMizmDMU80xiJ1IHY5plhlDeC9CgfC6kYQuNqFOdVjWCWwy3fMZt32haSkRRAeMZXaDRv49ts/vTmgYcmhKALUeWe7GUZNlhg2KOnaaEb7Q2Z0PDIIg4beGOztTdu9RrSrH0L7nbbobzFHb4spnfYOptuBQXRpNKbNzoGorjVEUTYIFTG1VSaoFQxAe4UZGgVK1PMHo5plhNaywWgVi60YSFsZo7FMomFxZzQzOqOb3g31lHYoklRQWd4WlRx9NDLaopvXE52sd1Bb3BHFIl0UaRpiaiiSFSjmqKIRq4lWlA6KILERerS16kCHLu0InDiR69c/fHMwyw+W0yt7EO339aXDOQnXFg20Lumifq0NGrfboPqRJopWNbQ+aEu7m31oe60vmi3y0mfao91igN55XfRb9NA+1Rat5u7oHu+L1ukeqJ7qgOrRDhic7ovBCUPU9/dEY39v2h2XZ52USTrUh06yb3fchPZHjOh+TEnb3YbihzFdTyrRa+6P1uuJFPVvN6bdDiVd9tuiV2+K9u6BaNX3Q29nPzruNqXNZlN01ynRXG+HbuFQ1N264T7clbOnTr7ZML/w1QeY5LqjKGmPZmsnFO/LbJ8XuyJ2TYHKRwrUr8txiwLV8+qotWqgKqZ5WRvNSypoX1Kgc1GB5lk1dM+Jilq7oHJBC8VlFTSu66J1VSal1QCVo1qoNOuiedxAxnVCrVkPRYMaOqc60+5sT9odk1RzsDsdBHKXZgFW3wf9RkkLDRYo1kvK2KzEYKcVGhuNUNtiiNqO/mjvMcZgnwXam5S02+pEmzoPUbWkhAgPaW1PvfnV/MEPP26zWRQgIdMRnUsDULuhi9plddQvqqEuUDUFlN5VVVGhhNVBBRonRLkn5HyzhNcJFfTPadCmRQft46LQE53QPyaqPagrqtRB46ieqLUdag0CtbE9+qd7o324CxoHZOKOS47dJ0B366G6ryNq9XJtQ0+0NnVBq7Yn2nUD0d9mLvDMUFSZorXBGvUqpaQRIxTlfVFUS17eKuc2SMooU6JfMARFXD/M03w5cvvM2yuLgnJTUUT0lZcagOqHkpvOycs1iYJOdhCTFz+oQ9uz3dA72Q2tAwK9sdPrvVpjW/SPdEX/sFxT3wXV7d3R2Pwuerv6SSj2Q2d7H3S29UVnk+zrRGmSY3XqjVGtfQeNHX1EYT1Q1HYTKP1Q2dAH1XX9UK02RHONEdo1SjTWWqBabo5ipQVaFUPRrnRAvdIO1UoBJ+dUNtiiVmmDaoYpauK/VbIX9dcP/mOQ3//42OH3hFm4sY62061FAX3QOi8LSX1XFHXd0BQgerLAqG2VMkjCSmefKSp1vdHdPYg2Byzl834SbsYCZZAoRRRTIy++xgL1tUNeg9CoNEd9tRnaa2zQLh+C6urBqFSImtYMFhgmEr6mYmYC0AwVuUZRKueWG6Ox2hy10iGoF1thUO6MZo7cL1/yYdkw1Eud0Kr2QL3CEUWWPDdJnhv8Lqaxbuxs/Q2Fek5+0WcVa8o4eGjf89bW09y7e42/PPuCFy/++7fc/y/b6WvvYxjthGJpR9qdNEJ1kyimqpfMvBEa24YIQIFUOVBMHF9jjEq1Keq1Q1ATKKo1AqHaDoUoR1E9TM4PQ2XVUAFij1aJqCjbDPUCWwwqPdEuc0F9pT0qhZIHV8g9i8VWWaO6UhRWPBTNEme0ckSFK2zRKHFAM9sag2Wu6OU40bZwOPorfVFdbINamhLVVJmYWPEp4B26BQ1hzeFNvy20k5NKvklOWURCQvjz6dPfIy5uBAtS/UhN8SNjUQjFhRnU1VZy/NgePrh4iC9unuXxnz79zXnjs/ufM2iqLYoYDfS3SnKvfQXN9K9qqbIUs0Gl3AotUZj6WgmrCgm/0sGol1lK+NmhssISVXl59VVuYs6olQmMSgGxxlFKI1k0igRmhQftytzRylKilWfx+jPNpdbornAR5QngJHO0c9zRzZF7pL4aMxSdJY6oz5dcOdcazXk2aCx0lBLKGZV4UXCkMYpxvWnvP4iiHRW/PUdWrT7xqLK8jsqKvOcrS+ZQUjKNFcUTWCZ9bHa2P0syp5CfN5PCwmhW5EdRnh3L2rxFrFm+gu3rt3N431GOHjlG0/EmWq6c5NOv3/f8H+//5PH3npNTItEM6UXHIks6VA1Fd6U4nycLwDJ7qROd0Stypc1KF7QFlmq+hOYiKYEKrdApskMjS+rOUjcZIy+fIbXjcgn1IgEiCtTOMUOv0E4gWqC5QFbiVCM0M83F5FyWPXpZcr84CfcZMnmxMjExVjKpUqvOk5w4W5QbJeqPkQmNkNQQKWkj0QndOc4oxhvTfpSA3Fn+N5A/Pf7B838L09wo8Mepk2eRs3jO89KS2ezcsZBduxLZ15DAuZZlnD5VyrHjpew/kE3DzlR2lc9k8/JIViycwoKYsSSLRUcOJzjMjrAoe5IWjqRsbRw1dRls21LCsYZdxCbNQmHXHt2Q/ryTYolejJQjM4zRibV97byevIRmvHy+yAGNeaLKBCN00m1RSZEXTLekrcA2yBUVJZuglWGLaqKoJ0GJioDSFCiq8QJmpqjpFbhZovwoCdFZAihOcnWU5N8IW7QiBWyYNSoCTTFD+VeLeAXUGrVomeBoR3Smynjf/vQOsKe8ccP/+ardu4vnz8lz0mncXfN8Q/ViVhbFsCwviJQkD6Jn2hIzU1qq2V4kJLqzdMkIalf4s6HAh/21YZzeP5eje2dzoCGK0+fncPhoJLXr/Fi/MZBNu+MpLgpm3nRnxvpZoGekjcJEgYGNNu2HtkNziHQcfaR8MekioPugcJJuxV3yqYf8PVoWolAL9CMEZLwdbeKl0I7pj8FcCwzmuaIZKcVzpAO6se5oRgxFNcpB4EhujZDUESU5c5ZAmSGKC5e9jFMVH3RkwrVCJW8GW6ITZoX2TImKmXJNsKzswUPoGSULj6sU+84DqT268/+u/KmrPsjDr799ffGPj+7w1adX+fSTFi611LNr+0o21ixj/ZocSkvmUrI8msKsIJJjXSjM9KOyeApFuWNYUzmR+j3T2b4pmB01YWyri6OuPoW6utnsqZ5Fw5YFlK9fyIzE0ZhbGDA9zJeqqpVkLclhTkIqIRHRvBcUiKO/FwM8LOnraUmv4ZZ0dDOmk5cRHX2lBPLqhLpvN3TGDkZ/kh16ATa0m+JM21AX9EKGohcuqg63EYCiVFG8RpzkykgrVGe+gumI6lQH9EOc6SbXdAuVIjzUnrZRLuhPlDTi2hNN2x6YjrSnvvkNfr12994drlw5x+kTDdRvr6ZiVT4lxWmkLQwjOnQUyeEhzImKxD9wHNHRE6ivSKY6fwY5GdPZu6+Q5YVTKV4ew4vnD/8uB7W2nvE8dKSBmk1rSVmygNDYafgEemLo2Ac9Ey30B2ujOkBa0IHqKAaJ0o2lXx4s6lbqo+X2Dp2nSts4Xdq/cBP0o80ltM0xiHNEX9KPRqCSrmGu9J3oTFcfCzr4WdI90JEeYyXVDOnOADdzNjVsew3y/v17HGpqZPO2TVTWrGHP/j08ePDN2yvW9x06z4Z169lRuZTyrHkE+Q9jYWowl65Wk710MpVVmf/QuZ+e/RX22XN7iEnwIz7ZlxWVM5i9YAQOI7qidDHA1F6f3uaqqHeVlrSztJ4W+qhZ6qIwk47KUoDbSpvp3Bk1x+6o2HShvedg2lsboj+wu6QaUb2DCQbK3tj4eVB/ZB8f3/yE/Nx8QqdMxcfbB3sHe2wd7RjlP1LSXCwba2u4f//rtwf12Z8f5j3/4bHnV5/dJC87gcryBCrK46RKCOXJ43/8L4BnP3zBjq35rK2Kl9Isj6ZD6VI5ZNHYkMb6mmjWVERK2TaHmnWJJC+cSGSsL9NiRzApyht/UaH3JFv6mHVGoSOtazt1NLu3FehtxNqi3qkdKvradH6nK0sLl1HfsI8Ro/wwV9rg7OiBm7MnfqP8CZocyAhfLwYNGojRwP6yfsTx7f37j9/+Dws+bGFRYhCb1qZSUhBB477KfwizpiaP2Bh3blyrZf3aGAL8DYmZ4UHK3DFkp09m9YqZbKhK5MjBQo4eKpT75XDubBW3bu/l1p39tLRsYvPGfPKz4pkbO4Vp08fgF+SN2wgb7O0HYm7cDfehA5ka6IO1jSEdu6nh5G6Bq7sdSlMjbCyUDH31Tb+lKS6uNjg6WdG3Tw/CQoN5lQreOtD15ZksThlHYpw76QtD/l2HbtxoYfac0aytnsmHlyU1pAdSU5HO6WO72LRuhVjB6/+7Z2dESlkXTtnKBFF+GKnJ48hIn0ROdgiLFweJqpNE3bmslvPlpbHU1syW6+I40iD3aspi39Z4NlaHUL12Itt3hpKzzI1pESYCzA4PtwH07aVLv/7aKK3aYWffHSND3Vc+EzBmOJdaj4od55uvP3s7YK+2NhId7kRCvBOp8/0Fzp7/pSPV1WkkJXty4+Mq8rImUpib8Hfjnv14P++LO5f/tpCdPLaZDTXZLMuPJX1RGAtSgqXEC2R2nB+zY0cxN96XtKQRFGaPY21ZCLu3xnKqKZVb1/P59FYWn3+WTuulGE6eTuTDD8vZXZ9DUVEcK0qjWJznT06uH1lpowgPcWDCWBtmRgwncIILGRmzOXHywPK3ArSiVFSyKoTCZeMoKYr6O0hXLzezamUkjQdSqd+dQGbaRFrPNv1/mf1jzdvYsX2VPD+N2Jlj8PEwYoK/OZPGmRE8cTDTp1oxeYKN7L2YEzeBxIRgmdRAilZGcP5CKd/c3cGD+/u5c7ueM6fWUrM2k8TEMBkzK+utwLxyYQ+VZWFs2DBZoPnz0eV/W9ulJUeKuiZx9Wo5s2c7sHVLzu8SRlVVpVhamOHt7o2t0omeHY2xMHSkk7bUnQptenfpTkcDXVQkrM3NejEl2JElSwIoLAihvDxeOsXllKxIISNtNlmLk1LeCsynT+6QsWCMgBwlTcE49m5M/xuspl27mCWdSvORdOrrk1maO5U/fX3pd4FZWpErK/hwkhNy8HWahU2/SKb6lmDZZzyGnayY5DsZOxMbumr1xsVsJA5KW97tpI1hLwMG9u2AraUhIUF+lJUuE3/3xb+1haiiNIUVBaPZtyOMoszx3L11ie++/ZLFiVOoLBpH04Eospe8R8uZnb9bci8szsRzuBtzY7JwNZuBfa/5RPpuw98mE2+zUEbbBmLedSj23QMIdVtGiFcKFr3ssOxvjUkPE0a5+dB6+q/fvD97+sTgrcE8f6qBzFQftqybTGGGD027slidE0p24jCuXcgkPdWMlUXhv+sq2dx09PUPGKYFRDPFZy6eRnGEuZaTHriXWcNX4dA5CD/j2Sz030mcZ52cj8K2vxcuSinoTVzJX5D/x/iB15/u3mLhPD+pOadydI8U8XPtWb7YnUunFnCsMUZ6/pHc+ujI7+rs9988JSYklrEe/iyOz2KU5WS8DMOZ47uGBK+NJPlsY9nkY5SEXCDeYwM274zF2dwbd1svlIaWbK7Z/Df/nj171OetAm3YXsQGWYjOHZ1NeZELN64u4Ms7S4mbbkLTnqI3Muv163fjaedIxMQJxAdH4NjXDV+jaYQ7Lyd19A7mem0myDQPr94zGGY5luEe3piZKfH28uX9S5f+OD89vPPRKebFDGPvtsk8/3E5X95OJW2+ksykiXz38O4bczQuahp2yn7MDBnLjEmB+NkH4NQ7gOH9oxljNp/RgyJxGzCS4a5eWNiZ4uhhx/FTh/9Yv+F89v2jyKwF0sGkefD8aTUfXEz6NTrc5OWHlw+9eJN+3L59lbCpAdjbDGRasB9TAyYSMDyQKb6xTB4WTaBHCJO8A3Czd2Ckj4d0bnM5c+wgH1w4RW3FSjLnxj6LDhpv89aBXjzZzMK5E9lam8iGtVEc2JfLy+dfvp71n3964Pmm/Pjs89tSQ6Yw+j0Xxoz24D1vT0a6+zDO2w9XSyvM+/TFpq/Ja7+WJqb+G1UuCg/4bl32PLO3BvEvTx8Nef0/ont3l5cWLCqPjRyxYWn29B1PHn+wHx41P39679yb9unh/Xsca2pgee4SvJ0c6d+lK1YD+mFj9C7DzAcQOcxr2/98TYl0SJtzY746uS7L8F8A8FDJfj+g/nQAAAAASUVORK5CYIJQSwcIEcv2SnkZAAB0GQAAUEsDBBQACAAIAGxohT8AAAAAAAAAAAAAAAAWAAAAZ2VvZ2VicmFfamF2YXNjcmlwdC5qc0srzUsuyczPU0hPT/LP88zLLNHQVKiu5QIAUEsHCEXM3l0aAAAAGAAAAFBLAwQUAAgACABsaIU/AAAAAAAAAAAAAAAADAAAAGdlb2dlYnJhLnhtbN1a63LbNhb+nT4Fhj86u91IIi68pXI6shMnnnGaTp3d6ew/iIQk1BSpkpQtZ/pS2wfpM/XgQokSJSWyHUfdTGSQxAEOzneuANn/YTFN0Y0oSplnJw7uug4SWZwnMhufOPNq1AmdH15+0x+LfCyGBUejvJjy6sRhilImMITyIPI468QCsw7DIulwj7HO0MdDP0x8MvKZg9CilC+y/Ec+FeWMx+Iqnogpv8xjXmnGk6qavej1bm9vuzWrbl6Me+PxsLsoEwfBMrPyxLEXL2C6tUG3VJMT18W9X95dmuk7MisrnsXCQUqEuXz5zbP+rcyS/BbdyqSanDh+6DtoIuR4omQKqIN6imgGgMxEXMkbUcLQxq2WuZrOHE3GM9X/zFyhdCmOgxJ5IxNRnDhul7kh9inxPer6mBAGHPNCiqyyxNgy7dXT9W+kuDXzqivNEjCs8jwdcjUl+v13RFzioueqwaYh0Pi+6XLNM5eahpiGmcYzNMwMZ4aUGRpmaBgAcSNLOUzFiTPiaQkQymxUgPqW92V1lwq9HvtgJT5+DjKV8iMQUxfsxGAOz133ufr58GOqo7cuJG5wrYr5gUxrllqnn8uSPEhQWvMk4RYxibdDTH8PUyP358iJvQZPYKX/61+LI90n5iZHc/8whsrnn0DEfq92lb71DlROFK21nkpMS+UvNEJepMweIw98ww/Ayj2EI2gCgsAbEPYQ8+AWh8hXbYBoAB0MURQiRYcp0s7hhfCHBXoyH3kwmXoagE8iDIwY8ijC2qcYAk9C2i/BRwkFCs9DHgxS7DFRU1AfMR/uaIgYrFG5ZICBkMJAuAf2BFGMqBqMA0R85Kv5MFOu7odq6TAlQb6LfKwmBK8GjzbeDPQhokoa38Ils9m8WoMonib1ZZXPlroAaohHq7Bn4tNaVHzWT/lQpJAorpQmEbrhqfIIzWiUZxWqlUjMs3HBZxMZl1eiqmBUiX7lN/ySV2JxDtRlzVvTxnlW/lTk1VmezqdZiVCcp+5yzXmKG9dkuWq4oY0O1uzwGh1+4zrYyjeHHjQvBfDPi7Im50lyoShWoQGQfJ+ld6eF4NezXK6L0e/pnNMX8ziVieTZf8BYFReFC9qagij16oXkRXJ1V4IFo8V/RZGrGON13cCjge/5QUB8CD53tsfzuxENfeZHAcT1CBYWc+V5jHY97HoBDvzAp2EIYeBue1fAmGEsbpb64QuxEnVcKL9u3FyUp3m6eqSlP+Ozal7o2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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="4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0" />
<param name="framePossible" value="true" />
<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="useBrowserForJS" value="true" />
<param name="allowRescaling" value="false" />
</applet><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-6217811275513658599?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/b8wlND3aWTMdROk5ctThy_Vp0P0/0/da"><img src="http://feedads.g.doubleclick.net/~a/b8wlND3aWTMdROk5ctThy_Vp0P0/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/b8wlND3aWTMdROk5ctThy_Vp0P0/1/da"><img src="http://feedads.g.doubleclick.net/~a/b8wlND3aWTMdROk5ctThy_Vp0P0/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/6j3lEgg1-_c" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2011/12/la-rampa-en-un-camion.htmltag:blogger.com,1999:blog-5932372752540433762.post-68583960786918204622011-11-29T06:55:00.001-08:002011-11-30T08:12:08.905-08:002011-11-30T08:12:08.905-08:00Sombra de un edificio<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar"
codebase="http://www.geogebra.org/webstart/4.0/unsigned/"
width="507" height="548">
<param name="ggbBase64" value="UEsDBBQACAAIADpRfj8AAAAAAAAAAAAAAAAtAAAAYmYzNTViYWIxNTI0NTc4ZjhiNjNhNjQyNDQ1ZmU1ODkvZWRpZmljaW8ucG5nACdA2L+JUE5HDQoaCgAAAA1JSERSAAAAgQAAAOgIBgAAAMhbh8IAAIAASURBVHja7L13eN3XdS2oeZn53pdM4tiWbXWJYi8gQfTee++999577733RoBoBEgQAEGCVaQoUlTv3bZs2SqO424nsWM7drxmr01RLy9vyjeDvGTaH+f73XtxL3Bx9zprr7XPPufeB+C+HYwvy/jKf8B4QMbuHQ4jGSYyrGS4fj5CZITJiJERK8NRxsF/9TrDz1/37z3M/8X7/F8b/5fjeN8OQfBvPn7/h3++7wc/+8193/3hr+775qe/uO+9T37xn9/63k8ffOvjnx96/v3PrDafedO7d+5czMzmrdyBpcu1LdObfQ1jZ+cqh1Y3CzoXrme1zr6SVDfxWmT58Dvema0fdSzf/CiucvhnKfXjv8hqnvp1VtMkGsfPom70DOqGV9A4ehq9c1u4+uI3cf7mG3jm1W/hzhsf4s1vf4r3P/ohvvPZz/D9H/7iR5/87S/e+tnf/ePFP/zxn0/I+2ySkSnD7/MAPSTjP/3f7bP8fwQI/vQn3PfTv/vtX3zw2d9bX3/zB9nDG69Mty4+d6ewf+s9m+iqv7GJLP9H86B8PGwWjK8f98FXDTzwkIkvnrQKQef8VRi4xuKIewyOuEbjsFv0F9fDLlE45BoFA7cY1E1uwCo4E2aBaTjmEYeDLpGwDcuBqX8arEJyYRGQBXP/dIyu3UZe0xTSKvoQldOAxOJ2pJZ1IUVGXsMYCtum0Tp9AXOX30DPwjXMbb+AtRtv4Nor38LLH3yKDz/72R9+9It/+MFvf/+Hl+R/25IxIqNGRoIMFxn/+f8HgYzf/PYPX33vox+7rFx8ubx2aH3FI7npgyOe6X/cZReD+4/748/3OsPYLxtuiXX4n56wxl/tc8CDxz3xsLE3DjhE4JBDOAyco7DPKggT67dhF5wmIwW2Qck6bAKT/qth4BSMwVOXYR+SCuuARBh7ROK4W7i+xso/AR6xBfKzdBg6hWHs9DXkNwwgvVyCX9SEksZBlDUPI6emG/n1/cip7UVF9wxmz91BYlk3Yos7EC+ASaweQmLtKLLb55DbsYic9gUMrr+IjvkrOHPzXVx95Tt44b3P8M1Pfv7zX/z9b0c+Z47/z4DgP/3i739ndvv1j2rbJzbPm/tkfWIfVoFvHPXDl3a74MGjvnjUNFAC7Ktjt3UoHjfxh1dCBTLqxvD1Q07Ybx2Mg9aBeNLEC/ssfPC4oQv2mXvjwUM2GF66BMeQZBlJOhyCE3XYByV8MQydAzG9cV1/zvs2/rF6vXffKTgZrmFpOO4YiJmzT6G2ewJFDb3IrWxFaWMvCmo6kFXWJNcuFNR1o6JjHNt33lFA5NQLYOoGkFY/jNS6IeS2TSG/Y1buj2L2yhtIb5xAdHk/YiuGkd02j+bZp9A8fwNnb72HT37y9+/86U9/ypXP6Kv/rwPBH/74p69/+NkvYmY3nl32T236+VcP++Iv9zjjYUN//PVuR+TVT8PSIxUHzCSwRj4S4GDssQjAI8fdsNfKHw8edoRTSJY8b1gCbYcD5l7Ya+KOXccdccDCA3uNnGFg5Y0H9pqhb3YdjsHxcAiK02EfGKvDLiDmi3HM0RfT61dh6x+tg4+5RaTo83nbISAeXlGZMHLwxcSpC6jpGEFRXRdyyxuRX9mMwupW5FY162OFtZ0obuzDtRffU3bIa+hDQfMQ8ppHkN0wiILWMRS1TyGxogurT7+D+NIupEsaCclthldSFQIzG+GVUivMMYK2k1fRvXAVb3z3J7/7/T/9cU0+O28Zf/YfCYI/38Ev+LNf/fr3Vq+8/4Pmiu6FNx4zDfvTE+Zh+J93OcDQJR67jPzwyBFXPG7gjgf22CCvsh/Ofikwtw+BtZvQuqkHdpu44UljV70y2K6hqUq/Dx60xCFzd+wzdsZ+Exe9HjR11fGo/Gxgdg32/jES+GgJ6n+5OoXEwTk0XoepeyBObF6Fa3iiBD0KNn4R+hwOW/9IOAbGwdY3CoZ23hhdPIeGvklkljchu7wZeVVtygS85le3C0N0o7R5QEGQXt6CkpZBBUJ+Yz8KmgZQ2Cz3GweQVduDMzdel5TRjtiiVvgmlcI/tQpBGbUITK9BYnkPOheuwDO5Cs6JtciWFLJ5+2389O9+84l8ns0y9vxHgOD/FCX90x//+cEP/+aXiVvPfft0ZEHnr54wDcGX9jjiy3uccNw1AeUdC3jC0BOPHnGGiUOYzFxfGFh44cnDNiiUWWLnHIb9BrbYe8RGA7rHxFlmuJMGebehA9xCElFY14dHDpjhsLkr9hs7fjEOGTvhsDz/8QPmGDyxBivvUFj7hmtwGVQGl8F3CUvQwJt7BmNu6ym4RyYrSPgcgoGvIUAIAgLpmK0XRhY2Udk+hJSiWiQVVCOtpF6Dn1vdhrya/wKCp156X0FQLLcLJHUUNHajpKlf7xfJNaeuB2effhWp5a3IqOxEbEE94oua5dqog6wxvPoUPONLEFbQDv/sZrgJUzjElqNmcAnf/PhHkin+dFU+633/niB4/P/oSb/8h98ff/fjX7aPn73zjltSM758LBD3PWyJB2SWP2rggt3GkrNNfbDH2ANF9UP4828cwCEzN+w75iDBt9KAP/KkIfJKmuDgEoCDBpbYe9gch0wcsM/EEXuP22OfkQN2H7OFu1B8YW03HjtggsOmEvzjtjhgZKfXQ0b2Oh7bZ4z+6RVYeobB3DsMlr4RsPaPgl1QLBxC4uEYmgDn8CT92ez5G3CNTNGf2QREwz5YZn9gDCy9w2HtHQEbn0gctHTDsDBBWduwBjitrBm5tZIWqjuQLSOnplPYqUcDffVzEBRKaiio65TRjuJ6AqRP0kWPvmbj+ktILW1CXF6tOI0qJBQ2Iia3FvEFDchvGhSdchPecflIrelDWH4zYko7EVfeC9/0OvSduY3MhnFcff7tf/zdP/2hUj7///HfAwRH/vee8OZHvwxqmrnxe4fICjwouT0gowW+qY148JhQtbmnUvauowyik87s6vZR/PWDB3DEzAmGFq44bGyHoxLs3QdNUVbbDk8JmJGZIwxM7O6CQAK8VwLM8eRRK7hJvi6W/PvofmP9HQTAvUEAHDZ2wOP7TTAws6oBJACs/CI1wAwurxwMOkFwYus6nMIS9TkcBAGBQk3gFBQv6ScJx+x9ML6yrSDIqGhFSkmjBj+zsg1ZVe0KgjwRhpzpVyQdECSF9aITBAAFtW0oqesQJ9GDkoYeTR8b155HRlkjwlIKESIjJqcaUVmViM+vQ0ZVh6SoG/BPzFdNESOPxRQ1SOpohmdCEaa3X4RnUoWyBMXlypUX3/zZr35j+t8bBGb/Wz+8+eoncWFZ3X/cYx4KG99MuIXlI6moWwRVOr62xxz3P3lMKNwSjx0yw95jljC0ckG50ONDe47iqIWo+2PCAkfNceC4FR7ZexS5ZfWwc/XHPgNzPHHQCAeN7b8AAa+7j1l/zgSdeGifEQzMnfU5B40cdfzrdEAqt/GL0nFPFFr7SrB9IvQxY9dAFYbOoYl6nz+7JyApFJ1FP7gLa5g4+aswrO4cQ44EPbuSKaATWQII3ufszhdmoHOgJmCAyQJlDV0C2DaUye3K5l793/OqW7B5/TlkVzQiMbcSsdllSC6skxRTq9e4vGpxIlcRmlqEsPRC+MVn6jVanhuaUYa5i88iKr8JUQWtWs9wji1D7cSFP8xvv9T3tz//9V/89wKB/X9bxPnTfU+/+mm2XWDRn2x9smHrnYYwyVuOPkmISq2Ea0CSUD1npw0Om9lgjwSaw8TOHRVN3XhYAv7YgeN48oipPn7EzF5vl8jMcfELl/vCAIZWGvh744CwAsHgEZKggowgIAD2CjD4tzj2G9oLoBwEUCbom1oVMMZqcCnu1CXIfQLAyitcA06aH1vdFvAmi2BM0JnvEpaks58A8BCGIAis3EIwvnwezYOzGnzaQU0FAgZe+RivhZISnnrpXRWORfUdqGgUENS0olh0Q7kwAxmBzmLjym1klTcgtbAWCTkVCoAECT5BEJleghPr1xCVUYz0slqkFJYjIbdUHi9QMAwvbyGtskOA0ACPuGKEF7Rh8PSzcI2vQnTZ0Pe27rzv9qtf/+7fHAQ+//KBP/7xT/fV9Z2p/NpBH5i7pcMvshxuAZlw9U2CibUfyqr7EJ9aigceO4Rdh47LjD6KA8aWeNLAGPuNLFDd1oNHDxnhiKWjsISFiD4rSRkOeHDfMRFbtTBz8cUTRy3x6GEz7DGSNCDpYp+JzHZzYQ4JuqfMWvryB/caqxikTth9zF7HHkMCxVF+ZoreyRU4U92LKLSXlOBIZyBpgGLRyiMY1j5hOGzpgonTF+AVkaxBdxTdcC/4HIGxmfCOSISzAGZ0fh1dYwvIqWhREDKApHayEoc6BLGKN156T+xjq876KkkBpTVtKKpqVTYoEQGZXVqP9cu3kFPWoACIzSxFXFYZotKKkJgvgcwswfKFZxCRVojEnCKkFZbKECBkFyI2qwhDJ09ruglKKUJkTi38ksvQt/QUvJOrEZLXjsiSfsRXjs1vPfv2/b/9pz/+m4Eg4l/W7eMKezpMPLKRXDQIr9BCBETkw8UrAX7BabC280dhcRMio7Pw+O5jMJAZ/tjBYzhqKbR+3By7DczQPjiF+3cdVAAcMGNwHXDIwhHfEHZILa6DpVcIjtq4iy3z/AIEZIHDQv28eslMJQge2CNAsnCTx+5qjQNiEyk2OR47ZIXhuXW4UAhKnudwFj3AIBMA5q4BejV19sP85jUFgZ1PuN7nz2xFK/A1lpIuTBx8YCaje3xRxOZpFXn13ZOa3/k+eL9IFD9BUFzfi5uvfIBCuU36b+gYRqUwH1mA95ke8iqasPXUc/r85PzqL1ggXOg/pUicQn4Nzlx+ASFJ+UjIKkZqQRlS8ksRk5aPyLQ8sapnhYFaVENE59TAN6EQQ0tXhBlaEFfSLXazFhEFXUwRPx4893r0a9/58X3/LMy9UxAk8cbv/umP/0NC2eCYVWAB/OMr4BmSBb/QDASGpyMwJBkeQrFOLsEoF6oKCUvFY7sMsU9m9B7J93uNrFUbHDC1Q33PKB7ab6i3j1q5SQAdNbhff/Kozi7SLx8/Zu2ugefP9xna6HN420HovFw891ceO6IA2GVg/S8YwVYfI0sMzZ6FsaMPjBy89WrjFQoXsZekfFo/z8g0GDsHqOALSMjVlEEwkIYj04t0JlqLu7DyCBUwBKtFXLvyIk6sXcHY4gV0ji+heeAkmgZOoKl/Dg1906hoHcXr3/kRKlqG0Ng7LY9PoKZzCJVt/fp/N/RMKFts3XhJbWNSfj0iMyUdFDUhIkNYIacecfmNWLrwvGiCUpkUDYjPLkdKQQ2S8qr0vY0srKsOiUgrRnR2lbz3AowuXUZUZo28thkRmeIy8tvQNLaJjNZFNMzfvvTxj//+8Z2CIOc3v/vDn+W0LC66J9TDLaoY/pKLLByD4B+ajGCxWpGRqQiSnOvjHYmqynYEBifhkcePYpfYvCeOWKiq55W5vb57HA+Lsj8kyv6e4t8llvDBvceRUdIA7/BkfR4fpzvgoP2jE+BrHIWa6TDIBCYOfsoGx2299Wpg6a63CYzJ5QuwcAvU2W3i5KuzmyDgoAbwj8+BuXuIirAw+UB9Y7NErcvsy6uUWZiL4MQc2HqJlvCN1TG+tI2lrVvom15D+8gSarum0Dt1Bl3jK+iZPK2PEQzvfP+XEvAZtI3Mo65rDNUdgyhv7UNN1zDqesbVJm7dfFXXHeLy6jT4DHx4RhVi85rEJrbg1OVXEJpWgcRCcQXZcpXnxedWIUKAQTDmVXcjmqDJqkJgXJ6AchsxmVXyvEZ5rFYEZzNaxjYQWzaC2ukb+PjHv/6HHYHgV7/+ff3CM59suqV0IKV2GoYuklsDU+DiG4PQ6HSEiseOiEhBiORSb/HWZaXNCAhKxK49xmrjGPBHxf7xysCy9PrAHkOd2VT79+wfA0xqDU/Ol9xuo8+/ByCChM8/ZOYiFjEBLQOz8hw7GNn5CDs4C3N46JXFo2PWnpIOLCSHb2peJ82bewSpNiALOAcnwD08RYPuHZ2Bi8+9rdaOhZ2sarF/krPdxCISNAZWXvASpovLrsbqxecwMr+F/JoemdljGvy24UU09s3qtaZzUgI+gZfe/xuUt4zoOkN974QwxLgAYFQB0Ng/owWljadfk785KEFulNlcLcFvENFXiZjcRh2LYgMDEouRXNyM2NwaJBQ0qI0MSSnBwMlNsaadAtwyeaxGwJyPwZMXEJ1Fkdkk+qJBr82j66gcOofw0nG8+9GPsSMQnH7l578JLptBUMEQHKJKEZbRgPCUUhGDMQgX4RQWKY4gKkXYIBkBAVEoKWsSEMRjz34zBcEjB0zUIvLKoHN2MMCkegbe2N4bZk5+sBcAkSUoligACQCCga/h6/doSnBSELQOzmkBibP/XgrgfaYFPvbwflNNB9QATAcGdh6w8AxWFvCJyURwcoHO/qN23pg6c1ntGJnBU/6PgMRsFZL2vlG6ZkA2cA1K0hRAEHAGM8hV7eOaDuq6p9E6tKAAIDu8/MEP9Wf1vVOoEk1Q3yts0ElQjKm7YBo4c+0l5NX1KggYyKjsWp35BEBUdj2WLr4E37giJBQ2axHp3jU0pRxD89vIrurV20wf/nGF6J/dQkx2gwLg3mgZWUft2DaCCgfw9nd/tDMQVM2/jH0eeYiqnEBgdgs8owsRlV4OX8ndETHpAoIExMWlITHxLiDKRRn7+EXj4V0G2HNENIHMZNI58/pRCxd0Ds/pfYotY1tP2HtKrhYb5yUWrUlyZlxGiRZ+aP+M7X2V4hloznwG2tE3WthkTCyiiTIAK4n3BCKZgo89etAcIyc3VGwx1xuJzyf1s4JIe2gheZ6PEQRMB+Fiy2gLWSEkW5i5BevwkLThQg3hH6N1glPbt3RNomdqBe2jC6oHGOzW4ZN65Xjrez9VfcCfV/eMoWlYniMM0Cr3++fOolaes3XrTVR2TqiwixImYCq4B4LIrDqsXn0NgUlliBRAhGdVI05SRHRevbBFNUZPXUNu3ZC8pkZe3wD/hBL0zmwhPq9VdEGDMIKwS3qtgqCgaxlJ9XN4/5Nf7AwEyV1bCCgah09mO4KyWsRPZ0jOqYabfwTik3MQGZOIqOgEREbFwz8oEmWVTfANjMWj4g72H7PRgLK8y5xuYueFvoklvW/lEgBzR18Fgat/tAKhTlJFWEKOAkCfLzmf9H6vbMxhT93RNiJC0lBTwJNHbfTK5xAoZAP+jEreIyJVq32sBxx39FMhSDAQCLz9qIEVOiaW4RWVDlPXIB0MvolLoD7vuLzWzidS1yvGlrbQf+KMrhQyyARDRduwjqqOUaH8cZS1DOLNj36i9wmM1rGT6JwSASm3u6dXMSZAIgiYDmp6pkUL1GvJmEwQkVmtmiA0rUpB4J8ojqCwRQtD8SXtiBaABKdWY3DxqqSDAQQmVoiobIBfXCl6ps8jsUDEYnqdgiAqrQbt4+dQNbKJ5IZZvPHhDpkgpfs87BKaEVLUB7e4MgSllsEvKg2xKTlISs1BbJykg+h4RETGISg0BvViiSJiMrBf8vgRE0ccNXPGcQnCMXMXmNp6oVdmBMHB21YyGy2Ecq0lILxfLfkyWPI0X0egMKgMPK+c6bxt5xWhIKAD4IznlbqBKeNx0R675e/e/9gh9Eyckg8oG6bunPWBEtxQpXdW/6w9Q2Dm4q96YXz5nJZv6QTs/eNgYOsDA2EgE3E6fIwgYGoYlFnMUd46pPmeM523WUVk8AkMFove+fjn+jhB0DQ0p6NCQNEoqYDL2wUN/Zi/cAtlwmYEQEppq2qCmNx6VfcEwdr1NxGUUoGE0i7EFLWL9etEaFY9vOPL0TV7CSllffCRWASLHfSKKUHnpICgsAvhabUKgsiMenTNbKNqaANF/et44d1PdwaCzMGLCKuchEdaE6ILO+AnQiQyORdBkYmIEAaIiU1ESmomsrILkJFdhKGxeSQJpR8yvBtoDnOZUcbWHjAT+u2SD+XJQ+YKDkuZnbxy7DtqjQoRZ4Fi3Vj/Z8pggKn0OctJ9byyelfa2K+znbmfz6FeIBAIADLPw+I0xhbOifjLgYWAxsIjXNJCjDiFALV894pBLEC1jcx9UbYtbh4S0SjWUSwhgcBUYCspgq/rnjyly8kEAAPP2U6Rx9sMPkHACiLTAe9TBJIBGiRlcM2hRdzCyNIFbTzhKmKnMFVEZqUCITqnToGQVNyqmuDi89++mwIKWhGeK/ZRqN4/tQaesaXonruMzKoRBKfUCVtUwiOqSNhsS8v1YfIcZQJhiL6TV1DWdwZVoxdw583v7wwEqd2iMCsmEV05isj8FoSmlyIqJRfRCWmIT0hBWloGKitqUV3TiPKqRiyc2kKqeFsG1cjKHTakVgEBAcDrsNAitcI9UNxjBLJFg3ywAULhfC01BAN9/67j+Mrjx/DoISs8sM9YZ3JT34wuJZMhnPxicOmZV3HM0hV//dA+BcJffG2XVgzt/GLxpLGzzmpj5yActfHEAYLPNVAYJUxrDr2TywgQxggVsUglfszeD4aOgTByCYIlU4eA5oj8H5z5XP2jDqB/57oBA8+SMX072SC9tAkvvPeJPkfZYnxJ0w0BQF3QJVqiVFhiaGFLALIggrQE2dVd6gJShRHy6vokkBVYv/6GgiKtug8p1b1IqugVIDQjKq8NrZNbyG2cgkdMqYjYariE5svf2VImCE4WbSFAoF7omDonIFhFSf9Z3N4pCNJ7zyOicgox5UOKyvD0MiRllyA9pwAlpZUoL69ES3MH6upbUFpRj+mFs0jMLFPKP3jcToNsIh8+AcBgT5xc18eZBnjlSiKfwxSQV9YMB/nQH9lz/O6qIJebJYhPGNjiyWP2+OquozgsYKlsHcbXdh37onRsKg6DbsXWPRhBkoqoPVgnoJ0aElU/vfYUembuCrrh+Q0tAQ+eOK0l2/Wrz6ngaxGG6j1xFrPnnsbI8kWh5Fe1hs+fkQX4undFYDHnf/qrf8ZLH3ymvQP0/JfFZi6cu6G64JnXP1QXwDoBl5PJAkwHXGomM3TK7zp7/RXceuv7avsIPPYs5tb2orCuXx3DxdvvqFAMSa9AbEmLpIUO+CaV62gYOYuchglY+2fAJ7YcTsG5Ijo3RR80ISipUoFAAUkQVAycQWnfWdx87Xs7A0FG3wUFQXTZICIEBDE5lbraV1HdgKqqGlRVVKOxoRWVVfXIL6rG+OwqkrLKdTWPs5LFHi7y3Cv49MvM420btyAY2XioS2DQKBKrWkTwRKertWSOf/iABfaZucJEZiYLNmbOwQhNKsLWjVcQmVqMzNJGrSv4hCXBPzIVcWmFwj6uAjZf7Sc4JD7/qGMADtv4YK+pi85oUruBsAZtqaH8/aHZM/AT22ghgtDSM0JZwDkkDY8I8Ggpj9l6qH5gP8CV599Cfm2HiMFB9f2TK+fFNWwJEF7GysVncGLtEn78WwgQvoWXv/kpXvnWZ3j7+z/BN//mVwKaT/D8u9/T53Ixim6jrmdS2YPl5+yKDoQkFMAnMhPz6zfgGZmhy8pJwjiJJc0KiBDRCzV9Syhpm4VfQoWCwC28EO3CDiFpdcLStaIlBATCBO3iGGqGzqCk7zSuvvjtnTNBWPkEokoHVK2mlTSior4TjS2dygIlRcWaDoqKK5CTX4GxGQGB5DqCgLOZgTa0clM7yGD3ji/ikX1GCghWFGkbSeX8WVlDDzKK6hCemKuznUUazpTItDINvoVrqIKhoWdKUwWBwlIymYDp4/5H9iOnpB5PHDDWopRXVBacQtNg7hEBK58ouAQmagUuRjRLenG9fOg5aBfLShHHJo/S1lG0ja/AKzYPx52CcEQYjItOrsFxWvDhOkPL0Al0TSzKa2b1MQKCuoKgKGvp10D3TC2jb2ZF3MSqiMkz4iw2MXPmorDFU9i88SKuvvC25OmPcO35d9E9vqyWN6OkCZFJhcJO5Vjbfg4pBXW6ahiSVoCYPMn1eXfrBXUDBMEMXMPzhfZl9ifXYuTU04gv7ERicac8t0Vut6J/6aqCoLh7BZee+2DnmiC4ZBRxFcNIq+jRdfPaFqG2lg401AkgyspRI6xQVl6D/MJaBUFsSol2DFGwHbFw0aIQ1wJYGOIMpYjjTORgkwgXhfyFARp7J9V5fOnh/fjyo4fxjT0m+MtHDfCfHziAhw5ZaZuZR2iq9grQGlpLbrd09lcgOXqHw48VQrdA2LsHYeTkWTgEJMDYLRxHbCX1iNU0lCsXabj6l5RThoikHGWCDElDLBaxXh+WXq5dPWbukVpXYOWQi0oM+tz6FQVB7/QpzJ69rMHmbQ4Co7x1QGc8wcGRI3aZ6wYtg1MYmlvVdQSWkWfXtjF3+iIqm/vRNXISG1fu4Oqzb2Dz8h2MyPu5/PTrapfjc8vEPUi6KGtAoDAeS8ytY6uiATaEpbIRkFSlwrBHHENcQQciRTfQRYRl16Fz9gKqBlYEBMs4f+u9nYEgqWMdYSUTSK6Z0k0WZU0DqGvtRUNjK1qaWlFdWYX62iZNB4Uyu0ZF9UYlFuLxA5Zq6Ui9BAIBYOESoMFhCdjWMxTB8dki7KK+qB5Wtw9rowVpmiKOQdtj4oKv75PUcNhaQUE26BhZ0AISQWDnEQL3wFhNJwamDuI0HHHIyFY0wZbQZS6OOQXjqH2gKn4r93DE5ZQjt7wZidmlcPIJQ//MMrLLW7WMHCjvO0CGW0QOTN0itKDEtQdWHjmrmQ54HTq5pgCgvRxd3FAAdE8uaVXwnY9/qr2IXCNgZ1FV+4AuHnWOzSkgShq7sLx5FbOr55Epn1et/M9NoiWqmvpRVtetumhbBOjW1Tu489YHOHP1afTPLosjaFJWLGsbQ9PgKUkXBfCOLoK1b6qww6qAoA0+iWW6tBwg4rJlckNBUN5/GtvPfrBzEERVzCCjcQ5FLVOoaBlBveTHulqhppp6lJeWofZzJsjNr8ag0Ft0Sqmu65s6+ms5mIHmwhB7ASaWzimNM/D36PyeWud6PXM8S8YPHzTDrqN2eEzGA6INyAR/9fBhHLbw0BU6OgOmGbIAm1AcvUPFctKKugkLmaBnYkkDesjWDwetfBQETCUMqGdwvAjINNESCRiZP6NUzDUFv7g8BEracY/MhXNYunYmccmZ6aBpYBrrTz0vom9G6Z2reWQHjsb+KS0NM/ivfvsHepupgUFv7BuT2X4CPQKCqaV1DAnoTl+4rqNWmKOtbxJVkgabO0fRMzSLWmGH9Qs30T8xj7rOXpQ0NWNs8TQu3nkFF269jonVy2gfOw0PeY8xOc3agt84fBp5zRMKgtCsWoTl1qN36ZKkg9OoF+ewfedbO6wYdm4guuYEctrmNReVNw+jrqkXtXXNqKmqVRAQDKVl1cjIKkPv8LykgzIcNfeAubPYQ6FrMgEZgTO8b+qUBt5F1DwHbRoBwHTBPM60wKVkAsjYQUSdtRd2i0PglemAvp0guP+JowoC6oHDpvZiMV3EbdgoE+w5Yo72wROSL4thH5QMS68otX7Okh5YbHKQv+cdGi+i9K5GCYrL0dKwR0SGagEzzyiYeoTDQFyLa3AMwlMLZLbPY3HrugR9Rmd/hwSVqYE5n6mBYOBawdOvfqCt6Z3jJ9E9NY/J1U0sbV1F79QCls9fw+TiWUkF53H51stoFoYYOXEKPcMnMDA+jwYBTlpWKZZWL6BrcBLj8wvCju2o7ehBU//o3eVosaVTK1dQ1jqBtNIusYiZqB9c0T0NrlG5CJSUEZxVhe6FbdSNrKFl5hIuvfjdnWuC5JZl5Hctyx+auVsibe5GTUMzGhsbUVpcguLCEpSVViFbKHZMghzNGShMwPIv+wl2HTXXwUBztpP6nf2jYSUOgSCxEUonMAgCn4gUZQmChmVbWkIGn+mBxSKmFLqIP7//CS0qsbOYDabGlu548oAZjCzcsN/AGjNiDT1FaVt4x6g7YOu6tQhElqFpJe9piWbRISyDs5poLO7jmADvuEso9gvjmLlLGnHyFIBEoGvyJM5eexaZYoMrheKH5leFASZ0ibhK8nwpu4ja+vDitz5G/8lVNI/MoHtmEcNLa+idmRdAzGFm7Zykh17Mnz2P9StPo6FzAL3yvI7eYbT3DKG5rRu5BaVYWD6DkYlptPX0oK2/R2z1AmbksSkB0OTiOgZmxNFEZ6NnegMFjZJORlaRWtUNf2HgiPxaeCXmo3t5GzWja+hevIHN29/auUXM6DyDot5VFLZNakm0qrlLQVBbWysAKFIQVEg6yMurUBBEibreIzmcFnGfsQ0MrJxlVnvqjL8nDI3EDTDYvBIEZItaoURXye+Pi2vg8jIt3X5TJzxpaKsbQAxtvDStDIn4VNt5zEYLSwz63sOWMJOfEwzfeOigzK5FxOfXKxNYeEZqSZgfnJlTgGoJsgEdCQVYkqhvG69wEYKRXzCBsUuI6IIAOAdFwjsqEdVdg1g8fxXlbb1oHBhHbc8wTl28rmAgKAiC9IoGXH35bXRMzmNocQ2NI1PomJ4XWzckgZrAmASyuKkdc2c2sHH1Bhq7+tE3Oi0gGERjWxdaOrpVcF++ch2TJ2YxPDmOpu4OtA/0Y2BqRlhjCcMnVjTV8X+JkhnvFp6J7tlNDCxfQkB6KfzTShBeVIuW2XVUSZroP30b5+58uDMQ5A5fQW7fJkr6z0jeGdOO2rL6NlTXN6GsrEJBQKtYVVmPjIwi9AoNh0dl48Axe/2Q2Z51b3Dms03rnjtgeuCM56AOaOqb0r4+MsVxsZTc9MHdRY8ctNRiEesG9Pl1XRP46uMGknLcEBSdhbq2YYSI1ycgvvSNPfjKA/tkBs3CPTwdu0xc8Zi8lvWGY2QEw7vt6bSsFvIe2L4eLR8e1wmMBAB7uIvJRtwEawz2nnjcwAx7BciF9R1YljxOxZ5cWKX3mSLY83dBqP35d78rwvENvPHdv9FUQCZom5xD14lFVHUPoWFwQhkhX9LoyNwyljYvoq69B2Py81Nrm1hYWcPE9En09I/gmVvPYXFlFSdPLYk2GEXv2Ci6R8eVOeo7hzG+uKlL2uwrSC3rQLqwQEnnFJqnVlE1OIfg3Cq0ndxEhaSJyQuvYvPOd3YGgryRK8gf2FIQZNUPaYm0sEqsoeiA6upalBSVorioHMUllUhKzVMQhApKDxqKMzC7qwNMRbmTxikSqQkIAj7G4JMJeJuPVQjN8znsJOaCEYPPwH99t4lev/qEIYzs/dE6OK/u4JiFO46YuiA9v0bsYbKWqHllCXpcPoT+uU3U9J9Ey+gy2iZOYXB2Q1cDaQtZtGJD6OLmU1q4YTWvfXwFnVNCxZJzWTVsn1gQAbimlE/qf+b1DyTnv4ePfvprvP6dH+j91Us3ce3Ft7By8Wls3XwRl597XRzEKdUOGZUNyKlvRWFTJ8ra+9AxPqNjamUdl2+/qBQ/KGlicHIGk7MLmJ5dRN/gGC5du4HpuQVlgDYZw8IKK+e3ZVzBxPKGapLg5CLk1fcjKrdO0vQEmsZXNQ2QDTLEaTAdVA6dwsK1d3HhhR2WjQsEBAV951As6YC1bFa4ckrlD5dXq00sKChCVmYe8vJLkJZRgpHxUwgXa7abvv7o3f0CnNn3qnQd4otJ9ww+dQAfJwhoG5v7p1UTsJOIQX7ssNC9mRsMbMSqiTU8YinpQMTb/MbTKvI4g0MS8pCSV4VgYRBWDv3k9V96cDc6R+eFKtNh4i5WzzlY6wSsOHLtgX+bf89atAF3GEdnlunSsZlbmIpIpgPqCPYXcMXR0j1IZn8NTm3f1MohHQJFIYtHrBQ+985HWBNLR/dw5+3v6v13P/kJXv3uZ3jp2x/j7U9/LGniLWw98wKuvPA6Fs9dwjOvyP1rN7EgOuHE0hlMCDuMTc+JNhjA+vlLmD65iImFebHUs0L/E+gZl7QxPKk1B5a/nYOTtBchq7ZP0vQ46oaXtMTMkVTTieF1cR/Dq1i6/i42n/9oh0wwdAm5PWvaoJBS2aO7bzKLa5BfUqFrB/n5hSgqLJPbVUhOLUS30FFIVJYAwF5nKbuE2B1EuucHT/F3/xNHFAD3loB5ZaNpVduQNlXSJsblVGoHE7tn2DrFThpLt0i4So7vHFvR9YRdMpgWDC09tNTMBpZoeQ+P7DNUEDiHpGidgKVgx+BEoc8OXShi0yabWn0jUzWYTHHsO/SU901HwYqhnX+8FovYn8jB/Ydnrjyrm0oIguH5s2ob2ULG3UZ8nPsRN66/oDUDPk5dMHpqHaev3cKJjYuYOn0Ol557FQuSCl5870N889Mf4cPPfoQ33v8OFs+cE7soArOqDvOnzmBu5QyaenoxPCdMMTMrqYeNq+NoE7vJbqjg1GI4EAjCBMUd4kZEF8SVCqCLmhAtE7V35RLqx1Yxe/k1nL21w7Jx3sBFZHeJD+1YFAUqFqasFVkldcgprkSOzP6c3EJNBaWltUhIyhNFO4Ugma0HjZx1V9DdlvC7/X8UZWwNY8n3bq+AnboDBp2Vw1ZJJQwMK41/9chB3L/LBA/st9Hx+FFHfGOfpc7WlsEFTQ90DT5R6SoYHXyitCBF3cEAsyHT43N3wNnNPX9cUGKPAZtIgxKytSWddo5VUNYEXEJTtcBEMWnrF6c9CGwwYaNJQkEtNm+8rKuFvdOrmFu/pmnk5MZTYhfntUzMKuGNV97XCiJBUNk1hDoJXNPApKaHCkkJPdML8v4nsfHULTR0D2JsfgUr5y5i8ewWzl19GgunN3Hu8g2cPHMWeZXV8ve4y6kaebUN+nqmqLnN6whIKkBkTjXCsypVDwyvXkVCeTuSRCck1XRjdPNp1I2uYGjtJk5efmNnIMgf3EZmx4qCIL1mUGcTN07kllShqrYJmVl5SErOQFqmzLC0Qi0Whcbk4YmDVhIcny/6ALjaZ+ESpG1fDBp7BVkipgCkS2DfISuG3L1DB7BHbB/PH3jyuBu+tsdSgUAQ2PrEo2fyDB4/Yqv9fywe+Uamf74z2V41yJcfPShUfR2+cXkKgr2SUqx9o1HdPaVBZWu5X0y6dhXT59f0TGrTqX9CgfZL2AYk6uEUB4VhmCbYmMpm1NtvfleXibsmlnVlkbcJNlYPWUkkoC7deUNvky3qxNe3jJ7QbuPuyQXUiEBsGZ5C3/Qirr/0FmrELjaKNeSoae3CwOSsCNoRLG9cwKWbd0Rj3MbVF18RV3IRA3NLqO4ZQU3vOCbXLiM8s1xBEJxWKmm6B80TpxGWW4sQSREB6eWYvngHNeKQOhcktZx/cYeaQECQ0bqM3PaT8scGdEs1D2bIKq5CnrBBRnYB0rMKdfEoKi5Li0W+IWmSCtxkVobBVBS3pVxZ7nUSih0Ssca+gL3i8R86YKrr+1yk4WYTVtwYHK7c7RL7Z+YagYMWvnj4kD3u322BBwUEVu5RIvA2xTW44ridnwLhkIWrDlpKA2sPBQP7/did6xiUAmufGLiGpyoTsDzMZtL0iibd59c8Mqtr/Qy0lwhapgQLz2g9pYS20icmWxtN2B18+YV3dedx38xpbTBhsDnjqXPobAjis1fuoE1mPW0jK4dMGQRA38wy2kdnMTC7goETy3jqxTdR2tSFyrYelLdIOqluREl9Myqa2zG1fFpE4CV53YxY0m60jkxibGUDJ7euYnz1vO6f9I3PlbSVo0Co6J1F9cC8nnfAncxJld1onFhF7ciSMMIzGDl7Z4dMMHABWe2ipDsXFATJIjx4REtGYQWyCsu1r4AdRVl55dp93DO0oCAwMPUQevYXMeeJo9beOmMpzLrlzREELALp+oD4fy7SMPCsurE6x+1hD+43gbFDIAztg4QtgsXe+etZBo5+8egYPYWvPG6oLeG0kCwqsZL4td2GCh6tPnaNayfvYRs/pXZDSUVNQ/NK7V7RqTBx9dcu5MahGQ0sm08ZeALBIzJbdcRBee8uIcm6rMuuo3PPvKaHT9xrMmWAmQZYAKPWYcv82au3sbR1Tf7Pef05UwUdxvD8GQXA4NyqgOAUrj7/OvJrWlDS2KlAyBMQFImTyCirRFPvIFqHJpBT3YBscWLlHf3iLvr1rIPKrhGs33wNDUMnUTswp+mA5xuQCVKrehEuGop9iQtXXxFNsISJzZsY23xuZyAo7N9CbtequINTqgm4h545NzmnVEAgbyAtB7GJWUhOL1IQDIydUhDskxx+XALAGctjZEjf3KbONm0uBCkwBAh3weAuftxCF2CYq8kKBMc+YxccNHPHMSs/GFr7ytUHroGJ8qGfEkF4TPccPnHERkvI3IxCzcEO5T/768d0YwhXBY87hWj1zzk0GSZuIbDwCoNHVAo8BQg8jKJuYAqJxfW6YdUxKAm7RGfY+ScqGAgeJ55fFBiLwuZ+LG3fUmHM1UJS/72lZG475wbU0qZunBbLyMUhqvj20ZO6uMSeA7IGxSRrC6wjnHv6BQlyk1YgGejorHxklNcgWex259gMBk8uiyguRlJxNYpYoe0dRW3fhGiMScxt3dR0kCYaoKp7WtjsFFrEIgYml+tKL5eTy7pn0Ty5IqngNia2XtgZCEqGtrVZsXzwjIIgMqtKN1Byb1yyvMnYlCzEJWUjgWvfURnoEwoiCA4YOmPPMUcFgKGtn85qUjd363z5saMCChs8csgcj7Et3chWbpsqtTIdHDBzVCCQSYzs/FRbHLHw0D2HDkLtHfI3vvyogTCErz7O1cpv7D6u4pMahA2o/TNnEZlZCXOPKFh5R8MtIk1toqnYwhTRNJXdo0gurcfMxhWZWa/g+W9+hmfe+lh1AdMBQcAU4iDahTuZ8xp6sHL5js5G9g7QVQzMntZZzu1mzSL+aruGMb50VkTdBbk/oQzROb6gi03sOeDqI68EwvbtV5AiKTW1hKKvRW+XtnQit6YR/bOLGFs+i/yGDq1CxhdUIJus0dqPys4xLF26g4isCiSKEyAzFzWPYu366yhtm0J27aB2IXN/YvuJNczJc09c2KEmKB+7iNLhTVQOnxWL2IcQmV2hyXkIjc9AdEo2YtNykZxVgpTsUgSEpaCjfw5+oaLYLbz13CHS+GELT+w57iS3fdEliKW9U50g1Hy3789RdyGTPgPiMrVCd8jC+W7z6BFr7DGw+WLruZ17GNqFBr/6yGEY23jr41OnLsHRNxZfeviw6AFn/NVDhyRlLOvawRPHnbUEfMDKQ/sGH5Hf6RyeAJ+ETMQUVKJWZmzbxBJq+4W6BaCc/Y8JeHXtwCNMt6zzXIPI7HLMnbumM5EzMkXc0MVnXxUBegUvvf89nFy/qMGn7aPir+kcRMvAjKaNjrFFbU0nIO4CaFpfS93AdYe6/jEJYC/qB8ZR3NKNvpNLai1Ty+pQ0TmsYpD7F3goRmRmGZYp+nqmkVPTo1XDBKH/kcVLyJL4VHcvoKB+TCzpbXTPCiAvP4fZ7Zd2BoLKicuoGD6nIEgq79GZwsZMv+gUAUA+whPSERabjujEXO0U7heq9g/L1HSw38gNTx5zwgERiYfMPSTw4TJD17USSK1AMce1AQMu/xpaqzCkbXviqLluV99/3BpPHjGTYaHrEGwpZ6dSQ+cEvvaYAR588rjWItwp4mS2h4vHNxfdQeYoqO3D8MJFUdSzkken0DSyIIE+gTLJ3QUtvaiRmUsQtE9L3jwjH2BNB3pnN7SzqH5gAV3Ta/r8erGt+Y29KO8cxRvf/zHOP/sarr/2HrZuv4w1yf+dE3N4/cNPsbJ9DWuXruP7P/kV+qdO6vIxt6zf60imtWRqIBMwHdx87X0UN3bpmkNRc5fM+nZhmQ7k1beh+8Q8ps9eQE5tu9zv1K1xLaNz2rjKE1GmzlxVsVrSMiKCdUhSSKu4h/O6ASWjvE9AIb9j5hy6yASXn8WJ7ed3BoKK8UsoHVhH2cBpxJd0wjsmR725T2QS4tILEByTLPQfJ6kgTfcMjMiHRxA8ccAaB008ZNY7YJcAgmAwsg9QJvj6bmMVdH/+wF5NCdwGzj0AzKG0b9yyftSabWfOEmQ7XSY2t/fSXgEPcRKLoo7ZExCTWiJALEVgVLb2MMSklsHUzh92bpHoGF5GUmGL2MQC7RHwjs2Gb0KeMIA4gNg0BKTkwswrGPkShGaZoTy+hoUiWkMr71gtFnlIeiMTWHiF6MFWq1efVSYYPbWBU5dvavXvzjvfxjMCipc/+C5uv/YObr78Oj752a/w3b/9Oe68+R28/P5nuPP29/QEk2svvoPlC0+rmGQ9gWxCmk8XXcDgJ5fVIK2yHtV9I+hfWEVMbrkeh8OWOLaxZ5a36G7kBRF78SJ6ozMqRYsMiLgcwdTKNaQVdYnF7pdrD9pGz6B9ahUnLt4SXbBDd1A2cgkFvWtaNo4p6pRcmQtvmfG+4YkIi09DRGKGbkSJSynQun330BICwrNw1MxTBR3F3QFxChR45i6hupGTmuDRwxa6s8crIlWrcdwKzvYtngTGUzkScsuQVlCFxKxiJGQWISo5R1vHrJ39tCWLfYm7DlniuJUnDOR38xAsE9EeTt4xykI17ZPwkPdh5BwqTiBcU4KJeyg8RHMwHdgFRcPCJxQlQse14umN3YO0RkCL6B6RBfuABNUQ9oHxun+RW9nP334D5e13vTqFYW23zMSGThTLKKxrQ1PPKObOnMPC+gVlAjbQnJGczCLTVbGXbEDdvv2aNqi+/M2P1fKxktg4NKmLTAniuAgC3p/dvCQ5v0ZTD2sUbFvnMj57IdnhnFbcrLuUUwpFFxQ0om96AykFbSLa2+XaIbZyRcTiMqbOP43xrds7XEXsv4ic3g0UDZxFWF4bXMIz4BmeJDMxBqFxyQiOSoBXYKRcU+DmF43esRV4BqbhicP2emDVHvYVSJC4CsgmEe7rZzWQNvDueUC+Wp+nLuAHy2reflMH0Q+u2iySklchKcDt8yYQH20tn1o8r/rAyjkEjl7RcPaJhYtvnLBEsgAxE7auERiePY+QBGEGl0h1CAck/dj4xcA9MlWZwDYwQgLvh8LWPhRLGuIBVxSDrBp6x+SJRQyGt9w3dw+HqVMwQhKLcO2Fb6o9bRmcR0PPjLqULrFhbHJpG5pFSV0XnpfZv3BWPL7QN/dHsJWdjSBMC3QVbDzhgtSr3/5Ur+OS+4cX2AL2ImbXz+PE5gV1BmeuP6O2MFVYIr6wGjl1HZI2elFBi/j0i3pYVlSWWPTyNt0Ay/pLp7iEtMJmZBS3auNJ78lN9C1fwMj6rZ2BIKf/MjK7N5Dft4bQ3FY4hqVr8NyDImSG5okeSIarTwh8w+IVBINTa/AOy9I0QFvI3H+QJ4iIPeRGDnrshw4Yi7f30v49OgPuBHpwv5FaxPjcCm3xZjmZ7V/p8gG4BUTB3jP4i/0FkwtbMut9YC3MYuMaBjNJM8YiOs3sAhUArFE09y0gOb8VJs4SbJcImIoQZdGIZxi5SipzjUyAW1SigEA8elOvnlzmIPaTzwtKLoVTcCqqu06I9pEUEpkjM30QT7/yERr75lHdNoGG7hOoEFXOFc1+nlkwLOKvcQCXbr6OiYUNPfaWICAAOKgLKAoJdIpBrkbSEeTXtYpDqBSH0KR1gYr2HvRMz+LC7RcwtXYBm7dfwrAAZX77KRGwC2INizEmFtQjMlnb/4MScnXtY/bMFe1UTsyqRHlDv26Z7z25gQ4BR8/y1Z2DIKNrHXm9ZxCS0/I5CJIkGJGiCfIQnZQh9B8v2iAVLj6RygR+kdkSfB89Ypbbvwwd/LUOz21dBAHPJCIIKAjJCAw6H+MsYVq4BwL2DhoLI1g4eukJZ9xT4CLaYWBiWTes2IgI5DATq2hi7Q1LhyA4uEfCwMQNjZ0zyK3sxz5Tea2lr9I7QWDiFqSHWXqLmLUPjkKCWLSKrjE9yEoXjcTGMuW5iMOx9IjGcYdgTStppR1Y2r6DRgk6F7DqumdQLTOwqK5PR05Fmx6ecen2mzh94aY2yJAhWLTiljRuRrlXXm4WR3LjlXcVAKXiBtiowppBSXMHChtadbl5efsqek4si2DsUmfAHc69s6uYWb8sKeSKsgoP1mR5moWqmVPn756VJNohLa9al+wHFs6hXRxC9/KlHS4gDd5lAuqC8Px2uERm6W5f95AYBUFoTBIcPQJkRvppOxkbUd1DUnHcjucTO+Gona9u/GAdnkzAWcGdRDyMilVCpgOWjXmbDZus5/NMARMJvEdglO5+DoxKFtoPhrN3mLBNpAR4RM8qtHUNUhCYihswEsYhGGwl9xMETTKLmR/JBPdqBawaMh0Ep+aL/QuCuXcQIkV7cIYZOvlpuiBYjgmYqCNsvONg5yusJymmvG0SW7fe0iN1qzsm9VCKmo4J/X8ZfA42uyxsXMf82mU9mob7GbjBhCmB6w1cp7jXn0h3wNPJWCzKqmxAZEa+MEOF3K9Fy/CEdi2FZxRoCkgqrkVGZTPSyhuFpXK1p5Eug53bjX3jaBaNsrJ1TfRZlp6Y1jU8g+GTpwUEG+hbOo+RtRs7XDsYvoq8/vMoGdpAlKhP95hcXWzxktmfklsifzgNrn6h8A6O01O++qbOCH1mYa+Rq54/zPHwYSs8Kl6f+wHbxDN/6dFDag+5brD7uJ3WBKgDOkZnRfEWipX0h4WAylauDu7+ElgfuHgHy+1A+ATHalPmESM7WDv6wpJnGBg7Ys8hsZEHzXH4uD2e2GeGquYREU0togfCFATaW+AWoieV8uhaIxc/PeY2raJJbOMQ9po7a3GIC00EDF0QX+cZlaN9hzwkYv3Ga7pNrKxtVATimJ5QwuByxvMwq8rWQcyLc1neuqFrCfwZAcDCEmcs6wS0iTy44qmX3kZifgWyK5vE17cht0ZyeXmdMgJTQ+/MooCgSFcvSyRdcebz97CgNnP6PHqnFlV3DMi1UbTFCUkZrT0j6OgfR31bH5Y2LovVPI3RNRGf2zt0B0Vj11A4dAFlI+cUBK5ix7if3zMsDgHRiaIFYu/O1uhU7R5mkcZehNpXdpkIC/hpUwhZgO1dNj7RuohDd8Ai0RNHrXWN4OGDJqoTuDGD9QczZx/YugfAToQbg29s5QQP/3BYOXorCAZl5h40tIKJlRvMbDxgxLZznoMgADA0c8Gu/aaobBhASHKZugOHwGTd/RuYXChpIBNBKXnIqmmDlU8YqoRm++fXUC2z6aQoaT6HAtHGN1bPDWgSq8nXskR76XmxdSXNWqihYifV657D2m7du0AdcObSbVy4+Yr2RrBQdFcYTupi0r0WdRaJyAQxdD555eLrxQmV1ojPL9X0UNnRi9NXbuqmE1pENvLQQZH+E+X5c2fvFqZ6hVH6J+a0WfXshauYX93A0NQJtHb1aTNr94kVzJy/iZWnX985CIpHLqJ8dEvTgUNo2t0DoISqw4V+QmJTVB+4i49m3b6h9wS8IzJxTNLBve5dHkPPxRhb+WA7Jla0TYwLSno6uYmj9g+wpYxWy1Wsm7ED9yh6avAtbJ1x1NgSjm4+MLNyhr+4ktHJBRw+ZgELG3fYSOqwlFTC21Z2XrATWj98zBr1YuXSytpQIIyQVd2rtQLOcq+YDKH8KD3PkNu8ytoH9SCJ4pY+LcZw6ZgNKCauocio7hF13qmLNAnFTbj04vtaruVR9lx0Ymqj3aO15T7E1e1ncPnZN/QYOx7Lwxl8DwCcyWQBLihxT8LtNz9ERlm9MkFJU7cuO5c0d2kDK4GwcO6qVgd5hjJ3TfF3cYEqJq1AZvkV3ZdwYuksOgfG0NU/jNX1c+joHUB7Tz8GRkaxuL6pXc+z27ewevONfwsQkAk2VBjyG0K45dtePDZtopt/GGyEtp0DIvWoN1KkZ0T23V4AHj9v5YVHjtjo5lBHUd+dk6d1PYG7gWgZucuItX+eacS++ojUXNh6BcHQ2lHoX+jezgWmABJA7b9WDrCyd1UQRIgAnV/egK1oBjevUNiLwzAUfXHgiDkOibg0YWo5bKbNpzwSpqp35u5p4vm1ejRscundvBqXX6nLyazGja1sIbOqRXcQ8yyj9Mp2ZFZ34sS5m/ptJrmitrkp9NWPfqpr+VxIoki711nE2c11gUu3X1cm2HzqBT2JjSeg8+cUvAw8i0QsiLEWwpNPc6tbtGmVYMgsb9B0UCZuhUC4dOe1u4dky9/mOYc8Yj+nrAnx4g5WBCDDUwvoGRxHS2evXEewfUWE5MAg+oYG0Ts4gJmlUwoCfqnH0rUdrh3kD18UTbAhTLCJoKwmmIov5zq7tUcggiQgrv7czBGireI8L4iHOFm4R+m3jzx61E53935NcjRvsz+AAusvHzmmaeKxz7eWcfWPDaat/ZN69gFTgZcod87+4ybWMDA0h429GxycveAjoFtaOYeQ8AQkynOjxPOnZRYhSwReQnIOgsWq2jt5o7CyRQC3itzmQQVCUkkTUsubdSmYnp3H0KaXNmjvIDeL8vg6Um+SzDqChUfS83Dp3IZBRPC8wOQi3HrnYz1W9tytV7R0TK//rR/+Ep/84rf4/s9+g1ff/wTPvvYt/O3f/TPe+PCHeOG972uVcOn8DV1Emlq9gOnT2+oSuGOZ4GFbWk5Vs56Gzg5mgiEup1Q3r7IOwE4upgN9r/K+IhKyMXfqHE7Mn0FjWw86ewbR3t2HjfMXhAGG0TvUJ4zQKTZ6XmsQXD+Y3NyhMMwdvICc3rMoHV5HQGY9jMU2kQl4RqBXSJz49yAJWqCCgOv6XVOndSmWX1Sxz9xdu3rY8s1WbirtevHZX99roenCLzpHz+KLE4plB/AzL78r/2gZwsV2JmYVIiu/FPlFlSiSfJkt+ZLH4fBcpFn5ADy8QxAakSigiICVrRtMLRxxzMgaZpZOeoDWvORMj6g0GDgH6tfZWIvyZ1cR28h43C0PpaINZb8hRRwLVr4ieNlcSuHLk0pSK9q1h8/MUxyGVwRWrz2P7Np2VHQOomFwUmZ0q8zwXmUwriLy4K3RuTU898aHWN58CtdffFf3L7JS+OZHP8LHv/g93vv059qw+uxb39HGVIKCawlcR0gvrVNWIChYWeQ6QW5tjwIzp0rsX3M/ioQ9TolNHJmcQ31Tp+5VqG9owdq6WMH+PnQP9IgmaMHE/EkFQcvYEgYWt3dYJxg4h+ze0+IOzsI/ow5GMssp8OjlKQapBbiVjKePc08AD3pgN88+Sy/sMXfDk2IPuSpHUNgHpKB+YEk7hYwcQ7QSx/2GPIKGLeml9Z3IKqmFkeiAoOgEEYKeSvt2MrMdxS24CuDCxC5Oz63iiKElzK1d9DEOpomouHQECROkZ5dgWdRxWEYJ7ES/BKUWIzClSAFAUcszihJyqvQsxnyhfVb7uN+Qq6PUCxFCuXQRbNpgwwb1AXXC9p23dDmXZxNSvbNNjP2CzaL2eVxvr1D9kti3G8+9rX6dQpH9Bvf2K1IX8D4Ht6fTLVBTsFP59OXbus2NoKCT2Lj5ki5qZdV06VG33EjLY3BZQicTzC6eRpOkjg5JBwTB1oXzGBwewvDokDBBu7iFZUyvbv3bgCB3aBM5fWf+KyZgAYhMEJVSAP/IZAUBN3qyKMSzeOwCk3QDxyFbHxywFjCYuisIHAJTUdu3gIcO2uGobRCOWvvBLTjl8+9CcERN24Ce4xuakIaj5jbwFwdSKsKpX3xvg8y4UJnhXn7hGBNbZCPC8R4ACBIXSU/3btuLu6hpk1xaVAdDjxAccw3SL71iYFlhi0orgYewg39EOpKE6slC3DTLGkVgfBZ84zK03YyaxtgtVC1jRFYZLj7/JnLr2tDQP4ap0xuo6exHU+8wBqeXMDq7glbJ/yNTp3Dp+ssKAjIMq6AUgxwEAgPPceuNb6vYY4cyD77g8fi8Tf/PceO1b2Ns9RLmt2+ra+FJKaw9pAgYhiYX9TNoaZF00NWvrf8Xti+hb6Af/SNiJTtbMbW4oHsUuJdiZPnyDjuLRs4jb2ANFWMbCM5pgrkPzwZOUPrkYRIs7XIWkxkOWLijdXxZGzWPOAbBUhiDGzsNnUOw38obrmFZCoIH9ttp7yBLyxSJFlzvF4vHokdSbjGcvINg5ewBd78wuLNAJAKQw0kEaEBIrOZDa3sPDTyDTmB4iFD1ltTA6zHuGBLazKxuhbl/JIzlvRo4+mhXEU8i84/OVBa4BwJSN4/LZVcTZ5xLaKyegs4KIu0iawwUlHfe+572AlR3DKCwrgV9QsncLFojM7JVrGabBOnk0jncuvMO6lqG9Dyke8KROoDFIs58AuLstedULBIAFJAUfux65iIRl503nn4FdYNzIkwnUdw6iOruCYwtbKBbftfS2kV1SL29oxganlA2OH/hoqaDnsFe1QSzp1YxJyJ27NQlzJ3b4QJS0egFFAyto2riHMLyW2Hlz+8DSNEPM1RAwKPgmVt5iPR+of9moR9rv3j9zsFjToE4Yi+Wzc4fTxi7wCk4HZVds6IJbLDXxBNGdiEwsQ/UlT9WGykMg2KTYefuA1s3by0S+QRE69G53jyd1MweDi6+IoKeQqHkT1PJ/4YmtgKQYAUDmcBHXIqJ6APSc5R4aguhdzOfcFjI4BdZMGW5BMTBR/4H94B4PR2EZyvyf2DbO6uX1j4hehQu+wy5oMQqIk89Xb10S21ci6jy3qmT6J+aRZcEgTuIWaSpa+oTdT6Lq0+9jPauSUwubqoj4D4EOgkyAW9zpl9/+T3dr0CnQHHIk8t5CgztIPdcTK9dEUEq1rSsGdnyPC4YsRiVL2CZFN2xsraNkZFZTEzOon9gFGfWNgUEAwqE3uFBzK2c1lXMqdPXcfapN3cKgi0UDm+genJLv2DBJjBF9/hxK3dYUh4CxHdzQyl36bBE3DpxStu8D0rgd5k4S/CdsNvMHQ8cttF0UN4+q0xAEHz1cVPsO+6sy8DcPNLSM46Y1Bx4h0QqE/jJjPSQmezmGw5PCaarzE72LrBiyG9HMbJ01sGqoo2ztxaWnDwDsf+omX6BRlhWMRwikrDb0kWXivkNJ/xSCZ+INAFelPzOBEQmFKBtYEZ3RzkKo5gImBwCI+ETm64t62QCblTlqacEASt6bAitae/WvYTcVMoKXX2zsEH7CGZPruP2rbcUBANTd08xIRA4yALM+ffOOrgb+Ho9DY09A9wJRTvIMb/1NKIKahEht2NYKBKAEERVLX0YFoYZmZgXJhjH4NC4gmB+QSzh8IjYRLGiI0NaNOocXRTtsonVy6/uNB2cUyb41yBw9o/VfQPcNkYQ8Ch5nhLKvXzmYiP3iyagHthv5SlsEKBtXu4ROajtXdJvQjtsLprB3Eu/Ce2QsAS/2KpG6JHrEfYevkLXQbomwcAy+M5eXCfwFUCEon/spFYMWUE0s3XHEWOxkSY2CgZ7Nz8BhqO2c1eJgOuSvJgg+TaCNB+WpI0ZATFZcJZUZekQoKeqjM+v390zKQCwpq7wD9cvvxhfvYKa3hPaq0hrSW/Pghb3CwzOnERtWzdGZxYwLpqgiYJPLGZv/wwuX3oeHd1TeoQvQcBUwPoAG015wAULSBefff3zL8ZqQ1ZFs1YDeSweRSMt7PqNl5Eosz5d0kWOaIXkkrq72qGoBmMnVrC1fQN9faJBRqcwPSPpZX0Lp2T2z5ycE+E8i8HJaS0qzZy+ijNXdwiC4rFtFPSvoX76AkKy6jXf8wAo5lCKQq7z0yJyX99eUyft0zNyDcNeC08csvbWwfX8PcZucA/LRvPQighBDxyx8NP+Q3Yb8ag6bkMrkw/YNyJO3IEjjlvbSmCtYO3gdtchOHuq4HP28MPc4lktHDH/82c8LyE5qwjHLRxgYu2MPYeNUdHaixT5cINyK+AZnwO3SHEFGWV6arm1e6iCwDc0CZGJebrV/d6GWT0eX4DkFCy6QAQhv4uATMAvrKJ3bxAnwHp9RXOnOJCLWDt/TdLTDXlPGzhz9iqWTl1QJigobpKUNK2LRRzce8ArewhoK7lxleVjVgvZmMIaAfc5sl7A2sXi9tNIFxGaK+IvVcQxC1v81pW0vEoMCqBok8dkMoyNTqOttRsnZhfQ1d2r6YD1gpX1daxsnteTUdgqv2NNkNuzilphgqCMes333ERi9/lpHy6+YbCUGcrtXywBszeP3boUgmzW5MbOQ5Y+WkG0801Cy/AqHj/sKG6ALeVuusn0sLm7Hodf3zmEsMR0WLl6wtzRWYJqByd3Xx22Th4KBAdXb0zNLWs5mUKR2iCvtBYW9u4wtXGR2e2hIKhq70emzJyvGFjAlN4/LgdewgB87xFiFwkCnqHILe309twFRSDQIYSl54sY5PcipOkGFh4nzxIuu4NaRRh2SS6ulQDmlNYgv6wOHZLGumR2n5Y8PjVzGreeeRPlVZ26wMMaAIPPDuMeAU/v9JLuJyQI2F+YVdEo6aBGh1YNy+r19uYzL8IvNRfRRVVIKLm7isiDsJKySiXQU5jkZpb2QfSJO5kWfbJ94QpWT6+hq6db3k83xk9MCwi2MDA9J7/r5Z3uSt5GloCgcnwLfum14g5itU7Ac4ZCxEq5+kbAxi1AQcEVQTZqchn2UUNHrRaySPTwIVv9tlMjxzBlgq8/aYH9xp54+IA1njzmoN9fxC+94OlewWIPCQJLZ1ccM7OBy/9C2XtF15kfV768r/MwvvfKskKrc2LOEcwJBEESBHMGCRJgBkGAIAAi55xzzjnnzATmHLrZuVvdakty25ItyR57xh5P3foVeOg1S56H+/CtcwAcpPOvr2rXrqpdLm529+MROHRAIJ7A2XWH4oMDhgHADhhCcGSieQTXbfus5btO8+9UjcNpNZ2SXqWpbniyZGvMRugyt6xVkrKrFNnnyrX7n9gcJDV4a/zQOzi7usMobtB1oYYFZhjvffrX8tG3P8i/6Dvz/e//Wb772z/KR1/8Sr7+7ndyU0PFvQefmSf46pvfq7sel/rOUcMB9BCQFpIVQC8DDsEE3PFsQ6ORhtU/EEKEBnACrORRjCIiQYFhotU2EMFinxIpYlVtm4UDZIMS4lMlVwFqZVWNhEWEmxFkFxbq7++WlMJyaRm9JTX9tyd1Xns+6fPv/37Sv/7bv///rR0MyqmUZjWCHtnkHSbzNx4098iIN+qhdPw4rXMz+RlGy2AMyavf0NTvnXlrra2LYVKHEYSlVslfvDZH3py22ppPSRExgr96Z6b9kxjBcpfNsmLjFnHbdUCOeJ+RfR5essl9txFCBw6flNbOIdm9/5ic1rsEjeW9h0+I02r1NOs2G4b4+dtTbOsaSy8X6t81ecUmTVV3yfHgOFMkodC13u2QpYmuO46aVgHZAaHAml4VjKJhSMEL9TRW8zK51Hv9sbluqp1kHym56u6zCqWstl3Kq9uktX3EPMEXX/2dDF99JE8+/7U8/uq38tXf/jf59T/+L3v8SA0GPABPgPoZ6SOxHmNgCRYGwUKs1rHbigWS5IyGunOs0otIsh2LZwMiJbekTtq6hiVeAWlMbJKUllRKT/eAjN+4JUXFpRYOkLopqW2SsORsNeI+yajukgvJVSZkVdr3WAbvfvn33/3wx0v//r/+1zI96Nf0+r/+z54gf1hOprZKYH63bDwWInPU1S9w3m0aP/AE9BAgV096Rfu4wwgcxSOuKU4KEhdrCrfjpMTlNslbs9YZWTR5gYt1H81YMqEXwHiWT0iM7D/hY3wBd/j2fZ6K4vcoAFxn4JDnGfnl5vppa+PrU+cssexg0/b9suugl1zQnxGVkmuoGiOYqunr9uN+EzsQ3Q/Jdo+zxhh6s3jS64Ll0whccgB0Nu309rXFGIs27LEpaMIC8vjdGluZJyzQu7BAY3Jeueb+xVWWrQDWSitbTa6nb+CWhERlSGh8tqWBxHqKSA72EK/Qc+2BYQyYQgQu4Q0YfacaiTfi7jVAqBkEQzI0nZ7Q0HdcDSRBPQDeECNIz8iV/IISqaisleKSMklITDbSKDOvUDoGr1jfAVPMtNOzP2HX6UgJyWgwadywrKZ/y6we7Lj+8EvnH/7+n/7PRnAub0hOprVJgHoCF68wme18wJotaBDZeeSc7SoAFMK4gQmYMFq+5ZDMWOFmxkIpGYzATOC2IxfNCCCKZq/cKfNW7dBrm8x0cjVhCsKB657DMlUB3rSFy8RpratRx8T7GfOX2aHvPuQtFfXtFgb2eBwXd309F18jmyA7ABekaSw+djFadmrqRRMpmQEInyUYMIaIW2ze5WUt62VNfQZ0UT7HCKgy8ro124+aohnZEB3HDiPAWFEjy6usl6LqJkmnuUMNITu/2sii8VsfS3JmuekzkRoSArgceocYAd6AFBGW0LEZBf6AkMH8BXG8sveKhbTO6w+spYxJp+PnL0mk4p2q+laJjEm09DAzK09DQZ0aQ5GmjLmSkZUpadl5ppTGzy1XwFrUNGiKqEf8YqWwaURicmo07Yw1FdfEohbJrR/9sm74UcA3v/3Df0Ib5w3K6YwuCSruF9fjETLH1cPAoZMr2oRessxlt42X404ZJ2cxBIMRuFAaN1EGXbrZw7wBK10gi6gdMHI+dZGreQKaUd+ZvdSKMNv0YOknYJEm/YVT5y2T2ZoJsF4PEMqsA6VUGllobp3jtNYaTVy3qXEuX2/hgLBwVuPpWXWhjhW4M1dttsUTbELbsu+E6Rnw9x89F2ZNmtQvGHwBGDKwSl/BTDXkJay/0f9lz4kAGbv/qa2kQwCTugEZQrKic2r7tHQlpBVJphrC2PhTk/RnRR57DlA3T9UwkV7eYliDvgUYQUrXkEDsOaRIxCOVTHoIRvR3xanB0ATrG51qPYZ51S2SX9kkJdXNZgRUEJPTso0xLC2r0qtC8vILJS0900rMNW0D1uJW133dLtbwsrUGeYCAiBTxvRRrYppICHtdjBevkEwZuPX8R3/eY5g/JGezuiSkbEi2nIqWBW5esmqHl90lbORCG8AYwxWuNktANw1C0dQXqBm8MWu1iUm+M2+9vrnnJDqnQTOFTTJvzS4rIHExYo4XYWzL/dBx/dhZr/UaanbLfH2OSCVGsGDFBus7TFF0/c60+eopNsumnYeMR1ih4JTwQViYPGuRxKtBnQ1PNKaQJlLYQhZZs94GtpPawTp3D6OQUUgF42AE1EDYl8SeZcIABrD54FnZ5nnO+v1B9xhrckGFycdkl9VIoYaGBD6nf3+KAkyMIAFp+8I6i8dZVe22/ALZ+7y6bjOKrmuPzEBoTuHQ2b3MTAFZCAaHkVD7oGbB382SLgZfSaNT80qlvk3BbVGZSd0RDmrrmjQkVEtScqrExiWYGlp957B1PrHFrbF/3HY6EPbKFIsEavrpFxwlSQqg49ILjK30uBAn7VceTPnz4ZOyy+Kb0yWxNVdk88koWbxNwaD7hBFsP+wrLruPGSjkom+QbmJqCFDIr01fIT/6YJERRb+YsVJWbPWUSyl6gHPWWSmZjqP3UAtbsN60CujVQ+cYTSEMgQwE0Inu4MJVrvZ8nYK2gqoWme20zppbMQ56EectW29k0pTZToYXYAwZ6JynxrFMv2ehHiySNDTJrtt+2JpemaRy9zgjJU39snDdNisv8xoMgHF0ppGQvFm9zVPcj/hI6+hdE4pAeSRaASECk4yQx6mbjoWYyi6TVHXp9559Y3cYTaXoH3AxRELWUdt3xdbi9N58bBXJfacDxMP3kpFBB32CZO+pC9bxxPDr6bAkq1lgIKdD480ISKMTMguke+iKpGTmSnG5hqGcAssM6uoaJCsrR1JTMtVL5GiKOGxzEU1941LXdcUaXQ7rz88rrTVPgVI9XUlxqdnieS5Izqjnqh+8sebPZxHLxsQvt1Nia8dky4kocXKfMALGuBGbhj4GD8AcMmDKbqApS1xsxBscAGnEI56ANu7AxGLrJ3h79lozAFMrVWNAfgYpG5edR223oUPZzLyMhpvZTs62Nwn52vzKZpm+cJW4uB+QlS7brCXdZdt+TSlX2sLtKbMXSwAr66OSZfoKF7toM8fFU0qmZR6AyN/rMALELdAyRt6WkIEnYziVXkPAIZigaeiWDYRQREJxJK+6UcJTsowzSNeQkKepYIbG+wcffauHlWexPyKzWGNujSQrokdqhrW8gYnZ0jB43T5PB/Hh8yHGA9Dqxtf4uKS131bk0OVEmOBz7FeGsoaubuzulZDIGD3EbHP/5RVV0tbWIUVFJVJUWCYF6qmaukZtZ3T78B1rfj2nv8PLJ1CKqxokPiVdQkIjJTUzx4wJrMFOhsqusX1/ZgSh5cNyIadDYquHZYt3uCx2OyZL3Q5bhQ1BRbaDsI2MHYWkiChrzV+3w+Tlpy1zk6nL3GXGyh3yweLNNtSRUNhsYQIBaUcjKmITf/n2HOtPXL31oDWholtAIyqH8+a0JSZuCb+Pd4DmZToJr4BRhMaly/5jZ8V5617TNYZKjtA0jnSOHcm2ehdD2OlhHy/fst8OG8RPTQD0zHMTsFAj2Xr4nHoELyseoXsEOKSmT5yO1zcXiToUTiklU0zKrmgwoIjGYKze8U+/+I2VfSGIorKLJYlWsLI69QDl9ojyafPIuIbGEtMe8I1KUiOIsjF0JpEPnQu0fgL2HXDRZkZ2sMfLR/ZqyuwfGiUdQyMG/vJKSiQnN18KCoulsaFV0hQn5OUUqkcokgbNhiiOdQzdlMrmfvGFnj57QYoU0EYnJEt4RIykqBHhDVhkgtq7hi+/PzOCsNJB8ctsltjyPtl8NMhKyQxoLNm414YjV+obigGgR8TBIepEX8F0PWDA4JSlW+X9RZvk59NXWft2aFqF/NWHS8xAptNfqEaAyCRDqmwYhdFDxJLQwrAq3UoYAQJYsJIYQXljr00nQ1tv2eNp8bhIQdPMRasMKH44c7Gmf0FWqqWhlBiPOimuF4PgTif24vbZpM66OjqKHJvSKJUjEee06ZClu4QDmmsxFsJBUHyGDYwExaUoQKySHGRsNbZGpeRJqrp6jICBEJhCDhrdIoyHK6283sSsMAKEJzh09Ae4UDJnQJXnjJohDeRxPsI6nAkZ3v6hcvZSpJWv2weHJFrjf1pOjuQUFEqheoD2tm4LBdmaMSSrgdY19Zpn6tA0tLS2w4yAw0ZAMyI20bQo45JS1QjyrFnluH+U5NV2J/+5JyjsFL/UGoku6RLXw/4T4s/qHtkrxGAqsRXyxbIEdhwpCEJMGqbw/YUuZgDvzHeRH3+41Ea7/GPz5b+8Nk0B40r5y/fmy4/enSdvzFwuf/HmzAlPoEbAyBrKZD+bstgqk8jawkHgITCOTGRt2ayqh834OpNJTC2fC4oyBZV5ihd4XqrGQp2eIg25Oq4X0oW1dMRZgBkusP/W84lB09QSk6UJiMuViIxyG1H3j83VQ6uwdPPa069l7NELGbjzRK49+0waB0albfSa1PWOSFXngM0DkOb2Xn1gEnoYS2iapn/peWoMxeoFaiW9ol4NKUeNoU66x+/Z8KnXxTA95EA1Ao3/oSzCvKDYYcz+DmYNucAMaEX5R8bLpbgkqW5tk9DYeCOFktMzNFXUEFOvaWhSuuTr78pWD1XX2KXAsUbaFYcABilDYwSZ6sXC0EkKCJFwzXDScovtpqFtPq+2p/LPjSCvRc4nV0pMUbtt6Cb3xwDYM4gRoBWEJ2CHIcMk0LKEAzzBW3PWmgF8uESfz3W28a4JT7DISKRZpmLuakDyx+/Pt/WzGAGt6FxvzlphRoB0DcAN6VkwSMvAuOX1DKuymY2iyoFj52Sv52nDBpSe2VYenpJru4+p0KGFxCQPF2icJdmHfEKMDuYOBzCyiXzPiUBTC+WRpZWUk1liiZwN5d26/stS1T0srWM3ZOjOQxl78FSuPPpY7n32S7n90VdS3TEov/7jv8vTb34rz7//O/nshz+YqOUd/frjX/5Gbnz8pbr6W3Z1Xruj3qFcgpIyTZ+AEXVUUI9eCNGff9OGXHwjM80YyHToaQQTRCSnS8fIiIbBWEX2aZKQoh4hK1uqq+olUfFClhodNYWqqibJUW/U2DogZfUdNte53+ucgVj0qX0DI4xqpx/ioCnPhKhnax3+cyPIbhD/pHKJL2kXN09/E4u27WJqBBRith06ZWCO0jJuPaey0w6O7mI8wdvzNlhI4JHUMiCxSH4yebEVlz58eTGu9qZ6hoTcOjmuaQoTwB5nwmwrOIu3OBDitIFQdd+VrYMmh49QNTuWWHYxa9EaA4hkCVs09mMEHuoVFmgaiSYSo20g9JXu+62PcPsxH+svWLXdQw/3qoFZQsDGfSc1RHiYYBW4Ba8H/lmwYYdtWE8orDQB66TiKmsxQ684Ib/MZO3BAPQfXn3wqVUIwQLoDKBxzGO9IvragTF77LpxT2588pVU9Q5LTf+oVPYMSY7m/ukK2nz17syqbZETQQkm0u3pF2WZwzG/EDkdFC4BkdFS0dIip/z9FCTGmxGUViowbO2SnOwCSUvOkji906trGiVf7/r65h7ruWTUf99xX6O9AbM+CjQDNOtIUvC6z/OsEWcZxa1P/lMjCEguk6TSNhNxgCQCVdNJxBILLtbSQbawuYxGU4cRfLBoo7wxe52BQh4hmS4mFVtNgTeXsW/qEGAD5hLCkkvE/dA5G2WHRGJ07UfvzrVZRlJOZG4wPpZhEw7IHMgaWH1DJZM5xVmLV4vX2SDJLq4z9wkDiAAG+49hDHkzuevhC9ZrRsNE0uCdT2TaUldLCzE2DGDLobOGYRC3tHF1fV3j4E2L8ZlVjZJcWqmus8nk5dLVzefWNJtgJZXCL3/7j8b+OUSug9X9o3ieUd0kEZpSxqjRZNe12EFfSEiTcE03w9V9X9LQkVWLuESV1A1cUw91WWp6xqVl5J7k1nXYNPPJi6HiHx6p2UGPxKalSmZ+vsQkJEqmpoYF+SWSlJhmRoA3aG/rkRoNEXRi9Y3esuzgmGYBtPGhn4D2A96Aia5T6iXOXoiVorq+v/kzI4gt7pDwnHrJbxo2vSJayxCWQHDy4HF/KyfDGOKyWUyRVdNl3blQy1Oc3GwWcIHzfnvcfuyixtcqeX36SvlggYu8M2uVlZLBAKSJsZmVsld/x8yXkndkD4QVDGaahhywBldmWZvhhAVr3U0in6yBUjAb1lhkwaItdi6jZWj6hIr4yQZwq4SBHcf87f/gQqewvv+mbUYlI1i97cgrj4CMPJNLkEV8X/PwbUP3xHaMIEHfdIwAuXuEphgCRcX92sMvjP8nPSQ7gCcAHJISAg5JF/MbmBBqtsbV89GpGgImdh3Rzn5JAWZl14g0amoXlV1tWIWfAe5o7B+SXNLBgUEJiY1RTJAsSWnpliGACZI0HGSoEaQkZkh5WbVUqjcYvXpXRscfSmBEshw9GyiRiTmKC6r10EPlxFl/a+Sl5rLz4CkprO3+n7/7hz8lOQygoP/jSZOyGkYltqhVStqvWG0dooXOHHgB4jGzB9yRjvaytIq2iale5wldAAxg/noEo7eaPmBAfKH85ANN+eY5m5gVdzxhhENn1n+7xznrL8CrQNsSNjAEgCYeAbeNMhmDK3gFsAKhgQIU+oVI6rMLYa/XeRPEwGjIZGAxmebhbwT9c7dz0Bw6vDo/Fy9HqIMjoDZiW9Q0O2ChFqkkBA8uHtn6pJIKSSoskYzyKlMbjc8rtfkDRtKvPvjc5hRRN+Ogc2rb7U7mEZ6A5/V6p3NRIsYImIBiGooLTgCWMSAhzzIExt74um9YnJwO1gwhMFjqOjqlqKJCSqsrjSpOz8iSMg1N7KNK0cwFI8Az1GvIunbjvly59UgCQhLkhG+IRCp4TVbw6K2e4NjJc9afceSEr/Uq1HdflluPPpFPv/mNfPfDH0WNQCahfJVe0y91g3dlm94V8ALEfxZPYQBQuyy1gnJlJ3FCUYPxAO8t2KDAcL28PRfqeK38+AMnKySdDk03I5jmtMXErPAE8ARI2qH+sVnzcqTpGE+bt3aHNaUYDlm30w4GnYOC2l4LDYhXYghQ1qSOGAKKZxiBt1+4HQQkD/MGiFXCD5DqkRaySJtHRKyLmvotNeTjWSs32/AJuIDax4TG8a4JTzBy09I7ED9GEJuTr56gwJjDRL3TaThh79Ht599YKxmTTVnVra+ulNJ6KWruNb0BRt8yq1oUdF60Q+fwyV7wBmQC0M3hmeU2OXXIZwLQoogWkZYp0anpcu3+A7lw6ZJEJSQYVZydkyf9fcN28AW5JZKqYLNSjbNbP3dVs5BbDz+2buiEDM0cSmolTUOS38UIOX7GT7LyS60It/vwSZuqbui9oeHovhT3PZkwgrrhh1LWeU1GH35lOjkUXdhszuYQjAAVEcrJGAYClZSSGT5lzuAXM1brnbzJQsGsVTvF7bCfeYL/9+358otpKyz24w2QtGFSmVn/1fqmT1/sYoYBVoB5ZKUdk0xvzV5pmQR7C1ibO3nhWitaMdCKN8IY8QaonSGajdgTLOCEjP12df+eFhYwDOhhDIHPAfje1p/Da+EQYOj4Oq3mO70v2sQVfD41flI6EH1kdr4kFhRLYUOzhqcaE6BMyJ3wBghWwRMwesaBc8UXVJlLL+8YMoCaXdNmXoIDhxIG/eMRoJJJY0tbh+yGOh2WYk2mYJnjFxhCOSdevn7SPTomMSlpkpSRIZGxcXIpJEyqKussRSwvqdZMoUHq65plcOSqjGomcv/Z55JKBVRTxgINWxgCW+1IE1m/gxFQnGNghWppy9hTKXEYQc/Nz9Rt3ZXrz76To76Rr4xg9aY9skvTK3YMrGRMa427HWZWVaf15iFHu8TVw8IBBvDego1GG1+IK5C3Zq2xecUZTptM3o50kJnEiJQSWb/Nc0K4Ug+drIERNsIBzSmAQ0c4wAggqpCxBQ/QnkZYQNeYDax4Aub5ka+FLHI94K3x/Yys23XYOom5s2gmdd7jae6ZnkIOgukjuHtKyQhgQtYsdNktO7z9ND28alqDWZUNhgUaND7X9w1KkaL6QgV6LLii//D+x9/YCjzKx9QJwACpZQ32HC1EjIHSMBcGgBqJ48IA6CfMr++R0PRS8Q6KN/1CPndKQZyH3rmnAoJlaPyGnA8OMfo3LStX4uKTLUU87xsgQQGhEqxZRGFBqXT1Dkn/0FW5/eiFhKmXAhxGp+bbAq7YFAWscekWDjAIqqFtGqLGH38ljSMPpLT/qRT1v5BJw/c19+2+Ll2XH4nz9iMTw6N6xyEiRaPmanWjC1e6mYbQu5rm5df0yHJazvXQfjqFgdRVFhIwgk0Hz0lwcql1Gplm8XI3CwnE/5++v0DCk4vVyI6biimrcZlmnsgyNsibamAOI0CyFiEsshRW3LL3mOII3c9MMqF56HE60Lp8EXpA38ft8ClZqqELcWuoYxpHKNa47DtmTZ28+fD1uGYMg2udgt99Z4KsArlHXwtHEKuxn3QwqbBMqrt6pf/mHXn69ffy3d//k/zun0UN4Gt58csfTEHExClyy80ACAUUkLj7+Vx1z5gUt/RZOODCIzjqCExM8zX2KntemAgPp0JibKcijCFGUN7YLMfP+Yl/UIgxf8FhkTZ7wEIyf99A8VHAl52lYLGx1dbrjN14oOlkpqWJMJswrOfVsAgJ6TlF+jxcYpKzrQcBfQV6Dl4ZQc/Vp1KqmUFT302rwS9dt0NWaRzl8DdqmsXi6zmaFSzReI3sLK6aRpE3bAjVxQzAcSENB2MIJqDxFHk7tI/xIGACwgGeAFVSQgvbTmhKART+P+/MNaELcEFZ87DtOERUk/Io8rHoLZOuYgQsv2BvAmNejr2GtI6t3+Fhj1yb9nmZZiJfq2wfMpHtvcc1E9jvbdK6NJqiZOp25KxdCFsgJIXSaISmX/F5xXIy8JIpkTf3jUiJeoPWgTEZ0vz/xTe/lSQNAWxyYa6QZhLHBVhkEomhVH4v4hMQWvQYMnnMx3Q4oWbOom0AKTiBLIKUFyOAMaR2cNr/orrzYAkICpOI6AQZuzwuUfoYFBgmfucDJU+9VXVNg5RW1UnP8HWj18+qoSVml1pI8FewSW9moYazw8fP2nM6pmA8m4bvqRE8ViP4SCa1DN6RMnrX+29Zh+6KDbtt+zl6QR76B7LlHC+A3CxGkFbUZEbAHU6X8fsLXe0CGyANhxGgYkKaiBHw2qUK/DhUvtdt/2l5Q5E/RoHUDeHgp+r6/++35xiyB3yihYj3gKamZ5AhGHYfsythD3qKmrlgFF1jd63vH7fMmz+hRdxm6RvAja4f3vw7L741g+GQ6MThDiaGZ1a2me5PajkbSC+ZgOWnf/MHufPJ1/L9n/5Ffv2n/y4Pv/havv6bv5cvf/M7+eS730r32Lg8UG8wcvOR9F67Z+1jiFgwdMKhM55OiRnRa/6GVwok5y7ZIzQ3Dag0p6aVNRtgxEud0czA48wFOeJzUfzDY6W2o0f2HvYWb5/zEhQWZUbQ1T0gZ876yZnT580QsjLzpKa2USr0au0blcjkHCslU+iiE5p6AVlBTWO7HDhyXLz055dqqtuqYa9ez7us76UR4AEKKrtkePyZjW4tW88m0i127fM8J+to0NCUi68hLcvrl+mhImG772SozR86MAFVRErJ9BNgIHgBxK/JBJhOJhzsYkPp9qOyVXNz2rqgbA+dizChSQgcQFpF66iJZe/Q3w9tDSCEK3BsXWOukdAALkAfkcEYGkjxCoyZIcGHB8Ab8DWMA0IJT4EXcN17zPACwBG1MxTR6UeAKKrpHbWVeJEZuQoEiyUmM9/azLJKqyW/ot5Q990nn8vYrcdy9eELua0GwXXnxTfyxd/80XYjQSmjcn7/s++kvLVPylp6jQhi5oDL+0KY1R3gFQhnNJQQDgCGXn6XFBhetH0I3uryU9mLlJQhoVEJUtvQLh6eJ+XixXDxPX9RIiNiLRxgBN0j1yU4Js3WEPuGJkq2hiePE+etOzuvuNJWFpzUn8v/0Ng1bKqppb2PpLDvuUzqu/ZY6trH9J/6WFw0p9643VNcKcOqN4BcYFcxXsBJ82vcOHczu4nQMKTD+PWZdB1vsExh1/FgU+Tm86SIYAf2FyB2zZ0dn10th/XQXXaijnZMMYCzDa84NA7AAzB7CDcCJiGLSFkZi6fPEc0kNqweUBCHKyZn55A5bA4X948YBXcfHgA2kbuPraYIa/M6On73nfC3sjPlY2oGS7fsscYUAB6StvQTlLf1Wgm5oLbZVExTC8qs6TSntEau3n5q3U9kCrCIzBnwPcwgIFrFAgyeNw9es69Vtg9Ijb7xrNZjrR7P+drQvY+MW4BYgo6mCReuAE/Q1DssxzX2++od73XKV85fDJXislo56n1WgoOjzCPgCVpaO23T2viD5ybBz05F9JRY2r3fy0dOqLGUVTeaERw54SOZ+n+09oxIyxCe4OGEJxi99Uyae69Kv8YJUkHazPcc8bWD3+XhY2tnqSAiVUPXcHX7ZTvEnZ7+Jhy1ZscJBWRHzBi2eJyXE8Eptt1spZunbTsjbEAWvaOg0sETADDJFthTiAFQccQICAcQP7RLgRkcYhMbUCJn4th1t10Y5j41hAuRqaaX6KCNMQgMgWISB40hMImMkghYAH0CjAXFVoAhGYKLGtVWDTfI3gHmSBMJMdy5LLaAfoV9I/2i4zhP77BbDz8xI0h7OWxC/wELL3jOar382jbbsdg2csMka7ioC+AFHBtXWY5R2tYn6WpovLa2e0Tz91FpHbpm4K2+a0DiM/LlAjL56v6DI+Mlv6TKDMIfabxT5yQsLELq6huloLTSPAEbWfjb0Umg0OUfFi/e5y5IWnahnPTxsys5q0BaugdNYKNCjaAEIxi7/VyqWwc1dRi3zmLiLV26K1z3quv2tbrBKmTf1u8wpq+0cdDAHUUg0kBSRIyAkLDnZIiJSAEM35w5wRYuWLPD1tdyqNDGGAEq5ew/BFxSZ4AogiugtPzTyYteeQLwAL2Bjj1KhAWe047m7Rtq5VxbkM2haghwPOeO52PcP5+D1AEY8jFhg5DBc2oLFJjYd8Dq+rK2YUsneSOZKWTPMqNmLL0GdFGICYtNVyT+yIwgXw+LjSccekVbv93xPC/RVBJhKuTuaXzB9TOGhhFgECiW4DEyq5oMCzCZ5OkbLKeDIm2yKlCzBLqpY1JzbGFmWGyq5KhLb2zrsbz/1NkL4n3SR0LVCGpq623F3siN++aZWNTBJHRRQ6f4BEWJb3CkbWLLyi+WyromGb12Uy6P35XaztH/MAIkZCqbe6Xvyl2jYqkZWGfu1on+fe5G+gxRK6WphM4iJpFMmUzdPlnBTyYvk59PW2lScmfCMuSnHzrJ1CWb5bXJS4wsotGUQ0crGC/CxnVoZDp94QfgCcgSoIABhqSh//W1afJX782xbibIIlrRHNtWSRH36qHFZJTZ34qROoyVxli6jWk05SLtrekYs8zHdAv0/6IBFfHttbuOyXJ9vsztoPEFNT3XrVkUWTo2oWUVN5mSKAqrCFTEpRRIaHS63Lz7sTWconHMjEK6eoBU9RZ0KfNxUX2HZjg90th32XQbD52+YI8HT/mbRB3NI/QxJpfUyBHFAIyqWRlZDYYBHYS0exVT+OvnwuLTrGmUeUzUS4LCNJUMjrBO5P6BIcUEzdIzOCq3n3xinosJJyT0wSJ4Ai+fAOsxJMtg620+krr6+h71eBV9D9QInuMJnkqV5qzj6uIYiKR0jOuniESjJp27POciRvPm0BJG7KaziJrBm7P1cJZvM56ARlPG0kgR8QQUkX72wUL50VuzxT8iwzabkGWwQAtMAGPIDAMXPAEX5WrCBVtTYA2ZIXTMEgIMKSDBZcRmltvfSsiybekvD3r30fM2d8C2dAyhqm3Evo5x8HqMhd5DZzWYg77htmrG7cg5q5BmV3dZASuloM6Wb+SVt0lUYqF1F+cWN0p0Yq7cf/yF5Jc2mpfgjc9Vb8Dh81isd2CCegl4hO4rd+zQ6R1kuggegIuZQ0ICngMjwBM49IzwFGf0sUUNiK3r8RpeLkUlWTGosq7FuoRSFKw2tnSaegmeoL1nQK7ceWyGCB6ClGI8jna1k37B1m4WFh0vAcGhkpiaYa/npq/sfyilA+oJWPGOJ7hy97nFWXJxSBoaPIjH82n2cN1n11Q9fPrqeaQqRw2B1BBvQEURI4A2fm3qcgOGGABjaPAELMJAKxhPMOWlIDbh4MdqIBBGGAOUMT+XcIAWIl4A0QlG2MACbGJl1S47kOn25aDYiLJ262HLWFiIAS29ac8JCztb9p1SY/CVvmtP7fceOBFkjxBWbgfOmOz9FsU/W4+c11AWLMXNw2YEtMERumLTyk1sOzwuT5LU65RWtEtwaIqMKn5Kz62UsoYuCwkMq2AM1BaQkMlSfIA3GFIQyF3vowfLDiXG3tmjhEEgo0/HEvL3hAq8AY8ARFYS1nUM2aZaOoL8L0Ursg+SIv09gfqzTivKvxAYKlHRsVJdU2fh4MbDj+x3M/ByIijO0mG0KENiU2wPY0hkrPj4BUheUakMjl2zG79q4JGUDX48YQQVTT3SNXLT7jRzu3rI9P9Rl4eXp+pG6kbxBbqTOb6pL7WKMILJ7D1Y6GoLKFj1TgURvEAGAXVMKCBFDNY3kwOggARYfF0/97OpTmYAAETrMlrpZp6AnkSM4Edvz7TM4O2XBBEdR5BFjMghNQto3aCZBm4fA+Du9/QJl5MBMYoZ6swzVLWNSUBUhozc/kQScqrEXdNTuAuWYDHDiObxDu8LVt/ndwfFZluoSc6plssAqIZeySlqkIq6LklKK5KHT7/UGF0r6YXVJtXLHcjgCKVmUDmegM93qUunvn+e1FAPHo+AFzinbp5wUKiGsl9zd6aXD2rIQNoOD4HhYATQwMcVKzCRhCFgBBfUWAgHcAcUlpra2m0+oXfshuSq8R3V1zP3CKY5zUS0Gkxceo5ctDASpqlmnNQ2tUnn8A2pHnws5UMvZNLI+COLe43dl22hJcKT7B+kcOOyy9tA3Sq2hrl5WGynwmebzkybwE0WbDhkHAH08dYjAeIdmCL/9fXZhhd+rgdMZ5EjOwhPKbFdyCy0oseQAhI/5915a+QnHy40TwAuYCspHAF1DNw3AhOMsVHZ/Pl7s/WaKXsU0ZMmLly3VbODvVblpNZApkA5nEkjSs3sV2CJNoCJhZqAPn42hSXG15YoSFyooJE2NMilkoYe9TJZ1lUckZqrB1yl782IlDa0SdfgVRnTm2ZodFwy9aARs8rQXJ+cnDZ5jIB1eUwxwQ20j940MMjhAvwwBOYNYQa544nbFI5Y20ddA10DQsKx88FSr8CSLutTahBn/EPMExSUVktgaLScebmqMDYpVT9XYUbAPuaJQZM8CdHvw0PBOQA2o9JzJUYvZAOR3WlWENvePy41A0/UCD6RScPXH1q7cvvgDZN5QbCSuQDawTkwcnwMAMYPIyhuGHhVAeTw56zdZ4+Uk7cfC9LsIEN+9M4CA4bQwpRpuesWrt1hhaFtHufs5+PmbWnGvAmFdJpR356zyjIEtpMyO0Adgy5nuoxsIbfigY2aLs5YtNo0knMqWizlgw+AmoWWBRk7xr9xjTB1zAXC1KEcAnOIkhhzAIyF+yVlyTG9Y2j5xp3efPyZTfY0947J4M2H+jdXG2k0dGNiC3q25tnPX3yloaHeijQwc2gxgQGYJTSQqKljthrE7/5V5O4nv5Rrjz+1NDBZET+hweEJKDs7yCKMwKFlsNfbxzgKsgTCAQYA85ehf8e5CxNLS9llHZOSLpUKDFnEDfI3vKDpICNzzQNXTE+Z1bsx2UVWnPJWQyTDadX0ceDyo/8wgq6hG1Jc22mz9mu37LNOHtbc/vyD+TZ3wMJLlEtWKKCD+YPXB9nTEPLjDxbLexoGMACuHV5q7VF5VkCav3b3KyPAm/BzIJqI17SXk2lQYEIfmdq+oxGEJtaylkEDbohgHjkbYiv6oIvR/fU6F2yreQA9aA1zqNDADHly6HQeYwg8Mins4AmgavEGvAb+gOqeB8ybiV3EW08ingVs1NA1IoPX78uVBx9Jv6ZTj7/8Tp599St5+vm38uKLb+WmgrCvv/1B/uaP/yq/+cf/Kd//4X/It7//Z/nm7/7JVFDHn35uK/Ec+f/N519K99W7xg04RC3RPK7qHrVWc4pKDKbAJTjW7XSoFyFNZMiG7IAxfe72wPBYCwdnzgdIUGSMCViVVNbKyNUbRgrFJGdKoH5/RWuvaSjTIJNd02zdUfxPvRr2O/Rv6h25/9IINBx0D99UgNNjMm/wBIvXuFm6RZs5sRMU7zACPAGULqBu9ip3azSdvWa3LZ2gmOTueVFOXkq1ncfQxpSK6S3EcxAOiNEn2fx9PEAPJVxTpxBxV1AGXUwrGIOuNJUw20BnMx4Dg6GHAOP8cM5Smb/CRTZsO2Aom3oCtDG7FKYtWWfNpvADbgdPGDlESECKD6QMPwCbCD9gBSeX7bJi1yGZv2mHLcKatszZxCkbusasRy9TYz7pmt2RmqeHJaZLUFSi9ez1Dlw1mT0UTWAGIWmYQSAMIFtDjg5xBG3MSr3G/iv22KTfB1MIsUSjKmVnkDxr8ag+nlNjNC5BwwUYAxFNxu0iEjMsO2CegB3WF0Oi5FJEnFwIjZDq5lYprqgxsAc9TCZxXr+/pLHTJPYvqiegRwJVtkQFrvH6vyGAcfvR12oEj//DCCob1QjaBvXNPfSymeSwzR7SZkYfwRpF3+ACAB5CSZSRMQJmEMEFhAOAIS3cFxOKLBQwvk59AVl8xK7BAABDNqCyUZ1wQxGJMEA4oLUM7MAFF8HXYQnnKw5gKRYG+uaUedZjuGj1Jouv6AhC/HCBBSCGHIuyYQcBSBgEErKMpYMPMBK8A7UDRC7ABNvUy9CryJIJBKxZxFVU0yY1GpdpKyuqbzcWj8FUmjYva3aQX1xnWQEK6hNLsyZELXlO4YgR9Ya+qxaC8ECMqDMbgdfie/LqO+X686+MnKKPAaYSoglvARNZp3drnj5HjMMvhHkCPxO9BiByQScHhEWaERAKyP3pIEJpjcUYxQ0d4nH2ok0/0T3NUm/Io0QNXU161t1Dd18agaaI7f3XbHqlurnPjIC4O2vJersQg0QEijRs3TZP6wHIqek2MDfDGkT36B110DgCJpMpIJ0NzzTUz2vIDib6DDfa4aYUNFjqNnn+GgOfy15OOnH3AwzhEj6cv07vlpsmTUs3EU0kFIz4u6bMWy7zlm+QyXOXmTdASBImkAPmcLnbufgYI4A65q6n0sfXbSx9z1F7xAgAhKzK2+513rahoTdQ3T6s+f+EtA13N3c68f6svvE5eugwhryJJVVtmp1MNJvSWUQxiGomPQ5clJgnlM4nwpNjSMYwSfAEocO8Ir2FAfGZ1nXEQcEk8vsgm0o1e6AyGBAeZ/Rxnbr4lOxiI478L0VKWV2jXg1S19wuV2/eNWELJpHBEfk1LaahfOBsgDW34nlOKt5IUm/Q1jUqlU2DUjP0RCpGKCCN3TEDaO29Ih7H/WwH0TRW1yxeY11FxtVv3GOZAnE9VcGdoXqaR5dusXEzR8+h+2F/Wx/DjAFhAMqYuE/NAcmaS/H5RhZRO8AwKCrhBRZt2G0pJykhYYD5enAJg7AYAbuSXnt/loWDNybPlQ9mLrHeR+4q3DqjaI5r2ZY91lyCJM3ctVtMtJI3m88xosYj29TZjrIKw9HwsNBlp7WlpWkayHCnozjFnQvIY6dRoCJ3yKGg8GS5fP2RpYvc+TEKDGPzKyVBjQBDQCIftRL+toGbTwyscvgAVUevIY+Uj5lgZjciOAUjIVUMSco28Aj5FKwfc4Vr2shkdEVjl9HVUNioqDx4/pkUV9eZEYxdv2VGcOJcoLWas9EVoLn1yEmJVm/GnCTgkMktjLhj8LYagf4fI09lUu+oftDSLxhDQFiiDSksXetm+4hoKsENL9VcGvaQvYdo6ULzMmGERA0egH5DjIBGVSZqMAJmEBGtgieYt3Kr6RvTXgYwhDGEOsYQmD0gRSQcOLasZ5Q0yWsfLjCW8H31AqzMW66HOVfjNl7gvemLZPeR05YL0yrGG0lrmaOdjK4iunVQJJmp4YMGDjqPaEFb4Oxuj/QPrFAv4e7layonB89esu1mpY39EpKQY6Nwjj0HGIIpmKgbj1G338VCSvUEuHyMgB1LSSV11l5Gb6FjmzrC1mQujoYShKvoMSQb4M5HvApg6JDkhzkEOJJGtg2PWwji8JHwxRiK9WMyEu5mRs2Gr902UcvugREFhrdMBZUVOQBDwgHFKjxBYkm1/t40K1X7qncYvHJXKBzWDD+YMILOwXFpaB+0ebYD+qahMLpY3zg0AbaoW523fKPl60wGsRQ7q6rLxtBpO4fkQRrWdhtoCGB/kH9Mjvzsg0XWZPoTtp5PX2YlaO5+GLite0/JrMUbbfaAtnLYRDwAs4hkDDwW6V1GSgg1zGAqnoB1uqiaTJ7jZJoFB/XwaczgzuZuN6C3dZ+1k9E1hEHgDUD9NH9SOqbNi15DBlc3HTphRrCM8XcNgzSn5unBtg/fsiZSQCKsm6OHkNATm14siZn6pvdPDIByd0Xnl0lYZoENlDCMUt0zYlVF0sXRu8/srsaLXHx5UWUMTs42bQU0jMAtpLcYAXwCrCE1Buhn2EVA4mn1HijEpxVUWc/AabSNfAPV9UconmuxmsLY9TvSr4aTkJ5vHgO+gt9x9GKYROYUS5h+npAQmZxrRtB9+Z7UDj2QypEnMqln5JZU6Z1Sqha8SJH3VHW5SMoy/r1tzzFZsNzFwoIZgYaD7Joem0EkFBASMAJqABBDWw/72oJnPAAGQxaBVA2NpW8qCAyJzRPnrUf0MNdZxzH0MWknIQAVFMAgRoDG0Iwdqi8xAACAAElEQVSXuIT9ACdA2L/JTCZzIW+DggmPLM4g9mIENJeiXE5vIdPJPNLHh+vlTqNETP8/7pfUELkaxC22eJ6WjYeO2/QR42scPmQRcnf8bPQH6BfEEEhBUVrBEK7qXZRTUm+AK6WiXuL1ruQi9lJVRBATmvjy/Y9MHIKDxBAAs7h8DuN8dLLxF3AWEyqn6ZYeggu8NFUEdPI9MI5H1GjpHSRrQfaW2E5N4MS5APXi7dLeMyR9w1elsbVPQtTDhOvPg6+gTM3UU6amiOVdg9J15Y606Htw+8ln1jH9ygg6FJkizATqZb8AAtMISKMPtIM3a6mz7S1mTpCcP6++34yAEbTZmj4Sy9+Zu1pem+Ykbh4+cjok2WK9Lc1Ut48B/GdGgCcgSwAgUiTiMuyx86gh9DemLjQdRTiBEH2DwuIyTbmE0fQlazbJ6k07raWLw+PQ6TAmFHD34w1o6qT3HxT+8GuGR38vv/kXMRdMCHFXr7d6l4e4HT0lXvpa3CapHrRvrGIAGD3SusKmLk3lBq3Y0zp0XbLUK9x++JlRxqReMYUKCkuq9I1uUmMpk+KmTj3AOgORDz/5pXipEXiZIUQbg8eaPFbkeZ4Pko6xW4bgKTUTBlA/5QLQEYJgIKGaMSQKUZBNGMeF8ETjDwJCo6WhtVPaugeltWvAxtGiErOt9kCKakMvGnpYHh6txoyHgtJG4WTwxrP/MALIA9Ppq2uTGepqMYDJ0xeYnPxOjZ2ISkEiUU1E8q2gcVjenLNe3l24wbqEAXZU/mgSPXAmxKaACAEYAgePIVAroBchKbtGdhz0saXXC9SApixYa6PoVAuRs5m+2NloYjwBRSPAKViAHcqshUHTCDErwoGz+z67U2k5n716k4UDjMERDvAOJlihRkHrN4ARJE9IIETM0u/ZegxP4CXr9njIhr1HbLCEyh93ERw+hA56BRGZhQrkEia6hzRjgGqHKo7JLZHg9CybP0yvnJhSSi2qsKng9IJy+eirX5sOIoIagdGJVh08fgEdghDbkAaBtP+kn/0eDh6yiNYzWEMwCJ4DZhQDOK6fp1RNcYpRMzIAiKOm9m69eqWjd1g6FdzTYeyp/yP9DDSwHtdMJEaNh7WA3gDD0DijBFjy+coIuhQ5V2sqUqtxZPqsxTJvod6dMxfIrPlOJifHACgDofT6OYyA4dN3F0wswqLogzfACNj07ROSYhVDUkJay9l1wKrb2UtcJT6jUjbt9Na4vsZwwlvTnQwPEAZ+8v5cUz1laxpaxEjjo1aCjhGb1dnQSs8cOwJRMuM5ngC6FVSOy4Z1I91i1o/2b+RjSMeYDsIjEBJo9WYhZbYafqQeYnpNo8Rofh2ekW91gs9+/Xt58tVfy/d/+h/y7NvfyrNf/SD3vvpeRh58JMN3nkp9z6iQVg/feGh7j3MamyS/qU2KW9s1LWuScn2erUAsQ38mHcCFFXWmIRQap3d6xMSYmbd/sBlD55VbtjKPegHeACYRsohsgb5IahmARraksRWFtjEUUljpE66HeikqQVo6e6VS3X1P/5gMX76rOCHGjATiCpFMDzWouKJqicwutbI1JBt9EOgcvTKCOv0EsupUqOYvWiFrnbfIepet4rzRXQ4eOWXxd/WmXWYEhIOc+gE1AmebRGZTOUbA5BDhYNdRf3V7yVYxxAgAg3gCtp5z8Kl59XL45CXZuP2YbD1wxgAn9PBuLz/N6QOsq5h+wkFNwWhzIxYyD8n4FFtU8QK2TVW9A4+8Udz1pHyOLIH0i3mDHV7nJtbcaFoIGcM8Aq8xIUv1BEs275D1+w/L9hMaFnbuV5zgaYWb9pFxSSmslAxNwaBbaUGv7huVzvF7pleMEaAu/vDz7+TmJ1/I3a+/kWff/1ruffalPPj8K/n+d3+Ur77/Qe4/+1Ru3X8qnX0jUt/SpSFXDa5AU7VMBZ2RsWYINd1DdufTQwBgxAAmjCHSMgyyD/oDfC7Fy6mL0dZJlZBTYSV/tBtoHIUoKq9qlO6+ywoMb6p3SDT8wAq+qJwy2wkRDd+h54tqSlBcuv39bSN3hOmzqtGnE0ZQXt1iRmAeYO4S20q2Ud+kQwqcUAUhXSReUwvIbRhUL6CAcPVECZayMoIWjHhB8LCFbPpLqpgaPxeLr8kI0gsa5aB34MQmdDcPa2Gjd2Gmk4sVrqCH35npZJ6AKSPYQQSsWKGLRyIMEJ7c1NXTdcN+APJ9uoXXqTEsRrqGzW3UFtQQ3PTgnRQ4luo/DQbgtVuZUtKvb/LwFucDR2T3mXPifuyEvtZLgViyNA+M2d6jOPUSiEskFFdKqt7NgcmZVoxB2q5aAVi5Huyp0HA5nxCndxnqJ5r+RcdIYnauxGuIoGR7dfyOZOYVSWpWngLJcqlsbpWGbnXdw6OKN7rlxvPPjWIGb5Q291jRiTuYTIQUE09A9nDgVIBlDzCaBTUdcjY4zuYL4ASKymulUw1zWPEFYhXoEfA14n9oeqGtCQ7UzCBMcc5Bn4uGOWhIRcL3lRGweaukolmKNdYs1ZjrtFzv/HWb7Pl+jxO2dGKN60TnDp6goHFUpizdJks2HZY5LMdcscm2ex/1j9Q/NtDWu1ExpOZABgBRNEPxw3szVqgrLxGXbUfl3enL5fUpSww3OMKBhYbZE3OHaBZRw7AwpHk9BBZgEF1DdA/5m7Zq7EcjgEPmcB0dwxwwSmarNBXEOPh8kYYAVubyOoZMeL5B7/zVuw+I62EvcT1wVNbt2C9x2cWan9OwWWIIP0XdeGBylukLkAnQOcydVN8+ZCNp4Xq44Tm5klVXLxlVNTaoklZYKtmKCxj9unnviYQpFqAlDNftedpX9qrBBcUkmMFRaqaOQE9inDWJ1lqPAeVuLmYXoJvZnALTiBEk5lba9BVeknBD3yFe4Lp6qdv3nkujpsM0xWJYeILTmoXEltSYN/CPTbWaRMfgNbl874XUjT6SqrFnMqlS892ahm4riFxQJOqsd90q3mwFiO47D8tUvSO37PQSJ+fd4rrntMQXtMj0FTv1zfU0hQ/2E09dpkhfQR4yMF4BsTZHSHYABUyayAqcKfOd1RVWi/sBH5k8e62RRzCQtJmDKSCKaC8HKMIY/uTdWdY8AlUMNuCaMmeZZSuoliC8TTjA3QP+AIFwA3AFgETSQDKH6cs3WMnWARQBkjxfzbDtviOyaBOM43bZoV4PurZJ08mQuAxr3SZtI0UM1dQsPKPImMSolAJp7b5qzbkwcamVDRoi22xRJYcIcEPqju0lY+OPxV/vWlrSyG7Y5UjOD7qn75DqJkwibfEUtzhovAApI48OIzCRS70odROOwhQXUb6+9fiFFOnvBRhevnZHegcuS5jGfDIEwC0sZrjeKAn695Tr70JPuV/BaIf+jIEr98wIKi4/l0k1mhfjRjCEgKAo2a2xlgWUazQPP6AxeqHe6cwiUPhZt81Lkorb5Rcz15kh0CE833mnvD1vtfxs2hI57BthEiz/5ScfGglE5ZBHtp+8N2u1xGZUyc7DfnqIrjLLabMVpGAKYQxJM1E1YwAVbb4fvTnDVua8r56BkEDxaPbitTJz4WoTskLeji5iyB8OHzKImUT4Aj7Hx9TqYQxZRw+jyIVxwB6uUAMhRVymWQbGQuEJ0EX7PcLVxF/UW9FtZAl4ol6RqcVy/lKSlFR1aUbVa2lXQrnetRVNklhcay4cEYsUYndGqYzf/UT8LinQUy95wi/cOqSJ79QcmKZipyIgkNoCjxgB5W+0kAl1/H8mza9eiU5iupUq2/rNGxGyukduSG1Lj1y9eV/u3H8mly/fkqCQaA0JsZbmwmYioH0yKs2MAZxBEaxe09j+sdv/YQTV6nqr6joVEzQaEGQbGcumWEm37/AZG0dbtXGv1Q5YfplXPyw/nbrKdIqYIXxn/hqZs3abeYRd3gEmx8bBAwwdKmUfzlsrr324yHoMKSDBExAmjEtYvMHApRnDnBWWKqJFTOEKxhDdIoAp6SKb2yGv8AQooForubp7NptRN+DgAX3c6dDDXFMU0zQN37DUEQ/BgfN1tqq7e/lomnjWaGQKTdDFdFhRN8AIOFQ8ABrFNLpkl7dKSGyOVNT1SfvALXO3MYoZYAtjNSWk4OTYdg6xc/vx58ZxIC3HpDCDoqShHBCEEUro1AwgjJDDdyzM4mPIKVJgGmRoT4M4goDKrmg03oA6AGIU6Xll0jt0RbODEbl5675ExiSbEWA4GMF+6OiXRgCFTadSqf6MIf3d9SMPJsJBmQKNNCw6Jd9WzbCKbpFmBKiGuu/xlBXO22zYg+4iUkS0DF6fu0GmrdphKSJh4KdTF8vPNaYfOR8p56MyTb2UA8bd04oGWQQGwAjoMWQnEniBZlI6iQgJNpGsoQDGkBz24MlAYyqnzl9lMnbvTF9oMnYzFqySuU4TtQR4fQ6fcABziEHYgeohExb4HAwi2QFfo6CEEWAszuo1NmjaCWu4RT0Dswowha39162ZlTuSSiDhgHV1MTmVptzGIo3GjivSOXzL6NjIgjKJ0rAQpUDSdAzVDcMlQM+SSkLzsteI3kKYQwcryEZ1qptI5dtB6yNhgOeAQMIBrKV1TSm4c3QsO4wA4onScFZhuQyMXjfFEowgKjbJSs3sQUAnYauGmUMXoqSobdCMjG4lpO/gCl4ZQa4iUMgM4ggLpmYtXGFLp96bNs+MgA2p7DpgWhggWNx2Wd5a4CofLttqZNHcdQoOV7nJZEX4hIOTwYnGE9CWBiYgJOAJGEJlFtE6i2avNsqY2QVCAY2tGADsIcQRAIiWMpZyUkBCtGqXHpQTy7PVC5ApsL+ZAhIHjnuHMXSMqJMyEgpIFzEQJGSgkeEP0AEgXFA7IBys2+tpYJL5RJZdUjtgIzqukwvKubxz2MrFGAWuvr59xBTWTJAqXw0hT6+cIkkorJDMinrjG6IUkV+7/5Fc0jvY46SfDZtSwIEkOomUXWC41PeOvTIO7nbqDJBCPEcvsUKzkF1Hz1gtAQxBjg9jyGsYVzuCcGVFrVy//dCMYOzydQkOjbLpY/oj4UY8L0bIVjWkBAWalNahnNu7hqWj75o0jT6UGsIBCp10tdLjzuIJ9g6wfeydaXONoIGzR7+IVJABkbzGITUCvXOXutlORDwAFx4BOTp2/8IY4g145MITYAjMIjKV/MGsVcYfUEDCExAGGGjBEBCsKm/uN4kahk7hDuyuGrxueoboHWMEyze4myfgbscb8AgegAfgTueCJ4BKRiQKEonuHUq4Vm1Ug1m+bb8s33nQ8AGvIzY39FyxGgJ3IoQTs4JZNW1GPNn0s6avdB/RSXwpLUfCNAWMyi/RcFBmglfsL6aWjwwuRkCLGLL5TBbR7rXvtJ8a5EU5ExYrTf1X7IDpCuZiQIW2OSTo+JieAj6m+xgjoKCEl+F1VBr3qoGwt3Ho8g1pbuuWa9dvSXxSuo2sxWbkWUHrOJvbNcSka1ZAoeqcGh0l556hm9I88lBqx9QI4MtpXIDqXLxa4+3ilZqG6V05f6ns0hQRI4DAma6gjWIRPMEvmDpesVVem7lcZq9xlw81xwcckhkgwkS7OGkiZWHAHlNCtKtRr2coZPqCdSaQyeEjgY8n4JGLQhKNHXiBxexE2n7AvABu1UWfr1e8MnnuUlmqX6OKyNgZncZczP3jTh3DqQ6NAtbQ4FaZUaTTiM4iW5V7yFu2n/KTfS9FJHDJ/dcfTbSMaTrI0uwLCelyLjrJnpPKwd/nKRDs1LwcebrADDWE7AIJy8y3WkIi2CCvzDxB5/C4DI0/kC9++w9GQPE1DIW+PwQtO0ZvWGkXoAedSwYARYwXwBtQx+Cu52u0kpOt0LXE/8LnoaHT1AD7x8Zl5PK4PHj4VMrVM6RmFZhMP0ps3vrzWbsXr1gFsNkxdF2aFFyO3/3YjKAenoCBCYeU+7L1m80QXLZpyrXR3dbcb97naUsl2YnIgec29MtfTnGy5ZhTFdBhAI5r70k9BEXPMIaQRYhOkfphALSyhycX2nzAB7NWyNylrvLOzGXmAQgDeAETu57hJMX13VZFZDsr3DnxH6VO3B87kvdoHD98NsAKOoAnDplHtAlIqwB0hAqMhDeObaUOGpb8Gw0B6ggp1c2S3dRl/QDET9rAvv7hv8m9T7+V59/+YIqlT371g9z+/FsZ/+hLefL1b6w8fO3+x/Lsm9/I1eefyfgX38iNz76WsScvZPDuExm681j6rt8zvqHvyh0pa+jU73kq/mpIKKAge4sHQeqW4dNUvbPZr8ChV2luzyMAEGBHOkjTKQe+U/9nmETW57Dql7E1Qkx0SqZ0D4/J1Ru3FRPcUyOose7jouoGK2YFpWRLlqaWZV0QVMPy0de/lWJ9L0bV2FuGH0oDRsDoFBr7AfqL8QBL122SOU6r9ZDW2ErbDeou1+jdR+cN6+aLWkfk5+rO5zjvMSMAC7y/aL28qYe8zfO8GQJ3MwCPOxuhiflgBs0iSMGYnWcRNxqJnj6hcsw33B7pLEaMCq/Td+2hDZps3H3YjGD74ROanu5TbKA/S4HrKtcdZgS8UWs0xXNXj7VJU9ulG7fLwnVbZDl7lTXW7z3uK8v0tdzVu9Sgec0qtz2yUo16/e6J9HDjkZOmTQBgXK+Z0cCNh5aH0+FDjEe+JjqvRFJKa6xjF9dOsweHDJtY1N4jJZqnl3X2S+PQVem5fleGbj2SHvUU1BdoXefjhn7N04evmVxuRfegFLd0azi4rBij3BZ4YCy//of/LjV6l9JJlPayYsjhEw5O6l0PZ0CPA56AolNYcqbUd/XJ4NVxufvwiXz84nNJTsmQC0EhEpaQJFmVdXJKw46PhpFsvTnANQyddCtgbe+9rv/DfWkaeSyTbMsHEzPqEVhhizfACOYtWyubdh7QNG2bGsKhCRGIjbulUNM3tqUvdz9suwIQfcJDTFm60davAAy5o6GDGQphEIR5QPoFo9KKjPemUWT6wjU2hIKMPh3FH8xdZSAQgSriLiNnbDSdvGCFLFrHttWJyiEl5N2aylKJQwdgiWIDDpoDdNlNp7G3GQXXRvUkHDiDIFTmdmoM3aI4Z4/3OZv8WaX/l4u+3kSvPE7Zm436CCkcsTe1pFqS9ULiNqu6yTp486sapKKxQ4Y1N0fIGkNAzRSR6/C0XJOhQ1LWT+9U6GW8LIicJdyXkjItZCSX1ZhHqO0asnBx8/Gn0qR3PYbAoEvXCGMAbdIyeM2yAgAjPQZgFjwcxkA6iqDW2J17Mnz9poyqITx6/NSUT0MjYzTMhEq8hgQYTzf9v1Mqmg0oHzwZYBL5vcN3zAiaMQKsHms0i8zIF/d9R8R5i6aErlvFdcd+u/M26x1E6zbeAEXTWZoprNh2xBhDNAjJDvAGB8+GivfFOGsSIRSA9KGFAXl0CmEEWDY5P0ZAH6FjAQaXQ52M/rrpS9bICj1wDGGG0xp93GjGsNTFXdPPFTJvlYtx7dzZHPZm9Rgc+Gr1Whw0d/7WQ8fNM5C24QUcRrJdjWiVehboZbyBm3oaPAcpGCN5tHrbjoPSGjOCCOjhzFzbfYAMPWCsY/iqXIhLNblaKpAsySDmU1tA4YwBkPEHH0tGUbUcUKMDzTMMQhg4H4uKWbwMXL8jFyMmJocDIxNsOzsXngFD6rt+30AiOISLMHb9yRdWWMIIGvpHNMPos8aSkSvX5Ysvv5asnGzxDwySs3plldfKHgWivpqhFOiNYCrwl+JN9LKjb1zaNUVsHXkkk2CvGLlidClcQdDWvYfNCJat3Wjr6AgLgEOnDe42zs2yKUKAVRBXTOw9eE/v6NdnLTehaoQZCQe0ik0Aww0240hxiJYrNz0g2sUwBD5P/wBt5UwbYyykhvzDP3lvhvxiylwzBranceg/emuyZhu0rM0Vl10HrItnxeZdFhK4FilY5ON1CiAxCIwBT1GseTEGgYGs3bbfPk84oMA039ndDMlZPQlzBLhL3DGpHbl2rB54VGaeRGflS1IuvQFpkqQgsGNwzBZjIGmPx8gorTXwl0QNgD0IKbnSoqEgVg0KAAdYxEuQGgIKd3qflTTN8Rkbi9a4fVaNg94DzsA6jDU809sAJoBgIlsA38AtWNu6vkfI8Je1tErv6GW5Mn5Dnj5/JjFxmmaePiOxqemaXXTKgXMBmiaGSZq+V6THgTEZEp9aLP2X7yswfag/Qz0BLVOkifxiWpbQwN2x10M2uu9+2U+w0iha7kpazNj6xbjYB4udX+1GxAuQHcATwBhC/WIA785ZpgaxwJRIX586z1AwbzZjZDB+uH6qhhw8TaUMwxIG4N8xAO5+wgBG8KGmrnNWqMdYwnMnmb18rcXMdXqoYAdCFs9ZtLVNQwG/h48Xrt1sqh0QLgBNl10eslW9wT5Ns9w9mUo+oVmDj3koZhBbei7bAdLzj4glItconcfnFVoZOFJTsJzCUkPk7GtmupguJDp2bFQ9p9xaz9ic1tQxYo2pgVEphvBJ6+gfYBtKqB58p2II5GN8AkLEw/uMGQQegYETzoPJZkAh2AfGkBkGWFKMAcbRtJdzcmX0xi1p7eySR08eS2t7mwSFhklgRJQC5TobPgEXIM61y9vfehGyiuptDK1j9IG0jT2USfTXQ3EytTJ/6XpbMjV9jub4702VnQeO2WLK5c5bzRDQDII1wwgYHoU2NiFKzQygj4/6R1uayEQzngAv8MH8lXp4G+Td2UuM/+YQZi1Za2Vihkxx/8jS4SmQrgU7MPTBoqzJCzRzWLzKjGHhWgWFqzeYIcxatkbWqpECah2HTsgCREKuOD7mYJcrXqDwcuCkn32O12MwMHaUVnd4nZXV6gk2aWi4FJ0mV24/s8aVRMUFUanZNoeYXIQuUYF+rG98eq6U1zRYbo7b5o6EKqYTOSmrVNI1Mykoa5LY5HzpHrxhhaRozTrOh8TZHU0bGT0DflGJUlzTbF6FDqHQmCQLDYQD0kZIHZpFka63PkM1HrqW4SpMiILU72KInA0JlZ6RMSmrqpQnz57KnXu3JTtXgW1MnORqprD92GlLcXPrO02t7d6L79XQr9rwySsjiFbETnXrrLos1tVTM1i6ylnm6x23U+MkzCFGAHMIcs+qaDWWz6p/LxtNMYDXZiw12hhDcCiMvD3LSQ1ivh7kanlt8hzLf8n7ZyxaZdvOmCxygET2GuAFKCUz6v3T92fqa/cbBnBgAu5+pw1bDBMscd5sm0jwAkv071ummcH2wyeNXHF4AcMyGg4ovHD3M6/PI0YJBlitPx88wM8gBWWHwsj1B9aYgThEY8+QDN9+qOni93ZdufdA+sauSt/wZWvnQirOmlLzq41JjE0tkoy8Gikpb5OY+DzpHbglRRVt4u0TYqrsfuHJViSCHsa9s5U9OilDzl0MlfA49RZBEaYnQCiizZwUc9fL/wkjABiSAk8M3IaJb3S8eqEMGb//UD1Bh1y9fk1KyoolMztLSmpr9O8fkMDEDKty9tx8bBrPV+5/Jk1dl6VPDeCVEcRrvhyRkC0R8ZnWWzht9kKZs3DZKyN4e/JsWbNxh2kcs86OQgpGQOGHRlOuN2avsPqBgywiHMAPMCfIUkxi/RvT5tumEocRgAmoEE7Tg+easWitvW7WsvV2uIQBtqmu2bpHdh87o3f1CTkTHKGx/Yge+FbzBjR04lnwUjwysIongFwi3+bu486nOZSPCXvk3mj94SXIEo74Bprn2KkXSyKY82e4o01TOjKB5sERefjpl/LRN98qin8q95+/kE+/+lYefvS5uWzCALuYWZUXk1QgWQU1UlbZIVFxWVJQrBlFRYsc8NS7WXP7U6ys07BE+RimsKq5SyIT0qx1HEzAlJFvSJRlE9QF2gauyg5NYckM4A4wIDwB3083kud5mlQTpP/KZUX7g/Lw8SMzgCjFBUGR0dLcN2RNrYFqrMWt/ba0k1bz6uaBCUwwcl9a1RAmYfEMKaJ9O3fRcpk5Z6HMXeAk02fNN2zw4cyF4rR60yvJ+7yaTmsls77Chc7ygXoElMcQmzh4LkyOXYyVX0xfYmomb+jj69MWGup/fcoCq4HTPQwmICSgNeC684jVAd6aOt9CBMaB/i5pIG9ybkWdaQPcfvZCUvKLZc9RL5m5ZLmsdHWznNp9v5ds3aPIny2q2w/Zz6cJhb+XR/Y1UN+nVZt9AHTiQj2zZGujgkP3Q8c0VEDDhsjFqAS5fPeh/p5SSc5DrCpPato7ZeDauDx48al8+t338sWv/lpefP1L+d0//Yv1DMIMggUwHLansli7srpDctQz9PRdt5wcnSO6g9lYevLixESyl4LDlv5RE6bi7qd+A33P/ww2ISvAYKkXwK1MrNxNM7kgYjvDq8cDgjTjSpOe0REZvnpZPvr0E8krKpSg8HA55RdgRozHgCpHQpe+BbIDzmHw6n3pGrsvnXiCSr3rEC5gpHnG7EXissldXLdsN0PYunO/vK9IfImCOGb/EJTM1X8QI6D8Sz/BzNXu9ghI3Hk8wPR//lLDwfuaJqJBMEEWbbYW8lD1NvwcGkUIB5SJ8QIMlmAE9A2QOTRoLHxv5iJ5d+Z8Wag4YLent5y+eElWb3aT6LQMmbZwsW1eZxpn58ETdpftPXJGdmuuz/P9R31k2z4vOQRVrJ/DCPxD4uUogx4n/GXXoZN2p2FoXn5BGnMDFbhF6xsWKDf1Ti/UmF9S36zgsEpyyyslKiXNrrC4BFMej0/PNNnZS3oX04WEIVh2FZchMepVo9Xdh6rrb+8cVTc9YvOL6A6z/ZTqH6kiV0P3oGUEIer+MQLYULyA/8vxdBjRveqtcP+0mNGLiRHY+l3FBNuPHJPguDhpH+iXwWuX5dmLj6WkqkIiYhM0w0k2roGBFjq+6ImgigjphOxt9+gt6R65J514AoSQGXAEob7x9mTzAGvWu8rseYtl2+6DMkXDAytqwQQYAU0WFH2QleHwUR8DIKJFyMYRlk39dPICeXPWMvn55Hnysw/nys8/mCt/8dqHpsDNnUpmwJ1L/EcjibgNOMPqcetlzd12l5IGemqK43bwsMbwA/omnJDwVAVVkVGy3n2njNx4aOibsmhBRbNJzVEVLVSXmV+urrimXYIVUbMyjq9naX7N13DdSLtAlZNLswATNQ+aPxGyvvbgiTz45Au59eSZPPn8S3n82Rfymz/8ybzAU31OSvaReoOHn/9Svvq7P1mH8hd//Xv59oc/yVff/16+/u538uUv/1aa24ekb+iGZBfVSL5mGxByZ4KjLATtO35OyhrbrTMZbSLmBwGDGAGt5YBeCki2IU3/B+oi0OBQ46iswHXkVNVK79WrcvPRQxl/cF8ea4pYWF4qF4L5OTFGPBE29p+8aKCQmUjK0PQ2/G9GwHxbcVWT5Gt8vaQxaemKtbJx8zZZvHSV7Nx3WGYvWGqYgMWU3LmweVQG2TSCGqltLFmw3h6pIgIO35uPLoGzScmwMcWhhUQefupCuBkCcRnJPNTSQO4AHziEqYoXUNlYtWWXvlFn5YN5S2Tb4aMy3Wm5LN/kJnNWKohctFjcPTwtJ1+00lU2o0mw21OW6e+jKdZ97zHzAtzxq1x2GGr3uRhlXgPPwGu3HfA28mmThjznHfsUS5zUNHibusdxywLCkxhAzdEMAEo9Sg0m0+Jsaq66/4wsuXznnoQkZxidzLwB+KS8scs6d5jmom2Pji12E+GxSjVDgUFEsLJ//L4M3HhgKql9l2/aEqsa/RqHBiWNCBY4AJ4AjENWQI8BY+91msIO3P5IWtRLZFfWmBHUtLQplhk1T9De220ydXixWv25DLfwvZeSC2yPJCkn2Ig2uldGgFpnRn65GUFTa49sctsl6122yCKnlbJ73xGZp0jcecse22KOdgESMfQBsEcIythp834TmEDYisyA9jLCAHQxohHz10xoEoP8SZE2kXHMXGyxH5TOReZANkBaCD8AWwc5NHflek37jqiX2GnZwOwVq2Xpxs3isnuffUzYoLgEaKXxFO8CscXk0qETftbMse+Yj20Xp2+QIVaPk/72OcDj1oNeigm8NYs4bMATQ0CZhGZRBybILCpX4823sBCnoai0tl6yi0vlzrOPJDxtor5AVzKSMJBFE4MnlTbVVdPcK7UtfRNqIyiXIWgZRqqYbqXljOIJJVK8ARdGQgNrY9+YeoIm4zfgQrj7KZAxu9g+etuaZBiOwROM3b0rVU0tMnbrpnz82adSUVcjgaER+n+eVjzTa0Ou4AkyA0AlesyU5UdvPfkPI8BN0VDCNGucphNu2/a+wgUHDx8XJz0IWs7wBGvVGNg9QPUPDSPSRIpKs1dttWxhp9cFYw0BhJSQUQ+ZtdzFACU8AGVrUDnAkAlj2EDIHA5/htNaS/Pen7vUNpK+O3uxEUOL12+S16fONo4AbzBv9To1rPXqMZZLtrpNjADwx0UbGpiDi7wfw+BzZEAMsLJyF0CI0dCoQuZBGup2wNPW04ILeq/dtr2EgZp+hcQmaaqYa0aQml8o4fGJklFQZJtL+65el+CUDNuGZhNIFfU2q8AmVWhjCCcGfSsbuswI6NeI0s9NTCGFmutHLBu95KNn/G29LWkhn8dAYBcxAqq8kENkBgl5lTZww5oeWsrLWtplcPymGUHX8JA8evZUBsZGpLmjW+/0PlNkZ6yeymmXpr5UW+998kspUa+EbGHX8F3LECbl6BuZrOg2VQHOAQ9vmzfYoJ5gneICjGCZvvnbYeQ0x+bNhVxCz4i7nXbzGctd5YOFa229zGGfEFvRTopIeRgiyCE6BTCE+YLQweVjAG/NWGjPF6zZpHe9i6aFK+XH70yTvOpmeW/OEk0r59kjHuGtGfPknVkL1DgWysylqy1FJK5v3cfWNl/Lp7fsOaJe4Lg9uuvvWUu1cOte0/gHCG7ccdC+tmHbfjUSD00Nj1v6SZUSr8BOwq7LNxR85kgSCuepWcYQEhJi1AuExSVKcnaeeYSrmpufDAuXkMwcNYJ8yalrkpTiCsMWBdWNEqk4o7yh3aTlSf9QGyH7CIiMVyPLfPX1ktoWk8EhQ0BhjNdcjIFhjLVw4GtZQLgNk2AMVBFj1csw2AowTVWjbOjokpbeHrmu3qCtp0tCo2IVZCZKeVOHHFEMwOGzlAPlFBpVkS2kwtk5dEfah+/JJEASilZsxVix2lVWrVXQttFNFi9ZIdt2akaweKW4aW7PyPqmHR42GPKL9+dbeZiDZvBk8mL2Fy1XJBpsSypgDOEJuPsxBIyAFnJ4AogZDAA+4M3pC+TD+UjkLrNHjOG9OU4mDwNPAC6ALuau59A3aLaCZ+A51DEpopuGFw6UhhMMgGKNKxSyhi9yf55zZ55Vt8jX+RyGwQUPcei0v6mFkY+fCgyTjtHrEhKfKgl6d2cUlpkhpOkbbVdeoYJLDRXZuXLr6XMJSEqW6IJiidbQkVZZK5dSGVBJNc6eNBNGsLln2A74tKaEpy+GSlBMkhmAT3CEGQCvgSqGsj93KVL8wiaUzklbaS8DyFESZ1QNbAA4RN2Equj58Fg5G3RJ6to69OdUKwgdls7+fjlx1ldBeIi0D12R05eijGRiRM80kfRnJ6h3QAUFoYq2obsyCc1eiKJT54Pl9bemKBZYLfM1PVy0eLns3nNQPpiiuTx4wNndjAAtn9c/nGdC06R/uH3oYUgh2pcYm6IkDDfAhQGAByxFTMr+34yAVBF8wIDJUs1AEKPgc/AE8AinFMQsXLXRWsnWbN6lKeRK6yiaqgbD3Vyp6JnSMnc8hsDdv/2gtz0n/XPc+RiBp6ZKGAGPrJGHlSMU7Dp62t5w5x0HzE3T6MFhxGXmWygAFyAGiUfAEyAbx4TRwPUbeuh6Z1ZUa0gok8icAonSK72sWsNZvQREJxr6zyypkoMnfEy+Hp1i/9AYzQZCrWJbWFWvhtBknuK8Hha/FyNBe9DzXKD9LYzGQWrhDTCCcgWbiFyQ/+/xOq2GFWTZSnlDvXT29klVQ4P4BgSJx4mzxq8c879kmCC9osnqHExH875StmbbetvQbZlE/hwWkyFHFEjN0Tf3w6lzZMHCpbJEgeG+/Yfl3femyDo9BEbWV2/YIUVVrcb0ISzJFDEdQVMXr1UcsMhyWbpeUB91UMCEAwpIGAFVRKhcMIDDCFAjA9ARu/kYvoAxKTgD9Po55Ln6Wh4xiCnqNTAEWMdCTW8xDsdhb6ZUrJ4BYzim2QbcvnXkltSa2DOgLb+yyQyAEEIYwABoUKFp5UJUkly+/9wmiDm8WAV+BZV1Usai6hzN52P0Z2iKihF06RsfkpZlXuCSPlJqjisosd1JaQr4IjWk5Gj6CReABzjuF2SH7RMYbqHhxPkgScktsg4gBCcICYSK8CRNgSMSzCDJknj0MJZxYh803VG0wh01pdRY9Vj55p3ABZevj0t+aalJ2tFxVFjTNKFlGJ9lm16Yd6QPg99R1aKYYOS2YgL1BH6X4iQpo0TOXYyUnfpGMovopOnhnLmLZNfuA6+MwEXfbIwA4sUxFELljwOmAMQhHzhxwZoW3py2yD6Ht0B6Dm/wmnoPunnhBVAoxUtADK3euNPW3yKRQ7rHGHqbxi7ayhkyYdiEj+EDEF8gxVu5YbtxDaRT3MFuB44p1jhq7p3nHC7/LHwDKPvui6/lxa/+Vv7w7yK/+cd/k9KmLmubI/3afeyshQNqFLjKsXvPLC6TvrF0urCqUdoHRjXmDqnb7ZSWnn57vPv844kDr6iRBPUEeIDcmka72oavyv1Pv5bLdx/LjccfS11nvyF1to7gCU7p3Un5mP7A6pZOBYbn1QjizfgIFfAWHHDL4FXDBgyq0k4GN0CX1PGgCUHsIz4X5PD/x9NbhueZHduCStKd7ja1UbaYmZmZmZmZWbKYZVm2bMssyZaZmdp22w1ucnOaknSwk5Ock5s5uXfuzJkf88yce+euqVWO+sf7vB/Du2tXrbWqdu3m9h8bWL330XO8+e67GBid1M8jJmCiiuGAbfKYvKKXoXHy9/zoCcZmj2Bi9jBqW/qQlVOhS9MjhZ7RCMrKazQ0JCRnIUFmYrxwcGbIzO19NPHDBBAHm7OeA08DWDUCGggH3+GfiSEuO+cyLuYfmCPwpoH4hL9Y7CoD7+wdpoMbn16kg67Ns8QA+sf34tq9t/HO82+0pxIl36CoVOywdFFMwMEnwOOgshSOIhNnNe+vAj/uZ8jKHi35llnPo6C2VRNN1CaIC2g4nIEP3vtUXTKP6X1HNL1LL3DoxBltEsX2MIvCz98TYDgtIPHAqfNCaS/iuHgLVvpw/0QKUGQZD+VY3T+JtQMMBwSDxAjME4zs2qtdUrk7CbEHZV5utcPP4YacrDzq5Da7Yy92VGdlFPsW9ArFbBl60fRit4Qg/p6ls+fx9N1nePjWW7oIduf4jFYcs7aROgE3+WIRDhfcvvHsuW7uxS62Nx4/h8HknuPax7+tdwxdPeMCDhORnJytg5+UnAFvn0DxBOm6LI1rE1eNgBtPkOaR7pHzc4EIQQwTJNYegUr5mD0k+uesZ4jYdeiU1g4SMDJhxAZUwRJWIuKy4C7GFJucD08xHq6KCo/NhIWdFwLFYBLTi1HbvBPRiblo751ATFIeAiNT1LVz0HOrmnQQyfk5uLzN2c14ygFnwcfcsVNo6B3RWEu3z2VclFBZusVSbsq09ASsB7xwW2LrjXuK7EnhCBA5WJdl9vDgRadYdPDkGSycOov9Syt6XhaGQI1hfC81gFPaq+D6wyeayDm0clZYwyXd4Kp7eEJCwriGm7PXbqNjYFTpKN03jYVb7ozNH1KATMNkVxPmGlgDwWaZ3MqXzSn5n775w59x8sJlXLlzTz3Bzfv3dWMLGu1dAblnbj/UcHD9rQ+1WvrxR5/jrY+/1J3dfvQEXHfH3v3zh1dU66ZYVCSzKDwiFvEJqWoMqRn5agh5RbUqgbKFXHx6iQI6umU2lySQY3qUhRMcePJ/xn33kNgfwwWXedEIGCbYrp6zPk28z+pRXNkKLzGOs5fvo6CsCW1ilE0dw6hp6tPneG7ulNhY2qhhhDuSkVOzxp8XhAPLQtCDpy5pPSAfIxAi5WRoYOkXj/F9R8XlHtYFqDxYYseDRvP+V9/j6fMv8NHXv8bXv/0zvv39X/Cbf/kb/vi3f+A3f/o37Ttw98238PVvfo8//f2/4Q//9u/6/Hc//AW//9u/449//6/47b/+HX//v/5vHfAPfvGtAMQbMiDPhLe/J6HhgfYpYIUS4zaNoHOQreVGtH6BWUTqFWXNnfqb6cUoMzMbyLDApeyXJUxQpaR3e+PZh7qfATHB/UdPZAJdwcye/RoOmHybWzytvRHPiFe58ugdnBUjvvn4LZy5fldXW117+CEMuMqW2a+Z+WO4ev2RLksvFc6ckpqFyoo6REbFo7ahHTn5ZcgvrlMljPJsttymeERDoGDDDGD3yKzmBzjwIYlZWo3ESmXKxhSM2IF0dWONqpZ+VEvoqBEckZJRIgZWJ59fLwA0A8unriFOZntQWBLSssoQIKEnJILL5dOEsibAPyhRPQW1+NisAhV7ItNyhGImIiI1Ww9KwVnltao2Dgjl6xDqxceoDvI91AUoTrHugNoFRazwlBxcuv9UF2iwQJRFHmwkSbe9m+VlZAwC+FhY8kxm05DE8JHpPbqvEJkEGQSP4dm9WopG1fHR+88FY8xg6cIVcfUXNDH14O338eSDT3BEcMQn3/waV+89wsN3P8TjDz5WQzkpsZw7shK7sEcxad4Qd0oXL8BNtN4U3MLydZasvfvZL7AsYeTGg4dabHr+6lXFBPQ0DC0sbmXXNLawY80ktRCGEO7uxkU0l+49gwFLjQ4cPYu9B5axuHwJMeL2cyW2xsWnIC42GU5OXroFW7e4zsbWfuw7fFoXhXJNII2A1I4HUT7z92yQQArIQg9WCrNQ9EXT7AQMzBxERkmDMgbiCa4yZgiwcfKDj4QMhoRICTNH5HfQI3gIlvCT94WJYTgJEE3OLIe9azAc3EL0N1AxTJSBJSAMS85EaEo2MgTHZFbUI6e6QcNCTGahLsmiR4gQL5dd1Yi43BKkldZo4emLkvZGLTYhZSQwrJaQxpLvIysXMCEXX+P16QtaCsZB5/H8y+90B5Ixuc3tZZiFZW0AjYUYgq5/4cRpwQUfCfUb1XxEY08/2gZG0NwzoEdL7yDOXL0lhjalxtM1MqFonzoFS9vo4YgL+NsnDy5qAws2s+DeSqR7h+Q1737ypYaDCzdu440nb+PqrbuaRibO2L90WkMcMQWPw+euKi4alt/JsMPKpYtiCAZ7D57Gosy8mbkjaBPXmyCzOj0tDwnx6cgV5B0UFIWMjCKUizsuFDc8s3cJPiGJuosqW80SAFIQojZQIbObJeWsGyQYXK0dpHTsFhKva/vYUtZOQB8Ng1iCDIESLs+kiNssnHRXjo3Gtoo5qCMw1RwUk6bP8XU82N2U/ZhzhfurN0rN0UqhgMQMrR2MyCzQGOojRsgGEBRKYsS4WVOYKAYQU1CuxabsS8BK5fjcMm0ixeYO1A4o/5Ky0W2SLpJzs+/Q6Ss3xTAO4BNB/a5efsgvqdB9CWf2LeCY4AJqCcdPn8PhldNa+//0o49l4IcE+U+jZeeA3ua5Y2hEjYuso2fkxcylVqB6wu79yhLIfpheZgqeGVbWg1K2J8BmMQubY526dBWXZODJEMhczt24pZ9X39WnVJVMg0bULh6NnoTXhDUNbHbJ7mzsxG4wu+8EDkk46BcakS30LSwsATHRyYiOSkKBXCQ/vzDECyDLKaiWuF0lf/IQnL2iEBj1oh6QSJ/Aj4PN/YzZRUNnuoC/1SpiJpIoJhGgcNkYC1BdhQIyccSEEVVCeg4qiHTPTz/5RjtqELAxxUwqxzo+1guy4JIXhM2ZaATMCHI2s+w8WehhkgxwYcuL+kEqbXw/F5iyypYNsLlGsVbcfWFrD8LS8xVxJ1BxFK/AtOt7X3+vXc0p+FDGzSiuRBoLb3MLNXZHJqXrceXOfdg6uSGnsFQNYe3GrcJo/IW12CCnpBxbTMyRkCXhRQBbTXunzO7d6BmbwMA0tYC9MuOPqE5w7+kzDEzOKponfWSJWadgAmIDZiWp7jHvwYQYKTirw9nAqn9yXnEEO50fXTmjhnf+xl1cuftQw9DQrj0629kRhfstcrUSu6Jw8w0yDFZqs8MZF8UqO9gt/L1VaIQfS7zEhfv7hyM4OFpZgoODB+K4D2FZI4oq2rT5grVTEJy8o3Q20wDoBVg0yg5bXEVEOkgwyOe1QbXQxE1mTlrVws7lfP0LcJii7IJCEa2dt1n+/uCdT3TjCRY/8DWN3SN6m+GHuIOdPbnWn1lEFYYE0CUVVsgAlyC7rkXLuTVnX9OKHHHz7BEwPX9cK4+YPKLuTk2dvJtsYVU2Lm7o0F5EXqHRsHD2hHtAOLyCuTYzWihxmNBYPzh4eMPS0QUP33kPLp6+CI9JgLGFjd6OTk4T+hqLgopqWDu76XvuPn1bQuSAFqW0Dw6jqXenqnzdo+OCOaZViKrv6FWGoOVlAgDpDWgENACugSioatF9HtjoYmrfkoZVPsYZz/2UGQ5oBMfPcnXURfVUrf3DyjaofPL/TR44rqug7j77WLuw0QOwoJc7thmM7jqs1bB1MrPsndm4KgQeHgFqCGQJdo4e2rcgUS5eZn415o+chY2rvEYAGotMuD8R4z0HnYPMbVpJB+klOPgccD7PwhJaMVc4831snM1tbBgKOPjsUkaayb1/uB8TU50ssyL7YGsaZgnZ5JosZFVZZNqVWgAbREZlFyFEQGBObYvggSYdVDa8yiqs1t4Le+XiEWQyLc4KI7aGpcLIFDLdI8vLWGF049FT2MmArt9hKoYeIL/RHusMd8gs94ONi7ueDX76kqLx17fugJW9Mzx8A+Ho5qUDv9XUAomZOTC1dZD/440nHz5HW/+gVvowFDT29KkhdA6PKuC8cPMeGrt2Ki6gfkAgOjizVw2BC1e4PR4NgL0Ju0fmBLCe0OLW1d1PuZfyifOXtDHWiYuXsXL5qlJPhi5iBiazuP8yl7ydun4f9977BDeefKCJpB+NYHB6QWcKZWNnoX6unkGqGvoHRSJDLqyFtRNiEjKRkV+pNI0VOtySjqrhKuCjPExFkDXtq56AHoLYgAbB0MDnaQTc7ZTvY5EJMQHjOWM+izzYiIIpziv3XhSDsvaQhmJq76k4wMYtQI2AOQZiBca1bGEwLLjMqWtCbkMLyjp6UC0XtVg8Qlltq7bfGR7ehZ3csbyqDaOju1Fb343h8Tlkl1SjqrVTkzksYaP6duXeA6zZaiiYw0dnfWpuPibEfb/2+usy230ExDohIS0NH3/5JQzF5W83tYS1gwuc3L31bOPoitLaBg0LNm4eePz+h6jv7NZlYUz20Bv0jk9qWCAmuPHGEzR196tXoJhElZIC1cDknBo5WQqlb/Y4oEdkVRC9JcFrcU0jOsWw6AUOHF9WTHDrIRtXLSvzuPrgsR7MitLDsZiF7IeCGM/0tmxza0DX0je+R3fYjpIZx66mgSHRQsfiUFxWK3FPwoHMqPC4NCRKvGbugO3lqBhqEkmO1XDAncyL5QKzqHQ1ebS6qITGwGVoKhbJ42yczYEktWSen7fb+ie1Px+bLaqkLGGCsZ/xj4kregQWkL4AjAFYFhrFyiAygZK2Lj2SJD5nVdZpHO/oGUF9UyeWF8/jhsyCWzce4eOPv0Jn55BuJhUjNLhOBqiypUM8Tb7MtDG8/8WX8tke6JABMzS3lJDgL8wlCIHhoTr4Xf19CIuKxON33pFBd1ZPsHm7CTIEM7j7BGCTobEYTgHM7WXypGXg8199rwCxR9w/MQHDAI1AzzL7L91+gNq2bgWGXH1ENsICE8rKbI07rVvkjakh8Npw4y3WRzAJNDAxrR6JMjZBKQ2AWIX4gjoEC2IoXPFaENsQ3FIfoZbCz2Z7Wy62MSBoYjzmuoPWnlH4CBaISUyXWJekf8xOYiNLz+NSc7WmgHV7Nv+c3QR+HGyuGeDGFIxZ5cL9LZ39/9mRNFLPPJh5HBBwxm14nb0j4BUULxfKS102exO6B0TCxNYNDuKJWPKWImi9UJA7YzofZw0ez4dOXEBsWr54Bw91dUkFxUILq5BRVYOEohL4xiciStxxbEYOEiQ8pGflo6trEBMCvgoLK9EmXiMtuxCFlcw4lsuFbUd+ZbUAzEIUV9fi4q2b2GFlKbQ0BsaWljCxsoCppYUMuA0cXJzh6Sde0NwE9x6+ATsnV5hZ2mH9xm0wMbdBaFQcjMyt5XPqNDTQGFiifmDphOb3x/fMY1A8QP/UjBoBAeH9J890FxO2uHtBRw+rEdAj8EwGwNBFI2D2kylgrnRmrJ89cAhvvveBsIM7WvF09e4DNQiCRXoeGhlDhr2HL1wDQpSeBkQnwjciTpNIWtIm4deAtE03eZhd0I2hOeNTswrUCIrKq+VPB6GsuhFhsanaW5jr7OiiOctXy8Y4yDQEdufiknN2JrcQb+D7zxyB5hjkNRNzx+QCdagBUP+3cvZRw2LnEVs3f8EafjCTwWV5Fr+LB/sWsrSNhsJFMKzSyRIwaOvmK7PooSDvbrTJny6obxLuX4Hsqlo09AkH3zmk28MMjk1hirH38g20de8U/LMPc4ePilvdL7+3U2JrHWpb27WCeOf4GH7/r3/F1NwcWrq65OhAz2A/GtuaZEJkorS8RGh0K1LTU3Drzm0Eh0chXphCVGwSIqITlCnEJqVpOMiV3+LuH6QDQ1DYJFigU2ghQ0NtRxcqm1u1uPfWG09f7Gs0MqWegPsdseKI2cYDi6dx/MxlrVLmKmeOEfMln373B3H5J5WOcvXR8rkLL3ZAEQO48eCRprv7RidU7maosXH1EjYXr2zEWcZzo4mFlrqfvnRHy98M2DWLmj4BCIsh49PyEJ+SJd4gFeVV9QgMi0JNYzsiE9IQn5GvRZMEcizTYmzmJhRE3ARurOPrkvjLsi7tcCKUjNlB6vyUmpmoKixv1lxBQlqRtqklzy8TKlfMbJ7MfM74B28/1y5bXBrH53qE4/N2VXOPNnam1wqLTxMrfqTLt+aPn8D4/oMYnJvXJWMLp05rxQ2rgZj2HRN3TG19cHoGe44dQ4cM9vGLgqL3zmP3wiG5YOKqBaiVVlfjnQ8/xNLpFZy/ehmXr1/D0spJvPfBM3z08Yd4+PgNXea1dOIY3n3vHfzi21/hi69+ie9+/Xv88vs/4PnnX+Hv/+3/xOdf/1LPo7vm8Nt/+VdhMfd17cKDd57p7etvPJLBvI35w0v48PNvdPURG1BxU+xp4fUEiGQJXJK2cumm0kYaSCsrn956H+998a0OMP8bBaITwghuP3pTvQLXJS6dvaD5DRbBdA4Mw8zOEa7+geL1OsQ7+yOvoko+bx43BBdwXYQBFzSw9x4bJnP9XUxyJhIovcYmCjAsgG9AqPDgKpQKiq5p7taECjfE4GofInoONuM20StX+hC0cEkXKQyrgJkl5MEmlJSn61r6NSHEXEEKC0MFoYcL8IxJzdOZ7hMap5tOBrLKSUIFz27+EeoV2NaW3oKbX3BfhkPilbiCOjYtGyHxyfCPTUBEuhhYXr7EwFJ18/zDQzO7hFYuCjMpQEFDPZLLSvScIq/LLCwWXl+GjAIx5IxsnLl0Cf6hoXD39RZ85Alvfz/YOdhj05aNcHJxhK+/D0zMjHH56iVYS9xnGDC1sNWwYCgzjAISQ4KDq6dSSip5rPKh52F1Etvesl6RVI4KI3cvoTFcEOD2hgzw2x9+hkdC49766Av1CDQCGgUxAqudmP17/s33CvzmDh7B/cdPcVDCzbFTZ+S7bqmx8/HGzh4MTs6oV7AQ7JIg/42/5aYYy/uffanf+ejph3j67mcwGBIXTRWKK2ebBWxwxqdk5iMmPgWpGbkIFo7M2zSEkupm1dMDhDJy8IjeidZXABdA6L8TSET0XBFk4+IPKydfOHLFseADN1JFlwBM7z6CbKGZLsIm7AVIcu2jm284tpnaw0noIW+bSahhybaHfyTshQ3wMfZXNrF2hYOAR2snH92cg/fZmZN4JS1XcEFxuQx+IcJTMxCTnomccmEztfUIiIhGl8TH0d1zCEtKQHJRPtLKihGRkY6yBglzcYkokhBCY0hMy8S9x4/VCMxsbMQIvBUPBAYHISUtFcGhIXBwsoeFlTmuXLuKEPlsrs/gWg03Tz9dsMNSff+QCA2j/Gx2ERmb3aMDQ2No7O5V3aClr1+92NU7D3VTK65HZFjoGZLY39ajZ4YDZjJnF45rWpsLVViRxAplegLOdhrBmYtXcPrCZdx79AR3BRzy/uDYJPYuHMbFazdlPHNwdHkFd954rKVxfB23yr3LptiPPyQmWMGhU9d0iRRjbZgAB2YNWXGckJyhsY5HbEIqkgRosT0aB4jdz7mKiLTOTgaTvJ1GwLJu1gKw1ZyLgEUHAZHMA/A29xlmkshNbjvxcaGI3GGFA0uD4CBvNrLB0ZOX1Bj4PeZ2HkjiriRT+/T5kOhUXT29bosZDgt2YMUTPUFuRY2uRaAhZJdV6QXnJtFJ6dkYERS9ePI0ssQTZBUXoWt0GCMS94Nj41Hd3KYzhipfk+CLh09foP7E9HSYWFgiMDQMjk4usLS2QlhEOKxtbfDTl36Gew/uw9M3ALYOrrCyddIzDcLB2QMhkbGqJlIreOf5p8I0hrBTBoVaAZkCsQE9AnMQdx+/o93GuDKZuGBs17wah65WHp/VDa/KG9qVPhZUNihWIHhUqVlwD8vL58XAFsT1X7p+CyclFJw6fwlLlLDlfx08toS45DQsC4188533dE3CDcEpx0+e0f0dH735EQxG9i5q9856oU1E3VxnwJqCGIId+TN+/sFIlYtMg2AmcbdwTg8ftrkL1YGmAfAg12/uHkVlY48aAZNDqx6AM9/CxgNDI3uQllEKF7dgfYwDza123JkLkAHmoNuIMRGs8Da/g4Nd09yrpds0FIpWsUIdt5rY4fKth8gSxJ9eUK79lZILylTezS2rVgrY2bUTmRl5aG5sw6K4v+zMPLkvhtzeiVlxk2Q/Ld0DeiQLGObsY+sXcxsHcecewgbEEH2E6chtKzt7OLu4qUHsMDLBAcESPhSJnNzh6OKp3sA/KFyNISUzVxVESzsn3aa+vr1LjaBNACvPA8IOaAjNXf24LwPRMzSlq8BoDPwNPMgYuOUtm2UT4ZfUNunAU1hiyRsfo9GWCRPZd+goJgR/cMCndu/VZWh8jIbAAW/r6cGehQVcuHYN+48cwa0HD/D47WeCB97VFVIGPeP7dV+fqqZeVdPYm8DVw1/rCOITUuRPuiFLsEGyeAYuRlk4vAxzaxfteMqG0+T3FHHYe7ilZ0x3UzOyEupk5/ljOHBn6bkwhrGJ/UjPLHthBHJYC0XkoHPBK10/Zzjvc0dynrebO2o4YJErvQU36OK6SAuKR2IgZ6/cEXBZivgsrh8o1IUqLOqsa+1Ge9cAisRoywsqMNi+EysL4oVSclCeU4KK/BLslAGghkDXO7F7P6qbOpBdVIFzV28jMi5FYzsNnwyARuAu8T0oOBwuru6wsrbF5Ss3tCLbWQyAi3g9vAM0HFjaOCIrv1jDAY3p3Q8/USNo7e3HuAzQ8PSsagY0hLauIY3L3HV1YHy3bmfDsMDwwP2NmJ08I9w+p7RKO6TnV9Rq/oKZSrKL7v5hMfYeLK6cEa83hf2Hj2GP0MbRqV16f0AYAg2jZ3BQGQ/xTn1rqx70Htw97frtJzDglvJzh0+rEVBi5bJ0J1cfsfIgZMnMsbdzRo5cYHqGtMwC7JHYtGW7pTavsHDw1sE3c/BS2ti+c1IXfFrae2t3dGs52zj4CLiK1pm/a/dRZOdWwc0jVA8agYWNq265Yy90MT45R2afLw4ePSXPeSCnoFLeGyGf4Ynw6BRY2rrJ5wTC2T1AjMJLQNPtH8vKuJCEaxcLa5qU0pYUCyhMz0d5VgkOjO7G0swC8iNT0VXSgNLELPQI68jPL9edR+l2c0prxBC6cPPBE3gGhMHWxQubt5vBzdtf3T01gcDQCPkNDti02VCNgLWYdvYucHXzFuMQg5bbRqZWSMvOVynZztlddy6lAdADcG/j7qFRpYwUpgaE9dAIevonXhziAcgUCBh5Zu8CAkYaQIV4s7L6FvUEFIFIOcuq64X29ol3XkCneBmGhEPHl9UYGCYGx8dx/e5djE1No6mtHXv2H0BJRaWE5BLsEqrMNvnXbz9+UVRydOWaWMeAbnJBpZAGEBYejaTENDWCQnGzCfGpyJFZdFTAirWdq3Y/5aZUBIT0BqtGwA02rWTgWQvA2U9DcBWDsLLzwuDoHqRmlsLTW9B+UJw87yPAy0lmWoBgBH8UljaoYrl48rLed3ILVAPx8otEWlaxytp2Tt7y3lhs2GahLWVYS5AgM561AiwgySuvQ3VdKxpq23DxxAW0ymfu75/G8bF5zLUP4/mNNzHfNYKJjkEUi6GwYxvpF0NIiRjPjftvSngKUSVw3aZtKK9pQFFZpfwHH/EGPuINQuHp5YMLwstDQqPEKzjA/p+4gAaw1chMw8GqJ2CPQRpB+85B5e7Vre3qCZhP6BTKR2BIPMCDNQlMCXPLHJ6JGY4IlqmobxXAXaohggkjegfijOm5fQoCL1y9gcOLJ9T1r7AOUh6jNxienMSpCxeQmZunx7HlExidnMLOoWHcuvcGrt1+AzfviidgRo59dnqGZnCACzyDo7SsLCo6XgY+BW5uHiiXCxQVGYec3CIsnjiD7cYWMkMC1SUzJDh6hmi9IMvX6QmoBPI+MQHrBAkOaRSsamZ9oLOECf/QRH2McZ64gWif9YXECCx3o9vXQhPBCywnY+UT38uQYWzpqkITy6YT8wQH5JfqOkLmC5gPYIlcpuCb5somDIqHm++bxNvn72Bv+xCm6rsxIYaaF5uOAnkfM3/xQit5MCX8zgfP4R0QrPTPxcMTvoFByMnLRe/OPiwuH8eXX36O5eVFvP/hB0gT0LnF0EQNwMTSViVjZhRLKmvh5heo7ODtjz7R7mJUC7mcjQtF6zq6MLV/QfMHF27f1ZwCbw/OzGLXwkFd/Dp3+MUOKlQCCVyZv+BuKsUV1bob6pWbd3FkaQXnLl8X1P+moP9TGhYI/HjQE7R29SojYMjgSuXLQhEfvfUunrICiSVvwg64eZYBmyscW7ksLugArly/J6AwXuJ/BiKj4pCRkYWgoBAMD40jMiIW5RKT9s4fhLmVvXY04QCxSphAkGIQW7rTCOxkBrv6RsA7MFYHmsWiLFdn/x5mIlklxCoiU2t3pYoMHTQWPm4t3oPdPmgAPFYfo8DkKtiCBachUWlYt81cxS2uPIpOy0EkBS7xBMQIlIUzJBTUldejQSjriIDVQ2yiGZuG5rxytEiYKUjO0pVWKTn5yBc6WdHQhOaObp1NYVHR2GFqBjMrS6x9fQPsHGzh6u6ClNQElJYVChbwxbHFo+KRQrFxyw7VB9ZLiGAOgZnFiIRkmRy+WLd1Ox7IRV9YPqkqJUMAY/nEPEvQhCWMjeHcnTuoE+A2tm8fli5exNDsLLqGR3D36Vs4demKbohNukewx0UljPUfffoFzgglZFXxyrlLWtRCg6BH4O+nJ5idP6Dvef75LxQb0DM8ePMtZT+fffWt7qL24PF7Akzfh8Hg1LwaAdHptZsPECqDnZScjujoWORm5yExPgn79h1ASkoaamobxQgW4OLuo32NQmPStCychsDZX1rbobWHDh7Bum6Ag0dqyBlOQ2BHL85qGoAerCbyDIaxlYtqBWQLpIQseqUWYCuMYxUMekvYoV7ALd/ScsvxszVbsXTmGgpkoHO5rZ2wgBiZmUXVDWgQYNjS0oOO1h70dw7g+PwR3BcQOdTRh4VZmZHTuzE8OIL2nn7V2MvqBCfU1guA69R1faPT0yirqUFNQz26+nrR0taM2voaDI8Oob6xDq3tTSoWlVXVCk7KQ3ZesZ4r65qQmiXnxhYJi03wCQlX2Zjun+rlkMz0hq4eHBFvUN0mcb6tDTeePEHHMDu6NmF49250i2EwnzEgcZwNMT75+luN+XVCZTmjT5w5jydC9c5duqp0kLoAqeH5K9dxU1w8UT9DAtnBkaWTeE8oav/IuFDC0/j6V78RtvJQvQE9wZ0Hb7/wBMMz+3VL9p6BMRw+duJHD5CZmY20lHSECxiqFP4dF5eA3JxCHBHre8GF4wVAvTAALhqhItgksZaLQ6yd/VQwoptf1Qg4iwfH51Ep7pil43EpL5a28SArqW/r1wRWYUUTuGEnt+wlNSyuahH+PKuD3z82h/K6Dhn4RmUUtOT5hSXd/YPKGkvASZ90G7rlMzhzVvjy4in0dvfjzq37mBOXevTYoi7X2nf4sMTpARw7c051d/YdaO7u1WTM1du3dU3f47eevjjefhNf/OJz/Or7X+LzLz/Dh8/fUyP463/5d3z93W9UNubxt3/8d3z1y9/g+z/9Bb//699wTQbls29/pWsUWFzC2gIuWnnw7nu4+fgJLogX+PT773Fevm/l6lWcvn4dR86cwdL5Czh0cgX75bfSE5DnK2WVo1eMl0ZAiltR26Aon6IQjYOG8O6HH6vbp0hEgHj9zn3VC6gTfPLl12oEfN2DN9/GjTtvCjZ4GwZcMn1o6aygy2H0DYxqKKABFBcWoTi/ACFBwQgLCUVMjBhHeg6WT5xWLrzqCZgX4IIQ5gm4z09Dx9CPrjw0Ol1zBHTfDA2j0wtolLickVOBrLwq5JXWCy2rUTGIs5ufR0zAimZKyhSTSBHpFegl/MMS1Gj4elNLF+zdf1zrH9lMgxnDoOgEhCelISknD1klZVrcESQAlxduYXEZkckpSCsqgnNwAFKK5b8lJCAmLR2x6RmITk3T5w+eOImU3BzYe7hj/ZZNQnEdJVTZ4NV1awXoWQjit8fPXn1JEPekho3NhkbCloxhaGwGUytbCQnGAiqdYCEswsLBSY2rZ3QMY3N7VLWsbe/A/sUlHewxwQknxOUfkHBx7uZtLQo5dPKUtsK5//a7WjbG+sG65naMz8xJuOrR288++hQHjiyiS8AmZz31gCs376gqyEHfJQbCsMHBP3f5mtLGPmElfJwAkvhgceUsVi5cU5ptwK3YTwjKHh7bhZbWLpSWliM7MwtlpcWoLi9DamICsuUi8bE8AYZsoOwknoD5Bbpp3YRCDs5+hgPW/K1SRMZ7hgLGdXNbT10zkJRRomyBSN9SqCVDgnoUrxDVChgOuFSeAJD1DRSR+DoaAl9HIMnX7TC1w8mTl9QIsgUH5BRXIrOoHGmFpUjKzUdqQRHKJM4zXUx5+MTly8ioKEeS/K+kymKUdLYgo6wMOWXlqGhqRrKg58TsHFy8fQdh8XGaTnZwc9HD1dtTjNgf9i4OCAgNlAG2FAZzArkyUYzNrYTCOgur8f1xtvoFh8lr3bUe4bi4/gNLyxiZ3a0JrLb+AaF3veruWV1049GbmGESa2JKBSSGjv7JaWUPE3Pzus6QVJMJvbzicpWkiQVIQ6sk5NDVM94TD5AistqYeICUkUZCA6ERrCqLDBP5JeVqTCxVP3P5NgzYg5fb4Q2NzqC6phFVVTXIlEEvKypEbrrM5JhoZMosSZcjLTULA4OjMLewlRkWK4MSoUkdHtzImi6d+yszxjOec1aTQbhLyLBz8hWKOCdUTyiigMbVx3wDo3TLHaqQPPP+4smLShWt7NyVKvoFRQu3rRGeHodIAXeUih3l+65cuqsAMCkpC8mCCVLyCjRxxLxBqRgA42x6cTEKa2tx8PRpxBbkIbVSjLylAd1zuxCfm4uSunpB7nuRUVSMdBnUczduIjA6Cqb2dsJAnBCXngaPQD/4hgWrVzCzscKGrZsxuXsXcgoKsd3E/EcjsHd203NgWCQc3TyxwXCHUDwJRwIImaVk1pJH/yQHfFgFo3tvvaODzsFnzQEP0j+mwSkssWLIwtZRK5fsXTz0zAWn1C8ob1va22vtw96DBzEhoJKrkg8vLeltegIyhSIJ50nCfqgqEiQyfJBNcDXVrUfvwICNLNldiw0quNaAQDBUaFGyzIbUhFgE+3nDw8UVEWHhSEnOwG7hpoZG5uL6hB+7+WlWz9zBE9vMHTSG55c16Myl7EtljwcH28TCGX2DM4hNzFEDoCFQGKIYxBpG7s3MQWYvxaNL51QfoGGw3I2vYYkbDYKP8bk16w1x4fx1ZGUWqoiVnlOkYSAln7mDClQICq9ubUN8ZpbWDMwvLiJOqF5RazNiJRSUd3ciRUIDn+MsjUhKRn5lFS7fvYdQ+e/bLMzx2uZNGhYsnezh4OkmDCUGQRFheGnNq3rR84pKxSNZwMjMUv6ftYYEqovBEdHqDTYbmyrCZ9czHmw6zRoGGgC/k4IPO4r0jU9qXyQmlnibghJpIesH6QleXrNBq5l9g8K0cIWhgaVt1o6OYpBb5TdFYPHUKezev1+NgAdXJ9c2tSod5OwnuCQmoGf4/OvvlGJSiGK/RoPZA8uY3b8o7qFTVcGMtEyZ/bFIT0xEXqZ4gKR4xEnsC/QPUPFoZtcepYiUl72DotRdc8ZzsLmolaDNytH7RULIxf+fQlCgqoMsa08V/MDHvckq3AN0p3YOMs/spkoj4G6tQWHxOuOpFHLQ+Ro+T8WQr9m2wwpXJJ4xhGXmSUgoLkNhda16AA5mY3ePPFaqro+omuCPMz27vByZcpS1SDgoKUFmcYlQt1ENCw1d3Th7/YayBBsXNzFue/iFh8E/IlzPoXGx2GRsJEbhqBe8QD7b1c0L0TGCRSJixIuF6JGZVwgfOW8To2BMnjt4WLub0Bswo9k+MKjeh4NN9rAqJ1NRZAjg8nc9ZMLdfvBYtQcaAYtZqURyhdGr6zfKNQqXySPfL0Y7NbsLQ2OjQh3P4/DxRdwUY94l33FFPNsVAYq1wli4MQYTaY+EJl66flsl8rtPhB2wjmBGABZTxfQE7u4S/9wlrnl4IFpcoIezAwJ9/ZQudrT3CBg7LFzYGKY2LhqbOeup89MIWLFMdM/7DANUBOkFGP+t7DwxPL5XF7XSC4QIo6AMzJ3XGAY82alE3D7DAPfooQfg1nwcfBoLjYKv420aB8veVoQJVNWKy88pUL6fIx6A9QPZpWWoFk+QmVuAnNxClFfUKKsJEjddWFaJ5OxcAY6lKG9sQml9AwqqqhUT8EwjiE1Nxw5La5jY2mhIWG+4TQffwdNDD0PxEt0DA6okbt6yXZNsxqwl8PTB2tc3K5qnEVjaOao7ptDDg0YwvnuPuPxZmfETqiJyXSOVxJaendoKh1XDFIlYGDI5uxeHjp/Q2kUWsTIzyYOgjpTRT0B7eXUVrt68gZ7+nRiZGNdmlkcFg0zM7MKkfM9l+T+dvUKF5fN//bs/4qSwiC/UE9zBWcERd96UcMDSMtYN1rX2av2dl5cPYiIiERUWisKcTAR4eyAyNAzlEmcHh8Yxf+AYNhtZqQfgbOeAM/6b2rgpfeMOamZWrjr4PJtbu2kpu7G5k1jqHsUE3r6RCA1PVgnY0c1HvYq1g5uAKm8YmdsKgj2lYhSbZvF5excvubCZWvTq7OGnnVdfXrMRJ09fQEVNPXIKyU4ydVanCqNhvWBBaQW6uneiqrIOJQIYT6+c01zIgYUj+h7GSIpEhZXVKhQlCC2uaWlTIBcmdNjOTQbcwwvewaH6uJNcl/XbtiMqKQUGP39VOTo1eGYUjU3MEBoWoalnHq6eXmKosRI21mDh2DEcWTmJPpmlhVWVep7YM4eW3h4FbhR3GKup7rXLQDGOHzhyXB9/8u77+j2M4fQurHaOSUxRl35N6CUZSkdvp8T3Y3rQCI4sHsfo5ATuvvFAbgt9vnIVC/J5cxIO6Akev/WuPH5CNQWuV2A5mkHf9EEsX7glHH0YkzN74OcXgOTEJMUESQI44qIiUSp/lqyhoroBu4VSshKIfYCZ26eAQ9ROQ1gNB/QALh7BMqtD9fANjNFwMD59QI3Aw0tmvQBAxnjOaPZRZuIqMCxGB/rEmUuCwqO1hyINg51V23sGte6RqW4+5+zho1ZdXl2nUipnd2F1jbr1ksoaFAsY6ts5hBr5zY31LaoT1AnwPSOG09wiLEY8W7p4j0Shw+ViFDxzUFidQ+PwD4+EV1CIGoJnYLAahUdAkApLDBVnL11FoXiczVu2aVYxIlJYko+vppy9/PwF+yTBzsUFN+7dw1sffYiz165iz+FDmF04gNFZdjOfVgTPz5mTmT8+s1sVPtI4onkifap9fI6x3dnDW65TqN5niCEmYdVTWna6GMxN8Qz14v7nBOSvaGhgVRSLYub27VePNSNhhoO/zKX04nFuipFRabz5xmMYDO5ZwsrVN7TP3syeBU0fFxUUo7SwQKhhGlIS4lHBC1taKTy1DwvHT2uugNIwOTsVPdI38vle7gXcPqgJnuDwJETFZUq8ykJcUq6GgN17jiE3v1qNwEfcPPdjZq4iNCJe2+Q4u/lqj6Slk+e1WQafY4MMLotvau3RtrukskGhMapVnBS3WCYuvLiyEgmZGYrwtWRMZk28uOT0jBxlNDSCM6fOK7Ctb2gRVF+sWIGKH8NDTUOzCi+F4j0ouVbWNSrCN7O2w1YjU6zbtBU7BPzZCfrnYFALIOXKku8yMPgpLCR0GAkI9PH1V8/AWB0VFy+02FaR+pNnzzSNSyOY2b9PDaB7eAit3d2a5TskoHV81y4cPH5c8/4jU1PqQXjmUvM8wS6R8fEKANm3mF5gZGpC/qd4r8ZqCQ9LQhPH0NDaqB6B2MBa2A2lb2YPuR3OTsEfk+Jxjku4YQX22OQslk+fx7Xb92HQPnFAW9Wypr2uqRuJSWkokItYIvSHRhAbHYNKcZmMq61d/WDLu5i0IplxTVrrt1oWRnDY1jUiF7Rb0T+BH4/A0AQBfXGKC0bH51FQVAcvnwgEChbggPOgATAzuXpmuprZTN729gsVNmKJsMgE2Ni74fjyWTWCDZsM1QgaGpvRKCyAhlAk9JbyL917ngDFaUHRO/uGMDY6hTu3H6C3b/BF31+hYQRqlTLwNIiWjm60Cnhsbu9STZ4t4AJCI3TmMdQwXUtvwxBTIwArW95Dlz0jnxMTG48s8ULFJWVyjar097QLKB0QsBkSFaV5fKqTXf39mNy7R71A284+rWzuHRrC6YsX1VA4uJ07d+oxNDGh72Hen6jfw08oanAwgiMj9XU0nPlDC+LJMlBVXym447iEkVH1BkeWjmJWvsfJjSHZWY2AaeNkCX9DY5PiyQ+gq3dQq69pBNfvPIBB6+h+HDl7V3vqZ+SXa11hQUGRikPEBva2doiPF6ZQWKbbr9II2LQqhN1FAl7sqEqWYOfqi/rmHt1vmQje95/unsjelTUAcnuA+/vVtcvMT0RyWr4OLMu12TizrrEN7V07harW4IYMWGfPAHbvXUCLgNHxqd1qudz4ka9hFTT7LN7+pxR88OgxvWicZUfFHZIJUCZluvTM2Yua72A8ZHylDkB5dvnCRVXPDh9ZxN17DzG7ex7dEg4OHD6Gr3/5Pd5//ineef8jfPXdr/VzHjx+ik+/+Abf/+5PeO/5ZyrO/L//+T/x/gcf4dff/1aP3/z29/jhT/+C3/7xB/zhz3L+059wUb7rk1/8Ar/78581LDz54H189Zvvce/pE21P/9azd7X/4JN33pbQcefFY+8/k/dd1ePanVuIToxHeGy0eINYLYFnE+tjJ5cRnRAjHkzwzoVTElo6JJx1iyc7q+AwWSbw1h1GCg7Pindj2Lx8/ZYyhbsP3sRb736odYbcu8Gga1JizK23UFTdooJLZlaeMIEcxQK97e2IFmqUIK6NNKiwrAZDk3s0a0i5mNJuak6JHoERCRIOJmVWDWhrm6x/7ryemlmEsKhk7ZE4u+cwdg5OISO7RFC9zN6yasUZKek52k+ZBa0sbJ3ZvU8fY6NtZjVpKHwuKDRK2+1GxiRi49btmJ7ehWqhhc0C3CqF73OFEF1nUUUF8ktLkSuzuKahUX5LocyAfTqD0yXMZZWVKY0kbsgVellaUomq6nqUllXpOb+gBIbbTRTx8+zh6asHi0lMzaxgbGYtM6xTS9XMzCzg5OSiB2/bOzgpULSwsRVQbKP5+/OXr6BRrmVHXx+ae7p1TcOu+Xm5Xv1idIcUzM3M7cb07lnM7turj+0/cki8ybBw/otC7xowMTujyaz2XqGxFy/oa/YcEJrZ3yW44pyGg6HxYcEA89h7YL8yBkdXN/FsF7Eixh8dn6Qe4cad+3jj8du4LhPo9LnLQkEFGHYN79bq3gH212vuQFNdLapKi5AUFY7ctATkpCSqaESjYGJpRFyrm9A3UjnG+fDoNKF58coCSBFTc8qULjJErDIH6gaWth5oaNmJ7PwqxQxU/rwDQoQZyAX2DdCDlMrJ3Uvz4hRcGIPdffyVbnn6Bf4IjmwcXQSAOcoM34+8gnykitVnZGXKoBcI8MwUF58vHqlCjSMrJxs1EiKWT54Qg8wSHCCMoLwceYIfamrqNNTVyizJF0aRlZWDpaUTaJH3eQggZC2FscR60mZHR2fY2tojJETwjHeAXqvuth4YCV12tHeBp7uwGFsnuDi5w8HOGRbmNrC2skdnV5/SU1K0UUH+DEeM0eTwHFRWLXO7mubWFt3EiobQ3tkhrxnD5PSUgN/TcBHX7uHjrVXPto4O6OzuQmJqilz3YKRkpgpLKVKDqW9uktef1d3QWAvhExAsj4/rwNPDPfvgE91Olzusf/bltzjGCuQHb8Cgf3SPZuKqZEamp2YIIMxDc3UF2usqUV2UjZbqMgx0tqGrtQmtwqtHRyZhK3/S3euFAMT4z4OKYNfAFIoqm38ceOYDXH3CVD0kdqBYVFrZIvQpXRXAaAGhLPOOiE3QGMzBphRKhEzj4MGkDPX46IRkvR/Emj83T7y6YYO48mNISklGuoDCgqJCVApnrpBBrqqpxgipmFAolorni3GclDDB1xWVFCMtIx3lYiRMlOXk5GFyYpfK5RUSio7IZ7a1dmkdheE2Y9jZOSAwIPSFIQgYDRSm4CEDniPginWKm9ZthtkOc7g6e8DNRS486w3dvOHm6gUXeYw4hLSUXJ2bVmrtnwxMZ2+fDvwJoY9Hjh1Fn/D8neIZhmQwh0dHMCPYoaWtVTe2cnByhOGO7VrxvGnLZuyZ34s4AewuHu5Cv51kgtmoJ2FldEdPL/YdPKTMIFboJD0WmQFB8JXrd3Rj7YtXbuLshatYOXUOjx4/gUHnzilxIYuobWjVmZ4hFzVDZn5hVgq6m2pRX1aoRlFZWoIGQc0jwxMwEysnkl9VBHm8vsX8RS/EkjrVEGgEPNMgeDY0c5BQwQxiuTIHSsUs5oxNSkVolHiGuERF7Jzp9AR8nF4hPCZekTplWBoDF4iERcdhoyGB4Wmt+uHA0yOUlpehtb1NDaKQs2NoUD0En78u7pEGkZufp0bQ3tGlTKGwqAxT03MaCioq63TWModiY+uoZXZm5tbYZmgCZxcP+IsxuLh6wtrGUdlSZ0cvXl+/ERbCHOg5GBJYjezh6a2AcZvhDhmAPcLTjyoTYNUvdQICPwJGeoIz586qgY7KzO/u7cGsDObi8pJ6BQ42jcBXqKCRiTGcXJyxdv06NMqMp2HQALZsN1TvR0aQJ/+bFLGnf0ANYXr3XmUE1AgmhILee+OJhoHzl67j+ae/UKZwlxRxWLg71++znDw1NR1hocFIio1ESW46irJTERXkj7jIMISLK6oW/j23Zz8sLByEormrjk8dgAzAxsFb1wak51VoODCydFZFkUawun6ACSQ2v2IIofoXEBqJBPE+HGTOcA6wsYW16txu3n5qHBx4un96CWbmGDYomhj87Gd6sTijeVE42znwbR3t+hjDQFNLsw46DeXy1SvIzs1BQ1MjisWgiejrm9q1MpiNvHnmKmxy5+a2Xl1y7uLup4kashG/4HClqCwj325shRqhnb19/TAxFS/g6g5fvwDFA5YCpDkL07KyZYB2KM3jQTZA4EqhqF1mPVc3d8qgM0wdPX4M45MT6g12y/PnLpzXEMHH+LujYqJhZWMNY1MTvLZ2jW6ASe9hJ4bg6umhGU0KRPw8LpSlEZAeGvzkJZW2yXooZxNTEWTn5JfovhbUCwgUDbgzyMkz19HW2Y+JyV2aQcxKTUJKfDSKcjORGBOh973c3JGXk68o2traWS8IpV4zW1fdJ8lEHusfm0VyVpEyBVYju3gH621XnxAYWzlpfT3XCUTEpyMqMV1mf5LOdM7ykMgYRAl4MbexVwGFnoHegM95+QepEfA1NA7ed/f11QtRXlkmgypsJle8WFa6niuqyrUCKCcvW9x/ocz8VJy/eA7J8j9KyopRVlEqmCQOueIFuHqJIJapaDIbrgnsE/C6xdhS/58NxSxhOsZWDloUy51g1mzYrqlcVvFyIDy8POHl56u0jAdFnJSsDGwx2o669hYZeAF8C/sEFHaivqsNw7NTQhd3C3cfxOmzp/Q4fFSA3vycGMGsGMFZvPn0MT7+9DlOnVmRMFeB2Hj57x6uMLMw1f93/417EhadZILY4pR4E25+1SThg8CQBaWsjSRFZLqb8rm5tZ0C6gOHjovR16pWsFfCFHMIBtwLkJs3tXbsxPy+g0hPT0dxfg7Sk+IQGyEXPtBHQ4SluYU8l4mjx5YRHh4vPLxSLKwfsSk5Wnls6eAhmGACSZmFOvA0AK5NYGk4jYTG0tk/Lhe9VJkEjYCLXVeBH42BZ4oypG4MBbxPT0AvwYGnB6AnoCHsMDfH/oUDqK6tklmfiYSkeD0XFOXrINMw8gXfcCUxH7t+8xriE+P0oIHwglXVN6Owog6lNS3iwUpQXNWktf9cA7Bhm8y6jTvEm/mgvq0PIdGJWLPJSMKaje4Qd/bSNY3rRmamcoGthA3ITDU304PgLSohDus2b8SUDCzTzoUycJ2DAg7n2JtoAAOT4v77e7By+iSWTixK6OpHvzw/NkEsMy7/bd8/F78uoqauGjFx0bC1t1EjyCvIVSOJS45Xmnjr3l31AlQM3xMaeurcebR1dat6mS5Mr29wRPCDt4xxL5ZXzuHo4gpu33uEfYeOaTbRgG1jWeJNRW50bAoRERHIFOQZJ+wgPiYc0RHBigcc5AOJGVbDAWVeZv44yDzoCVo7B3VvBCZ5eFAnoGZA108guPfQsnYPCRAj4ppHpkYJ9ggKOev9Q8KVARATEBsQMNIIKKnSMDj4PPg69g7YJUi6oaleZwqXi7MOcOcAAVeTDvSBg/t11uSKUV+8fEHPNIgumZGcMSzKKBQswFXXnNlMonFBx8jkbs3c8T9yJRHXZjKFy/wF6xL5utn5BY33jhKXebgJSHN2dYG9GAA9AxkKpduZvXP47Bdf6j4EpH+HZFBXzp9F585eFXiOHDusRas9fd1aw3jw8IKe+/p7Bd+0CGY4LWGuQJhBAAIkNEfFRKphzIknobHT+Pn+6V2C7fbuwYVLF3H1+jUNJzv7B9E/MKSFQMQ4PJ87f1lwz7KKRfsOLeLSzfsSDsb3aP6eamC3/MGAgAAkxMciJiL0RyOoKC8V8GOOqKgYrTw2Nnmh4DG5w80zOePN7dyEk3fqghG6UYpEzA8wG0hD8PILVx2BnoDiErfh5cpnunuWeHPWE/VztjNBEp+SroZAvLAKDHmmvk9DWbPhdeyVgWxqadQLSLfPGcPB523OpnsP7urzdQ216mLpKegdaCTEE1QLKRV39Q2gSkBvWlauIniqh6wPoPT8mgC/NRs2aQm6l9BULkDhQhRKzXv27sP27dvx2muvwVCAqpWVFUxMTIRWGiM4OBg2drYKShn3V06fUrdNXZ+JnoNHj2BQPAL7HczO7dJBXTh0AMeXjgkzmNYzDXhoZFANIzQ8RKiisxr7/P69+MXXXyIzO0MYT5q+lkZw+uwZBZL8PgLiuPhEpccLB4+qzrG4tIKbt+7huHgCCnI/GsHgxF7N3ze0dipS9vf3R3JSgtAiH6SnxMPJ3gqxMVHqCZKSUnBw4aguTaOow7UHjJFM6tg4uqOlvQ95hRXa7IpyLxtgUQomfmARCpNAnEW+IVESEuJegC4Z2MjYBF3cycoclmuRQkUJJuASMD5vITiBawJ58Ul5+JixhKdji8dlNpQrKCTyX2UCfIwUkReEtKu6tkYu1KICLz5OCsn3FhaVIDevQJkCJV9KvxWV1eIRJzQp5Ca0MCo6Fnn5giskFPLg63k+fnwJi8eOIzE+AX4+vlqHSZU1LiYW4ULVert74O7qht27ZjE9PQ1HR0cUFBSgubkZaWlpiIyMFMpnobOZrp/L3kPCgtXtc3YnpSRqqKOREAts2bZZjMpavQENht6AoY3ej0WvI2PDwi669HFukEnPRJZCGj0wOKxA+PSZC1ojSlxHbLB06gLuPHobBpydTN1m5rCePkT4sDvCw4IQFOiLwrxMODtYw9nJDhbmpoiOjMLMzKyKJrQsljp5iMuMFtdOrb+zZ0iXdrELqpcAQ3+/MPk8MRIBhjSMsck5XSjK+sS45HQd5HChe6zQKRXmwVnIMxErZya1fT7HY2p2jwCxXXrkF5dpzf+p02cVF3BWk2+Tbt28fUuPu/fvSdx8goePHylV/PVvvtcZQlf5+Mmbuqr42LFjOHr0MFZWVnDt2hXs27cPPT1d+Mc//oHf/e43+OGHH3Sxya9+9Ss5vsO3336LP/7x9/j4449x49p1/Mf//t/xy6+/Af4X8Le//FWP//Wf/0PP33z5C/zlhz9hZWkZH7z7DG89eYrn73+AB/fu47uvvsYnzz/Gd999J/TwBD79/BM8evMhPnz+Aa5cu6z45cHD++oh9h2YF9d+EB1d7Rr26MkYLvgeejTigwuXzutr2jvb5D8uqcbA0NDS2i40uElCwEXsmp3DhYtX8cWX36g+cOfBI5w8exEPnr4Hg5HxWZUPWXzhRVUq0B8hwf4ID/FHWLAf7G3M4SyAJECeyxF+vWt6BlERkSq0sFUL27NQ0uXSdfYF6pJBTpNBzhJ3X1ZcpesYuTKYC1ynZ+fROziqK3Qqaht1wCndksZwoCnv0ihYTl1SUa3r/+myKXlyQWiGsJM4wQ48WMtHC6+sqkG6YJXYOJmR/oG6RIwzwNbOQTi+JdyFv3M18dLySYmL9giPEK/m6KyiS0hIEIoKc5GUKB5PULajgx0y0pOxX2L3TwwMYLTDEG6ujvDz9ZbDE64uTjAz3QEHe1vEx8Vg6egxrH35NbjaO8PW3BpGW7bDWqilqaGxPsZzXkYOJofHsX2zITzEgzoLxQzw8oOPh6d4Sg8VhA4cXFAtgMJXZLRMjMgI9V6kttQ9qBzW1tepkkg6zNvEAVMzk8IoZnVlFFkEsQ6NgK+nVkKqTDrc2taB/IIiTQkMDo2pgMUJNzo1q/WKBsNj03KBTqGouFRQf6iEgjhkpCYgOyMZKYkxSIiNQHJCtDCERFQJverr6nyRT0hIQFJaplINck7uj9DY0Ia87CL4eQchKTYF4UGRYkhRiI1KhItQrb6dwygqrYKXb5B6ES7u9BbU7+zupQPNkJCYmqFFEJzxNIzVpeH8LltHF0W5NABW8BDoeHn7wsDgJfzspZ9jh5GZcnUra3tN6VIA2rptOyyt7HD+wiW88uo6GG430tfzfebi3by83ZCbkyEGYoHNm9bLhUrFlAA2e/GA1lZm2Ga4CVs2b4CrmyPchZI5OdMrGiNUDOioUKw1L70Ke0tbNQKz7SYI8QuCo3y/4cat2LhmA7JSMnBIQCRf4+3qCU9ndzUCfzkoMFHFJMClGrh56xb4BUg4FmBuYWWJbdsN1YtR3KJO4OrupgeNgGHPysYSdvI7yRgIkKtqKhVnMATSmDZsfF0FJoLDLVsN5VoYSejrkf9krOtLuvuGtHLZgIUXo6PjSg0pFDEUEAvQEGLCAxEV6o/IED+ESXhorqvCoMSdeGEOocEhuhaPYSQqOkHCRzh2Te1Be1MnQnxDEScMwFXAorcAxxgJFTSM6ak5lafZ1cPC2kEHkwO8zchU4zwLPZjq5OIKKlz7Dh7RQTezslVQ5i/gkPiBBw3ooFCcF6VdlvrHNm/ZAROZibzvKRc5UwyUhrF23SbNJq7fsEWTQNt3mKkSuGXbVu1ElpqajB3G22EkvJ6ofGRkCAY/MdD79o522LZtiz5vZ2cjyN9djMhAALQfTsvk2bh2Ezav3wIrU2ts22gIO0t7me0uSIxJ0vtVpdWYGp3GSwYvw1ropaONk77HRv4TE05UFjlINE7WJRCLUHhiaLazdxRDrkBTc6sWr/D5hMRkxSn0EPw9pmY7BLNkyWvqUFZWgkOHFjSsEYdYW1vLfxMPPTEloNVGq8ZWVk4rrnv46KlONhaXGPAHTExMoKKiDJUVJcjLzUBtVSkqy/LlD+SjrrIYtRVFyE5LwNhgH3ZNjCDI10vDg5WlnVx0K3GTXnCwdcFI/xhahAIGCyMIF4ZgvtUMbjauSIgUkCdAcWx4Slc4e3r5qzfQWn0Xd/UEXMBBY+DMZ2eRiJh4mFraqHcIi4pVtL7qBQgU+b6Fg8d0Uw5TM2s1gC1bjXSFMG9v2rxdVwxbWtljw+tbcUD++Ms/X6sG4iFGSOPgReVaQ0qy62TWmFmYo6WjXWPqS6++otRvzYb1MLe0ULq3Xl7LNnbU8T29vQQYnoCJkTl2GJrAUL57/dqN2L7NGFYWtkiS8Lhlw1bNJewW42dSyXibiQy+PewFJDvJ77SzdUJ0TBzGZZBoBAxlAYHBCuIYtjKzctDY1ILaugb9rTSE7TuMkSGh+PMvvxBwGa5GcGBBqOfh/ejr68H8/B7Mzc3h6tWrqK+vFzCfhLNnzyu9TxQDOnnyFM6euYgb1++oLnTx6g0xgv5+HD18BN1dHdg1OYbhgR6MD+3EUF8HmmrLMdDbgrH+DjTXlGDX2ACOL+xBmJ836sQdhQtD4EUvE2uny+/t2InqkhqkRqcgKy4DRuu3w8HMXr1CWGCEGkFGeq4moLiAhbOZbp3nV9e9rqoWcQDLoEjPQiNjEBASrnX9xAF8HR8jg6DRjI3PCIaJhI2NC7ZuNcUrr7wuVM1cj82bjcXd2wtdsxbaZoNLl27JzLaCpaWj6hwRkXFaLr55xw6tC2T9vrW9A6oaGrQ+gWKUk5s7XLy85DujEBAWJuHICUYWFvKbN6pBHl88ibVrNsJWZrexkYUMKrOHtrC0sBOckY4d20zh6xOEleWzOlHMjK0EZHvATRjTVjFUgmv/gBAtfqFRknUZGZvrinDeHp+YQVt7txb08L6Do6tcN3cxglx88unnArpd5XFb7Ns/J7G+D01NDVhY2K/egJM6NzcX9vK/rly5pimB+vpGXL9+E4cPH9XzIZ5v3IJBh8T4gwcPIicnCzXV5SgpzEFWehIyU+LEpYUhNyMJ6UkxiAj2FW+QhPGRfjgJVRkbHUZf76C2a+HmGAmCAYb6RtDT2ov81Dx4OXgiwkfYga0bPBw9xQ06Y2RwQoBYuTZ0sJf3McZzVjPbRQ9Aj0Ag+PlX32qFDyt+iBEYKsgkeJvhg1ydlb3z+w7p5hzuHr76mRbimfh72DyCO7rRCxCQcvYfO35SPYKbu4++nvULzEVsNTXXzKWz94sVRJWNzVrYaSogksvJWGdI/eKna9bBRDyTlZOL6hQUrVik8craDfp7Nm3boVoC1yAQkzBUviaYgMv6iLlefW29fLc3rG0c5HfaKkij22c44GCYW1jp7GcIINBl4erQ8CiGR8YU5TMxRUAbHBImIbUWb7/7jtDNRnlPsFyH3WIww5iamsD9+3dx69YNNDbWi7Gz1sFJPQGTW5OT03j06E3s2TOPp2+9I+87oFjJoF8Gk736KLJUVQkFycsSFpCK/Jx0BYcxkSEoLcoVvBAgPDpfXOWkxkVmvQjcaJ1sZLFR4m1HcycaqxoRKYAwLT4Ngx39yErO0jjJXHtPd7/Er2IdfNYDrJX3WMt7WSjCVi/s+8P1/pQ2uTqaLWBYwLFZXCybQoVFxunrfWSA6QnoRon+6SqZsdu4aZvE/42a6eNAEPx4+wTIBY3CxUvXtDCG5XNcdU2mYSRxcouZObbLABj8/BWtJm7u7dPys5+sXQdrZ1fYiDeYnt+PY2fO6rKywOgYXVRSJzF55dJFGPzUQNcscpnaz9et0dtGFmZaDbRm4wbEJidqX8SX176GTdu3YZuJEawdBTiaGmtCyMfPVynuK6+9qsCQzbEIDtkgi0d9Y4Omv5k1ZCs9/8AApX+37twUwJiMwBBfYRfzQpX34tyF08IOjitDoGxOlkHAOSKYz9vHT0Eh6eHwyIQY3nHsP3BYAbgB690OCFfOEjqSLD/Y388Hvp5u8JOBjgwNgqerEzzcnQVIGalaxRKmn73yc2w3M1H3SFfN2nsi7raWTqSJG3z1J68iOiQafe19yBH3780tbmVW0giy84uUEVAldHbzhp2jm/ZK5IIWDjDPR2TWsqrILzBMV0Cz1OzW3YfaRY0GQ2NYt3GLNo+Kjo0R0Gakci0NYpUakhZSAOru6VMgRYpI/COUXsWh2sYmGQhTbDM3g5/MOu+QYDgKtWwQGjY0NQM7QeHl4j5dZZDcZMYmZmVqBTIzgK29O5FekI8zly5IONkqg2qr55yiPLkuRlgnbCI1Ox12Lg56/uDTj7B4allCTQ3ySgoQGc/1mS66uJXiEBNHFIt4MHdAQcg/0E+pHzUAKobBMhZ8LWVjKopcGT0xNYrahkocXzqC2blpee8wVk4vq8bwQlBaVqawcPCw4gyKRNe46OT8Zbz55B0cOrak1UYGLFfaJzyVtCROuC+NgJIxVx6Fy48J9veBj7e7UqjE5AQtZtyweZMmSeydXeT2FolTrvAWd9rS1IqU+GSlRsZbdyA9MRUhgt69ODNl1g0NjWjPnOBwNrAIVJdOoMd4zxhL77B1h4kKQ8QEfJ6sgC6W4YJ4gMWSPJMpqIX7+ihgMzEzVZfJg3oAK3+pF/ACuLp56Pne/Tdw5ep1TMogE3QZ0QvQmJ3FkxlulZm6XVvZzh86BBsnYS8+8t+DAhQf/OSVl7XDuae/L1y9vbXn8aXrl9UTbNjyuq5YNjTZDr9gf6wXIwiNCoOlnRVyxTBu3b+tPZELy4o062frZKcZQGNTI1UJyfm3bd8KZ5lwnt4e2iyTySLephbw7P13BaQ6qGIYHhmmkviDh3fFWOTaJUapd94rIYF9E+gRmI+gXL5OQC09Dbu1MeXNcFNWXikTxUlDE9XRnNx8GHDlCmXG+PhYREaEwcvNWShhoAxmjJaV+YlX8BALdRWrzssTtNrcgJfFExjK7NtmZIzX1m9QDsrZV8/q3axcmAvI8XLxUG5sbWalRRcmJmbokVlJBctf6KWTh4cOOj0J9XnGVAI+5sApFlE2pnBEekhwuKoNECdU1zfJ634qgGoWQTKD6T5NzUkFN+AnP31JwsIWLQUn4rYU47O2sdMCFMZbInAepIe8SJu3b1EubWVvLRfeDnnF+dh3YD+MLUxUwPn52lfUDXMQySLCYyLUbdMrcvA2isunvuLmxjpDBwQHByIrK0O9KmlkVFQEdu2aVjrH297eFInclJqyAwpT29T+vXw8deBJRb2FfdE4KCnTA/Cabzcy1Md5MEfCLKJ/oA+y89IxvWsCu/fMoL2zRUMDVUhK0e6eHqov7D9wED/92cuKO84IPhgZncTpM+e0cIXZS4OxiXEsLh5DVma6Jo4C5MeEiSuKkx+RmRgnnFcooHBlO1tLZMprKF++9POX1QXTEBxdXfQi8csGdvajpKgYWzduggMLLY1N9GxjZa0otbe3V+lXgcS4kopyBTh01Z1dPUqFCIIIhu7cvS/Ie1l/MC2XB2fv1PQuVQnpzilusXi0oKQU/cMjmtZt7ezSggp26RqfnsEbjx7ivQ/ex9nz5/D8k49x/40HuHPvLh4/foynT58KQr4qF6EPg4P9OoN6xStmCRb64Yc/4LtffY0//OF3+MMPv8Wf//wDvvzqMz1/9c0X+I//+D8UfP3wx9/jv/7jf8Pvfvs9/vHvf8f/9z//E3/7t7/iyy8+w1/+5U/4H//5/+D8uTP47W9+jW+/+Qofffg+Pnj/Gd579g6++upL+Y5vsXLuFN5+/x08++g9fChh4+K1S7h2+zo+//oLnDhzEjuH+3VxSa/QcxaScsXR9NyM9lbuH+zFxOSI0sM5MYJJCQ+ki+ypdPz4UZXDbWxs5Lfewg6yIJmIZAqzs3M4c+aMXM8xYRW9MOgS9zc+NqIhgK6fGkC4nBPkfox4BH93Ch+R8PFwRWpKEvr7+4RmWSqAiYylWw5SAELA0tnZiWaJtVlp6bqcnQtb87LY8SRVQk0choeHdZbRAJjPpztnzO7q7lUEzMLQ+IQkTXpwoOskJtNAKA2TK7Omn1kxGkCKUB6Wba22ZCsur9AVQTyS5PvLq2tUaYtPTNBCTeYYNMmUkaGZUi+hfpypMbERQrkkFMZHaS+i4BB/XL5yXvi6jwDJcEH38YiNi5TvzENCYow+xueCgv1w6eJ5mSAOSEtK1ELcsKBAVVN5P0I8FG8nyjU6c/KETAgjuYbuutQ/Rq6dm6uzXMNQePh66sC7Scj1DpDw5+/9Y50AO6snpSdrJXF8SgISUhP14OM0hIysVAG5caiuKZdr2KZGQKMYk/Gsq6tBW1ub5oLu378vHshbWxBRLBobm8BpAat7aTiT4gm62prR09Gqi0+5DJ1VxjQAegF6AzWI6Aj5U4EozM1BZ0cbtmzaLJzbSF2moalYmKWpuMhNKC0tRmhoMDZveh3rBSm/8vOXhA9vEg69Xbj7Vn2emS5mv1j1k5OTg5SUFFUrMzMzhec2oaysDEePHhWmUoWioiJ9fPWIjY1FS0uLqmEsFeOiS4aV9Vu2aDw3FM/Dkq6fvfySyq7EORR61q1bh8uXL6vS91ODn2CT8PxXX31VjNkcr2/aIJhinZ7ZxJp5e4Iq3mbq1nDHNkHpVhqf+boNG9erGzcVdH/zxjX8TD7T3dkJmyW0OIg39BZAuV6Qvsl2Q73PgT9/+hRe+dlPsZaAestmGAqmMhWWwBBk7+qISzeu4LXX12LD1o0KJvkYweYOc2P4hwaiubMVr2/bhC1G2/QxS3nf2PS4hEJ/YUYmiBAGR0NobqmXEDmuA0zVc82aVzX0LC8vw9PTU6/3qVOnVFE8eWIJE6O96O2uhwFLx0ryc1QWpgiUJYAwVuJQogCQwsw0NQqGhyh5jAmkEkHF69asxbZt29QIXln/Gl7bsEZjJ7XrCMEV27Zuxmuvyh+Wgd+yeaPeXysUqaamSos+WObFPHh2drbKmoWFhQgJCZE4mqw/lINMI6D3KCmRWV5cLFYcrY81NjaisrJSNfellVMq8hC4UfTZbmKK17dsxVbDbarqMeYz37927VocPLAAw60yoJZWMghb1BCIbTbKxSW45IwkTuDaPmYbI2Ij9f5Lr72soY6bXtDbbREWQExAQ7h29TIshQ5aCtWzsxVMIQbnKRedZ+IrZ8EYXp7uuH75kiakPCV0eri76uudnR3xqlw7DupJCQmbBJuYWJnp2VvGgkwiv7QQxZWlGBiTAd24DmYCPvk8zwwh1bUV6qXaO5px9NhB8Zqt2C0s4cqVSxraLOS38XsGBgZUL2CNAw3i8OHDqK4qw9yuEQztbIYBB5oDXpKTqQYQHeKHxKgQZCRGoyw/EynN1joiAAAyCElEQVSx4hmiwxUg1ldXyZv6YCazgGDI/J8/ytXLTS9O784eneWcJQRMZoK8maQxNt6hRlBeXqqCBrEB4jEdzsX/X9R3x1V1Ld/zotEYu7H3GHsv2BULKh1REZDeewcpgqJSBMSCNAFRARGxgBWxY8Hee++mmF5eS/Le+s0av3m/P/bn3Hvuueeeu2f2zFqzZ/a2trYUJbCBnZ2tRrcIOtkIqMrKtiqYojYbG89Q0Mr4Pr9nIS6J3zM1NxOKk48JRkbCvbsJyu8hzKKTgNXOKjwqQfv27TUPgpZp3epMdJHzPeTzPkINXQRLkKf3FOG17dARBo0/woAhQ+Hg+gFrMD+Q1cVMEePnhpMmaKEp2QQji5PFpO/duxcTJ07U3+CM4KgRI1VxWbVF68b3dD2FBRvRqlUrDBowEEOGDEHXzl3Qt29fHUSNP22C9fkbhHn0U6s6UtwBhW8xzwoxiXEICAtClOABQ2EdtAC8jnSUGMLNw1ndWOLSOFWA6MXhyMhMFTqcq8rg6ekuOKCLRhBpoa2sLFBdvVtDy4ujhQrHBCEswAkG1mQBs2YgyNsVYf6e8HC0RYCns77mOU8Xe0SGBMhxEZKTEpEovPMToUtDxacNELNF7Z1lNlvX8WGGD5Mh+MM0tQMG9BNq2EuV4jNxC/RTK1YkiV+2UuGbmZnoa0dHBxnxi1QJTExmo7y8FGvXchJkhSoLP3dwsFMFoFLY2s5X5E5MQCVoLVaJjUCVwRGC1jZt2mhSR9eOndDko7+hpKAAndq2RZumn2Bgr95ISliicXgWjQ4Uv8lwcPc+fbRyibWBTGlnDSBpIq0Ml7//TFwgLc/chQthJtiCUTsKtV+/fjrKqBBT5DpmF9HCETsxmaSiogIfffSRZh/xs9atW6sCtmjbUhS4EwoFANIVULjjp07U99uEftICRMRGqZJQMfg5+5vugjiC4WJfP0/FAcWbChToLV0Wr0BxzdoMsQAxiuFCQ4Ph5+cjrjRA+5s5FC7O9gjwcYS3qw0MbAX4mM+YgsXBfsjJSkNyYjQSooN1riA0wEuVIDzIT6OHYcI9g/y81Q9yKrVbr57Kr5lU2VWE7h8cpGDxk0+bqcmkWW7dto0owGc6Kr28vNQ0sYNo2jlnzoIRHjlPzpRx49mzNAWbQQ7WEtjMn/e/WgEnF2edH+dUKt+nZa7Wat0ewj4Y/6fZ1owaGZWDBw7CoIH9FZB1kd/fJArTRJ57uijPPJM5mGRoqFSxQ49eGhrmmgRd+/TVdQpYyzjUcJy+ZyBpuqm5hpG5RgEDRxNnGKvlYTo4MQcVklSVlGzy1Ck63cv/wogfJ5oqKrdrHIMAlZ/xeroggkBa0c3lWzTGMGnaZHQR9/Cp4IPuIuypYoHtnOyRsDxRYw8Ej4YTx6pr2nton4LV0fJ9kzkzsXZNhpr4CMEPW0WJ0lJXaHZY0yYfIX1VsrjmdujWtSNCZUDz+gBfD/i42iLQcyEMZgjSnWo4Aq7CN0N8XbHAchZsrWbD2nwGLOZM1zkDS7NZGDV8ENycHEAgSRC0UEYjzS/Dof3FKjBcyjKoWYLG2wjwUeGL+WVjzh0xBNOr3NzcVEjGxsZq0jnvTZ4/RZA0EzQJ6KgQ9L/cZOKvOACvZZIFwR47mqnegaFhOrFDBWDxJTEAzW53AYiDxES3adEcA5j3Jxhgt9DE3qKUnQQfdBagGOjhqTN4jBgys3kSc/v7D8J8oa9MajUQcMm5gk8FyHGugCuUdOreC60E8P2tSTMMFqBFyslw71/uh/+b8QrmAbBCiPP5TF5hHQFHPgcHr2HtACOcDP7QmrKcvLn4fAaQKGgKuYMIjIKnomRlr9HAE2MVZBBkCCdOHVcLYDPXQhNjKreXYdnSeDHz4cjPy8aqtJVCT0s0F2KbKBkzxdqIcmWtXiVscAnCQ/zham+FEB8HGJhNn4jZU8bCzW6unJwLk+njhN7NEABoCfM5UzFz2gS1Akw99xewEhUZqiCH5p5KwHIwovNGzZrpDJyxmZkWYBCkMUrVXUZa7959BKB1gdMiZ637G9BvoACWoToyGHnsTN/8f2nbbPFLEzFFaGenbl211MpdLAXLrSeIUvA6pnm3FCXjQs3GJqYaDGKUkBMmZC0DxWdPFP/tIaDSSI5DRLE2CxjqLs+an74KJUIX+8m9SRNpwcaMn4BJ0420gJSxflbvcIWy7gIiGesPCgvHurwczF1gq5+ThgaHh+Ho8WP6m4MHi2scMEAwUA/19TT5c8RCcT6f56uqqtRtkLNzQNB9MDOZASEGgZgaxgQR5hIyRWzv/hoFzkwWmSbA/OjxI5pLyKghg0mstWAS7bz5VpgtANaVrlpoZHycWPElMViTlY7VmWmqEEMG90eKMAlahc6C35guwOuYKGQ31wQBHnYwsJg5GZNGDcYCcxmZM8ZjgqGgyHFDMN1oNMYbDsHQQb1hOGooBvbrLX7EQW/cVkAf/xABE/1ke/lj9KHegYFak8+RyXAyI3ac2OkorV279lrGtiwxCVNYUCKmlREsCrSdjFAKlUcqFjNyuRgTCzm4ByGLL41lZLHsijEGznOwQJNl1ywiadGytc61UwidBQP06CK+Xvz9uGHDYTnTGKOk03cUFcFa8IOXsA8jwQCG4qu/6NNbKR9HKcO2dCfM2WOFD5NKmF9AFvA3oXcfkjwnaOic6Vsc+bt379bfJNCjYMk8qABkHqampugrSsX3FeXbVPhDBg3WjORhAkCHDh2q+yk1+eRjLSRhJJARQzInRgRJTZlPSMVgBJARRs4pMLL4Vx1FWGggLC1M1PTn5qyDn6/guEBfHe1xgiXaf9Za0+ESE2KFrUzGNKNJ+h2+Z9LQXNPpWGRj8sESTBVhOy8wx6ypYzB5/FBVhBnTxsDGapZQt1EYN3Ykhg0dIC7ABj7e7kr7egotY9iYZWOcgqUp5SphLBzlql2tPuuoMf9OnbsLRRSg1ro9fL0DRAlWyL1nacEnw7jMGmbJFKkdj5yrZzk3K2g+atJU5/JNLa10ssrEwlJz/VlRzNG7Kj1Tg0atWrXRRmF0kPt0EeVsL+/bNfsUI8QtDBQ2kJ+ejolCk4yk8/sIaOzWsgW6dmiHrt06Ytw4Q3nOz5TFMPiyYcN6VYL+/ftqelk7MoR2LdGkSWNYWZtpzIPUb0vJZqWdxEifi+KPFCDaTfqkaaPGmCPKOWnceLRr01YoYqUW7/SRRkVo27KVDLJpaNasqY726r17VAmoiFQE7rM0U8A6U8q53xIziGkx+BmVgcrB73BEM+WNgicOiIwIUUUoECBZJC7GWfBEK6GhtBLzbCzl2oEIFzq5TNjExHGjYG48Vb2AWIKpogTDEB3ig6gwX2EA0YgM90ZQgAsC/VzFh9vD18ddf4g5BMGCMBknaNLkE53O5ereXGyRK3y7e/mLoKw1WYMxf2YKsb6/c6fuYj06wNXZA1ER0aIEMzXLhbN+tBqs5We1DKtq+Zqzg5xkYr6gkWAGRgnnCCbgRAitBMPIDBdHx8XrkjG8jlOtYwXNM/WbUUpnOzuskM/Tly/DfDHN5RvzESdYo3JjHjZnZSFvVRoSY6N1hpQmdb5QMmsrM5iaGON0/XE1qQRb9KenTh7F1SsXsL2iFNV7qlCxbauGgJlBfPb0Gc0qfvXiJZ4+fIR3b97i4rkG3L55SzORjxyuw6WG8zhx7DiuX76C2oOHcPZUvb6/efM6DtbuQ82+aly7cRnPXjzGsRN1qNpZoef3VFdhaxnL1Iq1TK1oU6HOONJ9sDE2wHAxgV9q2god4UnCDtJSl6ugBw7og8mTxopieGDokP5o0byJDugVyxPQo2sH2AqeYEzIYNLokZgiWhgmqH9pXCTWZsrN4sIQHeEPXy9nRIb5i/YEiRuQz9auRURElJZcDxs6GmMnTNO1h1iwyd1Sli5N1RxCZu1wGXnuoWRqYqnla8YzZiEjJR0lhUXCMoKREC/0JyJCmQHrAMgGWBNA4FddXa2ZtQxDk3ZmZGR8yKyVI9/Hx8drNi39dLpQSS7KsC53vc6esbPS09N0lCxbEovMVSux0MocNTvKEB3ki+z0FVgRE4nEqFDEy72Wi5KQOvn6emPJkjgYGo5GTc0ezdDhfTIyBEglLUVCQrw8T6heR7pK3k2TP1WA6ZhRozWiGSL/KzQ0FOECWJnalSiYxU6UkXEC0seFgil4ZL3nxInjMXnKeMyaPU2TQqznmunrSZPHKn3j+7lidfr264WtpcWaPDLFiCH6yTqJlboqBc6uLLVbgPkLrDVmEBzih4jIQMTEhmlLT1+OxYtDsGJZLBLiIuDj6YSQQC94ezhqNjndwyRhGwaTuZvHyFFadGo+e4bmElqazIC9rQVmGI2HuTADjhQWSzg4OGLObHOhGz0FDBmKLx0oNLCPmNH+YhnaSEc4ar1B61aMFHbGp81aoV1b4cZiEegnuWB2aKDQSAF4nIdgGNjEzFQpIAtI2KktW7bU0DD5NuMMmtw5YpiabM7SMe4wkEkZ4jM9/X2FHUzWcGrTFp9odO/TFk0FH7QSC9RWnrOtYJq+6C6vM1OTMHH0YAzq0xWtmxhg3IhB8pyf4uOPG6l5Z2yDYWUml7IGYezYMTozyAgo5xh4Dc034x0MgDVq9DeNbtK3MxpHEPjxxx9rhJKxAcYFGJpu3LixKFWNuJR2+hmZEeP4DIpZWpmq29m7bxfMLWZjrLC04cOF1vbsKAMkQFyxMAGTaTLi12HEyMHS353EJXyuuIBldZz0MhOKz5BxbsF6LEmIgo8wvOycdCSnLsH8+abShz0QHOAuQNAIwwZ/oUB/8gSundBPU9O+EKxnMFM6e/LYD2HhYQP76oVsc4ynCDAcIdRijHJRPjzXMrK0mieCGCR/ZIquQjZg0Fg9du81EG6eQVqE0lHMP5M+qQBc6KF7954aKHF3dUN0VASMZ04X02uBmXJkYyTL1HSOBo8oYI5OzjOwLoDJlMxzYDCJlVCkplx8m0Gk5QKIONlCbk1/2qFTO/XdVILO8nq4mMCunQQbtGyKdZkpGD6gF/r26IDBX3RDkK+7+GhhJcwn+OJz6ZSBohQtMEYsY/qqVAW/nTt10M/5WX9RRgJJFuHMld/29/PBeGEejBZyOZ/RMpCaNP4YIwSMch1oHhkxbC3+v7y0TEEiI4aMX3QSzEIgyRxBKgFrB3p/0V3wSQdhOj2krwfIYBokyjcC3t7OWJm89P8+66lC69O3lyaS0IIMEazm7uaIwqJcBAR4IFYswObNuUhJWSKYpqewki/g5eUkA26KDMyW2i9RkSGwEOwzfSarwcUdTJ80BRPHjBVKZahZRIwHcPTMELMzauQQjB4zXB+Ws1Fu7t6ws3cWKzAao8caYdCQ8fJQo3U1sj59R8LHPwLTZpppomdrwQAEhO3bd1QFILjy9HAT1LpYLMtMWFmaa14jBcyw8FQZ0QwLUxkY5qSJZqiYIWI2pr6ZmswWsLMITo4Oej0rdJhtw8keovzOXdpr6yqWoYeMGqbG9e7RURWhMHctOrVrIaCsMcaOGgh/LxeluoPFulD4nPBikYnhmFHy3400NN6ieTM9zzkQHrsJcOQ8CGcA+4hFmmtlrcCQYJSTagSBrNnsIfTYUCxsTwG6PM9EXioBqSvPsTFqSMrH56av792nh47MTp3bYfy4UaoEAwf2VqGuEWEPGz4QM0RoPXt11RoIRgeJWVgmOGn8aJQU5Qn394WPj4sqAGcHra3n4G+iZHOFCs6c8UEJuggWILjlLi4Tpo7DuKniDriE7TBBrMMEWI1ibb2MeuYOcEqVD0UFGDZsmHJxZrly6VsuLUcs0G/AGN3oasSYabomEVcv43ZyHTr30m1hWrZqh6affKoBFVIhjuao6DD9M0ThpDezxL+Zmc7SegcWvtD1kNe6uTrqe1IbNitLUwVtRLksFmHwg6FlKgrrAlq2bK6m/HPpTI6Ynr26yOjtrX/8I+mI9WvShOb2RPcu7YTyDhYgaKmjvG3btmrKSfXoikjp6N9pzhs1aqTBJ8YCGPEkveO8PK9v0qSJBrz4mucpVF7L+zVt2lTnDPg9uoP6+nr9HmMGLF7lvegeSImZ1MIZwclTJ6BRYwN9bj7vaKHlI4f1x5LYcMRGh6hV4Lm+8t/47AX52VgvVHCO0WRMHjcaZSUFSF7GbQDnokhcQ1pyoloUKkFgkI/OMTT+2EDT1khzTQUEjxgnA3zCMBiMHDJCqY1OgogJ01mu3j0xRR5qpNAg+i+ieCrBQjsnEd5cXU+Qy9Jx6dr+g8fpdncdu/aDp2+YbobBNQY1U6hbDw0dt+/4GT7r0AbePu6axDDHhDn1FirYOYJDeKQiUCl4pIYzMMUQKBNfef4v4c+cMVXDnlMmj9d5COYL0NIwQkkBssiT/p0TWDSVbM0FJzCWPtVoAr7oywBWJ600YqSPlUr8b4xpsPCDsQtzCytdnPJD1U4nDXrxyJjHJ82a62eMSzBbmFFKfsbIIM8zdMzAFaOfTGvr1KWz1kzyfavWbTVszN/SiOGA/pp0uiE/70M+wZjhqsSGcuzzeXcM6CuK+WkjbNmUp8fRIwYqzWO1eFFeNvKzMmEkaJ/rShVuyEJ8ZLDWiOwoL0FGWpK4Q8FDQoE5mJkHQZfJyKON7QKMGj8GA8QiDjYcJJZg5BiMMxyPoYOH6ErmBEQEY/TVjHvzT7E6lx3FNX24UWa/fsPwed8PaxZz40suXNWpW39dtIKWoKW4Au4DwI7iHAKjXPTX7oJgwyOChDVMUlNlbzv3fyVvC+dbwUqsw2yxEmvFR7o5c0VVC1iazoaJseAGszmqBLQUVBS6DZZvzTG30E5t2faDEBhxZNCH4VsKiGv8cJqbmTmctevco4uGY7nOD3ctocViNjOznLnpdet2nTTBtVmLtrrrG7e544bY3PSSSbFMfOXnrKJitnUTocuNP2mu+YpMfmXa20dNmukSt6TKIw3HYmf1Pq1h4O9pTuawkTBo1FhzIJijSHYzSKgqcwM+a99aYzJ9xOy3atYIo4b2R/mWfIQHe2HGVENx1wPg4jAfJfnrsW97GSYPG4xwTzdsK8xBjIx4Rn6zUpciXXDEp00NxDV+cJG8L/HH5/36Kq2eIvIdO208JsyaBINhQ4YLxTFUJSAD4CIVBGfMh6Mb0KVYRhvqKLF3cFbqpxtCDjVEz95Ddc0iKkHXngN0g0cuQ9uybXvtFI5Oongi2n79eyuFSUiMFp8kiNbTUZmInVgEH3dnjWU72c1XJVi/Jh2uTnaKUagE84Ti2Qh7IZf/yy0QtTMziZVKFGBb6WBWKXXp+bkqIJej5UrgzDX4tE0beAUHoYWMfG5iMXLiBJ0U6tK7Pxo3b4tPWnRA647d8bePW+kKJWZWdiKcT3QVdi5Xwz0ZuVmlqwDfXv2H6srr3FmVm1616dwVHzVtjtYsI+s7ED37D9Rd0znZxHWPjMWqcKvc1DXrdI0mwylGunkF5yE4CcVIaXZers6+MpmXPJ4DwFDYy9QJozFkQE9s2bheFWBI3+7o0PYTOCywQlHOGpTmrIf/IjtYC33cs7UIS8MDEeTuiO0l+UhdFoPU5UuEEvro3AIzqBhx5NzObDNznfQzFWtoaT8PBpxuZRSL6Jal56xHnCCUyEIoDJEyefOHdKwxWLTISVcKHz5stO4Kyt1HhnBFEm5nP8wQgSGRyh5YTdO6TTuNoxPds06OkapU0dDExEihPVMFFJph4TxTrFgSCT95cFY7eTotxMyp41Egpo0zmCH+3prLwNrIbDHnPmL2WBxDq8CcSNYrmsrvde3VD51EAVjkOlAsG4XRUZSBW8ZTKJwN5KYWfQX/cO3jtgLcuE+hlZ0LPuv+ha63+OlnXdG0VWc0a9dFN+YyaNwczdt1R/P23URBeqNt1891f+b2Pfrqzm0devbDmEnT0Uys3cct2uGTdu3lc8EM8ltUqL60noNG4GNxASHRS3QrHu7JPMvaRvdlbv5ZR7VeTT5pqjUcrAZvKTS3W+fP1Ao0E3xgb2OOkYM+x3LBBX17iAXp3Qn9erbXOZ68rFScOVCN0g1r4CA0vqZsE/IzViAtMQqZK5YgTijm7WsXcPjgHqxKW4GgYD9d8YTZzyypsxSwPUksrK2LIwxYZs2EUNIgrlBGwU+ZMF7NLlOliIRZss1497y5NpovSKvRS3wn6xC7d++rS9qxysfC0gZjhGm0EQXgfH4T4eCNxNx9oGt94elmh/iYEHEBxiLYDxMYMWF+8HK2xYxJo7UxlJmcGKPaPqR/H1WCaZPG6QQWG8vk/L09FLtwccgFDq66UEZ3loJ9PgDtuvQSYbbHR81a667lBo0+VkGZ29rhb81bwkBaB3n2z1kGN2gkGrX4DB179Vdht+nSW89NmW2Jbn2HoFPvAaokLTp0V+Xg53+d4/UjJxrJ9cMxcNQ4PXbrO0iPvcRtTOBKrIKfpgqQ5l7HJjJ4AiJjdSdW7tXEvRNZcUw63HDuDHZUlqOirET9OQNbNy+dxgkR4MFdZXh65zLuXzuH6w3Hce/qWdy5fBaPb1zCleOHcf7wfjTU7sPthlO4euowbl88hW9fPwF+/xWvn9zBN2+f4x+/fgc5gT/+/KcmqHIFFC6AyfWgQ6OjYRAZGgQvFxcsjggV87EUsVHhWLUySSNtYYF+SIxbjITYaKSuWI70lGSs5Dp8MYsRF70Y6WkZguTTsWpVhiYvMnWJHHtJfKyWd69bnY51Qm8qyoqxY1sxDh/YifrjB7C9rADVlSU4XVeDik052CE+j8d9O7agrDgHuytKcPzQHuzZvhX791Rie2kxdsnr6qoKHKjeic3F+YKOcz+UsCevQkhkjG7sxIWouDehl3+wrrzCHU+5U7mtsxucvHwREBENj6AQ3WBioYs7PPxDtXGk0rxzk+qIuGW6eTbfc+NtV58gBITH/G//Yv+wxfoZt7XlziW8V0R8om6Kze1quH/RXxtk27t56h7Jf/02t7jl87j5Beq+BqS9RYW5uHH1Ap7cv4mvXj7G22f38OjmJXz/5jG+e/0I71/eF8Ge1OPdy6fx5dM7ePfkNp7evoS9pZtQs7UYh7ZvwZYNmdi1OR9H91bizJG9OHt0Hy7U1+K49PGx2r04VncAVy+d0zC4r4+HpvoRALPsz8BVzIOt+FsuV+fu8OE1U864jmFJ3gaUF29E/trV2LG1RF9v31yMyi2bsKkgV4RZiuKCjSgt2YRC8Wvb5Jqi/Bzh5Nko3bQRJRtzVZDU6ivnjqtmsx3dtwPXzh3DvStncHx/Fa6eOaIKceP8CVyqP4y6mh04L1p9qm4/TvAPSDshr3cJEGJVdKzQzIz0FC3PZh0C1+nj9i6sR/AVHBAiHc5FGLiKJ1+zcYVyXstNobgwBvcQsBVg5+Thocvdz3dwwDy7RbB1dNS1FXmei2vyPTfIMJo1SxfXmmdvr/skcLk9rpXMtRctbBboGks8z9/h97kGIz/nJhVctZXL73HFdJ7ndzkjOW70CA1aEdkf2b9T+mWn9se1s0dxtnYPaqu2yuiuxTXpk0c3GnBJXp+QgXRDLELDsf3YVpCNfds2qwLUVVdgd1mhHu+IsjTIYKutkUGzu0wHFAdg+eaNSEmKV0BOVsY1Jqys5sKgbt8uEcAB7fBzx2px8dRR1IuJuXLmGA5XV+HI3l3YKRpXV7MT1RVbcWh3pXwugtm/B3t3VYqwC1G1bauYsS3YLSaNx51lW2Skl6pZK1i7CvnC0fPXpGBr/hrsKS9CSU4mslctQ156EnIzl2NL3mpkrYxDwZpkVJRswOa8LGyRazcXrENp0QZUib8rzl2rfyAxNkKrphczxVoUgrmIaWkpalaXLk3QY0ryCm05G9ZrcIrWifF/HplfxxT7yMhwnRdISV2ucwI+vh5wdxczaT8f3t6eAmL99cgMXqZpMYGDpd9M52IhKGsVmK7P5W34u0zz5m+w8Xo2fp9pXXy+9evX6rOWlIhV3LFdJ6WunDupfXnqYDUunDgofr0IsYEeyJW+KV6zEsvCfbAmKRrb8lcjc1kkVkQHIcLbSahhMraL5dwj/ZIqlNvBejbKNq7D6hWxSF++GFWl+VidHIflcSFYHOKJtKXRWJe+TN0vk4Y4wD2cHXRjE665ZJCeFINN2atVWDxWibaUiGbuFhNcUZSr7ys35WPH5jyUrM/E5tzV2FsuJkh81ZaNG5CdmaKaXJSzGkXZWSrw7PRkbMhYqd8ndakWV7BDzPzm7AyU5mZhe2G2/uHKomxsFYUo27gWlSU52rbmZ2FrwVpBuLniHkr1vptF4/kbMUIv/TydNecxLNBXJ0IC/cSviaDYyDBiokKxZHEE4qPDERcVppYjM3UFlsZF67nlCbF6Lj05SYMryxKiNSDD48qkOPl+sLiwVKxKWYr8nCxsKy1C+dZCbMxbq27t3OmjYr4b9EjzevfWVbx4+gBfvX2Bd6+f4dXzR9q+fPMc//ztR/zw7Zf441+/4s3LJ/jxu6/wy4/v9fVP377DH798g//+/DXwzx+BP3/Ff378EsmLA+EtoNlvkTUiPeyxJNhDFYLHIFfBFc4LEC2Ksi41ETu3FGpGmPN8M5QVrkfGihhEBrphU24GNq5PRXJCOJwWmGqLj/DF3NmTEeHnqgrDQXz6yGEcqqmBwZm6alw/fQTnxXycO1yDS8cP4vTB3Th/ZB8uHjuA4zWVOLqnAod3lgoAqcFl0djzYrrPHNqNk9IOV3+wDDTnx/buRO3uctSIiaKS8B4n91XhWPV2HNtdgXoxd6f370Jt5VbxZ0VyvgLHaspxYl8FjuwpRdWWPFQUZ6M4Ox2pgnLLCjeIRVgnJm07Gk7WKT44WFOFi2dPKfK9dv4kbl85jQc3z39o1xvEn15QIPX83lX8/tNXeCjnHsq1Xz29j6e3ruDupbN6fP3glgAo8bmvH+CX9y/w9+9f4x8/vMG3bx5qe/34Bl4+vIZ3z27jhy+f6Oe/fvsSP371VI9//vYN/i33/+/fBXT9S4T4n98+tD9+EQz2M/CP7/Hjl88+nON7EfI/vn+r7//5wzs9/sHj39/jDzn/9YNr+OnFPaxZGg4Xi2kIcbGBzwITRHouxLpl0Qj3tIe9+Qz4LrKBrygCleDAznLMM58JGxMjZCUvwbpV4irDvJGzeplYAsEqfk4I8liItSlxuHhyP67WH8Rr6ZcfXj1UTPHs7g00nDgKg1tn63D3/DE8ulKPh+JLHgv6fHHrIp5I5/HI919Lhzy5dgbfPBHw8ug6Xt9uwLsHl/HmwRW8kof/UTrzl3dP8f7ZXXz56Cbe3r+GX94+ke/dkuvlO/eva/vpxQP8+voxfnp2H7+8ku+8fSSfy0O9vIdf3z3G109v4ruXd/VBr56pU40lYCSOePP4Dp4/uIFHt6/i8Z1reP9K7vPlU/zru+f4z89v8PsPL/H3rx7LPR/o8ffvXgA/S6f/+FoE8zP+eP8S8gXgh7f49vFN/Pf7N/j5zX3pkFv4+9cP8dObO3L5Xfz7u6f49vl1/PbVAxHQO/znp5f45/vH+PVLeeZ39/S698+u4e0DUawnIri3co/Xd/H++U28eyT9ce8CXkr/PLhyArfPHZb+O6XHy8drcOXEXtw6W4v7F4/pa567cboWL66fw+NLp/Du7mXkiFu0NZ4IN+tZ8JpvijgZ2RszVyDKxxnWMyZgwZypsLeapVRwt7jWIC8HLJo3B1kp8eoKYkK9dDAd3LlVMMQh3LpwAk9vnFd5PhaG8e3ze/jju3d49/CmWvus5EQY/P7NI/z+9WP8+f4p/v3NY/nf9/GbdORvXz6S90/xx7fP8eubu/jHl9IpP7780H54Lp890o7RzvrlNX7//hn+/O4Z/vnVQ/z3hxf4/f0Tve9P0jn/FgH/+uIufhNh//n1M/zy/A7+JQrw66t7+O6xjNivn+rrX17fw48vbosSXdJOOlAh+CE7VdxIuliYMuwX9kD3ckisygVBvy+v1+Pnp1fww6OLeHqhFndPiW/dX4pTOzbi9rFdeHTuAO6f3ot79TV4cEZo1Indes21ukrcObkHDbx2TyGuHt2Oi7VluHas8n+vL9dtw/Gd+dqOVeWhbvsGHCxbi31bVkvL0Hb5SAWuHd+J26fl/ucP4tnVo3h9S4R5+zTe3K7HD08u4++vb+Hn59fw26ub+P7xJfz5zUPpw+d6/NfXj0RBf1BlfH6zAc9uNSA+2At2QqG9ZMQvFBod4uUoeCkecaE+sBAlsBVr4ChKsCTcF/urijB9/ECE+dqLBV2H9WmJKBe3cEDA+IGKMuwoKpTjNlG0eunTO/jt3WtcO3kMV0/UKbM4LVjk9OFqGDy9VIfHF+rw6Pxh3G84hDtn9uPW6Q/tZv0+XD2+B+drt+OKdOrdswfkz9bKNXtx5egONByq0PM3TtXgYt0OXDxciUv/dzxVvRm3Ttbg3L4yXK/bhfN7y9FQU4artVU4VbUJ9TtLcGT7Rhzelo8zNaU4sasEtfJ6f5lQxo0ZWLcyErEBgt6tpmOh2VSES2eEezmJOZynHZK1LAp15RtwYd8mXKyWe5WvxeGSLNTkr0R1bjLOiODuHxdFOFuNZ2f34+XlQ3hybj9eXxWkLc//4MwefHv3DN5cP4IfHp7Fl7eP4v3dU3r8+vYJvLt1BD8/OY8fn5zFT48b8P2j0/j+wRl8++AUvrt/So/45akI9JEMoPv457sb+O31dfzy7CK+e3AOX946jldXj+BH+e6fX8kgenkFj8/uw/OLB/T4uGE/zmv/7VaFP3OwUjHSfFMjmIuwmftpbjxZM8AzlscjxNsFY4f0geHgz9UirIwJxJacZBSuWYqy/HTkZy5D0ZpUwVxrUZqzAXcaGkTQ28T17hTrcxZVxcXYumEDKgrycWLPHlw4Uov6A3twSliJwcFyGVnbcrUd3i5av7MIx3eXaDt7YBvq95bKsVwV4dzBbXqkoPkH+P7W6X24I8rB48OLdXhz56yO0IfnqVh1uHZ0tx7ZXlw6Lh14CW+vn8a7G2fw9tZZvL0tJkrM6LdPBGDdqMfLm+LjLxzF6QPbsWdLLgpWJ6klOCcae/HkIZw8uAvXhV4+u3EO3z26jH+/FXMu5vv9vTP46mY9Xl2uw9trJ/Dbsyv45vYZEcIFPX59px7PReF5fHX1GJ5erhVBHMT14ztEIWrkuB03j4kC124Va7Eblw6X4vqR7WIRynDpYCnO7d+EczWbxHIU4GRVLo7uyMXt+t1iCXaIRajUIwfHw/P78UAs0N0z1TIAtqK+ugg3xQKd37cZ1YXp8t187C3OxP4ta7XPCzOWiGCE45esR2pcmIz06fATAGgrVsB5gaVuPOLhMA9Bnk5YERuqAL1B8Nfz2+dx6gCxWpG46nr8+Oq+4LQ9SIuPwtKwULlnAYpWr0UYtyeIT8T2jRtx8ehR1O6qEoUoQrXQ+Z3C7CoFvBt8eU/8+91zYsZO45V0Io8UxLNrJ/Hu3nk8vXoCr+TcW7mGAv764UUBMRfkswYV/osbp0RoYkXEQjy/flKvvX+uVttz8Yt36vfj2eXjYm2OqBK8v3sBr67IdaIot07tU2tzXSzGdVGicwdFscSK1O+vwM7N67F2ZQySY4OwQUDQoV2l4udKUSrMoWpLvpi8Elw5sks6uBpnRVGP7SgUy1KAA1uzUVuei+NiKtnOiyKfEoW+fHgHjlZuRF2FMJ28NJSuX67vq0tWy/UbsHfLGuwVS1KZn4L6PZuwuzhD3/NYlZ+KityVKF8vCrkmAcXpsShIi8YRcTvVm4XJ5PHzFOwoWCXf/3Dv4swlKFoVh7yUaP2dmk1rkLsiEpW5qchdFo5NIvzUKB8sCXQSAQnjKstDpPh908mj4ediC8d5pvByXIDc1SkaN7l5oR73GS28JP0mg+D66Tq8uiOW6tVdwSAX8J34+nf3byHG3weThg5FjF8gVnPrm01bxCJsl8Ekv5+eKRYjUyxIDqID/ARneGszUHMk7WJdlYzySm0Uxmkx4w2HtuPgtjzUSucekQ49s78cl4/uwqmarWop+P78kSphDyWo21WMC+zoncXYWbRav3e4ogB7RZi15XmoLl6Dg6U5Iqwi7CnK0te8R21VoWhlDnZtyUZ5Xrqatkrxb0S0S6MCEBviheT4MBRtWCXUMwkr48P1WJKTgZrSXL3/5qxl2JSZiC1rkvRYum4FSlYvxbYNIhi5X1H6EvHnuSjPTtbzOSuikJ8Wi7WJoVgZ6YmshCBkJQZjjbTkKC/sKsoUlB6CdUvDsHZZmF63Zqm0hBCsTgjG6vggZMQHomxDsnD6WPmuXJsUjrzUGL1vtgib1/NZeH31prX6OjHQGetFARL8HZES6a0KEOo6F6mxIjBhBaSAdHuk1OcE8xDBMzrIEPHV08dwu+EEnt0UdyMAmyCcYP6bh9dx79xxlAmdTQwJROaSJagsLERx1jqkxi/VlhAqgDEoDCGevoIzLMXaWGDSyBEwGj0a00aNggH9b2VBOqoKM7XxPY+7irNQvDpR/1TJGvE3mQkozV6pf3zDyihsWpeE9clRyEmLQWZiGDKkA3dvWqcdkbrYV69hJ/JPZ0vLko4rX78SOwsykLcyGlvXLsfG1QnIkU5cI0JJk05bnRQh1DAEheuSRfAhQoXmw8dlPsL9XbBySRjiw/0QEeiOlQkRioQ3b0gT5LwUyyP9sDLaTzozGCkxAYoX+D4lRoSVEIr4IHdsyU5RqpUeF4SkUG+sko6P9l2EACdrRHjZKf6IC3RBmIetdGIWVkT5ynkHGSmOWOznLCPMRY9/Nb4vyFiGtCXBen9+N1GQeWKoB5YEuMk1jkiQZ432tsfWdamiGNHwsTVHuPsCuAvyD3S0UvpHRSjLXYVLx/YKaziB+zLSH109p1FBUnMqw5v7N0XoFPw9vLp7FQ8un8F50vK9O1CYvlzuny5ubL9YxiO4dOQobp1pECp+GPcu3sD+it3YnFOIhPAY+Dp5iHVxEffiJBjDD/7O7vC1d4ZBblo81i6Pko6TjpURsVxGwspIL9V0CnNVrL9qOd/npcbJ60jtNHbysnAvJIlJiwt2R5jXQgEk6Xo+VP4orwl2nqt/NNjRGgH2FqIQkcgVEx/uOh+JwW6IlhERGSCdHOyCIG9bGfUeWhaVLZ27dHGgPOxceDjawN/DHtFiEUL9neHraYcg4b+ezjbISFqMFYsD4G1vDS+5v+dCS7gJtw5xt4fHQjO4LzBHpK+jBlg2Zi0XJfmgEL5yX09bM73G1nQKHK1n6mtPO3N9vWVDBqJ8XeBlZ6W8nN9n85Hv8Rx/j+ezUxKQGOmrvxfktkBHcZQ822I/V8QEukofOIpS2SFfLBcV1M50GiK9F2F9UixqK2g5d4rlrcKNkwdBqn7lxH6hjeIe6w/j7oWTeHT5rAK3Z9fFhd6+gnvnT+FEdSWqinJQmJmMfZs3iuuqFAAugj91QhRBwN7efThZs1+VYGfJNqxetgrLohIQ7BkIHyf2YTACvf0RFRIhLiFMXFAwDKjJSyO8VKDxwc6IoDD8HFQRloW6IcrLFiEu1mq2qM1UFgfzqVhkNQMu82Zr57nOn4O5xuOxfmWsBjUWWUzH/FnjYW8yCe42xrCfPRGLTCaLZYhQJfCT71A5fB0t4eNqjTB/B7jZm6sCOItwOMojgzzgYmcJJxk9zgst4OduBz8ve1WAkAAXONqaaqh5ZVwoPEU4bnKNo40JFlrNRIAIxc3eEv5udogJ9tSI2vKoQDG3dgjzXIQQV3uEejjA1dYC1rMmCSKfBgcZnQy/zjMx0qhomPhn53kW8BCB+zjawnuRjOCFc+G6wEqPpHAbRLgJEX7SufPhssBM78fn8LKzhp/jPGUzPBZmpYgwq3DuUDXePbiOBxdPCzrfK2zriOChfWLOj+LljQb17e8eXBW6eEHA3jk8kuuKs1IFt+SLb89Dee4abXVVZUJLjwoeOoyrhw/i/P59OFa5Q1ztTmFXFWId1iInJUOw1Frkr87ButQ12LJxC0qLSrG5cAt2lFdhc8FmFGQJMM3Kg0FChI9GlkI9RdjuNgh2mytCtxKhW8N97jQxYbNEkDOwwNgQyYv9xYQ6iR/pDztzI6Uqc6aMxgKzaTA1MhRkGq6jxGr6eMyeOAxThn+BOROGYf6M8bCYNBJJYZ7ic33hMW+WmmJfUS4f+T0vF+lcB3N4OM1Vwa9OWYJYEZqzCNdWBOtoZ6Fl1C6LrNQSeIolsbOZhRWCpokRGDq1FwGylG7OtLGwtzHFAsuZcFwgQpGRyyqr5TEhogDOIpT5CHIWS2FrCZf5lpg9ZQxmTTbEPFGE+WbynXnmCsYIyuysTLHQcrbc30Z3hXNgBpSliVioD5/lyGhMSYiU86aYO2cqLI2n6HGRtamMvEU4KRSMkz705wR0d87X48rJWgF1x3Dl+CFVgkcXT+LZ1TOqBG/vXMKb2xeFhh8XBlaNdYmLkRJFNypsorQIddvLcOHQPm3Xj9cJ+5D7HzyAi9KoBMUC/GIFEPoudIL3Qke4zReLae8mQNMXAWIJ/D0C4OXqAxcHNyyydRIFdxfr5w6DqCBXhMgI85OR7m0nJlKE7rNwNgIWmcHRbCK85oupnDdTlSApQkyfmy0mj/hClcDUaCxmThgho2eqKkOKmFuaZAs5bzzu/yvBvOnjYD5xhFgWD7EwPv9TAld7E7hIc1poIkKdiUXzTWE3dzaSk2IQEeINezHnc4UqLZw3B97uC+Fgy5XW56kyzLUQ0xrgiahAL+n4aTAxGq/5CGOH94fxtHGYJijbbOYknTChkJNiwmT0O8kotYHnAmssNJ0JJxtzGE8ag5kTR8N6thFsTKarQDn3QUHPMzXWtshGXM0iW1F2E9jMmSWjfp6eT1sap9RtxoRRcLG1UuVpEOE+EdP9zctHqD9UgwvHa7VdP3sCty+cxp2LZ/Di9lW8vHMFz681CBu7oO3J5Xp1C8d2bhVgmyrgMwzbBewVpiVhd2GOtk2ZaQJql2JZsD/ifD2RFBiAGA93+NsuxKLZc2A2bhKMho+C8egJMDeaiQlDDDF2yBhphrrQ+MghozFi8CgMHTQSwwYKMDSchmljpuH/ATgVlHvsY4vTAAAAAElFTkSuQmCCUEsHCGFzQjFyMgEAWTIBAFBLAwQUAAgACAA6UX4/AAAAAAAAAAAAAAAAKAAAADYzOTM4MDEzNzBhOThhMDY4MDVlODljMDVmODEzNzQ3L3NvbC5wbmcVV1VQVo0C/JCS7pRuBKSUkJDu7u6SBlG6ke5OSSkB6Qbp7u5u6QbPOdz/7szuzuzjzuzDRqgoSWOgkqLCYDAMWRkJtf887/98Df+ftuOkUcJg8DAVBQ3JFwh6eTgFBz2g3XZwMhq63QU368Gx7+CQB3S5As77QGvl0EnmC/gEjgSA457Q4zB0Og2uBLxA1+BSPnRW8ALevTzfgcO+L+AZdDQMrgdC/7Yh4ACcy4CuiqB/Gy9PV+C0F/TQDT0vQfvd4NZ36GkanI6HrvOh+2PovgF66INuf4LbjeBe6MtjJ3TfDl3FgBMR0HUOdFsJXgZD19vQbSl0VwNepYAbNeBeOHQZ8fJ4Du20QFcZ4FYddDYPLvtCVwnQWTh4HAmtVULLP8EpP3AhBpyOgG73wbEgcCEHulqHTsbBuVRoMQ/cjwUnfcC9BPA4GdxPgZ7moKcJcCYZAo6hx37wLAWcioXOMqDVUui+Bex3A1p1gGpR4Lcw0KwOHfZBZznguh/QrAntdQK1kuBZAnSbD9TJAA0iQJ8yMKEDzpuCy7bQtiu07QmuuYLL9uC8LTBjAUybgOMGwLAu0CIDbSdDF0tglw24/hk68ICOA6HTUOjkO7jjA27HgJffobVEoFsROvYFBnTBtRhoNASolwM6ZMEVC/AgANz3A8ZMwT4XcCECaDcCjzzB7W/gggMwaQE0SAAdikC3GtCgBG47AG1iQK0wMGMDtBlAp0FAvwq07wLOWQG9EsCwEXTqC4xpgcNS4IYH0KkCjsiA4zJAjyY4awgMq4PTskCTKjisCM7LAQNy4IQauKAALhmBywrgwVdo/b9cE2hVBM//q1oR2lIGN5ygbVVwQRXscXi5zQGXtcA/FtCWJrSlC+4EQUvJ0LYptJAArhtAW4bQug60rgaexIDHCdCOJXRVBt3UgDufoT1baN8c2nMAZ0OAYS3osRu6KAX6DcBpFeiqAhizATvNoJMcoEsXOnIDBkyBif/qdQdm3aCDTGg3HtrJAKZcoPVUaCkRGP0MdlmDG9+hs5/AsDkwYw+MWIDb4eB0wH9bQAw5NYLBSINkJUQ1PFbGDVE88Bd9XyZr6n51hMDO5KKmLEP4+mJweIjjq+GCx3xT+iKSzAR4HDKby/QPo2pqDGfIjK/pY3bJviYtOWROMhJfiuJiL6W/wcd0oRURE8PFZan81iBg/XIxfpoP/5leUa8jbp6C+2bDye/lBtwc6wooizEVmVU4S0Csa+P+I61OUvSCxC4ShZqnh8QpwnBvPfUKP6QbnUMySLdORI6zTnljr07I8l42C2WqP8COKRxugoA4G/ZEuGXb/cqhLFgDmT/gz5R/dktO5ny7wdTdD/sWV3E3/qDgBNEquJOSL2T6WBhreXOipycDfhT3mxwN2jcTH36Tuv5eqGbVJ7hsOnhGzg1PaJAP87AP8+Bmfh8nqpx02dpFaD1fk1Cd6Oc9BUfmDidVPI+wfPBXNHfLiXSVbykaQeD6qU4khDXeZ1HhbLFIAzuE4c0SfnUoNWt4arcVXT9j4NfIAoKut5HoaIxRL+Wwm+tn6oiy9vUqGNM3AYWzMJv23WcTOsibwehM/4GtIJ6t7m0xEDlQJ5azE3d7/MivW/gO+Z9Jv/ymFWFsS7rPy08iUyUqbBdoC42FYilqCbUqgl7T1xkuvxGtd/KuX8bvwn4Vg8WJQukbAtxWXMlSw3hcbzQtzGk9qScpN7Hh91Nb/nrvHcf4cazuR3DC1l75nebX912JeoBzqA+LWFwdmmD33syC5YrSR8PX9+ORYd5Dm5lDoTMWSBmbAWoUuTlfjFabVXe/oHIyhoQ+DZM97USS41Pu3c6XIqQ2HJofWQ+yKouFRZI4MWZZRA7e+RmsEHP12AqMvjvxdk3sLo79qhY+6/Pu0e49pbLXpLGA6YfR+94adovl5ao1N4HjvueiY2xDZT1mwUMmndFa+X8JrDpOwbkd/T/bJLVUlXUslackPDYGZ6C8IJOnk2pS/3vFT/hGRzU607769W+0TpVUEcLenwSEHyeXdG6wemzYOZTu16HqLQnREKF21z78S3I0XKQigwtMa+F019FE4eFj3Df80zZkZSUoLDFs620h90Mz+pbs/blGBNWY7Piqf2GkuRzgp6ONCZpgp56HjKQ92Al+yuGvrOehjnqVpr5Mzte5l7t5ChvRu719Zli9P0eHWtF8E00mtcspFmKHuer2tDmefV5wtaK/ttX+vhI8/Gcz8fU2LLp0qKlNomumx1oKf0WZidxP46QYtSyWEeFhPFYgbZ8yNZjKgwEjQe/QX0dlsquiySK+d4odybSX0mQW0+/ZshNnrUD/m48ggq5FGH2pWY2gwFxhawdA/Idb9CmTIws7dL8UdfOtDaF87LfT7s3IirVNn0vCrr9rbsWGdz+X17gW8SkuAisQfNitFNJtt2aNdv2n13pA+9G667rVzKcW+Ri5uxta7iY+M6V2Px3C11jjhMHZp5htxHe0Vgf0OIJC2rdetsbP7KYxgKouPdavRmQ5o4xtPu6LpKWBfXEMsBqSsRxYX7waivy2evviMXLka6lrAEdmUFRqr83hsNxmgoF/RvZVql7iGcv5CVklkY1cQbq7q1xxlty6ll2SV+j4V/5YCtvJK8xtOJ9wJ3YEIrIZ5KXmD1YcWRvR+JWroiKI9pXn+d7bV8b3lFQ69Kbjh44uNgipvrtldfGtjOWnD2oeC+P+/qw4ht8l1w5ev5PLvwwIQT7OESK4lRBuw9OMqR/3tu1QQ6tYWXhbRIGbloyMBLscNhaXLZ1nqxmleNpevnqhJflEZP9RfqujdCzXHrjuYcHTGkqUyTNJ9KwqfnySadsA9w7vZ+tdF/DMxmp9EKjZr5y7sZQ7UOFhR5lN8unlw9n7uyUTPAfnvH4GpvSXnbl1Ki9+rl7dz3nnNeght8ElPOZsU3gq2qc0Tp8M/widlMM3bHSdafS7yLgVz2EhUNl7YfwQROFuFPZt5DS71WgHPSVqPlyTgd+seuQRNJecyyNeowxYD8KKl85z/yglOwKpAlIEO90iZ61N55urBsiSJSYisA6FYI42qAt98NEOyf8LY6F1jZ/7hMf1/umpfziJTbrYaTg2lTnnnUUVrhp6jZ8Z8XJ23u9G+zRnsVubO3j410Hoyn7uxfBKJM/WIG7+DktWqb000C4OQ5GWnTODTUP9PWFdGBxe56JrzucB1KF33rbSvlrID+TENg4Mq6SCYNpQRhCLi8/KQs1mXxxy5R/9aBLyMPZQSxQGI6QYRMlPDrFm1u9V+AP3iBX/LWrBJ/34yajFG6cxb5mrKni8aBqA3tPzKShPEjTmWfl+t59IY9Y0WOJ865x6jZCJu6+igM/lmGiy9MAejL69T5y51XdV+gm/v00p5flVfLchBdfOYI89zJshp9VlEylWNjr57fclcjENzIbnD2tDKYmZi38x16/4p7Biysj4RBQM6hyJGWNo9TbZqRvbvGJi2Xm+vJPCz8EZYNag9q3Em/9shAfV7qZSx2YiUmapUrZPvG6lStUnmfuU2Gbo4Y7e755uoW5Ugte02Z7Rjx1T6FX6N7cqVALtStnGl5+BbXHE+d4gXU2Rd7WnkD0TTkVxUag7Sovsn/cXbljsn8C+Qkuy4iPnpCSTaFq6UDFJcRfbrvxH6vZHOW6EONbuiVqusp8Is8r3wl7X8kmWv7AC7p36ib14m1Yvx9x8LklaDbvIPHm2hvpDkyPiBWypdWVCceyuVt2hkETIKvjprvtw2tzB9/VVh0iolI/IlafgDxGq/t0n9AN4MiuSqn/qjN4svAuissNYqbDkJjoh+xl0XHjP2zJmWKo/SrAiY/xWVDHNO5t0w7jigpEIfIbMiPIAtcB71YyoYKM1a67gd2RKLBI+1rx4PlK0jz2muZNEoSJdNxlpxF+RUb/3cfJtdUYnuLMw9yrINL7Ksk+h/CLo8aRf9PA+Zu6UT86E+Gq/RPMJfKqSMiL7OEbSzo/bsmMZ88Esz5ShL5ZEMbh1ZlMQudA2KA84CSvm0gmlWIlMcvAoZNpunxLpedLU3N/f19R8Mn0WalQM6GvSicJmbyUS8PRLKtOEzDNgfx7gfV60DtkW83y4u+RhTw1MFhriWsdVUiSKX/P3lLGCRJTuWH5nDm1dS0+JueYVFOwCSB84jGkfTbiTjWcZm8IizpdLbTJKU9yI90Y3/QihR/IA42cFBJly999yBBxnSmblxOPqTSar6HrCCIKGt3pHpZfNx3wZ5e2yZAWeMH4FESM+NEq9H7LA/ND7hC7s4uqsUWY9p4epI5kBHX72qJ0wYn+lThtSkZ3peqxPIR9cWVVjeTU+ib52oF4h/pBkRIribH55h1YH8/oTqS6D0GJrWoKBESqNL/kPTWjuRaAp+2L5zMlc5i0LDxqV7b9PNAM/XRbLJHqRc1xXzpKHHLOWPngwW7imhVG+VUD9aiwpM1kVyOwv/UCEnUNx0k4sM4Wlxh2adrBv2NDCsTYdki9fTSvLgvENVnuqsPxq3PKryUsEsx8Hli5FHZLAeXu+3701RfPIROHeuHl4uzWjZQa0Pu62p3JMwS1xKp66KX2eSjfCehDjYLvR7snhRJHkTWCAEW+Q4hFoehHE/PGR1gcMNbVHdHEPxZRUj0roQSJaqjrYT+HwbNF2GCYqA1ngNqgPHZFEDhY9BuxMr904eRjjeCOr78vLjSobAuWVm0WOfXWivyr+5IP7ggEz2WDwdbHEl3tkTGLs5XZpo8N/mywWhE1tBk+0U4iUvz7uI7DMM2FB24oSrX9+wiLym/3fs5368aD3EB3KFlDZPLvQwBGJTZ0YisKi8kp0Usfbnpt84NToQYuSjzDlvnu82SOW8QsSGGQOsRxZNFLIPrmLl5CEe5OGK8kHkDqX6Mo+OEpJfYLfXnhBQJZKYlaWLtnYyqaiVBoZL6qOFjbHViuThW7pxgwwL825iEVLJSdlu4f1rkzFzAR5iH5Nc6lp+54l/+Q3eeKZOjyj4Mp1Eng9S9dSmxa90nNTEM3YMeN/cpi3O2bSFTF9Y8TbL8GswaeV5BkyYkNb5yim4vSaXZ6dfUgqhcVUrSDxExOuQtUHRUTPM6WAMSSVoz7uI0u5WjuC5nnnNg62eX9tJJLUfKSjlcs76XWo4Mppij36vHbHkZQZH1EJZfW1UQpbrBZRJN4I5bpyNZ7wH8v2yTzkTd08JvVlvPLXfEmTqSnPjjCvNF57RjnGMa//TiiBoF6csDEarciczUO00jsdaZmDPXuX9o/wOaPcUknoF1V0B9ghb8POOe+FpggVcpjkA/VwbLu4DRLgySVO9QRbr5kyy008+w785dUrsD31+STTRLik4H2odPI1zAq4isUGrlRHNGgbbMRHYwlRUiSMC1WfTnAZSgJplPjhLukY0FANEevCvqTnxaBcn8a/b6IMOsNhmRzlDGBfyVQ20BAh5j9PasVTy8kSv3NvRGs6+qysIA2M540vVtLGxksK0UWWlnH+mv5IxPk1WwNxF0ag0utcgDn+6kFoReG++ffKSfWoQoi6XU7maHc41UhkV40Hsb7g34S0b4Xqw+RfMzvUnpkJvE9s771Va+LfjvBriDJz+s4cCViXZpnVv5NckLDOyQtIzgyDkzmd+90i5clFjWa+WMcZSsKDINRExyLYWluI7J6wf3Fjvz6nVZDoakVK+wetF46iZFCJlsA4Pph8MJz21ARnm7gzVjFSPLlB561svR77GgWNWMQQupg4ugKqX/UqAm4KcerEF5pcwYcu7N6KUDf0n0yoHkpSe5yoePxF2Bjxz95pcv5Ae3IfU8w0X0yyhPc4crD8fA6VURtDtSWRLDUk4bvQEabmATzatcLrxj61mjrYipnQTSA5JMAj4pLJHzYkEgfaHgZeHGlVlIhwK+/iaEnO1DO4fdZrk5wt/V6bOYLU6BsPPXqdsgETTz0C9BYhqKlZT4ItW5ilHhGsfJd9YTjmLmJFrFI5QuAc/aGqQIe6tNurNZ435fjvpfcrl+kjgmjO84YpqUSDkwhi3CgE/UhlMoxaGAwdcicbdVKSsxSpFAo0B+6a/8IfCaeFiuxH85VkccXsoj6NncRQae1wKkWX//KzyvxxYUeKZK6RXQijVfnIyCzGKSis5rRLk72jMf/GwaMoabcnknTS6r3kwQGNJdxLFm0PnuHc/F8maD6dtvxt3xzHSP47GdXo0A/iQgJb6m0otM/ZKMVbUVWyQYYX7JIOv1uj67QnpzTYljb452S9OZW7ikAhD+6Hdf9EzSVR/05l3to8zoD80AKT6l63YbB+YntcBYNetAf29Pgxhp23f7urcCYoTWNFObVirVO+lko+en0bNehFm9dpkdw3Xqs5KwpmBeoGARr4TgpDrTZtVvacbgW4/0TnxSNSqbbxtgRiCQ0Q6yD9TXnSMvKyJJewafG1RfjuthL9UucN9E4kZk+sb54RhagVPlhDcPO0KN6J9FYjZm4jhXccb87FTCrQS/75++YMr8LcqK3kLo4JOTNERuHl9Ya9pHg65prnUT6ccd9gCneJIGOaN86wdCK8ChzgL836VowpVz6dMu2qG85QMcsVt8DLkHZ94X8H7NBEqfJSNbRrEiepz0uI4fp80/Ywk+6VoVIpdMHE+85q+OHguBtOEO2ggYJvLU12dkI9QTr2iEXrsRzx0Yy+D+f+tarCbYDae+1w3NJB5UVkJtIpNKVSKflgyotjb8tuHYrNpxAkRBvmeRKy8tyqMBRORE1VfPRCqd3zZAqZgRKEVxFpxWYkvlnl1I0jI3CKa/7IzpdvYPsS/m6YAvHh2JIn6BFvTpFyu41oAt9PsYFk3GLD0SsK1J08MHvLTILgXiW6jQ8daVSqXaqvVHuukW9syi+51eUolx97Ku6W46gHTK1x27qizgsvfhNHpEKxuJ3hA6ILj7Hp6n7eeq8q1WBX0mx9bJJOAQ1rdwjzmPx5pHjV9jZb9b4t6EUQool5DTN6oscwgM3IevFWFdMcYVu6gduz1Y0+eIipszkALpXT68ddtCzBwqzWe14jfOXWryG2Gv1FTEUhSFdsb+m2otA8ViDlu8AGi9SWxOXBT3IBme228dfkmQOJ/nvC9lKDCw3wstKyUTIuPvVHosGv8c2OyJqIeB25f40YB5r/XDq792na5tT4YEWL+9nFuYa9/N0OsbB4lw31DuL6JPENDjch3ptJpaBGxdwe4XnkvR68EVpTTtJUAdT0auupkv5LZq6p91YrEIetwhsrudlEPTR5x5+fuTAlHB2XDvIyCH3LbN15cF8US9hxch2p4xIBP3y/R2IFc2zHBUKx8eKzM45ARkiXlj1HsrCqqy+d+/qzJjv3VIsPGSU1Bxp3ao8vTCA2o8UIYFPA/z0hiJb7hb88diLARiRqQXgHt3gK/yjICX3CXH/ilc4Z0TiCjhE/Ct1VI4KmvAQbHE1/Kb2Xd8rO3Lbqs4bi9M7jeVsvjPsOl0FGYKyDjuoLve09qdpQzV9+8qOfmHpXR0fIMW/DcQuxzB6puIc4FJ7fRYt7K3bSdb1s6yCRplIgD3MrmDJFJIvIMDnSD+lOb1o00ApPk5p0GQdPPcwFtqD3kO9oeir4Nea67lzWok+3qqYZFv7ZFs7MDnfaRFRQyxBTuCkxeJVE0hfRO6CvctNA+8pA9g01LnspKUqaKJm8Z1RWZMWk+CVbqNMSNkx71DMg5ff7TJSpX8rw8MrZwTf06YBR9WE99+sE1fmQIpW/l/i45D+ktoc/doL9EoZoHKnR/od1fbHIqFO4ciXkhlgrqhgv97CBUhptCUuZ/UST08SWkT6t9wWhtao6Bc9ENEG5zXjKP9VyFT2yCLNcXZaDRsXvvF6eWBW42H1qxELNB4tYEaR+/VIocQsNKHwnpVV4O5/vnzEnk51AoKy8+tCycVWd2j7KQFexOzF4wbwqImZ4HMeZvsJAOGiFbtBe6LGuHcuWjv0ckJ9GRXjKoE63Wzu/9875NKcbG9Ny1UNjEp1xB9LEmhBCuh4XdBdQHi7s1Jsdno2RWOh1SZ8ITBBuThbnInoQogMWXmQv3GcJZAPz3psg3ay8CQn7pl/y5mahBdFD4qAvNz7a48SZfe0rBg9Zjn/e3bt2kbl6y1vq2mo71uYiXXE+InyrU0qm4HyYffJk+fzsnb521WYmq+hqZUoRlybvTOEQF/OdOxLjX8fE6kOB87HS3iQ16Vzqn43KMWjIbFUqFrLqWVwFXgGwjvu8rXYg+Y+pR6DREYqgIM6Xv+UpFPgrDXgtvEv48QK8Oe0fXyknG1YWQT0WiX+vBv44pJ9l67HV7if/ksT39raScIKV5AbHHC79+kvqe4zhpb1/TbuogpNVS6Sdp7h5O1+P/tcVP6hXhWfc/bOHYvjE/ix7Ao30wpuB9c8UDb7nA4YO/dorQU/wbbjr/fUo6vRVls2/Ng7LOW8tlfo/6j0d2I0cPyQSwq1faIgfRvOcqZ04NCW8OTAqSnj4dntQz48BeRM1dfq+4KzmG/1Oufjene2VTlsjp/eYf6C/cGAvjkW7/MW5L/PND+aUejHLfX1XoRPNJ8JKREVnC+vXaiHaFc/8mC7kVD/Tdf/w2brp+bSDfl8f/5VpRjI0IK42wHEc4dKbjpNMj0ubLAd6GR/H6mDYbvfuxeIymX1cEy9xmQhYyFfm/aK0aTpSzIRdv9kSldXUW/6QsXArXqCOdpvbvV3JwXhWkFPhYaSiRfHs2zvAhKYtxst1uRgayhCXjitvQ8xWwJ77xhj+nPvOa+Vxo22aktcQXZKnM6bEXQkF1fx3aP9g7APl1pF+D7h6YFxTZ9LAY/T2ZjFnv/DHndf6jIbadnDxAsMyKZ4kOgWeSsrJlMNHO89fOzb2ZdbbGyoWo1Xxlv381YrNR+qZybPfav7QGEFwS1zWPu+1EuhLxsYfgR9xK1QsuNq2xrOLZu7z/MQdgVcU8jINSSU72z12lTgUtR8a1/0lptVoTktzdDc64lVXnZCyTAxjfuclOCmh/GRKC7Mm1877kE1xYwD30/WkMaI1gF41WqJn+/7+XoWJ2N4uSklVzGluwLq4SjI32FWo40gsqQeZ8X0NMsV9NF8l/txdUveM65ADRY+ytfBbgaMDtiQ/cYmarcmcnhL3MSH7hw4do9zlJWaSy41vU//MfA/Fxf76ClAuxK4T9la76b/AqpYwf7H9G+oooayMtztmaw90dBIe37UuE+ylu+8HlPSr6/QHq7eb9tAd7HQ+M3b8q684zFL2hjXbI+8RpqXRiJ35kRvdhFPk5qgM8BIafNxzyP1SVsZ4+NfVMtFOyN7eEWcny7viI/qN1x/UqqzGZMtFr1BLv+2ouBUH1tHWQ6/uikZA/vlsV7y2M57/dJS1Lf9TTnLN6YnYJTCu50Xb2dC11rYmzzt1CM+HFua5sAsDPUlXaVIN998a/NP2VhKR4znm/7ru5Yrn920zjjIMWdm44eMyI9ttCcHvIuzFPSoUX//nUbG5BI2Z7ki6H5rTm8iiyWwF2DhbI507o6NT2tNp7+Tljl0m0f+mn0rW8TkuFJxyzg5Ny14JT5jOIr/9W5jFnM9bxLrlzvD1454p3URLxEN1PT3Ikcg/QsCF0byKYeYOd2RJ2sVd1sr1OWoFA21a9S+RqFVAse8rNGElPb2qUKTm1V3Vi1p8ngP1ySW7XLrfODS65k5fiqcPq5Ha/rQeVlWiPjnXsz0WYaG3SglMPpzV4Dtmk67Bscs6nt7FfxNza7w/9tAewDDWvN7n/dfv6+tjP4CAvTynodbVFKquHkwDTZUQNtNFn4r7VndOToYXEbCG5qPB0Fu6tM/tsAJBeBaT+xlMZThNR4d+CUnUhpG3Cvz2aoPFQi0Kr1RrObhIIwKGWWQ4lmAFMvDMRcQlgQsbWChY7Qhr8nas9qgYZQ4NMneVE7aWty2ig1RMRyiyIvdBNAxf+F9e+EVqdYaO7MwZ5JbGGNGsF7tkvhsQG2BM67ciEwR//B45jJD5lKfTxj0kk02KKxlHShYNC278Nl32uYKyIoaDWFIh7YVkqkviDc+DaX+tunHbl8zSoGLhR509ywTxu90VE+dIPq/1ZNTgZNF4xJR5fHliJJZgGyqzSXdU8IU0InDcIICB94fleErE8gtviNXHwOxhfC4reMDYk5W5Wi6Jwh72H2QllSSqxEyC/gdQSwcIFX/RI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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="4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0" />
<param name="framePossible" value="true" />
<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="useBrowserForJS" value="true" />
<param name="allowRescaling" value="false" />
</applet><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-6858396078691820462?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/4qACRhCny3KYx5_qJHl0wgWbu68/0/da"><img src="http://feedads.g.doubleclick.net/~a/4qACRhCny3KYx5_qJHl0wgWbu68/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/4qACRhCny3KYx5_qJHl0wgWbu68/1/da"><img src="http://feedads.g.doubleclick.net/~a/4qACRhCny3KYx5_qJHl0wgWbu68/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/CQry-OS6kgs" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2011/11/sombra-de-un-edificio.htmltag:blogger.com,1999:blog-5932372752540433762.post-64076132089637613802011-11-28T11:06:00.001-08:002011-11-28T11:39:30.839-08:002011-11-28T11:39:30.839-08:00Una tesela de clase<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar"
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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="4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0, 4.0.12.0" />
<param name="framePossible" value="true" />
<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="useBrowserForJS" value="true" />
<param name="allowRescaling" value="false" />
</applet><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-6407613208963761380?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/UhXPC8YMHyfUW74Cc4D6pbZkGp4/0/da"><img src="http://feedads.g.doubleclick.net/~a/UhXPC8YMHyfUW74Cc4D6pbZkGp4/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/UhXPC8YMHyfUW74Cc4D6pbZkGp4/1/da"><img src="http://feedads.g.doubleclick.net/~a/UhXPC8YMHyfUW74Cc4D6pbZkGp4/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/duWDKqvlGI0" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2011/11/una-tesela-de-clase.htmltag:blogger.com,1999:blog-5932372752540433762.post-8930283056645849632011-05-06T08:41:00.000-07:002011-06-04T14:53:48.774-07:002011-06-04T14:53:48.774-07:00Probando con una rectaAquí es antes del applet<br />
<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar"
codebase="http://www.geogebra.org/webstart/3.2/"
width="762" height="429"><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_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" /><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" /><param name="showAlgebraInput" value="true" /><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 />
Aquí es después<div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-893028305664584963?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/BZ2L8a-tdkYTD5ef65orzRexc-Y/0/da"><img src="http://feedads.g.doubleclick.net/~a/BZ2L8a-tdkYTD5ef65orzRexc-Y/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/BZ2L8a-tdkYTD5ef65orzRexc-Y/1/da"><img src="http://feedads.g.doubleclick.net/~a/BZ2L8a-tdkYTD5ef65orzRexc-Y/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/vximMrmelk4" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com1http://luisgdelarosa.blogspot.com/2011/05/probando-con-una-recta.htmltag:blogger.com,1999:blog-5932372752540433762.post-22065878220500466062011-02-11T20:04:00.000-08:002011-02-11T20:06:13.941-08:002011-02-11T20:06:13.941-08:00Calculus Rhapsody<iframe title="YouTube video player" width="640" height="390" src="http://www.youtube.com/embed/uqwC41RDPyg" frameborder="0" allowfullscreen></iframe><br />
Les comparto este vídeo, para los que tienen que ver algo con el cálculo.<div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-2206587822050046606?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/tMvKrEj1e6rYpj4ZfFrewoZJi-A/0/da"><img src="http://feedads.g.doubleclick.net/~a/tMvKrEj1e6rYpj4ZfFrewoZJi-A/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/tMvKrEj1e6rYpj4ZfFrewoZJi-A/1/da"><img src="http://feedads.g.doubleclick.net/~a/tMvKrEj1e6rYpj4ZfFrewoZJi-A/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/0ejQbUVtf2A" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2011/02/calculus-rhapsody.htmltag:blogger.com,1999:blog-5932372752540433762.post-20189790916793101452010-11-10T13:06:00.001-08:002010-11-10T13:06:52.794-08:002010-11-10T13:06:52.794-08:00Vídeo con instrucciones para insertar un applet de geogebra en un blog<object width="640" height="505"><param name="movie" value="http://www.youtube.com/v/btciIhWGO8U?fs=1&hl=es_ES"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/btciIhWGO8U?fs=1&hl=es_ES" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="640" height="505"></embed></object><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-2018979091679310145?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/A58f3w8k3tM-X3bXg4YS1dkViM8/0/da"><img src="http://feedads.g.doubleclick.net/~a/A58f3w8k3tM-X3bXg4YS1dkViM8/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/A58f3w8k3tM-X3bXg4YS1dkViM8/1/da"><img src="http://feedads.g.doubleclick.net/~a/A58f3w8k3tM-X3bXg4YS1dkViM8/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/CiLye90EZQM" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com1http://luisgdelarosa.blogspot.com/2010/11/video-con-instrucciones-para-insertar.htmltag:blogger.com,1999:blog-5932372752540433762.post-56681016106442586482010-10-24T18:43:00.000-07:002010-10-24T18:43:23.293-07:002010-10-24T18:43:23.293-07:00SOMECE 2010<embed type="application/x-shockwave-flash" src="http://picasaweb.google.com/s/c/bin/slideshow.swf" width="400" height="267" flashvars="host=picasaweb.google.com&hl=es&feat=flashalbum&RGB=0x000000&feed=http%3A%2F%2Fpicasaweb.google.com%2Fdata%2Ffeed%2Fapi%2Fuser%2Fluisgdelarosa%2Falbumid%2F5531790342560054849%3Falt%3Drss%26kind%3Dphoto%26authkey%3DGv1sRgCNrniNbGx9rNGw%26hl%3Des" pluginspage="http://www.macromedia.com/go/getflashplayer"></embed><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-5668101610644258648?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/lkMoGVJiRuXBkH2gl0rKI_xjkco/0/da"><img src="http://feedads.g.doubleclick.net/~a/lkMoGVJiRuXBkH2gl0rKI_xjkco/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/lkMoGVJiRuXBkH2gl0rKI_xjkco/1/da"><img src="http://feedads.g.doubleclick.net/~a/lkMoGVJiRuXBkH2gl0rKI_xjkco/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/TvFZEkeg8J4" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com2http://luisgdelarosa.blogspot.com/2010/10/somece-2010.htmltag:blogger.com,1999:blog-5932372752540433762.post-49869404266191743002010-10-21T14:08:00.000-07:002010-10-23T17:20:14.649-07:002010-10-23T17:20:14.649-07:00Vídeos de construcción de la integralEspero que estos vídeos pueda seru un buen comienzo para el manejo de GeoGebra. He tratado de compartir algunos detalles útiles en el uso de GeoGebra:<br />
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No dejen de descargar GeoGebra en <a href="http://geogebra.org/">http://geogebra.org</a><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-4986940426619174300?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/XcUPec-w3XlRKk9jdDH7GeWjwYM/0/da"><img src="http://feedads.g.doubleclick.net/~a/XcUPec-w3XlRKk9jdDH7GeWjwYM/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/XcUPec-w3XlRKk9jdDH7GeWjwYM/1/da"><img src="http://feedads.g.doubleclick.net/~a/XcUPec-w3XlRKk9jdDH7GeWjwYM/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/Mzvgsooe-A8" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2010/10/videos-de-construccion-de-la-integral.htmltag:blogger.com,1999:blog-5932372752540433762.post-75657511519450999892010-10-04T06:46:00.000-07:002010-10-04T06:46:28.884-07:002010-10-04T06:46:28.884-07:00Operaciones con funciones<applet name="ggbApplet" code="geogebra.GeoGebraApplet" archive="geogebra.jar"
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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><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-7565751151945099989?l=luisgdelarosa.blogspot.com' alt='' /></div>
<p><a href="http://feedads.g.doubleclick.net/~a/XHU327MhCd9XqcF-J7vIn55etjk/0/da"><img src="http://feedads.g.doubleclick.net/~a/XHU327MhCd9XqcF-J7vIn55etjk/0/di" border="0" ismap="true"></img></a><br/>
<a href="http://feedads.g.doubleclick.net/~a/XHU327MhCd9XqcF-J7vIn55etjk/1/da"><img src="http://feedads.g.doubleclick.net/~a/XHU327MhCd9XqcF-J7vIn55etjk/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/QXzBrCZGViI" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com1http://luisgdelarosa.blogspot.com/2010/10/operaciones-con-funciones.htmltag:blogger.com,1999:blog-5932372752540433762.post-31261283900676538792010-07-05T10:56:00.000-07:002010-07-05T10:57:08.324-07:002010-07-05T10:57:08.324-07:00Prueba de Descartes en Blog<applet width=680 height=605 code="Arquimedes.class" codebase="http://descartes.geometriadinamica.org/descartes" archive="Arquimedes.jar" MAYSCRIPT><param name="tamaño" value="650x585"><param name="pleca" value="title='Condiciones de paralelismo' subtitle='Construyendo rectas paralelas' subtitlines='0' bgcolor='536891' fgcolor='ffffff' align='' titleimage='images/instrucciones.jpg' titlefont='SansSerif,BOLD,20' subtitlefont='SansSerif,ITALICS,18' "><param name="rtf" value="{\rtf1\uc0{\fonttbl\f0\fcharset0 Arial;\f1\fcharset0 Arial;\f2\fcharset0 Arial;\f3\fcharset0 Arial;\f4\fcharset0 Arial;\f5\fcharset0 Times New Roman;\f6\fcharset0 Arial;\f7\fcharset0 Arial;\f8\fcharset0 Arial;}{\colortbl\red32\green80\blue96;\red0\green0\blue0;\red0\green0\blue255;}\f1\fs36\cf0 Objetivo\fs34\cf1\par \par El objetivo de aprendizaje es que el alumno observe las condiciones de paralelismo entre dos rectas\par y que observe la relaci\u243 n entre las pendientes cuando sucedeesta condici\u243 n.\par \par \fs38\b\cf2 Condiciones de paralelismo\cf1\fs34\b0\par \par \b Definiciones:\b0\par Se dice que dos l\u237 neas rectas \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula l{\subix 2}}\f2\fs34\i0 son paralelas si:\par a) No se cortan.\par b) Si el \u225 ngulo que forman las rectas \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula l{\subix 2}}\f2\fs34\i0 son con el eje X son iguales.\par \par \b Escena 1\b0\par \par A continuaci\u243 n observa la siguiente escena en donde aparecen dos rectas paralelas, la primera de ellas\par \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 que pasa por los puntos \f5\fs38\i{\*\mjaformula P{\subix 1}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula P{\subix 2}}\f2\fs34\i0 y la recta \f5\fs38\i{\*\mjaformula l{\subix 2}}\f2\fs34\i0 que pasa por el punto \f5\fs38\i{\*\mjaformula P{\subix 3}}\f2\fs34\i0 y es paralela a la recta \f5\fs38\i{\*\mjaformula l{\subix 2}}\f2\fs34\i0 .\par En la escena se puede ver la recta \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 y los puntos \f5\fs38\i{\*\mjaformula P{\subix 1}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula P{\subix 2}}\f2\fs34\i0 que la definen, Tambi\u233 n puedes ver el punto\par \f5\fs38\i{\*\mjaformula P{\subix 3}}\f2\fs34\i0 . Puedes {\*\component\NumCtrl 1296f8804a4} la recta paralela a \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 que pasa por \f5\fs38\i{\*\mjaformula P{\subix 3}}\f2\fs34\i0 da clic en el bot\u243 n. Tambi\u233 n \par puedes {\*\component\NumCtrl 1296f9cabc1} de ambas rectas para observar la relaci\u243 n entre las pendientes de ambas \par rectas.\par \par {\*\component\Space 1296f813e95}\par \par \par \par \par \par \par \par \par \par \par \par \par \par \par \par \par \par {\*\component\NumCtrl 1296fca6ce1} {\*\component\NumCtrl 1296fcbaf7f} {\*\component\NumCtrl 12970318dc8}\par \par Mueve los puntos \f5\fs38\i{\*\mjaformula P{\subix 1}}\f2\fs34\i0 , \f5\fs38\i{\*\mjaformula P{\subix 2}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula P{\subix 3}}\f2\fs34\i0 y observa la relaci\u243 n entre las dos rectas y sus pendientes cuando son\par paralelas.\par \par \fs38\b\i Enunciado\i0 .\fs34\b0 Si las rectas \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula l{\subix 2}}\f2\fs34\i0 no son verticales entonces \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula l{\subix 2}}\f2\fs34\i0 son paralelas (\f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 \f5\fs38\i\u8741 {\*\mjaformula l{\subix 2}}\f2\fs34\i0 ) \par si y solo s\u237 sus pendientes son iguales.\par \par \cf0\fs38 Ejercicio\fs36\cf1\par \fs34\par Acomoda los puntos \f5\fs38\i{\*\mjaformula P{\subix 3}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula P{\subix 4}}\f2\fs34\i0 que definen a la recta \f5\fs38\i{\*\mjaformula l{\subix 2}}\f2\fs34\i0 para que ella sea paralela a la recta \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 , para\par ello da clic sobre los puntos \f5\fs38\i{\*\mjaformula P{\subix 3}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula P{\subix 4}}\f2\fs34\i0 para acomodar la recta para que sea paralela a la recta\par que pasa por los puntos \f5\fs38\i{\*\mjaformula P{\subix 1}}\f2\fs34\i0 y \f5\fs38\i{\*\mjaformula P{\subix 2}}\f2\fs34\i0 en la escena siguiente considerando el valor de la pendiente de \f5\fs38\i{\*\mjaformula l{\subix 1}}\f2\fs34\i0 :\par \b\par Escena 2\b0\par {\*\component\Space 129769e9cc3}\par \par \par \par \par \par \par \par \par \par \par \par \par \par \par \par \par \par {\*\component\NumCtrl 12976b5bdc4} {\*\component\NumCtrl 12976c8ff76} {\*\component\NumCtrl 129771d6653}\par \par \fs38\b Observaci\u243 n:\fs34\b0\par Es necesario hacer notar que en el caso de que las rectas sean verticales las condiciones antes \par mencionadas no se cumplen ya que en este caso las dos rectas verticales ser\u225 n paralelas, pero no\par tienen definida una pendiente, por lo cual no se puede decir que sus pendientes son iguales.\par \fs38\b\par _______________________________________________________________________\par \par \fs32\b0 Autor: Luis Guillermo de la Rosa Jim\u233 nez\fs24\par }"><param name="decimal_symbol" value="."><param name="antialias" value="sí"><param name="Versión" value="4.098, 2010-05-21"><param name="Idioma" value="español"><param name="Botones" value="créditos=no config=no inicio=no limpiar=no alto=30"><param name="E_00" value="tipo='R2' id='E0' x='0' y='0' ancho='560' alto='360' escala='30' despl_imagen='arr-izq' 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indefinida&squot;;error2=&squot;error&squot;;x3=(-1)^redondeo(rnd)* redondeo(6*(rnd));y3=(-1)^redondeo(rnd)* redondeo(6*(rnd));x4=(-1)^redondeo(rnd)* redondeo(6*(rnd));y4=(-1)^redondeo(rnd)* redondeo(6*(rnd));;;;' mientras='(x3=x4)|(y3=y4)'"><br /> <param name="A_01" value="id='CALCULOS' algoritmo='sí' evaluar='siempre' hacer='P1.x=(abs(P1.x-(ent(P1.x)))<0.2)?ent(P1.x):P1.x;P1.y=(abs(P1.y-(ent(P1.y)))<0.2)?ent(P1.y):P1.y;P2.x=(abs(P2.x-(ent(P2.x)))<0.2)?ent(P2.x):P2.x;P2.y=(abs(P2.y-(ent(P2.y)))<0.2)?ent(P2.y):P2.y;P3.x=(abs(P3.x-(ent(P3.x)))<0.2)?ent(P3.x):P3.x;P3.y=(abs(P3.y-(ent(P3.y)))<0.2)?ent(P3.y):P3.y;P11.x=(abs(P11.x-(ent(P11.x)))<0.2)?ent(P11.x):P11.x;P11.y=(abs(P11.y-(ent(P11.y)))<0.2)?ent(P11.y):P11.y;P12.x=(abs(P12.x-(ent(P12.x)))<0.2)?ent(P12.x):P12.x;P12.y=(abs(P12.y-(ent(P12.y)))<0.2)?ent(P12.y):P12.y;;'"><param name="A_02" value="id='slope(x1,y1,x2,y2)' expresión='(x2#x1)?((y2-y1)/(x2-x1)):error'"><param name="A_03" value="id='pendiente' algoritmo='sí' evaluar='siempre' hacer='m=slope(P1.x,P1.y,P2.x,P2.y)'"><param name="A_04" value="id='cangulo' algoritmo='sí' evaluar='siempre' hacer='angulo=(abs(P2.x-P1.x)<0.09)?(pi/2):((m>=0)?atan(m):pi+atan(m))'"><param name="A_05" value="id='redondeo(x)' expresión='(x-ent(x)<.5)?ent(x):ent(x+1)'"><param name="A_06" value="id='puntos_fijos()' algoritmo='sí' algoritmo='sí' hacer='x3=(-1)^redondeo(rnd)* redondeo(6*(rnd));y3=(-1)^redondeo(rnd)* redondeo(6*(rnd));x4=(-1)^redondeo(rnd)* redondeo(6*(rnd));y4=(-1)^redondeo(rnd)* redondeo(6*(rnd));exito=0' mientras='(x3=x4)|(y3=y4)'"><param name="G_00" value="espacio='E0' tipo='ecuación' color='0000b0' expresión='(y-P1.y)*(P2.x-P1.x)=(P2.y-P1.y)*(x-P1.x)' ancho='3' visible='no'"><param name="G_01" value="espacio='E0' tipo='punto' expresión='(P1.x,P1.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula P{\subix 1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí'"><param name="G_02" value="espacio='E0' tipo='punto' expresión='(P2.x,P2.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula P{\subix 2}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí'"><param name="G_03" value="espacio='E0' tipo='punto' color='rojo' dibujar-si='(P2.x#P1.x)&(mpendiente=1)' expresión='(P1.x+1,P1.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Courier New;}\f1\fs24}' fuente='Times New Roman,PLAIN,12' fijo='sí' tamaño='3'"><param name="G_04" value="espacio='E0' tipo='punto' color='rojo' dibujar-si='(P2.x#P1.x)&(mpendiente=1)' expresión='(P1.x+1,P1.y+m)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Courier New;}\f1\fs24}' fuente='Times New Roman,PLAIN,12' fijo='sí' tamaño='3'"><param name="G_05" value="espacio='E0' tipo='flecha' color='azul' dibujar-si='(P2.x#P1.x)&(P2.y#P1.y)&(mpendiente=1)' expresión='(P1.x,P1.y)(P1.x+1,P1.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Courier New;}\f1\fs24}' fuente='Times New Roman,PLAIN,12' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_06" value="espacio='E0' tipo='flecha' color='azul' dibujar-si='(P2.x#P1.x)&(P2.y#P1.y)&(mpendiente=1)' expresión='(P1.x+1,P1.y)(P1.x+1,P1.y+m)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula m={\expr m\decimals 2\fixed1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_07" value="espacio='E0' tipo='texto' dibujar-si='(P2.x=P1.x)&(P2.y#P1.y)&(mpendiente=1)' expresión='[20,20]' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Arial;\f2\fcharset0 Courier New;}\f1\fs36\i{\*\mjaformula m} se encuentra indefinida ya que la recta es vertical\f2\fs24\i0}' fuente='Arial Cursiva,ITALIC,18' fijo='sí'"><param name="G_08" value="espacio='E0' tipo='texto' dibujar-si='(P2.x=P1.x)&(P2.y=P1.y)&(mpendiente=1)' expresión='[20,20]' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs36\i{\*\mjaformula m} se encuentra indefinida ya un punto no define a una recta\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,18' fijo='sí'"><param name="G_09" value="espacio='E0' tipo='punto' expresión='(P3.x,P3.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula P{\subix 3}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí'"><param name="G_10" value="espacio='E0' tipo='flecha' color='azul' dibujar-si='(P2.x#P1.x)&(P2.y#P1.y)&(mpendiente=1)' expresión='(P3.x,P3.y)(P3.x+1,P3.y)' fuente='Monospaced,PLAIN,12' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_11" value="espacio='E0' tipo='flecha' color='azul' dibujar-si='(P2.x#P1.x)&(P2.y#P1.y)&(mpendiente=1)' expresión='(P3.x+1,P3.y)(P3.x+1,P3.y+m)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula m={\expr m\decimals 2\fixed1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_12" value="espacio='E0' tipo='punto' color='rojo' dibujar-si='(P2.x#P1.x)&(mpendiente=1)' expresión='(P3.x+1,P3.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Courier New;}\f1\fs24}' fuente='Times New Roman,PLAIN,12' fijo='sí' tamaño='3'"><param name="G_13" value="espacio='E0' tipo='ecuación' color='gris' dibujar-si='mparalela' expresión='(y-P3.y)*(P2.x-P1.x)=(P2.y-P1.y)*(x-P3.x)' ancho='3' visible='no'"><param name="G_14" value="espacio='E0' tipo='punto' color='rojo' dibujar-si='(P2.x#P1.x)&(mpendiente=1)' expresión='(P3.x+1,P3.y+m)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Courier New;}\f1\fs24}' fuente='Times New Roman,PLAIN,12' fijo='sí' tamaño='3'"><param name="G_15" value="espacio='E0' tipo='punto' expresión='((P1.x+P2.x)/2+.2,(P1.y+P2.y)/2)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula l{\subix 1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='0'"><param name="G_16" value="espacio='E0' tipo='punto' color='negro' dibujar-si='mparalela' expresión='(P3.x+2.2,P3.y+2*m)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula l{\subix 2}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='0'"><param name="G_17" value="espacio='E0' tipo='arco' dibujar-si='ang' centro='(P1.x,P1.y)' radio='.8' fin='180*angulo/pi' fuente='Monospaced,PLAIN,12' fijo='sí' ancho='2'"><param name="G_18" value="espacio='E0' tipo='flecha' dibujar-si='(ang=1)&(angulo>=3*pi/180)' expresión='(P1.x+.8*cos(angulo-3*pi/180),P1.y+.8*sen(angulo-3*pi/180))(P1.x+.8*cos(angulo),P1.y+.8*sen(angulo))' fuente='Monospaced,PLAIN,12' fijo='sí' tamaño='1' ancho='1' punta='3' flecha='negro'"><param name="G_19" value="espacio='E0' tipo='punto' dibujar-si='ang' expresión='((-P1.x*P2.y+P2.x*P1.y)/(P1.y-P2.y)+.8*cos(angulo/2),.8*sen(angulo/2))' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula\u952 ={\expr 180*angulo/pi\decimals 1\fixed1} \u176 }\f2\fs24\i0 }' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='1'"><param name="G_20" value="espacio='E0' tipo='punto' dibujar-si='ang' expresión='(P1.x+.8*cos(angulo/2),P1.y+.8*sen(angulo/2))' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula\u952 ={\expr 180*angulo/pi\decimals 1\fixed1} \u176 }\f2\fs24\i0 }' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='0'"><param name="G_21" value="espacio='E0' tipo='arco' dibujar-si='ang' centro='((-P1.x*P2.y+P2.x*P1.y)/(P1.y-P2.y),0)' radio='.8' fin='180*angulo/pi' fuente='Monospaced,PLAIN,12' fijo='sí' ancho='2'"><param name="G_22" value="espacio='E0' tipo='flecha' dibujar-si='ang&(angulo>=3*pi/180)' expresión='((-P1.x*P2.y+P2.x*P1.y)/(P1.y-P2.y)+.8*cos(angulo-3*pi/180),0.8*sen(angulo-3*pi/180))((-P1.x*P2.y+P2.x*P1.y)/(P1.y-P2.y)+.8*cos(angulo),.8*sen(angulo))' fuente='Monospaced,PLAIN,12' fijo='sí' tamaño='1' ancho='1' punta='3' flecha='negro'"><param name="G_23" value="espacio='E0' tipo='arco' dibujar-si='ang&mparalela' centro='(-P3.y/m+P3.x,0)' radio='.8' fin='180*angulo/pi' fuente='Monospaced,PLAIN,12' fijo='sí' ancho='2'"><param name="G_24" value="espacio='E0' tipo='flecha' dibujar-si='ang&(angulo>=3*pi/180)&mparalela' expresión='(-P3.y/m+P3.x+.8*cos(angulo-3*pi/180),0.8*sen(angulo-3*pi/180))(-P3.y/m+P3.x+.8*cos(angulo),.8*sen(angulo))' fuente='Monospaced,PLAIN,12' fijo='sí' tamaño='1' ancho='1' punta='3' flecha='negro'"><param name="G_25" value="espacio='E0' tipo='arco' dibujar-si='ang&mparalela' centro='(-P3.y/m+P3.x,0)' radio='.8' fin='180*angulo/pi' fuente='Monospaced,PLAIN,12' fijo='sí'"><param name="G_26" value="espacio='E0' tipo='punto' dibujar-si='ang&mparalela' expresión='(-P3.y/m+P3.x+.8*cos(angulo/2),.8*sen(angulo/2))' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula\u952 ={\expr 180*angulo/pi\decimals 1\fixed1} \u176 }\f2\fs24\i0 }' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='1'"><param name="G_27" value="espacio='E0' tipo='texto' dibujar-si='mpendiente' expresión='[20,50]' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula m{\subix l{\subix 1}}=m{\subix l{\subix 2}}={\fraction{\num{\expr P2.y-P1.y\decimals 2\fixed1}}{\den{\expr P2.x-P1.x\decimals 2\fixed1}}}={\expr (P2.x#P1.x)?m:error\decimals 2\fixed1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí'"><param name="G_28" value="espacio='E3' tipo='punto' expresión='(P11.x+.1,P11.y+.1)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula P{\subix 3}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='0'"><param name="G_29" value="espacio='E3' tipo='punto' expresión='(P12.x+.1,P12.y+.1)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Times New Roman;\f3\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula P{\subix\f2\fs22\i 4}}\f3\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='0'"><param name="G_30" value="espacio='E3' tipo='ecuación' color='gris' expresión='(y-P11.y)*(P12.x-P11.x)=(P12.y-P11.y)*(x-P11.x)' ancho='3' visible='no'"><param name="G_31" value="espacio='E3' tipo='ecuación' color='gris' expresión='(y-y3)*(x4-x3)=(y4-y3)*(x-x3)' ancho='3' visible='no'"><param name="G_32" value="espacio='E3' tipo='punto' color='d60000' expresión='(x3,y3)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula P{\subix 1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='4'"><param name="G_33" value="espacio='E3' tipo='punto' color='d60000' expresión='(x4,y4)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Times New Roman;\f3\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula P{\subix\f2\fs22\i 2}}\f3\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='4'"><param name="G_34" value="espacio='E3' tipo='punto' expresión='((x3+x4)/2+.2,(y3+y4)/2+.2)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Times New Roman;\f3\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula l{\subix\f2\fs22\i 1}}\f3\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='0'"><param name="G_35" value="espacio='E3' tipo='flecha' color='azul' dibujar-si='(x3#x4)&(y4#y3)&(mpendiente4=1)' expresión='(x3,y3)(x4,y3)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula x={\expr x4-x3\decimals 1\fixed1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_36" value="espacio='E3' tipo='flecha' color='azul' dibujar-si='(x3#x4)&(y4#y3)&(mpendiente4=1)' expresión='(x4,y3)(x4,y4)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula y={\expr y4-y3\decimals 2\fixed1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_37" value="espacio='E3' tipo='flecha' color='azul' dibujar-si='(P12.x#P11.x)&(P11.y#P12.y)&(mpendiente4=1)' expresión='(P11.x,P11.y)(P12.x,P11.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula x={\expr P12.x-P11.x\decimals 2\fixed1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_38" value="espacio='E3' tipo='flecha' color='azul' dibujar-si='(P11.x#P12.x)&(P11.y#P12.y)&(mpendiente4=1)' expresión='(P12.x,P11.y)(P12.x,P12.y)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula y={\expr P12.y-P11.y\decimals 2\fixed1}}\f2\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' ancho='2' ancho='2' punta='3'"><param name="G_39" value="espacio='E3' tipo='punto' expresión='((P11.x+P12.x)/2+.2,(P11.y+P12.y)/2+.2)' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Times New Roman;\f2\fcharset0 Times New Roman;\f3\fcharset0 Courier New;}\f1\fs28\i{\*\mjaformula l{\subix\f2\fs22\i 2}}\f3\fs24\i0}' fuente='Times New Roman Cursiva,ITALIC,14' fijo='sí' tamaño='0'"><param name="G_40" value="espacio='E3' tipo='texto' color='rojo' dibujar-si='exito=1' expresión='[20,230]' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Courier New;\f2\fcharset0 Courier New;}\f1\fs30 !Muy bien lo hiciste\u161 , da clic\par en el bot\u243 n Genera otra recta para\par acomodar otras dos rectas de manera\par paralela.\fs24}' fuente='Courier New,PLAIN,15' fijo='sí'"><param name="G_41" value="espacio='E3' tipo='texto' color='0000af' dibujar-si='exito=-1' expresión='[20,230]' texto='{\rtf1\uc0{\fonttbl\f0\fcharset0 Times New Roman;\f1\fcharset0 Courier New;\f2\fcharset0 Courier New;\f3\fcharset0 Times New Roman;}\f1\fs30 Acomoda mejor los puntos\fs24 \f3\fs28\i{\*\mjaformula P{\subix 3}}\f2\fs24\i0 y \f3\fs28\i{\*\mjaformula P{\subix 4}}\f2\fs24\i0\par ya que todav\u237 a no son paralelas y\par cuando estes seguro da clic nuevamente \par en el bot\u243 n verifica paralelismo.}' fuente='Courier New,PLAIN,15' fijo='sí'"><font face="Arial" size="3">Esta unidad interactiva requiere la máquina virtual de Java <a href="http://java.sun.com/javase/downloads/index.jsp" target="_blank">J2RE</a>.</font><font face="Arial" size="3"><br>Versiones recomendadas: <a href="http://132.248.17.86/soporte/jre-6u7-windows-i586-p-s.exe" target="_self">jre-6u7-windows</a> y <a href="http://132.248.17.86/soporte/jre-6u13-linux-i586-rpm.bin" target="_self">jre-6u13-linux</a></font><br /></applet><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-3126128390067653879?l=luisgdelarosa.blogspot.com' alt='' /></div>
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<a href="http://feedads.g.doubleclick.net/~a/saG3bL_5N7SYW2_4f8W4cYV29u4/1/da"><img src="http://feedads.g.doubleclick.net/~a/saG3bL_5N7SYW2_4f8W4cYV29u4/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/BLkxGooPUnw" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2010/07/prueba-de-descartes-en-blog.htmltag:blogger.com,1999:blog-5932372752540433762.post-32431599362948291532010-05-21T22:08:00.000-07:002010-06-09T19:21:47.533-07:002010-06-09T19:21:47.533-07:00Construcción de la Integral con GeoGebra<applet name="ggbApplet" code="geogebra.GeoGebraApplet" codebase="http://www.geogebra.org/en/upload/files/GeometriaDinamica.org/pruebas/" archive="http://www.geogebra.org/webstart/geogebra.jar " height="450" width="800"><br /><br /><param name="filename" value="http://www.geogebra.org/en/upload/files/GeometriaDinamica.org/pruebas/integral.ggb"><br /><br /><param name="framePossible" value="true"><br /><br /><param name="showResetIcon" value="false"><br /><br /><param name="enableRightClick" value="false"><br /><br /><param name="showMenuBar" value="false"><br /><br /><param name="showToolBar" value="true"><br /><br /><param name="showToolBarHelp" value="false"><br /><br /><param name="showAlgebraInput" value="true"><br /><br />Lo siento, GeoGebra Applet no puede iniciar. Asegúrese que tiene Java 1.4.2 (o posterior) instalado y activelo en su explorador (<a href="http://java.sun.com/getjava">Clic aquí para instalar Java ahora</a>)<br /><br /></applet><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-3243159936294829153?l=luisgdelarosa.blogspot.com' alt='' /></div>
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<a href="http://feedads.g.doubleclick.net/~a/gEkvQDT4mJ1_YGAW6G9X9JPMt-8/1/da"><img src="http://feedads.g.doubleclick.net/~a/gEkvQDT4mJ1_YGAW6G9X9JPMt-8/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/irhM1IGjTlY" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2010/05/construccion-de-la-integral-con.htmltag:blogger.com,1999:blog-5932372752540433762.post-49717186609200157932010-05-21T21:51:00.000-07:002010-05-21T21:52:55.995-07:002010-05-21T21:52:55.995-07:00Publicación de applets de GeoGebra en Internet<object width="480" height="385"><param name="movie" value="http://www.youtube.com/v/LKE9ci-j57s&hl=es_ES&fs=1&"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/LKE9ci-j57s&hl=es_ES&fs=1&" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="480" height="385"></embed></object><br /><object width="480" height="385"><param name="movie" value="http://www.youtube.com/v/E-C99z8VILQ&hl=es_ES&fs=1&"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/E-C99z8VILQ&hl=es_ES&fs=1&" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="480" height="385"></embed></object><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-4971718660920015793?l=luisgdelarosa.blogspot.com' alt='' /></div>
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<a href="http://feedads.g.doubleclick.net/~a/BpZ8ZBTabcZBcDhTYW6dttM_Xcs/1/da"><img src="http://feedads.g.doubleclick.net/~a/BpZ8ZBTabcZBcDhTYW6dttM_Xcs/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/Px04Ad47obk" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2010/05/publicacion-de-applets-de-geogebra-en.htmltag:blogger.com,1999:blog-5932372752540433762.post-32187882658709697412010-05-21T21:47:00.000-07:002010-05-21T21:50:07.814-07:002010-05-21T21:50:07.814-07:00Videos de construcción de la integral en GeoGebra<object width="480" height="385"><param name="movie" value="http://www.youtube.com/v/IRhfXvTCn1w&hl=es_ES&fs=1&"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/IRhfXvTCn1w&hl=es_ES&fs=1&" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="480" height="385"></embed></object><br /><object width="480" height="385"><param name="movie" value="http://www.youtube.com/v/dgGexl5VIU8&hl=es_ES&fs=1&"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/dgGexl5VIU8&hl=es_ES&fs=1&" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="480" height="385"></embed></object><br /><object width="480" height="385"><param name="movie" value="http://www.youtube.com/v/c-A7Xkz3UdY&hl=es_ES&fs=1&"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/c-A7Xkz3UdY&hl=es_ES&fs=1&" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="480" height="385"></embed></object><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-3218788265870969741?l=luisgdelarosa.blogspot.com' alt='' /></div>
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<a href="http://feedads.g.doubleclick.net/~a/dgqvJlPW0n1ZjI8lB2BrTOh0VjE/1/da"><img src="http://feedads.g.doubleclick.net/~a/dgqvJlPW0n1ZjI8lB2BrTOh0VjE/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/IlzB6YiFe_4" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2010/05/videos-de-construccion-de-la-integral.htmltag:blogger.com,1999:blog-5932372752540433762.post-76273547999753123622010-04-21T18:47:00.000-07:002010-05-21T22:23:25.893-07:002010-05-21T22:23:25.893-07:00Otra prueba de LatexOtra Prueba de Latex $\sum_{i=1}^n x_i$<div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-7627354799975312362?l=luisgdelarosa.blogspot.com' alt='' /></div>
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<a href="http://feedads.g.doubleclick.net/~a/HvkjaIwcpQecSQedGi_UwAcUGyM/1/da"><img src="http://feedads.g.doubleclick.net/~a/HvkjaIwcpQecSQedGi_UwAcUGyM/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/7fX_mUWkNrk" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2010/04/otra-prueba-de-latex.htmltag:blogger.com,1999:blog-5932372752540433762.post-87744513338826692972010-04-14T00:17:00.000-07:002010-04-14T00:18:19.522-07:002010-04-14T00:18:19.522-07:00Les comparto mi sabinesca experiencia<object width="425" height="344"><param name="movie" value="http://www.youtube.com/v/Kw_fzS_YmGo&hl=es&fs=1"></param><param name="allowFullScreen" value="true"></param><param name="allowscriptaccess" value="always"></param><embed src="http://www.youtube.com/v/Kw_fzS_YmGo&hl=es&fs=1" type="application/x-shockwave-flash" allowscriptaccess="always" allowfullscreen="true" width="425" height="344"></embed></object><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-8774451333882669297?l=luisgdelarosa.blogspot.com' alt='' /></div>
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<a href="http://feedads.g.doubleclick.net/~a/PUNpEKbuVvUsO6KFVzN2YK6grDA/1/da"><img src="http://feedads.g.doubleclick.net/~a/PUNpEKbuVvUsO6KFVzN2YK6grDA/1/di" border="0" ismap="true"></img></a></p><img src="http://feeds.feedburner.com/~r/ElBlogDeLuisG/~4/dv7Q58UTlQU" height="1" width="1"/>Luis Guillermo de la Rosa Jiménezhttps://profiles.google.com/114243314414177397140noreply@blogger.com0http://luisgdelarosa.blogspot.com/2010/04/les-comparto-mi-sabinesca-experiencia.htmltag:blogger.com,1999:blog-5932372752540433762.post-8982378279859965422010-04-01T08:47:00.000-07:002010-04-01T08:49:07.836-07:002010-04-01T08:49:07.836-07:00Sufriendo en Oaxaca<embed type="application/x-shockwave-flash" src="http://picasaweb.google.com/s/c/bin/slideshow.swf" width="400" height="267" flashvars="host=picasaweb.google.com&hl=es&feat=flashalbum&RGB=0x000000&feed=http%3A%2F%2Fpicasaweb.google.com%2Fdata%2Ffeed%2Fapi%2Fuser%2Fluisgdelarosa%2Falbumid%2F5455188104326638449%3Falt%3Drss%26kind%3Dphoto%26hl%3Des" pluginspage="http://www.macromedia.com/go/getflashplayer"></embed><div class="blogger-post-footer">Luis Guillermo de la Rosa Jiménez
Geometer's Sketchpad
Geometría dinámica<img width='1' height='1' src='https://blogger.googleusercontent.com/tracker/5932372752540433762-898237827985996542?l=luisgdelarosa.blogspot.com' alt='' /></div>
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