Triangle [i]ABD[/i] is a rotation of triangle [i]CDB[/i] around point [i]E[/i] by 180 degrees. Is angle [i]ADB[/i] congruent to angle [i]CDB[/i]? If so, explain your reasoning. If not, which angle is [i]ADB[/i] congruent to?[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAATgAAACQCAYAAACcR3ddAAAXz0lEQVR4Ae1dCWwVRRimeAOV0oLSSk2LUA45pa1GjQkqlykoxAtUhIBcVkWF4lUKajwSNYBUwZZDozUoiFAkBiJHJHigxNSiUAENERA8UQpUW8d8g/O67/W9vmt33+7sN8nLvrfH7M438779Z/6rhWAhAkSACGiKQAtN28VmEQEiQAQECY6DgAgQAW0RIMFp27VsGBEgAiQ4jgEiQAS0RYAEp23XsmFEgAiQ4DgGiAAR0BYBEpy2XcuGEQEiQILjGCACREBbBEhw2nYtG0YEiAAJjmOACBABbREgwWnbtWwYESACJDiTx8Dhw4dFRUWFOHbsmMk1szoi4FwEvv76a/Hmm2+K0tJSsWjRIvm9trY24Q9MgjO5CyZOnChatGgh3n77bZNrZnVEwLkIPPTQQ3LcX3/99WLAgAHye58+fcSBAwcS+tAkOBPh/+yzz8Q555wjWrZsKd9kJlbNqoiAYxFoaGgQQ4cOFWPHjvU9I4gtLS1NjBs3zrcvEV9IcCainp+fLwoLC8UNN9wgXnjhBRNrZlVEwLkI1NXViaSkJPHGG2/4PWReXp4YNWqU3z67f5DgTEJ83bp1Uiz/7bffxOzZs8XNN99sUs2shgg4GwGsv7Vt21Z888038kH/+ecfuUSDpRr8LxJZSHAmoA8RvUePHmLWrFmytqeeekp06NDBhJpZBRFwPgJQKoDMbrnlFnHbbbeJrKwskZOTI9asWZPwhyfBmdAFb731luzgd999V2zcuNHXySZUzSqIgOMRePjhhwWmo6+99prUoD7++OOiS5cu4uOPP074s5Pg4uyCEydOiIsvvlicccYZkuTwJsOne/fuAsdYiIDuCHTq1Ek8+uijfs2cMGGCwP6TJ0/67bf7BwkuTsTxtoK26NtvvxU//PCD/Hz++efi7LPPFps2bYqzdl5OBJyNwB9//CEuvPBC8frrr/s96COPPCJSU1NFom3hSHB+3RLdj59//lkS2bJly/wuhKIBUtzatWv99vMHEdANgQ0bNsjZi5HI8KLHSx9rcokuJLgYewCKhTFjxoj09HQBrZGx/Prrr5LgsDbHQgR0RmDx4sVyrEPJBsPe3NxcuWRz7bXXOsKbhwQX4+jD+tr06dPF1q1bg9awcOFCsWXLlqDHuJMI6IIAbN8eeOABadB79913i+LiYgGD9/r6ekc0kQTniG7gQxABImAFAiQ4K1BlnUSACDgCARKcjd1w8OBBMXnyZLlOAReWqqoqG+/OWxGB6BGorq6W7lZYW8PY/fHHH6OvJIFXkOBsBB/uW8pODltYeyO80u+//y6geQ3cYp/68FgjPgqTUJgRq8ixUlgGYobfhw4dkmPUOGZHjhxp4z8m/luR4OLHMKIaoDpv3bq1H8Fh4CQnJ4uUlBTpy4ft+eef7/sN/z718eoxhYfaKjywVfvUVh0zYoVjaj+2xmPG/Tx2euy1a9dOuhl27txZWggYyU2N10SHQIroD/f/SSS4aNCK41wEwMzOzm5CcBD7EUsL7i5qi+/qN/YF7rfimLqP2qpnUFu1P/BZjPubO6bqUVszrlN1YdtcfYHHI73OWKfxmsD6Ym23sU7jvQLrC7xfpNcZ6zReE1gfzisqKhIlJSXiySefFPBCwIshkNzwG94JMO51SyHB2dhTCxYs8Bs0IDcWIuAUBBANBAEj4JmA2QbG54gRI/zGLMawmwoJzsbemjt3rjjvvPPE/PnzxerVq228M29FBIIjAG+cV155RSq+IKFlZGRISW7v3r3yAqwbw3Eedp2hbD6D1+yMvSQ4m/oB3g2I9hvolGzT7XkbIuCHAIxxEW1XTUWHDRsm3n//fT+vnC+++EJKb252OSTB+XW7dT9mzpwpCQ5Ex0IEEoEA1s6WLl0q+vXrJ4kLboYIFvHdd98FfZyBAwfKOIdBD7pkJwnOho765Zdf5NQUg4mFCNiNACQxrKe1atVKEhsSw6xatarZcF6IiIMpa2Vlpd2Pa+r9SHCmwhm8MkxLET4JRMdCBOxAAGMNIYxUhisoDhDCaPfu3RHdHs7ycKB3eyHBWdyDGGhYe6P0ZjHQrF4i8Mknn8jER23atJESGIgK0tqpU6ciRgh1QHpz89qbaiwJTiFh0RZvzTPPPJPSm0X4slohwxIhXPgVV1whiUlF2N23b19M8Fx33XVSevv3339jut5JF5HgLOwNSG8gN2pOLQTZw1Xv3LlTrq3B+wASV0FBgZTW/v7775hR+fTTT2Vd0KjqUEhwFvYipLezzjpLUHNqIcgeqxq+owgyieCSIDVIa7CvRMh8Mwo0pz179jSjKkfUQYKzqBsgvZ177rlce7MIX69VC8kKLlRqbW3IkCEy56iZSV2U5lSHtTc1PkhwCgmTt5DeoFyg9GYysB6q7siRI1Ja69+/v5TWOnbsKJOK79+/3xIUdNGcGsEhwRnRMOn70aNHpfT2xBNPmFQjq/ESApDW7rnnHmk72bJlS6GktcDcH2ZiotbedJLegA8JzsxR8n9dUCogTyqmqSxEIBIEEH8NGeKV3RrW1jALqKmpieTyuM+B5hS5fHXQnBrBIMEZ0TDhO6Q3GPU+9thjJtTGKnRH4Msvv/TzMoC0tmLFima9DMzGRFfpDTiR4EweLfRaMBlQDauDtFZWVuazW2vfvr3AcgbCFSWiwHXr0ksv1U56A5YkOBNHFELPwCyE0puJoGpU1Y4dO8SkSZNkxneYeEBae++996LyMjAbDp2lN2BFgjNxxEB6g+aUa28mguryqiCtLVmyRMZbS0pKEhdddJGU1kJF8LC7uZDedPA5DYUbCS4UMlHuB6mB3Kg5jRI4TU+HTRmkNdhCQuE0dOhQ6dsZjU+o1dDo5HMaCisSXChkotyPaSmmp5TeogROo9OhYIJPaN++faXdWmZmprRbU9FxndZUHe3eAjEmwQUiEsNvGGRScxoDcJpcsm3bNimtqXhrWFtbs2aNiMcn1GpovCC9AUMSnAkjSWlO6bVgApguqQJ9/fLLL/vs1iCtYXnCKi8Ds2FRa28NDQ1mV+2o+khwcXYHpiVYY2G8tziBdMnliI4bmMsACYTcRBRKcwopU/dCgouzh0FsWEiGiQiLnghAE1peXu6L4IHouFhz3bVrlysbDOkNEUPcRMqxAk2CixU5ISSpQbFA6S0OEB18KezWkMsALzDYrQ0aNEimezx+/LiDn7r5R0M2LbTFC9IbkCDBNT8emj0KYkOeU669nYYJ0/WqqioB9yN8EJCxurpa1NfXN4ujkw5CEl++fLnIy8uTRJCWlmarT6jVWEBz2qtXL6tv45j6SXAxdgX+CIjWC4doltMIFBcXS1JArs3k5GSZxQkBFJ2sTVR9B8lm2rRpom3btgIRPOB87nRNqHr2SLcq3psu0XojaTcJLhKUgpwza9Ys2r0ZcEEon65duwrgAk0iPrDWP3z4sOEsZ31FnlBEx83NzZXEnJ2dLdfWnGq3Fi96yuc03nrcdD0JLobegjEvpDeuvTWCV1dXJ20BKyoqGnc69BskGWN03OHDh8tcBmiDrkVpTr0kvaEvSXAxjGgQG9yyqDltBG/9+vXSidypC/DoK0hrl112mZTWoAlFLoM9e/Y0NkLjb0pzqlu8t3BdRoILh1DAcSykU3oLAEUISR7Qzo0dO1bccccdYvTo0eLZZ59teqLNe2CxP378eLkmiOcbNmyYzGWgs7QWCLGS3mCv57VCgouyx2H/RM1pU9BuvfVWqXmcOnWqmDJlivwkajoErTZ8QlXmqYyMDFFSUiJ0XVtr2hv+e6A51TXem39Lm/4iwTXFJOQe/HGY5zQ4PAgDBBJJZIEm1Gi3hmkZpBY3aHGtwg22fJBcEXfOi4UEF0WvQ0MIo0/avfmDhrwBqampYvPmzf4HbPilpDUVwQNEC9Mds/KE2tAES28xePBg0bt3b0vv4eTKSXAR9g4S7sLnFI71LP4IQMEAKcHOBWxoQjEdNnoZrFy5UpiZJ9S/le775UW7t8BeIsEFIhLit4r3BqJj8UcAUTSUggHp7vB58MEHTU+coqS1q666St4vPT1dSmu7d+/2fyD+kgiotTcvw0GCi6D3ld0bpbfgYGFKeM0110gXIDhx43PnnXcKszSViOAB0mzXrp0kNkTHxdqalXlCg7fUPXuV9OZFzamxl0hwRjRCfMcfmGtvIcCxaDe8DJDLQK2tIU/onDlzBKW1yACHixzynHq9kODCjABMi2DUS+ktDFAmHYYmdOLEiRJzJGmB3RqyrZ84ccKkO+hfjZLeEmWm4ySESXBhegPSG+3ewoAUxeHa2loZ+RbGt/PmzZNXKi+Dfv36+dbWZs+e7ZrouFE035ZTESjASxFDmgOVBNcMOlAoILIEpbdmQIriEMgN62dQSKjP1VdfLSN44DdMGiorK10VXimK5ttyqpLevGr3FggyCS4QEcNvSG8IaImIrizxIwDbNEVsxi00rm7JZRA/CtbWAOkNXgsspxEgwYUYCSA15loIAU4MuyFZFBQUNCG41q1b22o/F8Oju+YSaJvx4li1apVrntnqByXBhUB45syZUnqj3VsIgCLYDezKysqEWlvLysryaUWVBDdjxgwSXARYRnIKNKcw0WFpRIAE14iF7xs0pzALgXEvS/QIIFw5HO4R2RdEBoNTrAnBJxQf+KxCyYC0eyzmIKDW3rySayFS1EhwQZCCzylMQ0B0LJEhoLwMVHRcxFuDJhRRfVmsR4DSW3CMSXABuOCPiiz1UDCwhEcAkgMieEBaQ6QVaEJhf0Uvg/DYmXWGypRFu7emiJLgAjCBSQgIjmtvAcAYfuIlgLW1AQMGyCko1tYwnae0ZgDJxq+Q3nr06GHjHd1zKxKcoa+gOYVZCNfeDKAYvm7fvl36hGL6jrU1aEWx5mOWz6nhVvwaIQKU3poHigRnwKeoqEhOsyi9NYICL4PS0lJf5imvR8dtRMYZ3yi9Nd8PJLj/8VFrb/RaOA0IJINx48b5vAzgE8q1teb/THYfVZpTei2ERp4E9z82sHvD1MvL0hvaXl5eLiPAYgqKeGtI5sy1tdB/oEQegflNt27dEvkIjr83CU4IgXhvcKj3ap5TSAIqggeIDbkMYA3PCB7O/f8qrwVEWmEJjQAJTgjpTA/NKYjOKwVtXbZsmV+eUEzPGW/NHSMA0hs1p+H7yvMEhz86pqZekd6QJ7SwsFC0adPGz8vg1KlT4UcLz3AEAuhDSNqU3sJ3h+cJDga9MFDVWXpDdFzkCc3Pz5d/DETHhbS2b9++8COEZzgOAUQMgfRmZ5Ifx4EQ4QN5muBAajrnOYVP6IQJE0RKSorPbg1ra17OExrh/8Kxp3k5S30sneJpglPx3mAioktBWxYvXuzL6o48oXPnzmWeUE06mHZv0XWkZwkORICIIbqsveHNDmmtVatWUlobMmSIWLduHfOERvd/cPTZyu6Na2+Rd5NnCQ7uWG6PGHLkyBEprfXv31+SWseOHWUED0bHjfwP4KYzoTnNyclx0yMn/Fk9SXBHjx6V0hsSFruxQIuGPKGw3UPOCCWtMYKHG3szsmdWa2+M9xYZXuosTxIcNIgIR+4mzSkCASxatMgXwQNra1hDrKmpUX3JrcYIQHOKPKfUnEbXyZ4jOJAajHrdEjEE6y5KWoPtE7JSrVixgl4G0Y1zV5+tpDeuvUXfjZ4jOBCb070WIK0h3lpeXp5cW+vQoYPMJYqsVCzeQwCuc8iURekt+r73FMEh9I+T470hgsekSZNEamqqTxOKSBH0Moh+YOtyBaW3+HrSUwSHtTdoTp209gZpbcmSJb54a1hbg/KDETziG9i6XA3pjT6nsfemZwgOpAZyc4rmFGtrkNZgiweFB9bWsMZCaS32wazblcrndPXq1bo1zbb2eIbgsPaG6WkipTeYp8AntG/fvnIKmpmZKe3W9u7da1uH80buQYARQ+LvK08QHNbeEqk53bZtm5TWjF4GsGeiT2j8A1jXGpT0Rs1pfD3sCYJLhOYUrmBIbKwyT0Faw/SYXgbxDVivXK3W3hoaGrzSZEvaqT3BYVqINS67fE4RaRW5DFRWd+QywBoKB6ol41fLSpXmlF4L8Xev9gQHqQkL+ZimWlUgrcFurU+fPnJtDVndITXu2rXLqluyXo0RgPTWs2dPvhRN6GOtCQ7EA80pyMaKsmPHDr88oYMGDZLS2vHjx624Hev0AAIqzymlN3M6W2uCw7QU0huIzqwCSXD58uU+L4P27dvL6Lj0CTULYW/XA81pr169vA2Cia3XluCQAg/ReuGQbkbBm3XKlCkyTygieMD5mZpQM5BlHQoBFe8N+WdZzEFAW4KD10K8dm/IZYDouLm5uXJtLTs7W053abdmzuBjLf4IKJ9T/738FQ8CWhIcjHnj0ZziTYrouCrz1PDhw2We0Lq6uniw5rVEICQCSnNK6S0kRDEd0JLgsPYG5UI0mlOcC2lN2a1BE4pcBnv27IkJWF5EBKJBQGlOGTEkGtTCn6sdwUF6g9dCpHZvsBgfP368SE5OltNQ+IQilwGltfCDh2eYg4CS3uhzag6exlq0IziYhCCUd3OaUxyDT6iyW8vIyBAlJSWCa2vGocHvdiEAzSnjvVmDtlYEB+mtuTyn0IROnjxZmo4gOi6mBXhrUlqzZnCx1vAIKM0p4v6xmI+AVgSn4r0hxpoqSlpTETxULgNGx1UIcZtIBPCS7d27dyIfQet7a0FwkMLmzZsnJbMXX3xRdhjejPfdd5+crkJaGzx4sFi5ciXzhGo9nN3ROMwYYCw+Z84cue77wQcfuOPBXfiUric4TDlBYOqDIJIjR46UxIZIqM8995xA/lAWIuAEBOrr6wXW3NR4ha3m5s2bnfBoWj6DqwmuqqrKN1DUgFFbKA6mTZsmA0oWFRWJ+++/XxQWFsp92G/83HvvvQKfqVOn8kMMLBsDGHM33nhjkzGLvLbMaWsNv7qa4DZs2NBksIDgLrnkEtGlSxcBW7a0tDTfB9mp4DuqtsZj+I79/BADq8bABRdcIFTQU/UixhbafIaqJ8E1QeDkyZMyIYdxsGB6euzYsaCfP//8U6hPsHPUMW4bcSIW5mHx119/ia+++qoJyWEZhcUaBFwtwQESaENHjRol/UUxBfjpp5+sQYq1EgGTENi6dasYOHCgHLNPP/00k3ibhGuwalxPcMEaxX1EgAgQASBAguM4IAJEQFsEHElwWPdBMuTnn39evPTSS2LLli0JTfenbe+zYa5AAB46mzZtkv+Jjz76SHz//feueG4nPKQjCW7hwoVSO5qfny8uv/xy0alTJ6ndpL2QE4YMn8FOBObPny81/927dxdXXnmlVKrBK4clMgQcSXAzZswQnTt39rUAhrpjxoyRIZBotOuDhV80RwABIOBbjfSTKs9HbW2tgP0nS2QIOI7gEA+rW7duori42K8FSP+H/ArKFcvvIH8QAc0QWL9+vZzFwL2QJXYEHEdwyPaOcEevvvpqk1bBeBfeBixEQGcE8B/A0kxBQYHOzbSlbY4juA8//FAaQh44cKAJAF27dpUuVk0OcAcR0AgBLMPAeH3t2rUatSoxTXEcwS1dulRORQNdVxACKSUlRcAwkoUI6IxAZWWlSEpKEsi7yxIfAo4jOIjlt99+uwiMTf/OO+/It9r+/fvjazGvJgIOR+CZZ56RL3kq1OLvKMcRXFZWlpg+fbpfyyDNIVAl/EwbGhr8jvEHEdANAUhwmKLu3LlTt6bZ3h5HERwyWKWmporq6moJBBZbt2/fLrPIZ2ZmioMHD9oOEG9IBOxGAPl4QXAwl2KJDwFHEdzGjRtlx0JSGz16tEhPT5cGvjfddJM4dOhQfC3l1UTARQiUl5fL/8KIESN8cQzvuusu/g+i7ENHERxyk1ZUVIjS0lKxYMECUVZWJmpqaqJsEk8nAnoggBc+oo7k5OQIWBAgxDlCLrFEjoCjCC7yx+aZRIAIEIHwCJDgwmPEM4gAEXApAiQ4l3YcH5sIEIHwCJDgwmPEM4gAEXApAiQ4l3YcH5sIEIHwCJDgwmPEM4gAEXApAiQ4l3YcH5sIEIHwCJDgwmPEM4gAEXApAiQ4l3YcH5sIEIHwCJDgwmPEM4gAEXApAiQ4l3YcH5sIEIHwCJDgwmPEM4gAEXApAv8BgL5vaBsQ+78AAAAASUVORK5CYII=[/img]

Polygon [i]HIJKL[/i] is a reflection and translation of polygon [i]GFONM[/i]. Is segment [i]KJ[/i] congruent to segment [i]NM[/i]? If so, explain your reasoning. If not, which segment is [i]NM[/i] congruent to?[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAATgAAADwCAYAAACUs3gHAAAgAElEQVR4Ae2dCdhN1f7HuyKuoRAJlZKMpUiDIXQzlSLcKJE0SQOJiogGDcgUZWgekOaJ3KRyDSHdm2ssmjWJNKrb8F//57Pu3e8973nP+75nn7OHtdb5/Z7nPO979tl7Dd+193evtX7TXkpEEBAEBAFHEdjL0X5JtwQBQUAQUEJwchMIAoKAswgIwTk7tNIxQUAQEIKTe0AQEAScRUAIztmhlY4JAoKAEJzcA4KAIOAsAkJwzg6tdEwQEASE4OQeEAQEAWcREIJzdmilY4KAICAEJ/eAICAIOIuAEJyzQysdEwQEASE4uQcEAUHAWQSE4JwdWumYICAICMHJPSAICALOIiAE5+zQSscEAUFACE7uAUFAEHAWASE4Z4dWOiYICAJCcHIPBI7A119/rRYvXqx+/fXXwMuWAgUBPwgIwflBS85NC4FZs2ap/fbbT/30009pnS8nCQJhISAEFxayOVzuX/7yF9WvX78cRkC6bgoCQnCmjIQF7WDJeffdd6v+/furG2+8UX3zzTcpW12/fn01YsSIlL/JQUEgSgSE4KJE2/K6hg0bpvbaa6+8T7t27dQff/yRr1ebNm1Sf/7zn9U//vGPfMfliyAQBwJCcHGgbmGdX375papcuXIeuXlEt3Llyny9Wbp0qSpTpozavn17vuPyRRCIAwEhuDhQt7DOHTt2qAMOOKAAwa1evTpfby6//HLVqlWrfMfkiyAQFwJCcHEhb2G91113XT6C69y5s/q///u/fD3p1KmTOu200/Idky+CQFwICMHFhbyF9d50002qZMmSWslQtmxZNXTo0Hy9QOlQvXp1NX/+/HzH5YsgEBcCQnBxIW9ZvZ9//rnaZ599FLM45KqrrlLlypVTu3fvzuvJxx9/rGd4K1asyDsm/wgCcSIgBBcn+hbVzd5aqVKl1M6dO3WrUTqUKFFCTZgwIa8XkyZN0jO4X375Je+Y/CMIxImAEFyc6FtS93vvvadnZuPHj8/X4r59+2pC80xFli9frp599tl858gXQSBOBITg4kTfkrq7d++uqlSpovbs2ZOvxRs2bNDEN2/evHzH5YsgYAoCQnCmjISh7cBgF5u3xx57LGUL27Rpoxo1aqR+//33lL/LQTMR+O2339Q777yjfvzxx3wN5NhHH32U75jNX4TgbB69CNp+4oknqnr16hVa0xtvvKEJcMGCBYWeIz+Yh8DChQu14XaiQfaUKVP0sbfeesu8BmfYIiG4DIHLhcuWLFmiyeuFF14otLvYwR1//PGqSZMmBWziCr1IfogdAYIhMGaeoCCqUKGCSjbc9n639a8QnK0jF0G7jzvuOL38LK6ql156SRPhmjVrijtVfjcEgVNPPVX16dNHtwZy23fffdXatWsNaV1wzRCCCw5Lp0piycne2yuvvJJWv4444gjVo0ePtM6Vk+JFANtF/IXxI547d66eublIbqAsBBfvvWZk7SgMGjRooIjrlq7MmDFDE+IHH3yQ7iVyXkwIbN26VVWtWlWdc8456k9/+pPTkV+E4GK6yUyuloi8zN7WrVuXdjPRxhHF98ILL0z7GjkxHgSmTZumjbSPOeYY7Z2yaNGieBoSQa1CcBGAbFMVP//8s367n3322b6bPXbsWE2Mn3zyie9r5YLoELjmmmtU3bp1tV0jxtrNmjWLrvKIaxKCixhw06u79dZbMyYpnO1TOeGb3udcah9a70MOOUTdcccdutuenaOrCiIhuFy6u4vp63fffac3nLNZZl577bWqfPnyirJEzEOAGTrjc//99+vGQXjM5lzNoSEEZ949GFuLyLPA3lui8affxmAFTxns84iYh8CTTz6px8cLmkALH3roIX1s27Zt5jU4yxYJwWUJoCuXf/XVV2rvvfdW7M9kK+zf1ahRQ+EOJGIWAhhtox3/97//ndcwthZOOukkJwMlCMHlDXNu/0M4JJLFFJYpyw86aF+ZxT3yyCN+LpNzBYHAERCCCxxS+wp89913NSFNnz49sMafcsop6tBDDw2sPClIEMgEASG4TFBz7JouXbqoatWqKfKeBiVYxjOLw41LxEwEnnrqKR1+fvDgwU5FEElEWwguEY0c/N8zE3j44YcD7z32VS1atAi8XCkwewQYb15A3gfTEaI0uyZCcK6NqM/+dOzYUR188MGBzt68Jjz33HP6ASLGmIhZCJx88sl55OaR3D333GNWIwNojRBcACDaWgQhxrm5n3766VC6wJK3Zs2aiiWwiBkI4GfsmYp4xOb9xZ/YNRGCc21EffSnadOmqnHjxj6u8H/q3XffrUl0y5Yt/i+WKwJDAF/hmTNnKqK+QGhsH3jExl8UQiT3dk2E4Fwb0TT7w6yNG5uIvGEKGbYOOOAAdd5554VZjZRdCALvv/++Gj58uI7Uy3gTB85L60iCIEyDWrVqJUqGQvCTwxYiwDKldu3akWWgHzdunCbTzz77zEK07GwyyiPcryA1Yr8NGTJEbdq0qUBnSNTt5bot8KMDB2QG58Ag+u2CF7uNrFhRyLfffqtnCqNGjYqiupyug1lZ8+bNNbFBXgRP+PrrrwvFpFatWqp3796F/m77D0Jwto+gz/aT+u/AAw+MPPruoEGDdLy4n376yWeL5fTiENi1a5dCA1q/fn1NbEcffbSaP39+Wprx9u3bq7Zt2xZXhbW/C8FZO3SZNXzy5Mn6IcB7IUrBkZvlEpmbRIJBgKAI7K+xjwa23bp1UyQK8iNEf3HZ40QIzs/dYPm533//vU4u0r9//1h6ghP+/vvvXyCBdCyNsbhSMl+BZYkSJfT+Gn7EmWqp77zzTj2zJmySiyIE5+KoFtKnkSNH6hj8n3/+eSFnhHt48+bNeqbxwAMPhFuRo6UTWpxIIMzWMM4eP368IgpMNkIZlSpVcjblo5UEx0wEtxIGl/9FikeAMOIkGLnhhhuKPznEMzD6LSqRdIhVW1n0Dz/8oAiC4Nmvkcpx3rx5+cIdZdMxIbhs0Av4Wgb7sssu01Nqkg0fe+yxqnTp0urSSy8NuCb3ijv//PN1tF4MPuMUbLCYgSxevDjOZhhf96effqrGjBmjl/Tg1bNnz1BsFoXgDLkVmK01bNhQHX744erxxx/XMzfU38Qcmz17trNT7CDgZ3+Gh2Tq1KlBFJd1GUcddZRq2bJl1uW4WAD2a6TzK1mypA4tPmDAALVx48bQuioEFxq06RdMZNjWrVvrpQ0x5UX8IcCGdOXKlVXcszev1c8884wm3FWrVnmHcv4vYaU6deqUt79GyPds99fSAVUILh2UQj7n+eef1wOP9kjEHwJE8mD2du+99/q7MMSzeWFhYNquXbsQazG/aF44rD7q1KmjxwgDXcIYRfkSx8sEJYOrYoWSAZcTMv+I+EfAi6wb5UOTTisfffRR/VCjWc01ITEP9msEGeXlc8YZZygiu8QhkyZNUhUrVkzLKDiO9mVbp/EEx1sOZ21uCE8wUuXtTywz1Oavv/6695P8TUAAR3oeIBKNmCYkPWFcL7roItOaFlp73n77bYWyB/u1ChUq6AQ/UbnLFdapxx57TGe3xynfRTGe4Hbv3q0f0sSYZWhTly1bpnM78gCvXLnSxbHJuk/HHHOMOuGEE7IuJ6wCbr75Zm26UpSvZFh1R1kuWyxE7OBeZWl+++23F+kfGmXbXnvtNd2uV155JcpqI6vLeILDUZsbAxejZMFp3OX9g+T++vmOptl08seHklSFI0aM8NM1K87lviX+2pFHHqnH4cQTT1RPPPFEYPZrQYHwr3/9S7eP/AwuivEER2gflqLEjE/Os3nFFVfofI4uDkw2fSKSLnuWbdq0yaaYSK7FhrFcuXLOGGx/+OGHejsFlzQMq7t3766WLl0aCZaZVILBPO2cO3duJpcbf43xBAeC69evV2XLltUPLJvTCxcu1FpBZiiEgxHJjwC2gWCzZs2a/D8Y+I0YcbR1woQJWbWOJRaz/Lh8KtHwE9QT+zUI+6qrrlLvvfdeVn2K4uLvvvtOt5nnykWxguAAHgPIDh06aGdxwv2g+eHt/+abb7o4Lhn3CW0pfopElrBFLrjgAlW1atWszCNQVqC0iFpefPFF5SVwOeyww7R/qE17iiylIWWUDS6KNQTngU88MZQMhMIWKYgAMyFmRDbMHrzWE2mWNme6TPrjjz90joGo/GzZOyTXhLe/Rn4DMojRDttECM62Ecvh9rLcYCmPv65tgtkPhJHJEpNZK/tIYS+z8A8lIst+++2nCfmss86y3kRJCM62J+W/7SUkEG/ZXMrJOWzYML3cYIZhm7z66quaNNhf9SvY+6FND2vWyjYIYb332Wcf/QIh/trWrVv9NtPI8z2CmzNnjpHty7ZR1i1R0+kwG87s07HsKVWqlN4XsXH5kE5fvXOYXWByYXPeA9IYEg7Ir6BcIKpMkIIhMvtreIJwH7GvSTRiG18eReHiEdz9999f1GnW/uYcwTFghGDmpkz8oA53WYg6Qfakb775xtpuQiiMmZfWLt2OMLvC3SmT5W1yHezvkt/Au4cgXbTSmN64KBjS41nhaih55wgObWsisXn/Y03uqnj5DrCQt1kgKAI7nn766b66gfaUvbFsBAwT84d27do1Nv/QbPrh91pcIXEbyxY/v/VGdb5zBMeblg1rj9i8vyzf2BS2wTbM7+Azg8HMwpRwSH7bn3j+gw8+qMcuXd9IIhVXqVJFLycTy0n3fy/+GvcJyVswHg8z/lq67YryPLwsevXqFWWVkdXlHMGBHA7M++67r7aVI7AiKnzyAJAnkhsZzwhXIsriwE2fwtYgRnVHEoIeTXC6TvgoJej/zp07024iM0Xyh3r+oUT1IC6anzLSrsyCE/v27avNbCxoqu8mOklwOOZz0/N2ThRs55ghkDeS3xs0aKCJjw3lqIW2JLue0Qba4qc9PKREOXZJbrrpJq0wQXFSnGD3R46HdOwiIc/E+GsoNLC9S+fa4tph8++8THgWXBQnCY4pN8aXRQkzuM6dO2uiq1mzpg7njR1ZFMJmeosWLRQbvImC4zPRP4gXlo6gLYaoMzGtSKf8uM7BE4DlImYvxQnhz4tbXuEfevXVV+tZPXiddtppRvuHFtfnoH+/+OKLdTqAoMs1oTznCM7bcCcyajry1ltv5cXAx4CTPZh093/SKT/VOThgM4tMlmuuuUbvpSUfT/WdZVaTJk1U48aNU/1s/TESEmN3luqlg//qunXrtEkMBr7Y0KWSf/7znzr+GqRGWRAmXhMi+REQgsuPh9HfcNfB2dmvPyCkxrXs3aE2JzBh8hI3iI5jj4fv4oUXXligOJy1icufjnh7T4U93OmUYfI5jB/jkCpM1ujRo/XMtUaNGil9KJkhs/cKsRGFZuzYsZHkNzAZz6LaJgRXFDoG/YYGFYPMPn36ZNwqDDnJ9s2DwQPSvn17tWDBgozLS75wx44d+sFdsmRJ8k+aXIkhVpwQQopwSEQzdllIlsP2QbJ9G7Z+vHywefSE/4kPWL9+fT1upJQkxpmr9mtev4P4KwQXBIoRlEHockiJaL/ZChvPRFggEQhlstdDEMlscxsQ+ollFZbjuJF5H5bKuBuls5/G8ps2hTHDzBa3IK8HK/pJouPC5IsvvtD5Qz3/UPbjUr08CrtejislBGfJXUA+SSzQgxbCOnsuO8zs0Nxl6hnB7JClV9u2bXV8O4JS8kGLhcFqcRpUCBZzF/qaC4IiCC0p3g34F3uCPSPmDbhosSVBgIFcTGDj4ZHNX7ZLGjVqlE0Rxl7rjJKBzWiMecMMgMmmNbHL8G/FVmvIkCEKpYYfGThwoNagJl8DaWLuUZzPLHkMmNWkY0KRXIeN31G80F8++BdPnDhR4WXAd7YjyAoVRf5QG7FLt80E5+TeS94KSPd6k89zhuBY8nHTb9++PXS80eLh1oMpA3WikEgn8CZ7Z3gc8FAmCz6PgwcPTj6c7zv7gxArJJkLgpcCgU3BOPFDMh3s17LdLsgFDNPpI0bOuGu5+KJwhuDYVCbib5SCwoCb46CDDtIPIEvNl19+udAmeH5/qQI7srRmFleUXH/99Xr/LnGpVtT5tv+GcieR2Pif5SjEJxIcAt6eLnuerokTBOdtRuN+E4egqWMjHJs0HkL+oqBInmEQc4uIH8k+o6Q9ZNlbVIwx9vzYu2M5kSuCITR+pokkZ0MiHdvGB6N3MEbR5Zo4QXBDhw5VZDHas2dP7OPz0ksv5Tn7sxy97bbb8kIYEXaHuP3JLlpoTtGgFuULSZBFlqc2h0PKZHBIWo0CBvtEbNtc1xxnglG213gh4/2Gqcq23iiut57giN8FuZkWphu3q379+uk3I/sb7Nlt2bIl5ZiiOWV/rbBNXq7jDZtq7y5lgY4d5MWF4W9h+DjW3ci78+677+r7SwgucuiLr5AZEw8/Gk4TBS0rLkKQHMtTFBJ+lwJdunTRGsRcdwo3cXxdaJP3AhWCM3A0USxgJ5W87DOtqSgk7rrrLlW7dm1NyNh3peNmhb0XBF6UsatpfZX22IWAEJyh44U2kYcf4rBFUEgQsglTB9qO0z17c6RDTCW4Y2GjhImJiCAQBgJCcGGgGkCZmFWgfcRdx0ZhBkfoHogOx3G8HNhTxJZv0KBBiqgj/FaU6YmN/ZY2m4WAR3Bo810Tq5UMaNdY6tkuhP7B7QgyYwnrRR7mO59UdnO291nabw4CHsERX9A1sZbgvFDdLs1uPvjgA9W6dWtNah658df1qCGuPVS29QcfXu4zQvu7JtYSHO5KlStXdi4cDrO1RHLjf6KPEONMzCRce/zM6A9bIgQtmDVrlhkNCrAVVhIcdlH4KBL11TXBH9DLyekRnaeQQFuMQkIUDq6Nerz9QfGFIuvKK6+MtyEh1G4lwc2fP1/PclxN70ZOBpQM/fv3V+RzZeZGrDsiAUN6RNHAB9Zv1OIQ7h8p0hEEyGNC8mzXxEqCI+8pyVmKCy3k2mDRH/YeiQXHspVoJhCh35BNLuIifcoOAbKzuaCwS0bBOoIjQxKzGMIj5bJ8/PHHiugiXsgmghYSHVhEEMgEAQKwCsFlglzA15BABKdzclyKKB3DC3vAWrVqaeJH47po0SKBRhDwhYAQnC+4wjsZG7Fzzz03vAosLRk/VTSwxx9/vCY6UgqSQ6K4EOiWdleaHTACQnABA5pJccuXL9cPbxBJZTKp35ZrmMFxw7KUZ2ZHGHdRSNgyevG0UwguHtzz1UrGJDSIYiaRD5ZCvxA7jb05clV4IZtEIVEoXDn9AwR3+umnO4eBNUoGZiDsvY0ZM8a5QQi7QygksBkkaCTaV9zCXAyNEzaOLpdPpGT8ol0TawjOSyqDO5NIZggQDZjIK3Xq1MlTSJASUUQQOPPMMxW2cK6JFQSHvRtJZVq0aOEa/rH0BzzJGUGwAvbp8JR44IEHjAj5HgsgUqm65JJL9PZPch4R26GxguC8kMoSVSP4240IEh07dtREV61aNTVu3DhFsheR3ELglltu0RnLXFNGWUFwGLSSLo68BSLhIEAOid69e2uiK1++vCLh8nvvvRdOZVKqcQgweUAZRc5fl8R4gkNjSjBIptAi4SPAbBmFBCTH8vXss882Nt9F+GjkTg0EX2W88YN2SYwnOJZQAO83UYtLgxRHX1imTpkyRR1yyCEa/06dOinyZ4q4iYCXG1UILuLxxfatbt26Edcq1XkI4CFx3333qaZNm2qia9SokSITutgiegi58VcILoZxJBEys7dczQcaA+RFVvnGG2+oU089VY8J8cMYl1xLRF0kQBb/KAQXw+BNmzZNP0yuaXZigDLQKtkuwFiYTWmiKl911VWikAgU4egLE4KLHnNtp4V1tYTqjgH8NKrE6HrkyJGa5Jhpk9SaeHUi9iEgBBfxmJGpnoeGzPUiZiPw7bffKkI2eQoJQja5lAzIbPSDaZ2nzHPNNMhYLepll12mqlatqn788cdgRlBKCR2B3377TRFO3gvZdOSRR+ocEsT8FzEbAVz2mFAwsXBJjCQ4kh/vt99+TibBcOnmKaov2FV5OSSY2d12223WJuguqp+u/EZ+k5IlS6qnn37alS7pfhhJcORn5G2yfv16p8DOxc4QsonkOUQxKVWqlLr66quVBEww70747rvv9F7qzTffbF7jsmiRkQTHHk7Dhg2z6JZcahoChGwaNmyYzr/Jy4uozKtWrTKtmTnbHgIw4Is8ePBgpzAwjuBIQssDcPfddzsFtHTmPwjs2LFDO/R7uV9POukk8ZAw5OYgmKwQXMiDcfvtt+u9ABIgi7iLAJ4QOHgfddRR+oXWrFkzHcJJckjEN+YYbwvBhYg/N/0RRxyhunXrFmItUrRpCCSGbCKwgoRsimeEateuLQQXJvQYibI8RQMnknsIkNeVHBLcAxUrVtR5XyWHRHT3gRBcyFhfdNFFOjSSOHKHDLThxUNqQ4cOVVWqVFElSpTQcepWr15teKvtb54QXIhjiO0bWdqJLCoiCIAAHhJTp05V7A0xq+vQoYNiOSsSDgIQHH7FLokxWtQ5c+bom1iWJC7dXsH0hRk9OSQaN26s75Gjjz5azZo1S7mWPyAYtDIvhRfJpZdemnkBBl5pDMG1bNlS8XFZ1q1bp0jKvHbtWpe7GWrfCNnUpUsXTXQHHXSQuvPOOyWpdUCIE/MPbF0SIwhuy5Yt+oblLe2qPPLII2qfffbR/WRfacaMGQrjSpHMEMBn8pxzztF4srXB0opw6yKZI8AWAOY6LokRBEdSGW7Sn376ySVs8/pCVNxKlSrph5G9JO8jy/E8iDL+5/3339faVnyXwbVnz56KBDoi/hEgwAUG2C69eGMnOCJQHHDAAapPnz7+R8TwK9g7WrZsmbr88svzSM0jN/6Kr21wA4gvJfZz1atX11jj6C+htvzhO3nyZB3kgheyKxI7wXlhWlauXOkEprgikbOAmYT3sBFNAzeYRHKrVauW+vLLL53os0md4OFkq4Nk1uBdv3599eijj0oOiTQG6d5779W+wnv27EnjbDtOiZ3gzjzzTMXDbquLDrHONm/erG688UYdB42QMzxYxEIbNGiQVigQ0459xvbt26sKFSroqA1E2RAJFwFenmDOeBx22GE6hwR5PkRSI4BmukyZMkoILjU+vo+Sa4G9t7Fjx/q+Ns4LmKUtXbpUh+jGdogHiDyip5xyirrrrrsUkTMKE2aqhA5as2ZNYafI8YARIGoJ4dRR7jBOhGxyLT1eEJAJwQWBYkIZs2fP1olLPvnkk4SjZv67YcMGvfRs0aKF2nfffTWp4TfL3iF7PewBpSO8HbHQZ0NXJFoEiEM3YsQIvc8E2UF6YrLzvzEQgvsfFln/h6amSZMminA5JgqeFX/72990UpWaNWtqQmOmxpKHoIDYtGUqBIBkT85VrXGmuER13a5du7RCgmUrY9qqVSvJIaGUNp6WJWpAdyH7VtxcJoVI5g2PgqB3796qXLlyun2kxbvgggv0cZamQYiX4EO0qEGgmXkZ7J8++eST2vaLexEbMOwVXdqD8oOON4Nz6cUbm5JhyJAhej8kbpX08uXLtf9r8+bN82ZpKAjwiWWT2k/KQmalaKKISIzRJFbhqaLWspwloc6YMWP83H9ybogIkDbPS2qNhwRxCb/44osQazSv6JkzZ2pjdJcSPcVCcBABD3gcjr2QC2YE/fr1yzPdQLN5+umna3OCTZs2ZXTnoQXu1KmTDvND2ShOTjzxRE2a8+bNK1Am+V7xqZTIKQWgifUARsKXXHKJVkiULl1aXXvttTmTQ4LnAm+bzz//PNYxCLLyWAjuxRdf1A9+FCnKINOtW7eqW2+9VWs5uWlZjuBYDMH+/e9/V0GYDkCQeCtQV6KcccYZmsyTHcO94AIffvhh4unyvyEIMC5Et+Xlh9Ybu8Y333zTkNaF0wxWM3vvvbd6/fXXw6kghlJjITjIgMgQYcn333+vGKyLL75YNWjQQBNa2bJlFRrQ6dOnK5Lb+ll6FtfOJUuW6DpSPQD4R6baa2Q/jyxTmJWImIsAIZumTJmibTUZx7Zt22rlk7ktzrxluL3RR7ZZXJHICe7TTz/Vb8Sgk8owc8Jinf0vXL8YKPzqePNixhFmjgdCrKMRTiXsMWL8i/IiWdq0aaMfmOTj8t08BNhK4P7yXpi8oO+77z6nFBK8dJnBBf1sxjmakRPcpEmTNIjZLgsx42B5iQdBvXr1dJksJVq3bq1tndBQRpVRff/99y9UYQCx0q6HHnqowDgze4P8du/eXeA3OWAuAigkOnbsqF+iBx54oJo4caL65ptv8hr8xBNPaOsAtkdsErSnGN4LwWU4aiwL69Spo9iXykSwPketj3EtMfuZpWHGgVkHb9NsSTOTNvFmZ8Z4ww03pLwcBQPtTGUSwj4Pv/FAiNiHAHvIffv21WOI8ffIkSMVyiPGlA8O/zb5GzMhwDxKCC7De3HFihV64BcsWJB2CVzDrA9jTKzPuXEw4xg+fLg2zoz7LYn2FJItzN3MyzORqsO0nSWPa0EGU/XV5WOEvULb6hFb4t/x48db03XuZSG4LIYL8wmm9MkaxcQiscFh1kOIIZzwuVmwru7atavCtYvMS6YJfUrleuVt2hZGfvRj1KhRegaYuMQxrX/SnvQQOOusswqQHEE5bREhuCxGCm0ijs6plnJ4EBB6GkNLz4yDUEOo6XGXwinfZIHAIGLCkXvy1ltvaeLCFY39wsIEly+uxahYxG4EUhEcm/Ykt77//vtV3EbtxaErBFccQil+x0md5aUXrhtraYBk6QmBeXG7IDZiwqOSZ5ZmmwHsFVdcoYmKfRc+KBbYayzO7QXyY6aKSYuInQiw98tMDbMfthvYQuHDspWXHmZRvMTQ6rPdYuq+HM8l5lT33HOPnQORotWhalFZimKtz+B6H0JLM9B8x+GceHDPP/+8siGiSAr88h0iMsWzzz6rP6lctPKdnPCFfRgyFz8AAA+tSURBVDqw4AYTsQsBPF9YbUBuJMRBiFLNJ1G4N8477zy9QmGfC1dF7DFNEu4/DJtvu+02k5qVVVtCJTiWlt7MzSM4/vbo0UPHzc9Vp+bkEfMMhSUIZjIyZn/HttEzIGebJR3B1gwfZC+HxLnnnqvefvvtdC4N/RxIGRdKArW6IqESHH6fiaGGPJIrKiCkK8D66QeKlcL2J/2UI+dGhwD2l9zPrEDYTvnss8+0K9f27dtTNoKZHt41njIJ28c77rhDK90oh20NZv9xCyuu7t27x92MwOoPleBoJUaRGMIyiEzjXXIDCWwUlNIeF40aNQqySCkrBAQgKEiN+5nUj57gMcMxbOGShT1l7OSw3UyOI8iyEDtI9p+5nntg7ty5sSkk6McJJ5yQ3AVrv4dOcCCDexaDTAw4kdQIeM73mJaImIkAhuZ4zbBP9dxzz+U1Et9nSAGbRsx+kqVXr16KEEysZopSnmExwEwOoqtRo4ae4UWtkLjmmmv0HnlyH2z9HgnB2QpOlO1mZsCNPW3atCirlbrSRADbTJQD+KAm77fhB82eGl4NF154Yb4SicxRt25dNWDAAE1e6Rimk6+Dcrgf2MOGdKJSwqH5ReHlimRNcEyxse/hg9aUT1FvKVeAC6MfON8TQ07ELATwGYZsMPshukiyPP7444qx4zyMvj0NKq6JLDkxDSGSzbBhw5IvLfI7rnxoW1neYk+HQgL7yjAFMiXNpSuSFcGxaYq9D/sH3oecBUzZRfwjgA8gzs65FknWP1LRXIGW34vyW5TL1cCBAzWBoQVn9uPd//hHYxKFEon4gw8++GBGDcfODpL0zKsI2fTqq69mVFZxFwnBJSDEG4UZB1FQvQ/7bEHGWkuozvl/2atkpjB//nzn+2p6BwmOcPzxx+ulZ6qIzF77udcJT0+Ie6Rly5Y6hBKrGMiO/Buetwqa1myEVRKzRc84nvZhqlKcMbmfOoXgEtBiP4J9B5FgECCaAzNiLN9F4kMAUiKMFR4myfttya2CXPBaIcoNwiyLJN/Mxo899lh9jEQ2RJwJMiwWASs6d+6sX4gYGk+YMCEQl0YhuP+OMHHbq1Wr5mx00/92M/I/GIFiE+fZS0XegByvEKJgFk1giHTCb7FyYc/Km52hLR09erSqX79+3rPBtk1YLy1mh6ShhJDR7qIkSA6b72dIheD+i5Y37WbTk41XPukmP/YDeK6dS4wxHjBMBkSiQ4ClJlsuYM9Dnq7gO024LE9QJODdcPbZZ+tDaE3Zn2afLkzBhGXo0KG6LYQVw1to9erVvquk/cxcXZGMlQwY7HIz8OHtwcclC+i4Bpi9G2YE4nwf3QjgZYAdGwoev94EbNEQ5NITLy6cl0zIy/+7bNky75RQ/xK8geUx9xDPJm17+eWX066TGSyG+a5MVjImON527DdgoEq6MT6pkq6kjaycmIcAUVYw9PTMDfJ+kH8CRwDiwb6N7RYc4v0KgSISneZZ2SQSCisbPBWC3H9Lp43cO+SQ8IJdYK5CyKaiYjFS7jPPPKP3FF3xi86I4FCfo2DAl04keAQwAeDtKy+M4LFNLJFUkuD817/+1ek9T4I5eKHUIfLJkyerXbt2JUKR9z+mX2DiyhZJRgTH5isgJL6p8hCSf7JGwIuNf/3112ddlhRQEAGM05klcw9feeWVBU9w9AgeEuwN0m+iZBPDMHH2SbcJFsDvUS2pw4Y6I4LDD4+NzOJU6GE33uXySaTjksuMKWNFJJuGDRvqhzjRn9SU9kXRDhQS7BV6IZtI4rRx40a9JeJpkYlRWNgsL4o2BlVHRgRHCrxkn7ugGiTl/AcBjH15iWBTJRIMAgSkxJUKrwJSTua6sC9IqgD2e4n04+3XMYPjQ45h2432MyK4XL8xoug/7j7cZLjoiGSPgOdPis9oUTkysq/JvhIwVuY+84gt8a/tS1UhOEPvR96cvEGbNWtmaAvtaBZaQxzWeWhHjBgRWTJwO9D5XyvZl2R2m0hu/C8E9z+M5L+AESBNIpvBnpV8wMU7Xxy2XPhr8qBiIiFSNAIY+SYSXLt27WSJWjRk8ms2CLAZzA2HjaGIPwQwc8DYlY+Y26SHHdp7jIRx/SIkuwvugrJETW/sYzmLZao43/uHnhcCL4bjjjtOQk/5h8+pK4TgDB9OkkrjQiQb48UPFH6f559/via34cOHq3Si5xZfqpxhMwJCcIaPHrksmI3gEiRSOAJfffWVttYndBEO8CLhIUAEFQylvcCe4dWUfclCcNljGHoJJCshpr9IagTYYyOfZ6VKlRTRWETCRYD4drx0U4VvD7dm/6ULwfnHLPIrvDA4kVdsQYU4h5OvAJOabdu2WdBi+5uIEoJgmzYYAQvBWXC/4SzNG1O0gfkHiwzs4MIDJxIdAqRHDDu+XVC9EYILCskQyyH0DZmV/ARiDLE5sRdN7opu3brpsD6SZjHa4fAieb/wwgvRVpxhbUJwGQIX9WXE38P53oZlQZjY4BSOxT35Qsk5KhItAitXrtSzZlsCbQjBRXt/ZFwbb0yWY0SfzVUhijSeHWR/l/22eO6CqVOn6nwTtpgtCcHFc5/4rhWNFZFncRrPRSEtHwTfs2dP8SeN8QYgcGbr1q1jbIG/qoXg/OEV69mnnHKKTmCSSwasX3/9dV7yZfEnjfX20/leieRNJGRbRAjOlpFSSjuMM4thozcXhIQtdevW1Z4cTz31VC502eg+etF+CamP3yqRWviY/MIVgjP6lsrfuE8++UQHJpw5c2b+Hxz8hj8pmdrI4s6DJRI/AgQJ5QV72GGHqSZNmqijjjpKf0wOyioEF/9946sFRF0944wzfF1j28njx4/XDxJh211JX2fbGKRqLyuHDRs2KHIhY5O5atUq/SFgpqkiBGfqyBTSLvwsmdn8+OOPhZxh7+FffvlFderUSZMbuQFEBIFsERCCyxbBiK/H0Zllgt8ExRE303d15OFkOYo/qS1GpL47KRdEjoAQXOSQZ18hCbfJhOSKLFy4UJN2rVq11NatW13plvTDAASE4AwYBL9NwPmelG+4cNkuRI5lRnrBBRfIfpvtg2lg+4XgDByU4prE5i6kYHNCEJKc4H5GP0gGIyIIhIGAEFwYqIZc5p49e1SVKlXU1VdfHXJN4RSPuxkmBviTvvzyy+FUIqUKAkopIThLb4O+ffuq2rVrW+e2xKyTyChHHHGEWrt2raXoS7NtQUAIzpaRSmonMx+Wd++++27SL+Z+HT16tG7zmWeeKTkmzB0mp1omBGfpcO7cuVNVqFDBCr9AjHUvvfRSTW7XXXddzod8svSWs7LZQnBWDtt/Gk2Y7mOPPVb9/vvvxvYCN6t69eppcpPEOcYOk7MNE4KzeGgffvhhTRymOt+TfLlatWqKCBRofkUEgagREIKLGvEA62N2hNvWjBkzAiw1mKLIkM4eYZs2baxILxdMr6UU0xAQgjNtRHy254QTTlAdOnTweVV4p+Mj6+233XzzzUYvn8NDQUo2BQEhOFNGIsN2TJo0Sc/iTAghTfLlZs2a6Znb7NmzM+yRXCYIBIeAEFxwWMZSEmYiLAWffvrpWOr3KsWflGQwxAp75513vMPyVxCIFQEhuFjhz75y/FEhlV69emVfWIYlPProo5pkidX/xRdfZFiKXCYIBI+AEFzwmEZeIrZllStXViSmiVJIYYhHBTPI4cOHR1m11CUIpIWAEFxaMJl9ErHUIJnly5dH1lCSL6PcKFGihMqFEOqRASsVBYqAEFygcMZTGCGjiaV2xRVXRNIAwlUTronglG+//XYkdUolgkAmCAjBZYKagdcQAJO9OMIQhSkPPPCA2nvvvfXs7aOPPgqzKilbEMgaASG4rCE0owDP+X79+vWhNWjw4MF6KUxwShFBwAYEhOBsGKU02oiCAef7UaNGpXG2v1OYqbVv316TGzM4EUHAFgSE4GwZqTTaSRiipk2bpnFm+qeQJq569eqqYsWKavHixelfKGcKAgYgIARnwCAE1QSSJaNNRcMZhHj+pCeffLLCS0FEELANASE420asiPZCQhBcts73f/zxh7rlllt0WSgvyFcqIgjYiIAQnI2jVkSbW7ZsqVq1alXEGUX/tHv3boVHAkT50EMPFX2y/CoIGI6AEJzhA+S3eZMnT9bKhi+//NLvpWrdunWqfv36OoabJF/2DZ9cYCACQnAGDko2Tfrggw/07Muv8/2cOXP0dQ0bNlSmBtDMBhe5NjcREIJzbNx//vlnBUl17949rZ4R7vymm27S5HbRRRdF7s+aViPlJEEgQwSE4DIEzuTLcL7HlYr9tKIEF69OnTppchs3blxRp8pvgoCVCAjBWTlsRTfac75/7bXXCj1xzZo1qlGjRjqBNLkTRAQBFxEQgrNoVO+99141duxYhRlHouzatUsNGzZMffbZZ/ow/qg1a9bUocMTz/P+X7RokZ61NWjQQG3bts07LH8FAecQEIKzZEjJLYo3AeYbGzduzNfqadOmqapVqyqWnJ4MGDBAHXzwwQXIcMSIEXn7beRPEBEEXEZACM6S0WWmdeihh2oiSw4ueckll+j8qIldWbp0qSYyQhshKB969+6tj11//fWJp8r/goCzCAjBWTK099xzj2rbtq165JFHtJ3ar7/+qlvOchT/04kTJ+briRezrVy5ctpRvnnz5qpMmTKqqH25fAXIF0HAAQSE4CwZxIEDB+qMVczEIK0XX3xRt5xlJsvW+fPn5/UEX9QaNWro4/zmfaKM+JvXGPlHEIgRASG4GMFPt2oSyxx33HFqwoQJ+pIePXqoLl266P+XLFmio30kOsOvWLEij9Q8citdurTauXNnulXKeYKAEwgIwVkwjDi7lypVSs2bN0+3FlKDsFA8TJ8+XSsfEruxadOmAgRHeHG0rSKCQC4hIARnwWgvW7ZMz9K8lHx4Hxx++OF6P448DP379y/QC/bkSpYsqYmufPnyeeRY4EQ5IAg4jIAQnAWDiwM9JiKJMnr0aNW4cWOtcCC0USpZu3at3qvbvHlzqp/lmCDgPAJCcBYM8VlnnVVglvbxxx+rsmXL6hmaZJK3YBClibEgIAQXC+z+Kq1Xr54aP358gYu6du2q7eK+//77Ar/JAUFAEFBKCM6Cu4C9tx9++KFAS1EyENqIDPMigoAgUBABIbiCmMgRQUAQcAQBIThHBlK6IQgIAgUREIIriIkcEQQEAUcQEIJzZCClG4KAIFAQASG4gpjIEUFAEHAEASE4RwZSuiEICAIFERCCK4iJHBEEBAFHEBCCc2QgpRuCgCBQEAEhuIKYyBFBQBBwBAEhOEcGUrohCAgCBREQgiuIiRwRBAQBRxAQgnNkIKUbgoAgUBCB/weEuKWc9bMVhAAAAABJRU5ErkJggg==[/img]

Quadrilateral [i]PQRS[/i] is a rotation of polygon [i]VZYW[/i]. Is angle [i]QRS[/i] congruent to angle [i]ZYW[/i]? If so, explain your reasoning. If not, which angle is [i]QRS[/i] congruent to?[br][br](No picture on this one - just use the order of the letters to answer the question)