{"id":13449,"date":"2018-02-03T15:45:54","date_gmt":"2018-02-03T15:45:54","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=13449"},"modified":"2022-01-17T15:59:14","modified_gmt":"2022-01-17T15:59:14","slug":"um-poligono-regular-tem-25-lados","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=13449","title":{"rendered":"Um pol\u00edgono regular tem 25 lados"},"content":{"rendered":"<p><ul id='GTTabs_ul_13449' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_13449' class='GTTabs_curr'><a  id=\"13449_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_13449' ><a  id=\"13449_1\" onMouseOver=\"GTTabsShowLinks('Resolu\u00e7\u00e3o'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Resolu\u00e7\u00e3o<\/a><\/li>\n<\/ul>\n\n<div class='GTTabs_divs GTTabs_curr_div' id='GTTabs_0_13449'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Um pol\u00edgono regular tem 25 lados.<\/p>\n<ol>\n<li>Qual \u00e9 a soma das amplitudes dos seus \u00e2ngulos internos?<\/li>\n<li>Qual \u00e9 a amplitude de cada \u00e2ngulo interno do pol\u00edgono?<\/li>\n<li>Qual \u00e9 a soma das amplitudes dos seus \u00e2ngulos externos?<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_13449' onClick='GTTabs_show(1,13449)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_13449'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<p><script src=\"https:\/\/cdn.geogebra.org\/apps\/deployggb.js\"><\/script>\r\n<div id=\"ggbApplet\" style=\"float: right;\"><\/div>\r\n<script>\r\nvar parameters = {\r\n\"id\": 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is3D=is 3D applet using 3D view, AV=Algebra View, SV=Spreadsheet View, CV=CAS View, EV2=Graphics View 2, CP=Construction Protocol, PC=Probability Calculator, DA=Data Analysis, FI=Function Inspector, PV=Python, macro=Macro View\r\nvar views = {'is3D': 0,'AV': 0,'SV': 0,'CV': 0,'EV2': 0,'CP': 0,'PC': 0,'DA': 0,'FI': 0,'macro': 0};\r\nvar applet = new GGBApplet(parameters, '5.0', views);\r\nwindow.onload = function() {applet.inject('ggbApplet')};\r\napplet.setPreviewImage('data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWkAAAFkCAYAAADi5cqQAAAACXBIWXMAAAsTAAALEwEAmpwYAABD1klEQVR42u2dB3iN5\/vHXf9WjUwJ2Tsh9hYjv8YKsXfVqD1aLTVaVClqrxpVFEVJIkJICBKC2LFX7BAkSNUIjYo0+P7P85zklUhCEMk5J9\/vdX0ucjLOec\/7vN9zv\/dzP\/dTABRFUZTGqgDfAoqiKJo0RVEURZOmKIqiSVMURVE0aYqiKIomTVEURZOmKIqiaNIURVE0aYqiKIomTVEURdGkKYqiaNIURVEUTZqiKIomTVEURdGkKep1SkhIwKhRo+Di4oICBQrA2toaQ4YMkY9TFE2aovJQiYmJcHd3h6WlJdzc3FC\/fn3UqlULNjY2cHV1pVFTNGmKyktNnz4djo6O8PT0zIAwahFRUxRNmqJyWf8lPUHUmT2wtjSTEXRmJl27dm2YmhjhVMRGPEl4yDeNoklT+UN3795FXFzcB32O5MTHOH94K0JW\/YzV03pi4bAGmN6jNMa3t8SY5kYY41kYYxoWkjnoevXqZWrSDRo0kN8XPycY1UwfY1W\/P757Scwd4oElkzphq89EnDm0GQmP7n\/Q44mPj0dsbCwHD0WTpj6cVq5cKfO8RYsWRaFCheQE3bJly97NhJ88xv2o0zi\/ZSV8Z\/XFb8MbYXrvCtKEf2qij59STDiV0QqfSH5MwUT\/49dG0kZFPlZ+dnQ61H8v7XOMaWaA8W3NMa1nWfw6pB58pvfE8aBF+CsyAkn\/vltuOyQkBJUqVZLvl8DMzAxTpkxBcnIyBxRFk6ZyTr\/++itMTU1RrVo1GaEKExT\/F49Nnjw5UxO+d\/kkrm73x4nlk7Hn594IGdIcgT3csKZtSfg0sYR3Y3PMaWT0WhNO5ftGhTCoeVF839YUP37hiJ8HVMHcsc3RsVUtWFpaZGrSVlaWaN2kFhZN\/hzThrjjZ1UkPqadOX5qZiif69XneNXExeua7qkvX6fAr40zNnStgi0DG8vjObZ4LC5vWZWliQcGBsLQ0BAVKlRQ3jPxwWFubo4ePXpwUFE0aSrn0hv6+vqoU6dOBiP08PBAkcKFEDSuP3b82AlBvWrBv31peHtZKuYmWKVghlWNUimBXz2NpCn+oGKoV2EMU5nwqB4uGP9NDcwa1xKrlg7D9tClOH12L65Gn8zA+QuHUblyBRnVi4hamKEwQkdHB9jZ2SDy7IFMfy\/q0mEcCfPFuqUjsHh8e0wfWAvjujljVAdzjGimj1EpHxi\/eBrI1\/nyNZupjyHNsaU18cDuNRDybTPsntgXhnpFUaNGjQzvmahAMTIyQkREBAcXRZOm3l8rVqyAvb19ptGqwNbSDH3KGWZqwhJPNatbOGC9KhIN7ueBnSpDj5gzDKF\/jEHrcbXQcEodrNmzLFNDfRPCiAd92x9OTg4yB21hYYZevbtmadBvYvfxYHhO9UAb1evyWzgEh+Z+j52ju2DzgAYI6FQRvs1tlWOSZGLio6oXg6mhXpbvmbOzs6ztpiiaNPXe+r5\/Dzja22VpOI4ODmjrVBQ+zWywrmNZbOzzP+wY1REHZn2L0z6\/4PruIDy8cQn\/3r2dgb9vXUHLOU3QaEZ9TAj48Z1MNaf5dfM0eM6oi2a\/NMLZSxGZvu746AvyuE77zsbBX4Zgx8jPsEn14bO2Yzn4qt6Hr8oZwLqEaZbvWenSpdH805pIfvqEA4yiSVNvr39uX8Ph335AQOeKGFalGMxNjLM2aTtb\/DF7Ch7fic3U0N7EcJ9v4TWzAbou\/AyXrxzPc5PuuaQLGs+sjy6q1\/PPOx7Tvs0bUMzI6LXvWadSBljdygF7JvbFg6tnOegomjT1Zl3fuwlhqqhQRMXeKemLZQ2LQ7\/Qx6hSpUoGsxGThybFiuH2lYvvZGaCLRFr0VQVtTacXheBB3zy1KBFqkO8jiazPLF027x3PiZBSWdnlClTJtOqk4If\/R9mupvI9Ig6p22BoN7uOOs\/n9E1RZOm0iv+2gUcmvsd1qlu1ZVJPpFb9SyBNW1LYc+kfgj883cYGhigVKlScjJMTNKVKVMaenp68Fm+5L3M7H7cNXw2v7VMeXyzol+emvQI32\/hOaOeTMFcv37mvY7r6N5dMDI0hLOTE6pXr46aNWuiXLlysuJj8o\/f4+CswQj4vHxKXludyxbv\/+rmdrJ65O6F4xycFE06Pyt65zqEDG4OnyZWanNOmezzbmKJ0KGtcGW7f7oUxpkjB\/Fl715wcXaCna0NunX+XBrR+xhZKsvDfkNTVfSal9H0tsPr0WhmfVUU3RCT14\/JkeOKPncK3w8ZhNKupWBlaYmO7doibHNQup+5vMVbfR68LJVJyNToemNKdP300QMOWIomnR8kFpDsnzEQa9q4ZIia13YoIysu7p0\/kSMG9TaICUQRTYtccNt5LXD+8uFcNWiRC++95AsZzedEFP0u3Lt8SlaSrBPRdWp1TEp0LSpKdv30Bf46fZCDmCZN6ZqeJyfJRReb+nvI6Cxt1Cyi6NAhLXB5qzf+uX0j140pLX67l8nctKis+HHNsFydRBy3bqSM4sXz\/7p5ep6+D4Ir29Zg23et4e1l9bLEL6UeWywIOvnnNCQ9fsTBTZOmtFn3Lp3E\/ukD4d+2VIaoeV3H8rJ07EFUZJ4bUlqG+XwjJ+2EYc4OnpwrBv3b1pnKZOE3K\/rKHLmmvB\/xNy7i6O8\/YX2XKulqsmXuuqW9zF3HnTnAwU6TprRFz\/5LwsWNy+SCEbHqb1XaqNnLAiHfNsXVHes0yphfTXuItIPIC+eGUS\/eNlfmoUUJYLt5LRFz46zGvjfR4YHYPrwdfJpZp5lsVOeuN3SvgVN\/TmfumiZNaXKuee+kfmlyzWYvo+bPyuLIb6MQH31OYw0oLcIoe\/zeWTHqH1YPyfEctfh7IqUi\/n6qQR85u1Mr3p\/4mCs4sWwSNnxRLc3KzpTouoU9do7ujNvHduPF82e8MGjS1IdUeHg4OnbsCDs7O5QtWxbDhw+XLS9TJeppLwYuRXD\/ujKaWpWuQsMK275rKys0EuKua4X5vGrU6ojaU5bEiYUuAftW5YhBbz28Fp0WtFdSHGLRyvGzu7XuPRJc37dZLrFXlqqnyV0H9aqDM76z00XXovve\/PnzZQml2M2madOm8Pb25sVGk6beVnPmzJH1tMKcxXZQYtGI2MPPysoKx7dvlLnI9FGzuo9EQKcKMod5\/8oZrTSdtPwVewnj1\/0gl2eLqg9hql8v7yNL5d7FnHcd34TvfAbKvyNSHE1nNZI56Lyo5PgQ0fWp5VMQ2Ku2aiyYZ4iud4zqhKsHtsuFNA4ODqhcubIcVxUrVkTx4sW5gw1NmnobHT16VPZs\/vTTTzOsVnNxckIp0yLpJgFlhcbQVrJC412XZmsqYlm2qKEW5Xki6hUlcsJkxdJtkU8Whp1VFYhIaYQdDcSsjROVyFn8vvg7osxO\/N34uBs69X4Jbh4Jw64xXeSS87TRtaedPizNzdCwYcN0Y0p8bWJiIlurUjRpKhsaOnRopsuJUy+owgU\/xoK6prKZkair1bQKjQ8VVc8Nnoo2c5vLRS+NZzZQGW49abwi0u44vw36\/dFdRtriX2HKqTltkS4RP980xZxFdC6MXdffs0c3o3FyxVS5IEYYddGCH2X6wS8QGxOIfymaNJUNid2vUy+azDAzMcKaeZN13mSyMuu1e\/9UGXEPac6irllExl4qQxZGnIrXzIbycfF98XPdFn2OBVtnyQg7P75vJ3dsQuFPCmY5pkQaxMLCghcfTZrKjjp36iRbWWZ1QYlctViinR\/NJt2k2fUz2HtyK1bu\/B1TA8dhpO8Q2VFPIJZ1iwZJmw744cLlI+\/czU5XuH\/zGgoWLCg3HMhsTFWtWhWVK1fixUeTpt4kUUo3plEZmBgUzZA7FIgJH1tr63xv0OTtadSgvtyjMtONG8xLoE91G9w5e4QXIU2aykrn1y+GX0sHOclT2awwipsYy9vQ1Fy0mIkXXec2rl1N0yFvjbj7MjYyQsmSJZWIum7durCxsoKTcSEsaVhCblggarBFKwGKJk2lKDnxseyC5p2mYmPr0NYYPKAfTE1MpDGLnabLlSmdoYMaIW9r1A3qesjUhxhXwrQ7fdYeW8f1Vcaf+HfLQC8k\/H2TFydNmoo9HPayj7PqAhHN9k97z0rfyvL08fdqqk9IZjnq8ycOy39fNnXyh38715Tue+ayDv\/Gvs28SGnS+VcnV06Tt5fqmucSWP9FVfwVyQlBkrcNnbaqoujUTXVFDX7E7KFMf9Ck85ce37mJ4C\/rp7m9tMDun3tp5fJtopucWDohpU2qOv2xsXcduYMPRZPWeV0J9YV\/+9JK9OzXyglRIb40BqJxxEaEYn2Xykr6Q6TizgUs4kVMk9ZNidvFvZP6p7QPVU8Obh7QAHcvHqchEA1etXgF20d2SOkHoo6qxUbF3HCAJq1TehQThaCeNV+mN1S3kUcXjta5PhtEd4lcPVc9fyI6LKrGcUDnyrhzjjXVNGkd0MWgP2RKIzW9IfavE+0leeHnDc+ePpHnJavv\/\/fvP0of5hfPnsmIMf3PxGV5rrP7Gt70HE\/u38Hz\/9QTdeJf8bUmvHdxp\/ZjQ7fqL9MfTaxx\/I8J7FtNk9ZOidrnHT90VPd5Tql9Dh3aUraUpFnmDS+eJaPT4k4o0LdApqaa9F8ixm8aD7sRdij4ZUE4jHTAnLA5eJaUqBh0UnKS\/P3MyI5Rv+k5hCHH3LuBOlPryO+Lf8XXmmLU4u5v78R+6dIfW75pJCfDKZq01uivk\/uwvnMlJXoWt4ln1\/xKo8wjntz7Sxr0UP+hWRrq8\/+eKgb+KsJERbSbGH8PB68cfGeTzs5ziMhZGPP8Hb\/KvzcvbK78WjyuSe9p1JZVso46Nf2xpq0Lru3awIufJq35OrroJ\/g0tVEa8Yvbw1vHwvO9USb9E6+6LX6uur9\/gf8e\/yMjw9Tb\/df9Xnb0JoN+8O99dFnaJUtDTXx4D3sv75WP15pSC9fvXcfzF8\/hc8hHPiaiXfE6n6qOYc2RNfKxnst7vtXryO5zCIkIOvXvvfq1ptVUbx7gmZL+UEfV+6cOYE01TVozJW6Ftwxs\/HJpt4rwsd1Y+5ySg\/3zwJ+w+M4CRQYUwZQtU3Az\/mY6c8rKoLOKWrMbwb5QGWGxb4uh+JDi2HJmS6a\/k5z4L3r\/2Vs+PjN0JpL\/TVA+WNJ+kIjjmLR5kvw5cTwiOpd54+T\/pAm\/7j3I7nOIvyVMXETQQiKi1sRIOi1HFo6Gb1NrJf0hFmWJnYEomrTG6PreTfJ2zzu19rm1E65s82OqQUSQ8XdxKPpQBmNNjWy\/+OMLuVfjhzLp\/548xvB13+PB4\/vp\/l7a3xHGWGVCFfn46djT6kk7VcQvJ\/VUJqoYrep1dl\/WXf7c4j2LlbxxpZ8rYfel3UhKeJh1qiObz5FZTvrmg1iNyUln2TZ2dxD827umq6mOXD2H5kCTzluJ27qDs4fKpbOpk4ObBzTE\/UunaNBpqilS87B9V\/ZF8vNk9F\/VXzHLBeELXmtu75vuSDVqkfbIyqSFWYoIXzx+++FttJzfUn4tovxVB1chWfX78liSnsJrjpf8OWGgaT8oCn1VCCdjTsoPpUyPI5vPocnVHdmpqQ4b0UG5kxRBy7bv2uCp6i6DoknnusTWRJv6fpqm9tlSbgDL2udX0g3Pn8tUgzAnkYcVk28x92MUcxMpiKeP7n9Qk84sMk9n0ip91P8j+biIil+N1ANPBModt1+ojNZgoIF8TBirNNEXz2VULR5r\/VvrNJUgGZ87O8+hC+f81MoZ8G1hpxj12g5lcOvwDpoGTTrndffuXbnfoNhWqECBArJh+s8\/\/4wz\/gvUm3ympDf8VYPw2m62EH2TOaWdDEs1p8T\/VKZ2L+6DpTuya9KpkbFIZzx68kia76Ldi5SJPpGuUOe4X8ifT5uiED8rfk7vGz0ZMWf13Nl9Dl3g3vkTWN\/55ZJyEcQc+nUkli9bKne+F61SxQ5D7dq1w7Vr12g2NOm3V1xcHFxcXKQx16pVSzZJd3Nzg0VxE9SyLIoVnur0xvbh7RAfc5mG\/I4mLeqOxaRrXpq0MF6jQUbK6xGpkbTmm7a6ItWk036wpP7d11VhvM1z6ArirvLAjEHK3WZjez0Y6+uhSpUq8noSe3mKDZfFTuWRkZE0HZr026ljx46wt7fPdKshU0M9fF3FFJF+c2nEb0x3PIPNcBtpRJf+uoTEh\/cRdSdKMUtRlva6yojcSHeIFIXIEYvH\/\/7nbzy5n95ARe5YTvKlSXckPE1IMeqXC1ycRjllWamS3efQxTFwadOfGPs\/GxT9pCDq1auX4XoSgZDYdYiiSWdbycnJctcKsbVQZiYtIgG3KpVowtlAVESkVnIM8BkgTSltzbKoE06bOvjQUX1mJi0mLsUEpnhclMmJ1yiYt2Neulxz2uqOCcETlJ+bFjJNPjYmcAz+SymtS\/sB8zbPoavjoFeXjnAtVfK1myvHxsbSfGjS2ZPIkRUpUiTLASX2HTQ3M6MJZ7ME79j1YxlSFA1mNVAWhSQnPslTk5YVIMlPlRK5rKo2Eh\/8jQtxF5RoOi2iSuPRvw\/xJCUNktlzZec5dHUc1KhWFZUqVcrymrK2tkZ4eDjNhyadc5F0LbcaNOF3WMwiDGlkwEhpdsKgyvxUBs+fJee5SYsc8f2Ee\/jG9xuZOxY5Yo8ZHnIZeNI\/L0sEn\/7zQNY5iw8ZkWsXaQrxQRP3MA5PHtx57XNl9zl0kT49umW5U7nAwMCAkTRN+u3UrnUrODo4ZDqgbG1ssPS3eTTgd10W\/iRBRqWyhC2XDDqzFERmS8jFysDUyUFRoyxKBjO7O3iWUscsjkfcCaTmmN\/0XNl9Dl0jNCgAxYyNlV3K0yImD8uUcqHp0KTfTqu6ucO4SEHY29oo1R01a9aUaY6mXo3wKC6G5kvIW9CzW1cYq4w6tbrj008\/RcmSJVGk4EeY1cSVGwnQpLOv\/dO+kWVDC+qZokkZS5Uxl5B10g72dhg1fFi6HZYJIdln\/i8zULF8OXz0f\/8nUxy1S9lgpruJuuXpwMZszkSTfrNO+85WekAHdK6A+1cieXER8gEJHtBAaXm6f8ZAmhBNOmvdOLA1ZYsgM\/i1cpQ7UfAiIuQDtzyNuYKALpVSlpFb4MKGJXRjmnRGiX0I1dtcqQfKlTB\/XkCE5BJ3zhxWt1pQGbVoexobsZ2OTJN+KTFhsaFbNXUvDs8SOLZ4HC8cQnJ7ZWLwSvh4WcjrUOz68iD6HF2ZJq2WaKeY2gt654+deMEQkkccmjdCBkrCqDd8UVWu8qTyuUnvnfqVYtCBPWtxJxVC8pht37dRJhJDvm3K3cjzs0mfW7cA3l7qSg7\/DqVx9+JxXiSE5DEiUArsUVMx6qOLx9Kd86NJ3zgYouzLJrb6iYkI5QVCiKZUfESfw1pV4JRa8XHO\/zc6dH4y6cd3bqr3Y5M7epvj4qblvDAI0TBuHdkJ3+a26kCqqQ3+OrmPJp0fDlJMRAR2r6FUckTM\/Z4XBCEayrl1C9VzRikVH\/\/E3aBJ63wlx9CWykRhyJAW3JOQEA1n\/8xBSsXHxr6f5uuKD503abHkNNWgN3R347ZXhGhLxcew1spEYtiPn+fbig+dNunLW1bJzTBlJUe7Uvj73FEOfkK0qeJDpClTjPrwryNp0rqkv04fUCYgRG+O2EPbOfAJ0TLuXT4F\/7YlUyo+zHEl1JcmrQtKiLuBtZ+VTankMMO5tQs54AnRUm4c3KoOuFTX8+oW9qoA7CBNWusrOXq4qSs5VLdJEXOGcaATouWcD1gkS2fFdS1qqcWO7TRpLVXosFbKROG271pzgBOiIxyY8bLiQ\/Sjzi8VHzpl0kcWjFYMev0XVWXPWg5uQnSH7d+3VSYSd4zqRJPWJl3cuFxZ8i16RN+JPMRBTYgOVnwEdK6oTCTmhx4fOmHSf0VGyCWkcimplyWu79vMAU2IjiImDv1aOyk9Pq7tWk+T1mSJ3VXWdiijLPk+sfRnDmRCdJyr2\/3h08RKXfHR0gEPrpylSWtEaV1CAn744Qc4OjrKnbytrKzQqoINljQ0kwYdPr4HBzAh+YTjSyfIio8VKrpXs0XZMqXx0UcfoUSJEujVqxfu3r1Lk85tg65atSosLS3h5uaG+vXro1atWrCytICVwScI6FufzfsJyWeIEtsqZkVhZmKM6tWrS1+oU6cO7OzsYGZmhtjYWJp0bklE0CJy9vT0zICFuRm+6s0ompD8xqJ5s2FsaIAGDRpk8AVnZ2e0a9eOJp1bEikOEUFnZtK1a9eWETUHLSH5C4\/\/uaNixYqZ+oKIqvX09JCYmEiTzpUXWqAA6tWrl+nJEJ+i4vsctITkL8RddM2aNTP1BYGhoSGuXbtGk2YkTQhhJM2ctJw0zOxkiMe\/7t+Xg5aQfJiTNilWDA0bNsw0J922bVvmpHOzuqOkvS3MipvKiFqkOEQEbWtrC3sVd65HcdASkg+p7\/EpLMzNUaNGDekLorrD1sYaxvp6rO7IbQX0q4+WzvoorveJzEFbWligf++eNGhC8jGP4mLw85hRKFXSRfqCYeGC8LDRw+JWZfA8OYkmnVuKidgml4CK5iq7x7HcjhCSRbe82UOUJkxn\/ObRpHNLWwY2lku\/fbws2DyJEJIlovvl6pb2csm4aMak7XsjaoVJ371wXNmrMHRoKw5EQshr2Tf5SyWa1vYtt7TCpIUxq3daMcftY+EchISQ13L33FF4i9bFqmh6Yx93mvSH1MMbl9TdrlRRdMjg5hyAhJBsET62mxJN39i3mSb9oRQ+vqd6txXPEogOD+TgI4Rki7hT+9XFBir\/EHNaNOkPoMd3bsKnmbqZ\/8a+\/+PAI4S8FVsHNVFvDuBlobW7jGu0Se+fOkBp5n8xcCkHHSHkrbixf6uyy7jYmJomnYN6+vAe\/Fo5yk\/BDd3dOOAIIe\/Epv71pI\/4qu7KH16\/RJPOKR2a+52y8\/eplTM42Agh78Tlrd7SpEU0vXN0Z5p0Tij56ROsaVtSvrH+HcpwxxVCyHsR1Ku2OppubivnumjS76ljS8YrUfSxPyZwkBFC3ovz63+Xc1vCVw7MGEiTfh+Jhihy928RRbd3ZRRNCMkRAj4vr46mW9jh33t\/0aTfVefWLlCiaLHJJAcXISQniPSbq0TTRxaOoUm\/q9Z3rSIT\/KKyIz7mMgcXISTHWNOulIym\/do4IznxMU36bXVp859KFL1v6lccVISQHOXQryOUaPrk8ik06bfVxt51ZBQt6hkfRJ\/joCKE5Hwb01YOMpoO6FRRKzYF0BiTjt65Xomid4z6nAOKEPJBODBjkNJ46ULgYpp0dhXU211G0d5NrHDv\/AkOJkLIB+FBVKS6jakqmhZzYJq+KYBGmHTcyX0pW2OZYdv3bTiQCCEflF1juirRdPTOdTTpNyl0mLqpv3djM9w6spODiBDyQREd8eRuTyrPCepZU6Oj6Tw36TtnjyhbYwV\/VZ8DiBCSK4T98JkSTV\/bFUiTzkqi4UlqO1IxecjBQwjJDeKO71XamIZ825QmnZn+ibsBnybqBH5gjxocOISQXGWL3BSghNwU4E7kIZr0qzowc5CyNdb5gN85aAghuYrYki+1jWno0JY06bR6+ugBVrdWN\/Vf\/0VVNlIihOQJgT1rSR8SG14\/uHo2f5v03bt3MXfuXHh5eaFqSXu0d9HHgnqmOOs\/n4OFEJInRG1eiSX1i6N3OSPUKmkDd3d3jB49GteuXctfJh0VFYVixYrBzs4O5cqVQ8WKFWFjZYGin3yMPaGbOFgIIXmT8jh3CmYGRWBmaoKyZctKb3J0dIS+vj42btyYP0w6OTkZ1tbWqFChAjw9PdMh3hBLCwvcv3mNA4YQkutUr1oFLi7OaNiwYTpvqlGjBgwMDBAXF6f7Jh0WFgZLS8sMBp2Kra0NAnxXcsAQQnKVM0cOwtDQIINBp2Jvb4958+bpvklPnDgRzs7OWZq0k+rW4sfh33HQEEJylWUL58NBZcRZeZOrqys6d+6s+ya9dOlSODk5ZflGCAP\/ZepkDhpCSK6yOcAf1tZWWXqTi4sLhg4dqvsmHRsbCz09PXh4eGR4E+rWrYtixYxx\/sRhDhpCSK4i5sLEBGHNmjUzeFODBg1gYmKC8PDw\/FHdMWLECFhZWcnyltQ3oU6dOrCztUW\/Xj04YAghecLsaZNhamoKNzc3xZvq1asnKzwaNWokCx\/yTZ30grmzUfSTj2CsVximxoYoZmyMSWPH4FFcDAcLISTPWLNyOczNzWBsoA8Tg6IoUvAjfNm1Y54bdK6bdNzpA\/izkTkm1SoG34nDWHZHCNEogueNw5jqxljuaYYzfvOgCcpVkz61aobSq+POGeagCSGaxYNrF5ReHnsn989\/Jh0+roc8eL9WzhwQhBDNTH20LSWNelO\/uvnPpOVu4CkHz8FACNFEtg5sIn3Kr41z\/jLpZ\/8lwbe5rTz43T\/34mAghGgk+9PsJh5\/7UL+Mem\/zx1R56NVB39ixVQOBkKIRnJu3QI5byb86uLG5fnHpM\/4\/KJMGopG2xwMhBBN5M6Zg9KnxPzZgWnf5B+T3j2htzRp36bWbPBPCNFoVre0lzuJBw9okH9MOrCHmzzoDV2rchAQQjSaoF615fzZ6lYOePH8Wf4w6dXN7eRBh43swEFACNFo9ozvKf1K3P0\/vHFJ9006Ie6GMml4dNFPHASEEI3m9KoZSoVH1JZVum\/SV0J9lUnDqzvWcRAQQjSaW0d3KhUeRxeM1n2TPjhrsJwpFQcdH3OZg4AQotE8uhkN7yaW0rdCh7XSfZPe8k0jOWm47rMyHACEEK0goGtVmZde+1lZ3Tdp\/5S18JtVZs2TTwjRBraPaK9MHiY9fqS7Ji1mRlMnDQ\/OHsKTTwjRCo7MH6VMHkbvXK+7Jn15yypl0vDSphU8+YQQreDa7o3K5OGRBT\/qrknvm\/KVTL6LA31w5SxPPiFEK\/jn9g34eKknD0OGttBdkw4Z3FzdQ7q1E088IUSr2JAyebihW3XdNemAThXlQQb2qs2TTgjRKsQKaeFfPk2s8Tw5SfdM+unDe\/AWtwuNSiB8fE+edEKIVnEgTW\/pW4d36J5JXwsPVCYNT\/vO5kknhGgVl0N8lMnDE8sm6Z5JH\/p1pGLSN4\/s4EknhGgV8dHnVJG0uZxXCx\/bTfdMOnRIS3lwvs1s8fhOLE86IUTr8O9QWualxR6tOmfS67tUlgcXwB7ShBAtZcsg9ca0vs3tkPz0ie6YdNK\/CeoGJY1KYNv3bXmyCSHaOXk461tl8vDuheO6Y9KxEduVfPSxxeN4sgkh2jl5uMVbmTw85\/+b7pj08aUTFZO+tpsbzxJCtJN7l8+ovUzFwZnf6o5Jbx\/eXh6UTxMrPLoVzZNNCNFa1rYvI9stbxnopf0mHRcXh0WLFqGesylaOelhWpPSPMmEEK1mUdf\/oWNJfbjbGWH69Om4du2adpr0unXroKenh5IlS8LV1RXOjo4w1CuCnt264lFcDE82IUTrGDLwa+ljzvZ20tdcXJylz61YsUK7TPrkyZPyhbu5ucHT01Ohfv36MDMzw89jRvGEE0K0imUL58Nc5V8eHh7pfK1OnTooVKgQIiIitMek+\/Tpg7Jly6Y7kFRq1qwJsxIleNIJIVqFvZ1thsAzlVKlSqFjx47aY9IODg6oUaNGpgcjKFKkCC6fPs4TTwjRCqLPnZLRcsOGDbMMPm1sbLTHpEUUXb169SxNWhxszCU2\/SeEaAe3r1x8rUmLCNvJyUl7THrUqFFwcXHJ9GCqVq0KJ0dHnnhCiFZRvWoVVKpUKVNfc3Z2Rv\/+\/bXHpEXpnYmJiYyo037yiFsCYyMjrPXm\/oaEEO0iPCRY5WvFUK1atXQGXbFiRRgYGCA2Nla7SvAiIyPlp4uxoQFszUughLEB9PWKYt6s6TzhhBCtxGf5Ehjo68PUUA\/WZsVRvJgx7OzssG\/fPu1dcbjxl9HoX94QI6sa4dL2tTzRhBCt5sah7Rhbw1j62qqxXyM5OVm7l4Wn3ZHlYuBSnmRCiFZzKXil0mTpSqiv9vfuiDu57+W2WSun8SQTQrSa8+t\/V0xaBKFab9IPos+pTbpRCRz9\/SeeZEKIVnNSFWym9pSOO3NA+006Ie6GYtIRc7\/nSSaEaDWiJ36qSd+\/ckb7TfrF82fw9rKQB7VnfE+eZEKIVnPwlyGKSSfcuakb\/aTFfmBiX7CwkR15kgkhWs2eSX0Vk372X5JumLRskq0y6a1fN+JJJoRoNWEjOqg3o21hpzs7s6zvWlW9DXqf\/\/EkE0K0mq3fNpN+5t\/eVXdMemMfd3lQG7pV40kmhGg1m\/p5SD8L6FxRd0x6y8DG8qDWflaWJ5kQotUE9qgp\/SyoZ03dMemwkZ\/JjRv9WrH7HSFEu1n3eXnpZ8EDGuqOSe8e31O9W3hTK55kQohWs6aNizTpbd+10R2T3j9joDRpsZTy8Z1YnmhCiNbi09RG+tmuMV11x6QP\/\/aDYtL3o87wRBNCtBa5glrFvilf6o5Jn1k9R2mydPNwGE80IUQruR91WvqYMOkjC37UHZO+FPynYtJXw9bwZBNCtJLbx8KVDninV83UHZNmT2lCiC4QvWu9YtIXAhfrjkmLFEeqSUf6zubJJoRoJekb\/q\/WHZN+cPXsy57SC0fzZBNCtJLI1XMUk751dJfumHRi\/F3FpA\/MGMSTTQjRSvKyl\/QHNWnRU9qnqbVcSrlzdGeebEKIVpKXvaQ\/qEkLrW5hr+4pPaIDTzYhRCvZN7n\/y17SSYm6ZdJKT+lvGvNkE0K0kh2iD1Ee9ZL+4CbNntKEEG0nL3tJf3CTDv6yntKDlSebEKKNBPWundIbv7rumfTWQU1k56i17UvzZBNCtJIN3WuoMwK96+ieSbOnNCFE2wnoVEGa9OavGuieSe+d1E\/dCU8FTzYhRBvJy17SH9ykD80brrQrjb92niecEKJ1+DSzlia966cvdMukExIS8FOvdqhiXhSuJoUxuE83nD9xmCedEKIVxFw6ixmTJ6BiiSIoU7wI+jSuibt37+qGScfFxcHe3h5WFhYoW7YsKlasKL8uWqQI1nqv4AAghGg0Z44chLGxEexsbVGuXDnpYdZWVjA0NMTRo0e136Td3NxQqlQpeHp6pqN69erQ19dH9LlTHAiEEI3kUVwMrCwtUaFChQweJszaQhV8JiYmaq9JR0VFyU+bhg0bZjhAgYioZ02ZyMFACNFINgf4SyPOzL8E1tbWCA4O1l6T9vb2hoODQ5YH6Orqio7t2nIwEEI0krGjRsDZ2SlLD3NycsK4ceO016TDwsLkJ01WB+js7IxBA\/pzMBBCNJIFc2a9NtAUJj1\/\/nztNWmRqzEwMEDNmjUzHFyDBg1QzNgYQf6+HAyEEI3k8unj0CtaFB4eHhk8rG7dujAyMsKFCxe0e+Jw7ty5MDExSWfU4oAtLczh4V5HJuY5GAghmsqAfn1gVrw43N3dFQ+rU6cOzM3N0atXL92ok16wYAFMTU2lWZsY6KFIwY\/RqKwt7lyP4iAghGg8X7iXVfnWRzDWK4wSKsMWlWnDhw\/P1cqOD77iUCgyMhK\/dHTHMk8zeDe2wP2rZzkACCEazeM7sbLn0AqVb81pXQkRERG5bs65ZtJCFzYs4c7hhBCt4co2P2Xz2aOLfkJeKldMOunxI\/g2t5WdpEK+bcpBQAjRaHaO6areMsvLEo9uReu+SQuFDGkum5QIs3544xIHAiFEY\/Fr5SyDysAebshr5ZpJn1u\/SJ3yUH06nVu3kAOBEKKRxEaEKqmOY4vH5h+TToy\/q6Q8xI4tHAyEEE1k9\/ieyu7g8dcu5B+TFtoysLGS8kiIu84BQQjRONZ1LC+DyfVdKkMTlKsmffLPaUqVx\/mA3zkgCCEaxY39W5VUx4FfBuc\/k\/73bhx8mtrIW4nQoS05KAghGsWeyf2UVMftE3vzn0kLbf6qvjrl0cwOj25Gc2AQQjQn1fF5OY1KdeSJSUeunqukPKK2rOLAIIRoBHfOHlIZtHrj7P0zBuZfk\/7n9jV4e1nIT6vtw9txcBBCNIJ9UwcoqY5bx3fnX5MWCv6ynjRpv9bOco08BwghJK8J7FFT+tLaz8pCk5QnJn18yXgl5XFpEzemJYTkLbeOhb9Mdagi6nxv0rLKo4mVvLUIH9uNg4QQkqcc\/nWkkuqIPRRGkxYSa+JlyqOVE1MehJA8Zf0XVaUf+bcthefJSTRpoWO\/j1VSHtG7NnCgEELyhLsXjqu9SEX4+J7QNOWZScdHX4B3E0t5i7Fj5GccLISQPOHI\/FHKKsOr2\/xo0pmlPPw7lOFgIYTkCcFf1pc+tKZtKbx4\/owmnVZHFvyopDyu7gjggCGE5Cr3zp+Aj5elTHXsGtMVmqg8Nem\/ZS7IQqY89k7uz0FDCMlVTiybrFR1RO9cT5POTBtSZlXXti\/NKg9CSK6yqe+n0n9Wt3RA8tMnNOnMJNbIr0pJecREbOPAIYTkCvExl+Et1muo\/Gfb922hqcpzk74fdTqll0cJuSMCBw8hJDc4\/sdEpaojaqsPTfp1EmvlxS1HQOeKHDyEkFxh60Av6Tu+zWzw9NEDmvTrdHDWYCXlcevoTg4gQsgHT3XI1hSNzRA6rBU0WRph0reP71ZSHvumf8NBRAj5oIi+9qmpjnPrFtCksyOxE4JMeXSpwkFECPmghAxupk51NLdFcuJjmnR2FDbpS\/QqZ4Qq5kXhVqUiRgwdjPMnDnNAEUJyhJhLZzFj8gR41q+LsiWKop2zPtb094SmSyNMOi4uDjaWFjAzNUHZsmVRsWJF2Nvbo2iRIljrzX7ThJD348yRgzA2NoKdnS3KlSsnPcbGygL6RYvg6NGjNOk3yc3NDS4uLmjYsCE8PT0VqlevDn19fUSfO8WBRgh5Jx7FxcDK0hIVKlRI5y8CYdZWVlZITEykSWelqKgoGBoaZjDoVEREPWvKRA42Qsg7sTnAHxYWFpn6i8DOzg7BwcE06azk7e0NBweHLN9AV1dXdGzXloONEPJOjB01As7OTll6jJOTE8aNG0eTznLCMCwM1tbWWb6Bzs7OGDSAzZcIIe\/GgjmzXhsICo+ZP38+TToriVyQgYEBatasmeHNa9CgAYoZGyPI35eDjRDyTlw+fRx6RYvCw8Mjg8fUrVsXxYoVw4ULF2jSr9PcuXNhrDJjMYGY+uaJN9SiRHFUL+0kE\/8cbISQd6VLI3eYGhvC3d1d8Zg6derIScO+ffuyuiM7WrBgAUxNTSXm5mYo8snH8LDVwzIvG\/x1+iAHGiHk3ZaAR5+DXytntHXWl75S3NQEZmZm8g5+xIgRGl3ZoVEmnarIyEjs27cPl8LWKkvFQ4e04GAjhLwT24e3Uxr7R8z\/ASdPnkRERITGm7PGmnS6ScXh7ZXGS2KtPQccIeRtuLLNX737U2MzBPWqhefJSdA2abRJJ\/x9E36tndSbRLZxkbctHHiEkOyQEHcdazuWk\/7h7WWJW4d3QBtVQNNf4JnVc9Sb1apuV3aO7sLBRwjJFvunf6N0utszqS+0VQW04UUG9aoj0x7itiXmwFYOQELIa7l5JAy+Ta1lmsO\/fWkkPX5Ek\/6QenDlLHyaWMvblnWflZW3MRyIhJCsCOhaVZksvLZrPbRZBbTlhR5ZMFpJe+ybOoADkRCSKcf+mCDTHOLue+foztB2aY1Jv3j+TL0xgOr2xUdMAnCbLULIK9y7fAqrW9rLu+7VrRyQeP8OTTo3devoLjlLK05AUK\/aeHwnlgOTEKIQMqSFkuY47TsbuqAC2vaCd43tpqQ9ji76iQOTECI5vWqGDOBEmiN4QAOtrInWCZN+8uCOrJkWJ8OnmQ3unT\/BAUpIfl\/6HXNF5Qsl1b7QxFq2ktAVFdDGF33Wf74STW8d3JyDlJB8Tvj4nkqa4\/CvI6FLKqCtL3zzVw2UJeMXg5ZwoBKST4kOD1SWfq\/\/oqrOpDm03qQf3YxWZnH92jgj\/sZlDlhC8hmieCCgaxX10m+VUcceCoOuqYA2v\/gTyyYpaY\/tI9pz0BKSzzg4a4iy9Dt8XA\/oogpo+wFs6F5D3uasamSO63s2ceASkk+IO7UfPk2sZBTt364Unj68R5PWRP11+oBSO72uY3k8uhXNAUxIPiD4y3rKZOGlTcuhqyqgCwexb8qXStpjz8Q+HMCE6DiRvrOVpd8hQ5pDl6UTJp2c+Fg2XkqdPOCScUJ0uCZaboflqCz9fhQTRZPWBl3fE5SS9iiBjf0+5WAmREcJG9Hh5dLvVTOg6yqgSwcjOl6l1k4f\/Z1LxgnRNS4Fr0ipiTbHhh41ZeM1mrQWSczuplsyfvkUBzYhOoIoCvDvUDpl6beV6vo+ifygArp2QOcDFimTiFsGNeHgJkRH2De5v5Lm2D\/1a+QXFdDFg9r0ZX0l7XF+\/e8c4IRoOWLbPG8vK7kmYt3n5ZH89AlNWpv18MYlme6Y6W4KL2cTuDg5wM7WBp07dsDJg3s56AnR9H4c505hyMCvUdq1FKytLOHuVBxj3YrJKDpm32bkJxXQ1QP7Y0hXFCn4MZydHFG9enW4ubnB2dkZhQoVQpC\/Ly8EQjQUEUgZGxnB3t4e1apVk9duqVKl8MnHH2GwVxXkN+mkSScmJsLY2BhVq1aFp6dnOmrUqAEjQ0PcvnKRFwQhGoiLsxPKly+f4dqtU6cOihQpgqioKJq0tis4OBjW1tYZTnIqjg4O8FnO9qaEaBpH9+5CsWLF0LBhw0yvXScnJ0yfPp0mre2aOHGiPJlZmrSjI34c\/h0vCkI0jGUL58Pezi7La7d06dLo1KkTTVrb5efnJ404qxPtrDLwBXNm8aIgRMMIDwmGhYV5lteui4sLRo8eTZPWdt29exdFixaVOaxXT7K7uzuKfvIxTu3awouCEA3j\/o0o6Bf+RE4Yvnrt1qtXD\/r6+oiIiKBJ64Lmz58Pc3NzebJT81uiysNEvwg+K6kPv9bObMREiIY1TgrsURODKxmqjLogKlasqFy7tWrVgqWlJfr378\/qDl1SSEgIXF1dZVQtSu8cHR0wukU1ZUWiXytnxEaE8gIhJI\/5+9xRuUhFXJdiIdq0Jq6oXrWqvG5FRYeFhYUMvPKjCuSHgxTpj7i4OPl\/0ZBlx4+dUoxa3eowhkZNSJ4atH\/70opBB\/WqgycP7sjrNT4+HrGxscjPKpBfD3z\/tG8Uo\/ZtZoOo0NW8YAjJZW6f2A2\/1k5KT44t3zZB0uNHoGjSUofmDle3PUzZLODs2gW8cAjJJa7uCsDqFnYp1585woa3x\/PkJLoyTTq9TiyfrOyR6ONlgTPev\/ACIuQDcznEB77NbRWD3vNzbxo0TTprnVu3QNl1WETUp1fN5IVEyAdCdKb0bWqtGLRIPVI06Tfq0uY\/ZW5atEIUA+foIu7sQkhOc85\/fpoUozmO\/DaK5kOTzr5uHNgKv5YO0qhFL+q9k\/vzwiIkhzixbFK6OaCTy6fQdGjSb69bR3dhTWtnZdOA3eN68AIj5D2JmDNMZc7mytZX+WEDWZr0B9Sdc0fSGfWOkZ\/hn9s3eLER8g7sm\/KVNGdxhyoMWqQWKZr0e+v+lTNY26GMYtSbv\/ZEfMwVXnSEvAVi4ZjaoM2lQV\/d7k9zoUnnnB5ev6ReqpqyjDywZy3E37jMi4+QN\/D4Tiy2DvRSVhH6tXLE9d1BNBWadM4rIe4GNnSt8tKoe9REfPQFXoiEZIFIDQYPaCDvQMV1s6aNC+6cPUQzoUl\/OD199AAbutdQGjMFdquO+1cieUESkqGT3QUEqe44UyNo0ZNDbAxN0aQ\/uJITHyO4f13FqEUa5M6Zw7wwCUlBmHFAl0pKH471XSoj4e+bNA+adC4a9dMnCB3aMk2rU0fcPBzGC5Tke+5eOI61HcspBr2hu5vq8TiaBk06b7Tjh45KBz1h1OxJTfIzdyIPYU27UopBb+rnIVOEFE06T7V7Qu+XrU5b2CFm\/2ZesCTfIXqxr2lT8mWr0YFe8o6ToklrhA7MHPTSqJvb4uLG5eoGMicOIzQoADGXzvJCJroTMV+PkhvFHt27C4\/iYnAlzB+rW9grBr3tuzZy7oaiSWuUZD+ClFan42oWh5OtJfT09GBpaSG3\/XGvXQuXTx\/nRU602pw7tG0tx7OlhQWMjY1RzMgQg6sVVxol7RrTla1GadKaq3P+v2Fi7RIwLPKJ3DwzdXdjsYlmSRcXmJUowaiaaCUiYq5WpTJsbW3kbt2pY7tGjRrQL1IIAysZy0ZkYls6iiat0apWzhVly5bNsA29oGRJFwwZ+DUveqJ1\/LlkEczNzJRdu9MijNrUyAD\/JT2lAdCkNVsJCQkoXLgwGjRokKlJV69eHaVdS\/GiJ1pHm1YtUKZMmUzHtcDU1BSRkZE0AZq0ZkvsZizydVkN5Fq1aqmikRK86InWUcutOipVqpTl2La0tER4eDhNgCat+SpevDhq166d6UAuX7Ysqlvp48SKqUiIu86Ln2jNLiqtXU3h6OCQ6biuX78+ihYtivj4eBoATVrzNWrUKJibm2dIedStWxf6hQvi+6rGsuFMQOeKuBj0B02AaCxiF++Nvd1l5cb0OqYo+NH\/ybvBV03a0dERrVu35sVPk9YOJScnw8vLCxYWFnB1dUXlypVlLk9fXx89mteXvalTa6qFWQf1qo1ruzfSFIjGcOtYODZ\/2UDZQUU0SFrd0h7jujZBwYIF4eLiIsd1uXLl4KCKrsW\/cXFc+k2T1jIFBgaic+fOcHNzQ58+fbBv3z75uKghPbJgtGrQO7w0axUhg5vhr9MHaRIkz3gQFYmdozvDu4ml0r1ONOgPH9cdj2Ki5Pi9cOGCvFsUKb1mzZph0aJFSExM5AVPk9Y9PYm\/i\/Cx3dULYFIaNYn\/7xnfEw+usU+1ppKVXrx4gWdJT\/H04T3tq4G+GY0DMwbBp5lNijmrF6Zs\/baZ3JmIoknna927dBIhQ5qnM2uxtPzArG9VFw+36dI0g\/7pp4yMHw9MmgR4ewPR0cB\/\/\/6jNcd0euU0+LdzTWfOG\/t+iluHd\/DipElTaRV7OAxBvWqpUyCNzeRFIxrWnFwxVW5BlB9N8cm99HnOf1Vfa6JJv4ooF376T7xGv7eiv8y6zpXUu6akLOle+1lZXNq8kqsGadJUlrfMqovjzOo5GSYXRSVIVOjqfGfQ\/\/77Lxo3biwrCJo0aYInT57kqVGnNelX9fQpEBam\/t7s2apz+eyZZlZshO7D6pZfYGVDS8WcV7dywOFfRyLp8SNehDRpKjsSk4vHl4zHmrYl05n1xj7\/w\/V9wfnCpJNUkWiYyvXSlnrt2LFDPq4pJp3uQ+X+X8r3J0yQSWqNej9jDx5SjaevsKjip1io4o9aFeDb1BoHZn4r8+jvq8tbgCVuwMRCwPTiwLbvxDjO\/WtnXSdgXIE3BUPA71Xe\/HNv+7sPY4A\/6qjOf0H1v+JrmrSOK+nfBOyfOkA9oaNUgphj+\/B2uH\/plE6b9LOkRIwZM0aa85QpU+S\/Y8eOlY9raiSt+gyR31u\/Xr17jya8j\/euRiGo1xiVOdfHwgoqgy5fV0UDLKk+DnEnL+fI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AJ5+TpwNnP9gTI9ahHsfLFlPEi1\/DSzUQGAr9sUBYNGBHct97KmmfU0LShe0A3HqWLcY9+eFhKKSDj2FU9u2M6Gw8L4MfCdSa5gKyXh2BNhFo0MS0rE+td\/qqd\/p7+\/fz9\/PTn\/PwQB\/37yPPu6Ofm9\/Dv7eXk49\/d3djDoJ3CiGq2AAAXqElEQVR42u1cBXcbRxDW6nR3OsmyJNsCO6pBZtmO7ZiZGWJK4thO4nCapE2ZmZnkXCkpMzO3v623vEdu2r6m7WunfW0iLcx8Ozs7MzsrjzM1VB89lu7rjEciyURNxUDTSpvnb6aWocGOcCSqSpKaKk+2N040t\/7pMevXksZ4Su+Y5++hWH13e4kGRJIiXVMbV3j+LtrT06VAhrKIMEtatG+y+s\/BHJVB1vgHSH8L1NWVcQkwobJcNrV3apfn76Ch\/ipZZIejnerr2fuHh51IaoAMpfR5LjedSpdQjO2iycrAnOdyU32Xyhiyg60ljrX+wXGTfPWAeplVuro0imF2k0yuqmzxXE7a6CjBDLlira2Ox\/6QQqtAkOuyqnRL06rGJ\/cXegM+SAVef0hgKdHjuWwUG49ztcstLPAVbUEq8hUU5nKWUmvDf2DsA7LR1weHg2NEPJePdm1GqVChQsQBp5zioMK2WceVnstDu0oZR\/mBnC0LCSzFxxt+9+A1QAA6q3ouG83tl4hUQYyyTTA\/EUsLH70sDsipJcKRUpi35UiBEF38q3+3AxL+m4Ae3k+scz4Vyk4+CnVkyvPXU32dTBaeKrM71EDrGv53AH0ig2EOwandqZjIVVL5l3t6V\/bKDhztgFQrGjUvWfz2+n8D0NX7iTpz5dntzceo+vMLdnPBColOT7R6\/lKaW5KBWZ1rA\/n0BFT8AktF+FOtt+yfD3RLWkPMFlDm5wtDWZFC3nmm1Ao+f1b+7Jwnzo43NVe7WPsrrsYceZkq52fNFCqopUpdiO305D8f6IPYpwxQZeZCccrfQeXKhWKVdzuo9L6NoebmlZHYJZiqa1ejkiSlkksLjq2nolmRox1+B46UIF39APyrVGdT6Ya5+qaxc9dWDi6carkEoNsWmyYGBirXj87t3I73K0aap8aOLZ+wBKU7206ePdZ9beVU88YdbjFuRMS5tjDrTPnzBGk\/1J++WbPLe2KyMV4iQVKjif7xU9s5XLPnFJxLyQI5tbRiF2skCQR9rg26cKRQhfcZ20xONJs5mhlYLZFkTDBZU70d0LGh7nAUttaMf9Vk\/9nT5sGmx9IVFemxhdjp8S5F1Qwxy8Nj1Rz84bG+KklD3WU12dgzRzvVrJUepJu4D1tDos4hIeaWNAQIlauACK5kgZYRgW6dqlGBKetTkhl3zfidPJASGks1zbYWHSJHOxTOkKokIykhrMrdjTnKNb40AT3XfUZGc3CWUl0LDW5Ay6sSMMfAkdFTAsybSVUGcL1qIjS7BQzOx3dhmJvCUHxhLi2Srp9ORxAoUhWBel1CLJNdyELbxOjxjTt27hqarFBkFjfUYqmyBtcc6NOH43R2TkCLH9vnnIvbbxEqVbpoth+LKWSFc8wcqZn1k6hd69mOCGVJCRCOsuKCjQyU2\/JQUOReDjUHGn\/rkG4Y3aC+QkaB4gHUCgiMty\/Dr3sSmlMSrlwln4LoKoq\/EgAynGeSKloqhH+xo41RwDRoN7bRY3upbWoOS5Z5mK4uOAFdiU+EB6+\/+eaHXiMt491iuIl9IJ+Jo2Rlq7iVj9fRXEXh1jzyO6TuGDXNy51E6W1Yp0pHnIF25L99eR+abD2qubQ4tMszvJRyFF\/4TFahSk8hpryCVEBNV1utaj+RS\/Fir6OTAtNyOMKHDPkNEmxP5KDdfsyVw\/Y33qzrb76u60\/QptHGFXZmlABmOHZQpd+wjjPTS6TPxxwlqULvOqbwBEm+16CgX6EfaOFFd6Bz\/bB1vp8JEJ2A\/FeHLUgqVEp5tac5rHHpC43uhX7FDrqh0jE0YwjbZ+K6TTsctTMZTeh4ZpAo9J7KFFX2giIWQhbk0ti42xLZxM7GEau36N+\/d\/782xf0p9myKwNE2\/r5FqslIJ51Ov0nFWEbK+sxMsMA5ShYnMO9bcbS6nSDBWh7OsUXVGhiZ4\/hIlUhVTTIjwQtxiPmw5VIJ6n4gTw+WSHBGi0cWjEj0pUA8zjQOACtuZ1GRtkWAUrTFVQqoulBS+SeFySbq79FxGaR7Phn9U\/OQ3pfv\/625196g7StG4LD7olwhc7HHJ1y5GjncJ8M6Nk1Tj5su1YCeOvlOGcQQOKIDWg7\/zlk50qjIwZE8I\/wU68YbAThQUTE91sj6gDq7qXjax7PKFIf\/CWWatbjQlNJgIinSlu6JbycVJlFqP2Y0wGu020TVWSpntHfP4\/ok4uo8TWvcgx6kC3LY4YDJBfdOBpZU2XIkBzvofo8ifU5VwTOEmwl6k1Au2QecnA0IZXGZmQOtIJaUt6IC6AUO3QPmoFuQUdhIfpOQZ3ccwYNR5cSUSmaOLBA47nBKPfD7OTF5vUgg6WRHmA3fK2fx\/SCThp\/8B2yWj37PI2wkZ9vsZJpjyu1NXWdiUbD55jD0VO1HUd5uYilzB4RaFPmQVyfAnL7clTjQPMVIUeRfVF5dw605BlGshcxhdYmYfjgDvVE5QSD2TOcBKbI3WecBH4vt9UBrJBHSZqon\/gCt3609an+Ewb6zYsfkcYvv4YPiP5yZMu4Qo96tqO248ePz\/BDux2IkXtOAJ6DBk9FYlib1dIxEeggwbjAr+AbhiIT\/5FJbjqQqAF\/Vsln0TNfpiLjHM31+4PU2AdEoNcBoEdhLjIc+zyXTjiRWShaNZJAZlOhMfGx2Yhxlq4xvviR2Ogv9c+yL770wcuo9Q3ULaKWA9n5yMilM7SzA3LEkBMiylBARDq6IAAdNDVmJpfzv8qAhiuAnUlOuTxjyyhYhHVaADrNDp55NOjy78D5CDp28slGUZyCYy+a5ZjHU9ZRjhF88Tb0xWf6J1+cP\/\/OBf0l9OE16MMbGdAhZstA9+\/JYUeR2aFzc+J2OA8NGr6dAc0bi1SYI\/CPWKJJRO69YpxzeA5R7I8\/ZUDjG50CZpGU33P32gl4\/Cbqg8iAH22++j5qnV9FyvvuG69+pkO6+Dxpfiv+\/N1X8V+fRN4mYnHWnrsaOTVUZqGhE9VtO3fWoZPdkSPmWhWjI3qZAs0PPnf+swLQ3MnGHxeRY9a5Pwc6ieZjjDXaleRAIqraKNJbGTui8fiNOHOYxJnycOBCY8d7IJ4vIy2+7uvPr99CuGJN\/+ibry8a0F+P1PoGtvRJG8z1a3FVspKmJiuah1SqNhxnoMkyZSnAses1Ae2nuZSUEtUs\/FOypCiiccADvWKejRHlF4GOorOQzT9ug1lxjGZh3iDJt6mXRtL7OzrqaGFKrrgEWY7zh29YkyKIias+19\/8+Z2P9QvwUHyJjgoqrDcv\/cb4jixpyTiPvYqJf53MdO2v60TFKhRYH\/IlEgLQhTTKr4aR68FVEhqYbYrga2gDU8cmK2S2n4uwPsuJw8OnW+sHFOJbm4BW2RhormFr9UNccqunifKERB7NwxAiXbxmlXhq\/t7bIM4vsiHwiu1va4Z741P9HRTCXHjL+MvzZOntPsfZuOqEMwIPMH8lh0R2jIidpvoLgMKB9qHv1NERGsOTmo9iE\/9bzJqBCcMziyW4QmOnsfP4FWTPTahYfneg5b0WhY7L7qUrnHOnfDEzlsT83XeTrusX7sQ4S4moTErolM02z5ES4zP9TepZvyQCXWlR6D4NuLLEJ\/W6NAnQ7Q8kDrQf4Sxu5vESLhw131z3IxDQE8gVyeG+SdcGD4CPVCFW8gSgJbNGn3Ys53GnAr7o7mJBul9\/\/YW3X3hdf+tWOO1iQ1kaXhOUxDvqDa4HDamv01\/AQL+tfyACvWnmaCHyGxzlE3\/FmfxI3ZGeMKCLkIodjIlu4qQs8I+J2\/cBFKtxjysEP6y5XWSzCeHqdTcdJ6zlPLi5ncjsRXiZ7cSt9CNZaID1V94zQHzvFeTOxaEsrWXLPQtXwlsfN6CDkKO0JQ0gYbjs5BeWvjjrRkjJchnQjP12S2SWQTjSZTGDtMjuJvhk6pA5d5YmxwU\/DOH\/5tliNZnn6wW\/ATS2HH4XwoDAMb7Rv0AofqG\/BXNSHjMtGxvnVdF08MMwG7Yks+XtgKbYFXvdiAdCDOiQU\/zQLDPLELIALbXxpBQbbc2aV0YqLfjREdY+H85nce\/C2wMtSuxO0Ci\/9cp5TK9\/DstCrHdbkIuv8WH4E1yK7A1MVUrMly+bMtge6EtgiFtwnwCeRaXL8fd8YHZsRlGDMyzzFWJaLtIq2l4c6HZ2UBegQcxi1bkBPf9ngJaj1tKDLkN\/XruI3buLr0Gvmtl+sGC+sHc1HaFLBzrAgKbg2Ysce5mRzWcDi23LgUnLbf3TCDr+\/QGWvCtyCMEPQf0J7jDRbjIjP3nciaUwXmam41OYp7RyNQ59xddQwHLLA4gPnn3pMof9UMCQ10xmY7Y9MU\/aBHTCBlQjA9orAs24R7dATB0Ue1kwMvIc6GPw77nC4Wly8Kawp2+P4gOip+zblh6F8cmN7DC8ytDoA7a60TWc8v3qqx+IvzDPNpk6Y6oR7LRX\/\/uZh0tl925PMGX\/W0AvATeg2x2ArrL1H0PhHAd6UQMmsbR10\/1exh6vBATP2Y\/7bU\/MvXvh+wv6FsxQN9krEKIkHLzO5jeCcINoO4+Va8B56TFhR8GdeKwMgaY7udy5rNcryMpi1Rr0fdRsOmwVV6MW0xGLIDeFR1PxYZNKr9puuHPwpuZA+y4F6KrnoF24+BGUsd1eIdkSIeEg9P4s8btcGRNVukux6nQxa8pl356AHI2arrK0PdYLySg\/DC1AZ1ADhFseyzEOWSXKmIEmN6Eh4UakRpxzbjIT1QAhbpbnRTjyspdCym0\/fvUyLkW1vRnYexJ5bS+jk5PQDpbTzKpih4bFiURKYxzxlKro2ef+FtCpDM6msZPgsIWlHsCVygJ0HWrQbnbXOiz9T5OF5EDPaEgp+MENllo9JqiNB4ft7e3hTomZNW4tuIzAQrYKh+uo8lgTzCNjNVUoqwQTIbA5SXPziaJNMRPU4939HQY1VvHrlGKTZcNlj+4sgchypzlgibSaD42wY8Di5aczD1gCyAu1ZIkOk4XiQDfE+XFYhLmoOelU2VsBuEMXsu9arTMsUHs5l4qI+DzR1zpr5V9vSgYoT0pS\/2paxirN922qssHh5UUjYAVNPEkY5B5UplSkME6FkALvGRxw8JMgbbpa6ubViMVWoPdjPxMAuhIK03MuVBXd\/dz9m9TwmFyBQHLQlv9frCN5bn6XxxxDH94IbYKFw2VmoSIcg6EZriIWOBWpincdnmUhWAQORBbiI9i6byNC1p6n4WR79XNZAvC1nmcrqnBNqJoRtsGgilNOPj\/aNPvbLUkleZMj3TIp2TNmlsTtItp3OdzkHhJOnlOdbPdzoBuQtVJqxeyxlJk23dG2HSQ51gKeWklqsBvnFJS2MUY3JRoP5AXhcBCBW+FVN8FDK6HVYiuoqu2qd9+9Cw4EYxV1wTOg8bmKFGJVG8sErd45ezW5GitkfINIBFDgi7GBYCan7ZzEVsWXawgeJ6aDHzLygVZqLftJY77SdqBbEpacrNx4kjK3nGS7XwxopiQh9gjSYznevUJc6n1Do1ACngu\/G18ERthOyKOVKUiu0+sJGWNAlUtGJYLwrHuDGhNZOUtsIcg+\/7lu0GffbF1H9uAsVtbdBGl2QTBw9DQ2Y+O08k4sHJMHOvhVBCnKqJgxWIqd3Dwj5vLz4Z0PA5pvZLV\/6PYr9kx3RF0T\/+JVxDnbLUP56IoxW9uRjJTlWVIxcsyIV\/QF3AVSkzV1dRmYaDdJVasgVO84xGcKZMlUNfvr4hQDP\/0KaMi7vwZeCgp1eYswRyQZOOsXvn\/7l0\/0z3\/4Dio0LE7A+zxUSy6ueSdNrYqUq7KVo1ykvxszKkGPdwKqoqRkQC9SeXjHgRbvvWSNtOWmyw3oUyX83sxLu5dEyiXA4nsr0GURsbzex046q\/fg3eLKIk15hqM8E1LIzz3Abicpo0DtgEHGd\/DvV13z1Vs\/voQfUm2UocLSixdQ1dI7+p0sRrsdn3O5tTQJ5EIFAk7SOU+sF\/DrpRBvZuYIfiGPssPQ5erCn8OEBY5Aexp5iaA9U8yrl8RcyBh\/WiEWaNiv63mOsW6fMZPMjkd7eBgUGK2aTRKV\/uZ6HdKn2CqiGO9dmoh+RUdHIX56EReQxpbeTv4isSKq3fD\/zyJBCslGcK4gKESHUD0HGt+SCDJb9jeQgSPQKyX8zBb7syI5O9Cn+2Wi065QhwLm6p16OFMVIHqCjxixebFgiKRSz5gMe3249a3+8fvn3\/9E\/4w72G\/pb9NE9KsQL3KelGOk51nRpGKF2WfKxUWhzd+3JGqMV3GriZErYhxoKABfS1byyM\/UuOQItOdql2odmPUiJazW7N5shtp\/\/gA4JPQLIty4PqcmUWw\/IJlKdfLprsHNeaVStWcf0tDInUR7P9ZpPccbd31qAlpupx4\/PpKUHZylQn+Wv3\/LM+96qbsBXSlGTHuTsuQvzDPryQlTSRhrnQuFzWdj+xR08Bx2Abq1k9T5sZIyjFY+mb5I8drSqMO9QHgTQib2BbwGBXy8BLAWDyUdwn72nj7LW0DYoxhvGi5V1XGYCEUtb76AMX1P\/+yN7Is3vHTNh1tbX1HT8fpNohhtYyXEfzO93\/RBEhPj2LXU+vfinbCuIsuJRSW5RYIb5yg6uNO5yJETb6xWlrkA7TkeYfLz2Yz\/smWyA+0ZCtMaAVEux6JfoJXuYrfkrEbWqXAVM3oYOX2I2ZvepPn\/b3m7b\/UvsZY\/BseuZIUyUKeJ1XKlAsyRfGCW7WeJ2ljXSlx1wNiP3OtAFtWN\/ax29R5XoD1TiEV7d9JWBJrRySWNbEs3qO\/204cb\/OHFdMRe9c2K\/sh7eBxxoePw5tcJ0Pr1vOEPuv7xCy+8ot+CYuMhHl42wT4YakeWamldodQ4yzMnaQ3gPm6rIsEnkiLQkGwCBEjjxl2eFRPQ8pJwB3uwHNi7c9\/N6\/RgtLo\/xR5f2QXbXRCiia9D4t3AOgFD8eaZ1CEQIq3pq\/E12O4WqLzIlfuUFute80b2qm91gx5GmyUjpiqP9mqcpXnrugcVytGomBHaoI++QszWis8dACmU6UJesM8gWgErqGWel7AvjRpKNRthTyvQOokhM912StAndKcaECTjA3Nh2\/oZIPwMiXfHbvrQvSCf+9aK+f1PbDnBHOdggQ9RwOunravGUCxH3yQ9oF+ASH954eIHzxt01WskK\/rqdc+TKMZ8Qzgn\/iROyO\/17kAU8AaFICa+bi772XO1CngXTH6FcUQeb5XarzQU0ppJC6Ln4BK2khcchEXztUVTHLDuhbh7rj39vWbJ0HU4v+TiPaSMLbkzU6MBl9ZaoocrGsqW3Kfrr7z5iq7f63zrkdy0jt7cywFx7KNWDFv7nB48IwMX\/lePxIjRS7iwLRYF4qc6V\/TwcA+UVJwy3xAMddEv3VGrOm57e1UHH7W6A9fksdPeTZdf8SpJzwlpIKxCd91yk37T4685\/xLVmYP2B+axJv6M0d5FCi87vVBYWaJKbXkOO8A5KlVkQMSKSjKwDS1HD41QP66CrJwhU40Ngj0TsOzSNoCkqgCQSkuu0Bzq+v6IzLEWZ1bDeA47zTGmRT4PmFVtAxlc+6jxvkQU192mF6EC2aFuPlAl2yUxKLo27fbkvKyRGR2uoNeKr0anRxMSgIyWJAZnNpOCWqJPlfRJQf8q4\/iJslIxeMohV79p\/gk7qGQVM0cOlEtwpFS88rgjj7uOLBnTIuLzqu3dKx532jXeVWWoBSWtvG9yxPrs4bjZxhhLXt5+dY9x2LSsrJ8rrVze5hcMT08fShiSiqRGGnv2cG12kH58LSKh2lYDIS0VT09Tp5RDXRGu2V86eAJuy4V0XNVkRJoaX+pptWz1sf66jNH2lPNkLUdHEyV4NlmTquomq1Gt4+ZSb+YAhtml3\/B4aSahwAr0VPmZzrXK6REXmTgrrWWTh7pq2jvDdf2Hm+ecQFsx\/AG6m6SanpOtDmO6jz9y9HB\/XbgzkVgN9zVe2zTccgl9qpsHr02nD50bbJ6N\/WbrBtx64Nj0lS2eP0CtM+vdh9KHKptgfvnvpb2D4ZQkG3qjJoyU\/P\/0F9Lehe61vsaJsv8czL8Ck63xcekdb0wAAAAASUVORK5CYII=','data:image\/png;base64,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');\r\n<\/script><\/p>\n<ol>\n<li>A soma das amplitudes dos seus \u00e2ngulos internos \u00e9 \\({S_i} = \\left( {25 &#8211; 2} \\right) \\times 180^\\circ = 4140^\\circ \\).<br \/>\n\u00ad<\/li>\n<li>A amplitude de cada \u00e2ngulo interno do pol\u00edgono \u00e9 \\(\\alpha = \\frac{{4140^\\circ }}{{25}} = 165,6^\\circ \\).<br \/>\n\u00ad<\/li>\n<li>A soma das amplitudes dos seus \u00e2ngulos externos \u00e9\u00a0\\({S_e} = 360^\\circ = 25 \\times \\left( {{\\rm{180}}^\\circ {\\rm{ &#8211; 165}}{\\rm{,6}}^\\circ } \\right) = 25 \\times 14,4^\\circ \\).<\/li>\n<\/ol>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_13449' onClick='GTTabs_show(0,13449)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Um pol\u00edgono regular tem 25 lados. Qual \u00e9 a soma das amplitudes dos seus \u00e2ngulos internos? Qual \u00e9 a amplitude de cada \u00e2ngulo interno do pol\u00edgono? Qual \u00e9 a soma das&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20501,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[213,97,278],"tags":[426,465,464,188],"series":[],"class_list":["post-13449","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-9--ano","category-aplicando","category-circunferencia-e-poligonos","tag-9-o-ano","tag-angulo-externo","tag-angulo-interno","tag-circunferencia"],"views":2743,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/02\/9V1Pag145-12_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13449","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcomments&post=13449"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13449\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20501"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=13449"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=13449"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=13449"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=13449"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}