{"id":13864,"date":"2018-03-07T02:35:11","date_gmt":"2018-03-07T02:35:11","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=13864"},"modified":"2022-01-06T17:58:41","modified_gmt":"2022-01-06T17:58:41","slug":"determine-o-volume-de-uma-piramide","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=13864","title":{"rendered":"Determine o volume de uma pir\u00e2mide"},"content":{"rendered":"<p><ul id='GTTabs_ul_13864' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_13864' class='GTTabs_curr'><a  id=\"13864_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_13864' ><a  id=\"13864_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_13864'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"13866\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=13866\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\" data-orig-size=\"195,245\" data-comments-opened=\"1\" data-image-meta=\"{&quot;aperture&quot;:&quot;0&quot;,&quot;credit&quot;:&quot;&quot;,&quot;camera&quot;:&quot;&quot;,&quot;caption&quot;:&quot;&quot;,&quot;created_timestamp&quot;:&quot;0&quot;,&quot;copyright&quot;:&quot;&quot;,&quot;focal_length&quot;:&quot;0&quot;,&quot;iso&quot;:&quot;0&quot;,&quot;shutter_speed&quot;:&quot;0&quot;,&quot;title&quot;:&quot;&quot;,&quot;orientation&quot;:&quot;0&quot;}\" data-image-title=\"Pir\u00e2mide\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\" class=\"alignright size-full wp-image-13866\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\" alt=\"\" width=\"195\" height=\"245\" \/><\/a>Determina o volume de uma pir\u00e2mide com 4 cm de altura e em que a sua base \u00e9 um tri\u00e2ngulo ret\u00e2ngulo cujos catetos medem 5 cm e 12 cm.<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_13864' onClick='GTTabs_show(1,13864)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_13864'>\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=\"margin: 0 auto;\"><\/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': 1,'AV': 0,'SV': 0,'CV': 0,'EV2': 0,'CP': 1,'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,iVBORw0KGgoAAAANSUhEUgAAAvkAAAHQCAIAAAC0leJMAAAACXBIWXMAAAsTAAALEwEAmpwYAABbsklEQVR42u29CXQUZbq4X54+wFHPHY9XYXRQOYwsIWRHQGcUDqiIsigCI7KkgYR9J2SDQA5LwhL2sMhFh+uIOiMiokCCyo64oeM4o15nUBEXHHEZxxmVe\/39+\/9Vfemiuru6u3qv7n6e8x5O0kl3iuqk6+n3e9\/vVVwAAAAAqYvCKQAAAABcBwAAAADXAQAAAMB1AAAAAHAdAAAAAFwHAAAAANcBAAAAXAcAAAAA1wEAAADAdQAAAABwHQAAAABcBwAAAADXAQAAAMB1AAAAANcBAAAAwHUAAAAAcB0AAAAAXAcAAAAA1wEAAADAdQAAAABwHQAAAMB1AAAAAHAdAAAAAFwHAAAAANcBAAAAwHUAAAAAcB0AAAAAXAcAAABwHQAAAABcBwAAAADXAQAAAMB1AAAAAHAdAAAAAFwHAAAAcB0ASJW\/Z+UwJwEAANcBSGHXOcNJAADAdQBSVXTOKspHnAcAAFwHIFVd5ztcBwAA1wFIYdf5p3AdRTnIqQAAwHUAUth1DnEqAABwHYDUE52zivKtopymFQsAANcBSEnX+UJR\/qG5zrucDQAAXAcg9VznO0X5RrqOorzACQEAwHUAUsx1\/qkoXyvKh5rrHOCEAADgOgCpJDpnDa7zDq1YAAC4DkCKuc4XWmHyV7gOAACuA5CSrvOVVpj8paJ8oLnOIUV5jtMCAIDrAKSM68jC5HOa67ytKIcV5XlOCwAArgOQGqKjF+t84Xadk7gOAACuA5AyrnPOzHVoOwcAwHUAUsR1vnYXJv9dUd53u84BRWnk5AAA4DoAKeA637oLkz\/XXOcvmuscxHUAAHAdgBQQnc8Nhcln3a7zmtaKtZ\/zAwCA6wAku+uc83SdUwbXoe0cAADXAUh61\/naUJj8meY6f9ZcR207V5S9nCIAAFwHINl1Ry9M\/tTtOq8qylHfVqzqavHNJiFuBwDAdQDA\/tJzRrOcPf6+AdcBAFwHAFLZdbzYuNF17bWuK65wrV\/PyQMAXAcAUst1Vq1yXX216xe\/cK1Zw5kDAFwHAFLLdZYudbVs6WrTxrVlC6cNAHAdAEgt15k\/3\/Wzn7kyMlzbt3POAADXAYDUcp3SUtell7pyclw7d3LCAADXAYDUcp1ly1wXX+zq0sX17LOcLQDAdQAg5VyHnnMAwHUAANcBAMB1ACA5XQcAANcBAFwHAADXAQBcBwAA1wEAXAcAANcBAFwHAADXAQBcBwAA1wHAdXAdAABcBwDXAQDAdQAA1wEAwHUAANcBAMB1AADXAQDAdQAA1wEAwHUAANcBAMB1AHAdAADAdQBwHQAAXAcAcB0AAFwHAHAdAABcBwBwHQAAXAcAcB0AAFwHAHAdAABcBwDXAQAAXAcA1wEAwHUAANcBAMB1AADXAQDAdQAA1wEAwHUAANcBAMB1AADXiSrnf\/pJBOcBANcBgCRxnepqceuFcDhcl1\/uuuUW19atsTqIOXNcO3Y0fVxV5br+etfFF7s6dnQtWBDa40RyX8nmza6rr1bPgEQclTg2jX\/99JOI7wzxL0P8W4vvDcGvFgCuAwBJ4jpG6SksjP4RFBVd8BIhFuKnGH\/oxIkhCFPY95UcOuTq2VO9Y3X1P86fl+GaP99VXKx\/ajG+1eKf589\/5w5+0wBwHQCwmevouQ3JQw+5cnNdLVq4Kiuj+ePFTxk06MKnQjUyM13btqkfP\/igq1071003uRobLT1UKPf96vx5Pb4U8eOPIlzjxjVJUnX1uR9+kPHFDz+oR1hd\/YX2sYxzXvHjj+e0R2gKw4PL+FqLb3R\/AgBcBwBs5zqCRx91dejg6tHDdeCAubWYZoNMH0qye7frxhtdCxc2ffrYY+raU3HxhW8YPdrVpk2TvgTG\/33\/\/v33Ij53x1ktPvMJ15o16upV8+bygD\/997\/1UI+wWzfXrl1Nt3z\/vVf4Ppr8KfoP\/bs7vhDh1iNhRdKE+CUEwHUAwB6uIxg71nXttWqOJyquM3u2q6BAOETTp3V1rksv9aizqapSM0m1tYH\/C6qpuO8rXORjLfT7nvnXvz4S8d13Mk4b4kN3uBoaVOu66y41tAP+4Lvv9FCPMD\/fNXOm8cYPDHc\/7RlNP+tf\/zrjjo9FaEel25LRinQfkibE7yQArgMAiXMdcWOzZq4lS6Lwg2VxzNChF25ZvFgtuDH+XPGxuGXRIt1p1DyKtBnNIaTECL3Q7\/v+P\/\/5Ny30+\/7t229F\/PXbb9\/79tv\/8Yp\/\/EOGWofUrp3rkUf0\/7v+paZvGDJEJrQ8bvd8tPe0H+QR7oM59c9\/igP7QIbbk3QxMvrQJwYZkhrErygArgMA8XUdg3xExLZt6hrT9Om+P1d3GvWWiy5yLVyo52OaciqaOqga4fYY\/b7vfvPNO9988\/Y33+j3\/fPXX7\/19dd\/8o2vvnpTC1dNjevnP3fNm6d+7H6cN91fbfqeqVNd113neughcS\/fh3pLiz8b4i\/ffCPjbXeIo3pXC6Mn\/dXTit53y5CXCX1sECB+YwFwHQCIpevMn69WtAg5MNWgkNawlixRU0TV1XqSRv+5H7qFRk8jSSF4z52MkdIgHUIqhX5fYR5CTf4orUW778kvv1Tj3LnXzp175YsvZLzsDnV9KjfXNXhw06fux3nZ8D1Nt2uPpj+CjFe\/+OI1EdqDn5Qhf5wWr3\/55Rta\/FE7pD+6zUk3JF2MdBmSGvRXtwCd8rSfpgyQpj54DwCuAwAxcJ3CQr\/FwgFdx2PhSa46LVyo5l2qq\/UkTdMt8+frC0xqzc2ll7rq6qTQSDOQovCm2x5ECJnQ7yuc41XNQvT7vvTFFye++OJFLY7\/\/e\/HRHz+uYijZ88ePns28GEf1r6n6du0hNaRs2dFHNXimAjtoZpCe3DxI150\/7gXtR\/9khbSmZr0yK1EugZJAXrLj\/rouR898XMh5YP6AOA6ABA119m+3dW+vat3b98H8a2k0Z3mQ8Oq0ynDwpOaHGreXK46yYUnV32968orXaNH66tOail0Robr8cel0Lyup0y0PMqrhgyNfl9pGMI59PsecfvKIRmffXbws88OfPbZC1oEdp39n3wiQ\/02rdJ5\/6efPucTz4twP+AL2oOLHyF\/3GHNjXQZkodnUX3+HLb6sNoFgOsApDZee\/9Gx3XEg+bkqFsSmyVpvJxGF5q\/GaqA9UqaplWnhx92tW3rmjpVls6oq05796qt3UKntm4VF351m+Z27Vw9expXnTySNJrTSI0w3lcYhn5f3T+ed3uJkBXhLg2ffLJPxscfi9j78cd7tND\/77s\/+uhpQ7imTZMJLXG7iGe0ePbMmT3afeWD7NMeVnUjtwDp6nNIU5\/DnuojM0AnfNTnpI\/6\/MlUfdx1Px7q417t0tXnE9QHANcBSDEMe\/9G5jq+0ayZa8wY0yTNe4a2Ji+nMZYGv2lYdXpd2EyvXq4hQ4xJGteUKd47Nc+Zoy886SJimqQxvW+DW2j0+6pOc+aM0BTpK0ah2SWcxv1tT54+bQy1D6tXL\/nxztOnnzp9epfhjrsDqs9zAdXnqFQf9+KXl\/q8Zqo+2snUK6DfNqR83jOozwdm6kONMwCuA5D0GPb+DfKdcuFJd50LlTS+87BatnT16ePats03SfO2oZLmLXd\/k7GSRi\/UVQt4PUuDXSUlaq5oxw594UkVmtmz1Y6n5s3VyVbz50unkUKji4hvkkY6jdd9VaHRnGa3QWJ2aU7zlKYsOz2FRnUaM9dRp2KJ45w9+0mf7zdVH9WihPf4qE+jUX2Mq11m6mMs93nZfd5ec5c\/q1XPhtWuIOrjU+NMexcArgOQrHju\/dskNJ9plTSf+Kmk0V3HYpLGtzpYXHQDVNJ4Lzzp1cFnz7r27VPHOMybZ1pJI2xAL4jZr4mCEBrXrFmuVas8Fp78J2mecjtNk7Jo9zX1lcAhjlDdaXDvXivfbFF9GqT66BU\/\/gp9gqqPu+HLSo0z7V0AuA5AEiMuUT57\/7o+Mq2kcTuNTNLoruMvSfOmtSSNUWheNFTSHNWu2cbqYI\/S4EWLXAMGGJM0jXoxjWcljRAatWaoomK3p9DIJM1TZkkaD1\/R7huG6Kj37d\/ftXBhePdVj007SN\/Vrgvqo\/2XjerzgmX1ob0LANcBSDWhuZCk+fe\/vZI0Pnv\/uuQ+e\/6SNN8rioh\/KspXinJWUT5QlEiSNIHbnUyTNE2VNMXFrgULfJM0pk6zMyzhiCTU3vWxY6PyUHrKx5\/6BK1xNm3vOm65vetP1tu7ND+mvQtwHYDUpPz06eK\/\/W3GBx8889VXi86cER9v\/Oyz+DuNv2EI\/pI07r1\/XeLSpbuOvyTNvxTl\/7T4UVHEx98oyueK8pGivKtleHShOWE5SXPAT7tTgCSNXkmjdjlVVLh27nzacpImfqKza1fY2aAwVrt2R9DedTRge9drgdu73IU+7xi2daa9CwDXgdRk3unTRX\/7m4yJp07J2HHuXAyTNN9\/\/4lPC\/eHhmEIpzyHIZgmadx7\/7pkJY3uOm8YF54MSZr\/pyj\/n6L85Hadr92u856ivKEoR0WEm6QxcRo7JWnsHOaFPmbq0xiD9q43I2nvosYZcB2AZOGJc+eE2Uw6dWrnl18+9eWX4gNhPDM\/+CD+SZr3\/LQ7ebRwGyppAo9neMlz4em8ovw\/LakjPvi3onyrKOcU5VNtDesdRTmpKEcUpVFRwk7SeFQH2ylJkwrqE1J7l3u1K+z2rrf8qI+\/GuePDDXOqA\/gOgB2ZO2nnwq5WXjmjPx00Zkz4tPy06cjTNKcDjFJE3gYgm+SRkRg1zEmab7TFOd\/tYyOFB1ZrPORovxVUd5SlFcU5aCiNCiKeZLGx2lI0thKfWzS3nXa3d5FjTPgOgD2ou6TT4TcrPjkE\/npCu3TZR9\/HDhJcyaUJM27\/pI0Pvvs+U6s1EuDXzKrpDFWB+trWL6VNN9q9cj\/1paupOj8XVE+VpT3taTOG4pyQnOdvYpCksbOQXsXAK4DEJHryCRNk+t88omVYQhRTNIEandyT6z018ItK2l019nvU0nzpaY4\/9Dqkc9pGR0pOu8qypuK8rKiHHa7Dj6RdCmfCNu7DselvYsaZ8B1AOKKV5Km\/rPPhNxUf\/SRFBrxgfi08vTpU\/6TNO+EnqR5NXCSxmILd8BKmukPftxhqPqv3sKtJ2nOaorzhZbO+VRbupKi8yetA+uoojwnF7AUpdbpRCNSY7Ur3iMs3OrzF6\/2Lu1vB\/UBXAcgHk7jL0mzQ6tNnnzq1NNffSXrlIXrlHz4YWhJmmD77HklaQLss2d9YqX1SpqtTudvnc6HtBAfb3E6Nzud9U7nWqdztdO53OmsdQfSkNqFPjFp73LXOIfW3qW9l6C9C3AdgBCE5pOAlTSBJ1ZWabkcGeNPnRqv9ZzvdL9hDSlJczz0JM1zftqdQh2GECA2aX6zxW05G92is8rpXGEQHVyHGmfauwBwHbB7kkYXGn0Ygr9KGq+JlXIvwWnvv\/\/YuXPVH30kPn7g7NnIhyGYJmkawkrSRFgdvEFTnA1uy1njdNYZMjplFc6SMlwnTdVnty3bu6hxBlwH0jVJ8913QZM0MZpYeSQq++xFI0kTXqzU\/GaNtmi1UhOdZW7RWVLknFTinFOuBh5Ae1d027teor0LcB0gSaMnaaxMrPTdZ880SROjiZUR7rMXxSRNeLFUS+Qs1yxnmaY4eiwqGjmhxFlS7iyvcE4pwXhI+YTf3nXIf3vXCdq7ANeB1BOaABMro7LPnn2SNEmxz94DBxpFGBVHF50HDzXKmF2G6BB2au\/yqXF+x2yEBeoDuA4kT5LGzzCE6CZpDkQjSZN0++xJ0dGjpFy1HF1xfIPLPBH19q6D\/tTHs9DHpL3LsNoVtL3rFO1dgOuAnZM04e2zF0KS5tNPUyZJE4noSNeZVBLIddAdIs4jLKy3d\/kr9KG9C3AdCDdJE+2JlcYkjekwhBNmwxBI0oQXc8qdvqJj0XXQHcKe7V1h1DjT3gW4TromaRI0sdLiMISIkjTSaVI0SWM9Ssudk0uc40pMdKd70ZHuRXt7FT1kRXdKKOIhwmrvCrXGOVB7lxwAR3sX4DoQpyRNxBMrj5pVB5OkiW6UVzinzjEXnZBcR0Qp7ehELGuco97edZL2LsB1UjVJ82nAJM37tk\/S7A+cpLE2DIGQUVHpnF7qHDPLXHRCdZ2J2u47ZRXOibSjE+nU3vWBmfpQ6IPrQFyTNGdCSdK8G1aS5lULSZpjUUrS7CFJE70anZllgUQnVNfR29HLK5yzWM8i7NTedcB\/e9eLAdu7Xqe9C3AdeyZpPgyQpPE\/DCHoxMpQkzSm++w9729iJUmauIeQkqKAohOe64iYXuYsLVe3HOQkE+nT3vVOiO1deA+uA6ElaU75T9K8E9UkTRgTK\/fHfmIlEUYIESmeHUR0wnYduZ5FfxZhi\/auaIywiLC9ixpnXAf8VAdHNrHyTxEMQzge2cTKfWENQ+CVOs4xoSS46ETiOrSjE7R3\/Tls9WG1C9dJAaH5JPQkjanThJqkidEwBJI0KbBnYOxcB90hkq7GmfYuwHWimqSx98TKhqSaWElEXXSi5ToYD0F7V+D2rndp78J1kiBJY20YwntJO7GSJA2uE7nrSN0pnk3BMpES7V3G1S4L7V2v0N6F6yRdkuajaCRp3oxvkqYxrCQNTpPOoiMjKpYjo4R2dCLN2ruOxaW96wztXbiORaGJw8RKmyRpqA5GdBLlOiJmlqmbDdKOTiRRjfNT\/mucI2\/vYoQFrhOXJE2wffb8JmksTqw0S9IwsZJIFtGJuuuImKRtr8w0CSJ5Uz67wh1hcdCsxtl6e9efaO\/CdXQ+\/\/77s8ahlbFJ0jCxkkgH0YmF64iYUKKmduQoLp4dghrnC4U+ftq7XgvY3uU9woL2rlRynXM\/\/vjFDz\/8\/fvvP9dCX4cyFtZ8aDQbPU8TeGJlgCRNuBMrSdIQiYrScucka1vpmEaJdvdY6I6cJsETRKR4oU+M2rvchT66+rwZSXsXNc4Jd51\/nD\/\/9fnzX2nx5Y8\/WvGbpvyNYfM9PW3zjqFM2NjFnfgkDfvsETGIsgrnlBK\/M8wT7jq0oxPUOAdq73IX+oTd3vWWH\/WxMsIC9YmJ63x3\/vw\/z5\/\/9vz5f2jxjZfi\/PDDF99\/b0lxvvvufa9qGy2L87Zn8sZDcQxlwkysJFImyiuc00ojEp24uQ66Q6A+UW7v0q5uYbd3nXa3d1HjHI7rfP\/TT3p8J+N\/\/1dazj8MlvOVH8s563\/g5Qd+Ejn+LOd1d4O3nrw5YVCcI26zOegnScPESsL+GZ2gM8xt5TroDkF7F+1dSe86Rsv5t7Sc\/\/s\/KTrfGkTnQi7n\/Hl9ucpLdMzLjc1yOe8YanH0yuI3DDvZvOJeomrK5WhZnMOG5M0LmuLIFShpNns8W7h3s88eYcuYFQ3RibPrSN0poYiHoL0rGu1dx2PR3kWNc0hrWE2uc\/78d9bWrYJmdPSmqvd8xmFaF52jFkRH\/PLtNqw98VdK2DCELliZYR7\/fZODxhTa0QnUJ+EjLPy1d2mpBNQnzHodrzId37xOeG1WXktXb4aydHXAUIiz35jRca9PeVXbkMUh7BNCFMaXREd04u86IiZqulNW4RQf8GwSRJgjLIKqj2ehT0TtXVquIQ3buyLqw9KzO6a6o6d2\/NUjy0qdIHkdrRjZr+uY1h2bVRw\/a1aXg\/oQCd9KZ1wyu47ejs40CYKItMaZ9q5k6TlvMh6vxSxDdsdXd94z6I7c4NhYlXzSJ7Wjt5Qfd\/deeTRe+ajPftSHSMU9A23lOiKmlzpLy5kmQRAhqM9uW7Z3pWqNcwz3EvQ1HpPCHcNi1jueczc99j421O686rmbjlfb+RE\/8zX9tWXtMVMfWrGIpBOdxLqOXM+iP4sgbNLe9RLtXYmaEWHameXVf+67V7JvHY8\/9THZFtm93U4A9TFusbPXv\/qI30i8h8B1aEcnCHu2dx3y3951gvauBM7DMiZ7jMtbxkatv1pTn9fN5kL4qs9RP+rzvK\/6eE4dp8aZsL\/o2Md10B2CSPr2Lp8a53fMRlgkkfrYYs55gEJm7x51z9atCxMk9IpmH\/V52b\/6GAt9TNRHyxyaFPqgPoT9RMdWroPxEIR92rsOhj29y7DaFbS965S927sUG+aaLqhPwH0I3\/Mp9DGqj8nwLLOxWfrMrKMBa5xp7yJsLjo2dB0RZRVqUz3PO0EkrL0rWI2z9fYuf4U+SdHepbhsT4AtmIMW+gSYG\/qqP\/UJq71rD+pDBNtKZ2L02suTxXVoRycIW7R3+dQ4h9HeFUaNs1d7l+49TQXOmvR8HhfvSQLX8VfoE0aNc3zau\/YGa+\/ijzPdorTcObnEOS7GriPCPpajx4wy2tEJIq7tXaHWOAdq75JztUNs79K9x6O62au+x7Ol66wmPX\/\/\/vsvfvgB1wlTff4al\/au5wO3d\/nMGSXlkyZRXuGcOiceomNP1xExiWkSBGG\/GufI27t06ZHrXNJ4\/hRAd7799pRZE7tezmw0nnM\/\/viltlkxrhOsxtlCe9fbtHcRsYyKSuf00uiM9kxe1xExoURN7Ujt47eCIJKovatJetzGo6d5TnhVNHuOqtALmfUlLd8q5iC68\/3353744csff5TTqL52z6fCdWLb3nUyYHuXvxrng2Y1zrR3pU+Nzsyy+ImOnV2H5iyCsLn6iAuQbjy668gcjz6b\/YiP6\/jmdfy5jm9qRy5mnfEpWw6qO\/\/QRnOqI8n\/939xnTBrnGnvIqIVs8ucRXEUnaRwHYyHIOygOMYtm5tE58wZvZDZKDoH\/IjOS55JnZNme\/MYN+axOIbiM\/dUTVPX+cbLdUT83\/9999NP\/\/7pp+9\/+gnXiVN712txae9ihEVSREm5s3h2XEVH\/MRJ2qAGdIcgCN+9mI1dWt7DKDTFMa5ePa\/vzeMno\/OyIaPzukF03jIr1rEuOmctiI6If7rzOkJ0\/qWJjjHOa4HrRLm9663w2ruiOsKC9q602konBVwH3SGIGCVpPApxzJxGn6x+oQXdqxXLtxsraDrHsyT5Hf+bDeqWE2Dpylib\/JWn5XxrsByZ0WENyxbtXa8b1OeVqLR3mdU4096V5qKTjK4jNxssYfcdgohlksYoNM+731F7tZd7bKls2FXZdJyWb3XOW\/4br4KOkvjMrTgX2q\/8FOjQh2XH9q6\/mKnPG6G0dx0OrD6amNPehegktetMph2dILySNJ6tUr7bA4aUpDngmaTx2DDQZ89Ao9N4zYt43WcTnaCKE3jfZH9rVewlmBztXX8Lqb3LWONs2t7lZ3rXAdq7cJ1k2DfZSkx0t6NPZpoEQZLGNEljtvvfc75JGk+nsZKkubAloM+ugF6TsLzmgOpmc6EWx18Kx9RvYrNhIK5jjxpnf+1dZiMsaO9CdNLEdZgmQZCkiSRJczTyJI3nOpQ+5eod3xmfmtAYS4x1rWnK3Nhp3ieuk\/TtXS\/6b+86SHtXWopOsruOiOml6jQJ1rOI1EnSGHYo9k3SNMYlSfOG9SSNsWHKs5rYt9pGCI2x4Mb+l2ZcJ+nbu07Q3oXopITryPUs+rOIZEzSPBtWkuagtSTNiYBJmpOhJ2n+J8mTNLhOkqnPaYP6nLJlexerXRb3R55Q4sR1aEcn0jpJ4x6qEDRJYxwnbpqkedksSfN6bJI0Z\/QkjXuHm5S8+OI6tHeZtHftQ30sR6nW\/TQO10F3CJI0wZI0L\/pJ0rxmIUmjdzyFnKTx3LLv09QVGlwnJdq7PEdYRNTeFY0aZ9RHRFmFc4o9RCf1XAfjIWKepPGaeUmSBtcBO9c4R6G9S3vzQXtXSFFe4ZxWahfRSVXXkfsNTqAdnfAvNGHssxcgSfNChEkaw4bCXi3ckSdpTpOkwXXSQX3Cq3EOtb3rmGd71yHau\/xkdOI8wzxtXYd2dCLAMAS7JGn877NnmqR5zzNJ47vwdMZdHfwJToPrUONMe1eiYpbNRCeFXUdtRy9T29FLaEcnSeMnSdNg8ySN59hLkjS4DkSkPmfc7V0f0t4Vyygpi\/cMc4uRepZjbEefU64aD0KQVkmavYGTNP4nVgZO0ryUoCQNToPrQDxqnE+FNMIivPYu7UUntdu7bGg5Ke86MuQ0CVwh3SZWWk\/SBNhnL0CSJsxhCCRpcB2wnfr41Dhbb+9ihEVSiE46uA7NWUnXwv1sWMMQAidpjsUgSWM6DIEkDa4DSaw+0R1hcdKnxvmE\/xEWhyzUONtZfewsOunjOhhPSk2sNAhNIidWulu4AyRpcBpcB5JYfSJp73ozeu1dz9m+vcvmopNuroPuJPXEymORT6w0S9K87T9J8zeSNLgOgCv27V0vxbi9ayeucwjdIVJhYuUfo7TP3ukkn1gJuA7ET30sjrAI3t5locbZtu1d9hedEm1aRRrqTlmFs4Tdd+I4DOGQtYmVoSVpLEysfC\/9JlYCrgMJWO2KUXvXy6G2dxlqnBtNC32irT72F510dp1JWjv6nDRuR7d5kiYWwxBI0gCuA3FUH2vtXe8kbXuXuIImheiks+uImFDilO3oU1J3mkQCJ1ae8DOx8qSViZV+kjT\/Q5IGcB1IRvWxeXvXntDVR4jOxJKkcZ0U3jc5raZJMLESpwFcB5JEfcKtcY5Pe9feYO1d6sSr8sLJJTYa7YnrWIlppcmxt7IxSWPniZVvRmNi5Ufsswe4DqA+1mucI2zvej5we5e70Edcbyrm3D9t1vBxM0b+14HGLbhOsq1n2ac\/y+4TK2OUpHFPrCRJA7gOpO9qV0jtXW\/Hvb1r3qyhM6cPHTt56G8PNj50sPFBd2w90Ghn9cF1EtWOzsRKhAZwHQDL6hNZe9fJgO1d\/mqcD3oW+lRMuXvOlLuLxg\/63cHGhw82\/vfBxm1a\/FYLO6sPrhNr3YnaxMp4JWmiNbHyE5wGcB2A6KpP0BrnmLZ3VUzsN25sv0cPNWw\/1PDIoYbfHZTR6Ks+Xt6TcPXBdaJlPAmYWBlBkiboMASSNAC4DiS9+oTU3vVasPauSYV9fn+oQcTjhxoe0+JRLQzq0+ilPgFSPltwHRvEnHJnWYXaUhdGkiaKEyuPM7ESANcBCK4+sRxhIWLn4YYntdhxSI0nDjX8QfMeL\/XZrsXvDvlN+SRktQvXMcZD7vitFiVzRlSWjigpGRHexMrnozux0ixJE8nEyg+ZWAmA60Daqk9IIyyePtwgYtfhhqe00L3HqD6\/t7H6pKfreDnNtkON\/32o8eHDTfE7dzxyuHHm9KGVM4eWzRgS64mVrzKxEgDXAYiJ94Te3vUXg\/rsOdwg49nDDc8cbtiteU+o6uOx2hWZ+kxb33jXjMYexY13TGucuArX8RYa1WkOmzvNdi0e1eIxLR4\/3Ph7NRomj7+7cvLdc6cMMK0OPpzQiZXvB5xYSZIGANcBCKg+viMsfNq7Gg83imjQYp\/be\/Zo3hNEfcxWux63Vuij1zh7qU\/xssZbxjTebIiRi9JiznngJM3DPkKz3VNoNKdpUOOIGn840vCEO3Zo8eSRhp1HGuaO7xu1iZV+kjRMrATAdQASoD4BapwPHG584XDj8+7Yr3mPW30aQlKfwIU+VtSn6reN\/aY2DpzROG+b6j3i3\/6zGm+b1FjyQOq4TqhJmu1mSRpfp9nh6TQintJi15GGp7XYLeKoGs8cbYjbxMrTphMr2WcPANcBiJv6HDnSKOLwkcZDRxoPitC8J4D67PWjPrtCV5\/tZuozY1Xjr4c3TllxYbVr8srGXxc2Tl0dvL3L\/kkaU6fxn6RpDJqk0Z1GF5qn3UIj4tmjDXsMsVeLfUcbGtzhbxjCX5hYCYDrAKQAq3OV2R2UF480iDimxdEjDR7ec6TRK+XzvNt7Gt2rXQHU56mw1Me30GfqisaehY2z1wcv9Em404SRpHk83CTN04YkTWCnadRivxbPHWt4\/ljDC03ReOBYIxMrAXAdgNRkXZ5S1lF5+cFarzCqz5Fg6vOcf\/V51q0+kbR3yRrnYSUN986wVOMsMyjSPGKdpLFSHfyY78JTLJM0F4RGcxpdaKTTHDzWeEiLw+44eqzxmBYkaQBwHYBUoz5fmddJqc5y+LqOMU5o3nM8AvWJvL1r0qKGPs6GynWW2rt+5zYPYSHbDoWjPiYLT\/ZO0jznmaQ54CM0R9xCI+P4cTVe1OLE8caXtHjleMOKu9rU3tGGJA0ArgOQCmwsUKozg4tOyOpzuDFgjXM47V1TFzb0uq9h9tLA7V0X1OdRt3\/oUtKkPoea1Ochz4hdkuZJzyTNLstJmn1+kjReC08HLTiNl9C8dLzhFS1e1eK14w0njze8\/ttaGcJ91+erwR8IAK4DkNxsLlAWZ4UjOv7U59gF9WkMRX38Fvro6jOxsqH3kIY5tVbbuyom3z1twj2\/11xESoncY2a7n3jEEDZM0rwQbpLmZYPTvObjNAFiYbZjTZ6yqUBZ2JkXRgBcByBpMzrLspWp7ZTIRSew+hz1UZ\/ANc6+6jOkqOG2exuqV1lt7xJROf7OaUV3ypzKDp94wkL8IdQkzRHzJM2eWCZpjAtP\/pI0kcTKXFV3VuXy2giA6wAkIeIyNi02ohO4xjnU9q7Rkxt63tVQXWee9dH720V0uXVnl9u0uH1n9u1Hsvs8c9MdG26646mb+qqhLxh5hCH7YjGSMUkTSSzqrNTnK2vzeHkEwHUAkorVucqsDnESHVP1sVjjvGxVY88+jTldG3O7adG9KUqrLuxtuFeLvJsf7XTzcRGZMm7RosfxzJ7Hu\/fc2b3XehENhjYlr9hnIUzvGLiFOypJmtdiLzSBo6yjsi5P2ZCvTG\/PiyQArgOQDIj36KUdEyY6pqtdxlof45pXeUVjdm5j55zGrJzGbBF5jdn5apRWeqeCcm7Y3uGGFzvecKzjDYc7dn0ho+tzGd32ZHR7OqP7ExndH+36qzUiDri7kw5oyZVQ44BnHDSojK\/QHDUKzTG7JGkiCeHHD3RRVuTwOgmA6wDYm\/X5SmWGXUTHJI40vHSk4YQ7XvTs9jKmgnQfktE555F22SfaZR9rl324ffYL7bP3t8\/Z0z73qfZ5T7TPe6RLwaouXVYd88ypRBjH3StNuscYMzQBkjQ2d5oAsTxH2VigrKZ8BwDXAbAt4kK1INPGouMTrxxtkPGyCE2DXvKUId2HpBL9ssOxX3Y4\/MuOL\/yy4\/5fZuz5ZcZT12f84fqM30nheFmLl5qi0fCBV+jf06BnX3zjVUO8ZvAYGa8nrdAEjvmZtKMD4DoAdmVzgbKoczKJjm+cPNog4lW3AJmGUCIRbdseadt2V26HFW8cb\/CK14PFG0HjxYY\/avHmiw1\/ejE1nSZwrM1TEzxVnXjNBMB1AGzDA12U2ph1mCcqXtfUxzSua33kuta7ctos\/ZOmI+HFW+74c1oKTeBYlasIe17JehYArgNgB8RlqS4n1UTHN\/54tEGPa1sdubbVk1mta995seFtn\/iL2Y3vaIHEWI8lWWpzFu3oALgOgC1cZ2b7FBcdr2j9n0da\/+eTWT+vee\/FRt9AU6IVFRlqO3o95TsAuA5AAhFvu+d0TC\/REdGj1aoerRbc1dqJjsSnHX1zgbKcdnQAXAcg\/qzPVyoy0k50cJ34R53Wjs40CQBcByCubMhX5mdGZ7QnrkMEjepMdTFrHeU7ALgOQHyQE6rTU3RwnURFSQdFtqOXdeTlFADXAYglW7ooNVmp33gVpCMd+UhoO3od5TsAuA5AjBBvrFfkpLvo4DqJjdpstR19DetZALgOQCwQ76pntE930cF1Eh5zO6mjJGhHB8B1AKKMeCdd0gHRwXXsEuIXclOBsjiLV1cAXAcgGqzLU8ozEB016rs4anIcqIYdYmWuqju0owPgOgCRUp+vzmLEcnAdG8bCzupiFtMkAHAdgPAR75urOyM6uI59o7Sj6job8pVZHXilBcB1AELkgS7KkixEB9dJmmkStKMD4DoAIVCfr84hosMc10mWWJatbja4mvIdAFwHwCIrc5XpdJjjOkkVVVo7+nra0QFwHYCgiDfHs+kwZ0ZEMrejL8jkhRcA1wHww7o8deoQWoPrJPU0CaE7K1nPAsB1AHypz1fmdUrf0Z64TsrE4iy1OYt2dABcB8CDjQVKdSaig+ukSJRnKOu0dnT+tAFwHQCVzdqO+4gOrpOS7egraEcHwHWAjM7SbDrMcZ3UDCE6tKMD4DqQ7qzMRXRwnVSOBZnqNIl1lO8A4DqQnoj3u7PoMMd10iDW5qkJnooMXpMBcB1IJ8Srfykd5rhOOrWjb6YdHQDXgfRhfb5SmYHohOw6GENSR43Wjr6G9SwAXAdSno3a3rLoS6iBK6RAVGrt6PW0owPgOpDCbC5QFnVGdHCddJ8mIf4QarN5iQbAdSDleKCL+vpO4xWuQ6zUpkmsonwHANeBVEK8rNflIDq4DtEU1Z1pRwfAdSDlXGdme0QnzKjv4qjJceAHKRZzOqqTszbkKyUdeLkGwHUgyREv6HPoMMd1CP\/TJOqYJgGA60Dysj5f3UUNX8F1CH+xNFvdbJB2dABcB5KSDfnKfGaY4zpEsJjXSRHvCtbTjg6A60BysalAWdgZ0cF1iBDa0cVfTXVnXr0BcB1IBrZ0UWqyaLxiRgQRTjs60yQAcB2wO2vzlBV0mOM6RFixSGtHX0v5DgCuA3ZmVa4ygw5zXIcIN8o6qlvvbMhXprXjlRwA1wH7sSZP3S8EQcF1iKi0o6+gHR0A1wFbId6MltNhjusQUQohOhsLlNWU7wDgOmAT6vOVqk6IDq5DRDPmZ9KODoDrgD2QvbJ4Ca5DxCLW5qkJnnmdeGEHwHUgQTzQRVmShejgOkQMY5VWvkM7OgCuAwmgPl9ZToc5rkPEPmqy1OYspkkA4DoQb8Qbzel0mOM6RFyiIkNtR6+nfAcA14G4sTpXmU2HeeyDazzhNU1ic4GyLJvXecB1AGKMeH9Z1hHRwXWIhE2TWEX5DuA6ALGjPl\/tCmG0J65DJCqqtWkS6yjfAVwHIBZsLFCqMxEdXIdIcJR0UGQ7emlHXvMB1wGIHpsLlMVZiA6uQ9irHb2OaRKA6wBEK6OzNJsO87hGfRdHTY6DKzoRIMRfJe3ogOsARIeVuYgOrkPYMeZ1UkdJ0I4OuA5ARKzOVWbRYY7rEPZuR9+krTLzegW4DkDIrM1T6x8xD1yHoB0dANeBFGR9vlKZgejgOkRyxCKtHX0t5TuA6wBYZGOBsiAT0WFGBJFMUdZR3XpnQ74ysz2XA8B1AAKyuUAR7xERDlyHSMZYnas80IV2dMB1APwjXiVr6TDHdYhkjuU56maDqynfAVwHwJdVuerbQUQH1yGSPeZnqu3o62lHB1wHwNd1ZrZHdHAdIqXa0YX38OIGuA6Ayto8ZQ4d5rgOkXLTJITurGQ9C3AdgPX5SgUd5rgOkYqxJEttzqIdHXAdSGvE6+B8ZpjjOkTqhngnsy6PaRKA60C6sqlAWdgZ0cF1iLRoR99coKygHR1wHUgrtnRRarJovLJj+LtcPTG3qKxv3n0Zlw1s02J45yurB3aP0XWx5jc9flcyQn68Ynjvkdkt727Twpnz87qRt4b0OFG\/rzgqcWyIS3hRRzs64DqQVqzNU9\/hITpJ5DpLh\/Uc9MtL72rtMIYwnq2TB0e5Y3lgN90thFj0v6aZ8SdW33OjdWGKxX3rRty6IGaSl\/JRnakuZq2jfAdwHUgHVuUqM+gwTx7XWTf2znt\/eemo7Fbrx\/bTbyzvm3d3mxaTf93uyQXjovbWf+Rtc27L0j+dfHM7Z95VD04bKj7eOmWwOICJ3dv+Ye5YKw8Vu\/uKI1w56nbEJewQb3U2FqgdCbwSAq4DKcuaPKWkA6KTTK4zo0eH+zP\/c+uUIV63i6v+oLaX1Bf1Nxl\/Pep2rySQHv5E4bHSwgnd264sbPrqf88c5sz5uTGJMq\/\/DcM7XykVJHDE9L7iCMd3b7N9ziisJZJ29M0FTJMAXAdSlHV5Sjkd5knlOuIaPzzzioq++SFdzMJwnZqhPYpvuFZ3iPVj+93T9mJjnc2K4b0Htmm+xtk36E+P6X3FERZ3uWbJkJtRlkiiNlttR1\/DehbgOpBi1OcrVZ0QnSRzndWFfftf26xuxK0xvfI9uWDc5F+3K+uTa\/i5d\/S\/pplRjMTH4pZVhX2Cd\/3E+L6lfXIm\/+r6HVVFKEskMbeTsi6fdnTAdSCF2FSgVDPDPL5RM6z2vs61d15be392bc1wS3ep7+KoyXH4ZmhiXaEis0eLB98c4OeKj\/sJCym83WJWKXb3XTT41+JofRf1iLCnSdRkcR0BXAeSnAe6KEuyEJ24RvWQ2r7X1N5+9YWYe3c4rrPG2Xdgm+ah5nVCXcNqyh6NvC2wc4jvEd8Znq9E8b7iOC0+GmHpt0WbJrGKdnTAdSCpl66W02Ee9xj3q9rhObWbp6gfb5xUO6xzbVH32u0VIbvOb2cMK8xpVXFnbOt1VhZquROjYWi3GB1rxfDe97S92NgL5venx\/i+1lfECIuxsDPt6IDrQDIj3rRNp8M8vrF1hrpuVTngwi1ld9UOzWxSn5BcR+3D6pkxPPMK3yam+QO7jS64+r9nDovCvrrOvgOu88jrbBp\/95D2\/zGv\/w36LVUDujpzr3p45v1BHy3W9xXHabHSmbAepR3VyVkb8pXZHbimAK4DScXqXPWVC\/mIc6waU9uvjUeNTs2w2juvqV1RGM6MiLWj+w5qe4kz7yrhAcb9dcT1ft5dN0TlOvfQ9N8Mz7py0eBf67c8XjF6fPc2hTmt5HaF4t9R2a0m39zOyqPF+r6LB99ssYOdCG+aBO3ogOtA0rAuTynriOgkIJaPUot1lo64cIv4+I7WtctGhjkPa+mwnvf67JtcfMO1j5UWRusiN+WWdqV9cjzWNQb\/yvjj+l\/TzDiiIXDRdOzuK\/uwxNHiJTGKZdnqZoO0owOuA0lAfb4ytxOjPRMTwmxuv9rbdfq09rgljNmfy4f3Lu5yzT1tL47FPCzhE2MLWuuTsPRNd4ZnXjHgumYjs1t61UcHbRCL0X3FEYrjFN+AlMQuqjop6\/PV4IUUcB2wL+JtWXUmomMv1+l7Te3ywohcJ6bxeOXoid3bCp0KQY+G3mK6a3NM7yuOcEL3to9XjMZI4tOOLl5JeEUFXAdsx+YCZXEWopNg1+nTurbmfo96nX5t1Doe27qOOjqgsM\/s3p0tfvPmSYOWDesV3g+K5L7iCK3s00NEa5qE0J2VtKMDrgN2y+gszabDPMGxrrj27uvV3iv9lvJ+tffn1D44w9auI2LBwO7G+Qx2ixXDe1cN6IqCxDPEG6cN+WqLFq+ugOuAXRDvwBCdhMfvymrHdK29P0vdWUffX2fcrwLd5farHT1aXYi7WjsSVpo6rNcjc0ba8KK7fc6osLNBRCRRnqFuvSOMZ1o7LjeA60CiWZ2rzKLD3B5RdY\/Hpsl9r1F3UrYoOtJ1Eqg7BOGvHX0F7eiA60ACWZunlNJhbqsxEYNrh2aolnNfZ4\/aHSuuk9jUDkGYryHmqO3oqynfAVwHEsL6fKUyA9FJsjjWynG0leNQK8eBVo7nvFynWIuxjh6jMR7CRrEgk3Z0wHUgEYh3WuIFCHWwT7zWyvFKK8fLrRwnWjmOtzJviKvJcTzdyvFUK8eOnzdFL0P0KHT0cKqi88ANjq3dHA90dWy6Aekh7BJr89QEz9xOXH0A14G4sLlAWdQZ0Ul81He5kKR5vpWjsZVjXyvHs60cz7RylA64Uca7O7foUZ11wXK8REeNAY5edzt6DVbHY63Ic6wrcGzsouqOkJ4eRWR9CFu0o2+mHR1wHYgDD3RRaukwj3GcbOV41ZCkOeonT7MoW03SPNnKw2BkGBXHX\/Ty1R2fOwo9EurTa7iW9Rnt6DFG050iVXeECXH1JeIcNVo7OtMkANeBGCLeV9XlIDqxStKsK\/BO0uzRkjS7\/ORpRIQkN4F1J8h3DnT0ukfN+vQa5ug1wiGOduMNjs03OLZ0VRe8xAcbumgm5ESAiNhGpdaOXk\/5DuA6EDvXmdke0Yk0SXPYnadZMrJv9f195McyiWKapAlbZWIUvQY0Hc\/CbMfSXMeqfFV9LmR95GpXkfopF2YidtMkNmu7mPKyDLgORJO1ecocOsxDibUFF5I0DYYkzU53nsZXI2xoNlYF6F5Hr6Fa1mdkU41zXfE9\/9VVTfxQ40zEIlZq0yRWUb4DuA5Ei\/X5SgUd5mZJmiOtHAe1PI1M0iy4r7dM0vjWAts2TxP1rI+scRYfL89zCOHbIGucb\/Cuce5RiAMREUV1Z3Uxax3lO4DrQORsyFfmM8P8wdrVBd5Jmqe1JI1wF9MkjczTpLDWWA+PGmct6yNrnIX3bCTrQ0QQczoqsh1dfMBrNeA6ECabCpSFnVNWdEyTNAdaOWpG3SmTNHMH9\/TXsy2jetitS0f3ryu+B6GxmvXRa5yHO9Z1UTvbN2ud7Q9qNc7iU1WDqHEmQm9Hr2OaBOA6EAZbuig1WUkvOq\/56dlemW+epIkwGbNs9IC64kFCgDCb4Ooz0KFnfVZS40xEEEuzaUcHXAdCZ22eOnUvyTrMzZI0z7VyLBx+x4L7es8b3LP87psD52liUU+zsnhQrRP1CRJ6Lq3XEHeNc+GFGuf\/osaZCBbzOjFNAnAdCJFVucoM+3WYNw1DMPvSijzzJI1NimbmDe6B0IhYPLJv9bDbq4b0Nt7oW\/DkVeO82lDjLLyHGmciQDv6Jm1vd17DAdeBIIjXi5IOiRedl1o5XmzlOKYlafSJlY2t1CoZmaQxXiP95WnsecmfP7hnTWG\/lE\/SGAueovPIOY5e91PjTNCODrgORMa6PKU8Lh3m+sRK06+Kd\/N6kuapVines139m961zv4riu5O0iRN5b09EtLZ3us+tcZ53r099Old6uBSvcaZ6V3pGou0dvS1lO8ArgOmiBeIqk6xEh2ZpDnqmaTZ18oxb3DPintu8dphzzRPkz5rPbK9a\/mYAXY4GNOCJ7tt5SxrnOvy1PYu7xrnYmqc0y7KOqpb72zIV9fieWEHXCftn043Lq3DvDrcGeZ6kuaEnzxNba55koZNaCxGHNq7qof1qRqqJmlKB\/4q6Zu8BnvUOAvX0ad31TO4NG1ida7yQBe1zYKXesB1EJ0LhOQ3xiSNPrHy2VYOPUljmqepHqqu1ywfO1AEBhNqzB10SzScxqTgKWV39BnoUEdYDHEsy1VrnOu11a7NxhrnImqcUzmW56ibDa6mfAdwHUTHS3e8hiGYik5NTlOS5smI8zS2Wq9Jrqga3KOm8C6\/Xx3ae+7gHmV3\/zrlnSbkSqNsLeszyrvGmc72lIz5mbSjA66D63hiTNLoEysD5GlisQ5VVzxo2WjUx3pDey89l1ZT2G\/52IFJV+ac2OldvX6jtnfNvedmvbNdrXHuqrZ30dmeMiGnSVR14hIGuE4q8ndF+UxRPlaU04ryvqL8VVHeUZQ\/K8ofzURnU4G627p4RVivdTGsylUSWE9TactK2EQuYLmTNNbzNLK9a\/lYxDH0GucCrZ\/LkPWRm\/ogDck+TWIl61mA6yQvnyvKp4pyRlE+VJRTivI\/ivK2ovxJUV5XlFcU5YSiHFWUg4rynKI0KMoeLXyZ20lZkKnuxLU0Wy3oEy8K4tVhTZ7a0SDsZ0O+iQzFL3txb4+akX3T4aJrWvAUvZzZPeTMQq5xHuFR4yynd22gxjkJY0mW+jpGOzrgOnbHK0nzrjtJ85qivKwoxxXlsKK8oCj7FWWv22n8hSleP25qO3VSxPT2yuwOSllHVYaqM5XFWUFkaIO2Or4mxjKU7Os1ZVp1cIychpxZFMqhDAVPao3zILXGuTa3aXrXRq3GeUtXj+ldDC61f1RkqK9X9ZTvAK5jtyTNe4YkzauGJM3zhiSNvwipXieMQzXKUHmGMs9Hhla7Zag+xjLkXq9JfHuXV72wLjS2rRFOn5xZ0IKnkO64KFtt71I7250em\/pQ45wU7ejihWg57eiA6yQwSXPSkKQ5YC1JE+bTGZnoWJehGe3VuRMWZWiTJkPiFnH7ytBlqGzATfrHMW3vWuLpBzYXmhDbu\/otHzugrvieNC94CrnGWWvvMk7v2qINLqXG2YZRRzs64DpxSNK8YUjSHAqWpCktLZ03b96CBQtS7\/yYytCSLGVZlGSo4u5fLRp2eyRJmkUjUtNpQsqZJdGWSDEteLJY4yyndy33X+PMCAs7hHipqddeSbhOAa5jlbOK8omifKQoHyjK39xJmjcNSZojUU3SVFVVzZ8\/Px1OrJcMVXVS93eWMlTnlqG1bhnaWBBEhubec3PNiD6++R45sdLXaShb8ZszS3R7VwILnsKpcdamdzXVOI9We9ofdE\/vwjkSGEJJZTu6eG3hKgbJ4Tr\/UmJ+eKZJmrcMSZpjFpI0ES48GRkxYoT+8bx589Lzl1KXoTkdlQrLMiTfz4kviW\/Q1msGoTKhRvnAmxYOu42CpxCkZ6Cj1z3qgpe4xK7Md6ynxtlO7eh1lO+AzV3nW0X5h6J8rShfRkl3vJI0\/6MofzEkaV40JGn2xV5orDNq1Kjp06fza1pSUjJjxoxJkyYZZWj48OFeMrQ8x5IM4TTW27uWDO9jvUaqZtSdab44qO\/MWZvrMb1L1jgzvSueUZutJoPXsJ4FNnQd6TdfKco5RflCUT5XlLNa3iXsJM077iTNa4rykiFJ0xiXJE3UGT169KxZsyorK1P111H876ZOnTphwgTjjcJpwssMzTRkhhZ2VmrcMiTe882bN2+t1lcvZWgzMmTRZkb2peAptKzPvY5eQ5sGlxqnd1HjHIeY26npb5wrPdjll+ArLYUj\/Obvbr95X4tTWlhM0sh99vQkzXM2S9LEKOExd+7c6urqpEvSTJ48ubi4OEKniWSZbOTIkdOmTRMyVJmhzM\/0liGZGTLK0EZNhtamjQxZLHhaPnZgirV3xbrGeYlW47ymQG3vosY5DrEmT30nsyQL48F1Eso5zW8+10YfvKvFO1q8rRnMX7SK4D+7hyG85d5nTyZp5D57SZqkiRH2ae+aNWuWkIkJEyaMGTPG\/ufN6XTOnDlTz5nJzNCsDkppqsvQ4pF9qz372sJI0njWODPxPsQa5\/u11S5nU43zVlnjzKY+0YuVuarurKIdHdeJP8Ylqje1+KMWb2jxulZJc1LTmte0MuF0SNJEEWONc1VVVUx\/lp6kEbqQSucwcM5MmNA0Hxmq1frqpQyJd5Nr3dtPJ1yGakbduXD4HQvu6+3lNLFr76oe1huVCXVTH\/E0NU3v6qL2c22+QVUfj6wPNc7hhvjzpB0d14kr0m9e1eIVLV7W8jQvaX1PJ7RFqBe1pu5jWhzVQqjM7Nmzk269xj7qM2XKlAgfRCZpxo4dO3LkyPQ8jSHlzLxkSA4mCypDEQ4mk0maqqFxchqrG+RoWyIxt8v4NFkpeJKDS43Tu\/QaZ6Z3hRHiL1H8cYk\/N\/FXyUUB14khXvpyROt72q\/lbGQ8744XtDjgjoN+cjbi2iPUp7S0lCcyJGR7l78a58mTJ48bN87pdMazgCZJCXtLJLlGJmVIDiYLLEO+U1qrh906b3BPWzlNCHkmbUuklSm9L0AUd3jSp3f51jiLEB80dbZT42x5mgTt6LhObNHXm\/a6Y58WDe5odIdRg+Jw7UkB5s6de9FFFzkcDouLVhMnTpRJGuE0s2bNspIzmzNnzo4dO+R59pq9FVK+TRzh9ddff\/HFF3fs2DHU6iLT+4qjEseWqJyZsMOoP6xaLWQoePKSIVuNrI9KyC2RvHbiSZ+CpzBqnBdlqzXOq401zmOpcbYUy7KZJoHrxB3fshujA0kNssO1x\/4MGjRIase9995rvF1P0oSUp5E5s7KyMv2WoqIi3S3Ex2G7jpASIWTG+wrrivy+Qr+8GrsSgmzvqqiosH4XWfAkn6ZQM0PGkfULbDOyPiphq4n3suCpetit9kykNU3vMtY436DVOHdlcKl5VGnt6OtpR8d17KM+ERYdh3HtSUYee+wx4R+jRo2STvP4449H9\/GFyhgTMEOGDMnLy9u1a1cYD9WzZ8\/MzMxt27aJjx988MF27drddNNNjY2Nkd9X2J4Ny7lke5c4MPF7qOfS4vBzvWTId0qr\/WVIrXH+Te+4J2n62K3gKYzBpTU5jhXu6V2bfGucyfoY2tHFmwRUANdJQfRrT5Ie\/+jRo4e70W8UItKsWbP5GuKDAP878SXFD\/7utXv37htvvHHhwoUjRoyQmxf37t37nnvuCc\/JOnbsaEzAiP9OmzZtpL5EeF9xhN26dQvPwKLIlClTAhc8yeVCY84sIegyZH1kfWJlSLZ3LR3dP+KZFU1JmuQteAp1H2e1xnm4Z41zkao7TO9apbWjr2Q9C9dJB2xy7fFCT9JYWXsaPHhwRkbG448\/\/vvf\/75Tp07i0yi6zuzZswsKCnSHEB\/k5uYOGDBAqM\/UqVMrNCz+p+rq6i699FJjiqiqqqpFixa1tbWR31ccWH5+vnDZ+DxBMkkjn6YIH8qeE+9NR9Yvjt7I+shDtnf5m322xJ2kmTu4B81fF2qcB2s1ziPUGmd9etfWboYa5zTrbBe\/0hu0KjcuhbhO2hHPa48wButOY4r0m0GDBulLOZ07d37iiSeicniHDh3q2bPn0KFD9VseeeSRdu3aOTSkJIkPZE\/7jBkzAufMFi9eLL7Z+A3iY3HLokWLgh6JlfsOGTKkR48eBw4ciOITNG7cOD2XFmt5Sq4\/ExMZck9p9ZWhoCPrww53kqZXxT23yPauWmd\/zMZijfPCbMfSXMeqfFV9jJ3tTYNL02O1S\/z2rtPa0bn24TrpiNdgplApKSkxfhqh0ARAXvL1HvK5c+d6OUEkbNu2rU2bNsYRpLW1tS1atNDVSjBgwACZVfKXMysvLzdmlbx85aKLLlq4cKGV\/2bQ+06dOvW666576KGHwvifGgueEv67J7dE0s9bkmKUIesj6\/3JUPWwPvN\/oyZpyu7+tfWLepK2dyVGgAzTu\/QaZ316V5q0o6+gHR3XSWdke5fptWfWrFnxcRp\/DBkyxHdB6r777gtgDNbXsJYsWRK4AEg+ZvPmzWtqaqz4iteWSOJT8fjip4TnOl73tfJopgVP9kfoZkVFhT1XuyKUIeOUViFDesFT0JH11jND8z1LcwjrNc7L8xxrtc52tcb5Bu8a5xTb1EeIDu3ouE5aIydWGm+R7V0Jv\/bs2LEjKyvLV1yys7N37twZuessXLjwoosuCuo6Fteh5KPNnz9fz5lVVVVdeumldXV11u+r3+J7X+ORhFTwlIzI5cLkzf1YKXgylSF9MNlKs8FkQUfWy\/Yu1rmChlfBk0eNs\/PC4NIUq3FekMk0CVwnDZAbuPnmaaxfe+Lc3y4MoFmzZl6F1eL617x588WLF0f++DU1NeKhjK4j17Dmzp2r3yL84\/LLL1+3bl3QR6uvr7\/yyitHjx6t3yKudrK9K+g12\/S+GRkZxoIncZwWK51TEhuW2AvGjx8fu4InLxmyMqXVV4aqh926dHT\/tB3YvmiEcJrbZMGT1azPPRdqnNcZapwf7NY0wiKpa5yX5DjE74z4banM4BKJ66QcsXgtjsO15\/777+\/YseNjjz1mvFG2Z4svRf74Dz\/8cNu2badOnarfIvuwevXqpd9y2223WawI3rt3b7du3dq3b79161bxqfi3Xbt2PXv29L6Aae1d\/gqeAtxXeKrFDvYURrhFQn6urQqefGUo5UfWB28+D6vgyXpne22uY6W\/GucxjmRsR98cg3Z0r8y6w+G4+OKLs7KyrNQAhIG+2b0rsg3rjcsIvmn+ZcuWiccU7zPFy2+o7\/bjsxU+rhMPxo0bF6NH3rlzZ05OjqnTDBs2TBhJVDabEVozZMgQ4y2zZ88Wv9b6n+tll122fPlyrz9mf8teU6ZM8fpTNxY8iXuZLjzpOTOv+3r9PYjjNEoYWMyZhcTo0aP1XFoKnCLTkfVGGbLVyHprTtOUpEnUjkFqjbN7epfc1Eef3pVcNc41Wjv6mqiuZwWoIvB6mY3K2w\/dHiLZsF7S2Nh40003+b62T58+vVmzZsZHtv42O25b4eM6CUA8l9FK9oi3AldccYVpsYuQj8svvzwq7xVKSkqEUelvDvTHFzLevHnzrl27bt++3feP2evvwVjwJFTpuuuukxdLrxFmgT1Jv69cVvO6hIsjFMcpvoHfsUCXdi1nZmVyXGFhYWoXPIUhQ+J9y3xrI+vjIENakqZn2d0323YXRL3GebFheldy1ThXZjSVxkfXdbxe4vbu3XvLLbdYrASw\/oOM3bKRbFgvEC\/y2dnZvpWdMtOTn58vLxDiX\/Ee+6qrrtq8ebOVh43bVvi4TuKRrcV2nlq6b98+8fs3b948K98sC57Ev6tWrZK3hHqxNN43KEbxF0d44403ilcNfqlCorKyUrz5E\/8y2T689y1GGQo6sn5j6FNaq4b0rhzUI6YjReM9XyzHY3rXhRpnu2Z9xDMonjXxnMbIdVwBe0gj2exefhrJhvUubYlKvKkWoj9ixAivHyoLOo0Dp8W1zGKrSjy3wsd17Ihs79L3y7ED4hd3wIABxsSjnFhp\/B7daYTRh12gHcl9+\/fvP2HCBBsW5yaKsHd4Sur2Lru9b5EFQ0KGjFNafWUoZUbWh5H16XWf2t4lp3dt1qZ3PdhNzf2IT+0zvWulNk1iVcTlO6au09DQ0KNHD39VB5Fvdh\/JhvWC5557TsiTlby7dJ3LLrtszZo1QR82nlvh4zrJQaKuPeIPZtq0abI\/XNi3\/KW057t\/8UcyduxYrxvllkh2zplFhRjt8FRUVKR\/bNwSCSJ83+JV8GQ6sl7IUOAprakqQ7KzfWW+Y71vjXNxgmucqztHoR3dn7hkZ2dHa2az72b3kWxYbyUpZaRfv36+7SamxHMrfFwnmTBee6KInqTxqqH2vViKF27TPXsSjtB\/i9kgee0xNswnUZLGa4enOBfTjB8\/npxZSJgWPIWxLYWvDCXdyPowEz+DTGqc9eld9YnY1GdOR9Uvxbkt6RDm1dOf62RmZj7yyCNR+cXz3ew+kg3rQ3IdcTVp166dxWKdWG+Fj+ukCKFee2SSRm7gNnLkSE5g2NeeWCdpwt7hKZ7I9q6Uz5lZIYyRdsYcZOQGaZShpBhZH85q10BHr3vVGV7LctUa53qtxlmdVzo2ATXOcppEXVjTJPzpQt++fbt3775v3z7remR9s3srm85H7jrihbR169bWHzNaW+Eng+s8+qirQweX03nhljFjXFdd5bJmhWB67Zk5c6a+yz7VpmFce+JA4IKnJCV5c2YBcmnxSaSJv9aYrhL6G1m\/1DYj68Pc2TlHy\/qM8q5xjqSzXU0gWRAmceo2FoTTjh6gNrlFixZLly6N3HV8N7u3sul8hK4zffr0Nm3amB6\/P0LdCj\/J8zpTplyQmwcecF19tStmu9GkGOJ3K\/Au+6l37Ykb0br26Lk0r0smOTNbkfCRdl7I9i5jb0usMZUhfyPrEy5DalfawF\/pjWkXapx\/o7Z3yRrnTVqN89Zu6r8bb7Ba49yUHHKqunPX4CDfL87Sei03FhVdqKysFBf1GG1272\/T+VArhPwd\/B133NGuXTu5y6t1rBxVtLbCt4Hr7N7tKihwDR7sEv+9IUPUj7V6bzASrV32xe+Nrdq7koXA1545c+YYc2lp6DSBGTNmjB0OQ+bSbOU0IeXMxNtfi\/s+xEGGIhxZbzHKta2DQm22F+qj1zjX5anqo+qLO+ujL3iZiI7c4nmsVhCtG89AR9B2dPE\/XdjZ6sXUVBeEJWRmZkZrz3ffze4tblgf3sGPHDnymmuu2bJlS6iPZuWoorUVvj3qdcTV94orXC1bui67zBWljYMgAEaPhjCSNOLNh1wuTOC1J3kpLi6O6XqNfJp8nSbFTqPdtqXQZcg4pTWoDBlH1sduAyHj9C5Z47x87EC9xnmDVuOsKs5Ynx0OtQKgoEtaIbWj+1uQcjgcUdxh33eze98N642bzltpsDL9NulVARbXQt1GP0Zb4dumNlmonKK4+vfnShB\/ioqKojt5JNnRkzQyl5ak155kQW6JFOp6TUoWPEX4vsWGWyIZC56ECemJNKMMeY2s9ydDUfOegY5eg9TEz9JcxyptepccXHqhv90oPcYEz4BAxrOoc9NO2aG6zkUXXXTJJZd07dq1vr4+umfed7N7fdP566+\/PtQN6\/1926JFi7yGPITkOoGPKopb4dvGde6+W3WdwYN56U84sr1LXHtSvsVGFjzpEyuj8pjGNSwID2POzJhLMzoNZ8lW71uiUvDkNbJeyFAYI+vDnPSerQmN053LGePwTvNYSPCUdVSPZEO+2hCX8N+EkDa7159E6xvWh\/rrEd4jR3ErfHu4ztKlrrZtXW3aqIXJhhGSYKtrTzwrJWMhcFEpeAoVcYX26uUB0yRN4IInSuwjfN8SracpsQVPRhmK+sj6XiPUXXzUjXx04zGVnkLHXf0cQdvRV+Qk\/trqtdl9YCLZsD52j9y\/f\/9QdwCysescOOC65RbX0KGubdtc\/fqpi1mHDvEiZU9GjBihf2zPa4+epLHnW3\/Z3iXerBi3RU8fZs+ebWweDPXu5Mzi874leQuepAwFGFkfWIbUgh497lfHVqgCNMK9k6FRegImeMSPEw+7Wivf8VrZifMJ0Te7T0ZMt8JPZteZNcvVurXabS7YuFHtP\/dMh4JtKSwsTNSP9tplP3mRb7uTOmfmS3gFT6FCzizyJM3kyZONObOUL3gyTmnVZcj6yHqjA1UN7vHuzi3CbIzTu3TdEY8sHsSUOP+XbbvZfWCsb4WfJK7z+OOujAyX8R2euHx27Oh67DFejJKOMWPGiHeE0c33mO6yn5LoObPkau+KesFTJG9hZc6Mv0TfJE3QgqcEvm+xD4pT8ZKhUEfWyxEWUnf87f7HeU7Mk8spgNghrz3VFvYRCGOX\/dQmjCWemJKogqdISJMSe1cMdniS71vS8Yo4QjGG11f1kfWzAo6slzIUAF7fcB1IceS1B6EJFeEZs+KytmvzgqfwSNKcmS8RFjyFDTkzixgHk+E6uA6kICE1nRprnHkBDfutvMWcmT95So2CpzCw\/+BbmaTRc2k2PML0yZmFf3FFdHAdSBmisvAkrj1efR8Q3rXHt+cifQqewsbpdAq3SNRPnzRpkk0KnsLDmDNLsRJ7XAfXAYj5tYc9iEO95Pg6DdeeMJDtXXPnzq2O6rwamaSRT1Nq\/x7yKxRAdzgnuA6AX2Jx7UlSQk3SiGuPcQQghEFIWyIVFRXpuTROnTgVXtsPpq3x8MuA6wCETOptxxeVXfYtXnvImUXO\/Pnz07bgKWxsMvEecB2AJL722P8gE77Lvi9ySyRyZgHs0N9zJFxnypQpnCIAXAcgfohrj9fg6wQKRJLusu\/ScmZCfUpLS9PtlydC7xw1atT06dNjNFQIAHAdABNke1fsrj1yAzcvu0rJRY2kbi32mvsdz0TarFmzKisryZkB4DoA8UO2d4V67dF32fe6ZKbVqRsxYsSkSZPsfITxKXiKELlcWFZWxh8jAK4DEO9rj3GX\/XR2GuvqM3Xq1Piv19iw4ClC0nPiPQCuAxBD9F32i4qKuPZEEdneFa31mqQueApDHL2yhgCA6wAEx7jLfhh359oTOTJnVl5e7u8b9FxamjiNdfUR54QaZwBcByDe154A12wIjJ5LM2Z9WBy0jjh7nAQAXAcg3tce8bab1S4jpaWlFgueJkyYwOkCAFwHIMmQpSrpkPsJWvAUEnJLJHJmkMhf6f2zW65oWf9KvfHGGQ0zrlh+xfpX1nN+cB0A8EuytxbPnDlz6tSpYRc8hY3cEomcGcSNHW\/vyNqUdd+O+4w39t3e96YHb2o81cj5wXUAIAjCFWx+hNOnT580aVJRUdGoUaPseYQyZ0atLsSOiXsmXr3y6gdOPiA\/ffjNh9uubevc5eTM4DoAEBpyO75ErdfIJM2YMWPEYST7mWQ7Pogu2\/64rc3aNqOfbkphzjswr8XiFkuOLuHM4DoAEAX\/qKioiO4EBqFTxcXFcmJlap89ryJogEgQoiN0R0iP+HjIE0OyNmXteHsHpwXXAYDoI9drxL9Bv3PChAkySUPztmTixIkkeyBsHjj5wNUrr560Z9LGVzcK0Rn8h8GcE1wHAOKEbO9ih71QscnEe0gihjwxpOt\/db35tzdfvOTiuQfmckJwHQCIMmPGjBk5cqQ\/pzE2eJO9AIgF619Z33JFS8dCh76YBbgOAISD0+mMfFzl+PHjMR6AqNPv0X5KtXLHI3dwKnAdALAXsr0rujXOAGlI9aHqixZeNHXfVE4FrgMAdkduxzd3LjUHACFQuKvw53U\/3\/TaJk4FrgMASfiGle34AAKy7uV1rVe1HvT7QZwKXAcAkpgxY8boHzOFCqDpncChaqVaEWHcPRlwHQBIBYqLi0tLSzkPkOaseWnNlSuuzNyYueXkFs4GrgMAqcyECRM4CQCA6wAAAADgOgAAAAC4DgAAAACuAwAAAIDrAAAAAOA6AAAAgOsAAAAA4DoAAAAAuA4AAAAArgMAAACA6wAAAADgOgAAAAC4DgAAAOA6AAAAALgOAAAAAK4DAAAAgOsAAAAA4DoAAAAAuA4AAAAArgMAAAC4DgAAAACuAwAAAIDrAAAAAOA6AAAAALgOAAAAAK4DAAAAuA4AAAAArgMAAACA6wAAAADgOgAAAAC4DgAAAACuAwAAAIDrAAAAAK4DAAAAgOsAAAAA4DoAAAAAuA4AAAAArgMAAACA6wAAAADgOgAAAIDrJCfV1dWKAYfDcfnll99yyy1bt26N4uOLf\/ml8eLAgQO33nprTU2NDZ81nnQAAEhZ1zFePgsLC7ns2VMIYv2s8aQDAECquY7XZemhhx7Kzc1t0aJFZWUllz3buk7snjWedAAASHHXETz66KMdOnTo0aPHgQMHvK6mF198sfh327Ztxu\/ft2\/fHXfccdlll1155ZX33ntvgMffsmVLTk6OeJCsrKxNmzZ5\/dz58+dfc801HTt23Lp1a3l5uX5f38fxvSXA4fkS+DC8fkpZWZn4nuuvv14c24IFCyw+lLzvpEmTli9f3q5du0suueTmm2\/etWuXyzMxY\/3khPesWTme6J4W38MT+iUOTHiY+A25\/fbbn3nmmagfkmTkyJGXX35537599+7dO3v2bPHj1qxZwwsWAACuY\/4WfOzYsddee60QCPnp4sWL\/+M\/\/kO\/Ql9xxRUrV66UX2poaLjxxhuNiyn65dbr8cUV8dJLL9W\/TXxs\/NElJSXNmzeXX8rRsO46AQ7Pl8CH4Xt+9IMRiAt2aWmplYeS922hoX9D9+7dhReauk6oR2XlWfO9l+nxRPe0eB2ecF+vtbaCgoLdu3dH95AExcXF+ndma4jD27lzJy9YAAC4jvlVU9zYrFmzJU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','data:image\/png;base64,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');\r\n<\/script><\/p>\n<p>\u00ad<\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"13866\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=13866\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\" data-orig-size=\"195,245\" data-comments-opened=\"1\" data-image-meta=\"{&quot;aperture&quot;:&quot;0&quot;,&quot;credit&quot;:&quot;&quot;,&quot;camera&quot;:&quot;&quot;,&quot;caption&quot;:&quot;&quot;,&quot;created_timestamp&quot;:&quot;0&quot;,&quot;copyright&quot;:&quot;&quot;,&quot;focal_length&quot;:&quot;0&quot;,&quot;iso&quot;:&quot;0&quot;,&quot;shutter_speed&quot;:&quot;0&quot;,&quot;title&quot;:&quot;&quot;,&quot;orientation&quot;:&quot;0&quot;}\" data-image-title=\"Pir\u00e2mide\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\" class=\"alignright size-full wp-image-13866\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6b.png\" alt=\"\" width=\"195\" height=\"245\" \/><\/a>A pir\u00e2mide tem 40 cm<sup>3<\/sup> de volume:<\/p>\n<p>\\[V = \\frac{1}{3} \\times \\frac{{\\left( {5 \\times 12} \\right)}}{2} \\times 4 = 40\\]<\/p>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_13864' onClick='GTTabs_show(0,13864)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Determina o volume de uma pir\u00e2mide com 4 cm de altura e em que a sua base \u00e9 um tri\u00e2ngulo ret\u00e2ngulo cujos catetos medem 5 cm e 12 cm. Resolu\u00e7\u00e3o &gt;&gt;&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":13867,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[213,97,466],"tags":[426,471,109],"series":[],"class_list":["post-13864","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-9--ano","category-aplicando","category-distancias-areas-e-volumes-de-solidos","tag-9-o-ano","tag-piramide","tag-volume"],"views":2898,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/9V2Pag031-6.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13864","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=13864"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13864\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/13867"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=13864"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=13864"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=13864"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=13864"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}