{"id":23379,"date":"2022-11-25T15:29:38","date_gmt":"2022-11-25T15:29:38","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=23379"},"modified":"2022-12-06T08:20:54","modified_gmt":"2022-12-06T08:20:54","slug":"considera-os-seguintes-numeros-reais","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=23379","title":{"rendered":"Considera os seguintes n\u00fameros reais"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_23379' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_23379' class='GTTabs_curr'><a  id=\"23379_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_23379' ><a  id=\"23379_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_23379'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Considera os seguintes n\u00fameros reais:<\/p>\n<table class=\" aligncenter\" style=\"width: 80%; border-collapse: collapse;\">\n<tbody>\n<tr>\n<td style=\"width: 12.5%;\">\\(7\\)<\/td>\n<td style=\"width: 12.5%;\">\\(\\frac{2}{3}\\)<\/td>\n<td style=\"width: 12.5%;\">\\(\\sqrt 2 \\)<\/td>\n<td style=\"width: 12.5%;\">\\( &#8211; 5\\)<\/td>\n<td style=\"width: 12.5%;\">\\(2\\sqrt 2 \\)<\/td>\n<td style=\"width: 12.5%;\">\\(0\\)<\/td>\n<td style=\"width: 12.5%;\">\\( &#8211; \\sqrt 3 \\)<\/td>\n<td style=\"width: 12.5%;\">\\(0,6\\)<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<ol>\n<li>Indica quais destes n\u00fameros s\u00e3o:<br \/>\u00a0&#8211; inteiros;<br \/>\u00a0&#8211; inteiros n\u00e3o naturais;<br \/>\u00a0&#8211; racionais n\u00e3o inteiros:<br \/>\u00a0&#8211; reais n\u00e3o racionais.<\/li>\n<li>Representa os n\u00fameros reais dados na reta num\u00e9rica.<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_23379' onClick='GTTabs_show(1,23379)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_23379'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<ol>\n<li><br \/>\n<table class=\"tabela-3 aligncenter\" style=\"width: 80%;\">\n<tbody>\n<tr>\n<td><strong>N\u00fameros<\/strong><\/td>\n<td><strong>\\(7\\)<\/strong><\/td>\n<td><strong>\\(\\frac{2}{3}\\)<\/strong><\/td>\n<td><strong>\\(\\sqrt 2 \\)<\/strong><\/td>\n<td><strong>\\( &#8211; 5\\)<\/strong><\/td>\n<td><strong>\\(2\\sqrt 2 \\)<\/strong><\/td>\n<td><strong>\\(0\\)<\/strong><\/td>\n<td><strong>\\( &#8211; \\sqrt 3 \\)<\/strong><\/td>\n<td><strong>\\(0,6\\)<\/strong><\/td>\n<\/tr>\n<tr>\n<td>N\u00fameros inteiros<\/td>\n<td>\\(7\\)<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0\\( &#8211; 5\\)<\/td>\n<td>\u00a0<\/td>\n<td>\\(0\\)<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<\/tr>\n<tr>\n<td>N\u00fameros inteiros n\u00e3o naturais<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\\( &#8211; 5\\)<\/td>\n<td>\u00a0<\/td>\n<td>\\(0\\)<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<\/tr>\n<tr>\n<td>N\u00fameros racionais n\u00e3o inteiros<\/td>\n<td>\u00a0<\/td>\n<td>\\(\\frac{2}{3}\\)<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\\(0,6\\)<\/td>\n<\/tr>\n<tr>\n<td>N\u00fameros reais n\u00e3o racionais<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0\\(\\sqrt 2 \\)<\/td>\n<td>\u00a0<\/td>\n<td>\\(2\\sqrt 2 \\)<\/td>\n<td>\u00a0<\/td>\n<td>\u00a0\\( &#8211; \\sqrt 3 \\)<\/td>\n<td>\u00a0<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<br \/><br \/><\/li>\n<li>Os n\u00fameros reais dados est\u00e3o representados na reta num\u00e9rica seguinte.<br \/>(Os n\u00fameros -5 e 7 est\u00e3o fora do campo de vis\u00e3o. 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oCWIQBWgIm+KEPzsqxmYRYidrQdbehz+dmbnVzpcoSBKUgwUzNOT\/M46hZf1ucZUk0x0Gz\/kUwKae5PpGAa8lxU6fpMFFa5DTHIWwPr\/vZ7Mp4OseM9fFugk7IzN8fasgJGCouYZfDquybUtPgwuZUVNNQTVEJNA4672ewM6TQZd+Umgq0wSyt2iird0nrWeKCmOsl1dOahGeAaRqX5\/VFGYfXi40ivYF\/zkEkeBmbA0t1gsOmV7NJrorqWLcyMasnrv3mg2aeswQOLUX5Kx5ZpKXr\/2jUP45UGehrLqTvuShqHvc9z4j5ioAfVxaqFvdxFiljU4ShX+o\/vlZ5qpJKIUG4ptm0MOQNXQVtvwzK0WkafVBD4MdlgP6rhI0Y0sVmIhXGY7jRtFdwBihqfwPGmNZIDXNV0VeLMWBXlo8UwPcgKkZKlXPIjeI1yfRm6uUfQ4yUKO2ZxzHg1dNGYhzMKnNRaMOA0OJtRZjHE9Qk0gdne60W2gL8xoGixva1pYIdhmijANIS4QSDNy1HWa4PnEGJLWhr5hJTC8R78AczmPlbekDodyARWqG0TuqxVaLGcCBdal\/cq40SSA3J+p\/AYayIeeVubjCa1jwCqg26R4JkMtIyVLETDCnaP+SkrFtg0PeDQaFKAlzrgZ240xHdovfdsiiBe4pnKloVgRBsDXJAN39DvzGtemtoXJYGMK0rqFZgF7gMXDCuQ5e\/LxA8qhi3lumvaqYziCs6Mv1Vm+nLKr6V666r2Y5FZRV35fyCt3QLb1e4KHfkIqu4yLpw8acGF7uK7k+fMxe3yGKYjcdBGpFUh\/eXWXI3zFJrEVkGVJuEgGn2BhzlzWx\/Wtb9JTcEyhBk\/wbXEUDsNjCTVVOsAcBMNucwt5ZdaTkCb5QCxrjj6iZqKm\/iKFImJs4mQRiXKCuuV0VFGw1QBekGFJkUGkbJWkYIjq36h9k+ZcxhvAuoS1K7xIJCDfFqvj61jwHdsvydbait5cVZu5faN05ncRIH+V3L6e6PHAhVcgde7m2KrlppB9Z27tdKTTDOe59+zIO0wFzzqsJAaJQ3VSNSg2CalFVYmkabutp2vLZAdI0F2oolqsETo+l9QbNCs7eDKdwO5+CpwWS+3oC3LbzZjOZyjPOv4re8JJx88xlCXSPd26K5y17vRZyHiVrv9NreLtru1SD2xodglVRE90jNdodUH1q7BsWtoGItwLwLwOq31AxQmNMh5oPiAezU9MZDld7A9jI4YM1oDQKt9a1umQFHe8aystq0srkywtEvKPN4Rk5r+tOa6pSbE9LyD3irU1HNcWrXQ5\/KqrYV9LmkruAeGdxnp3BwbmH\/2nSe3RfYNCPL13tFlo6nJQCLvikeKgMrMaS9YwwJamQzmzMhHS5cQX20YV0M6TI3zp70iMilOSOud4liB1P5wFNhi4km0OrtHJmvtVFnRhzft+Q07GKjwi826tFslDFASzZpHfRooh5socJtFurUdL7oYqFOd7JQz8801SH6Ni3atu8XT2uLTHQu1nNmrS3i5HGsET\/0uGdzl3HbtR3mU\/d+PrayLS\/rbMu3PVzUt\/y777onr14+l7RLkMZj\/UynTrxiUlcpkzg3K6+e8uhnEo2g9oG5mU1+dUvGq0Ou5rVJxbxs52qYIYh0kgazNSZXM+yYq2H\/o1zNM0zSRE9\/sOfG8NlfDoM7ZnHWatuDsjpPDb0QX5I6m5I661DuhO7widGthJXTx9Nr8Vnq9eL50Fq1vv\/4vy3n0\/aaoy7nqdGX89Rj5nz85R\/nv5DzGW07Ub0xnW+7nKjePO2DcN45y0F6ZMVcPPBoASbYFZxK6lFXOp7nunyfdNHb\/9Oj6QYu7J7vuUdUo5aYnpsOE9SbmL6LxJ7vIrHPj88XwYVmrC5\/N2UH8Xq3l6k2isro3qb60Q6fXV9S4fjG1i7i+CG4W+8r37UEMd4udjmMVLM3fh7s399TPlpk1DCkGpuG5bzXu11q0V5GKW7Bc9HFKlw8D4CeTD\/ooeOC7fZd37Wl73Dm7pGtv9iUrb\/uEl1ePw9IPovock22vhlNtrB\/kMe+NrDHxjPzFvqXXRTy8nmgv6dasUMhJTBV+rbPfG4Lew+1ujT8vWgxdtJFrSbPg7GfhVoBvK7rS0GFpL4ABZKbtWyNKDxIyyb3aNkvXbTsl+chDHsHd1QI5gECXLie5+wY6p2DCK4w95f6BdBVrn7azlWU5jnTPj0Ppj6+hsXjSRIDzSoOa\/jfeL7Ta3d3haWyfJ9asCQdYEm+wLIEy2MZpGRbTulDF2v04UmTSUx0f2VmkAfhH\/yvP8Rf+741044TmlmUe1Wo\/dT6qn5q3ZPdvyRw9bQvDJin9PZWJB5+VGolBOWemUC5wyu3LXw+1vi43eH5+LSKYp7f21vf53gseNz9sHEfAs3P82+GHTrdwfn5aVPi216Ff2Rs6IGz71fInPvQOWp+xU9\/dbj6L3F++A9QSwcI3NN9avQLAADeRwAAUEsBAhQAFAAICAgAWYl5VUXM3l0aAAAAGAAAABYAAAAAAAAAAAAAAAAAAAAAAGdlb2dlYnJhX2phdmFzY3JpcHQuanNQSwECFAAUAAgICABZiXlVomzVbh8FAABcJgAAFwAAAAAAAAAAAAAAAABeAAAAZ2VvZ2VicmFfZGVmYXVsdHMyZC54bWxQSwECFAAUAAgICABZiXlVQ9DXQHADAACPEQAAFwAAAAAAAAAAAAAAAADCBQAAZ2VvZ2VicmFfZGVmYXVsdHMzZC54bWxQSwECFAAUAAgICABZiXlV3NN9avQLAADeRwAADAAAAAAAAAAAAAAAAAB3CQAAZ2VvZ2VicmEueG1sUEsFBgAAAAAEAAQACAEAAKUVAAAAAA==\",\r\n};\r\n\/\/ 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, macro=Macros\r\nvar views = {'is3D': 0,'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,iVBORw0KGgoAAAANSUhEUgAAA5IAAAHbCAYAAAC5uaWfAAAACXBIWXMAAAsTAAALEwEAmpwYAAAwyElEQVR42u3dT8huU8M\/8Lvj\/6GkENJJR0yc8q+EZGCkKAMpA0kMDGQoGTlJkhlloCjFiHLSSQYnka6BzuwkCRlpSRJWBjLQflr76T7P+Xftfe3Vsh7rWp9T+\/fzPu+9u+\/rej991\/d7bed+doYN\/sQYh5w\/Offl3PPZZ59V+T41X1Puz7darf7VP1+t71XrfWCiHUdM5L8PTMhLJpho3YRe5QzVq8qb2NnkC3\/\/\/fesHyrnvpx7cobkv\/015f58td4LJphozRET+e8DE\/KSCSZaN6FXOUP1qvImDEm4BR4TCqIhyYS8ZIIJQ5IJZ6heZUjCLfCYEHhMGA3ykgkmmNCrnKF6lSEJt8BjQuAxoSAaDUwwwYQzVK9iwpCEW+AxIfAMSQXRaGCCCSacoXoVE00OyfRbetLNU1cIYfZrSt2Xc096ITW+T83XlPvz1XovmGCiNUdM5L8PTMhLJpho3YRe5QzVq8qb8ETSpyQ+OWPCkwZPJJmQl0ww4YkkE85QvWrZE0m44RZ4TCiIhiQT8pIJJgxJJpyhepUhCbfAY0LgMWE0yEsmmGBCr3KG6lWGJNwCjwmBx4SCaDQwwQQTzlC9iglDEm6Bx4TAMyQVRKOBCSaYcIbqVUwYknDDzQQThqQhyYTRwAQTzlC9Sq8yJOGGmwkmFERDkgl5yQQThiQTepVeZUjCLfCYUBANSSbkJRNMGJJMOEP1KkMSboHHhMBjwmiQl0wwwYRe5QzVqwxJuAUeEwKPCQXRaGCCCSacoXoVE4Yk3AKPCSYMSQXRaGCCCSacoXoVE4Yk3HAzwYSCaEgyYTQwwYQhyYRe1dWQjDGON09dIYTZryl1X8496YXU+D41X1Puz1frvWCCidYcMZH\/PjAhL5lgonUTepUzVK8qb8ITSZ+S+OSMCU8aPJFkQl4ywYQnkkw4Q\/WqZU8k4YZb4DGhIBqSTMhLJpgwJJlwhupVhiTcAo8JgceE0SAvmWCCCb3KGapXGZJwCzwmBB4TCqLRwAQTTDhD9SomDEm4BR4TAs+QVBCNBiaYYMIZqlcxYUjCDTcTTBiShiQTRgMTTDhD9Sq9ypCEG24mmFAQDUkm5CUTTBiSTOhVepUhCbfAY0JBNCSZkJdMMGFIMuEM1asMSbgFHhMCjwmjQV4ywQQTepUzVK8yJOEWeEwIPCYURKOBCSaYcIbqVUwYknALPCaYMCQVRKOBCSaYcIbqVUwYknDDzQQTCqIhyYTRwAQThiQTepUhCTfcTDChIBqSTMhLJpgwJJlwhupV64ZkjHG8eeoKIcx+Tan7cu5JL6TG96n5mnJ\/vlrvBRNMtOaIifz3gQl5yQQTrZvQq5yhelV5E55I+pTEJ2dMeNLgiSQT8pIJJjyRZMIZqlcteyIJN9wCjwkF0ZBkQl4ywYQhyYQzVK8yJOEWeEwIPCaMBnnJBBNM6FXOUL3KkIRb4DEh8JhQEI0GJphgwhmqVzFhSMIt8JgQeIakgmg0MMEEE85QvYoJQxJuuJlgwpA0JJkwGphgwhmqV+lVhiTccDPBhIJoSDIhL5lgwpBkQq\/SqwxJuAUeEwqiIcmEvGSCCUOSCWeoXmVIwi3wmBB4TBgN8pIJJpjQq5yhepUhCbfAY0LgMaEgGg1MMMGEM1SvYsKQhFvgMcGEIakgGg1MMMGEM1SvYsKQhBtuJphQEA1JJowGJpgwJJnQq7oakjHG8eapK4Qw+zWl7su5J72QGt+n5mvK\/flqvRdMMNGaIyby3wcm5CUTTLRuQq9yhupV5U14IulTEp+cMeFJgyeSTMhLJpjwRJIJZ6heteyJJNxwCzwmFERDkgl5yQQThiQTzlC9ypCEW+AxIfCYMBrkJRNMMKFXOUP1KkMSboHHhMBjQkE0GphggglnqF7FhCEJt8BjQuAZkgqi0cAEE0w4Q\/UqJgxJuOFmgglD0pBkwmhggglnqF6lVxmScMPNBBMKoiHJhLxkgglDkgm9Sq8yJOEWeEwoiIYkE\/KSCSYMSSacoXqVIQm3wGNC4DFhNMhLJphgQq9yhupVhiTcAo8JgceEgmg0MMEEE85QvYoJQxJugccEE4akgmg0MMEEE85QvYoJQxJuuJlgQkE0JJkwGphgwpBkQq\/qakim\/8flcrlcLpfL5XK5XK5NL08kfUrikzMmPGnwRJIJeckEE55IMuEM1auWPZGEG26Bx4SCaEgyIS+ZYMKQZMIZqlcZknALPCYEHhNGg7xkggkm9CpnqF5lSMIt8JgQeEwoiEYDE0ww4QzVq5gwJOEWeEwIPENSQTQamGCCCWeoXsWEIQk33EwwYUgakkwYDUww4QzVq\/QqQxJuuJlgQkE0JJmQl0wwYUgyoVfpVYYk3AKPCQXRkGRCXjLBhCHJhDNUrzIk4RZ4TAg8JowGeckEE0zoVc5QvcqQhFvgMSHwmFAQjQYmmGDCGapXMWFIwi3wmGDCkFQQjQYmmGDCGapXMWFIwg03E0woiIYkE0YDE0wYkkzoVYYk3HAzwYSCaEgyIS+ZYMKQZMIZqletG5IxxvHmqSuEMPs1pe7LuSe9kBrfp+Zryv35ar0XTDDRmiMm8t8HJuQlE0y0bkKvcobqVeVNeCLpUxKfnDHhSYMnkkzISyaY8ESSCWeoXrXsiSTccAs8JhREQ5IJeckEE4YkE85QvcqQhFvgMSHwmDAa5CUTTDChVzlD9SpDEm6Bx4TAY0JBNBqYYIIJZ6hexYQhCbfAY0LgGZIKotHABBNMOEP1KiYMSbjhZoIJQ9KQZMJoYIIJZ6hepVcZknDDzQQTCqIhyYS8ZIIJQ5IJvUqvMiThFnhMKIiGJBPykgkmDEkmnKF6lSEJt8BjQuAxYTTISyaYYEKvcobqVYYk3AKPCYHHhIJoNDDBBBPOUL2KCUMSboHHBBOGpIJoNDDBBBPOUL2KCUMSbriZYEJBNCSZMBqYYMKQZEKv6mpIxhjHm6euEMLs15S6L+ee9EJqfJ+aryn356v1XjDBRGuOmMh\/H5iQl0ww0boJvcoZqleVN+GJpE9JfHLGhCcNnkgyIS+ZYMITSSacoXrVsieScMMt8JhQEA1JJuQlE0wYkkw4Q\/UqQxJugceEwGPCaJCXTDDBhF7lDNWrDEm4BR4TAo8JBdFoYIIJJpyhehUThiTcAo8JgWdIKohGAxNMMOEM1auYMCThhpsJJgxJQ5IJo4EJJpyhepVeZUjCDTcTTCiIhiQT8pIJJgxJJvQqvcqQhFvgMaEgGpJMyEsmmDAkmXCG6lWGJNwCjwmBx4TRIC+ZYIIJvcoZqlcZknALPCYEHhMKotHABBNMOEP1KiYMSbgFHhNMGJIKotHABBNMOEP1KiYMSbjhZoIJBdGQZMJoYIIJQ5IJvaqrIRljHG+eukIIs19T6r6ce9ILqfF9ar6m3J+v1nvBBBOtOWIi\/31gQl4ywUTrJvQqZ6heVd6EJ5I+JfHJGROeNHgiyYS8ZIIJTySZcIbqVcueSMINt8BjQkE0JJmQl0wwYUgy4QzVqwxJuAUeEwKPCaNBXjLBBBN6lTNUrzIk4RZ4TAg8JhREo4EJJphwhupVTBiScAs8JgSeIakgGg1MMMGEM1SvYsKQhBtuJpgwJA1JJowGJphwhupVepUhCTfcTDChIBqSTMhLJpgwJJnQq\/QqQxJugceEgmhIMiEvmWDCkGTCGapXGZJwCzwmBB4TRoO8ZIIJJvQqZ6heZUjCLfCYEHhMKIhGAxNMMOEM1auYMCThFnhMMGFIKohGAxNMMOEM1auYMCThhpsJJhREQ5IJo4EJJgxJJvSqroZkjHG8eeoKIcx+Tan7cu5JL6TG96n5mnJ\/vlrvBRNMtOaIifz3gQl5yQQTrZvQq5yhelV5E55I+pTEJ2dMeNLgiSQT8pIJJjyRZMIZqlcteyIJN9wCjwkF0ZBkQl4ywYQhyYQzVK8yJOEWeEwIPCaMBnnJBBNM6FXOUL3KkIRb4DEh8JhQEI0GJphgwhmqVzFhSMIt8JgQeIakgmg0MMEEE85QvYoJQxJuuJlgwpA0JJkwGphgwhmqV+lVhiTccDPBhIJoSDIhL5lgwpBkQq\/SqwxJuAUeEwqiIcmEvGSCCUOSCWeoXmVIwi3wmBB4TBgN8pIJJpjQq5yhepUhCbfAY0LgMaEgGg1MMMGEM1SvYsKQhFvgMcGEIakgGg1MMMGEM1SvYsKQhBtuJphQEA1JJowGJpgwJJnQqwxJuOFmggkF0ZBkQl4ywYQhyYQzVK9aNyRXq9X4Dy6Xy+VyuVwul8vlcm1yeSLpUxKfnDHhSYMnkkzISyaY8ESSCWeoXrXsiSTccAs8JhREQ5IJeckEE4YkE85QvcqQhFvgMSHwmDAa5CUTTDChVzlD9SpDEm6Bx4TAY0JBNBqYYIIJZ6hexYQhCbfAY0LgGZIKotHABBNMOEP1KiYMSbjhZoIJQ9KQZMJoYIIJZ6hepVcZknDDzQQTCqIhyYS8ZIIJQ5IJvUqvMiThFnhMKIiGJBPykgkmDEkmnKF6lSEJt8BjQuAxYTTISyaYYEKvcobqVYYk3AKPCYHHhIJoNDDBBBPOUL2KCUMSboHHBBOGpIJoNDDBBBPOUL2KCUMSbriZYEJBNCSZMBqYYMKQZEKv6mpIxhjHm6euEMLs15S6L+ee9EJqfJ+aryn356v1XjDBRGuOmMh\/H5iQl0ww0boJvcoZqleVN+GJpE9JfHLGhCcNnkgyIS+ZYMITSSacoXrVsieScMMt8JhQEA1JJuQlE0wYkkw4Q\/UqQxJugceEwGPCaJCXTDDBhF7lDNWrDEm4BR4TAo8JBdFoYIIJJpyhehUThiTcAo8JgWdIKohGAxNMMOEM1auYMCThhpsJJgxJQ5IJo4EJJpyhepVeZUjCDTcTTCiIhiQT8pIJJgxJJvQqvcqQhFvgMaEgGpJMyEsmmDAkmXCG6lWGJNwCjwmBx4TRIC+ZYIIJvcoZqlcZknALPCYEHhMKotHABBNMOEP1KiYMSbgFHhNMGJIKotHABBNMOEP1KiYMSbjhZoIJBdGQZMJoYIIJQ5IJvaqrIRljHG+eukIIs19T6r6ce9ILqfF9ar6m3J+v1nvBBBOtOWIi\/31gQl4ywUTrJvQqZ6heVd6EJ5I+JfHJGROeNHgiyYS8ZIIJTySZcIbqVcueSMINt8BjQkE0JJmQl0wwYUgy4QzVqwxJuAUeEwKPCaNBXjLBBBN6lTNUrzIk4RZ4TAg8JhREo4EJJphwhupVTBiScAs8JgSeIakgGg1MMMGEM1SvYsKQhBtuJpgwJA1JJowGJphwhupVepUhCTfcTDChIBqSTMhLJpgwJJnQq\/QqQxJugceEgmhIMiEvmWDCkGTCGapXGZJwCzwmBB4TRoO8ZIIJJvQqZ6heZUjCLfCYEHhMKIhGAxNMMOEM1auYMCThFnhMMGFIKohGAxNMMOEM1auYMCThhpsJJhREQ5IJo4EJJgxJJvQqQxJuuJlgQkE0JJmQl0wwYUgy4QzVq9YNyRjjePPUFUKY\/ZpS9+Xck15Ije9T8zXl\/ny13gsmmGjNERP57wMT8pIJJlo3oVc5Q\/Wq8iY8kfQpiU\/OmPCkwRNJJuQlE0x4IsmEM1SvWvZEEm64BR4TCqIhyYS8ZIIJQ5IJZ6heZUjCLfCYEHhMGA3ykgkmmNCrnKF6lSEJt8BjQuAxoSAaDUwwwYQzVK9iwpCEW+AxIfAMSQXRaGCCCSacoXoVE4Yk3HAzwYQhaUgyYTQwwYQzVK\/SqwxJuOFmggkF0ZBkQl4ywYQhyYRepVcZknALPCYUREOSCXnJBBOGJBPOUL3KkIRb4DEh8JgwGuQlE0wwoVc5Q\/UqQxJugceEwGNCQTQamGCCCWeoXsWEIQm3wGOCCUNSQTQamGCCCWeoXsWEIQk33EwwoSAakkwYDUwwYUgyoVd1NSRjjOPNU1cIYfZrSt2Xc096ITW+T83XlPvz1XovmGCiNUdM5L8PTMhLJpho3YRe5QzVq8qb8ETSpyQ+OWPCkwZPJJmQl0ww4YkkE85QvWrZE0m44RZ4TCiIhiQT8pIJJgxJJpyhepUhCbfAY0LgMWE0yEsmmGBCr3KG6lWGJNwCjwmBx4SCaDQwwQQTzlC9iglDEm6Bx4TAMyQVRKOBCSaYcIbqVUwYknDDzQQThqQhyYTRwAQTzlC9Sq8yJOGGmwkmFERDkgl5yQQThiQTepVeZUjCLfCYUBANSSbkJRNMGJJMOEP1KkMSboHHhMBjwmiQl0wwwYRe5QzVqwxJuAUeEwKPCQXRaGCCCSacoXoVE4Yk3AKPCSYMSQXRaGCCCSacoXoVE4Yk3HAzwYSCaEgyYTQwwYQhyYRe1dWQXK1W4z+4XC6Xy+VyuVwul8u1yeWJpE9JfHLGhCcNnkgyIS+ZYMITSSacoXrVsieScMMt8JhQEA1JJuQlE0wYkkw4Q\/UqQxJugceEwGPCaJCXTDDBhF7lDNWrDEm4BR4TAo8JBdFoYIIJJpyhehUThiTcAo8JgWdIKohGAxNMMOEM1auYMCThhpsJJgxJQ5IJo4EJJpyhepVeZUjCDTcTTCiIhiQT8pIJJgxJJvQqvcqQhFvgMaEgGpJMyEsmmDAkmXCG6lWGJNwCjwmBx4TRIC+ZYIIJvcoZqlcZknALPCYEHhMKotHABBNMOEP1KiYMSbgFHhNMGJIKotHABBNMOEP1KiYMSbjhZoIJBdGQZMJoYIIJQ5IJvaqrIRljHG+eukIIs19T6r6ce9ILqfF9ar6m3J+v1nvBBBOtOWIi\/31gQl4ywUTrJvQqZ6heVd6EJ5I+JfHJGROeNHgiyYS8ZIIJTySZcIbqVcueSMINt8BjQkE0JJmQl0wwYUgy4QzVqwxJuAUeEwKPCaNBXjLBBBN6lTNUrzIk4RZ4TAg8JhREo4EJJphwhupVTBiScAs8JgSeIakgGg1MMMGEM1SvYsKQhBtuJpgwJA1JJowGJphwhupVepUhCTfcTDChIBqSTMhLJpgwJJnQq\/QqQxJugceEgmhIMiEvmWDCkGTCGapXGZJwCzwmBB4TRoO8ZIIJJvQqZ6heZUjCLfCYEHhMKIhGAxNMMOEM1auYMCThFnhMMGFIKohGAxNMMOEM1auYMCThhpsJJhREQ5IJo4EJJgxJJvQqQxJuuJlgQkE0JJmQl0wwYUgy4QzVq9YNyRjjePPUFUKY\/ZpS9+Xck15Ije9T8zXl\/ny13gsmmGjNERP57wMT8pIJJlo3oVc5Q\/Wq8iY8kfQpiU\/OmPCkwRNJJuQlE0x4IsmEM1SvWvZEEm64BR4TCqIhyYS8ZIIJQ5IJZ6heZUjCLfCYEHhMGA3ykgkmmNCrnKF6lSEJt8BjQuAxoSAaDUwwwYQzVK9iwpCEW+AxIfAMSQXRaGCCCSacoXoVE4Yk3HAzwYQhaUgyYTQwwYQzVK\/SqwxJuOFmggkF0ZBkQl4ywYQhyYRepVcZknALPCYUREOSCXnJBBOGJBPOUL3KkIRb4DEh8JgwGuQlE0wwoVc5Q\/UqQxJugceEwGNCQTQamGCCCWeoXsWEIQm3wGOCCUNSQTQamGCCCWeoXsWEIQk33EwwoSAakkwYDUwwYUgyoVd1NSRjjOPNU1cIYfZrSt2Xc096ITW+T83XlPvz1XovmGCiNUdM5L8PTMhLJpho3YRe5QzVq8qb8ETSpyQ+OWPCkwZPJJmQl0ww4YkkE85QvWrZE0m44RZ4TCiIhiQT8pIJJgxJJpyhepUhCbfAY0LgMWE0yEsmmGBCr3KG6lWGJNwCjwmBx4SCaDQwwQQTzlC9iglDEm6Bx4TAMyQVRKOBCSaYcIbqVUwYknDDzQQThqQhyYTRwAQTzlC9Sq8yJOGGmwkmFERDkgl5yQQThiQTepVeZUjCLfCYUBANSSbkJRNMGJJMOEP1KkMSboHHhMBjwmiQl0wwwYRe5QzVqwxJuAUeEwKPCQXRaGCCCSacoXoVE4Yk3AKPCSYMSQXRaGCCCSacoXoVE4Yk3HAzwYSCaEgyYTQwwYQhyYRe1dWQjDGON09dIYTZryl1X8496YXU+D41X1Puz1frvWCCidYcMZH\/PjAhL5lgonUTepUzVK8qb8ITSZ+S+OSMCU8aPJFkQl4ywYQnkkw4Q\/WqZU8k4YZb4DGhIBqSTMhLJpgwJJlwhupVhiTcAo8JgceE0SAvmWCCCb3KGapXGZJwCzwmBB4TCqLRwAQTTDhD9SomDEm4BR4TAs+QVBCNBiaYYMIZqlcxYUjCDTcTTBiShiQTRgMTTDhD9Sq9ypCEG24mmFAQDUkm5CUTTBiSTOhVepUhCbfAY0JBNCSZkJdMMGFIMuEM1asMSbgFHhMCjwmjQV4ywQQTepUzVK8yJOEWeEwIPCYURKOBCSaYcIbqVUwYknALPCaYMCQVRKOBCSaYcIbqVUwYknDDzQQTCqIhyYTRwAQThiQTepUhCTfcTDChIBqSTMhLJpgwJJlwhupV64bkarUa\/8HlcrlcLpfL5XK5XK5NLk8kfUrikzMmPGnwRJIJeckEE55IMuEM1auWPZGEG26Bx4SCaEgyIS+ZYMKQZMIZqlcZknALPCYEHhNGg7xkggkm9CpnqF5lSMIt8JgQeEwoiEYDE0ww4QzVq5gwJOEWeEwIPENSQTQamGCCCWeoXsWEIQk33EwwYUgakkwYDUww4QzVq\/QqQxJuuJlgQkE0JJmQl0wwYUgyoVfpVYYk3AKPCQXRkGRCXjLBhCHJhDNUrzIk4RZ4TAg8JowGeckEE0zoVc5QvcqQhFvgMSHwmFAQjQYmmGDCGapXMWFIwi3wmGDCkFQQjQYmmGDCGapXMWFIwg03E0woiIYkE0YDE0wYkkzoVV0NyRjjePPUFUKY\/ZpS9+Xck15Ije9T8zXl\/ny13gsmmGjNERP57wMT8pIJJlo3oVc5Q\/Wq8iY8kfQpiU\/OmPCkwRNJJuQlE0x4IsmEM1SvWvZEEm64BR4TCqIhyYS8ZIIJQ5IJZ6heZUjCLfCYEHhMGA3ykgkmmNCrnKF6lSEJt8BjQuAxoSAaDUwwwYQzVK9iwpCEW+AxIfAMSQXRaGCCCSacoXoVE4Yk3HAzwYQhaUgyYTQwwYQzVK\/SqwxJuOFmggkF0ZBkQl4ywYQhyYRepVcZknALPCYUREOSCXnJBBOGJBPOUL3KkIRb4DEh8JgwGuQlE0wwoVc5Q\/UqQxJugceEwGNCQTQamGCCCWeoXsWEIQm3wGOCCUNSQTQamGCCCWeoXsWEIQk33EwwoSAakkwYDUwwYUgyoVd1NSRjjOPNU1cIYfZrSt2Xc096ITW+T83XlPvz1XovmGCiNUdM5L8PTMhLJpho3YRe5QzVq8qb8ETSpyQ+OWPCkwZPJJmQl0ww4YkkE85QvWrZE0m44RZ4TCiIhiQT8pIJJgxJJpyhepUhCbfAY0LgMWE0yEsmmGBCr3KG6lWGJNwCjwmBx4SCaDQwwQQTzlC9iglDEm6Bx4TAMyQVRKOBCSaYcIbqVUwYknDDzQQThqQhyYTRwAQTzlC9Sq8yJOGGmwkmFERDkgl5yQQThiQTepVeZUjCLfCYUBANSSbkJRNMGJJMOEP1KkMSboHHhMBjwmiQl0wwwYRe5QzVqwxJuAUeEwKPCQXRaGCCCSacoXoVE4Yk3AKPCSYMSQXRaGCCCSacoXoVE4Yk3HAzwYSCaEgyYTQwwYQhyYRe1dWQjDGON09dIYTZryl1X8496YXU+D41X1Puz1frvWCCidYcMZH\/PjAhL5lgonUTepUzVK8qb8ITSZ+S+OSMCU8aPJFkQl4ywYQnkkw4Q\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class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_23379' onClick='GTTabs_show(0,23379)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Considera os seguintes n\u00fameros reais: \\(7\\) \\(\\frac{2}{3}\\) \\(\\sqrt 2 \\) \\( &#8211; 5\\) \\(2\\sqrt 2 \\) \\(0\\) \\( &#8211; \\sqrt 3 \\) \\(0,6\\) Indica quais destes n\u00fameros s\u00e3o:\u00a0&#8211; inteiros;\u00a0&#8211; inteiros 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