{"id":13056,"date":"2017-11-26T19:27:33","date_gmt":"2017-11-26T19:27:33","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=13056"},"modified":"2022-01-17T20:59:59","modified_gmt":"2022-01-17T20:59:59","slug":"tres-pontos-nao-colineares","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=13056","title":{"rendered":"Tr\u00eas pontos n\u00e3o colineares"},"content":{"rendered":"<p><ul id='GTTabs_ul_13056' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_13056' class='GTTabs_curr'><a  id=\"13056_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_13056' ><a  id=\"13056_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_13056'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Considera tr\u00eas pontos n\u00e3o colineares A, B e C.<\/p>\n<ol style=\"list-style-type: lower-alpha;\">\n<li>Determina, atrav\u00e9s de uma constru\u00e7\u00e3o geom\u00e9trica, um ponto P que seja equidistante dos tr\u00eas pontos dados.<\/li>\n<li>Para al\u00e9m dos tr\u00eas pontos A, B e C existir\u00e3o outros pontos do mesmo plano que estejam \u00e0 mesma dist\u00e2ncia do ponto P? Identifica o respetivo lugar geom\u00e9trico.<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_13056' onClick='GTTabs_show(1,13056)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_13056'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<p>Sem ativar &#8220;Mostrar constru\u00e7\u00e3o&#8221;, explora a anima\u00e7\u00e3o para responderes \u00e0s quest\u00f5es colocadas.<\/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\": \"ggbApplet\",\r\n\"width\":840,\r\n\"height\":520,\r\n\"showMenuBar\":false,\r\n\"showAlgebraInput\":false,\r\n\"showToolBar\":false,\r\n\"customToolBar\":\"0 39 73 62 | 1 501 67 , 5 19 , 72 75 76 | 2 15 45 , 18 65 , 7 37 | 4 3 8 9 , 13 44 , 58 , 47 | 16 51 64 , 70 | 10 34 53 11 , 24  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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': 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,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','data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFAAAABQCAMAAAC5zwKfAAAAhFBMVEUAAABmZmb\/\/\/9qampsbGz+\/v6qqqpvb29ubm6enp6rq6t3d3d1dXVxcXH6+vqCgoJ+fn719fXv7+\/n5+eTk5N0dHSXl5eNjY2KioqIiIji4uLe3t6UlJSQkJDr6+vW1tbCwsK5ubmioqK7u7uzs7OmpqaFh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class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_13056' onClick='GTTabs_show(0,13056)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Considera tr\u00eas pontos n\u00e3o colineares A, B e C. Determina, atrav\u00e9s de uma constru\u00e7\u00e3o geom\u00e9trica, um ponto P que seja equidistante dos tr\u00eas pontos dados. Para al\u00e9m dos tr\u00eas pontos A,&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20532,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,187],"tags":[426,454,189,191],"series":[],"class_list":["post-13056","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-lugares-geometricos","tag-9-o-ano","tag-circuncentro","tag-circunferencia-circunscrita","tag-mediatriz"],"views":3252,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/9V1Pag096-6_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13056","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=13056"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13056\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20532"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=13056"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=13056"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=13056"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=13056"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}