{"id":5641,"date":"2010-11-17T23:27:39","date_gmt":"2010-11-17T23:27:39","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=5641"},"modified":"2022-01-19T17:35:43","modified_gmt":"2022-01-19T17:35:43","slug":"rascunho-31","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=5641","title":{"rendered":"Os tri\u00e2ngulos do Pedro"},"content":{"rendered":"<p><ul id='GTTabs_ul_5641' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_5641' class='GTTabs_curr'><a  id=\"5641_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_5641' ><a  id=\"5641_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_5641'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3.jpg\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"5659\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=5659\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3.jpg\" data-orig-size=\"495,381\" data-comments-opened=\"1\" data-image-meta=\"{&quot;aperture&quot;:&quot;0&quot;,&quot;credit&quot;:&quot;&quot;,&quot;camera&quot;:&quot;HP pstc4380&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;}\" data-image-title=\"Pedro\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3.jpg\" class=\"alignright size-medium wp-image-5659\" title=\"Pedro\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3-300x230.jpg\" alt=\"\" width=\"300\" height=\"230\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3-300x230.jpg 300w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3-150x115.jpg 150w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3-400x307.jpg 400w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag23-3.jpg 495w\" sizes=\"auto, (max-width: 300px) 100vw, 300px\" \/><\/a>O Pedro desenhou duas retas paralelas.<\/p>\n<p>Numa marcou os pontos C, D, E e F, na outra os pontos A e B, como mostra a figura.<\/p>\n<p>Em seguida, uniu alguns pontos formando os tri\u00e2ngulos [CAB], [DAB], [EAB] e [FAB].<\/p>\n<p>Analisando esses tri\u00e2ngulos, o Pedro descobriu um &#8220;segredo&#8221; sobre as suas \u00e1reas.<\/p>\n<p>Qual foi o segredo descoberto pedo Pedro?<br \/>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_5641' onClick='GTTabs_show(1,5641)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_5641'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<p>Arrastando o ponto P, desenha os tri\u00e2ngulos\u00a0\u00a0[CAB], [DAB], [EAB] e [FAB].<\/p>\n<p>Qual foi o &#8220;segredo&#8221; descoberto pedo Pedro?<\/p>\n<p>Qual a explica\u00e7\u00e3o para o &#8220;segredo&#8221;?<\/p>\n<p>Caso n\u00e3o encontres a explica\u00e7\u00e3o para o &#8220;segredo&#8221;, ativa a caixa &#8220;Mostrar valores&#8221;.<br \/>\nQual \u00e9 a explica\u00e7\u00e3o para o &#8220;segredo&#8221;?<\/p>\n<p style=\"text-align: center;\"><script 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\"};\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, 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,'PV': 0,'macro': 0};\r\nvar applet = new GGBApplet(parameters, '5.0', views);\r\nwindow.onload = function() {applet.inject('ggbApplet')};\r\n<\/script><\/p><\/p>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_5641' onClick='GTTabs_show(0,5641)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado O Pedro desenhou duas retas paralelas. Numa marcou os pontos C, D, E e F, na outra os pontos A e B, como mostra a figura. Em seguida, uniu alguns pontos&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20653,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,112],"tags":[424,67,106],"series":[],"class_list":["post-5641","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-decomposicao-de-figuras-teorema-de-pitagoras","tag-8-o-ano","tag-geometria","tag-triangulos"],"views":1338,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/8V1Pag023-3_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/5641","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=5641"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/5641\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20653"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=5641"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=5641"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=5641"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=5641"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}