{"id":13458,"date":"2018-02-03T19:48:34","date_gmt":"2018-02-03T19:48:34","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=13458"},"modified":"2022-01-17T16:11:35","modified_gmt":"2022-01-17T16:11:35","slug":"um-quadrilatero-inscrito-numa-circunferencia","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=13458","title":{"rendered":"Um quadril\u00e1tero inscrito numa circunfer\u00eancia"},"content":{"rendered":"<p><ul id='GTTabs_ul_13458' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_13458' class='GTTabs_curr'><a  id=\"13458_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_13458' ><a  id=\"13458_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_13458'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Um quadril\u00e1tero [ABCD] est\u00e1 inscrito numa circunfer\u00eancia.<br \/>\nDois dos seus \u00e2ngulos internos consecutivos t\u00eam, respetivamente, 56 e 112 graus de amplitude.<\/p>\n<p>Quais s\u00e3o as medidas das amplitudes dos outros dois \u00e2ngulos internos do quadril\u00e1tero?<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_13458' onClick='GTTabs_show(1,13458)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_13458'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<blockquote>\n<p>A soma dos \u00e2ngulos opostos de um quadril\u00e1tero inscrito numa circunfer\u00eancia \u00e9 igual a um \u00e2ngulo raso.<\/p>\n<p>\\[\\widehat A + \\widehat C = 180^\\circ = \\widehat B + \\widehat D\\]<\/p>\n<\/blockquote>\n<p><script 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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,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em considera\u00e7\u00e3o que a soma dos \u00e2ngulos opostos de um quadril\u00e1tero inscrito numa circunfer\u00eancia \u00e9 igual a um \u00e2ngulo raso, vem:<\/p>\n<p>\\[\\begin{array}{*{20}{c}}{\\widehat D = 180^\\circ &#8211; \\widehat B = 180^\\circ &#8211; 56^\\circ = 124^\\circ }\\\\{\\widehat A = 180^\\circ &#8211; \\widehat C = 180^\\circ &#8211; 112^\\circ = 68^\\circ }\\end{array}\\]<\/p><\/p>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_13458' onClick='GTTabs_show(0,13458)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Um quadril\u00e1tero [ABCD] est\u00e1 inscrito numa circunfer\u00eancia. Dois dos seus \u00e2ngulos internos consecutivos t\u00eam, respetivamente, 56 e 112 graus de amplitude. Quais s\u00e3o as medidas das amplitudes dos outros dois \u00e2ngulos&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20503,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[213,97,278],"tags":[426,280,188],"series":[],"class_list":["post-13458","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-inscrito","tag-circunferencia"],"views":3090,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/02\/9V1Pag145-18_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13458","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=13458"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13458\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20503"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=13458"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=13458"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=13458"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=13458"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}