{"id":13101,"date":"2017-11-28T00:37:56","date_gmt":"2017-11-28T00:37:56","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=13101"},"modified":"2022-01-17T21:55:46","modified_gmt":"2022-01-17T21:55:46","slug":"desenha-um-retangulo-abcd","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=13101","title":{"rendered":"Desenha um ret\u00e2ngulo [ABCD]"},"content":{"rendered":"<p><ul id='GTTabs_ul_13101' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_13101' class='GTTabs_curr'><a  id=\"13101_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_13101' ><a  id=\"13101_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_13101'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Desenha um ret\u00e2ngulo [ABCD] com\u00a0\\(\\overline {AB} = 9\\) cm e\u00a0\\(\\overline {BC} = 5\\) cm.<\/p>\n<p>Tra\u00e7a a diagonal [AC] e determina o baricentro do tri\u00e2ngulo [ABC] e o baricentro do tri\u00e2ngulo [ACD].<\/p>\n<p>A que segmento de reta pertencem os dois baricentros?<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_13101' onClick='GTTabs_show(1,13101)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_13101'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<blockquote>\n<p>Desenha um ret\u00e2ngulo [ABCD] com\u00a0\\(\\overline {AB} = 9\\) cm e\u00a0\\(\\overline {BC} = 5\\) cm.<\/p>\n<p>Tra\u00e7a a diagonal [AC] e determina o baricentro do tri\u00e2ngulo [ABC] e o baricentro do tri\u00e2ngulo [ACD].<\/p>\n<p>A que segmento de reta pertencem os dois baricentros?<\/p>\n<\/blockquote>\n<div class=\"GTTabsNavigation\"><\/div>\n<div>Utiliza a anima\u00e7\u00e3o de geometria din\u00e2mica para responderes \u00e0 quest\u00e3o colocada.<\/div>\n<p>\u00ad<br \/>\n<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\":800,\r\n\"height\":500,\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  20 22 , 21 23 | 55 56 57 , 12 | 36 46 , 38 49  50 , 71  14  68 | 30 29 54 32 31 33 | 25 17 26 60 52 61 | 40 41 42 , 27 28 35 , 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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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class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_13101' onClick='GTTabs_show(0,13101)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Desenha um ret\u00e2ngulo [ABCD] com\u00a0\\(\\overline {AB} = 9\\) cm e\u00a0\\(\\overline {BC} = 5\\) cm. Tra\u00e7a a diagonal [AC] e determina o baricentro do tri\u00e2ngulo [ABC] e o baricentro do tri\u00e2ngulo [ACD].&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20543,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,187],"tags":[426,114,115],"series":[],"class_list":["post-13101","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-lugares-geometricos","tag-9-o-ano","tag-baricentro","tag-mediana"],"views":2428,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/9V1Pag101-6_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13101","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=13101"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13101\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20543"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=13101"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=13101"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=13101"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=13101"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}