{"id":14680,"date":"2018-04-19T09:25:14","date_gmt":"2018-04-19T08:25:14","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=14680"},"modified":"2022-01-09T22:45:02","modified_gmt":"2022-01-09T22:45:02","slug":"uma-funcao-quadratica-e-outra-afim","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=14680","title":{"rendered":"Uma fun\u00e7\u00e3o quadr\u00e1tica e outra afim"},"content":{"rendered":"<p><ul id='GTTabs_ul_14680' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_14680' class='GTTabs_curr'><a  id=\"14680_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_14680' ><a  id=\"14680_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_14680'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Considera a fun\u00e7\u00e3o definida, no conjunto dos n\u00fameros reais, por\u00a0\\(f\\left( x \\right) = 3{x^2}\\).<\/p>\n<ol>\n<li>Esbo\u00e7a o gr\u00e1fico de <em>f<\/em> num referencial cartesiano.<\/li>\n<li>Determina graficamente as solu\u00e7\u00f5es da equa\u00e7\u00e3o\u00a0\\(3{x^2} = 12x\\), determinando a interse\u00e7\u00e3o dos gr\u00e1ficos da fun\u00e7\u00e3o quadr\u00e1tica <em>f<\/em> e da fun\u00e7\u00e3o afim <em>g<\/em>, definida por\u00a0\\(g\\left( x \\right) = 12x\\).<\/li>\n<li>Determina analiticamente as solu\u00e7\u00f5es da equa\u00e7\u00e3o\u00a0\\(3{x^2} = 12x\\).<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_14680' onClick='GTTabs_show(1,14680)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_14680'>\n<span 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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, macro=Macros\r\nvar views = {'is3D': 0,'AV': 0,'SV': 1,'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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a anima\u00e7\u00e3o acima, esbo\u00e7a o gr\u00e1fico de <em>f<\/em> no referencial cartesiano.<\/li>\n<li>Utilizando a anima\u00e7\u00e3o acima, determina graficamente as solu\u00e7\u00f5es da equa\u00e7\u00e3o\u00a0\\(3{x^2} = 12x\\), determinando a interse\u00e7\u00e3o dos gr\u00e1ficos da fun\u00e7\u00e3o quadr\u00e1tica <em>f<\/em> e da fun\u00e7\u00e3o afim <em>g<\/em>, definida por\u00a0\\(g\\left( x \\right) = 12x\\).<\/li>\n<li>Determina\u00e7\u00e3o anal\u00edtica das solu\u00e7\u00f5es da equa\u00e7\u00e3o\u00a0\\(3{x^2} = 12x\\):<br \/>\n\\[\\begin{array}{*{20}{l}}{3{x^2} = 12x}&amp; \\Leftrightarrow &amp;{3{x^2} &#8211; 12x = 0}\\\\{}&amp; \\Leftrightarrow &amp;{3x\\left( {x &#8211; 4} \\right) = 0}\\\\{}&amp; \\Leftrightarrow &amp;{\\begin{array}{*{20}{c}}{3x = 0}&amp; \\vee &amp;{x &#8211; 4 = 0}\\end{array}}\\\\{}&amp; \\Leftrightarrow &amp;{\\begin{array}{*{20}{c}}{x = 0}&amp; \\vee &amp;{x = 4}\\end{array}}\\end{array}\\]<\/li>\n<\/ol>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_14680' onClick='GTTabs_show(0,14680)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Considera a fun\u00e7\u00e3o definida, no conjunto dos n\u00fameros reais, por\u00a0\\(f\\left( x \\right) = 3{x^2}\\). Esbo\u00e7a o gr\u00e1fico de f num referencial cartesiano. Determina graficamente as solu\u00e7\u00f5es da equa\u00e7\u00e3o\u00a0\\(3{x^2} = 12x\\), determinando&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":14080,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[213,97,249],"tags":[426,345,499],"series":[],"class_list":["post-14680","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-9--ano","category-aplicando","category-proporcionalidade-inversa-e-funcoes-algebricas","tag-9-o-ano","tag-funcao-afim","tag-funcao-quadratica"],"views":2060,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/Mat25.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/14680","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=14680"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/14680\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=14680"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=14680"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=14680"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=14680"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}