{"id":23877,"date":"2022-12-26T17:56:15","date_gmt":"2022-12-26T17:56:15","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=23877"},"modified":"2023-01-09T22:29:36","modified_gmt":"2023-01-09T22:29:36","slug":"considera-o-triangulo-tri","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=23877","title":{"rendered":"Considera o tri\u00e2ngulo [TRI]"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_23877' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_23877' class='GTTabs_curr'><a  id=\"23877_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_23877' ><a  id=\"23877_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_23877'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Considera o tri\u00e2ngulo [TRI] cujas coordenadas s\u00e3o \\(T\\left( {2,5} \\right)\\), \\(R\\left( {5,4} \\right)\\), \\(I\\left( {3,2} \\right)\\) e os vetores \\(\\vec a = \\overrightarrow {TI} \\) e \\(\\vec b = \\overrightarrow {RT} \\).<\/p>\n<ol>\n<li>Desenha o tri\u00e2ngulo [TRI] num sistema de eixos cartesianos.<\/li>\n<li>Aplica ao tri\u00e2ngulo [TRI] a transla\u00e7\u00e3o de vetor \\(\\vec a = \\overrightarrow {TI} \\).<br \/>Designa o novo tri\u00e2ngulo por [T&#8217;R&#8217;I&#8217;].<\/li>\n<li>Aplica ao tri\u00e2ngulo [T&#8217;R&#8217;I&#8217; a transla\u00e7\u00e3o de vetor \\(\\vec b = \\overrightarrow {RT} \\).<br \/>Designa o novo tri\u00e2ngulo por [T&#8221;R&#8221;I&#8221;].<\/li>\n<li>Qual \u00e9 o vetor da transla\u00e7\u00e3o que se dever\u00e1 aplicar ao tri\u00e2ngulo [TRI] para obter o tri\u00e2ngulo [T&#8221;R&#8221;I&#8221;]?<\/li>\n<li>Qual \u00e9 o vetor da transla\u00e7\u00e3o que se dever\u00e1 aplicar ao tri\u00e2ngulo [T&#8221;R&#8221;I&#8221;] para obter o tri\u00e2ngulo [TRI]?<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_23877' onClick='GTTabs_show(1,23877)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_23877'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<blockquote>\n<p>Considera o tri\u00e2ngulo [TRI] cujas coordenadas s\u00e3o \\(T\\left( {2,5} \\right)\\), \\(R\\left( {5,4} \\right)\\), \\(I\\left( {3,2} \\right)\\) e os vetores \\(\\vec a = \\overrightarrow {TI} \\) e \\(\\vec b = \\overrightarrow {RT} \\).<\/p>\n<\/blockquote>\n<ol>\n<li>Desenha o tri\u00e2ngulo [TRI] num sistema de eixos cartesianos.<\/li>\n<li>Aplica ao tri\u00e2ngulo [TRI] a transla\u00e7\u00e3o de vetor \\(\\vec a = \\overrightarrow {TI} \\).<br \/>Designa o novo tri\u00e2ngulo por [T&#8217;R&#8217;I&#8217;].<\/li>\n<li>Aplica ao tri\u00e2ngulo [T&#8217;R&#8217;I&#8217; a transla\u00e7\u00e3o de vetor \\(\\vec b = \\overrightarrow {RT} \\).<br \/>Designa o novo tri\u00e2ngulo por [T&#8221;R&#8221;I&#8221;].<\/li>\n<li>Qual \u00e9 o vetor da transla\u00e7\u00e3o que se dever\u00e1 aplicar ao tri\u00e2ngulo [TRI] para obter o tri\u00e2ngulo [T&#8221;R&#8221;I&#8221;]?<br \/><span style=\"color: #0000ff;\">\u00c9 o vetor \\(\\overrightarrow {RI} = \\vec a + \\vec b\\).<\/span><\/li>\n<li>Qual \u00e9 o vetor da transla\u00e7\u00e3o que se dever\u00e1 aplicar ao tri\u00e2ngulo [T&#8221;R&#8221;I&#8221;] para obter o tri\u00e2ngulo [TRI]?<br \/><span style=\"color: #0000ff;\">\u00c9 o vetor \\(\\overrightarrow {IR} \\).<\/span><\/li>\n<\/ol>\n<p><br \/><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\": 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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': 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_23877' onClick='GTTabs_show(0,23877)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Considera o tri\u00e2ngulo [TRI] cujas coordenadas s\u00e3o \\(T\\left( {2,5} \\right)\\), \\(R\\left( {5,4} \\right)\\), \\(I\\left( {3,2} \\right)\\) e os vetores \\(\\vec a = \\overrightarrow {TI} \\) e \\(\\vec b = \\overrightarrow 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