{"id":25041,"date":"2023-04-14T12:25:59","date_gmt":"2023-04-14T11:25:59","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=25041"},"modified":"2023-04-22T17:02:49","modified_gmt":"2023-04-22T16:02:49","slug":"duas-retas-paralelas","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=25041","title":{"rendered":"Duas retas paralelas"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_25041' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_25041' class='GTTabs_curr'><a  id=\"25041_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_25041' ><a  id=\"25041_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_25041'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/04\/8_Pag168-T3.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"25042\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=25042\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/04\/8_Pag168-T3.png\" data-orig-size=\"309,459\" data-comments-opened=\"1\" data-image-meta=\"{&quot;aperture&quot;:&quot;0&quot;,&quot;credit&quot;:&quot;&quot;,&quot;camera&quot;:&quot;&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;,&quot;orientation&quot;:&quot;0&quot;}\" data-image-title=\"8_Pag168-T3\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/04\/8_Pag168-T3.png\" class=\"wp-image-25042 aligncenter\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/04\/8_Pag168-T3-202x300.png\" alt=\"\" width=\"220\" height=\"327\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/04\/8_Pag168-T3-202x300.png 202w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/04\/8_Pag168-T3.png 309w\" sizes=\"auto, (max-width: 220px) 100vw, 220px\" \/><\/a><\/p>\n<p>No referencial cartesiano est\u00e3o representadas duas retas paralelas <strong><em>r<\/em><\/strong> e <strong><em>s<\/em><\/strong>.<\/p>\n<p>Sabendo que a reta <strong><em>r<\/em><\/strong> \u00e9 o gr\u00e1fico da fun\u00e7\u00e3o \\(y = 5x\\), indica a express\u00e3o alg\u00e9brica que define a fun\u00e7\u00e3o cujo gr\u00e1fico \u00e9 a reta <strong><em>s<\/em><\/strong>.<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_25041' onClick='GTTabs_show(1,25041)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_25041'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<blockquote>\n<p>No referencial cartesiano est\u00e3o representadas duas retas paralelas <strong><em>r<\/em><\/strong> e <strong><em>s<\/em><\/strong>.<\/p>\n<p>Sabendo que a reta <strong><em>r<\/em><\/strong> \u00e9 o gr\u00e1fico da fun\u00e7\u00e3o \\(y = 5x\\), indica a express\u00e3o alg\u00e9brica que define a fun\u00e7\u00e3o cujo gr\u00e1fico \u00e9 a reta <strong><em>s<\/em><\/strong>.<\/p>\n<\/blockquote>\n<p>\u00a0<\/p>\n<p><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': 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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class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_25041' onClick='GTTabs_show(0,25041)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado No referencial cartesiano est\u00e3o representadas duas retas paralelas r e s. 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