{"id":25758,"date":"2023-05-20T15:29:51","date_gmt":"2023-05-20T14:29:51","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=25758"},"modified":"2023-05-20T19:39:35","modified_gmt":"2023-05-20T18:39:35","slug":"dois-sistemas-de-equacoes","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=25758","title":{"rendered":"Dois sistemas de equa\u00e7\u00f5es"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_25758' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_25758' class='GTTabs_curr'><a  id=\"25758_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_25758' ><a  id=\"25758_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_25758'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Verifica, graficamente, se os sistemas s\u00e3o ou n\u00e3o equivalentes.<\/p>\n<p>\\[\\begin{array}{*{20}{c}}{\\left\\{ {\\begin{array}{*{20}{l}}{x &#8211; y = 3}\\\\{\\begin{array}{*{20}{l}}{2x + 2y = 10}\\end{array}}\\end{array}} \\right.}&amp;{\\rm{e}}&amp;{\\left\\{ {\\begin{array}{*{20}{l}}{ &#8211; x + y = &#8211; 3}\\\\{\\begin{array}{*{20}{l}}{x + y = 5}\\end{array}}\\end{array}} \\right.}\\end{array}\\]<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_25758' onClick='GTTabs_show(1,25758)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_25758'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<blockquote>\n<p>Verifica, graficamente, se os sistemas s\u00e3o ou n\u00e3o equivalentes.<\/p>\n<\/blockquote>\n<p>\\[\\begin{array}{*{20}{c}}{\\left\\{ {\\begin{array}{*{20}{l}}{x &#8211; y = 3}\\\\{\\begin{array}{*{20}{l}}{2x + 2y = 10}\\end{array}}\\end{array}} \\right.}&amp;{\\rm{e}}&amp;{\\left\\{ {\\begin{array}{*{20}{l}}{ &#8211; x + y = &#8211; 3}\\\\{\\begin{array}{*{20}{l}}{x + y = 5}\\end{array}}\\end{array}} \\right.}\\end{array}\\]<\/p>\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\": \"ggbApplet\",\r\n\"width\":745,\r\n\"height\":490,\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, 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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style=\"border-collapse: collapse; width: 100%; height: 100px;\">\n<tbody>\n<tr style=\"height: 20px;\">\n<td style=\"width: 25%; height: 20px;\">Sistema<\/td>\n<td style=\"width: 25%; height: 20px;\">Retas<\/td>\n<td style=\"width: 25%; height: 20px;\">Dois pontos das retas<\/td>\n<td style=\"width: 25%; height: 20px;\">Ponto de interse\u00e7\u00e3o das retas<\/td>\n<\/tr>\n<tr style=\"height: 20px;\">\n<td style=\"width: 25%; height: 40px; text-align: left;\" rowspan=\"2\">\\({\\left\\{ {\\begin{array}{*{20}{l}}{x &#8211; y = 3}\\\\{\\begin{array}{*{20}{l}}{2x + 2y = 10}\\end{array}}\\end{array}} \\right.}\\)<\/td>\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(r:\\quad x &#8211; y = 3\\)<\/td>\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(A\\left( { &#8211; 2, &#8211; 5} \\right)\\) e \\(B\\left( {5,2} \\right)\\)<\/td>\n<td style=\"width: 25%; height: 40px;\" rowspan=\"2\">\\(S\\left( {4,1} \\right)\\)<\/td>\n<\/tr>\n<tr style=\"height: 20px;\">\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(s:\\quad 2x + 2y = 10\\)<\/td>\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(C\\left( {0,5} \\right)\\) e \\(D\\left( {5,0} \\right)\\)<\/td>\n<\/tr>\n<tr style=\"height: 20px;\">\n<td style=\"width: 25%; height: 40px; text-align: left;\" rowspan=\"2\">\\({\\left\\{ {\\begin{array}{*{20}{l}}{ &#8211; x + y = &#8211; 3}\\\\{\\begin{array}{*{20}{l}}{x + y = 5}\\end{array}}\\end{array}} \\right.}\\)<\/td>\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(u:\\quad &#8211; x + y = &#8211; 3\\)<\/td>\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(E\\left( {7,4} \\right)\\) e \\(F\\left( {0, &#8211; 3} \\right)\\)<\/td>\n<td style=\"width: 25%; height: 40px;\" rowspan=\"2\">\\(S\\left( {4,1} \\right)\\)<\/td>\n<\/tr>\n<tr style=\"height: 20px;\">\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(v:\\quad x + y = 5\\)<\/td>\n<td style=\"width: 25%; height: 20px; text-align: left;\">\\(G\\left( { &#8211; 2,7} \\right)\\) e \\(H\\left( {6, &#8211; 1} \\right)\\)<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<p>Os sistemas s\u00e3o equivalentes, pois graficamente verifica-se que t\u00eam a mesma solu\u00e7\u00e3o: \\(S\\left( {4,1} \\right)\\).<\/p>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_25758' onClick='GTTabs_show(0,25758)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Verifica, graficamente, se os sistemas s\u00e3o ou n\u00e3o equivalentes. \\[\\begin{array}{*{20}{c}}{\\left\\{ {\\begin{array}{*{20}{l}}{x &#8211; y = 3}\\\\{\\begin{array}{*{20}{l}}{2x + 2y = 10}\\end{array}}\\end{array}} \\right.}&amp;{\\rm{e}}&amp;{\\left\\{ {\\begin{array}{*{20}{l}}{ &#8211; x + y = &#8211; 3}\\\\{\\begin{array}{*{20}{l}}{x + y =&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":19189,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,714],"tags":[424,345,239],"series":[],"class_list":["post-25758","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-equacoes-literais-e-sistemas","tag-8-o-ano","tag-funcao-afim","tag-sistema-de-equacoes"],"views":66,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2021\/12\/Mat75.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/25758","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=25758"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/25758\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/19189"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=25758"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=25758"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=25758"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=25758"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}