{"id":22438,"date":"2022-10-19T13:44:07","date_gmt":"2022-10-19T12:44:07","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=22438"},"modified":"2022-10-19T16:31:11","modified_gmt":"2022-10-19T15:31:11","slug":"representa-na-reta-numerica","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=22438","title":{"rendered":"Representa na reta num\u00e9rica"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_22438' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_22438' class='GTTabs_curr'><a  id=\"22438_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_22438' ><a  id=\"22438_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_22438'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Representa na reta num\u00e9rica o n\u00famero racional \\(2,\\left( 3 \\right)\\) come\u00e7ando por represent\u00e1-lo na forma de fra\u00e7\u00e3o e, em seguida, como numeral misto.<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_22438' onClick='GTTabs_show(1,22438)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_22438'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<p>A representa\u00e7\u00e3o do n\u00famero racional considerado, na forma de fra\u00e7\u00e3o e de numeral misto, s\u00e3o as seguintes:<\/p>\n<p>\\[2,\\left( 3 \\right) = 2 + 0,\\left( 3 \\right) = 2 + \\frac{1}{3} = \\frac{7}{3} = 2\\frac{1}{3}\\]<\/p>\n<p>Na reta num\u00e9rica, o n\u00famero considerado \u00e9 a abcissa do ponto P.<\/p>\n<p>\u00a0<\/p>\n<p style=\"text-align: center;\"><meta name=viewport 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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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','data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWgAAAA+CAMAAAAxm3G5AAACPVBMVEUAAAD\/\/\/\/Ly8v\/\/\/+UlJT\/\/\/\/\/\/\/\/\/\/\/\/z8\/P\/\/\/+wsLDi4uJubm78\/Pz4+Pj\/\/\/\/\/\/\/\/\/\/\/96enrs7Oy+vr7\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/X19eGhoaUlJT\/\/\/\/\/\/\/+hoaH\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/9vb2\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/96enqHh4f\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/\/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','data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFAAAABQCAMAAAC5zwKfAAAAhFBMVEUAAABmZmb\/\/\/9qampsbGz+\/v6qqqpvb29ubm6enp6rq6t3d3d1dXVxcXH6+vqCgoJ+fn719fXv7+\/n5+eTk5N0dHSXl5eNjY2KioqIiIji4uLe3t6UlJSQkJDr6+vW1tbCwsK5ubmioqK7u7uzs7OmpqaFhYXk5OR7e3vNzc3Jycmvr6833NujAAAAAXRSTlMAQObYZgAAAlhJREFUWMPVmNuW2jAMRS2Ogk0JCZBwvzPATNv\/\/7\/SdrqyBoxl2U\/dH7DXUeSLYvP\/czrPAPAdgG+DTNsCRKAvMJKlQwLIA4BWb2st02tAQ13OFcloSncUR2wnmGKZG5k3gKIBRN8H6YAQ0pGacchHKawEnxo4wadn5vdZSmbr37rpYOcRgjKA4NMzevQtBaF68TBlgogOQ5Wavxww\/ta1I4e0iOQBx6poTmwpFtf5BuShnPTuNH2GvmbrPeF7f6jWu1jlLNhi\/lb0PpVNbaH6iqW3gH7R+8fk+9BSBG3XEn\/Cjv0RHB+RpIR3iubMiBS2QWGn3LSOo64DhEvuqN5XFhERSUrYMT3MHAVgSehRnsCCUCj5ieYMDpa8lRM+dmduERigakHoYbKvnV+4vAuXJJTsVR4An7C+C8dSQj9rfnE+LJ0o9PMT\/jYPZonCDfuF1zJR+PZC2E8UNsNX1\/MtRVhtxnh1Oiz0y6ZYDxgv1+FCnbC5gkMDslI4PQp7WSecrJ+ulxxhNV1YiOchYoXFumUmEoUc1+Vi3xdvvrqbNcWE0x\/MJGGihZPDeASKFQ6lkqtp7UAypfkEwYTV+9ZBN34hlHB\/YdYO7lePEdvi776wluLAxQQjYvO7Fx8WKUP2HPSMPV1KBkWzFP8bmUmBe3gYoEyQ9Gcmr8GOEWXB5pFzXkbzTEkZ1J1HXbTc4fzGIOPVRv6A+VXDBOBEXyAjSMfYSOTEy30QgjNRrEBRsOaBOIKb0TA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class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_22438' onClick='GTTabs_show(0,22438)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Representa na reta num\u00e9rica o n\u00famero racional \\(2,\\left( 3 \\right)\\) come\u00e7ando por represent\u00e1-lo na forma de fra\u00e7\u00e3o e, em seguida, como numeral misto. Resolu\u00e7\u00e3o &gt;&gt; Resolu\u00e7\u00e3o &lt;&lt; Enunciado<\/p>\n","protected":false},"author":1,"featured_media":19234,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,664],"tags":[424,261,666],"series":[],"class_list":["post-22438","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-numeros-reais","tag-8-o-ano","tag-dizima","tag-dizima-infinita-periodica"],"views":173,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2021\/12\/Mat76.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/22438","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=22438"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/22438\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=22438"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=22438"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=22438"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=22438"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}