{"id":6722,"date":"2011-04-10T21:26:42","date_gmt":"2011-04-10T20:26:42","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=6722"},"modified":"2026-06-05T00:06:19","modified_gmt":"2026-06-04T23:06:19","slug":"considere-as-funcoes-reais-de-variavel-real","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=6722","title":{"rendered":"Considere as fun\u00e7\u00f5es reais de vari\u00e1vel real"},"content":{"rendered":"<\/p>\n<p><ul id='GTTabs_ul_6722' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_6722' class='GTTabs_curr'><a  id=\"6722_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_6722' ><a  id=\"6722_1\" onMouseOver=\"GTTabsShowLinks('Resolu\u00e7\u00e3o'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Resolu\u00e7\u00e3o<\/a><\/li>\n<li id='GTTabs_li_2_6722' ><a  id=\"6722_2\" onMouseOver=\"GTTabsShowLinks('Gr\u00e1ficos'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Gr\u00e1ficos<\/a><\/li>\n<\/ul>\n\n<div class='GTTabs_divs GTTabs_curr_div' id='GTTabs_0_6722'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Considere as fun\u00e7\u00f5es reais de vari\u00e1vel real assim definidas: \\[\\begin{matrix}<br \/>\nf:x\\to \\sqrt{x-2}+1 &amp; {} &amp; g:x\\to \\sqrt{2{{x}^{2}}-9}-x\u00a0 \\\\<br \/>\n\\end{matrix}\\]<\/p>\n<ol>\n<li>Determine os dom\u00ednios de f e de g.<\/li>\n<li>Determine os zeros de cada uma das fun\u00e7\u00f5es.<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_6722' onClick='GTTabs_show(1,6722)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_6722'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<ol>\n<li>${{D}_{f}}=\\left\\{ x\\in \\mathbb{R}:x-2\\ge 0 \\right\\}=\\left[ 2,+\\infty\u00a0 \\right[$\n<p>${{D}_{g}}=\\left\\{ x\\in \\mathbb{R}:2{{x}^{2}}-9\\ge 0 \\right\\}=\\left] -\\infty ,-\\frac{3\\sqrt{2}}{2} \\right]\\cup \\left[ \\frac{3\\sqrt{2}}{2},+\\infty\u00a0 \\right[$<\/p>\n<p><a href=\"https:\/\/www.wolframalpha.com\/input\/?i=2x%5E2-9%3D0\">Gr\u00e1fico de $y=2{{x}^{2}}-9$<\/a><\/p>\n<\/li>\n<li>Ora,<br \/>\n\\[\\begin{array}{*{35}{l}}<br \/>\nf(x)=0 &amp; \\Leftrightarrow\u00a0 &amp; \\sqrt{x-2}+1=0\u00a0 \\\\<br \/>\n{} &amp; \\Leftrightarrow\u00a0 &amp; \\sqrt{x-2}=-1\u00a0 \\\\<br \/>\n{} &amp; \\Leftrightarrow\u00a0 &amp; x\\in \\left\\{ {} \\right\\}\u00a0 \\\\<br \/>\n\\end{array}\\]<br \/>\nPortanto, a fun\u00e7\u00e3o f n\u00e3o tem zeros.<\/p>\n<p>\\[\\begin{array}{*{35}{l}}<br \/>\n\\sqrt{2{{x}^{2}}-9}-x=0 &amp; \\Leftrightarrow\u00a0 &amp; \\sqrt{2{{x}^{2}}-9}=x\u00a0 \\\\<br \/>\n{} &amp; \\Rightarrow\u00a0 &amp; 2{{x}^{2}}-9={{x}^{2}}\u00a0 \\\\<br \/>\n{} &amp; \\Leftrightarrow\u00a0 &amp; {{x}^{2}}=9\u00a0 \\\\<br \/>\n{} &amp; \\Leftrightarrow\u00a0 &amp; x=-3\\vee x=3\u00a0 \\\\<br \/>\n\\end{array}\\]<br \/>\n<strong>Verifica\u00e7\u00e3o<\/strong>:<\/p>\n<p>$\\sqrt{2\\times {{(-3)}^{2}}-9}-(-3)=0\\Leftrightarrow \\sqrt{9}+3=0$ \u00e9 uma proposi\u00e7\u00e3o falsa (Logo, -3 n\u00e3o \u00e9 solu\u00e7\u00e3o da condi\u00e7\u00e3o);<\/p>\n<p>$\\sqrt{2\\times {{3}^{2}}-9}-3=0\\Leftrightarrow \\sqrt{9}-3=0$ \u00e9 uma proposi\u00e7\u00e3o verdadeira (Logo, 3 \u00e9 solu\u00e7\u00e3o da condi\u00e7\u00e3o).<\/p>\n<p>Portanto, a fun\u00e7\u00e3o g tem apenas um zero: $x=3$.<\/p>\n<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_6722' onClick='GTTabs_show(0,6722)'>&lt;&lt; Enunciado<\/a><\/span><span class='GTTabs_nav_next'><a href='#GTTabs_ul_6722' onClick='GTTabs_show(2,6722)'>Gr\u00e1ficos &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_2_6722'>\n<span class='GTTabs_titles'><b>Gr\u00e1ficos<\/b><\/span><\/p>\n<p style=\"text-align: center;\"><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\":714,\r\n\"height\":387,\r\n\"showMenuBar\":false,\r\n\"showAlgebraInput\":false,\r\n\"showToolBar\":false,\r\n\"customToolBar\":\"0 39 | 1 501 67 , 5 19 , 72 | 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 | 30 29 54 32 31 33 | 17 26 62 73 , 14 68 | 25 52 60 61 | 40 41 42 , 27 28 35 , 6\",\r\n\"showToolBarHelp\":false,\r\n\"showResetIcon\":true,\r\n\"enableLabelDrags\":false,\r\n\"enableShiftDragZoom\":false,\r\n\"enableRightClick\":false,\r\n\"errorDialogsActive\":false,\r\n\"useBrowserForJS\":false,\r\n\"preventFocus\":false,\r\n\"showFullscreenButton\":true,\r\n\"language\":\"pt\",\r\n\/\/ use this instead of ggbBase64 to load a material from GeoGebraTube\r\n\/\/ \"material_id\":12345,\r\n\"ggbBase64\":\"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\"};\r\n\/\/ 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, PV=Python, macro=Macro View\r\nvar views = {'is3D': 0,'AV': 0,'SV': 0,'CV': 0,'EV2': 0,'CP': 0,'PC': 0,'DA': 0,'FI': 0,'PV': 0,'macro': 0};\r\nvar applet = new GGBApplet(parameters, '5.0', views);\r\nwindow.onload = function() {applet.inject('ggbApplet')};\r\n<\/script><\/p>\n<p style=\"text-align: left;\">\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_6722' onClick='GTTabs_show(1,6722)'>&lt;&lt; Resolu\u00e7\u00e3o<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Considere as fun\u00e7\u00f5es reais de vari\u00e1vel real assim definidas: \\[\\begin{matrix} f:x\\to \\sqrt{x-2}+1 &amp; {} &amp; g:x\\to \\sqrt{2{{x}^{2}}-9}-x\u00a0 \\\\ \\end{matrix}\\] Determine os dom\u00ednios de f e de g. Determine os zeros de&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":14109,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[98,97,157],"tags":[158],"series":[],"class_list":["post-6722","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-11--ano","category-aplicando","category-funcoes-com-radicais","tag-funcoes-com-radicais-2"],"views":2572,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2018\/03\/Mat51.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/6722","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=6722"}],"version-history":[{"count":1,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/6722\/revisions"}],"predecessor-version":[{"id":27870,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/6722\/revisions\/27870"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=6722"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=6722"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=6722"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=6722"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}