{"id":6224,"date":"2010-11-28T00:45:53","date_gmt":"2010-11-28T00:45:53","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=6224"},"modified":"2022-01-19T19:14:10","modified_gmt":"2022-01-19T19:14:10","slug":"a-casa-construida-pelo-sr-antonio","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=6224","title":{"rendered":"A casa constru\u00edda pelo Sr. Ant\u00f3nio"},"content":{"rendered":"<p><ul id='GTTabs_ul_6224' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_6224' class='GTTabs_curr'><a  id=\"6224_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_6224' ><a  id=\"6224_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_6224'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14.jpg\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"6225\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=6225\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14.jpg\" data-orig-size=\"504,661\" data-comments-opened=\"1\" data-image-meta=\"{&quot;aperture&quot;:&quot;0&quot;,&quot;credit&quot;:&quot;&quot;,&quot;camera&quot;:&quot;HP pstc4380&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;}\" data-image-title=\"Casa\" data-image-description=\"\" data-image-caption=\"\" data-medium-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14-228x300.jpg\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14.jpg\" class=\"alignright wp-image-6225\" title=\"Casa\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14-228x300.jpg\" alt=\"\" width=\"300\" height=\"393\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14-228x300.jpg 228w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14-114x150.jpg 114w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14-400x524.jpg 400w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag-33-14.jpg 504w\" sizes=\"auto, (max-width: 300px) 100vw, 300px\" \/><\/a>A figura ao lado mostra uma casa constru\u00edda pelo Ar. Ant\u00f3nio no interior de um terreno retangular.<\/p>\n<ol>\n<li>Se o Sr. Ant\u00f3nio quiser p\u00f4r relva no terreno restante, que \u00e1rea de relva ele dever\u00e1 comprar?<\/li>\n<li>No ponto A existe uma torneira. O Sr. Ant\u00f3nio tem uma mangueira de 35 m de comprimento, que projeta \u00e1gua, no m\u00e1ximo, at\u00e9 5 m.<br \/>\nConseguir\u00e1 ele regar toda a relva plantada?<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_6224' onClick='GTTabs_show(1,6224)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_6224'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<ol>\n<li><span class=\"alignright\"><script src=\"https:\/\/cdn.geogebra.org\/apps\/deployggb.js\"><\/script>\r\n<div id=\"ggbApplet\" style=\"text-align: right\"><\/div>\r\n<script>\r\nvar parameters = {\r\n\"id\": \"ggbApplet\",\r\n\"width\":310,\r\n\"height\":398,\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 , 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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, PV=Python, macro=Macro View\r\nvar views = {'is3D': 0,'AV': 0,'SV': 0,'CV': 0,'EV2': 0,'CP': 1,'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><\/span>Tendo em considera\u00e7\u00e3o os dados indicados na figura, temos:\n<p>$$\\begin{array}{*{35}{l}}<br \/>\nA &amp; = &amp; {{A}_{T}}-{{A}_{1}}-{{A}_{2}}\u00a0 \\\\<br \/>\n{} &amp; = &amp; 20\\times 30-12\\times 7-8\\times (9-7)\u00a0 \\\\<br \/>\n{} &amp; = &amp; 600-84-16\u00a0 \\\\<br \/>\n{} &amp; = &amp; 500\u00a0 \\\\<br \/>\n\\end{array}$$<\/p>\n<p>Logo, o Sr. Ant\u00f3nio dever\u00e1 comprar $500\\,{{m}^{2}}$ de relva.<br \/>\n\u00ad<\/p>\n<\/li>\n<li>\n<p>Tendo em considera\u00e7\u00e3o os dados indicados na figura, temos:<\/p>\n<p>$$\\overline{AB}=\\sqrt{{{(11+9)}^{2}}+{{(20-12)}^{2}}}=\\sqrt{{{20}^{2}}+{{8}^{2}}}=\\sqrt{464}$$<\/p>\n<p>$$\\overline{BC}=\\sqrt{{{12}^{2}}+{{10}^{2}}}=\\sqrt{144+10}=\\sqrt{244}$$<\/p>\n<p>Assim, $\\overline{AB}+\\overline{BC}=\\sqrt{464}+\\sqrt{244}\\simeq 37,2\\,m$.<\/p>\n<p>Portanto, o Sr. Ant\u00f3nio conseguir\u00e1 regar toda a relva plantada, pois $\\overline{AB}+\\overline{BC}&lt;40\\,m$.<\/p>\n<\/li>\n<\/ol>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_6224' onClick='GTTabs_show(0,6224)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado A figura ao lado mostra uma casa constru\u00edda pelo Ar. Ant\u00f3nio no interior de um terreno retangular. Se o Sr. Ant\u00f3nio quiser p\u00f4r relva no terreno restante, que \u00e1rea de relva&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20677,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,112],"tags":[424,67,118],"series":[],"class_list":["post-6224","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-decomposicao-de-figuras-teorema-de-pitagoras","tag-8-o-ano","tag-geometria","tag-teorema-de-pitagoras"],"views":1814,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/8V1Pag033-14_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/6224","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=6224"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/6224\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20677"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=6224"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=6224"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=6224"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=6224"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}