{"id":23282,"date":"2022-11-22T08:42:35","date_gmt":"2022-11-22T08:42:35","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=23282"},"modified":"2022-11-24T19:07:19","modified_gmt":"2022-11-24T19:07:19","slug":"um-bambu-partiu-se","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=23282","title":{"rendered":"Um bambu partiu-se"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_23282' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_23282' class='GTTabs_curr'><a  id=\"23282_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_23282' ><a  id=\"23282_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_23282'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag31-4.jpg\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"6060\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=6060\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag31-4.jpg\" data-orig-size=\"389,475\" 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=\"Bambu\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag31-4.jpg\" class=\"alignright wp-image-6060\" title=\"Bambu\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag31-4-245x300.jpg\" alt=\"\" width=\"240\" height=\"293\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag31-4-245x300.jpg 245w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag31-4-122x150.jpg 122w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag31-4.jpg 389w\" sizes=\"auto, (max-width: 240px) 100vw, 240px\" \/><\/a>O seguinte problema \u00e9 adaptado do livro chin\u00eas <em>Nove Cap\u00edtulos da Arte Matem\u00e1tica<\/em>, so s\u00e9c. I a.C.<\/p>\n<p>Um bambu partiu-se, a uma altura do ch\u00e3o de 2,275 m, e a parte de cima, ao cair, tocou o ch\u00e3o, a uma dist\u00e2ncia de 1,5 m da base do bambu.<\/p>\n<p>Qual era a altura do bambu, antes de se ter partido?<\/p>\n<p>Resolve o problema e apresenta todos os c\u00e1lculos que efetuares.<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_23282' onClick='GTTabs_show(1,23282)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_23282'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<p><script src=\"https:\/\/cdn.geogebra.org\/apps\/deployggb.js\"><\/script>\r\n<div id=\"ggbApplet\" style=\"float: right;\"><\/div>\r\n<script>\r\nvar parameters = {\r\n\"id\": \"ggbApplet\",\r\n\"width\":286,\r\n\"height\":361,\r\n\"showMenuBar\":false,\r\n\"showAlgebraInput\":false,\r\n\"showToolBar\":false,\r\n\"customToolBar\":\"0 39 | 1 501 67 , 5 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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': 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><\/p>\n<p>Aplicando o Teorema de Pit\u00e1goras no tri\u00e2ngulo ret\u00e2ngulo [ABC], temos:<\/p>\n<p style=\"text-align: center;\">${{\\overline{AC}}^{2}}={{\\overline{AB}}^{2}}+{{\\overline{BC}}^{2}}$.<\/p>\n<p>Logo,<\/p>\n<p style=\"text-align: center;\">$\\begin{array}{*{35}{l}}<br \/>{{\\overline{AC}}^{2}}={{2,275}^{2}}+{{1,5}^{2}} &amp; \\Leftrightarrow\u00a0 &amp; {{\\overline{AC}}^{2}}=5,175625+2,25\u00a0 \\\\<br \/>{} &amp; \\Leftrightarrow\u00a0 &amp; {{\\overline{AC}}^{2}}=7,425625\u00a0 \\\\<br \/>{} &amp; \\Leftrightarrow\u00a0 &amp; \\overline{AC}=\\sqrt{7,425625}\u00a0 \\\\<br \/>{} &amp; \\Leftrightarrow\u00a0 &amp; \\overline{AC}=2,725\u00a0 \\\\<br \/>\\end{array}$<\/p>\n<p>Portanto, antes de se ter partido, o bambu tinha $h=\\overline{AB}+\\overline{AC}=2,275+2,725=5\\,m$ de altura.<\/p>\n<p>\u00a0<\/p>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_23282' onClick='GTTabs_show(0,23282)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado O seguinte problema \u00e9 adaptado do livro chin\u00eas Nove Cap\u00edtulos da Arte Matem\u00e1tica, so s\u00e9c. I a.C. Um bambu partiu-se, a uma altura do ch\u00e3o de 2,275 m, e a parte&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20667,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,682],"tags":[424,67,118],"series":[],"class_list":["post-23282","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-teorema-de-pitagoras","tag-8-o-ano","tag-geometria","tag-teorema-de-pitagoras"],"views":190,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/8V1Pag031-4_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/23282","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=23282"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/23282\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20667"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=23282"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=23282"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=23282"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=23282"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}