{"id":13150,"date":"2017-11-30T17:01:52","date_gmt":"2017-11-30T17:01:52","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=13150"},"modified":"2022-01-18T00:20:00","modified_gmt":"2022-01-18T00:20:00","slug":"a-planta-de-um-campo","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=13150","title":{"rendered":"A planta de um campo"},"content":{"rendered":"<p><ul id='GTTabs_ul_13150' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_13150' class='GTTabs_curr'><a  id=\"13150_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_13150' ><a  id=\"13150_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_13150'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/PlantaCampo.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"13151\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=13151\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/PlantaCampo.png\" data-orig-size=\"270,450\" data-comments-opened=\"1\" data-image-meta=\"{&quot;aperture&quot;:&quot;0&quot;,&quot;credit&quot;:&quot;&quot;,&quot;camera&quot;:&quot;&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;,&quot;orientation&quot;:&quot;0&quot;}\" data-image-title=\"Planta de um campo\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/PlantaCampo.png\" class=\"alignright size-medium wp-image-13151\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/PlantaCampo-180x300.png\" alt=\"\" width=\"180\" height=\"300\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/PlantaCampo-180x300.png 180w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/PlantaCampo.png 270w\" sizes=\"auto, (max-width: 180px) 100vw, 180px\" \/><\/a>A figura mostra a planta de um campo.<\/p>\n<ol style=\"list-style-type: lower-alpha;\">\n<li>Desenha-o \u00e0 escala de 1\/10 000.<\/li>\n<li>A \u00e1rvore est\u00e1 a 400 metros do canto D e a 350 metros do C.<br \/>\nLocaliza a \u00e1rvore no teu desenho.<\/li>\n<li>O Bernardo caminha atrav\u00e9s do campo sempre sempre \u00e0 mesma dist\u00e2ncia de A e C partindo da porta existente no lado [AC].<br \/>\nSitua a porta no desenho.<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_13150' onClick='GTTabs_show(1,13150)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_13150'>\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=\"margin: 0 auto;\"><\/div>\r\n<script>\r\nvar parameters = {\r\n\"id\": \"ggbApplet\",\r\n\"width\":730,\r\n\"height\":700,\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, 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,'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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class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_13150' onClick='GTTabs_show(0,13150)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado A figura mostra a planta de um campo. Desenha-o \u00e0 escala de 1\/10 000. A \u00e1rvore est\u00e1 a 400 metros do canto D e a 350 metros do C. Localiza a&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":20560,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,187],"tags":[426,188,191],"series":[],"class_list":["post-13150","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-lugares-geometricos","tag-9-o-ano","tag-circunferencia","tag-mediatriz"],"views":2904,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2017\/11\/9V1Pag108-2_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13150","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=13150"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/13150\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20560"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=13150"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=13150"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=13150"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=13150"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}