{"id":5716,"date":"2010-11-19T02:24:44","date_gmt":"2010-11-19T02:24:44","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=5716"},"modified":"2022-01-19T18:04:43","modified_gmt":"2022-01-19T18:04:43","slug":"rascunho-32","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=5716","title":{"rendered":"Calcula a \u00e1rea das figuras"},"content":{"rendered":"<p><ul id='GTTabs_ul_5716' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_5716' class='GTTabs_curr'><a  id=\"5716_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_5716' ><a  id=\"5716_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_5716'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Calcula a \u00e1rea das figuras decompondo-as em tri\u00e2ngulos e\/ou quadril\u00e1teros, considerando as medidas indicadas expressas em cent\u00edmetros.<\/p>\n<p style=\"text-align: center;\"><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8.jpg\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"5722\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=5722\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8.jpg\" data-orig-size=\"603,159\" 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=\"pag24-8\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8.jpg\" class=\"aligncenter wp-image-5722 size-full\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8.jpg\" alt=\"\" width=\"603\" height=\"159\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8.jpg 603w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8-300x79.jpg 300w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8-150x39.jpg 150w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/pag24-8-400x105.jpg 400w\" sizes=\"auto, (max-width: 603px) 100vw, 603px\" \/><\/a><\/p>\n<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_5716' onClick='GTTabs_show(1,5716)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_5716'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/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\":628,\r\n\"height\":155,\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\"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': 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>Na figura da al\u00ednea a), A1 \u00e9 um quadrado, A2 um trap\u00e9zio e A3 um ret\u00e2ngulo.<br \/>\nLogo, a \u00e1rea da figura da al\u00ednea a) \u00e9 \\[\\begin{array}{*{35}{l}}<br \/>\n{{A}_{a)}} &amp; = &amp; {{A}_{1}}+{{A}_{2}}+{{A}_{3}}\u00a0 \\\\<br \/>\n{} &amp; = &amp; (3\\times 3)+\\left( \\frac{10+6}{2}\\times 3 \\right)+(10\\times 2)\u00a0 \\\\<br \/>\n{} &amp; = &amp; 9+24+20\u00a0 \\\\<br \/>\n{} &amp; = &amp; 53\\,\\,c{{m}^{2}}\u00a0 \\\\<br \/>\n\\end{array}\\]<\/p>\n<p>Na figura da al\u00ednea b), A1 \u00e9 um ret\u00e2ngulo, A2 um ret\u00e2ngulo e A3 um paralelogramo.<br \/>\nLogo, a \u00e1rea da figura da al\u00ednea b) \u00e9 \\[\\begin{array}{*{35}{l}}<br \/>\n{{A}_{b)}} &amp; = &amp; {{A}_{1}}+{{A}_{2}}+{{A}_{3}}\u00a0 \\\\<br \/>\n{} &amp; = &amp; (6\\times 2)+(4\\times 2)+(5\\times 2)\u00a0 \\\\<br \/>\n{} &amp; = &amp; 12+8+10\u00a0 \\\\<br \/>\n{} &amp; = &amp; 30\\,\\,c{{m}^{2}}\u00a0 \\\\<br \/>\n\\end{array}\\]<\/p>\n<p>Na figura da al\u00ednea c), A1 \u00e9 um tri\u00e2ngulo, A2 um trap\u00e9zio e A3 um quadrado.<br \/>\nLogo, a \u00e1rea da figura da al\u00ednea c) \u00e9 \\[\\begin{array}{*{35}{l}}<br \/>\n{{A}_{c)}} &amp; = &amp; {{A}_{1}}+{{A}_{2}}+{{A}_{3}}\u00a0 \\\\<br \/>\n{} &amp; = &amp; (\\frac{6\\times 5}{2})+\\left( \\frac{5+3}{2}\\times 1,5 \\right)+(3\\times 3)\u00a0 \\\\<br \/>\n{} &amp; = &amp; 15+6+9\u00a0 \\\\<br \/>\n{} &amp; = &amp; 30\\,\\,c{{m}^{2}}\u00a0 \\\\<br \/>\n\\end{array}\\]<\/p>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_5716' onClick='GTTabs_show(0,5716)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Calcula a \u00e1rea das figuras decompondo-as em tri\u00e2ngulos e\/ou quadril\u00e1teros, considerando as medidas indicadas expressas em cent\u00edmetros. Resolu\u00e7\u00e3o &gt;&gt; Resolu\u00e7\u00e3o &lt;&lt; Enunciado<\/p>\n","protected":false},"author":1,"featured_media":20660,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,112],"tags":[424,108,67,107,113,106],"series":[],"class_list":["post-5716","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-area","tag-geometria","tag-paralelogramo","tag-trapezio","tag-triangulos"],"views":3961,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2010\/11\/8V1Pag024-8_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/5716","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=5716"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/5716\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/20660"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=5716"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=5716"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=5716"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=5716"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}