{"id":24174,"date":"2023-01-04T10:24:11","date_gmt":"2023-01-04T10:24:11","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=24174"},"modified":"2023-01-17T23:39:08","modified_gmt":"2023-01-17T23:39:08","slug":"seis-rotacoes","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=24174","title":{"rendered":"Seis rota\u00e7\u00f5es"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_24174' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_24174' class='GTTabs_curr'><a  id=\"24174_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_24174' ><a  id=\"24174_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_24174'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"24175\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=24175\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png\" data-orig-size=\"495,468\" 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=\"8_Pag109-12\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png\" class=\"alignright wp-image-24175\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12-300x284.png\" alt=\"\" width=\"340\" height=\"321\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12-300x284.png 300w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png 495w\" sizes=\"auto, (max-width: 340px) 100vw, 340px\" \/><\/a>Copia para o caderno as seguintes figuras.<br \/>Desenha o transformado de cada uma pela rota\u00e7\u00e3o de centro no ponto marcado e amplitude considerada.<br \/>a) 90\u00b0, no sentido positivo;<br \/>b) 90\u00b0, no sentido negativo;<br \/>c) 180\u00b0;<br \/>d) 270\u00b0, no sentido positivo;<br \/>e) 90\u00b0, no sentido negativo;<br \/>f) 90\u00b0, no sentido positivo.<\/p>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_24174' onClick='GTTabs_show(1,24174)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_24174'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><!--more--><\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"24175\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=24175\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png\" data-orig-size=\"495,468\" 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=\"8_Pag109-12\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png\" class=\"alignright wp-image-24175\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12-300x284.png\" alt=\"\" width=\"340\" height=\"321\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12-300x284.png 300w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12.png 495w\" sizes=\"auto, (max-width: 340px) 100vw, 340px\" \/><\/a>Copia para o caderno as seguintes figuras.<br \/>Desenha o transformado de cada uma pela rota\u00e7\u00e3o de centro no ponto marcado e amplitude considerada.<br \/>a) 90\u00b0, no sentido positivo;<br \/>b) 90\u00b0, no sentido negativo;<br \/>c) 180\u00b0;<br \/>d) 270\u00b0, no sentido positivo;<br \/>e) 90\u00b0, no sentido negativo;<br \/>f) 90\u00b0, no sentido positivo.<\/p>\n<p>\u00a0<\/p>\n<p>\u00a0<\/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\":863,\r\n\"height\":599,\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 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\",\r\n};\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, macro=Macros\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_24174' onClick='GTTabs_show(0,24174)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Copia para o caderno as seguintes figuras.Desenha o transformado de cada uma pela rota\u00e7\u00e3o de centro no ponto marcado e amplitude considerada.a) 90\u00b0, no sentido positivo;b) 90\u00b0, no sentido negativo;c) 180\u00b0;d)&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":24176,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,685],"tags":[424,67,382],"series":[],"class_list":["post-24174","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-isometrias","tag-8-o-ano","tag-geometria","tag-rotacao"],"views":113,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag109-12_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/24174","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=24174"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/24174\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/24176"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=24174"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=24174"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=24174"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=24174"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}