{"id":24190,"date":"2023-01-05T19:07:22","date_gmt":"2023-01-05T19:07:22","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=24190"},"modified":"2023-01-17T23:40:22","modified_gmt":"2023-01-17T23:40:22","slug":"identifica-a-isometria-2","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=24190","title":{"rendered":"Identifica a isometria"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_24190' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_24190' class='GTTabs_curr'><a  id=\"24190_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_24190' ><a  id=\"24190_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_24190'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Copia, para uma folha de papel quadriculado, o seguinte pent\u00e1gono.<\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag110-15.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"24192\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=24192\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag110-15.png\" data-orig-size=\"490,388\" 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_Pag110-15\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag110-15.png\" class=\"aligncenter wp-image-24192\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag110-15-300x238.png\" alt=\"\" width=\"300\" height=\"238\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag110-15-300x238.png 300w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag110-15.png 490w\" sizes=\"auto, (max-width: 300px) 100vw, 300px\" \/><\/a><\/p>\n<ol>\n<li>Desenha o transformado do pent\u00e1gono por reflex\u00e3o de eixo m<sub>1<\/sub> e a imagem deste pela reflex\u00e3o de eixo m<sub>2<\/sub>.<\/li>\n<li>Identifica uma isometria que transforme o primeiro no \u00faltimo pent\u00e1gono.<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_24190' onClick='GTTabs_show(1,24190)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_24190'>\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\":742,\r\n\"height\":642,\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, 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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','data:image\/png;base64,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');\r\n<\/script><br \/><br \/><\/p>\n<ol>\n<li>O transformado do pent\u00e1gono por reflex\u00e3o de eixo m<sub>1<\/sub> e a imagem deste pela reflex\u00e3o de eixo m<sub>2<\/sub> est\u00e3o criadas acima.<\/li>\n<li>A rota\u00e7\u00e3o de centro C e amplitude 180\u00b0 \u00e9 uma isometria que transforma o pent\u00e1gono P<sub>1<\/sub> no pent\u00e1gono P<sub>3<\/sub>.<br \/>A reflex\u00e3o central de centro C \u00e9 tamb\u00e9m\u00a0uma isometria que transforma o pent\u00e1gono P<sub>1<\/sub> no pent\u00e1gono P<sub>3<\/sub>.<\/li>\n<\/ol>\n<div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_prev'><a href='#GTTabs_ul_24190' onClick='GTTabs_show(0,24190)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Copia, para uma folha de papel quadriculado, o seguinte pent\u00e1gono. Desenha o transformado do pent\u00e1gono por reflex\u00e3o de eixo m1 e a imagem deste pela reflex\u00e3o de eixo m2. Identifica uma&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":24193,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,685],"tags":[424,67,690,382],"series":[],"class_list":["post-24190","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-reflexao-axial","tag-rotacao"],"views":156,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag110-15_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/24190","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=24190"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/24190\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/24193"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=24190"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=24190"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=24190"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=24190"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}