{"id":24263,"date":"2023-01-07T18:40:20","date_gmt":"2023-01-07T18:40:20","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=24263"},"modified":"2023-01-17T23:42:28","modified_gmt":"2023-01-17T23:42:28","slug":"considera-os-vetores","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=24263","title":{"rendered":"Considera os vetores"},"content":{"rendered":"\n<p><ul id='GTTabs_ul_24263' class='GTTabs' style='display:none'>\n<li id='GTTabs_li_0_24263' class='GTTabs_curr'><a  id=\"24263_0\" onMouseOver=\"GTTabsShowLinks('Enunciado'); return true;\"  onMouseOut=\"GTTabsShowLinks();\"  class='GTTabsLinks'>Enunciado<\/a><\/li>\n<li id='GTTabs_li_1_24263' ><a  id=\"24263_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_24263'>\n<span class='GTTabs_titles'><b>Enunciado<\/b><\/span><\/p>\n<p>Considera os vetores \\({\\vec u}\\) e \\({\\vec v}\\) e as figuras que se seguem.<\/p>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"24265\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=24265\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png\" data-orig-size=\"474,466\" 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_Pag112-3\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png\" class=\"aligncenter wp-image-24265\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3-300x295.png\" alt=\"\" width=\"420\" height=\"413\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3-300x295.png 300w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3-80x80.png 80w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png 474w\" sizes=\"auto, (max-width: 420px) 100vw, 420px\" \/><\/a><\/p>\n<ol>\n<li>Qual \u00e9 o transformado da figura C por \\({T_{\\vec u}} \\circ {T_{\\vec v}}\\)?<br \/><strong>[A]<\/strong> A figura A.<br \/><strong>[B]<\/strong> A figura B.<br \/><strong>[C]<\/strong> A figura C.<br \/><strong>[D]<\/strong> A figura D.<br \/><br \/><\/li>\n<li>Qual \u00e9 o transformado da figura A pela transla\u00e7\u00e3o de vetor \\( &#8211; \\vec u + \\vec v\\)?<br \/><strong>[A]<\/strong> A figura A.<br \/><strong>[B]<\/strong> A figura B.<br \/><strong>[C]<\/strong> A figura C.<br \/><strong>[D]<\/strong> A figura D.<\/li>\n<\/ol>\n<p><div class='GTTabsNavigation' style='display:none'><span class='GTTabs_nav_next'><a href='#GTTabs_ul_24263' onClick='GTTabs_show(1,24263)'>Resolu\u00e7\u00e3o &gt;&gt;<\/a><\/span><\/div><\/div>\n\n<div class='GTTabs_divs' id='GTTabs_1_24263'>\n<span class='GTTabs_titles'><b>Resolu\u00e7\u00e3o<\/b><\/span><\/p>\n<blockquote>\n<p>Considera os vetores \\({\\vec u}\\) e \\({\\vec v}\\) e as figuras que se seguem.<\/p>\n<\/blockquote>\n<p><a href=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png\"><img loading=\"lazy\" decoding=\"async\" data-attachment-id=\"24265\" data-permalink=\"https:\/\/www.acasinhadamatematica.pt\/?attachment_id=24265\" data-orig-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png\" data-orig-size=\"474,466\" 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_Pag112-3\" data-image-description=\"\" data-image-caption=\"\" data-large-file=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png\" class=\"aligncenter wp-image-24265\" src=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3-300x295.png\" alt=\"\" width=\"420\" height=\"413\" srcset=\"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3-300x295.png 300w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3-80x80.png 80w, https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3.png 474w\" sizes=\"auto, (max-width: 420px) 100vw, 420px\" \/><\/a><\/p>\n<ol>\n<li>O transformado da figura C por \\({T_{\\vec u}} \\circ {T_{\\vec v}}\\) \u00e9:<br \/><strong>[D]<\/strong> A figura D.<br \/><br \/><\/li>\n<li>O transformado da figura A pela transla\u00e7\u00e3o de vetor \\( &#8211; \\vec u + \\vec v\\) \u00e9:<br \/><strong>[D]<\/strong> A figura D.<\/li>\n<\/ol>\n<p><br \/><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\": 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Voal6+CT7sQdVbMOLU1ptUxN1VtY1Zhjd4jPPfuhasH0VNUtXbEwu3O34pYQTEdXNElAT2JEbukE6G7kZSrKzs\/j09B3s9sc+kdkkAwjviQBOREb0sOg61OuchxxmLc7N+3w9kpEOlO09fZuQDNlbHc55QgclWpAJOymx7Y48jqsZ1kthddReI20DdZodh+3VF6DH9viyGuBNYiupSPFcpSKlOLFSFynpifDFzMltgoYBl7yQl4knnMzGSl7QLAvlXe2Tby9NlmnYUESJ7+nK0N2\/r+p87c9mhC2VIGZs9GyLcuAv9WWbQv9ndPc49T5SD3uhy4V7iLV95n7xzc0Cqif2hoozjAcxqL6lBmCIV+SpPcwcN\/QLhjhJWGhKYGBiKqTwbjU8frwoChPmSJMi94BMKLUpd2ISkBFZwSPqVND8QDcgRv3KE0yNoVFTVfjg5HdP4bpj0950O17YO1Nbv99cpt6gpibPIOUPRY7kTdgVoLaEEdv6MQQAG\/WkDs1fO6EYIQOcz9AacLoBF82THphxBeTJGElzIncQs9jtliXCjEEV38Lkv\/d1A6Q8hOoBDeWEXj2MOKtU5\/2YbU5e2PyOHc4oDgobH+Ce1n4F\/fTYDJic2UOE9RaYVmI+IMeV6MUUXCTzLcxMA1ZAo2+6nRimiAArgk6e8egnLr7clabIPh4t9Sd1wIHPAkDgRc\/+PoHjAoNvz2Yt9ukB\/YBi+qY9SAFQBEnzzzXpSIAhwPieAl0BFv2gi7EwrocEiU0BhuYqhDzMWiM\/TsxbPQlGz6YjcB9KWsjyRqQ1tRzszb6+1krzstoJ7xIWpr6Gl5mMOYhKoPw4fVX\/G0R5llvnF6tANqyONLskAan\/GAra8DmHWaRcqYBUTrnx6aRMQ5hItCyTdU2sa0YHCUjBQnnA+n0uwJJLwbSo+uvajVB0rcH0uPvCiStGEhPKgnQMlMrCNDT7wYgtRhAZ5UEyNweQM++G4AKmth5JQGyZgDSWy29DEbPvyeMCgb83yqJ0TJDKwjQi+8GoDWLDyfs90ngooC\/qLgM\/btuGHBgxB45UeRKDREs1yOIqHLWjYgm55aI6GwGhYjB5gmImCwaImIxn4+IzTwbIi1mvNCUwhQUjpjxILAdJplAIYwIQW0hxBECXCGACgEdIaArBPSEAC8V8CkVcMOO0JAvBp8OeYl2iMFnC9TGdtbUBXcRsKFxBWO703MbCVgRv7DeUjA2sbpW3aa2g2yuDmZOXVxtUDHtsqtsQOSebZP1FrVmxNswKDK89XyPRHcLm6PlOQbl9e+8oHsesC1VyjcaFzdhbygdsK32V8HbiAQxy\/eZ72SckGjavl3aIUM\/ETdp4K66NXEAeG67rDk3u1VwPk7bNac751SRe204JVW\/L9TNs+jULO6cxQXL1MtZpltzunNOpWVKw+RvK3KxSGsWd87iPTGTL8VykdqpSd05qQumqeY1zW7N4s5ZbM7bplnSNHs1qTsnVck4bc3+wtJSZ4vNnBx7Ncc753jBcK1ys91PNac75zRbh64wXK2k3d7UHO+c43sDrp2PU7\/mdOecLtk\/ymeos29OXlb0zcnseiHn66SLSoJilQPlVaVBUYqBcllJUOxyoLyuNCjNgvbzppKoWCVRuao2KgUzq95WEhWzJCrvqo1KQQt6X0lUjJKofKg0KgUD88dKgmLeD8omqVEvRabShchUeiUylS5FptJrkan0RmQqXYlMpbciU+mdyFR6n2YqfUgzlT5mK0cp4FQI6AsBgRAQCgEDIeCzEBAJAbEQkAgBw2ucihiJM2hrnKZDfblOd+A2TYg6rV5CVJpAmFPrNt\/86NebH3uz+ZG9B7zXAc6zGNQs7pzFhVf0Vl4Ww5rFnbM4b4v3\/pvReRIHNYk7J3HBFO28LH6uWdw5iwvvBPLHxaimcec0lo+Lcc3izllcNMbcyWpJTePOaVzy7jwni2zBXvO4ax63EBtHNZF7QOSCQRp5eRzXLO6cxdKrxi+1Me4Bjfmj4\/x3fpawWIF3EVjiUvjTPhXFRS2Hy5Oq41Lwo2JPq4qLVg6Xs6rjUtCOnlUVF70cLudVx6Xo13mqiotWDpffqo5LwRStF1XFRS2Hy8uq41LQji6qigu+H5dNkpIeiVQfsTDgeUNP+Ikmpn48d+iMnxgiuPP8oXN+Ygn3zXOIfuMnLWGgIovoZZZFdHGNswVmJliIdaRYV4qlUmxHiu1KsT0p1pNiP0mxN5lYPxPbF2csFypv+tKj6qUv6X9x+pJT75vswb7JQgJT7q\/\/uDWPe8Djwv4Xzv2Sj9ZE7gGRCwaZ+61Cp+ZxD3hcyJ3Aub\/e1K2J3AMiy0fIXs3jHvC4aJC5ifRqIveAyIUEityO9VPN4x7wuIUIeVMTuQdELhhk7qWHX\/O4BzxuYQ3Zr4ncAyLLR8ig5nEPeFw0yLyfyKn624yiX8mpKi5qOVxeVx2Xop\/KqSouWjlcrqqOS0E7eltVXPRyuLyrOi6Fv5lTVWC0ksB8qDwwBRN4PlYVGLUkMA+v1YoDU9CUTqsKDN4AmE1ym17J3KZLmWT0WiYZvZFJRlcyyeitTDJ6J5OM3sskow8yyehjlmTElFIkGTEW5DpTCn4sxIZS7ECK\/SzFRlJsLMUmUiyRYttS7DgT28nEEnHG\/ss70YHNc5seVy+3Kf2vC3NqaI7PwdTbJ3uwfVL+gzA1jXtA4xa2pT\/XRO4BkeU\/lhbVPO4Bj1t4cRvXRO4BkaUDZFLTuAc0biGzidRE7gGRW\/g0TLsmcg+I3EKEHNdE7gGRW\/h2WmfZtltN5D9vEUlqIveAyK3EyJrI3RO5WXLT7SCCUUIvJx8xVIGY28FJ49\/N4U9y7CMYShg10NEC+fLO1OPruV+7Ga1w4pWcvE\/tPKvKmq1nbY1WOGTAyBLFD1AT\/QEjQ8MH29IMToxoImZ\/nzQcYJjGHgnmmcteXSqbrhvnv51074uotSTs6XuopvzPUMxNX0Nx6\/JJQudeRD0RL2tAWzOrlbee3v\/2ZvZzTNWE2s4L9XvhBlbg\/HTJS7nRfUjPeZbRjj2L+Pf6zbKe5avwK9\/+PsfCQ8klo1z49SeSjCm+5\/OxlniczUzrqaR8tED4WT7TOquoaUkvtib9YgPTynA+W2Ja45ymNd6FaRU3ntEOjefpovFk4Vrf1HjWO8tljDo5GXW2x2gxy9mcU+EP0X\/EhGu0V35R2YDa9V\/fq6YP07Y1E3uWzcSWKP15voBxXk2wla1MxTKgz5cA7eb0Lu6uF3lYfGrrn7fIm\/c5z1aHk9JTsfPVU7Hn+SzreTUta4NPH25gWRnMz5dYFs1pWbSeiW1qOud\/2Uzs2TpGuzkZ7W6DUayU8JaWJrylWpLyzF3uwVxtid80c5O\/0nHKTyEumZL8iwzC+L+5piXpI\/c40H9karh12GqZLdtUbRPbit5q6TkTxZd71HSmMsF6hoNeTgvs1Wuh\/M61yEool3V1V1vX9Vf8rYCF8ceqaGVYmzEzY\/s2JhGfYcPLaWfeziMdltBUKNItWOImcQ4oC2IYHX\/\/yK67NOzSdkR++T9QSwcIXviutCEPAAAMwwAAUEsBAhQAFAAICAgAbJ4nVtY3vbkZAAAAFwAAABYAAAAAAAAAAAAAAAAAAAAAAGdlb2dlYnJhX2phdmFzY3JpcHQuanNQSwECFAAUAAgICABsnidWCDc2WR8FAABcJgAAFwAAAAAAAAAAAAAAAABdAAAAZ2VvZ2VicmFfZGVmYXVsdHMyZC54bWxQSwECFAAUAAgICABsnidWmMKOPXEDAACPEQAAFwAAAAAAAAAAAAAAAADBBQAAZ2VvZ2VicmFfZGVmYXVsdHMzZC54bWxQSwECFAAUAAgICABsnidWXviutCEPAAAMwwAADAAAAAAAAAAAAAAAAAB3CQAAZ2VvZ2VicmEueG1sUEsFBgAAAAAEAAQACAEAANIYAAAAAA==\",\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_24263' onClick='GTTabs_show(0,24263)'>&lt;&lt; Enunciado<\/a><\/span><\/div><\/div>\n\n","protected":false},"excerpt":{"rendered":"<p>Enunciado Resolu\u00e7\u00e3o Enunciado Considera os vetores \\({\\vec u}\\) e \\({\\vec v}\\) e as figuras que se seguem. Qual \u00e9 o transformado da figura C por \\({T_{\\vec u}} \\circ {T_{\\vec v}}\\)?[A] A figura A.[B] A&#46;&#46;&#46;<\/p>\n","protected":false},"author":1,"featured_media":24266,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[100,97,685],"tags":[424,689,67,688],"series":[],"class_list":["post-24263","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-8--ano","category-aplicando","category-isometrias","tag-8-o-ano","tag-adicao-de-vetores","tag-geometria","tag-vetores"],"views":181,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2023\/01\/8_Pag112-3_520x245.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/24263","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=24263"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/24263\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/24266"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=24263"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=24263"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=24263"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=24263"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}