{"id":8317,"date":"2012-04-16T00:15:21","date_gmt":"2012-04-15T23:15:21","guid":{"rendered":"https:\/\/www.acasinhadamatematica.pt\/?p=8317"},"modified":"2022-01-14T00:46:55","modified_gmt":"2022-01-14T00:46:55","slug":"funcoes-do-tipo-x-to-b-aoperatornamesen-left-omega-x-phi-right","status":"publish","type":"post","link":"https:\/\/www.acasinhadamatematica.pt\/?p=8317","title":{"rendered":"Fun\u00e7\u00f5es do tipo $x \\to B + A\\operatorname{sen} \\left( {\\omega x &#8211; \\phi } \\right)$"},"content":{"rendered":"<ul style=\"list-style-type: square;\">\n<li>Qual ser\u00e1 o efeito do par\u00e2metro $A$?<\/li>\n<li>Qual ser\u00e1 o efeito do par\u00e2mero $B$?<\/li>\n<li>Qual ser\u00e1 o efeito do par\u00e2metro $\\omega $?<\/li>\n<li>Qual ser\u00e1 o efeito do par\u00e2metro $\\phi $?<\/li>\n<\/ul>\n<p><!--more--><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\":855,\r\n\"height\":494,\r\n\"showMenuBar\":false,\r\n\"showAlgebraInput\":false,\r\n\"showToolBar\":false,\r\n\"customToolBar\":\"0 39 59 || 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 , 14 66 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\"showFullscreenButton\":true,\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': 0,'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><\/p>\n","protected":false},"excerpt":{"rendered":"<p>Qual ser\u00e1 o efeito do par\u00e2metro $A$? Qual ser\u00e1 o efeito do par\u00e2mero $B$? Qual ser\u00e1 o efeito do par\u00e2metro $\\omega $? Qual ser\u00e1 o efeito do par\u00e2metro $\\phi $?<\/p>\n","protected":false},"author":1,"featured_media":19234,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_jetpack_memberships_contains_paid_content":false,"footnotes":""},"categories":[226,97,295],"tags":[427,296],"series":[],"class_list":["post-8317","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-12--ano","category-aplicando","category-funcoes-seno-co-seno-e-tangente","tag-12-o-ano","tag-funcao-seno"],"views":1324,"jetpack_featured_media_url":"https:\/\/www.acasinhadamatematica.pt\/wp-content\/uploads\/2021\/12\/Mat76.png","jetpack_sharing_enabled":true,"jetpack_likes_enabled":true,"_links":{"self":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/8317","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=8317"}],"version-history":[{"count":0,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/posts\/8317\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=\/wp\/v2\/media\/19234"}],"wp:attachment":[{"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=8317"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=8317"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=8317"},{"taxonomy":"series","embeddable":true,"href":"https:\/\/www.acasinhadamatematica.pt\/index.php?rest_route=%2Fwp%2Fv2%2Fseries&post=8317"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}