{"id":3459,"date":"2023-09-14T08:26:38","date_gmt":"2023-09-14T08:26:38","guid":{"rendered":"https:\/\/www.sorumatix.com\/blog\/?p=3459"},"modified":"2023-09-14T08:26:38","modified_gmt":"2023-09-14T08:26:38","slug":"ayt-geometri-dogruda-ve-ucgende-acilar-konu-anlatimi","status":"publish","type":"post","link":"https:\/\/www.sorumatix.com\/blog\/ayt-geometri-dogruda-ve-ucgende-acilar-konu-anlatimi.html","title":{"rendered":"AYT &#8211; Geometri &#8211; Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar Konu Anlat\u0131m\u0131"},"content":{"rendered":"<p><center><iframe loading=\"lazy\" width=\"560\" height=\"315\" src=\"https:\/\/www.youtube.com\/embed\/rg21u_YtnhU\" title=\"YouTube video player\" frameborder=\"0\" allow=\"accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture; web-share\" allowfullscreen><\/iframe><\/center><html><head><\/head><body><\/p>\n<p>Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar Konu Anlat\u0131m\u0131<\/p>\n<p>Merhaba gen\u00e7ler! Bu makalede sizlere AYT Geometri konular\u0131ndan biri olan Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar hakk\u0131nda detayl\u0131 bir konu anlat\u0131m\u0131 yapaca\u011f\u0131z. Haydi, matematik d\u00fcnyas\u0131na birlikte ad\u0131m atal\u0131m!<\/p>\n<p>1. Do\u011fru \u00dczerindeki A\u00e7\u0131lar<\/p>\n<p>Do\u011fru \u00fczerindeki a\u00e7\u0131lar, do\u011frunun \u00fczerinde yer alan ve \u00f6l\u00e7\u00fcleri toplam\u0131 180 derece olan a\u00e7\u0131lard\u0131r. \u0130ki \u00f6nemli kavram\u0131 ele alal\u0131m: kom\u015fu a\u00e7\u0131lar ve dik a\u00e7\u0131.<\/p>\n<p>&#8211; Kom\u015fu a\u00e7\u0131lar: Ayn\u0131 do\u011fru \u00fczerinde bulunan iki a\u00e7\u0131d\u0131r. Birle\u015ftirdikleri kenar ortakt\u0131r ve aralar\u0131ndaki \u00f6l\u00e7\u00fclerin toplam\u0131 180 derecedir.<\/p>\n<p>&#8211; Dik a\u00e7\u0131: \u00d6l\u00e7\u00fcs\u00fc 90 derece olan a\u00e7\u0131lard\u0131r. Do\u011fru \u00fczerindeki bir nokta ile bu do\u011frunun tamamlay\u0131c\u0131s\u0131 olan a\u00e7\u0131n\u0131n olu\u015fturdu\u011fu a\u00e7\u0131d\u0131r.<\/p>\n<p>2. \u00dc\u00e7gende A\u00e7\u0131lar<\/p>\n<p>\u00dc\u00e7gen, \u00fc\u00e7 kenardan olu\u015fan bir \u00e7okgendir ve toplam i\u00e7 a\u00e7\u0131lar\u0131 180 derecedir. \u00dc\u00e7gende kar\u015f\u0131la\u015ft\u0131\u011f\u0131m\u0131z baz\u0131 \u00f6nemli a\u00e7\u0131 tiplerini inceleyelim:<\/p>\n<p>&#8211; \u0130\u00e7 a\u00e7\u0131lar: \u00dc\u00e7genin i\u00e7inde yer alan a\u00e7\u0131lard\u0131r. Toplam i\u00e7 a\u00e7\u0131lar\u0131 her zaman 180 derecedir.<\/p>\n<p>&#8211; D\u0131\u015f a\u00e7\u0131lar: \u00dc\u00e7genin bir kenar\u0131 \u00fczerinde yer alan ve di\u011fer iki kenara biti\u015fik olmayan a\u00e7\u0131lard\u0131r. Bir i\u00e7 a\u00e7\u0131n\u0131n tamamlay\u0131c\u0131s\u0131d\u0131r ve bu a\u00e7\u0131lar\u0131n toplam\u0131 360 derecedir.<\/p>\n<p>&#8211; Kenarortay a\u00e7\u0131lar\u0131: Bir \u00fc\u00e7gende her kenar\u0131n orta noktas\u0131ndan ge\u00e7en do\u011frultularda olu\u015fan a\u00e7\u0131lard\u0131r. \u00dc\u00e7genin i\u00e7 a\u00e7\u0131lar\u0131na e\u015fittir.<\/p>\n<p>3. \u00d6zel A\u00e7\u0131 \u0130li\u015fkileri<\/p>\n<p>\u00dc\u00e7gende baz\u0131 \u00f6zel a\u00e7\u0131 ili\u015fkileri de bulunmaktad\u0131r:<\/p>\n<p>&#8211; E\u015flik eden a\u00e7\u0131lar: Paralel do\u011frular kesen iki do\u011frunun aras\u0131nda yer alan a\u00e7\u0131lard\u0131r. Ayn\u0131 y\u00f6ne bakan ve birbirine e\u015fit olan a\u00e7\u0131lard\u0131r.<\/p>\n<p>&#8211; I\u015f\u0131\u011f\u0131n yans\u0131mas\u0131: Gelen \u0131\u015f\u0131\u011f\u0131n d\u00fczg\u00fcn bir y\u00fczeye \u00e7arpmas\u0131 sonucu geri yans\u0131yan \u0131\u015f\u0131\u011f\u0131n a\u00e7\u0131s\u0131n\u0131n, gelen \u0131\u015f\u0131\u011f\u0131n a\u00e7\u0131s\u0131 ile ayn\u0131 oldu\u011funu ifade eder.<\/p>\n<p><center><img decoding=\"async\" src=\"https:\/\/www.sorumatix.com\/blog\/wp-content\/uploads\/2023\/09\/uploaded-image-ayt-geometri-dogruda-ve-ucgende-acilar-konu-anlatimi-1694518047920.jpg\" title=\"AYT - Geometri - Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar Konu Anlat\u0131m\u0131 \" alt=\"AYT - Geometri - Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar Konu Anlat\u0131m\u0131 \"><\/center><\/p>\n<p>4. \u00c7\u00f6z\u00fcml\u00fc \u00d6rnekler<\/p>\n<p>\u015eimdi, do\u011fruda ve \u00fc\u00e7gende a\u00e7\u0131lar konusunu peki\u015ftirmek i\u00e7in birka\u00e7 \u00e7\u00f6z\u00fcml\u00fc \u00f6rne\u011fe g\u00f6z atal\u0131m:<\/p>\n<p>\u00d6rnek 1:<\/p>\n<p>Bir do\u011frunun \u00fczerinde bulunan iki a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcleri 80\u00b0 ve 100\u00b0 olsun. Bu iki a\u00e7\u0131n\u0131n kom\u015fu a\u00e7\u0131 olma durumunda di\u011fer a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc ka\u00e7 derecedir?<\/p>\n<p>\u00c7\u00f6z\u00fcm:<\/p>\n<p>Kom\u015fu a\u00e7\u0131lar\u0131n \u00f6l\u00e7\u00fcleri toplam\u0131 180 derecedir. Dolay\u0131s\u0131yla, di\u011fer a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc: 180\u00b0 &#8211; (80\u00b0 + 100\u00b0) = 180\u00b0 &#8211; 180\u00b0 = 0\u00b0 olur.<\/p>\n<p>\u00d6rnek 2:<\/p>\n<p>Bir \u00fc\u00e7genin iki i\u00e7 a\u00e7\u0131s\u0131n\u0131n \u00f6l\u00e7\u00fcleri 40\u00b0 ve 60\u00b0 olsun. \u00dc\u00e7genin di\u011fer i\u00e7 a\u00e7\u0131s\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc ka\u00e7 derecedir?<\/p>\n<p>\u00c7\u00f6z\u00fcm:<\/p>\n<p>\u00dc\u00e7genin toplam i\u00e7 a\u00e7\u0131lar\u0131 180 derecedir. Dolay\u0131s\u0131yla, di\u011fer i\u00e7 a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc: 180\u00b0 &#8211; (40\u00b0 + 60\u00b0) = 180\u00b0 &#8211; 100\u00b0 = 80\u00b0 olur.<\/p>\n<p>Gen\u00e7ler, Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar konusu bu kadar! Bu bilgileri ak\u0131lda tutarak geometri derslerinizde<\/p>\n<p><\/body><\/html><\/p>\n","protected":false},"excerpt":{"rendered":"<p>Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar Konu Anlat\u0131m\u0131 Merhaba gen\u00e7ler! Bu makalede sizlere AYT Geometri konular\u0131ndan biri olan Do\u011fruda ve \u00dc\u00e7gende A\u00e7\u0131lar<\/p>\n","protected":false},"author":1,"featured_media":3458,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"colormag_page_container_layout":"default_layout","colormag_page_sidebar_layout":"default_layout","footnotes":""},"categories":[3],"tags":[],"class_list":["post-3459","post","type-post","status-publish","format-standard","has-post-thumbnail","hentry","category-matematik-dersleri"],"_links":{"self":[{"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/posts\/3459","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/comments?post=3459"}],"version-history":[{"count":0,"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/posts\/3459\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/media\/3458"}],"wp:attachment":[{"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/media?parent=3459"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/categories?post=3459"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.sorumatix.com\/blog\/wp-json\/wp\/v2\/tags?post=3459"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}