{"id":3109,"date":"2011-10-05T11:13:00","date_gmt":"2011-10-05T08:13:00","guid":{"rendered":"http:\/\/www.islamidavet.com\/kutuphane\/\/?p=3109"},"modified":"2011-10-05T11:13:00","modified_gmt":"2011-10-05T08:13:00","slug":"cember","status":"publish","type":"post","link":"https:\/\/www.islamidavet.com\/kutuphane\/cember\/","title":{"rendered":"\u00c7ember"},"content":{"rendered":"

\u00c7EMBER
\nD\u00fczlemde sabit bir noktadan e\u015fit uzakl\u0131ktaki noktalar k\u00fcmesine \u00e7ember denir. O noktas\u0131ndan r uzakl\u0131ktaki noktalar k\u00fcmesi, O merkezli ve r yar\u0131\u00e7apl\u0131 \u00e7emberdir.<\/p>\n

\u00c7ember \u00fczerindeki iki noktay\u0131 birle\u015ftiren do\u011fru par\u00e7as\u0131na kiri\u015f denir. [CD] kiri\u015fi gibi.
\nEn uzun kiri\u015f merkezden ge\u00e7en kiri\u015ftir. O merkezinden ge\u00e7en [AB] kiri\u015fine \u00e7emberin \u00e7ap\u0131 denir.
\n\u00c7emberi iki noktada kesen do\u011frulara kesen denir. d2 do\u011frusu \u00e7emberi K ve L noktalar\u0131nda kesti\u011fine g\u00f6re, kesendir.
\n\u00c7emberi bir noktada kesen do\u011fruya te\u011fet denir. d1 do\u011frusu \u00e7emberi T noktas\u0131nda kesti\u011finden te\u011fettir.
\n\u00c7emberin merkezindeki 360\u00b0 lik a\u00e7\u0131 \u00e7ember yay\u0131n\u0131n tamam\u0131n\u0131 g\u00f6r\u00fcr. \u00c7ember yay\u0131n\u0131n a\u00e7\u0131sal de\u011feri 360\u00b0 dir.<\/p>\n

\u00c7ap \u00e7ember yay\u0131n\u0131 iki e\u015fit par\u00e7aya ay\u0131r\u0131r. Her bir par\u00e7a 180\u00b0 dir.
\n\u00c7EMBERDE A\u00c7I \u00d6ZELL\u0130KLER\u0130
\n1. Merkez A\u00e7\u0131
\nK\u00f6\u015fesi \u00e7emberin merkezinde olan a\u00e7\u0131ya merkez a\u00e7\u0131 denir. Bir merkez a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc g\u00f6rd\u00fc\u011f\u00fc yay\u0131n \u00f6l\u00e7\u00fcs\u00fcne e\u015fittir.
\nm(AOB)=m(AB)=a
\n 2. \u00c7evre A\u00e7\u0131
\nK\u00f6\u015fesi \u00e7emberin \u00fczerinde, kenarlar\u0131 bu \u00e7emberin kiri\u015fleri olan a\u00e7\u0131ya \u00e7evre a\u00e7\u0131 denir. \u00c7evre a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc, g\u00f6rd\u00fc\u011f\u00fc
\nyay\u0131n \u00f6l\u00e7\u00fcs\u00fcn\u00fcn yar\u0131s\u0131na e\u015fittir.<\/p>\n

Ayn\u0131 yay\u0131 g\u00f6ren \u00e7evre a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc merkez a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fcn\u00fcn yar\u0131s\u0131d\u0131r.<\/p>\n

Ayn\u0131 yay\u0131 g\u00f6ren \u00e7evre a\u00e7\u0131lar\u0131n \u00f6l\u00e7\u00fcleri e\u015fittir. m(BAC) = m(BEC) = m(BDC)<\/p>\n

\u00c7ap\u0131 g\u00f6ren \u00e7evre a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc 90\u00b0 dir. m(AEB) = m(ACB) = m(ADB) = 90\u00b0<\/p>\n

3. Te\u011fet – kiri\u015f a\u00e7\u0131
\nK\u00f6\u015fesi \u00e7ember \u00fczerinde, kollar\u0131ndan biri \u00e7emberin te\u011feti, di\u011feri \u00e7emberin kiri\u015fi olan a\u00e7\u0131ya, te\u011fet – kiri\u015f a\u00e7\u0131 denir.
\nTe\u011fet – kiri\u015f a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc, g\u00f6rd\u00fc\u011f\u00fc yay\u0131n \u00f6l\u00e7\u00fcs\u00fcn\u00fcn yar\u0131s\u0131na e\u015fittir.<\/p>\n

Ayn\u0131 yay\u0131 g\u00f6ren te\u011fet-kiri\u015f a\u00e7\u0131 ile \u00e7evre a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcleri e\u015fittir.
\nm(ABT) = m(ATC) = a <\/p>\n

4. \u0130\u00e7 A\u00e7\u0131
\nBir \u00e7emberde kesi\u015fen farkl\u0131 iki kiri\u015fin olu\u015fturdu\u011fu a\u00e7\u0131ya i\u00e7 a\u00e7\u0131 denir.
\n\u0130\u00e7 a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc g\u00f6rd\u00fc\u011f\u00fc yaylar\u0131n \u00f6l\u00e7\u00fcleri toplam\u0131n\u0131n yar\u0131s\u0131na e\u015fittir.<\/p>\n

5. D\u0131\u015f A\u00e7\u0131
\n\u0130ki kesenin, iki te\u011fetin veya bir te\u011fetle bir kesenin olu\u015fturdu\u011fu a\u00e7\u0131ya, \u00e7emberin bir d\u0131\u015f a\u00e7\u0131s\u0131 denir.<\/p>\n

Bir d\u0131\u015f a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc, g\u00f6rd\u00fc\u011f\u00fc yaylar\u0131n \u00f6l\u00e7\u00fcleri fark\u0131n\u0131n yar\u0131s\u0131na e\u015fittir.
\nAPB a\u00e7\u0131s\u0131 AB ve CD yaylar\u0131n\u0131 g\u00f6rd\u00fc\u011f\u00fcne g\u00f6re,<\/p>\n

[PA te\u011fet,
\n[PB kesen, <\/p>\n

[PA te\u011fet
\n[PC te\u011fet
\nm(AC) = y
\nm(CA) = x
\ndersek<\/p>\n

Burada, x + y = 360\u00b0 oldu\u011fundan,
\na + x = 180\u00b0 <\/p>\n

O merkezli yar\u0131m \u00e7emberde,
\nm(APC) = a
\nm(AB) = b
\na+b = 90\u00b0 <\/p>\n

6. Kiri\u015fler D\u00f6rtgeni
\nKenarlar\u0131 bir \u00e7emberin kiri\u015fleri olan d\u00f6rtgene kiri\u015fler d\u00f6rtgeni denir.
\nBir kiri\u015fler d\u00f6rtgeninde kar\u015f\u0131l\u0131kl\u0131 a\u00e7\u0131lar b\u00fct\u00fcnlerdir.
\nm(A)+m(C)=180\u00b0
\nm(B)+m(D)=180\u00b0<\/p>\n

Kar\u015f\u0131l\u0131kl\u0131 a\u00e7\u0131lar\u0131n\u0131n \u00f6l\u00e7\u00fcleri toplam\u0131 180 olan b\u00fct\u00fcn d\u00f6rtgenlerin k\u00f6\u015felerinden bir \u00e7ember ge\u00e7er.
\nKesi\u015fen iki \u00e7emberde olu\u015fan ABEF ve BCDE d\u00f6rtgenlerinde
\nm(ABE)=m(CDF) m(AFD)=m(CBE)
\nm(ABE)+m(CBE)=180\u00b0 oldu\u011fundan,
\n[AF] \/\/ [CD] <\/p>\n","protected":false},"excerpt":{"rendered":"

\u00c7EMBER D\u00fczlemde sabit bir noktadan e\u015fit uzakl\u0131ktaki noktalar k\u00fcmesine \u00e7ember denir. O noktas\u0131ndan r uzakl\u0131ktaki noktalar k\u00fcmesi, O merkezli ve r yar\u0131\u00e7apl\u0131 \u00e7emberdir. \u00c7ember \u00fczerindeki iki noktay\u0131 birle\u015ftiren do\u011fru par\u00e7as\u0131na kiri\u015f denir. [CD] kiri\u015fi gibi. En uzun kiri\u015f merkezden ge\u00e7en kiri\u015ftir. O merkezinden ge\u00e7en [AB] kiri\u015fine \u00e7emberin \u00e7ap\u0131 denir. \u00c7emberi iki noktada kesen do\u011frulara kesen …<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[1404,1403],"tags":[7313,7316,7314,7315],"class_list":["post-3109","post","type-post","status-publish","format-standard","hentry","category-matematik-odevleri","category-odevler","tag-cember","tag-kirisler-dortgeni","tag-merkez-aci","tag-teget-kiris-aci"],"_links":{"self":[{"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/posts\/3109","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/comments?post=3109"}],"version-history":[{"count":0,"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/posts\/3109\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/media?parent=3109"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/categories?post=3109"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.islamidavet.com\/kutuphane\/wp-json\/wp\/v2\/tags?post=3109"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}