{"id":177,"date":"2015-11-28T18:49:17","date_gmt":"2015-11-28T18:49:17","guid":{"rendered":"http:\/\/www.ozelmatematik.net\/?p=177"},"modified":"2016-01-27T22:47:38","modified_gmt":"2016-01-27T22:47:38","slug":"matematik-geo-konulari","status":"publish","type":"post","link":"http:\/\/www.ozelmatematik.net\/?p=177","title":{"rendered":"matematik & geo konular\u0131"},"content":{"rendered":"

2016 YGS Matematik Konular\u0131 ve Da\u011f<\/strong>\u0131<\/strong>l<\/strong>\u0131<\/strong>mlar<\/strong>\u0131<\/strong>:<\/strong><\/p>\n

Say\u0131lar
\nBasamak Kavram\u0131
\nTaban Aritmeti\u011f<\/strong>i
\nB<\/strong>\u00f6<\/strong>lme-B<\/strong>\u00f6<\/strong>l<\/strong>\u00fc<\/strong>nebilme
\nOBEB-OKEK
\nRasyonel Say\u0131lar
\nS\u0131ralama-Basit E\u015f<\/strong>itsizlikler
\nMutlak De\u011f<\/strong>er
\n\u00dcsl\u00fc \u0130<\/strong>fadeler
\nK\u00f6kl\u00fc \u0130<\/strong>fadeler
\nOran-Orant\u0131
\nDenklem \u00c7\u00f6zme
\nProblemler
\nMant\u0131k
\nK\u00fcmeler
\nBa\u011f<\/strong>\u0131<\/strong>nt<\/strong>\u0131<\/strong>-Fonksiyon
\n\u0130\u015f<\/strong>lem-Mod<\/strong>\u00fc<\/strong>ler Aritmetik
\nPerm\u00fctasyon-Kombinasyon-Olas\u0131l\u0131k<\/strong><\/p>\n

\u00a02016 LYS Matematik Konular\u0131 ve Da\u011f\u0131<\/strong>l<\/strong>\u0131<\/strong>mlar<\/strong>\u0131<\/strong>:<\/strong><\/strong><\/p>\n

POL\u0130<\/strong>NOMLAR \u2013 <\/strong>\u00d6<\/strong>ZDE\u015e<\/strong>L\u0130<\/strong>KLER
\nPolinomlar
\n<\/strong>\u00d6<\/strong>zde\u015f<\/strong>likler \u2013 <\/strong>\u00c7<\/strong>arpanlara Ay<\/strong>\u0131<\/strong>rma
\nRasyonel \u0130<\/strong>fadelerin Sadele\u015f<\/strong>tirilmesi
\nPolinomlar \u2013 <\/strong>\u00d6<\/strong>zde\u015f<\/strong>likler Karma<\/strong><\/p>\n

\u0130<\/strong>K\u0130<\/strong>NC\u0130<\/strong> DERECEDEN DENKLEMLER, E\u015e\u0130<\/strong>TS\u0130<\/strong>ZL\u0130<\/strong>KLER VE PARABOL
\n\u0130<\/strong>kinci Dereceden Denklemler
\nK<\/strong>\u00f6<\/strong>k \u2013 Katsay<\/strong>\u0131<\/strong> Ba\u011f<\/strong>\u0131<\/strong>nt<\/strong>\u0131<\/strong>lar<\/strong>\u0131<\/strong> \u2013 Denklem Kurma
\nE\u015f<\/strong>itsizlikler \u2013 E\u015f<\/strong>itsizlik Sistemleri
\nParabol
\n\u0130<\/strong>kinci Dereceden Denklemler \u2013 E\u015f<\/strong>itsizlikler \u2013 Parabol Karma<\/strong><\/p>\n

PERM\u00dcTASYON \u2013 KOMB\u0130<\/strong>NASYON \u2013 B\u0130<\/strong>NOM VE OLASILIK
\nPerm<\/strong>\u00fc<\/strong>tasyon
\nKombinasyon ve Binom
\nOlas<\/strong>\u0131<\/strong>l<\/strong>\u0131<\/strong>k
\nPerm<\/strong>\u00fc<\/strong>tasyon \u2013 Kombinasyon \u2013 Binom \u2013 Olas<\/strong>\u0131<\/strong>l<\/strong>\u0131<\/strong>k Karma<\/strong><\/p>\n

TR\u0130<\/strong>GONOMETR\u0130<\/strong>
\nTrigonometri \u2013
\nTrigonometri \u2013
\nTrigonometri \u2013
\nTrigonometri \u2013
\nTrigonometri \u2013
\nTrigonometri \u2013
\nTrigonometri \u2013
\nTrigonometri \u2013<\/strong><\/p>\n

KARMA\u015e<\/strong>IK SAYILAR
\nKarma\u015f<\/strong>\u0131<\/strong>k Say<\/strong>\u0131<\/strong>lar ve D<\/strong>\u00f6<\/strong>rt \u0130\u015f<\/strong>lem
\nKutupsal Koordinatlar, Karma\u015f<\/strong>\u0131<\/strong>k Say<\/strong>\u0131<\/strong>n<\/strong>\u0131<\/strong>n Trigonometrik Bi<\/strong>\u00e7<\/strong>imi<\/strong><\/p>\n

LOGAR\u0130<\/strong>TMA
\nLogaritman<\/strong>\u0131<\/strong>n <\/strong>\u00d6<\/strong>zellikleri
\n<\/strong>\u00dc<\/strong>sl<\/strong>\u00fc<\/strong> ve Logaritmik Denklemler
\nLogaritmik E\u015f<\/strong>itsizlikler \u2013 Logaritma Fonksiyonlar\u0131n\u0131n Grafi\u011f<\/strong>i
\nLogaritma Karma<\/strong><\/p>\n

TOPLAM VE \u00c7ARPIM SEMBOLLER\u0130<\/strong> \u2013 D\u0130<\/strong>Z\u0130<\/strong>LER
\nToplam ve <\/strong>\u00c7<\/strong>arp<\/strong>\u0131<\/strong>m Sembolleri
\nDizi Kavram<\/strong>\u0131<\/strong> \u2013 Artan ve Azalan Diziler
\nAritmetik Diziler
\nGeometrik Diziler
\nToplam ve <\/strong>\u00c7<\/strong>arp<\/strong>\u0131<\/strong>m Sembolleri \u2013 Diziler Karma<\/strong><\/p>\n

MATR\u0130<\/strong>S VE DETERM\u0130<\/strong>NANT
\nMatris ve Determinant
\nMatris ve Determinant<\/strong><\/p>\n

FONKS\u0130<\/strong>YONLAR
\nFonksiyonlarda \u0130\u015f<\/strong>lemler \u2013 Par<\/strong>\u00e7<\/strong>al<\/strong>\u0131<\/strong> Fonksiyon
\nMutlak De\u011f<\/strong>erli Fonksiyonlar
\nMutlak De\u011f<\/strong>erli Fonksiyonlar<\/strong>\u0131<\/strong>n Grafi\u011f<\/strong>i
\nFonksiyonlar Karma<\/strong><\/p>\n

0FONKS\u0130<\/strong>YONLARDA L\u0130<\/strong>M\u0130<\/strong>T VE S<\/strong>\u00dc<\/strong>REKL\u0130<\/strong>L\u0130<\/strong>K
\n0Limit Kavram<\/strong>\u0131<\/strong> \u2013 Soldan ve Sa\u011f<\/strong>dan Limit
\n0Limitte Belirsizlik Durumlar\u0131
\n0Limitte Belirsizlik Durumlar\u0131 \u2013 S\u00fcreklilik
\n0Fonksiyonlarda Limit Karma<\/strong><\/p>\n

T\u00dcREV
\nT\u00fcrev Kavram\u0131 \u2013 Sol ve Sa\u011f<\/strong> T<\/strong>\u00fc<\/strong>rev \u2013 T<\/strong>\u00fc<\/strong>rev Alma Kurallar<\/strong>\u0131<\/strong>
\nBile\u015f<\/strong>ke ve Mutlak De\u011f<\/strong>erli Fonksiyonlarda T<\/strong>\u00fc<\/strong>rev
\nTrigonometrik \u2013 <\/strong>\u00dc<\/strong>stel ve Logaritmik Fonksiyonlar<\/strong>\u0131<\/strong>n T<\/strong>\u00fc<\/strong>revi
\nKapal\u0131 Fonksiyonlar\u0131n \u2013 Parametrik Fonksiyonlar\u0131n T\u00fcrevleri \u2013 T\u00fcrevde Zincir Kural\u0131 \u2013 Ters Fonsiyon T\u00fcrevleri
\nT\u00fcrevin Geometrik Anlam\u0131
\nArtan ve Azalan Fonksiyonlar \u2013 Ekstremum Noktalar\u0131 \u2013 \u0130<\/strong>kinci T<\/strong>\u00fc<\/strong>revin Geometrik Anlam<\/strong>\u0131<\/strong> \u2013 Ortalama De\u011f<\/strong>er Teoremleri
\nT<\/strong>\u00fc<\/strong>revin Limite Uygulanmas\u0131 (L\u2019hospital kural\u0131)
\nPolinom Fonksiyonlar\u0131n Grafi\u011f<\/strong>i
\nAsimptot Kavram<\/strong>\u0131<\/strong>
\nT<\/strong>\u00fc<\/strong>rev Karma
\nT<\/strong>\u00fc<\/strong>rev Karma
\nT<\/strong>\u00fc<\/strong>rev Karma
\nT<\/strong>\u00fc<\/strong>rev Karma
\n.T<\/strong>\u00fc<\/strong>rev Karma<\/strong><\/p>\n

\u0130<\/strong>NTEGRAL
\nBelirsiz \u0130<\/strong>ntegral \u2013 \u0130<\/strong>ntegral Alma Kurallar<\/strong>\u0131<\/strong>
\nBelirsiz \u0130<\/strong>ntegral \u2013 \u0130<\/strong>ntegral Alma Kurallar<\/strong>\u0131<\/strong>
\nBasit Kesirlere Ay\u0131rma \u2013 K\u0131smi \u0130<\/strong>ntegral \u2013 D<\/strong>\u00f6<\/strong>n<\/strong>\u00fc\u015f<\/strong>\u00fc<\/strong>m Yaparak \u0130<\/strong>ntegral Alma
\nBelirli \u0130<\/strong>ntegral
\n\u0130<\/strong>ntegralin Uygulamalar<\/strong>\u0131<\/strong> (E\u011f<\/strong>ri Alt<\/strong>\u0131<\/strong>nda Kalan Alan)
\nE\u011f<\/strong>rilerle S<\/strong>\u0131<\/strong>n<\/strong>\u0131<\/strong>rl<\/strong>\u0131<\/strong> B<\/strong>\u00f6<\/strong>lgenin Alan<\/strong>\u0131<\/strong> \u2013 D<\/strong>\u00f6<\/strong>nel Cisimlerin Hacimleri
\n\u0130<\/strong>ntegral Karma
\n\u0130<\/strong>ntegral Karma
\n\u0130<\/strong>ntegral Karma
\n\u0130<\/strong>ntegral Karma<\/strong><\/p>\n

LYS Geometri Konular\u0131<\/strong><\/p>\n

\u00dc\u00c7GENLER
\n\u00dc\u00e7gende A\u00e7\u0131lar ve Ba\u011f<\/strong>\u0131<\/strong>nt<\/strong>\u0131<\/strong>lar
\n<\/strong>\u00dc\u00e7<\/strong>genlerde E\u015f<\/strong>lik
\n<\/strong>\u00dc\u00e7<\/strong>genin Elemanlar<\/strong>\u0131<\/strong>
\nDik <\/strong>\u00dc\u00e7<\/strong>gen
\n\u0130<\/strong>kizkenar <\/strong>\u00dc\u00e7<\/strong>gen
\nE\u015f<\/strong>kenar <\/strong>\u00dc\u00e7<\/strong>gen
\n<\/strong>\u00dc\u00e7<\/strong>gende Alan<\/strong><\/p>\n

BENZERL\u0130<\/strong>K
\nTemel Orant<\/strong>\u0131<\/strong>
\n<\/strong>\u00dc\u00e7<\/strong>genlerin Benzerli\u011f<\/strong>i \u2013 Benzerlik Teoremleri
\nBenzer \u015e<\/strong>ekillerde Alan<\/strong><\/p>\n

\u00c7OKGENLER VE D\u00d6RTGENLER
\nD\u00f6rtgenler \u2013 Deltoid
\nYamuk
\nParalelkenar
\nE\u015f<\/strong>kenar D<\/strong>\u00f6<\/strong>rtgen
\nDikd<\/strong>\u00f6<\/strong>rtgen
\nKare<\/strong><\/p>\n

\u00c7EMBERLER
\n\u00c7emberde Uzunluk (Te\u011f<\/strong>et \u2013 Kiri\u015f<\/strong> \u2013 Yar<\/strong>\u0131\u00e7<\/strong>ap)
\n<\/strong>\u00c7<\/strong>emberlerin Birbirine G<\/strong>\u00f6<\/strong>re Durumlar<\/strong>\u0131<\/strong> ve Ortak Te\u011f<\/strong>etleri
\nTe\u011f<\/strong>etler D<\/strong>\u00f6<\/strong>rtgeni \u2013 <\/strong>\u00dc\u00e7<\/strong>genin <\/strong>\u00c7<\/strong>emberleri
\n<\/strong>\u00c7<\/strong>emberde Kuvvet \u2013 Benzerlik
\nDairenin Alan\u0131<\/strong><\/p>\n

ANAL\u0130<\/strong>T\u0130<\/strong>K GEOMETR\u0130<\/strong>
\n\u0130<\/strong>ki Do\u011f<\/strong>runun Konumu \u2013 Do\u011f<\/strong>ru Demeti \u2013 \u0130<\/strong>ki Do\u011f<\/strong>ru Aras<\/strong>\u0131<\/strong>ndaki A<\/strong>\u00e7\u0131<\/strong>n<\/strong>\u0131<\/strong>n Tanjant<\/strong>\u0131<\/strong> \u2013 Noktan<\/strong>\u0131<\/strong>n Do\u011f<\/strong>ruya Uzakl<\/strong>\u0131\u011f<\/strong>\u0131<\/strong>
\n<\/strong>\u00c7<\/strong>emberin Analitik \u0130<\/strong>ncelenmesi \u2013
\n<\/strong>\u00c7<\/strong>emberin Analitik \u0130<\/strong>ncelenmesi \u2013
\nKoniklerin Analitik \u0130<\/strong>ncelenmesi
\nD<\/strong>\u00fc<\/strong>zlemde Vekt<\/strong>\u00f6<\/strong>rler
\nUzayda Do\u011f<\/strong>ru Ve D<\/strong>\u00fc<\/strong>zlem Denklemleri<\/strong><\/p>\n

\u00a0<\/strong><\/p>\n","protected":false},"excerpt":{"rendered":"

2016 YGS Matematik Konular\u0131 ve Da\u011f\u0131l\u0131mlar\u0131: Say\u0131lar Basamak Kavram\u0131 Taban Aritmeti\u011fi B\u00f6lme-B\u00f6l\u00fcnebilme OBEB-OKEK Rasyonel Say\u0131lar S\u0131ralama-Basit E\u015fitsizlikler Mutlak De\u011fer \u00dcsl\u00fc \u0130fadeler K\u00f6kl\u00fc \u0130fadeler Oran-Orant\u0131 Denklem…<\/p>\n

Devam\u0131n\u0131 okuyunmatematik & geo konular\u0131<\/span><\/a><\/div>\n","protected":false},"author":1,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":[],"categories":[1],"tags":[9,11,10,12,4],"_links":{"self":[{"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=\/wp\/v2\/posts\/177"}],"collection":[{"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=\/wp\/v2\/posts"}],"about":[{"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=%2Fwp%2Fv2%2Fcomments&post=177"}],"version-history":[{"count":1,"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=\/wp\/v2\/posts\/177\/revisions"}],"predecessor-version":[{"id":178,"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=\/wp\/v2\/posts\/177\/revisions\/178"}],"wp:attachment":[{"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=177"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=177"},{"taxonomy":"post_tag","embeddable":true,"href":"http:\/\/www.ozelmatematik.net\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=177"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}