\u2013 A \u2013<\/p>\n
<\/p>\n
a\u00e7\u0131k \u00f6nerme: \u0130\u00e7inde de\u011fi\u015fken bulunan ve bu de\u011fi\u015fkene verilen de\u011ferlerle do\u011frulu\u011fu veya yanl\u0131\u015fl\u0131\u011f\u0131 belli olan \u00f6nerme.<\/p>\n
aksiyom: Do\u011frulu\u011fu ispats\u0131z kabul edilen \u00f6nerme.<\/p>\n
alt k\u00fcme: A k\u00fcmesinin her elaman\u0131 B k\u00fcmesinin de eleman\u0131 ise<\/p>\n
A, B nin alt k\u00fcmesidir.<\/p>\n
algoritma: Belirli herhangi bir kurala ba\u011fl\u0131 bulunan her t\u00fcrl\u00fc hesap i\u015flemi<\/p>\n
apsis: Analitik d\u00fczlemde bir noktan\u0131n dikey eksene olan uzakl\u0131\u011f\u0131.<\/p>\n
ayr\u0131k k\u00fcmeler: Kesi\u015fimleri bo\u015f olan k\u00fcmeler.<\/p>\n
a\u00e7\u0131: Ba\u015flang\u0131\u00e7 noktas\u0131 ortak olan iki \u0131\u015f\u0131n\u0131n birle\u015fim k\u00fcmesi.<\/p>\n
arg\u00fcment: D\u00fczlemde bir karma\u015f\u0131k say\u0131y\u0131 orijine birle\u015ftiren \u0131\u015f\u0131n\u0131n,<\/p>\n
x ekseni ile yapt\u0131\u011f\u0131 pozitif y\u00f6nl\u00fc a\u00e7\u0131.<\/p>\n
artan fonksiyon: Reel de\u011fi\u015fkenli bir fonksiyonda serbest de\u011fi\u015fken artarken, bunlar\u0131n g\u00f6r\u00fcnt\u00fclerini de art\u0131ran fonksiyon.<\/p>\n
analitik d\u00fczlem: \u00dczerine koordinat sistemi yerle\u015ftirilmi\u015f d\u00fczlem.<\/p>\n
aralar\u0131nda asal polinom: P(x) ve Q(x) polinomlar\u0131n\u0131n her ikisini de b\u00f6len (sabit olmayan) bir polinomun olmamas\u0131 hali.<\/p>\n
aralar\u0131nda asal say\u0131lar: Ortak b\u00f6lenlerinin en b\u00fcy\u00fc\u011f\u00fc 1 olan en az iki tam say\u0131ya denir.<\/p>\n
asal say\u0131: 1 ve kendisinden ba\u015fka pozitif b\u00f6leni olmayan 1 den b\u00fcy\u00fck pozitif tam say\u0131lara denir.<\/p>\n
alan: Bir d\u00fczlem b\u00f6lgesinin b\u00fcy\u00fckl\u00fc\u011f\u00fc.<\/p>\n
anket: Veri toplamada kullan\u0131lan \u00f6l\u00e7me arac\u0131.<\/p>\n
aritmetik ortalama: Bir diziyi olu\u015fturan say\u0131lar\u0131n toplam\u0131n\u0131n, dizinin terim say\u0131s\u0131na b\u00f6l\u00fcnmesi ile elde edilen say\u0131<\/p>\n
ayr\u0131t: Cisimlerle kesi\u015fen iki d\u00fcz y\u00fcz\u00fcn ara kesiti.<\/p>\n
aritmetik dizi: Bir say\u0131ya belli bir kural\u0131 ard\u0131\u015f\u0131k uygulayarak bir sonraki say\u0131lar\u0131n elde edilmesiyle olu\u015fan \u00f6r\u00fcnt\u00fc.<\/p>\n
ayr\u0131k olay: Ayn\u0131 anda ger\u00e7ekle\u015femeyen olaylar.<\/p>\n
ayr\u0131k olmayan olay: Ayn\u0131 anda ger\u00e7ekle\u015febilen olaylar.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 B \u2013<\/p>\n
ba\u011f\u0131ms\u0131z olaylar: \u0130kisinden birisinin olu\u015fu veya olmay\u0131\u015f\u0131 di\u011ferinin olma olas\u0131l\u0131\u011f\u0131n\u0131 etkilemeyen iki olay.<\/p>\n
ba\u015flang\u0131\u00e7 noktas\u0131 (orijin): Koordinat eksenlerinin kesi\u015ftikleri nokta.<\/p>\n
bire bir e\u015fleme: \u0130ki k\u00fcmenin elemanlar\u0131 aras\u0131nda bir elemana kar\u015f\u0131 bir eleman al\u0131narak yap\u0131lan kar\u015f\u0131la\u015ft\u0131rma.<\/p>\n
birim \u00e7ember: Merkezi orijin ve yar\u0131\u00e7ap\u0131 1 birim olan \u00e7ember. Denklemi x2 + y2 = 1 dir.<\/p>\n
bire bir fonksiyon: Farkl\u0131 elemanlar\u0131, farkl\u0131 elemanlara g\u00f6t\u00fcren fonksiyon.<\/p>\n
ba\u015f kat say\u0131: Bir polinomda en b\u00fcy\u00fck dereceli terimin kat say\u0131s\u0131.<\/p>\n
bire bir fonksiyon:Tan\u0131m k\u00fcmesinde bulunan her farkl\u0131 eleman\u0131 de\u011fer k\u00fcmesinin farkl\u0131 elemanlar\u0131na e\u015fleyen fonksiyon.<\/p>\n
birim(etkisiz)fonksiyon: Her eleman\u0131 kendisine e\u015fleyen fonksiyon.<\/p>\n
ba\u011f\u0131nt\u0131: Bir kartezyen \u00e7arp\u0131m\u0131n alt k\u00fcmesi.<\/p>\n
bo\u015f k\u00fcme: Hi\u00e7 eleman\u0131 olmayan k\u00fcme.<\/p>\n
basamak: Bir say\u0131n\u0131n rakamlar\u0131n\u0131n bulundu\u011fu yer.<\/p>\n
basamak tablosu: Bir say\u0131daki rakamlar\u0131n konumlar\u0131ndan dolay\u0131 ald\u0131klar\u0131 de\u011ferleri g\u00f6steren tablo.<\/p>\n
birim: Bir niceli\u011fi \u00f6l\u00e7mek i\u00e7in kendi cinsinden \u00f6rnek se\u00e7ilen de\u011fi\u015fmez par\u00e7a.<\/p>\n
b\u00f6len: Bir b\u00f6lme i\u015fleminde b\u00f6l\u00fcnen say\u0131n\u0131n ka\u00e7 e\u015fit par\u00e7aya ayr\u0131ld\u0131\u011f\u0131n\u0131 g\u00f6steren say\u0131.<\/p>\n
b\u00f6l\u00fcm: B\u00f6lme i\u015flemi sonunda elde edilen say\u0131<\/p>\n
b\u00f6l\u00fcnen: B\u00f6lme i\u015fleminde e\u015fit par\u00e7alara ayr\u0131lmas\u0131 gereken say\u0131, miktar.<\/p>\n
b\u00fct\u00fcnler a\u00e7\u0131lar: \u00d6l\u00e7\u00fclerinin toplam\u0131 180 derece olan a\u00e7\u0131lar.<\/p>\n
benzer terim: Bir cebirsel ifadede kuvvetleri ayn\u0131 olan bir de\u011fi\u015fkenin ayn\u0131 veya farkl\u0131 kat say\u0131lara sahip terimleri.<\/p>\n
bilinmeyen: Bir e\u015fitli\u011fi sa\u011flayan say\u0131lara kar\u015f\u0131l\u0131k gelen sembol ya da harf.<\/p>\n
birle\u015fme \u00f6zelli\u011fi: a,b,c say\u0131lar\u0131 i\u00e7in ; a+(b+c)=(a+b)+c veya a.(b.c)=(a.b).c olma durumu.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 C – \u00c7 \u2013<\/p>\n
<\/p>\n
\u00e7ember: Bir d\u00fczlemdeki sabit bir noktadan e\u015fit uzakl\u0131kta bulunan noktalar\u0131n k\u00fcmesi.<\/p>\n
\u00e7embersel perm\u00fctasyon: Bir k\u00fcmenin elemanlar\u0131n\u0131n bir \u00e7ember \u00fczerindeki s\u0131ralanma bi\u00e7imlerinden her birisi.<\/p>\n
\u00e7\u0131kt\u0131: Bir olas\u0131l\u0131k deneyinde, kar\u015f\u0131la\u015f\u0131lmas\u0131 m\u00fcmk\u00fcn olan durumlardan her birisi.<\/p>\n
\u00e7\u00f6z\u00fcm k\u00fcmesi: Bir a\u00e7\u0131k \u00f6nermeyi sa\u011flayan de\u011ferlerin k\u00fcmesi.<\/p>\n
\u00e7eli\u015fki: Do\u011fruluk de\u011feri daima yanl\u0131\u015f (0) olan bile\u015fik \u00f6nerme.<\/p>\n
cebir: Say\u0131lar\u0131n bilinmeyenle temsil edildi\u011fi matematik c\u00fcmlesi.<\/p>\n
\u00e7arpan: Bir \u00e7arpma \u00f6rne\u011finde katlanan say\u0131.<\/p>\n
\u00e7evre: Bir \u00e7okgen olu\u015fturan do\u011fru par\u00e7alar\u0131n\u0131n uzunluklar\u0131 toplam\u0131 o \u00e7okgenin \u00e7evresini verir.<\/p>\n
\u00e7okgen: \u00dc\u00e7 veya daha fazla do\u011fru par\u00e7as\u0131n\u0131n(kenarlar\u0131n\u0131n) birle\u015fimi ile olu\u015fan basit kapal\u0131 bir e\u011fri.<\/p>\n
\u00e7ap: \u00c7emberin merkezinden ge\u00e7en ve u\u00e7 noktalar\u0131 \u00e7ember \u00fczerinde bulunan do\u011fru par\u00e7as\u0131.<\/p>\n
\u00e7ember par\u00e7as\u0131: \u00c7emberin iki noktas\u0131 aras\u0131nda kalan par\u00e7as\u0131, \u00e7ember yay\u0131.<\/p>\n
\u00e7evre a\u00e7\u0131: K\u00f6\u015fesi \u00e7ember \u00fczerinde olup kenarlar\u0131 \u00e7emberle kesi\u015fen a\u00e7\u0131.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 D \u2013<\/p>\n
denk polinomlar: Ayn\u0131 dereceli terimlerinin kat say\u0131lar\u0131 e\u015fit olan polinomlar.<\/p>\n
deklemi \u00e7\u00f6zmek: Denklemin k\u00f6klerinin bulma i\u015flemi.<\/p>\n
denklemin \u00e7\u00f6z\u00fcm (do\u011fruluk) k\u00fcmesi: Bir deklemin k\u00f6klerinin olu\u015fturdu\u011fu k\u00fcme.<\/p>\n
diskriminant: ax2 + bx + c = 0 denkleminde<\/p>\n
D = b2 \u2013 4 ac say\u0131s\u0131<\/p>\n
denklem sistemi: En az iki denklemin meydana getirdi\u011fi sistem.<\/p>\n
denk \u00f6nermeler: Do\u011fruluk de\u011ferleri ayn\u0131 olan \u00f6nermeler.<\/p>\n
denklik ba\u011f\u0131nt\u0131s\u0131: Yans\u0131ma, simetri ve ge\u00e7i\u015fme \u00f6zeliklerine sahip olan ba\u011f\u0131nt\u0131.<\/p>\n
daire: \u00c7ember ile i\u00e7 b\u00f6lgesinin birle\u015fimi.<\/p>\n
daire dilimi: Bir dairede, merkez a\u00e7\u0131n\u0131n i\u00e7 b\u00f6lgesinin g\u00f6rd\u00fc\u011f\u00fc yayla s\u0131n\u0131rl\u0131 olan k\u0131sm\u0131.<\/p>\n
daire grafi\u011fi: Bir b\u00fct\u00fcn\u00fcn par\u00e7alar\u0131 hakk\u0131nda bilgi sunmada kullan\u0131lan, daire \u015feklindeki grafik t\u00fcr\u00fc.<\/p>\n
de\u011fi\u015fme \u00f6zelli\u011fi: Elemanlar\u0131n yerleri de\u011fi\u015fti\u011finde i\u015flem sonucunun de\u011fi\u015fmemesi.<\/p>\n
de\u011fi\u015fken: Say\u0131lar\u0131 temsil eden harf.<\/p>\n
denklem: \u0130\u00e7inde en az bir bilinmeyenin bulundu\u011fu e\u015fitlik.<\/p>\n
d\u0131\u015f ters a\u00e7\u0131: Herhangi iki do\u011fruyu \u00fc\u00e7\u00fcnc\u00fc bir do\u011fru kesti\u011finde, bu do\u011frular\u0131n aras\u0131nda olmayan ve kesenin farkl\u0131 yanlar\u0131ndaki kom\u015fu olmayan a\u00e7\u0131lar.<\/p>\n
d\u0131\u015fb\u00fckey \u00e7okgen: K\u00f6\u015fegenlerinin tamam\u0131 \u00e7okgenin i\u00e7 b\u00f6lgesinde olan \u00e7okgenlere verilen isim.<\/p>\n
dik dairesel silindir: Tabanlar\u0131 birbirine e\u015f ve paralel iki daireden olu\u015fan ve ekseni tabanlara dik olan cisim.<\/p>\n
dik kenar: Bir dik \u00fc\u00e7gende her bir dar a\u00e7\u0131n\u0131n kar\u015f\u0131s\u0131nda bulunan kenar.<\/p>\n
dik \u00fc\u00e7gen: Bir a\u00e7\u0131s\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc 90 derece olan \u00fc\u00e7gen.<\/p>\n
do\u011fru orant\u0131: Biri artarken di\u011feri de ayn\u0131 oranda artan ya da biri azal\u0131rken di\u011feri de ayn\u0131 oranda azalan \u00e7okluklar aras\u0131ndaki orant\u0131 \u00e7e\u015fidi.<\/p>\n
do\u011frusal ili\u015fki: \u0130ki de\u011fi\u015fkenden olu\u015fan ax+by+c=0 bi\u00e7imindeki cebirsel ifade.<\/p>\n
d\u00f6nme a\u00e7\u0131s\u0131: Bir \u015feklin d\u00f6nme merkezi etraf\u0131nda d\u00f6nd\u00fcr\u00fcld\u00fc\u011f\u00fc a\u00e7\u0131.<\/p>\n
dar a\u00e7\u0131: \u00d6l\u00e7\u00fcs\u00fc 90 dereceden k\u00fc\u00e7\u00fck olan a\u00e7\u0131.<\/p>\n
dik a\u00e7\u0131: \u00d6l\u00e7\u00fcs\u00fc 90 derece olan a\u00e7\u0131.<\/p>\n
dekar(d\u00f6n\u00fcm): 1000 metre kare de\u011ferinde y\u00fczey \u00f6l\u00e7\u00fc birimi.<\/p>\n
derece: A\u00e7\u0131 \u00f6l\u00e7\u00fcs\u00fc birimi.<\/p>\n
do\u011fru: Bir do\u011fru par\u00e7as\u0131n\u0131n her iki ucundan ve z\u0131t do\u011frultularda uzat\u0131lmas\u0131 ile elde edilir.<\/p>\n
do\u011fru par\u00e7as\u0131: \u0130ki nokta aras\u0131nda en k\u0131sa yolu olu\u015fturan noktalar k\u00fcmesi.<\/p>\n
do\u011fruda\u015f noktalar: Ayn\u0131 do\u011fru \u00fczerindeki noktalar.<\/p>\n
d\u00fczlem: Bir d\u00fcz y\u00fczeyin b\u00fct\u00fcn y\u00f6nlerde sonsuz olarak geni\u015fletilmesiyle elde edilen noktalar k\u00fcmesi.<\/p>\n
<\/p>\n
\u2013 E \u2013<\/p>\n
eleman: K\u00fcmeyi olu\u015fturan nesnelerin her biri.<\/p>\n
e\u015fitsizlik sistemi: En az iki e\u015fitsizli\u011fin meydana getirdi\u011fi sistem.<\/p>\n
evrensel k\u00fcme: \u00dczerinde \u00e7al\u0131\u015f\u0131lan konuyla ilgili olan t\u00fcm elemanlar\u0131 i\u00e7eren k\u00fcme.<\/p>\n
e\u011fik dairesel silindir: Tabanlar\u0131 birbirine paralel iki daireden olu\u015fan ve ekseni tabanlara dik olmayan cisim.<\/p>\n
eksen: Dairesel silindirde birbirine e\u015f ve paralel iki daire olan tabanlar\u0131n merkezlerini birle\u015ftiren do\u011fru.<\/p>\n
e\u015fitlik: \u0130\u00e7inde = sembol\u00fc bulunan matematik c\u00fcmlesi.<\/p>\n
etkisiz eleman: \u0130\u015flemde etkisi olmayan eleman.<\/p>\n
e\u015flik: E\u015f olma durumu.<\/p>\n
ebob: En az iki sayma say\u0131s\u0131n\u0131n ortak b\u00f6lenlerinin en b\u00fcy\u00fc\u011f\u00fc.<\/p>\n
ekok: En az iki sayma say\u0131s\u0131n\u0131n ortak katlar\u0131n\u0131n en k\u00fc\u00e7\u00fc\u011f\u00fc.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 F \u2013<\/p>\n
fonksiyon: Tan\u0131m k\u00fcmesinin her eleman\u0131n\u0131, de\u011fer k\u00fcmesinin yaln\u0131z bir eleman\u0131yla e\u015fleyen ba\u011f\u0131nt\u0131.<\/p>\n
fakt\u00f6riyel: n bir do\u011fal say\u0131 olmak \u00fczere 1 den n ye kadar (n dahil) b\u00fct\u00fcn do\u011fal say\u0131lar\u0131n \u00e7arp\u0131m\u0131. (n!)<\/p>\n
fonksiyonun tan\u0131m k\u00fcmesi: f : A -) B fonksiyonunda, A k\u00fcmesi.<\/p>\n
fonksiyonun de\u011fer k\u00fcmesi: f : A -) B fonksiyonunda, B k\u00fcmesi.<\/p>\n
fonksiyonun g\u00f6r\u00fcnt\u00fc k\u00fcmesi: f : A -) B fonksiyonunda, A n\u0131n elemanlar\u0131 ile e\u015flenmi\u015f olan elemanlar\u0131n olu\u015fturdu\u011fu k\u00fcme.<\/p>\n
fonksiyonun grafi\u011fi: Fonksiyona ait ikililerin analitik d\u00fczlemde meydana getirdi\u011fi \u015fekil.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 G \u2013<\/p>\n
grad: Bir a\u00e7\u0131 \u00f6l\u00e7\u00fcs\u00fc (400 e\u015f par\u00e7aya ayr\u0131lan bir \u00e7emberin, bu par\u00e7alar\u0131ndan bir tanesini g\u00f6ren merkez a\u00e7\u0131n\u0131n \u00f6l\u00e7\u00fcs\u00fc).<\/p>\n
gerektirme: p ise q \u015fartl\u0131 \u00f6nermesinin do\u011fruluk de\u011feri 1 ise bu \u00f6nerme gerektirmedir.<\/p>\n
geometrik yer: Ayn\u0131 \u00f6zelikleri ta\u015f\u0131yan noktalar\u0131n olu\u015fturdu\u011fu k\u00fcme.<\/p>\n
geni\u015f a\u00e7\u0131: 90 derece ile 180 derece aras\u0131nda bir \u00f6l\u00e7\u00fcye sahip olan a\u00e7\u0131.<\/p>\n
geometrik dizi: Bir say\u0131yla ba\u015fka bir say\u0131n\u0131n ard\u0131\u015f\u0131k \u00e7arp\u0131lmas\u0131 veya b\u00f6l\u00fcnmesiyle elde edilen say\u0131lar\u0131n olu\u015fturdu\u011fu \u00f6r\u00fcnt\u00fc.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 H \u2013<\/p>\n
hipotez: p ise q \u015fartl\u0131 \u00f6nermesinde p \u00f6nermesi.<\/p>\n
h\u00fck\u00fcm: p ise q \u015fartl\u0131 \u00f6nermesinde q \u00f6nermesi.<\/p>\n
hacim: Bir cismin uzayda doldurdu\u011fu bo\u015fluk.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 I – \u0130 \u2013<\/p>\n
i\u00e7ine fonksiyon: f : A -) B fonksiyonunda f(A) \u00b9 B ise f i\u00e7ine fonksiyondur.<\/p>\n
indirgenemez polinom: Sabit olmayan en az iki polinomun \u00e7arp\u0131m\u0131 olarak yaz\u0131lamayan polinom.<\/p>\n
i\u015flem: A n\u0131n bir alt k\u00fcmesinden B ye fonksiyon.<\/p>\n
ispat: Bir teoremin h\u00fckm\u00fcn\u00fcn do\u011fru oldu\u011funu g\u00f6sterme.<\/p>\n
irrasyonel say\u0131: Devirli ondal\u0131k a\u00e7\u0131l\u0131m\u0131 olmayan say\u0131.<\/p>\n
imk\u00e2ns\u0131z olay: Olas\u0131l\u0131\u011f\u0131 s\u0131f\u0131r olan olay.<\/p>\n
\u0131\u015f\u0131n: Bir noktadan \u00e7\u0131k\u0131p sonsuza giden yar\u0131m do\u011frulardan her biri.<\/p>\n
istatistik: Bir sonu\u00e7 \u00e7\u0131karmak i\u00e7in olgular\u0131 bir y\u00f6nteme g\u00f6re toplay\u0131p say\u0131 olarak belirtme i\u015flemi.<\/p>\n
i\u00e7 a\u00e7\u0131: Herhangi iki do\u011fruyu \u00fc\u00e7\u00fcnc\u00fc bir do\u011fru kesti\u011finde, bu do\u011frular\u0131n aras\u0131nda ve kesenin farkl\u0131 yanlar\u0131nda olan a\u00e7\u0131lar.<\/p>\n
i\u00e7 ters a\u00e7\u0131: Herhangi iki do\u011fruyu \u00fc\u00e7\u00fcnc\u00fc bir do\u011fru kesti\u011finde, bu do\u011frular\u0131n aras\u0131nda ve kesenin her iki taraf\u0131nda kom\u015fu olmayan a\u00e7\u0131lar.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 K \u2013<\/p>\n
karakteristik: Bir say\u0131n\u0131n onluk logaritmas\u0131n\u0131n tam k\u0131sm\u0131.<\/p>\n
kesin olay: Olas\u0131l\u0131\u011f\u0131 1 olan olay.<\/p>\n
kartezyen koordinat sistemi: D\u00fczlemde, birbirine dik iki do\u011frunun 0 noktas\u0131nda kesi\u015ferek olu\u015fturdu\u011fu sistem.<\/p>\n
kat say\u0131: Terimlerin say\u0131sal \u00e7arpan\u0131.<\/p>\n
kesen: Paralel iki do\u011frunun her birini farkl\u0131 bir noktada kesen \u00fc\u00e7\u00fcnc\u00fc do\u011fru.<\/p>\n
kiri\u015f: U\u00e7 noktalar\u0131 \u00e7ember \u00fczerinde bulunan do\u011fru par\u00e7as\u0131.<\/p>\n
kesir: B\u00fct\u00fcn\u00fcn e\u015f par\u00e7alr\u0131ndan birisi ya da birka\u00e7\u0131.<\/p>\n
k\u00f6\u015fegen: Bir \u00e7okgende ard\u0131\u015f\u0131k olmayan k\u00f6\u015feleri birle\u015ftiren do\u011fru par\u00e7as\u0131.<\/p>\n
k\u00fcme: Birbirine benzer veya ayn\u0131 cinsten olan \u015feylerin olu\u015fturdu\u011fu b\u00fct\u00fcn,tak\u0131m,grup,\u00f6bek.<\/p>\n
k\u00fcp: Y\u00fczleri birbirine e\u015f karelerden olu\u015fan alt\u0131 y\u00fczl\u00fc cisim. Bir cismin hacim hesab\u0131nda kullan\u0131lan \u00f6l\u00e7\u00fc birimi.<\/p>\n
<\/p>\n
<\/p>\n
<\/p>\n
\u2013 M \u2013<\/p>\n
mantis: Bir say\u0131n\u0131n onluk logaritmas\u0131n\u0131n ondal\u0131kl\u0131 k\u0131sm\u0131.<\/p>\n
maj\u00f6r yay: Merkez a\u00e7\u0131n\u0131n \u00e7emberi kesti\u011fi noktalar aras\u0131nda kalan b\u00fcy\u00fck \u00e7ember yay\u0131.<\/p>\n
medyan: Ortanca de\u011fer.<\/p>\n
merkez a\u00e7\u0131: K\u00f6\u015fesi merkezde olup kenarlar\u0131 \u00e7emberle kesi\u015fen a\u00e7\u0131.<\/p>\n
merkezil d\u00f6nme: Noktaya g\u00f6re simetri.<\/p>\n
min\u00f6r yay: Merkez a\u00e7\u0131n\u0131n \u00e7emberi kesti\u011fi noktalar aras\u0131nda kalan k\u00fc\u00e7\u00fck \u00e7ember yay\u0131.<\/p>\n
mod: Tepe de\u011fer veya en \u00e7ok tekrar eden say\u0131.<\/p>\n
matematik c\u00fcmlesi: \u0130\u00e7inde say\u0131lar, bir i\u015flem, bir ili\u015fkisel sembol ve bir cevap bar\u0131nd\u0131ran c\u00fcmle.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 O \u2013<\/p>\n
olas\u0131l\u0131k: Bir \u015feyin olabilmesi durumu, olabilirlik, ihtimal. \u0130stenen durumlar\u0131n t\u00fcm durumlara oran\u0131.<\/p>\n
olay: \u00d6rneklem uzay\u0131n her alt k\u00fcmesi.<\/p>\n
ordinat: Analitik d\u00fczlemde bir noktan\u0131n yatay eksene olan uzakl\u0131\u011f\u0131.<\/p>\n
oran: \u0130ki say\u0131 aras\u0131ndaki kar\u015f\u0131la\u015ft\u0131rma.<\/p>\n
orant\u0131: \u0130ki oran\u0131n birbirine e\u015fitli\u011fine denir.<\/p>\n
ortak dikme: Paralel iki do\u011fruya dik olan do\u011fru.<\/p>\n
ortanca de\u011fer: Bir veri grubu k\u00fc\u00e7\u00fckten b\u00fcy\u00fc\u011fe s\u0131raland\u0131\u011f\u0131nda, terim say\u0131s\u0131 tek ise ortadaki say\u0131, \u00e7ift ise ortadaki iki say\u0131n\u0131n toplam\u0131n\u0131n yar\u0131s\u0131.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 \u00d6 \u2013<\/p>\n
\u00f6nerme: Do\u011fru ya da yanl\u0131\u015f kesin bir h\u00fck\u00fcm bildiren ifadeler.<\/p>\n
\u00f6rten fonksiyon: De\u011fer k\u00fcmesindeki b\u00fct\u00fcn elemanlar\u0131 tan\u0131m k\u00fcmesinin en az bir eleman\u0131 ile e\u015flenen fonksiyon.<\/p>\n
\u00f6zalt k\u00fcme: Bir k\u00fcmenin kendisinden farkl\u0131 alt k\u00fcmesi.<\/p>\n
\u00f6rneklem uzay: Bir olas\u0131l\u0131k deneyinde b\u00fct\u00fcn \u00e7\u0131kanlar\u0131n k\u00fcmesi.<\/p>\n
\u00f6zde\u015flik: De\u011fi\u015fkenin her reel de\u011feri i\u00e7in do\u011fru olan e\u015fitlik.<\/p>\n
\u00f6r\u00fcnt\u00fc: Belirli bir kurala g\u00f6re d\u00fczenli bir \u015fekilde tekrar eden veya geni\u015fleyen \u015fekil yada say\u0131 dizisi.<\/p>\n
\u00f6teleme: Bir cismin b\u00fct\u00fcn noktalar\u0131n\u0131n e\u015fit, paralel ve y\u00f6nde\u015f yollar \u00e7izmesiyle belirtilen hareketi.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 P \u2013<\/p>\n
perm\u00fctasyon: Bir k\u00fcmenin tamam\u0131n\u0131n ya da bir par\u00e7as\u0131n\u0131n, elemanlar\u0131n\u0131n s\u0131ralanma bi\u00e7imlerinden her birisi.<\/p>\n
parabol: f(x) = ax2 + bx + c fonksiyonunun grafi\u011fi.<\/p>\n
polinom: \u00c7okterimli, H(x) halkas\u0131n\u0131n P(x) = a0 + a1x + … + anxn eleman\u0131.<\/p>\n
polinom denklem: P(x) = 0 e\u015fitli\u011fi.<\/p>\n
polinomlarda E.B.O.B.: S\u0131f\u0131rdan farkl\u0131 P(x) ve Q(x) polinomlar\u0131n\u0131n her ikisini de b\u00f6len en b\u00fcy\u00fck polinom.<\/p>\n
polinomlarda E.K.O.K.: S\u0131f\u0131rdan farkl\u0131 olan ve sabit olmayan iki ya da daha \u00e7ok polinomun, her birine tam olarak b\u00f6l\u00fcnebilen en k\u00fc\u00e7\u00fck dereceli polinom.<\/p>\n
paralel do\u011frular: Ayn\u0131 d\u00fczlemde bulunan ve ara kesitleri bo\u015f k\u00fcme olan iki do\u011fru.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 S \u2013<\/p>\n
sabit fonksiyon: G\u00f6r\u00fcnt\u00fc k\u00fcmesi bir elemandan olu\u015fan fonksiyon.<\/p>\n
sabit polinom: a \u00b9 0 i\u00e7in P(x) = a polinomu<\/p>\n
say\u0131 do\u011frusu: \u00dczerine reel say\u0131lar\u0131n yerle\u015ftirildi\u011fi do\u011fru.<\/p>\n
s\u0131ralama ba\u011f\u0131nt\u0131s\u0131: Yans\u0131ma, ters simetri ve ge\u00e7i\u015fme \u00f6zelikleri olan ba\u011f\u0131nt\u0131.<\/p>\n
sonlu k\u00fcme: Eleman say\u0131s\u0131 say\u0131labilir \u00e7oklukta olan k\u00fcme.<\/p>\n
sonsuz k\u00fcme: Eleman say\u0131s\u0131 say\u0131lamayan \u00e7oklukta olan k\u00fcme.<\/p>\n
\u015fartl\u0131 \u00f6nerme: p ise q \u015feklindeki bile\u015fik \u00f6nerme.<\/p>\n
sanal birim: Karesi \u2013 1 olarak d\u00fc\u015f\u00fcn\u00fclen i say\u0131s\u0131.<\/p>\n
s\u0131ral\u0131 ikili: \u0130ki nesnenin olu\u015fturdu\u011fu eleman.<\/p>\n
s\u00fcsleme: \u00c7okgenlerin bo\u015fluk kalmadan \u00fcst \u00fcste gelmeden belirli bir kurala g\u00f6re d\u00fczlemi kaplamas\u0131.<\/p>\n
s\u00fcsleme kodu: Bir s\u00fcslemede, her k\u00f6\u015fedeki d\u00fczg\u00fcn \u00e7okgensel b\u00f6lgelerinkenar say\u0131lar\u0131.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 T \u2013<\/p>\n
terim: Bir bilim dal\u0131 i\u00e7inde \u00f6zel anlam\u0131 olan kelime.<\/p>\n
totoloji: Do\u011fruluk de\u011feri daima 1 olan bile\u015fik \u00f6nerme.<\/p>\n
t\u00fcmleyen k\u00fcme: E-A olmak \u00fczere, E de olup A da olmayan elemanlar\u0131n k\u00fcmesi.<\/p>\n
te\u011fet: \u00c7ember ile yaln\u0131zca bir noktada kesi\u015fen do\u011fru.<\/p>\n
tepe de\u011fer: Veri grubunda en \u00e7ok tekrar eden say\u0131.<\/p>\n
ters eleman: Bir say\u0131 ile topland\u0131\u011f\u0131nda veya \u00e7arp\u0131ld\u0131\u011f\u0131nda etkisiz eleman\u0131 veren say\u0131.<\/p>\n
ters orant\u0131: Biri artarken di\u011feri ayn\u0131 oranda azalan ya da biri azal\u0131rken di\u011feri ayn\u0131 oranda artan \u00e7okluklar aras\u0131ndaki orant\u0131 \u00e7e\u015fidi.<\/p>\n
t\u00fcmler a\u00e7\u0131lar: \u00d6l\u00e7\u00fclerinin toplam\u0131 90 derece olan a\u00e7\u0131lar.<\/p>\n
<\/p>\n
<\/p>\n
\u2013 \u00dc \u2013<\/p>\n
\u00fcstel fonksiyon: \u0130\u00e7inde \u00fcsl\u00fc bir ifade bulunduran ve bu ifadenin \u00fcss\u00fc de\u011fi\u015fken olan fonksiyon.<\/p>\n
\u00fcs: Bir say\u0131n\u0131n ka\u00e7 tanesinin \u00e7arp\u0131ld\u0131\u011f\u0131n\u0131 g\u00f6steren ve bu say\u0131n\u0131n sa\u011f \u00fcst k\u00f6\u015fesine yaz\u0131lan say\u0131(kuvvet).<\/p>\n
<\/p>\n
<\/p>\n
\u2013 V \u2013<\/p>\n
varl\u0131ksal niceleyici: $ sembol\u00fc ile g\u00f6sterilir \u201cbaz\u0131\u201d veya \u201cen az bir\u201d \u015feklinde okunur.<\/p>\n
veri: Bir problemde bilinen, belirtilmi\u015f anlat\u0131mlardan bilinmeyeni bulmaya yarayan \u015fey.<\/p>\n
<\/p>\n
— Y —<\/p>\n
<\/p>\n
<\/p>\n
y ekseni: Kartezyen koordinat sistemindeki dikey eksen.<\/p>\n
yans\u0131ma: Bir \u015feklin do\u011fruya g\u00f6re simetri\u011fi.<\/p>\n
yay: \u00c7emberde farkl\u0131 iki nokta aras\u0131ndaki \u00e7ember par\u00e7as\u0131.<\/p>\n
yutan eleman: \u00c7arpma i\u015fleminde s\u0131f\u0131r say\u0131s\u0131.<\/p>\n
y\u00fckseklik: Geometrik bi\u00e7imlerde, tabandan tepeye olan uzakl\u0131k.<\/p>\n
y\u00f6nde\u015f a\u00e7\u0131lar: Ayn\u0131 y\u00f6ne bakan a\u00e7\u0131lar.<\/p>\n","protected":false},"excerpt":{"rendered":"
\u2013 A \u2013 a\u00e7\u0131k \u00f6nerme: \u0130\u00e7inde de\u011fi\u015fken bulunan ve bu de\u011fi\u015fkene verilen de\u011ferlerle do\u011frulu\u011fu veya yanl\u0131\u015fl\u0131\u011f\u0131 belli olan \u00f6nerme. aksiyom: Do\u011frulu\u011fu ispats\u0131z kabul edilen \u00f6nerme. alt k\u00fcme: A k\u00fcmesinin her elaman\u0131 B k\u00fcmesinin de eleman\u0131 ise A, B nin alt k\u00fcmesidir. algoritma: Belirli herhangi bir kurala ba\u011fl\u0131 bulunan her t\u00fcrl\u00fc hesap i\u015flemi apsis: Analitik … Devam\u0131n\u0131 oku…<\/a><\/p>\n","protected":false},"author":1685,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":[],"categories":[13],"tags":[13920,13921,13922],"_links":{"self":[{"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/posts\/39656"}],"collection":[{"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/users\/1685"}],"replies":[{"embeddable":true,"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/comments?post=39656"}],"version-history":[{"count":0,"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/posts\/39656\/revisions"}],"wp:attachment":[{"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/media?parent=39656"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/categories?post=39656"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.sorubak.com\/blog\/wp-json\/wp\/v2\/tags?post=39656"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}