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İMSAK'A KALAN SÜRE

Negatif sayılar rasyonel mi?

Negatif sayılar rasyonel mi?

ABONE OL
Kasım 23, 2022 00:59
Negatif sayılar rasyonel mi?
0

BEĞENDİM

ABONE OL

Bilindiği üzere, iki tam sayının birbirine oranı olarak ifade sayılara rasyonel sayılar adı verilmektedir. Peki, rasyonel sayılarda payda negatif olur mu? İşte, tüm detaylar…

Negatif Sayılar Rasyonel Midir?

Negatif sayılar rasyonel midir sorusuna cevap vermeden önce rasyonel sayıların tanımı yapmak yerinde olacaktır. Rasyonel sayılar ya da bir başka deyişle oranlı sayılar; iki tam sayının birbirine oranı olarak ifade edilen sayıların oluşturduğu bir sayı kümesi olarak tarif edilmektedir. Bu tanımdan yola çıkara rasyonel sayılar için şu 4 yargıya ulaşabiliriz.

Tüm doğal ve tam sayılar birer rasyonel sayıdır.Her kesir bir rasyonel sayıdır.Sıfırdan büyük rasyonel sayılara pozitif rasyonel sayılar denir ve Q+ işareti ile gösterilirler.Sıfırdan küçük olan rasyonel sayılara negatif rasyonel sayılar denir ve Q- sembolü ile ifade edilirler.

[image]https://im.haberturk.com/2022/11/23/ver1669156360/3541097_140x140.jpg[/image]DEVİRLİ SAYILAR RASYONEL Mİ?

Tüm bu bilgiler bize açıkça göstermektedir ki negatif sayılar da birer rasyonel sayı olarak karşımıza çıkmaktadır.

Rasyonel Sayılarda Payda Negatif Olur Mu?

Rasyonel sayılarda payda negatif olur mu sorusundan önce rasyonel sayılarda pay ve payda kavramlarından kısaca bahsetmemiz gerekmektedir.

a ve b tam sayı olmak şartıyla a/b şeklinde yazılabilen rasyonel sayılarda; a’ya pay, b’ye ise payda adı verilmektedir.

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[/image]

Bu bilgiyi verdikten sonra sorumuza tekrar dönecek olursak, evet rasyonel sayılarda payda negatif olabilmektedir. Rasyonel sayılarda paydaya 0’dan farkı her sayı gelebildiğinden, rasyonel ifadeler negatif olabilmektedir. Böyle durumlarda negatif işareti olan (–) sembolü; paya, paydaya ya da kesirin önüne getirilebilmektedir.

En az 10 karakter gerekli


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