Q: Why negative 3 belongs to the set of integers and rational numbers?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

Integers, odd integers, negative integers, odd negative integers, rational numbers, negative rational numbers, real numbers, negative real numbers, square roots of 1, etc.

All integers are rational. Not all rational numbers are integers.

Every counting number, and the negative of it, are real, rational integers.

No, they are not because fractions can be negative also. fractions aren't integers

because fractions can be negative also. fractions aren't integers. ... All integers (positive And negative) are rational numbers (not irrational).

Related questions

Integers, odd integers, negative integers, odd negative integers, rational numbers, negative rational numbers, real numbers, negative real numbers, square roots of 1, etc.

Of the "standard sets" -10 belongs to: ℤ⁻ (the negative integers) ℤ (the integers) ℚ⁻ (the negative rational numbers) ℚ (the rational numbers) ℝ⁻ (the negative real numbers) ℝ (the real numbers) ℂ (the complex numbers) (as ℤ ⊂ ℚ ⊂ ℝ ⊂ ℂ). Other sets are possible, eg the even numbers.

It belongs to infinitely many sets. Some notable sets to which it belongs include:* Integers * Negative integers * Rational numbers * Real numbers * Complex numbers

All integers are rational. Not all rational numbers are integers.

Negative integers, integers, negative rationals, rationals, negative reals, reals, complex numbers are some sets with specific names. There are lots more test without specific names to which -10 belongs.

Yes - any integers, including negative integers, are rational numbers.

integers

All integers, including negative integers, are rational numbers.

Every counting number, and the negative of it, are real, rational integers.

No, they are not because fractions can be negative also. fractions aren't integers

It belongs to the set of negative rational numbers, negative real numbers, fractionall numbers, rational numbers, real numbers.

All integers are rational numbers, not all rational numbers are integers. Rational numbers can be expressed as fractions, p/q, where q is not equal to zero. For integers the denominator is 1. 5 is an integer, 2/3 is a fraction, both are rational.