Every Integer is a Rational Number. True or False

Every Integer is a Rational Number. True or False?

Answer: Every integer is a rational number. This assertion is true.

Explanation:

Integers – Integers are made up of zero, natural numbers, and the additive inverse of those numbers. Except for the fractional component, it may be expressed on a number line. It is indicated by the letter Z.

Rational number – A rational number is a sort of real number in mathematics. Any number that can be stated in the p/q form, with q not being equal to 0, can be defined as it.

Any fraction can also be classified as a rational number if the denominator and numerator are both integers and the denominator is not equal to zero.

When a rational number that is also a fraction is split, the result is a decimal, which can be either repeating decimal or terminating decimal.

Thus, Integers are a subset of Rational numbers set.

Hence every integer is a rational number.