Can the decimal representation of a number be non terminating non repeating?

Can the decimal representation of a number be non terminating non repeating?

A non-terminating, non-repeating decimal is a decimal number that continues endlessly, with no group of digits repeating endlessly. Decimals of this type cannot be represented as fractions, and as a result are irrational numbers. Pi is a non-terminating, non-repeating decimal.

Is the decimal representation of an irrational number?

Decimal representation of an irrational number is always non terminating non repeating. When an irrational number is changed into a decimal, the resulting number is a non terminating, nonrecurring decimal.

What Cannot be the decimal representation of a rational number?

The decimal representation of a rational number cannot be non-terminating non-repeating because the decimal expansion of rational numbers is either terminating or non-terminating recurring. The non-Terminating and non-repeating decimals are said to be Irrational numbers.

What’s a non repeating non terminating decimal called?

irrational numbers

How do you write a non terminating non repeating decimal?

The decimal representation of a rational number cannot be non-terminating non-repeating because the decimal expansion of rational numbers is either terminating or non-terminating recurring.