Exploring Rational and Irrational Number Properties

Yes, because they can be expressed as a fraction with 1 as the denominator

No, because they do not include a fractional part

Yes, but only if they are positive

No, because they are not written as ratios

By adding an irrational number to it

By dividing it by zero

By writing it as a ratio of two integers

By converting it into a decimal

A number that cannot be expressed as a fraction

A number that can be expressed as a fraction of two integers

A number that only includes whole numbers

A number that includes decimals that do not repeat

A terminating decimal

The square root of a perfect square

A simple fraction

Pi (π)

It cannot be expressed as a fraction of two integers

It is a perfect square

It is a whole number

It can be expressed as a fraction

No, it cannot be determined

No, it becomes an irrational number

Yes, but only if the numbers are positive

Yes, it remains a rational number

An irrational number

A whole number

Cannot be determined without specific numbers

A rational number

It means the number is a perfect square

It is possible for some special numbers

It is a contradiction; a number cannot be both

It means the number is a whole number

The result is always a rational number

The result is always an irrational number

The result is always a whole number

The result cannot be determined

Cannot be determined

Whole number

Irrational

Rational