Rational and Irrational Number Concepts

What happens when you multiply two rational numbers?

What is the result of adding a rational number to an irrational number?

How do you subtract an irrational number from a rational number?

What is the product of two irrational numbers?

The sum is always irrational.

The sum is always rational.

The sum is sometimes rational.

The sum is sometimes irrational.

As a whole number.

As a variable x.

As a decimal number.

As a fraction of two integers.

Multiplication of fractions.

Division of fractions.

Addition of fractions.

Subtraction of fractions.

It shows the irrational number is irrational.

It confirms the sum is irrational.

It confirms the sum is rational.

It proves the irrational number is rational.

The rational number becomes irrational.

The sum becomes a whole number.

The sum becomes irrational.

The irrational number becomes rational.

A rational plus an irrational is rational.

A rational plus an irrational is irrational.

A rational plus a rational is irrational.

An irrational plus an irrational is rational.

A rational plus a rational must be irrational.

An irrational plus an irrational must be rational.

A rational plus an irrational must be irrational.

A rational plus an irrational must be rational.

Because it is not supported by evidence.

Because it is mathematically impossible.

Because it leads to a logical contradiction.

Because it is a common misconception.

It demonstrates the nature of irrational numbers.

It proves that all numbers are rational.

It shows that irrational numbers cannot be added.

It confirms that rational numbers are always integers.