Closure Properties of Integer Operations

It is always an integer.

It is always a real number.

It is always a complex number.

It is always a rational number.

The set can only contain even numbers.

The set can only contain positive numbers.

The sum of any two elements in the set is also in the set.

The set remains unchanged when elements are added.

Division

Multiplication

Subtraction

Addition

A complex number

A rational number

An irrational number

A whole number

Always a real number

Always a rational number

Always a complex number

Always an integer

Division

Subtraction

Exponentiation

Logarithm

A set is closed if it only contains positive numbers.

A set is closed if performing an operation on its elements results in an element within the set.

A set is closed if it contains all possible numbers.

A set is closed if it only contains negative numbers.

Yes, they are.

No, they are not.

Only if they are linear.

Only if they are quadratic.

They are never closed under exponentiation.

They are always closed under exponentiation.

They are sometimes closed under exponentiation.

They are closed only if the exponent is an integer.

The set of whole numbers

The set of rational numbers

The set of integers

The set of real numbers