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Is a rational number a subset of integers?

Updated: 9/20/2023
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13y ago
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yes

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Q: Is a rational number a subset of integers?
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Can a number be a rational number and not an integer?

Yes, just look at decimals. Note: integers are a subset of rational numbers.

Are integers in a set of rational numbers?

Yes - the set of integers is a subset of the set of rational numbers.

Integers are a subset of rational numbers?

true

Why are rational numbers closed in subtraction?

Because when one rational number is subtracted from another rational number the result is a rational number. Don't forget that integers (ℤ) are a subset of rational numbers (ℚ).

What is the relationship between integers and rational numbers?

The set of integers is a proper subset of the set of rational numbers.

Related questions

Is rational number not a subset of integer?

No, rational numbers are not a subset of integers.

How Integers In Rational Number Relate?

Integers are aproper subset of rational numbers.

Are the rational numbers a subset of integers?

No, integers are a subset of rational numbers.

What is 20137 as a rational number?

20137 is an integer and the integers are a subset of rational numbers!

Is a rational number a subset of the set of integers?

not necessarily... An integer is a rational number, but so is any real number between consecutive integers.

Can a number be a rational number and not an integer?

Yes, just look at decimals. Note: integers are a subset of rational numbers.

Integers are a subset of what types of numbers?

Integers are a subset of rational numbers which are a subset of real numbers which are a subset of complex numbers ...

Are rational numbers a subset of a set of integers?

No, they are not.

Integers are a subset of rational numbers?

true

Are integers in a set of rational numbers?

Yes - the set of integers is a subset of the set of rational numbers.

Does every point on the real number line correspond to a rational number?

No. There are several real numbers that are not rational (e.g. pi). However, every rational number is also a real number. In general, whole numbers/natural numbers is a subset of the integers (i.e. every whole number is an integer), the integers is a subset of the rationals, the rationals are a subset of the real numbers. I think the real numbers are a subset of the complex numbers, but I'm not 100% positive on that.

Why are rational numbers closed in subtraction?

Because when one rational number is subtracted from another rational number the result is a rational number. Don't forget that integers (ℤ) are a subset of rational numbers (ℚ).

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