Best Answer

Irrational Numbers are real numbers which cannot be expressed as fractions. In other words, decimals that never repeat.

Examples:

sqrt(2)

-pi

4*sqrt(3)

More answers

Non-terminating, non-repeating decimals.

Q: What decimals are irrational?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

Decimals are not edible.

No, they are not. Recurring decimals are rational.

No, they are rational.

No. Recurring decimals are rational numbers.

Non-terminating, non-repeating decimals.

Related questions

Decimals are not edible.

No, they are not. Recurring decimals are rational.

No, they are rational.

No. Recurring decimals are rational numbers.

Non-terminating, non-repeating decimals.

Yes. Rational numbers are numbers or decimals that repeat or terminate. Irrational numbers do not. For example π is an irrational number.

Yes.

Irrational Numbers.

They can be both

No, none of them do.

Repeating decimals are rational numbers if there is a pattern, like 0.22222222. If it is not a pattern, like 0.568964329, it is an irrational number.

Any irrational number can be approximated by decimals. You can never write it exactly, since there are an infinite number of decimals, and these don't repeat.