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No, no number can be both rational and irrational.

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Q: Are there numbers that are both rational and irrational?

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It can't be both at the same time. Irrational means "not rational".

They can be both

Integers are rational. In the set of real numbers, every number is either rational or irrational; a number can't be both or neither.

No. There are infinitely many of both but the number of irrational numbers is an order of infinity greater than that for rational numbers.

All irrational numbers are not rational.

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Both irrational and rational are real. Rational numbers are numbers that can be written as a fraction. Irrational numbers cannot be expressed as a fraction.

Both are part of the real numbers; both are infinite sets. (However, there are more irrational than rational numbers.)Both are part of the real numbers; both are infinite sets. (However, there are more irrational than rational numbers.)Both are part of the real numbers; both are infinite sets. (However, there are more irrational than rational numbers.)Both are part of the real numbers; both are infinite sets. (However, there are more irrational than rational numbers.)

No, they are two separate groups of numbers. A number is either rational or irrational, never both.

It can't be both at the same time. Irrational means "not rational".

No. In fact, a number cannot be both rational and irrational; they're mutually exclusive concepts.

No. No irrational numbers are whole, and all whole numbers are rational.

They can be both

Real numbers are both. Rational numbers are numbers that can be written as a fraction. Irrational numbers cannot be expressed as a fraction.

Integers are rational. In the set of real numbers, every number is either rational or irrational; a number can't be both or neither.

yes * * * * * No. Rational and irrational numbers are two DISJOINT subsets of the real numbers. That is, no rational number is irrational and no irrational is rational.

No. There are infinitely many of both but the number of irrational numbers is an order of infinity greater than that for rational numbers.

The set of real numbers is divided into rational and irrational numbers. The two subsets are disjoint and exhaustive. That is to say, there is no real number which is both rational and irrational. Also, any real number must be rational or irrational.

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