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Which best describes a number that cannot be irrational
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Which best describes a number that cannot be irrational

User Dark Innocence
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am irrational number is a number that cannot be expressed as a fraction for any integers. numbers of the form,where is the logarithm, are irrational if and are integers, one of which has a prime factor which the other lacks.    is irrational for rational       
User Joe Cheng
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3 votes

Answer:

All numbers that can be made by dividing two integers cannot be irrational.

Explanation:

Irrational numbers are real number that cannot be expressed as the quotient between two integers, remember that integers are whole numbers, that is, they don't have a fractional part.

So, all numbers that can be made by dividing two integers cannot be irrational.

For example, number 3/2 is not an irrational number, because it can be expressed as the divison of two integers.

User Jessedc
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