To which subset of real numbers does the following number belong?

square root of 30

irrational is the answer

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Ah, the square root of 30, a number both real and irrational. It's like the mystical unicorn of numbers - real, yet untamed. So, to answer your question, the square root of 30 belongs to the subset of real numbers, specifically the irrational ones.

To determine the subset of real numbers to which the square root of 30 belongs, we need to consider the properties of real numbers and the square root.

First, let's recall that real numbers consist of rational numbers and irrational numbers. Rational numbers can be expressed as fractions or terminating or repeating decimals, while irrational numbers cannot be expressed as fractions and have non-repeating decimal representations.

To find the square root of 30, we can use a calculator or manually calculate it by trial and error. However, since 30 is not a perfect square, the square root of 30 is an irrational number.

So, the square root of 30 belongs to the subset of irrational numbers within the set of real numbers.

What are your answer choices?

What is your answer?

only the real numbers.

It is not a rational, integer, natural, or whole