Simplify Square Root of 32611

What is the square root of 32611 in its simplest radical form? To be more specific, we have created an illustration below showing what we want to calculate. Our goal is to make "A" outside the radical (√) as large as possible, and "B" inside the radical (√) as small as possible.

√32611 = A√B

Unfortunately, the square root of 32611 cannot be simplified. Thus, here is the answer to the square root of 32611 in its simplest form:

√ 32611 = √ 32611

Here are two different methods we used to determine why the square root of 32611 cannot be simplified.

1) To be able to simplify the square root of 32611, one of the factors of 32611 other than 1 must be a perfect square. The factors of 32611 are 1 and 32611. Since none of these factors are perfect squares, the square root of 32611 cannot be simplified.

2) To be able to simplify the square root of 32611, all the prime factors of 32611 cannot be unique. When we did prime factorization of 32611, we found that 32611 equals 32611. Since all the prime factors are unique, the square root of 32611 cannot be simplified.

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