 # Quick Answer: How Do You Find The Square Root Of 73?

## What are the factors of 73?

73 and Once73 is a prime number.Prime factorization: 73 is prime.The exponent of prime number 73 is 1.

Adding 1 to that exponent we get (1 + 1) = 2.

Therefore 73 has exactly 2 factors.Factors of 73: 1, 73.Factor pairs: 73 = 1 x 73.73 has no square factors that allow its square root to be simplified.

√73 ≈ 8.5440037..

## What is Square Root 65 simplified?

1 Answer. 65=5⋅13 has no square factors, so √65 is the simplest form.

## What is a factor of 75?

We can see that 75 is a composite number. We also know that 75=1×75,3×25, or 5×15 . All of these numbers are prime numbers so they are all factors of 75 . Thus we see that the factors of 75 are 1 , 3 , 5 , 15 , 25 and 75 .

## Does 73 have a square root?

The square root of 73 is a rational number if 73 is a perfect square. … Since 73 is not a perfect square, it is an irrational number. This means that the answer to “the square root of 73?” will have an infinite number of decimals.

## What is 69 the square root of?

8.3The answer is on top. The square root of 69 with one digit decimal accuracy is 8.3.

## Is 75 a perfect square?

Is 75 a perfect square number? A number is a perfect square (or a square number) if its square root is an integer; that is to say, it is the product of an integer with itself. Here, the square root of 75 is about 8.660. Thus, the square root of 75 is not an integer, and therefore 75 is not a square number.

## What is the square of 75?

Answer and Explanation: The square root of 75 is approximately 8.66025 or 5√3 in radical form. The factors of 75 can help in finding its square root.

## How do you simplify the square root of 73?

1 AnswerSo √24=√23⋅3=√22⋅2⋅3=√22⋅√2⋅√3.⇒√24=2⋅√2⋅√3=2√6.Using our knowledge of: √a⋅b=√a⋅√b.√73=√1⋅√73=√73.

## Can 73 be simplified?

1 Answer. 73 is not divisible by a perfect square, so √73 cannot be simplified.