Sqrt 216v

<-- Enter expression (use sqrt for square root)

Simplify √216v

Simplify √216.

Checking square roots, we see that 142 = 196 and 152 = 225.
Our answer is not an integer, so we try simplify it into the product of an integer and a radical.

We do this by listing each product combo of 216 checking for integer square root values below:
216 = √1216
216 = √2108
216 = √372
216 = √454
216 = √636
216 = √827
216 = √924
216 = √1218

From that list, the highest factor that has an integer square root is 36.
Therefore, we use the product combo √216 = √366
Evaluating square roots, we see that √36 = 6

Simplifying our product of radicals, we get our answer:
216 = 6√6

Therefore, we can factor out 6 from the radical, and leave 6 under the radical

We can factor out the following portion using the highest even powers of variables:
= =
Our leftover piece under the radical becomes 6√6v
Our final answer is the factored out piece and the expression under the radical
6√6v