The idea is to take out perfect squares. Root(50) = root(2 x 25) = root(2) x root(25) = 5 x root(2).
17√2
27 over 50 is already in reduced form.
5√2
50√10
It is already in simplest form! 65 is a prime number. plus 65= 13x5 and those are both prime numbers.
√163 cannot be reduced.
17√2
5 radical 2
27 over 50 is already in reduced form.
5√2
5 sq rt of 2
-3*radical(2)*radical(50) = -3*radical(2*50) = -3*radical(100) = -3*10 = -30
200 = 2*100. Square root of 100 is 10. So, reduced form is 10 times the square root of 2.
I think you mean simplified form of sq root (320) = 8x sq root 5
50√10
It is already in simplest form! 65 is a prime number. plus 65= 13x5 and those are both prime numbers.
Leaving your answer in simplest radical form means expressing a radical (such as a square root) in its most reduced and manageable form. This typically involves removing any perfect squares from under the radical, ensuring that there are no further simplifications possible. For example, (\sqrt{18}) can be simplified to (3\sqrt{2}), which is its simplest radical form. The goal is to make the expression as clear and concise as possible while maintaining its value.