Question

How do you simplify `\sqrt { 225x ^ { 18} y ^ { 22} }`?

Answer 1

`15x^9y^11`

Explanation:

Recall : `sqrtx=x^(1/2), and sqrt(x^2)=(x^2)^(1/2)=x^(2*1/2)=x`,

`sqrt(225x^18y^22)=sqrt(15*15*x^18*y^22)=(15^2*x^18*y^22)^(1/2)`
`=15^(2*1/2)*x^(18*1/2)*y^(22*1/2)`
`=15*x^9*y^11`

Answer 2

`sqrt(225x^18y^22) = abs(15x^9y^11)`

Explanation:

Note that:

`225x^18y^22 = 15^2*(x^9)^2*(y^11)^2 = (15x^9y^11)^2`

So `15x^9y^11` is a square root of `225x^18y^22`.

We also find:

`(-15x^9y^11)^2 = 225x^18y^22`

So `-15x^9y^11` is also a square root of `225x^18y^22`.

Note that if `a >= 0` then `sqrt(a)` denotes the non-negative square root.

So if, for example, `x < 0` and `y > 0` then `15x^9y^11 < 0` would be the wrong square root.

We can express that we want the non-negative square root by taking the modulus:

`sqrt(225x^18y^22) = abs(15x^9y^11)`