To simplify a term under a square root, we are going to try and find factors of the term that are to a power of 2. This is because when there is a term under a square root that is being squared, the powers cancel out and we are left with the term itself. An example of this is:
[tex]\sqrt{8x^4} = \sqrt{2^2 \cdot 2 \cdot x^2 \cdot x^2} = 2x^2\sqrt{2}[/tex]
So, we will first look at the 99. Are there any factors of 99 that are a whole number squared? Sure! 9 is equal to [tex]3^2[/tex]. Thus, we can say that 99 simplifies as follows:
[tex]99 = 11 \cdot 3^2[/tex]
(Remember that the 11 comes from the fact that 11 times 9 is equal to 99. We can't have a 3^2 without the 11!)
Now, let's look at the [tex]w^5[/tex]. Remember that exponents of the same base add to each other. Thus, we can say:
[tex]w^5 = w^2 \cdot w^2 \cdot w[/tex]
Now, let's examine the [tex]m^3[/tex]. Again, using the fact that exponents add, we can say:
[tex]m^3 = m \cdot m^2[/tex]
Now, let's substitute all of this back under the square root to get:
[tex]\sqrt{(11 \cdot 3^2) \cdot (w^2 \cdot w^2 \cdot w) \cdot (m^2 \cdot m)}[/tex]
The next step is to take out the terms to the power of 2. This gets us:
[tex]3 \cdot w \cdot w \cdot m \sqrt{11 \cdot w \cdot m}[/tex]
[tex]3w^2 m \sqrt{11wm}[/tex]
Our answer is [tex]\boxed{3w^2 m \sqrt{11wm}}[/tex].
