The polynomial , being a polynomial of degree 2, cannot be a cube of another polynomial. Also, it does not fit the pattern of a perfect square binomial, since its constant term is negative. Therefore, we cannot extract a root of the polynomial to help to simplify it.

We can, however, rewrite each root as a fractional exponent, apply the power of a power property, then convert back, as follows:

The best way to simplify a radical within a radical is to rewrite each root as a fractional exponent, then convert back.

First, rewrite the roots as exponents.

We can simplify this further:

Recall that when you have a fractional exponent, this means that you have a root involved.  The denominator of the exponent is the type of root.  Our question's exponent is:

Therefore, the root is  or a square root.

The numerator is the power for the base.  Therefore, we can rewrite our problem as:

Now, to simplify this, we could do:

Using our exponent rules, this is:

Factoring out  sets of , we get:

, or 

Recall that when you have a fractional exponent, this means that you have a root involved.  The denominator of the exponent is the type of root.  Our question's exponent is:

Therefore, the root is  or a cube root.

The numerator is the power for the base.  Therefore, we can rewrite our problem as:

Now, to simplify this, we could do:

Using our exponent rules, this is:

Factoring out  sets of  and  set of , we get:

Recall that when you have a fractional exponent, this means that you have a root involved.  The denominator of the exponent is the type of root.  Our question's exponent is:

Therefore, the root is  or a cube root.

The numerator is the power for the base.  Therefore, we can rewrite our problem as:

Now, to simplify this, we could do:

We can factor out a set of .  This leaves us with:

Simplifying, this is:

Recall that the cube root of a number is the number that when multiplied by itself 3 times, yields your number. 

Thus, we want y, where: 

Consider 

That cannot be our solution. 

Then try 

Thus, this must be our solution. 

Next time, remember that radicals can be represented by fractional exponents! 

Simplify the inner term within the parentheses.

First write the square root of  as an exponent, 

From the rules of exponents we know we can simplyfy by adding the exponents, 

To simplify the expression, we must remember that a fraction as a power denotes a radical: the numerator is the power to which the term is taken inside the radical, and the denominator denotes the degree of the root (i.e. 2 means square root, 3 means cube root, etc.)

Rewriting our expression, we get

which expanded becomes

Now, move the cubes outside of the cube root, after taking their cube root, leaving behind the terms that aren't cubes:

The fractional exponent represents the fourth root of the given number.

Evaluate .

Evaluate .

Rewrite the fractions.

The answer is: