In Exercises 39–64, rationalize each denominator.3³√ -------xy²

Question

Accepted Answer

Hello, everyone. We are going to eliminate the radical in the denominator by rationalizing the expression we're given is the cube root of seven over M squared N. We have four answer choices. All of which are fractions with slightly different variations of what exponent is on our variables. First thing I'm gonna do is I'm gonna rewrite my original expression, but I'm gonna split up my radical. I recall that when I have a fraction under a radical, I can separate this. So the numerator has the radical. So this is the third route of seven over the third root of M squared N. So I can divide it up. So both the numerator and the denominator have the radical on them. This way, I can see a little clearer which part I'm working with. Next, I want to find a value to multiply both the numerator and denominator. By that will make the numbers under the cube root in the denominator have an exponent of three. So both are gonna be multiplied by the cubed root of something. And let's decide what that something is in the denominator under a radical. We have M squared N recall that when you multiply variables with exponents, you M, you add the exponents. So to get M squared to be M cubed, I need to multiply it by M to the first, which is the same as M. So that's gonna be the first part under my radical. Next for N currently N is raised to the first power. So this needs to now be N squared to be able to have an exponent of three when I multiply. So the third route of M N squared is what I'm going to multiply both my numerator and my denominator by so in doing so, multiplying my numerator, I'm multiplying the cubed root of seven by the cubed root of M N squared. Since they are both cubed roots, I'm gonna rewrite them under the same radical. So I have the cube root of seven M N squared. In my denominator, I can do the same. I'm gonna end up again with the cubed root. So when I do the cubed root of M squared N multiplied by the cubed root of M N squared, I get the cubed root of M cubed N cubed. And this is what we want. We want the index on our radical to match the exponents underneath it. This will help us cancel them out, rewriting my numerator. I still have the cube root of seven M N squared that's not gonna change in this step in the denominator. I'm gonna take the cube root of M cubed which will leave me with M and then the cube root of N cubed which will leave me with N at this point. My radical is out of my denominator. I want to see if there's anything I can simplify, but there does not appear to be. So this should be our solution. It is the cubed root of seven M N squared over M N and that looks like it matches answer choice D that is our answer. Have a nice day.

In Exercises 39–64, rationalize each denominator.3³√ -------xy²

Key Concepts

Rationalizing the Denominator

Cube Roots

Multiplying by the Conjugate

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