In Exercises 39–64, rationalize each denominator.10----------⁵√16...

Question

In Exercises 39–64, rationalize each denominator.10----------⁵√16x²

Accepted Answer

Hello, everyone. We are going to eliminate the radical in the denominator by rationalizing the expression we're given is 24 over the fifth route of 81 X cubed, we have four different answer choices, all of which have been simplified. So the radical is only in the numerator. I'm going to rewrite my original expression over the fifth route of X cubed because my denominator has 1/ route. I know that I'm gonna need to multiply numerator and denominator by 1/5 route. So the first thing I'm gonna do is I'm going to change my denominator a little bit. So the numerator remains 24 in my denominator. I'm still gonna have the fifth root and I'm gonna take 81 I'm going to rewrite it as a base with an exponent. Looking at this, I know 81 is the same as three rays to the fourth power and X cubed is gonna remain X cubed. Now that I have this information, I can decide what I want to multiply the numerator and the denominator by, I know they're gonna be multiplied by the same thing. And I know that both are gonna be 1/5 route. So I'm writing that first and then I will fill it in to cancel the fifth route in the denominator. I want all the exponents under that radical to have an exponent of five. So to make that happen, I need to multiply three, raise the fourth power by three and I need to multiply X cubed by X squared. So the term I'm gonna multiply numerator and denominator by is the fifth root of three X squared. This will make it. So all of my terms in my denominator will cancel out when I take the fifth route and we can simplify it. So multiplying across the numerator 24 multiplied by the fifth root of three X squared, I'm gonna just rewrite for now as 24 and then the fifth route of three X squared next to it. In my denominator, I am gonna rewrite my fifth route for now. And then recall that when you multiply values that are under a radical, you multiply them like you would if there was no radical. So three raise the fourth power multiplied by three, give me three, raise the fifth power X cubed multiplied by X squared would give me X raise the fifth power. And this is what we wanted from our denominator. We wanted both of the numbers under our radical to be raised to the fifth power. The reason we wanted to do that is so now that the exponents and the radical will cancel. I'm gonna leave my num reader the same. So 24 multiplied by the fifth root of three X squared and then simplifying my denominator. The fifth route of three, raise the fifth power is three, the fifth route of X ray, the fifth power is X. So at this step, I have 24 multiplied by the fifth root of three X squared over three X. I want to see if this can be simplified any further noticing that 24 3 can be reduced. I'm gonna reduce both of them by three. So three goes into 24 8 times. So now I have eight multiplied by the fifth root of three X squared over and then my denominator three will cancel out leaving me with X. This looks like as simplified as this can get. So we have the answer of eight multiplied by the fifth root of three X squared over X. And that appears to be answer choice C have a nice day.

In Exercises 39–64, rationalize each denominator.10----------⁵√16x²

Key Concepts

Rationalizing the Denominator

Radical Expressions

Properties of Exponents

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