In this video, learn how to go from a rational exponent to a radical expression and back. No tricks or magic, just good math! We’ll review the basics and look at a few examples.

## Quick Review

Now, remember, a **rational number** is *any number that can be written as a fraction*. If that’s true, what is a rational exponent? A **rational exponent** is *an exponent that is written as a fraction*.

Here are a couple examples: *x*^(2/3), *y*^(1/2).

You’ll notice that the exponent is a fraction. So what is the fraction telling us? The fraction refers to a radical. Let’s look at a radical expression.

## Rational to Radical

First, we have the radical symbol. The *b* is called the **index** or **root number**. Inside the radical is the **radicand**. For our example, *x*^a is the radicand.How does that convert to a fractional exponent? Here’s what the radical and rational exponent look like together. As you can, see the *b* in the denominator is the same as the index for the radical.

The *a* in the numerator is the same as the exponent in the radicand.There are two ways to rewrite a rational exponent: *x*^(*a*/*b*) = *b*th root of (*x*^*a*) = (*b*th root of *x*)^*a*. These all mean the same!

## A Few Examples

Let me show you how this works. So, we have *y*^2/3 is the same thing as saying the cube root (it’s the cube root because we have a 3 here) of *y*^2.

Well, that’s the same thing as saying (cube root of *y*)^2.Let’s look at another one. Here we have the fifth root of *x*^3. The fifth root is rewritten as the denominator in the rational exponent fraction. The exponent 3 is written as the numerator in the rational exponent fraction. So, the fifth root of *x*^3 is rewritten as *x*^(3/5).

Here’s the next example: the seventh root of the quantity (2*x*)^5. How would that look as a rational exponent? The quantity (2*x*)^(5/7). Remember, the denominator of the rational fraction is the index number and the numerator is the radicand exponent.

Mathematicians love to throw a wrench into the system. Let’s say I had 4*x*^(1/2). Do you see the 4*x* is not in parenthesis like the last one we looked at? Since the 4 and the *x* are not in parenthesis, only the *x* is raised to the 1/2 power.

The 4 is all by its self. So how would that look as a radical? Since 4 is not raised to a power, it will sit in front of the radical. As far as the radical is concerned, the numerator is 1, so the exponent inside the radicand is 1. The denominator is 2, so this would be our index.

When we see a radical symbol without a number in the index, we always assume it’s 2.

## Lesson Summary

As you’ve seen, the fraction tells us we will be rewriting the exponential as a radical expression. The numerator of the fraction is the exponent inside the radicand and the denominator is simply the index.

## Lesson Objectives

After you complete this lesson you’ll have no problem converting a rational exponent to a radical expression and vice-versa.