9.8: Rational Exponents

Simplify Expressions with $a^{\frac{1}{n}}$

Rational exponents are another way of writing expressions with radicals. When we use rational exponents, we can apply the properties of exponents to simplify expressions.

The Power Property for Exponents says that $(a^m)^n=a^{m·n}$ when m and n are whole numbers. Let’s assume we are now not limited to whole numbers.

Suppose we want to find a number p such that $(8^p)^3=8$. We will use the Power Property of Exponents to find the value of p.

$$\begin{array}{cc} {}&{(8^p)^3=8}\\ {\text{Multiply the exponents on the left.}}&{8^{3p}=8}\\ {\text{Write the exponent 1 on the right.}}&{8^{3p}=8^1}\\ {\text{The exponents must be equal.}}&{3p=1}\\ {\text{Solve for p.}}&{p=\frac{1}{3}}\\ \nonumber \end{array}$$

But we know also $(\sqrt[3]{8})^3=8$. Then it must be that $8^{\frac{1}{3}}=\sqrt[3]{8}$

This same logic can be used for any positive integer exponent n to show that $a^{\frac{1}{n}}=\sqrt[n]{a}$.

There will be times when working with expressions will be easier if you use rational exponents and times when it will be easier if you use radicals. In the first few examples, you’ll practice converting expressions between these two notations.

In the next example, you may find it easier to simplify the expressions if you rewrite them as radicals first.

Be careful of the placement of the negative signs in the next example. We will need to use the property $a^{−n}=\frac{1}{a^n}$ in one case.

Simplify Expressions with $a^{\frac{m}{n}}$

Let’s work with the Power Property for Exponents some more.

Suppose we raise $a^{\frac{1}{n}}$ to the power m.

$$\begin{array}{ll} {}&{(a^{\frac{1}{n}})^m}\\ {\text{Multiply the exponents.}}&{a^{\frac{1}{n}·m}}\\ {\text{Simplify.}}&{a^{\frac{m}{n}}}\\ {\text{So} a^{\frac{m}{n}}=(\sqrt[n]{a})^m \text{also.}}&{}\\ \nonumber \end{array}$$

Now suppose we take $a^m$ to the $\frac{1}{n}$ power.

$$\begin{array}{ll} {}&{(a^m)^{\frac{1}{n}}}\\ {\text{Multiply the exponents.}}&{a^{m·\frac{1}{n}}}\\ {\text{Simplify.}}&{a^{\frac{m}{n}}}\\ {\text{So} a^{\frac{m}{n}}=\sqrt[n]{a^m} \text{also.}}&{}\\ \nonumber \end{array}$$

Which form do we use to simplify an expression? We usually take the root first—that way we keep the numbers in the radicand smaller.

Remember that $b^{−p}=\frac{1}{b^p}$. The negative sign in the exponent does not change the sign of the expression.

Use the Laws of Exponents to Simplify Expressions with Rational Exponents

The same laws of exponents that we already used apply to rational exponents, too. We will list the Exponent Properties here to have them for reference as we simplify expressions.

When we multiply the same base, we add the exponents.

We will use the Power Property in the next example.

The Quotient Property tells us that when we divide with the same base, we subtract the exponents.

Sometimes we need to use more than one property. In the next two examples, we will use both the Product to a Power Property and then the Power Property.

We will use both the Product and Quotient Properties in the next example.

Key Concepts

• Summary of Exponent Properties
• If a,b are real numbers and m,n are rational numbers, then
  • Product Property $a^m·a^n=a^{m+n}$
  • Power Property $(a^m)^n=a^{m·n}$
  • Product to a Power $(ab)^m=a^{m}b^{m}$
  • Quotient Property:

    $\frac{a^m}{a^n}=a^{m−n} , a \ne 0, m>n$

    $\frac{a^m}{a^n}=\frac{1}{a^{n−m}}, a \ne 0, n>m$

  • Zero Exponent Definition $a^0=1, a \ne 0$
  • Quotient to a Power Property $(\frac{a}{b})^m=\frac{a^m}{b^m}, b \ne 0$

Glossary

rational exponents

• If $\sqrt[n]{a}$ is a real number and $n \ge 2$, $a^{\frac{1}{n}}=\sqrt[n]{a}$
• For any positive integers m and n, $a^{\frac{m}{n}}=(\sqrt[n]{a})^m$ and $a^{\frac{m}{n}}=\sqrt[n]{a^m}$