Example: Simplifying nth Roots

1. $\sqrt[5]{-32}$
2. $\sqrt[4]{4}\cdot \sqrt[4]{1,024}$
3. $-\sqrt[3]{\dfrac{8{x}^{6}}{125}}$
4. $8\sqrt[4]{3}-\sqrt[4]{48}$

Answer:

1. $\sqrt[5]{-32}=-2$ because ${\left(-2\right)}^{5}=-32 \\ \text{ }$
2. First, express the product as a single radical expression. $\sqrt[4]{4\text{,}096}=8$ because ${8}^{4}=4,096$
3. \begin{align}\\ &\frac{-\sqrt[3]{8{x}^{6}}}{\sqrt[3]{125}} && \text{Write as quotient of two radical expressions}. \\ &\frac{-2{x}^{2}}{5} && \text{Simplify}. \\ \end{align}
4. \begin{align}\\ &8\sqrt[4]{3}-2\sqrt[4]{3} && \text{Simplify to get equal radicands}. \\ &6\sqrt[4]{3} && \text{Add}. \end{align}

Example: Writing Rational Exponents as Radicals

Answer: The 2 tells us the power and the 3 tells us the root.

${343}^{\frac{2}{3}}={\left(\sqrt[3]{343}\right)}^{2}=\sqrt[3]{{343}^{2}}$

${343}^{\frac{2}{3}}={\left(\sqrt[3]{343}\right)}^{2}={7}^{2}=49$

Example: Writing Radicals as Rational Exponents

Answer: The power is 2 and the root is 7, so the rational exponent will be $\dfrac{2}{7}$. We get $\dfrac{4}{{a}^{\frac{2}{7}}}$. Using properties of exponents, we get $\dfrac{4}{\sqrt[7]{{a}^{2}}}=4{a}^{\frac{-2}{7}}$.

Example: Simplifying Rational Exponents

1. $5\left(2{x}^{\frac{3}{4}}\right)\left(3{x}^{\frac{1}{5}}\right)$
2. ${\left(\dfrac{16}{9}\right)}^{-\frac{1}{2}}$

Answer: 1. $$\begin{align}&30{x}^{\frac{3}{4}}{x}^{\frac{1}{5}}&& \text{Multiply the coefficients}. \\ &30{x}^{\frac{3}{4}+\frac{1}{5}}&& \text{Use properties of exponents}. \\ &30{x}^{\frac{19}{20}}&& \text{Simplify}. \end{align}$$ 2. $$\begin{align}&{\left(\frac{9}{16}\right)}^{\frac{1}{2}}&& \text{Use definition of negative exponents}. \\ &\sqrt{\frac{9}{16}}&& \text{Rewrite as a radical}. \\ &\frac{\sqrt{9}}{\sqrt{16}}&& \text{Use the quotient rule}. \\ &\frac{3}{4}&& \text{Simplify}. \end{align}$$