Question
For the following exercises, simplify the given expression. Write answers with positive exponents.$$\left(y^{7}\right)^{3} \div x^{14}$$
Step 1
So, we multiply the exponents of $y^{7}$ and $3$ to get $y^{21}$. $$\left(y^{7}\right)^{3} = y^{7 \times 3} = y^{21}$$ Show more…
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Key Concepts
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Simplify the given expression. Write answers with positive exponents. $$\left(y^{7}\right)^{3} \div x^{14}$$
Prerequisites
Exponents and Scientific Notation
For the following exercises, simplify the given expression. Write answers with positive exponents. $$\left(\frac{x^{6} y^{3}}{x^{3} y^{-3}} \cdot \frac{y^{-7}}{x^{-3}}\right)^{10}$$
In the following exercises, simplify each expression using the Power Property of Exponents. $$\left(x^{2}\right)^{7}$$
Polynomials
Use Multiplication Properties of Exponents
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