Back to Exercise: Explain rational exponents

Exercises: Explain How the Definition of Rational Exponents Follows from Integer Exponent Properties

Work through each section in order. Show your reasoning where indicated. For explanation problems, write in complete sentences.

Grade 9·20 problems·~30 min·Common Core Math - HS Number and Quantity·standard·hsn-rn-a-1
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A

Warm-Up: Integer Exponent Rules

These problems review skills you already know.

1.

The power rule states that (am)n=amn(a^m)^n = a^{mn}. Applying this rule to (51/3)3(5^{1/3})^3 gives 5(1/3)3=51=55^{(1/3) \cdot 3} = 5^1 = 5. Which conclusion follows?

2.

Which statement correctly converts between radical and exponential notation?

3.

The product rule states aman=am+na^m \cdot a^n = a^{m+n}. Simplify 41/243/24^{1/2} \cdot 4^{3/2} using this rule. Show each step and state which rule you used.

B

Fluency Practice

Evaluate each expression.

1.

What is the value of 81/38^{1/3}?

2.

Evaluate 163/416^{3/4}.

3.

Evaluate 272/327^{2/3}.

4.

Simplify 272/3÷271/327^{2/3} \div 27^{1/3} using the quotient rule ar÷as=arsa^r \div a^s = a^{r-s}. Give a whole number answer.

5.

Evaluate 82/38^{-2/3}. Express your answer as a fraction.

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