Back to Exercise: Rewrite expressions with rational exponents

Exercises: Rewrite Expressions Involving Radicals and Rational Exponents

Work through each section in order. Show your work for simplification problems. Express all fractional exponents in lowest terms.

Grade 9·20 problems·~28 min·Common Core Math - HS Number and Quantity·standard·hsn-rn-a-2
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A

Warm-Up: The Notation Bridge

These problems review the basic conversion between radical and exponential notation.

1.

Which expression is equivalent to x35\sqrt[5]{x^3}?

2.

Which radical expression is equivalent to y4/7y^{4/7}?

3.

Evaluate 8x33\sqrt[3]{8x^3} by first writing it in exponential form as (8x3)1/3(8x^3)^{1/3}, then simplifying. Give your answer as a simplified expression.

B

Fluency Practice

Rewrite each expression as indicated. Simplify completely.

1.

Rewrite each expression in exponential form (as am/na^{m/n}):

(a) x34\sqrt[4]{x^3}

(b) x7\sqrt{x^7}

(c) x56\sqrt[6]{x^5}

2.

Which expression correctly converts z5/4z^{5/4} to radical notation?

3.

Rewrite each expression in radical notation:

(a) a3/5a^{3/5}

(b) b1/2b^{-1/2}

(c) (2x)3/2(2x)^{3/2}

4.

Simplify using the product rule aras=ar+sa^r \cdot a^s = a^{r+s}:

(a) x1/2x1/3x^{1/2} \cdot x^{1/3}

(b) x1/4x3/4x^{1/4} \cdot x^{3/4}

5.

Simplify using the power rule (ar)s=ars(a^r)^s = a^{rs} or the quotient rule ar/as=arsa^r / a^s = a^{r-s}:

(a) (x2/3)3/4(x^{2/3})^{3/4}

(b) x3/4÷x1/4x^{3/4} \div x^{1/4}

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