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Question
- simplify each radical expression by extracting roots if possible (+6 pts).
a) $25^{\frac{6}{5}}$
b) $sqrt{108}$
c) $108^{1/3}$
Step1: Rewrite as radical form
$25^{\frac{6}{5}} = \sqrt[5]{25^6}$
Step2: Split exponent into multiple of 5
$\sqrt[5]{25^5 \times 25} = \sqrt[5]{25^5} \times \sqrt[5]{25}$
Step3: Simplify the perfect 5th root
$25 \times \sqrt[5]{25} = 25 \times \sqrt[5]{5^2}$
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Step1: Factor 108 into perfect square
$\sqrt{108} = \sqrt{36 \times 3}$
Step2: Split into product of radicals
$\sqrt{36} \times \sqrt{3}$
Step3: Simplify perfect square root
$6 \times \sqrt{3}$
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Step1: Rewrite as cube root form
$108^{1/3} = \sqrt[3]{108}$
Step2: Factor 108 into perfect cube
$\sqrt[3]{27 \times 4}$
Step3: Split into product of radicals
$\sqrt[3]{27} \times \sqrt[3]{4}$
Step4: Simplify perfect cube root
$3 \times \sqrt[3]{4}$
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a) $25\sqrt[5]{25}$ (or $25 \times 5^{\frac{2}{5}}$)
b) $6\sqrt{3}$
c) $3\sqrt[3]{4}$