QUESTION IMAGE
Question
- $(16x^{8})^{1/4}$
- $(64x^{12})^{1/6}$
- $(125x^{15})^{-1/5}$
- $(81x^{8})^{1/4}$
- $(27x^{9})^{1/3}$
- $(256x^{16})^{1/4}$
Problem 3: $(16x^8)^{1/4}$
Step1: Apply exponent product rule
$(ab)^n=a^n b^n$
$(16x^8)^{1/4}=16^{1/4} \cdot (x^8)^{1/4}$
Step2: Simplify constant and variable
$16^{1/4}=2$, $(x^8)^{1/4}=x^{8 \cdot \frac{1}{4}}=x^2$
$2 \cdot x^2$
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Problem 4: $(64x^{12})^{1/6}$
Step1: Apply exponent product rule
$(ab)^n=a^n b^n$
$(64x^{12})^{1/6}=64^{1/6} \cdot (x^{12})^{1/6}$
Step2: Simplify constant and variable
$64^{1/6}=2$, $(x^{12})^{1/6}=x^{12 \cdot \frac{1}{6}}=x^2$
$2 \cdot x^2$
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Problem 5: $(125x^{15})^{-1/5}$
Step1: Apply negative exponent rule
$a^{-n}=\frac{1}{a^n}$
$(125x^{15})^{-1/5}=\frac{1}{(125x^{15})^{1/5}}$
Step2: Apply exponent product rule
$(ab)^n=a^n b^n$
$\frac{1}{125^{1/5} \cdot (x^{15})^{1/5}}$
Step3: Simplify constant and variable
$125^{1/5}=5^{3/5}$, $(x^{15})^{1/5}=x^3$
$\frac{1}{5^{3/5}x^3}$
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Problem 6: $(81x^8)^{-1/4}$
Step1: Apply negative exponent rule
$a^{-n}=\frac{1}{a^n}$
$(81x^8)^{-1/4}=\frac{1}{(81x^8)^{1/4}}$
Step2: Apply exponent product rule
$(ab)^n=a^n b^n$
$\frac{1}{81^{1/4} \cdot (x^8)^{1/4}}$
Step3: Simplify constant and variable
$81^{1/4}=3$, $(x^8)^{1/4}=x^2$
$\frac{1}{3x^2}$
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Problem 7: $(27x^9)^{1/3}$
Step1: Apply exponent product rule
$(ab)^n=a^n b^n$
$(27x^9)^{1/3}=27^{1/3} \cdot (x^9)^{1/3}$
Step2: Simplify constant and variable
$27^{1/3}=3$, $(x^9)^{1/3}=x^{9 \cdot \frac{1}{3}}=x^3$
$3 \cdot x^3$
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Problem 8: $(256x^{16})^{1/4}$
Step1: Apply exponent product rule
$(ab)^n=a^n b^n$
$(256x^{16})^{1/4}=256^{1/4} \cdot (x^{16})^{1/4}$
Step2: Simplify constant and variable
$256^{1/4}=4$, $(x^{16})^{1/4}=x^{16 \cdot \frac{1}{4}}=x^4$
$4 \cdot x^4$
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