Question:

Which among $2^{1/2}$, $3^{1/3}$, $4^{1/4}$, $6^{1/6}$, and $12^{1/12}$ is the largest?

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For comparisons of $n^{1/n}$, note that the sequence increases up to $n=3$ and then decreases.

Updated On: Jul 31, 2025

$2^{1/2}$
$3^{1/3}$
$4^{1/4}$
$6^{1/6}$
$12^{1/12}$

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The Correct Option is B

Solution and Explanation

Approximating each value: \[ 2^{1/2} \approx 1.4142 \] \[ 3^{1/3} \approx 1.4422 \] \[ 4^{1/4} \approx 1.4142 \] \[ 6^{1/6} \approx 1.3480 \] \[ 12^{1/12} \approx 1.2311 \] The largest is clearly $3^{1/3} \approx 1.4422$. \[ \boxed{3^{1/3}} \]

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Top Questions on Surds and Indices

Match List-l with List-ll

List I		List II
A.	$\sqrt{\frac{0.81\times0.484}{0.064\times6.25}}$	I.	0.024
B.	$\sqrt{\frac{0.204\times42}{0.07\times3.4}}$	II.	0.99
C.	$\sqrt{\frac{0.081\times0.324\times4.624}{1.5625\times0.0289\times72.9\times64}}$	III.	50
D.	$\sqrt{\frac{9.5\times0.085}{0.0017\times0.19}}$	IV.	6

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CMAT - 2024
Quantitative Ability and Data Interpretation
Surds and Indices

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List I		List II
A.	\(\sqrt{\frac{0.81\times0.484}{0.064\times6.25}}\)	I.	0.024
B.	\(\sqrt{\frac{0.204\times42}{0.07\times3.4}}\)	II.	0.99
C.	\(\sqrt{\frac{0.081\times0.324\times4.624}{1.5625\times0.0289\times72.9\times64}}\)	III.	50
D.	\(\sqrt{\frac{9.5\times0.085}{0.0017\times0.19}}\)	IV.	6