2 Answers

Ambat Bhath · Answer 1 · 2018-08-07T10:25:13+0000

Answer:

$\sqrt[20]{6}$

Explanation:

we need to simplify

$\frac{\sqrt[4]{5}}{\sqrt[5]{6}}$

Each radical can be written in fraction form

$\sqrt[4]{6} = 6^{(1)/(4)}$

$\sqrt[5]{6} = 6^{(1)/(5)}$

$\frac{\sqrt[4]{5}}{\sqrt[5]{6}}=\frac{6^{(1)/(4)}}{6^{(1)/(5)}}$

Both top and bottom have same base so we subtract the exponents

$6^{(1)/(4) -(1)/(5)}$

Take common denominator to subtract the fractions

(1*5)/(4*5) -(1*4)/(5*4)

(5-4)/(20) =(1)/(20)

$6^{(1)/(4) -(1)/(5)}=6^(1)/(20)$

$6^(1)/(20) =\sqrt[20]{6}$

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