1 Answer

Astjohn · Answer 1 · 2020-10-01T13:41:26+0000

Answer:

4x^(4)

Explanation:

Given in the question an expression,

(256x^(16))^(1)/(4)

As we know that,

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

so

$\sqrt[4]{256x^(16) }$

it could also be written as

$\sqrt{\sqrt{256x^(16) } }$

First to solve inner square root

$\sqrt{256x^(16) } = 16x^(16/2)$

$\sqrt{16x^(8) }$

Second outer square root

$\sqrt{16x^(8)}=4x^(8/2)$ =
4x^(4)

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