What is radical form for $4^(1/3)$ ?

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What is radical form for $4^(1/3)$ ?

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Answer 1 · 2016-06-12T12:35:25

$root(3) 4$

Explanation:

We can write $4^(1/3)$ in radical form, but not with square roots. We can write this using cube roots.

Here is a quick differentiation:

$sqrt64 = 8 or -8$
$root(3)64 = 4$

So, if we multiply $8$ or $-8$ by itself, we get 64. If we multiply 4 by itself three times, we get 64. This same theory works with fraction exponents that get smaller ( $x^(1/4), x^(1/5), x^(1/6)$ ).

Anything written to the $1/3$ power is the cube root of that base number.

Given this, we can write:

$4^(1/3)$ = $root(3)4$

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What is radical form for $4^(1/3)$ ?

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