How do you express $11x^(1/3)$ in simplest radical form?

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How do you express $11x^(1/3)$ in simplest radical form?

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Answer 1 · 2015-07-24T09:21:59

You take the cube root from $x$ and multiply the result by 11.

Explanation:

An important thing to remember when dealing with fractional exponents is that exponents that take the form $1/n$ are equivalent to taking the $n^"th"$ root of something.

In your case, for $x>0$ , you have

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

This means that the original expression is equivalent to

$11 * x^(1/3) = color(green)(11 * root(3)(x))$

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How do you express $11x^(1/3)$ in simplest radical form?

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