# What is the cube root of 96?

May 2, 2018

$2$ $\sqrt[3]{12}$
Or
$4.5788569 \ldots$

#### Explanation:

Rewrite $96$ as ${2}^{3} \times 12$.

Factor $8$ out of $96$.

Now, $\sqrt[3]{96} = \sqrt[3]{8 \times 12} = \sqrt[3]{{2}^{3} \times 12}$

Pull terms out from under the radical $= 2 \sqrt[3]{12}$

Can be extracted other decimal Form = 4.57885697…