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Desislav Kamenov · Answer 1 · 2021-09-25T04:40:56+0000

Answer:

converting
$(24C)^{(2)/(3)}$ into radical form we get
$\mathbf{4\sqrt[3]{(3C)^2} }$

Explanation:

We are given:
$(24C)^{(2)/(3)}$

And we need to convert into radical

We know that
$(1)/(3)=\sqrt[3]{x}$

Prime factors of 24 are: 2x2x2x3

Solving:

$(24C)^{(2)/(3)}\\=(2 * 2 * 2 *3* C)^{(2)/(3)}\\=(2^3)^{(2)/(3)}((3*C)^{(2)/(3)})\\=2^2((3*C)^{(2)/(3)})\\=4\sqrt[3]{(3C)^2}$

So, converting
$(24C)^{(2)/(3)}$ into radical form we get
$\mathbf{4\sqrt[3]{(3C)^2} }$