What is the cube root of 216x^9y^18?

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Ziyad · Answer 1 · 2017-07-14T18:12:13+0000

Answer:

The cube root of given expression is
6x^3y^6 .

Explanation:

The given expression is

$\sqrt[3]{216x^9y^(18)}$

It can be written as

Use the exponent property:
a^(mn)=(a^m)^n

$\sqrt[3]{216x^9y^(18)}=\sqrt[3]{6^3(x^3)^3(y^6)^(3)}$

$\sqrt[3]{216x^9y^(18)}=\sqrt[3]{(6x^3y^6)^(3)}$

$\sqrt[3]{216x^9y^(18)}=6x^3y^6$

Therefore the cube root of given expression is
6x^3y^6 .

What is the cube root of 216x^9y^18?

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