What is the simplest radical form of the expression? (x3y5)4/3

asked Aug 3, 2020 45.5k views

3 votes

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Answer:

$(x3y^5)^{(4)/(3) \\=[(x^{3  * (4)/(3)}y^{5 * (4)/(3)})\\\\=x^4y^{(20)/(3)\\=x^4y^{(18)/(3)}y^{(2)/(3)}\\=x^4y^6\sqrt[3]{y^2}$

Explanation:

Benjamin Jones answered Aug 4, 2020

5.4k points

3 votes

Rational exponents work as follows:

$a^{(b)/(c)}=\sqrt[c]{a^b}$

So, in your case, we have

$(x^3y^5)^{(4)/(3)} = \sqrt[3]{(x^3y^5)^4}=\sqrt[3]{x^(12)y^(20)}=\sqrt[3]{x^(12)y^(18)\cdot y^2}}=x^4y^6\sqrt[3]{y^2}$

Jisselle answered Aug 8, 2020

4.6k points

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