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Which expression is equivalent to ? Assume .
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4 votes
Which expression is equivalent to ? Assume .

Which expression is equivalent to ? Assume .-example-1
User Mattimatti
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2 Answers

4 votes


\text{Use}\ \sqrt[n]{a^m}=a^{(m)/(n)}\ \text{and}\ a^(-1)=\dfac{1}{a}\\\\\frac{\sqrt[7]{x^2}}{\sqrt[5]{y^3}}=\left(x^{(2)/(7)\right)\left((1)/(y^(3)/(5))\right)=\left(x^{(2)/(7)}\right)\left(y^{-(3)/(5)}\right)

User Teiem
by
7.2k points
4 votes

Answer:
(x^{(2)/(7)})(y^{-(3)/(5)})

Explanation:

The given expression :
\frac{\sqrt[7]{x^2}}{\sqrt[5]{y^3} }

Law of radicals :-


\sqrt[n]{a}=a^{(1)/(n)}\\\\\sqrt[n]{a^m}=a^{(m)/(n)}

Law of exponent:


(1)/(a^n)=a^(-n)

Using the above law of radicals and law of exponent we have,


\frac{\sqrt[7]{x^2}}{\sqrt[5]{y^3}}\\\\=(x^{(2)/(7)})(y^{-(3)/(5)})

User Qmacro
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8.2k points
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