How do you divide $\frac{\sqrt{125 m^{5} n^{2}}}{\sqrt{5 m^{3} n}}$ $sqrt(125m^5n^2) / sqrt(5m^3n)$ ?

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Answer 1 · 2015-04-03T01:21:19

$\frac{\sqrt{125 m^{5} n^{2}}}{\sqrt{5 m^{3} n}}$ $sqrt(125m^5n^2)/sqrt(5m^3n)$

$= \sqrt{\frac{125 m^{5} n^{2}}{5 m^{3} n}}$ $= sqrt( (125m^5n^2)/(5m^3n))$

$= \sqrt{25 m^{2} n}$ $= sqrt(25m^2n)$

$= 5 m \sqrt{n}$ $= 5msqrt(n)$

How do you divide √125m5n2√5m3nsqrt(125m^5n^2) / sqrt(5m^3n)?