What is the simplest form of this quotient square root of 3x^12y^10 divided by 5x^6y^3

asked Oct 12, 2018 219k views

5 votes

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4 votes

Answer:

$x^(3)y^(3)\sqrt{((3)/(5))y}$

Explanation:

we have

$\sqrt{(3x^(12)y^(10))/(5x^(6)y^(3))}$

Rewrite the expression

we know that

(3x^(12)y^(10))/(5x^(6)y^(3)) =((3)/(5))((x^(12))/(x^(6)))((y^(10))/(y^(3)))

simplify

((3)/(5))((x^(12))/(x^(6)))((y^(10))/(y^(3)))=((3)/(5))x^(6)y^(7)

substitute

$\sqrt{((3)/(5))x^(6)y^(7)}=x^(3)y^(3)\sqrt{((3)/(5))y}$

Zell answered Oct 18, 2018

by Zell

8.5k points

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