Geometry The diagonals of a kite are in the ratio of 3:2. The area of the kite is 27 cm^2 . Find the length of both diagonals. (Hint: Let the lengths of the diagonals be 3x and 2x) How do I do this?

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asked Jun 14, 2015 181k views

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Geometry

The diagonals of a kite are in the ratio of 3:2. The area of the kite is 27 cm^2 . Find the length of both diagonals. (Hint: Let the lengths of the diagonals be 3x and 2x)

How do I do this?

Mathematics
high-school

Sntnupl asked

by Sntnupl

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$A=27 \ cm^2 \\ \\ d_(1)=3x , \ \ d_(2) = 2x \\ \\ S=(1)/(2)\cdot d_(1)\cdot d_(2)\\ \\27 = (1)/(2)\cdot 3x \cdot 2x \\ \\ 3x^2 = 27 \ \ /:3$

$x^2 = 9 \\ \\3x=x=√(9)\\ \\x=3 \ cm \\ \\ d_(1)=3x = 3*3 =9 \ cm \\ \\d_(2)=2x=2*3 = 6 \ cm \\ \\ Answer : \\ The \ length \ of \ the \ diagonal \ is: \ d_(1)= 9 \ cm \ and \ d_(2)= 6 \ cm$