Two rhombuses have sides with lengths of #15 #. If one rhombus has a corner with an angle of #(3pi)/8 # and the other has a corner with an angle of #(5pi)/6 #, what is the difference between the areas of the rhombuses?

1 Answer
sankarankalyanam
Dec 9, 2017

Difference in areas between two rhombuses is 12.2238

Explanation:

Area of rhombus #= (1/2) * d_1 * d_2 or a * h#
Where #d_1 , d_2 # are the diagonals, a is the side and h is the altitude.

In this case we will use the formula Area = a * h.
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Rhombus 1
#h = a sin theta = 15 * sin ((3pi)/8) = 13.8582#
Area = a * h = 15 * 13.8582 = 124.7238#

Rhombus 2
#h = a sin theta = 15 * sin ((5pi)/6) = 7.5#
Area = a * h = 15 * 7.5 = 112.5#

Hence the difference in areas is #124.7238 - 112.5 = 12.2238#

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