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Question
Find the area of the shaded region in figure.
Solution
Join GH and FE such that EFGH is the rectangle.
Here, breadth of the rectangle ABCD = BC = 12 m
∴ Breadth of the inner rectangle EFGH = EF
= [12 – (4 + 4)] m
= 4 m
which is equal to the diameter of the semi-circle EJF = 4 m
∴ Radius of semi-circle EJF, (r) = 2 m
Length of inner rectangle EFGH = EH
= [26 – (5 + 5)] m
= 16 m
∴ Area of two semi-circles EJF and HIG
= `2((π"r"^2)/2)`
= `2 xx (π(2)^2)/2 "m"^2`
= 4π m2
Now, area of inner rectangle EFGH
= EH × EF
= (16 × 4) m2
= 64 m2
And area of outer rectangle ABCD
= (26 × 12) m2
= 312 m2
∴ Area of shaded region = Area of outer rectangle – (Area of two semi-circles + Area of inner rectangle)
= [312 – (4π + 64)] m2
= (248 – 4π) m2
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