Asked by Neena
The adjoining circle with centre o has radius of 14 cm .ABCD is a square drawn inside the circle calculate the area of the shaded region.
Answers
Answered by
Reiny
I am assuming you have a square centered within a circle of radius 14, and the "shaded region" in the region between circle and square.
draw a diagonal of the square, this will be the diameter of the circle and will be 28 cm long.
If the side of the square is x cm
x^2 + x^2 = 28^
2x^2 = 784
x^2 = 392
x = √392 or 14√2
the area of the circle is π(14^2) = 196π cm^2
the area of the square is 392 cm^2
so your shaded region .......
draw a diagonal of the square, this will be the diameter of the circle and will be 28 cm long.
If the side of the square is x cm
x^2 + x^2 = 28^
2x^2 = 784
x^2 = 392
x = √392 or 14√2
the area of the circle is π(14^2) = 196π cm^2
the area of the square is 392 cm^2
so your shaded region .......
Answered by
Manoj
Yes
Answered by
Bimarsh
Where the f is answer
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