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Question

A square is inserted inside a circle such that the corners of the square coincide with the circumference of the circle. If the diameter of the circle is d�, the area of the shaded part is ____cm2.


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Solution

We need to find the area of the shaded region.

By subtracting the area of the square from the area of the circle we will be able to find the area of the shaded region.

The area of the circle is given by, A= π×(d2)2 (when d is given)

= 227×(282)2

= 616cm2

We need to find the of the side to find the area of the square, By applying Pythagoras Theorem we get,

a2+a2=d2

a=d2

= 282

Now, the area of the square using the equation, A = a2

= (282)2

= 392cm2

The Area of the shaded region is = Area of the Circle – Area of the Square

= 616 – 392 = 224cm2

The area of the shaded region is 224cm2


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