Math, asked by oarsb2, 11 months ago

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Answered by science9904
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Answer: it is similar not same

Calculate the area of the designed region in Fig. 12.34 common between the two quadrants of circles of radius 8 cm each

First, let us understand how we can acquire the given Area

From the figure first we need to subtract Area of quadrant from the square and then again subtract another quadrant from the square, by this, we will get the Area of the unshaded regionAnd finally to find Area of the shaded region we can subtract Area of the unshaded region from Area of square.Radius of quadrant = length of square = r= 8 cmWe can interpret from above that:Area of unshaded region = 2(Area of the square - Area of the quadrant of the circle)Area of shaded region = Area of square - 2(Area of square - Area of quadrant of circle)

Area of shaded region = 2 (Area of quadrant of circle) - Area of square

= 2 × (1/4)πr2 -   8 × 8

= [(1/2) × π × 82] - 64

= 32π - 64

= 32(π-2)

= 32 × 1.14

= 36.54 cm2

Therefore, area of shaded region is 36.54 cm2

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