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A crescent is formed by two circles which touch at A. C is the centre of the larger circle. The width of the crescent at BD is 9 cm and at EF is 5 cm. Find area of the shaded region.?
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A crescent is formed by two circles which touch at A. C is the centre ...
Let x = DC, C ' be the center of the smaller circle, r be the radius of the smaller circle, and R be the radius of the larger circle. We have

BC = BD+DC = 9+x

and

AC = AD-CD = 2r-x.

Since
R = BC = AC,
(1) R = 9+x = 2r-x,
(2) r = (2x+9)/2.

In the right triangle C 'CE,
CE = CF-EF = R-5 = x+9-5 = x+4,
C 'C = C 'D-CD = r-x,

and

C 'E = r.

By the Pythagorean theorem,
(x+4)^2+(r-x)^2 = r^2,
r^2-(r-x)^2 = (x+4)^2,
(r-r+x)(r+r-x) = (x+4)^2,
x(2r-x) = (x+4)^2.

Using (1) in the last equation, we have
x(9+x) = (x+4)^2,
x = 16.

It follows that, by (2), r = (2x+9)/2 = 41/2 and by (1), R = 9+x = 25. Hence the area of the crescent is pi*(R^2-r^2) = pi*(R-r)(R+r) = pi*(9/2)*(91/2) = 819*pi/4 = 643.5 cm^2
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Most Upvoted Answer
A crescent is formed by two circles which touch at A. C is the centre ...
Understanding the Crescent Shape
The crescent is formed by the intersection of two circles, creating a shaded area between them. To calculate the area of the shaded region, we need to determine the areas of both circles involved.
Dimensions of the Crescent
- The width of the crescent at BD is 9 cm.
- The width at EF is 5 cm.
Radii of the Circles
- Let R be the radius of the larger circle.
- Let r be the radius of the smaller circle.
The width of the crescent represents the difference in radii at the points where the circles intersect.
Calculating the Radii
- The larger circle's radius can be derived from the width at BD:
R = (Width at BD) / 2 = 9 cm / 2 = 4.5 cm.
- The smaller circle's radius can be derived from the width at EF:
r = (Width at EF) / 2 = 5 cm / 2 = 2.5 cm.
Area Calculation
- The area of the larger circle (A1) is given by the formula:
A1 = πR^2 = π(4.5)^2 = 20.25π cm².
- The area of the smaller circle (A2) is given by the formula:
A2 = πr^2 = π(2.5)^2 = 6.25π cm².
Area of the Shaded Region
- The area of the shaded region (A) is calculated by subtracting the area of the smaller circle from the area of the larger circle:
A = A1 - A2 = 20.25π - 6.25π = 14π cm².
Thus, the area of the shaded region is 14π cm² or approximately 43.98 cm² when calculated numerically.
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A crescent is formed by two circles which touch at A. C is the centre of the larger circle. The width of the crescent at BD is 9 cm and at EF is 5 cm. Find area of the shaded region.?
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