The parabola divides the area of the circle in two parts. The area of the smaller part is:
- A
- B
- C
- D
The parabola divides the area of the circle in two parts. The area of the smaller part is:
Correct answer:A
Standard Method
Given: The curves are and .
Find: The area of the smaller part into which the parabola divides the circle.
First find the points of intersection. Put from the parabola into the circle:
Let . Then
Solving,
Since , we take , so . Hence the curves intersect at and .
By symmetry about the -axis, if is the upper half of the smaller region, then the required area is .
From the given working,
Evaluating,
Substituting the limits,
Therefore,
Using inverse-trigonometric identity
Use the identity
So,
Hence,
Now,
Therefore,
So the correct option is A.
Students may forget to find the intersection points first. Without locating and , the limits of integration are chosen incorrectly. Always solve the two curve equations together before setting up the area.
A common error is taking only one half of the symmetric region and not doubling it. The figure is symmetric about the -axis, so after computing the upper half area , the required area is .
Students often confuse the circle contribution with the whole sector or the wrong segment. The integral from to corresponds only to the upper circular arc part of the smaller region, not the entire right half of the circle.
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