The area of the region is:
- A
- B
- C
- D
The area of the region is:
Correct answer:D
Standard Method
Given: The region is bounded by and for .
Find: The area of the given region and the correct option.
From the solution, the intersection point of is obtained from
Let . Then

The area is written as
Now split at , where the expression inside the modulus changes sign:
So,
Evaluating,
Substituting the limits,
Using and ,
Therefore, the area is . The correct option is D.
The solution marks option A, but its own working concludes , which matches option D.
Using the interval to directly without first finding where is wrong, because the bounded region starts from the intersection point . First solve .
Not splitting the modulus at is incorrect, because changes form there. Use on and on .
Taking the lower curve as throughout can give negative area on part of the interval. The absolute value must be handled carefully so that the integrand remains upper curve minus lower curve.
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