The area of the region enclosed by the curves and is:
- A
- B
- C
- D
The area of the region enclosed by the curves and is:
Correct answer:C
Standard Method
Given: The curves are and .
Find: The area enclosed by these two curves.
First find the points of intersection. From , substitute :
Expanding:
So,
Factorizing:
Further,
Hence the real intersection points occur at and .
On the interval , the upper curve is and the lower curve is . Therefore, the required area is
Detailed Evaluation
Evaluate the two integrals separately:
For the first integral, let
Then
and so
Thus,
Evaluating from to gives
Shifted Parabola Shortcut
Using the shifted form shown in the second approach, write and rewrite the second curve relative to the shifted axis. Then the enclosed region matches the standard parabola area form, giving
With and ,
Therefore, the correct option is C.
Continuing the standard evaluation for completeness, the second integral is
Hence,
Therefore, the area of the enclosed region is , so the correct option is C.
Taking as the upper curve on is wrong because the enclosed region here lies above the parabola and below the positive branch. Always identify the actual top and bottom curves before integrating.
Using incorrect limits of integration without first finding the intersection points is wrong because the area must be computed only over the interval where the two curves bound a closed region. First solve the intersection equations to get and .
Squaring or expanding incorrectly in leads to wrong intersection points and hence a wrong area. Expand carefully or keep the expression in factored form as long as possible before simplifying.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.