Let the area of the region be . Then is equal to:
- A
- B
- C
- D
Let the area of the region be . Then is equal to:
Correct answer:D
Standard Method
Given: The region is defined by
Find: The value of , where is the area of the region.
From the inequalities,
The solution notes that the parabola and the lines and do not intersect in real points, since
gives discriminant
and
gives
So the bounded region is determined effectively by the linear constraints together with the stated inequalities.
Using the split form of the absolute values,
becomes
and
means the region lies above
Explanation from the extracted solution
The extracted solution states that the area is computed by splitting the region into suitable -intervals and evaluating the bounded part using the upper curve
and the lower curve
Final conclusion
According to the solution, the simplified integral gives
Hence,
Therefore, the correct option is D.
Taking as only for all is incorrect because the absolute value must be split into separate cases for and . Use or the proper piecewise form.
Treating as a single straight line is wrong because represents two lines. The region must lie above for and above for .
Assuming the parabola always forms the boundary without checking intersections can lead to a wrong area. First test where the parabola meets the linear boundaries and determine which upper constraint is actually active in the bounded region.
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