If the area of the region is , , then is equal to:
- A
- B
- C
- D
If the area of the region is , , then is equal to:
Correct answer:C
Standard Method
Given: The region is .
Find: The value of if the area is written in the form obtained from the integration.
We first determine where the region exists. From
we get
So the relevant interval begins at .
Now split at because the sign of changes there.
For ,
so the vertical strip length is
Hence
Evaluating,
For ,
The upper bound becomes in the extracted solution, so the strip length is
Thus
Evaluating,
Therefore total area is
Now compare with the form used in the extracted solution,
So,
Hence,
Therefore, the correct option is C.
Note: The given question statement and the solution statement differ in form; the solution working clearly concludes that the required value is , which matches option C.
Treating as only on the entire interval is incorrect because the sign changes at . Split the integral at the sign-change point before removing the absolute value.
Starting integration from is wrong. First use to find where the region actually exists, which gives .
Using the same upper and lower curves throughout the domain leads to an incorrect area. After analyzing the inequalities, identify the correct vertical strip length separately on each interval.
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