The area of the region is
- A
- B
- C
- D
The area of the region is
Correct answer:B
Standard Method
Given: The region is defined by and .
Find: The area of the region.
From
we get
and
So the region is bounded by from below and from above, with .
Find the intersection points by solving
For ,
Hence, or .
Therefore, the required area is
Evaluate the integral:
Substituting the limits,
Therefore, the area of the region is . The correct option is B.
Inequality to Boundary Conversion
Given:
Find: The area enclosed by the corresponding curves.
Use the absolute value inequality carefully:
This gives two conditions:
Together with , the strip becomes
Now determine where the two boundary curves meet:
Squaring,
So the intersections occur at and , corresponding to points and .
Hence,
Therefore, the correct option is B.
A common mistake is to treat as only and miss the condition coming from . This gives an incomplete region. Always rewrite the absolute value inequality as a double inequality first.
Students often choose the wrong upper and lower curves. Here is the upper curve and is the lower curve on the interval of intersection. Reversing them makes the area negative.
Another mistake is solving incorrectly by squaring too early without noting . First note the domain, then solve carefully to get both intersections and .
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