The area enclosed by the curves and is equal to:
- A
- B
- C
- D
The area enclosed by the curves and is equal to:
Correct answer:C
Standard Method
Given: The curves are and .
Find: The area enclosed between these two curves.

Rewrite the curves in terms of :
so,
and from ,
Find the points of intersection by solving
Therefore,
Hence,
So the limits are from to .
To determine the upper curve, test a point such as . Then for the hyperbola,
and for the line,
Thus, lies above on .
Now the enclosed area is
Evaluate the two parts separately:
Also,
Therefore,
So the correct option is C.
Why top minus bottom matters
A common sign error is to write the integrand as
but on the interval the line is above the hyperbola. Hence the correct area expression must be
This ensures the area is positive and matches the required enclosed region.
Using the curves in the wrong order inside the integral. This gives a negative value because is above on . Always check which curve is upper before forming top minus bottom.
Finding the intersection points incorrectly after substitution. From , the quadratic is , not with altered signs. Expand carefully before factoring.
Evaluating the logarithmic integral incorrectly. For , the antiderivative is . Do not omit the modulus in the formula, even though on the given interval.
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