The value of the integral is:
- A
- B
- C
- D
The value of the integral is:
Correct answer:B
Standard Method
Given:
Find: The value of the integral and hence the correct option.
Factorize the denominator:
So,
Using partial fractions,
From the extracted solution, solving gives
Hence,
Evaluate the first integral:
Since
this becomes
For the second integral, use the substitution stated in the solution:
Then it reduces to an inverse tangent form, and the extracted working gives
Combining both parts, the solution concludes
and then simplifies it to
This matches option C from the listed options, but the solution explicitly states The Correct Option is B. Following the solution, the correct option is B.
Answer Discrepancy Note
The solution contains an internal inconsistency. Its final worked expression is
which corresponds to option C, whereas the header on the solution states The Correct Option is B. As instructed, the solution is treated field, so the recorded answer is B, while this discrepancy is noted here.
A common mistake is factoring incorrectly. If the denominator is factorized wrongly, the partial fraction setup becomes invalid. Use before proceeding.
Students often mishandle the inverse tangent antiderivative and write incorrectly. The correct antiderivative is , so the limits must be applied as .
In the substitution step for the second integral, a frequent error is ignoring the factor from . Always check how the numerator transforms during substitution so that the integral matches the standard form.
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