If then is equal to _____ :
JEE Mathematics 2025 Question with Solution
Answer
Correct answer:64
Step-by-step solution
Standard Method
Given:
Find:
From the solution, the integral is first written as
and integrated directly as
Taking common,
The provided solution then states that, by matching the asymptotic form with
we obtain
Therefore, the required value of is .
Note: The working shown in the solution is internally inconsistent because the displayed integral expression itself does not yield a finite constant limit in the stated form. However, both solution approaches explicitly conclude that the final answer is , and that is the extracted answer.
Common mistakes
Treating as a standard finite limit without checking growth as is incorrect, because the integrand increases exponentially with . First examine whether any normalization is present before applying limit formulas.
After integrating, dropping the term in without tracking the overall magnitude can lead to a wrong conclusion about convergence. Simplifying dominant terms is valid only after confirming the scaled expression being analyzed.
Using Laplace’s method mechanically is a mistake here if the original problem statement has no explicit normalizing factor. Laplace asymptotics describe growth, but they do not by themselves convert a divergent expression into a finite constant.
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