If , gcd() = , then is equal to:
JEE Mathematics 2025 Question with Solution
Answer
Correct answer:2035
Step-by-step solution
Standard Method
Given:
Find: when and gcd() = .
Let . Then the sum runs over odd values of , so
Now use integration:
From the binomial expansion,
Hence,
Therefore,
Integrating,
So,
Substituting the limits,
Thus, and . Therefore,
So the required answer is .
Termwise Verification
Given:
Find: .
Evaluate each term:
Therefore,
Taking denominator ,
So and , giving
Therefore, the required answer is .
Common mistakes
Writing incorrectly when converting the sum into an integral. Since , the integrand must be , not . Use the power of carefully before integrating.
Forgetting that the summation contains only odd binomial terms. Using the full expansion of directly gives both even and odd powers. Instead, isolate odd terms through .
Making a sign error while integrating . The antiderivative is , so after subtraction the combined expression becomes a sum inside the bracket. Track the negative sign properly.
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