Let where and . Then is equal to _____.
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:26
Step-by-step solution
Standard Method
Given:
and
Find: .
First simplify the general term:
Hence
Now use standard exponential-series identities.
For the first sum,
because
Therefore
For the second sum, split it as
Now
So
Using
we get
Hence
Therefore
Comparing with
we obtain
So
Therefore, the required value is .
The solution is unrelated to this question, so the answer has been derived from the question expression itself.
Common mistakes
Treating as a single inseparable fraction and not splitting it into . This hides the standard series forms. Always simplify the term first.
Using the wrong identity for . Writing it directly as is incorrect because must be expanded as before summing.
Confusing the even-factorial and odd-factorial sums. and . Interchanging these gives the wrong sign of the term.
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