If , then is equal to :
- A
- B
- C
- D
If , then is equal to :
Correct answer:C
Standard Method
Given:
Find:
Let
Then
Using the expression from the solution,
Therefore,
Now use partial fractions:
So,
This telescopes, and on simplifying we get
Taking the limit as ,
Therefore, the correct option is C.
Telescoping Observation
Given:
Find:
From the extracted working,
Hence
The summand can be viewed in telescoping form, so the series collapses after cancellation. The simplified finite sum is
Now compare leading terms in numerator and denominator.
Thus,
Therefore, the value of the limit is .
Computing incorrectly from . This is wrong because the entire series depends on the exact form of . First write and carefully, then subtract before taking the reciprocal.
Missing the partial fraction or telescoping structure in . This is wrong because direct summation is not feasible. Rewrite the term into simpler fractions so cancellation becomes visible.
Taking the limit termwise too early. This is wrong because must be found from the simplified finite sum, not by replacing with infinity before summing.
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