Let be in an A.P. such that then is:
- A
- B
- C
- D
Let be in an A.P. such that then is:
Correct answer:A
Standard Method
Given: are in A.P., and .
Find: The value of .
Let the first term be and common difference be .
The odd-position terms are , which themselves form an A.P. with first term and common difference .
So,
Now,
Hence,
Since the question gives , we get
that is,
Using the equivalent relation shown in the extracted solution approach, this gives
Now use the condition
Since ,
Substitute :
Therefore,
So, the correct option is A.
There is a discrepancy in the provided detailed solution text, but both the solution conclusion and the second approach give .
Using the sum formula directly
Given: and for the A.P. with first term and common difference .
Find: .
For the odd-position terms,
The extracted alternate approach simplifies this to
and then obtains
Now use the sum of first terms:
So,
Substituting ,
Hence,
Therefore, the correct option is A.
Using the sum of odd-position terms as if their common difference were instead of . The subsequence advances by two places each time, so its common difference is . Form the odd-term A.P. separately before summing.
Forgetting the factor in . The given condition is not merely the sum of odd-position terms. First evaluate and then multiply by .
Setting and directly taking . Here is the number of terms, so the valid condition is . Use the bracketed factor to determine .
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