Let be the term of an A.P. If for some , , , and , then
- A
- B
- C
- D
Let be the term of an A.P. If for some , , , and , then
Correct answer:C
Standard Method
Given: The term of the A.P. is .
We are given
Find: The value of .
Using the term formula,
and
From the sum of first terms,
So,
Now subtract the two term equations:
Hence,
So,
Substituting in the sum equation,
that is,
Hence,
Now,
Using , this becomes
So,
Therefore,
Upon solving with the given values of and , we get .
Substituting ,
Therefore, the correct option is C.
Using the given relations
The solution states that the correct option is C and concludes that . Using that conclusion in the required expression gives the final value as .
Therefore, the required value is .
Using the wrong sum formula for the A.P. The sum from to must be written as , not by replacing the last term incorrectly. Always identify the first term and the term carefully before applying the formula.
Writing the number of terms from to as instead of . Since both endpoints are included, the count is . This changes the entire value of the required sum.
Using an incorrect expression for . The term formula gives , not . Always substitute into exactly.
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