Let be the -th term of an A.P. If , , and , then is equal to:
- A
- B
- C
- D
Let be the -th term of an A.P. If , , and , then is equal to:
Correct answer:C
Standard Method
Given: , , and for an A.P.
Find: .
Use the A.P. formulas
and
From ,
From ,
so
and hence
Subtract (2) from (1):
Then from (2),
Now use :
Solving the quadratic,
The feasible value is
Therefore,
The correct option is C.
Using sum and term equations carefully
Given: , , and .
Find: the value of .
The solution contains two approaches. In the first approach, the step from
to is inconsistent. Dividing correctly gives
The second approach uses the correct algebra, and that is the one followed.
Using the general term,
Using the sum of first seven terms,
Therefore,
Now solve the pair:
Subtracting,
Then
Substitute in the sum formula:
Factor or solve the quadratic to get the positive value
Hence,
Therefore, the value of is , so the correct option is C.
Using and simplifying to is wrong. After dividing by , we get , so the correct equation is . Always divide carefully before reducing.
Confusing with the first term leads to setting the wrong target. Here, first find and , then determine the specific value of from , and only after that compute the required term .
Taking both roots of the quadratic for is incorrect. Since is the number of terms in a sum, it must be a positive integer. Discard the negative value and keep the feasible root only.
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