In an arithmetic progression, if and , then is equal to:
- A
- B
- C
- D
In an arithmetic progression, if and , then is equal to:
Correct answer:C
Standard Method
Given: and for an arithmetic progression.
Find: .
Use the sum formula of an arithmetic progression:
From ,
so,
From ,
so,
Subtracting,
Substitute into :
Now,
Also,
Therefore,
The correct option is C. The solution also notes a discrepancy with the listed answer key, but the worked calculation gives .
Using difference of sums directly
Given: and .
Find: .
First find and from the given sum equations:
Hence,
Now interpret
as the sum of terms from the to the term. Using the sum formula values obtained above,
and
So,
Thus, the required value is , so the correct option is C.
Using the formula for the term instead of the sum formula is incorrect because the given quantities are and , which are sums. Start with .
Taking the provided answer key as final without checking the algebra is a mistake. Here the worked solution gives , so the calculation must be trusted over the mismatched key.
Computing as if it were the difference of the and terms is wrong. It represents the difference of two partial sums, that is, the sum from the term to the term.
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