. . Find .
- A
- B
- C
- D
. . Find .
Correct answer:B
Standard Method
Given:
Also, and .
Find: .
Since is a quadratic expression in , the sequence is an arithmetic progression.
Using
we get
Now,
so
Also,
and
Given , therefore
Substitute into :
Hence,
Therefore,
So, the correct option is B.
Use AP parameters directly
Given:
with and .
Find: .
For
the terms form an AP with first term
and common difference
So,
Also,
Given ,
Substituting into gives
Hence,
So the correct option is B.
Assuming directly from the given sum. This is wrong because the expression is for , not for the term . First use .
Using the wrong expression for by forgetting to subtract carefully. Expanding incorrectly changes the coefficient of . Write the subtraction step fully before simplifying.
Applying as . This is wrong because , so both terms inside the bracket must be multiplied by .
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