The sum of all possible values of , so that the coefficients of , and in the expansion of are in arithmetic progression is :
- A
- B
- C
- D
The sum of all possible values of , so that the coefficients of , and in the expansion of are in arithmetic progression is :
Correct answer:B
Standard Method
Given: We need the sum of all possible values of such that the coefficients of , and in are in arithmetic progression.
Find: The required sum of values of .
First expand
So we consider
Using the general term of , the relevant coefficients are:
Since these three coefficients are in arithmetic progression,
Therefore,
This gives
Solving the resulting cubic equation for yields
Therefore, the sum of all possible values of is . Hence, the correct option is B.
Quick Check from Small Values
Given: We need values of for which the coefficients of , and are in arithmetic progression.
Find: The sum of all such values.
For a quick test, try small natural values of . For ,
The coefficients of , and become
which are in arithmetic progression with common difference .
Thus works, and from the solution equation this is the only natural value. Therefore, the required sum is and the correct option is B.
Using the coefficient of as only is incorrect because the factor from also contributes. Include both parts: .
Using the coefficient of as only is incorrect because also contributes. The correct coefficient is .
Applying the arithmetic progression condition incorrectly is a conceptual error. For three terms in AP, the correct relation is , not .
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