The roots of the quadratic equation are the and terms of an arithmetic progression with common difference . If the sum of the first terms of this arithmetic progression is , then is equal to:
JEE Mathematics 2025 Question with Solution
Answer
Correct answer:474
Step-by-step solution
Standard Method
Given: The roots of are the and terms of an A.P. with common difference . Also, the sum of the first terms is .
Find: .
Using the sum formula of an A.P.:
So,
Substitute :
Now the and terms are:
Since these are the roots of , by Vieta's formulas:
So,
And,
Therefore,
Therefore, the required value is .
Term-by-Term Evaluation
Given: The required roots are the and terms of an A.P. with and .
Find: .
Let the first term be . Then
Substituting :
Hence,
Now for :
So,
Also,
Thus,
The correct numerical value is .
The second provided approach contains an internal inconsistency in intermediate evaluation, but it also concludes with . The consistent calculation above confirms the value.
Common mistakes
Using the wrong Vieta relation for . The sum of roots is and the product is , not and directly. Always divide by the coefficient of first.
Taking the term as instead of . In an A.P., , so careful indexing is essential.
Making an algebra slip while using . If this is simplified incorrectly, the first term becomes wrong, and all later values change. Reduce the sum equation step by step before substituting .
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