Find k from a power-sum condition: If α, β are roots of x^2 − 8x + k = 0 and α^2 + β^2 = 40, find k.
Aptitude
Quadratic Equation
Difficulty: Easy
Choose an option
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A12
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B14
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C10
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D16
Answer
Correct Answer: 12
Explanation
Introduction / Context:Power sums of roots can be expressed via elementary symmetric sums using identities. Given α + β and αβ from the quadratic, compute α^2 + β^2 and match it to the stated value to solve for k.Given Data / Assumptions:
- Equation: x^2 − 8x + k = 0.
- α + β = 8, αβ = k.
- α^2 + β^2 = 40.
Concept / Approach:Use α^2 + β^2 = (α + β)^2 − 2αβ = 8^2 − 2k. Set this equal to 40 and solve for k.Step-by-Step Solution:
α^2 + β^2 = 64 − 2k.Set 64 − 2k = 40 ⇒ 2k = 24 ⇒ k = 12.Verification / Alternative check:With k = 12, the quadratic is x^2 − 8x + 12 = 0 with roots 2 and 6. Then α^2 + β^2 = 4 + 36 = 40, confirming.
Why Other Options Are Wrong:
- 14, 10, 16: Each gives α^2 + β^2 values different from 40 when substituted into 64 − 2k.
Common Pitfalls:Mixing up the identity and writing 64 + 2k by mistake. Always remember α^2 + β^2 = (α + β)^2 − 2αβ.
Final Answer:
12