TS EAMCET · Maths · Quadratic Equation
If \(\alpha_1, \beta_1, \gamma_1, \delta_1\) are the roots of the equation \(a x^4+b x^3+c x^2+d x+e=0\) and \(\alpha_2, \beta_2, \gamma_2, \delta_2\) are the roots of the equation \(e x^4+d x^3+c x^2+b x+a=0\) such that \(0 < \alpha_1 < \beta_1 < \gamma_1 < \delta_1, 0 < \alpha_2 < \beta_2 < \gamma_2 < \delta_2\) \(\alpha_1-\delta_2=2=\beta_1-\gamma_2 ; \gamma_1-\beta_2=\delta_1-\alpha_2=4\), then \(a+b+c+d+e=\)
- A 10
- B 12
- C 6
- D 8
Answer & Solution
Correct Answer
(D) 8
Step-by-step Solution
Detailed explanation
Given, \(\alpha_1, \beta_1, \gamma_1, \delta_1\) are the roots of equation \(a x^4+b x^3+c x^2+d x+e=0 \text { and }\) \(\alpha_2, \beta_2, \gamma_2, \delta_2\) are the roots of equation \(e x^4+d x^3+c x^2+b x+a=0\) \(\therefore\) Clearly,…
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