If alpha, beta are roots of the equation ax2 + 3x + 2 = 0 (a< 0), thenAlpha square by beta +beta square by alpha greater than

If alpha, beta are roots of the equation ax2 + 3x + 2 = 0 (a< 0), then

1.	If alpha, beta are roots of the equation ax2 + 3x + 2 = 0 (a< 0), thenAlpha square by beta +beta square by alpha greater than
Answer» Since a << 0, therefore discriminant D=9−8a>0D=9-8a>0. So, αandβαandβ are real. We have, α+β=−3aandαβ=2aα+β=-3aandαβ=2a ∴ α2β+β2α=α3+β3αβ=(α+β)3−3α(α+β)αβ∴ α2β+β2α=α3+β3αβ=(α+β)3-3α(α+β)αβ ⇒ α2β+β2α=(α+β)3αβ−3(α+β)=−272a2+9a<0 [∵a<0]

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If alpha, beta are roots of the equation ax2 + 3x + 2 = 0 (a< 0), thenAlpha square by beta +beta square by alpha greater than

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