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Question
Let a,b,c be real and ax2+bx+c=0 has two real roots, α and β where α<−1 and β>1, then 1+ca+∣∣∣ba∣∣∣<0 is
Let a,b,c be real and ax2+bx+c=0 has two real roots, α and β where α<−1 and β>1, then 1+ca+∣∣∣ba∣∣∣<0 is
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Solution
The correct option is C <0
Since α<−1 and β>1
α+λ=−1 and β=1+μ{λ,μ>0}
Now, 1+ca+∣∣∣ba∣∣∣=1+αβ+|α+β|
=1+(−1−λ)(1+μ)+|−1−λ+1+μ|=1−1−μ−λ−λμ+|μ−λ|=−μ−λ−λμ+μ−λ(ifμ>λ)&=−μ−λ−λμ+λ−μ(ifλ>μ)
∴1+ca+∣∣∣ba∣∣∣=−2λ−λμor 2μ−λμ
in the both the cases 1+ca+∣∣ba∣∣<0 (∵λ,μ>0)
Since α<−1 and β>1
α+λ=−1 and β=1+μ{λ,μ>0}
Now, 1+ca+∣∣∣ba∣∣∣=1+αβ+|α+β|
=1+(−1−λ)(1+μ)+|−1−λ+1+μ|=1−1−μ−λ−λμ+|μ−λ|=−μ−λ−λμ+μ−λ(ifμ>λ)&=−μ−λ−λμ+λ−μ(ifλ>μ)
∴1+ca+∣∣∣ba∣∣∣=−2λ−λμor 2μ−λμ
in the both the cases 1+ca+∣∣ba∣∣<0 (∵λ,μ>0)
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