Relation between Roots and Coefficients for Quadratic
Let S be the ...
Question
Let S be the set of all non-zero real number α such that the quadratic equation αx2−x+α=0 has two distinct real roots x1 and x2 satisfying the inequality |x1−x2|<1. Which of the following interval is(are) a subset(s) of S?
A
(−12,−1√5)
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B
(−1√5,0)
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C
(0,1√5)
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D
(1√5,12)
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Solution
The correct options are A(−12,−1√5) D(1√5,12) Given quadratic equation aα2−x+α=0 has two distinct real roots x1 and x2 so, x1+x2=1αandx1.x2=1 Since |x1−x2|<1⇒√(x1+x2)2−4x1x2<1⇒√(1α)2−4<1⇒5α2−1>0⇒(√5α−1)(√5α+1)>0 α<−1√5andα>1√5....(i) As roots of the given quadratic equation are real so, ∴D>0⇒1−4α2>0⇒−12<α<12....(ii) From (i) and (ii) α∈(−12,−1√5)∪(1√5,12)