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Question

The set of values of k for which the equation x4+(k1)x3+x2+(k1)x+1=0 has only 2 real roots which are negative is

A
(12,52]
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B
(,12]
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C
[52,)
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D
ϕ
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Solution

The correct option is C [52,)
x4+(k1)x3+x2+(k1)x+1=0 (1)
Dividing the equation by x2,
(x2+1x2)+(k1)(x+1x)+1=0
Assuming x+1x=t
We know that t(,2][2,)
(x+1x)2=t2(x2+1x2)=t22
Now,
t22+(k1)t+1=0t2+(k1)t1=0 (2)
Let the roots of the equation (2) is t1,t2
For every t2, there exist 2 positive values of x.
For every t2, there exist 2 negative values of x.
For every t(2,2), there exist no real roots for x.

For the equation (1) to have 2 negative real roots only, equation (2) should have a root t12 and t2(2,2)
So, the required conditions are,
(i) f(2)042(k1)10k52(ii) f(2)>04+2(k1)1>0k>12k[52,)

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