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Question

The roots of the equation x4+x3+2x4=0 are α,β,γ and δ, such that |α||β||γ||δ|. If the sum of two roots is zero, then which of the following is/are correct?

A
Two real roots and two imaginary roots.
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B
α,β,γ are in G.P.
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C
α,β,δ are in G.P.
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D
α,γ,δ are in G.P.
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Solution

The correct options are
A Two real roots and two imaginary roots.
C α,β,δ are in G.P.

D α,γ,δ are in G.P.
x4+x3+2x4=0
α+β+γ+δ=1
Let α+β=0
γ+δ=1
Quadratic factor corresponding to α,β
x20.x+p=x2+p
Corresponding to γ,δ
x2+x+q

x4+x3+2x4=(x2+p)(x2+x+q)x4+x3+2x4=x4+x3+x2(p+q)+px+pq
Comparing the coefficients of x2 and x, we get
p=2, q=2
So,
(x2+2)(x2+x2)=0(x1)(x+2)(x2+2)=0x=1,2,±i2

α=1,β=i2,γ=i2,δ=2|α||β||γ||δ|
α,β,δ are in G.P.
α,γ,δ are in G.P.

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