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Question

Let r,s,t and u be the roots of the equation x4+Ax3+Bx2+Cx+D=0;
A,B,C,DR. If rs=tu, then A2D is equal to

A
BC
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B
B2
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C
C2
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D
0
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Solution

The correct option is C C2
Since, r,s,t and u are roots of the equation x4+Ax3+Bx2+Cx+D=0
We know that,
r+s+t+u=A(1)
(r+s)(t+u)+rs+tu=B(2)
rs(t+u)+tu(r+s)=C(3)
rstu=D(4)(rs)2=D(5)
[rs=tu]

Using equation (3),
rs(r+s+t+u)=C
Using equation (1),
rs=CA
Using equation (5),
C2A2=DA2D=C2

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