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Question

Let α, β be the roots of ax2+bx+c=0. The roots of a(x2)2b(x2)(x3)+c(x3)2=0, where a0 are

A
2+3α2+α, 2+3β2+β
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B
2+α1+β, 2+β1+α
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C
2+α3+β, 3+α2+β
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D
2+3α1+α, 2+3β1+β
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Solution

The correct option is D 2+3α1+α, 2+3β1+β
ax2+bx+c=0(1)
a(x2)2b(x2)(x3)+c(x3)2=0
Putting x=3
a×12=0a=0
Which is not possible, so (x3) is not the root of the equation.
Let the roots of the equation a(x2)2b(x2)(x3)+c(x3)2=0 be x1,x2
Rewritting the equation as,
(x3)2[a{(x2x3)}2+b{(x2x3)}+c]=0(2)
Now, compairing from equation (1), we can say that,
(x12x13)=α(x22x23)=β
Solving anyone from them,
(x12x13)=αx13+1x13=α1+1x13=αx13=(11+α)x1=311+α=2+3α1+α
Similarly,
x2=2+3β1+β

Hence, the roots of the equation are,
2+3α1+α, 2+3β1+β

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