Relation between Roots and Coefficients for Quadratic
If roots of t...
Question
If roots of the equation ax2+bx+c=0 are α,β, then the equation whose roots are 1+α1−α,1+β1−β, where α≠1,β≠1 is
A
a(x−1)2+b(x2−1)+c(x+1)2=0
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B
a(x2−1)+b(x−1)2+c(x+1)2=0
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C
a(x−1)2+b(x2−1)+c(x−1)=0
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D
a(x+1)2+b(x2−1)+c(x+1)=0
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Solution
The correct option is Aa(x−1)2+b(x2−1)+c(x+1)2=0 Let 1+α1−α=y ⇒1+α=y−αy⇒α=y−1y+1
Now, α is the root of the equation ax2+bx+c=0 ⇒aα2+bα+c=0 ⇒a(y−1y+1)2+b(y−1y+1)+c=0
Hence, the required equation is a(x−1)2+b(x2−1)+c(x+1)2=0