Relation between Roots and Coefficients for Quadratic
If α, β are t...
Question
If α,β are the roots of 2x2+3x−1=0, then the equation whose roots are 1α2,1β2 is
A
x2−3x−2=0
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B
x2−13x+4=0
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C
x2+5x+4=0
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D
x2−5x+4=0
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Solution
The correct option is Bx2−13x+4=0 Given equation 2x2+3x−1=0 has roots as α,β Let y=1x2 ⇒x=1√y Replace x by 1√y in the given equation, we get 2y+3√y−1=0⇒(2y−1)=−3√y Squaring on both sides, ⇒(2y−1)2=9y⇒4y2+1−4y=9y⇒y2−13y+4=0 So, the equation whose roots are 1α2,1β2 is x2−13x+4=0