If α,β are the roots of the quadratic equation x2+3x+6=0 , then find the equation whose roots are 1+α1−α, 1+β1−β
Let x is a root of the equation x2+3x+6=0 . We want to find the equation whose roots are 1+x1−x (Because the roots are 1+α1−α, 1+β1−β)
Let it be y.
y1 = 1+x1−x
y−1y+1 = 1+x−(1−x)1+x+1−x
= x
Substitute y−1y+1 in the equation
x2+3x+6 to get the equation whose root is y.
⇒(y−1y+1)2+3(y−1y+1)+6=0⇒(y−1)2(y+1)2+3(y−1)(y+1)(y+1)2+6(y+1)2(y+1)2=0⇒y2−2y+1+3(y2−1)+6(y2+2y+1)=010y2+10y+4=0 or5y2+5y+2=0
(Replace y by x, because change of variable does not affect the equation)
We can solve this by finding the sum of the roots and product of the roots also.