If α,β and γ are the roots of the equation x3+3x+2=0 , Find the equation whose roots are α−β)(α−β),(β−γ)(β−α),(γ−α)(γ−β.
- 9 - 216 = 0 \)
α,β and γ are the roots of the equation x3+3x+2=0 ________(1)
Sum of the roots α+β+γ=−ba=0→β+γ=−α
Sum of the roots taking two at a time αβ+βγ+γα=ca=3
Product of the roots αγβ=−da=−2→βγ=−2α
Let y=(α−β)(α−γ)
y=(α−β)(α−γ)=α2−αβ−α+β
= α2−α(β+γ)+βγβ+γ=−α,βγ=−2α
=α2−α(−α)+−2α
y=2α2−2α
yα=2α3−2 ___________(2)
2α3−yα−2=0
To generalize this equation
Replace α=x
2x3 -yx - 2 = 0 ____________(3)
To get the relation between x and y
Subtracting equation 3 from twice of equation 1
2x3 -xy - 2 - 2x3 - 6x - 4 = 0
-xy - 6x - 6 = 0
x(6 + y) = - 6
Now replace
x = −66+y in equation 1
-216(6+y)3 - 186+y + 2 = 0
(y+6)3−9(y+6)2−108=0
y3+9y2−216=0
Replace y by x ⇒ x3+9x3−216=0
x3+9x2−216=0 has roots
(α−β)(α−γ),(β−γ)(β−α),(γ−α)(γ−β)