If `x_(1),x_(2),x_(3),…,x_(n)` are the roots of the equation `x^(n)+ax+b=0`, the value of
`(x_(1)-x_(2))(x_(1)-x_(3))(x_(1)-x_(4))…….(x_(1)-x_(n))` is

If x_(1),x_(2),x_(3),.......x_(n) are the roots of x^(n)+ax+b=0, then the value of (x_(1)-x_(2))(x_(1)-x_(3))(x_(1)-x_(4))......(x_(1)x_(n)) is equal to

If x_(1),x_(2),x_(3),x_(n) are the roots of x^(n)+ax+b=0 then the value of (x_(1)-x_(2))(x_(1)-x_(3))(x_(1)-x_(4))......(x_(1)-x_(n)) is equal to

If x_(1),x_(2),x_(3) are the roots of x^(3)+ax^(2)+b=0, the value of x_(2)x_(3),x_(1)x_(3),x_(1),x_(2)]|

let x_(1),x_(2),x_(3) be the roots of equation x^(3)+3x+5=0 what is the value of the expression (x_(1)+(1)/(x_(1)))(x_(2)+(1)/(x_(2)))(x_(3)+(1)/(x_(3)))=?

Assume that x_(1) and x_(2) are roots of the equation 3x^(2)-ax+2a-1=0 then calculate x_(1)^(3)+x_(2)^(3)

If x_(1),x_(2),x_(3),"……" are in A.P., then the value of 1/(x_(1)x_(2))+1/(x_(2)x_(3))+1/(x_(3)x_(4))+"……"1/(x_(n-1)x_(n)) is :

Let x_(1),x_(2), be the roots of the quadratic equation x^(2)+ax+b=0 and x_(3),x_(4), be the roots of the quadratic equation x^(2)-ax+b-2=0. If (1)/(x_(1))+(1)/(x_(2))+(1)/(x_(3))+(1)/(x_(4))=(5)/(6) and x_(1)x_(2)x_(3)x_(4)=24 then find the value of a .

If the roots x_(1),x_(2),x_(3) of the equation x^(3)+ax+a=0 (where a in R-{0} ) satisfy (x_(1)^(2))/(x_(2))+(x_(2)^(2))/(x_(3))+(x_(3)^(2))/(x_(1))=-8 , then find the value of a and the roots of the given cubic equation.