If `alpha, beta and gamma` are three consecutive terms of a non-contant GP such that the equations `ax^(2)+2beta+gamma=0and x^(2)+x-1=0` have a common root, then, `alpha(beta+gamma)` is equal to

If alpha, beta and gamma are three consecutive terms of a non-constant G.P. such that the equations ax^(2) + 2beta x + gamma = 0 and x^(2) + x - 1= 0 have a common root, then alpha (beta + gamma) is equal to

If alpha, beta and gamma are three consecutive terms of a non-constant G.P. such that the equations ax^(2) + 2beta x + gamma = 0 and x^(2) + x - 1= 0 have a common root, then alpha (beta + gamma) is equal to

If alpha, beta and gamma are three consecutive terms of a non-constant G.P. such that the equations alphax^(2) + 2beta x + gamma = 0 and x^(2) + x - 1= 0 have a common root, then alpha (beta + gamma) is equal to

if alpha,beta,gamma are non-constant terms in G.P.and equations alpha x^(2)+2 beta x+gamma=0 and x^(2)+x-1=0 has a common root then (gamma-alpha)*beta is

If alpha beta gamma are roots of x^(3)+x^(2)-5x-1=0 then alpha + beta + gamma is equal to

If alpha beta gamma are the roots of x^3+x^2-5x-1=0 then alpha+beta+gamma is equal to

If alpha , beta, gamma are the roots of x^3+x^2-5x-1=0 then alpha+beta+gamma is equal to

If alpha ,beta ,gamma are roots of x^(3)+x^(2)-5x-1=0 then [alpha] + [beta] +[ gamma ] is equal to

If alpha, beta, gamma are the roots of the equation x^(3)+ax^(2)+bx+c=0 , then alpha^(-1)+beta^(-1)+gamma^(-1) is equal to

If alpha , beta , gamma are the roots of x^3 -3x +1=0 then the equation whose roots are alpha - (1)/( beta gamma) , beta - (1)/( gamma alpha ) , gamma - (1)/( alpha beta ) is