If `A(alpha, (1)/(alpha)), B(beta, (1)/(beta)), C(gamma,(1)/(gamma))` be the vertices of a `Delta ABC`, where `alpha, beta` are the roots of `x^(2)-6ax+2=0, beta, gamma` are the roots of `x^(2)-6bx+3=0` and `gamma, alpha` are the roots of `x^(2)-6cx + 6 =0`, a, b, c being positive.
The value of `a+b+c` is

If A(alpha, (1)/(alpha)), B(beta, (1)/(beta)), C(gamma,(1)/(gamma)) be the vertices of a Delta ABC , where alpha, beta are the roots of x^(2)-6ax+2=0, beta, gamma are the roots of x^(2)-6bx+3=0 and gamma, alpha are the roots of x^(2)-6cx + 6 =0 , a, b, c being positive. The coordinates of centroid of Delta ABC is

If A(alpha, (1)/(alpha)), B(beta, (1)/(beta)), C(gamma,(1)/(gamma)) be the vertices of a Delta ABC , where alpha, beta are the roots of x^(2)-6ax+2=0, beta, gamma are the roots of x^(2)-6bx+3=0 and gamma, alpha are the roots of x^(2)-6cx + 6 =0 , a, b, c being positive. The coordinates of orthocentre of Delta ABC is

Let A(alpha, 1/(alpha)),B(beta,1/(beta)),C(gamma,1/(gamma)) be the vertices of a DeltaABC where alpha, beta are the roots of the equation x^(2)-6p_(1)x+2=0, beta, gamma are the roots of the equation x^(2)-6p_(2)x+3=0 and gamma, alpha are the roots of the equation x^(2)-6p_(3)x+6=0, p_(1),p_(2),p_(3) being positive. Then the coordinates of the cenroid of DeltaABC is

If alpha,beta are the roots of x^(2)+ax-b=0 and gamma,delta are the roots of x^(2)+ax+b=0 then (alpha-gamma)(alpha-delta)(beta-gamma)(beta-delta)=

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

Suppose alpha, beta are roots of ax^(2)+bx+c=0 and gamma, delta are roots of Ax^(2)+Bx+C=0 . If alpha,beta,gamma,delta are in GP, then common ratio of GP is

If alpha,beta,gamma are the roots of x^(3)+ax^(2)+bx+c=0 then Sigma((alpha)/(beta)+(beta)/(alpha))=