Let `a` and `b` are non-zero real numbers and `alpha^3+beta^3=-a, alpha beta=b` then the quadratic equation whose roots are `alpha^2/beta, beta^2/alpha` is

if p and q are non zero real numnbers and alpha^(3)+beta^(3)=-p alpha beta=q then a quadratic equation whose roots are (alpha^(2))/(beta),(beta^(2))/(alpha) is

IF alpha + beta =- 2 and alpha ^3 + beta ^3 =- 56 , then the quadratic equation whose roots are alpha and beta is

IF alpha^2=5alpha-6,beta^2=5beta-6, alpha ne beta then the equation whose roots alpha/beta,beta/alpha is……

If alpha+beta=5 and alpha^(3) +beta^(3)=35 , find the quadratic equation whose roots are alpha and beta .

If alpha+beta=5 and alpha^(3) +beta^(3)=35 , find the quadratic equation whose roots are alpha and beta .

If alpha + beta = 5 and alpha^(3) + beta ^(3) = 35 , find the quadratic equation whose roots are alpha and beta .

If alpha + beta = 8 and alpha^(2) + beta^(2) = 34 , find the quadratic equation whose roots are alpha and beta .

Q. Let p and q real number such that p!= 0 , p^2!=q and p^2!=-q . if alpha and beta are non-zero complex number satisfying alpha+beta=-p and alpha^3+beta^3=q , then a quadratic equation having alpha/beta and beta/alpha as its roots is