If `alpha!= beta` but `alpha^2 = 5alpha-3, beta^2 = 5beta - 3`, then find the equation whose roots are `alpha/beta and beta/alpha`.

If alpha!=beta but alpha^(2)=5 alpha-3,beta^(2)=5 beta-3, then find the equation whose roots are (alpha)/(beta) and (beta)/(alpha)

If alpha!=beta and alpha^(2)=5 alpha-3 and beta^(2)=5 beta-3. find the equation whose roots are alpha/ beta and beta/ alpha .

If alpha1=beta but alpha^(2)=2 alpha-3;beta^(2)=2 beta-3 then the equation whose roots are (alpha)/(beta) and (beta)/(alpha) is

If alpha ne beta" but "alpha^(2)=5 alpha-3" and "beta^(2)= 5 beta-3 then the equation whose roots are (alpha)/(beta)" and "(beta)/(alpha) is

If alpha!=beta and alpha^(2)=5 alpha-3,beta^(2)=5 beta-3 form the quadratic equation whose roots are (alpha)/(beta),(beta)/(alpha)

If alpha ne beta and alpha^(2) = 5 alpha - 3, beta^(2) = 5 beta - 3 , then the equation having alpha//beta and beta/alpha as its roots, 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 ne beta but alpha^(2)= 5 alpha - 3 and beta ^(2)= 5 beta -3 then the equation having alpha // beta and beta // alpha as its roots is :

If alpha ne beta but alpha^(2)= 5 alpha - 3 and beta ^(2)= 5 beta -3 then the equation having alpha // beta and beta // alpha as its roots is :