If `tan alpha` and `tan beta` are two solutions of `x^(2)-px +q = 0, cot alpha` and `cot beta` are the roots of `x^(2)- rx +s = 0` then the value of rs is equal to

If alpha , beta are roots x^(2) + px + q = 0 then value of alpha^(3) + beta^(3) is

If tan alpha tan beta are the roots of the equation x^(2)+px+q=0(p!=0) then

If alpha and beta (alpha gt beta) are the roots of x^(2) + kx - 1 =0 , then find the value of tan^(-1) alpha - tan^(-1) beta

If tanalpha,tanbeta are the roots of x^(2)+px+q=0(pneq) then tan(alpha+beta)=?

If alpha and beta are the roots of x^(2) +px+q=0 and gamma , delta are the roots of x^(2) +rx+x=0 , then evaluate (alpha - gamma ) ( beta - gamma ) (alpha - delta ) ( beta - delta) in terms of p,q,r and s .

If alpha and beta are the roots of the equation x^(2) + px + q =0, then what is alpha ^(2) + beta ^(2) equal to ?