If `alpha and beta ` are the roots of `x^(2) + qx + 1 = 0` and `gamma, delta ` the roots of `x^(2) + qx + 1 = 0`, then the value of
`(alpha - gamma ) (beta - gamma ) (a + delta ) beta + delta)` is :

If alpha,beta are the roots of x^(2)-3 x+5=0 and gamma, delta are the roots of x^(2)+5 x-3=0 , then the equation whose roots are alpha gamma+beta delta and alpha delta+beta gamma is

If alpha and beta are the roots of x^(2)+x+1=0 , then alpha^(16)+beta^(16)=

If alpha and beta the roots of x^(2) + px + q = 0 and alpha^(4), beta^(4) are the roots of x^(2) - rx + s = 0 , then the equation x^(2) - 4qx + 2q^(1) - r = 0 has always :

If alpha,beta be the roots of x^(2)+x+2=0 and gamma, delta be the roots of x^(2)+3 x+4=0 then (alpha+gamma)(alpha+delta)(beta+gamma)(beta+delta)=

If alpha,beta and gamma are roots of x^(3) -2x+1=0,then the value of Sigma((1)/(alpha+beta-gamma)) is

Let alpha, beta be the roots of x^(2) -x + p = 0 and gamma , delta be the roots of x^(2) - 4x + q = 0 . If alpha, beta, gamma , delta are in G.P., then the integral value sof p and q respectively, are :

If alpha,beta are the roots of x^2+p x+q=0a n dgamma,delta are the roots of x^2+r x+s=0, evaluate (alpha-gamma)(alpha-delta)(beta-gamma)(beta-delta) in lterms of p ,q ,r ,a n dsdot Deduce the condition that the equation has a common root.

Let alpha, beta be the roots of the equation x^(2) - px + r = 0 and (alpha)/(2) , 2 beta be the roots of the equation x^(2) - qx + r = 0 . Then the value of r is :

If alpha and beta are roots of the equation x^(2) + x + 1 = 0, then alpha^(2) + beta^(2) is

If alpha and beta are the roots of the equation x^(2) - p(x + 1) - q = 0 , then the value of : (alpha^(2) + 2 alpha + 1)/(alpha^(2)+ 2 alpha + q) + (beta^(2) + 2 beta + 1)/(beta^(2) + 2 beta + q) is :