If `alpha` is a complex constant such that `a z^2+z+ alpha=0` has a real root, then

If alpha is a complex number such that alpha^(2) - alpha + 1 = 0 , then alpha^(2011) =

If alpha is a complex number such that alpha^(2)+alpha+1=0 then alpha^(31) is

If z is a complex number such that z=-bar(z) then

Let alpha and beta be two distinct complex numbers, such that abs(alpha)=abs(beta) . If real part of alpha is positive and imaginary part of beta is negative, then the complex number (alpha+beta)//(alpha-beta) may be

If z is a complex number such that |z|=1, z ne 1 , then the real part of |(z-1)/(z+1)| is

Let alpha,beta be real and z be a complex number. If z^(2)+alphaz+beta=0 has two distinct roots on the line Re. z=1 , then it is necessary that

Let a, b, c be real. If a x^(2)+b x+c=0 has two real roots alpha and beta such that alpha lt -1 and beta gt 1 , then 1+(c)/(a)+|(b)/(a)| is

If alpha, beta and gamma are angles such that tan alpha+tan beta+tan gamma=tan alpha . tan beta . tan gamma and x=cos alpha+i sin alpha, y=cos beta+i sin beta and z=cos gamma+i sin gamma , then x y z=

If alpha,beta are complex cube roots of unity and x=a+b , y=aalpha+bbeta , z=abeta+balpha , then the value of (x^(3)+y^(3)+z^(3))/(xyz) is: