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

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

If alpha is a number satisfying the equation alpha^(2)+alpha+1=0 then alpha^(31) is equal to

If alpha,beta are two complex numbers such that |alpha|=1 , |beta|=1 , then the expression |(beta-alpha)/(1-baralphabeta)| equals

Let p and q be real number such that p ne 0 , p^(3) ne q and p^(3) ne -q . If alpha and beta non- zero complex number satifying alpha+ beta= -p and alpha^(3) + beta^(3) =q then a quadratic equation having (alpha)/(beta) and (beta) /(alpha) as its roots is :

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

The number of all possible 5-tuples alpha, alpha_(2), alpha_(3), alpha_(4), alpha_(5) such that alpha_(1) + alpha_(2) sinx + alpha_(3) cosx + alpha_(4) sin2x + alpha_(5) cos2x = 0 holds for all x 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 two different complex numbers with |beta|=1 , then |(beta-alpha)/(1-bar(alpha)beta)| is equal to

If alpha is an imaginary root of the equation z^(n)-1=0 then 1+alpha+alpha^(2)+….. .+alpha^(n-1)=

If alpha in[-pi, pi] such that sqrt((1-sin alpha)/(1+sin alpha))=sec alpha-tan alpha Then