If `alpha` and `beta` are different complex numbers with `|beta|=1`, then find `|(beta -alpha)/(1-baralphabeta)|`

If alpha and beta are different complex numbers with absbeta=1 . then find abs((beta-alpha)/(1-baralphabeta))

If alpha and beta are complementary angles to each other, the find the value of (1-sin^2 alpha)(1-cos^2 alpha)(1+cot^2 beta)(1+tan^2 beta)

If alpha and beta are the complex cube roots of 1 show that, alpha^(4)+beta^(4)+alpha^(-1).beta^(-1)=0.

If alpha and beta are complementary angles, then show that cot beta+cos beta= (cos beta)/(cos alpha) (1+sin beta) .

If alpha,beta,gamma,delta are four complex numbers such that gamma/delta is real and alpha delta - beta gamma !=0 then z = (alpha + beta t)/(gamma+ deltat) where t is a rational number, then it represents:

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

find the centre and radius of the circle formed by all the points represented by z=x+iy satisfying the relation abs((z-alpha)/(z-beta))=k(k ne1) where alpha and beta are constant complex numbers given by alpha=alpha_1+Ialpha_2,beta=beta+ibeta_2

If alpha and beta are the distinct roots of the equation x^2-p(x+1)-b=0 , then E= (alpha^2+2alpha+1)/(alpha^2+2alpha+b) +(beta^2+2beta+1)/(beta^2+2beta+b) = ____

IF alpha and beta be the roots of the equation 5x^2+7x+3=0 , find the value of (alpha^3+beta^3)/(alpha^-1+beta^-1) .