If `alpha\ a n d\ beta` are different complex numbers with `|beta|=1,\ fin d\ |(beta-alpha)/(1- alphabeta)|`

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 |beta|=1, then find |(beta-alpha)/(1- baralphabeta)| .

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 |beta|=1, then find |(beta-alpha)/(1- baralphabeta)| .

If alpha and beta are complex numbers then the maximum value of (alpha barbeta+baralphabeta)/(|alpha beta|)= (A) 1 (B) 2 (C) gt2 (D) lt1

If alpha and beta are the complex cube roots of unity, then prove that (1 + alpha) (1 + beta) (1 + alpha)^(2) (1+ beta)^(2)=1

Find the centre and radius of the circle formed by all the points represented by z = x + iy satisfying the relation |(z-alpha)/(z-beta)|= k (k !=1) , where alpha and beta are the constant complex numbers given by alpha = alpha_1 + ialpha_2, beta = beta_1 + ibeta_2 .

If alpha and beta are non-zero real number such that 2(cos beta-cos alpha)+cos alpha cos beta=1. Then which of the following is treu?

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

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