Let `|z|=2andv=(z+1)/(z-1)`, where `z,vinC`. (where C is the set of complex numbers). Then product of least and greatest value of modulus of w is .

Let |z|=2 and w-(z+1)/(z-1), where z,w,in C (where C is the set of complex numbers).Then product of least and greatest value of modulus of w is

If w=|z|^(2)+iz^(2), where z is a nonzero complex number then

If |z|=1 and omega=(z-1)/(z+1) (where z in -1 ), then Re (omega) is

If |z-2|=min{|z-1|,|z-5|}, where z is a complex number then

Let z be a complex number satisfying 1/2 le |z| le 4 , then sum of greatest and least values of |z+1/z| is :

If |z-3+2i|<=4, (where i=sqrt(-)1) then the difference of greatest and least values of |z| is

Consider a complex number w=(z-1)/(2z+1) where z=x+iy, where x,y in R . If the complex number w is purely imaginary then locus of z is

Prove that |(z-1)/(1-barz)|=1 where z is as complex number.

Statement-1 : IF |z+1/z| =a , where z is a complex number and a is a real number, the least and greatest values of |z| are (sqrt(a^(2)+4-a))/2 and (sqrt(a^(2)+ 4)+a)/2 and Statement -2 : For a equal ot zero the greatest and the least values of |z| are equal .

If |Z-i|=sqrt(2) then arg((Z-1)/(Z+1)) is (where i=sqrt(-1)) ; Z is a complex number )