if `(1+i)z=(1-i)barz` then `z` is

If (1+i)z=(1-i)bar(z) then z is

if (1+i)z=(1-i)bar(z) then z is

If (1+i)z = (1-i)barz, "then show that "z = -ibarz.

If ((1+i) z= (1-i))bar(z), then

If (1+i)z=(1-i)phi z, then show that z=-iz

If z= 1/((1+i)(1-2i)) , then |z| is

Conjugate of a complex no and its properties. If z, z_1, z_2 are complex no.; then :- (i) bar(barz)=z (ii)z+barz=2Re(z)(iii)z-barz=2i Im(z) (iv)z=barz hArr z is purely real (v) z+barz=0implies z is purely imaginary (vi)zbarz=[Re(z)]^2+[Im(z)]^2

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

Let the lines (2-i)z=(2+i) barz and (2+i)z+(i-2)barz-4i=0 , (here i^(2)= -1 ) be normal to a circle C. If the line iz+barz+1+i=0 is tangent to this circle C, then its radius is :