If z=x +iy and `w= (1-iz)//(z-i)`, then show that `|w|=1 rArr z` is purely real.

Suppose z = x + iy and w = (1-iz)/(z-i) Find absw . If absw = 1, prove that z is purely real

If |z| =5 and w= (z-5)/(z+5) the the Re (w) is equal to

Suppose z = x + iy and w = (1-iz)/(z-i) Find 1 - iz and z - 1 in the standard form of a complex number.

AB,BC,CD and AD are the tangents of the circle.If AP=x,BP =y, CR =z, SD =W then show that the perimeter of the quadrilateral ABCD is 2(x+y+z+w).

Let w = (1 - iz)/( z -i). If |w| = 1, which of the following must be true?

If arg((z-1)/(z+1)) = pi/2 , show that x^2+y^2-1=0

If Im ((2z+1)/(iz+1))=3 , then locus of z is

If z=1+i , then the argument of z^(2)e^(z-i) is

Let (z, w) be two non-zero complex numbers. If z +i w = 0 and arg (z w) = pi , then arg z is equal to a) pi b) (pi)/(2) c) (pi)/(4) d) (pi)/(6)

If z = (2-i)/(i) , then R e(z^(2)) + I m(z^(2)) is equal to a)1 b)-1 c)2 d)-2