" Determine the locus of "z=!=2i," such that "Re((z-4)/(z-2i))=0

Determine the locus of z, z ne 21i such that Re ((z-4)/(z-2i))=0

If |z-3+i|=4 determine the locus of z.

If z = x + i y and P represents z in the Argands plane. Find the locus of P when: Re ((z - 4) / (z - 2i)) = 0.

If Re (z^2)=2 then the locus of z is

The locus of z=x+iy satisfying |(z-i)/(z+i)|=2

The locus of z such that arg[(1-2i)z-2+5i]= (pi)/(4) is a

The locus of z such that arg [(1-2i) z-2+5i]=pi/4 is a

Find the locus of z if Re ((bar(z) + 1)/(bar(z) - i)) = 0.

P represents the variable complex number z find the locus of z if : Re((z+1)/(z+i))=1

The locus of P(z) satisfying z=x+iy where Re((z-2)/(z-1))=0 is