locus of the point `z` satisfying the equation `|iz-1|+|z-i|=2` is

bb"statement-1" Locus of z satisfying the equation abs(z-1)+abs(z-8)=5 is an ellipse. bb"statement-2" Sum of focal distances of any point on ellipse is constant for an ellipse.

The solution of the equation |z|-z=1+2i is :

The locus of the point z satisfying Re(1/z) = k , where k is non -zero real number , is :

Solve the equation |z|=z+1+2idot

If z_1, z_2 are two complex numbers satisfying the equation |(z_1 +z_2)/(z_1 -z_2)|=1 , then z_1/z_2 is a number which is :

Number of imaginergy complex numbers satisfying the equation, z^(2)=barz*2^(1-|z|) is s. 0 b. 1 c. 2 d. 3

Let P point denoting a complex number z on the complex plane. i.e. z=Re(z)+i Im(z)," where "i=sqrt(-1) if Re(z)=xand Im (z)=y,then z=x+iy Number of integral solutions satisfying the eniquality |Re(z)|+|Im(z)|lt21,.is

The complex number z = x + iy , which satisfies the equation |(z-5i)/(z+5i)| =1 , lies on:

If the imaginary part of (2z+1)/(iz+1) is -2, then the locus of the point representing z in the complex plane is :

For every real number c ge 0, find all complex numbers z which satisfy the equation abs(z)^(2)-2iz+2c(1+i)=0 , where i=sqrt(-1) and passing through (-1,4).