If the complex number z satisfies the equations `|z-12|/|z-8i|=(5)/(3) and |z-4|/|z-8| =1, "find" z.`

The complex number z satisfying the equation |z-i|=|z+1|=1 is

The complex number z satisfying the question |(i -z)/(i+z)|=1 lies on-

The complex number z satisfies z+|z|=2+8i . find the value of |z|-8

Find the number of complex numbers which satisfies both the equations |z-1-i|=sqrt(2)a n d|z+1+i|=2.

Find the non-zero complex number z satisfying z =i z^2dot

The complex numbers z is simultaneously satisfy the equations abs(z-12)/abs(z-8i)=5/3,abs(z-4)/abs(z-8)=1 then the Re(z) is

Number of imaginary complex numbers satisfying the equation, z^2=bar(z)2^(1-|z|) is

Consider the region R in the Argand plane described by the complex number. Z satisfying the inequalities |Z-2| le |Z-4| , |Z-3| le |Z+3| , |Z-i| le |Z-3i| , |Z+i| le |Z+3i| Answer the followin questions : Minimum of |Z_(1)-Z_(2)| given that Z_(1) , Z_(2) are any two complex numbers lying in the region R is

Find the complex number z satisfying R e(z^2) =0,|z|=sqrt(3.)

The maximum value of |z| when the complex number z satisfies the condition |z+(2)/(z)|=2 is -