The number of solutions of the equations `|z-(4+8i)|=sqrt(10)and|z-(3+5i)|+|z-(5+11i)|=4sqrt(5),`
where`i=sqrt(-1).`

Number of solutions of eq. |z|=10and|z-3+4i|=5 is:

Find the complex number z satisfying the equation |(z-12)/(z-8i)|= (5)/(3), |(z-4)/(z-8)|=1

Find a complex number z satisfying the equation z+sqrt(2)|z+1|+i=0.

Find a complex number z satisfying the equation z+sqrt(2)|z+1|+i=0.

Find a complex number z satisfying the equation z+sqrt(2)|z+1|+i=0.

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

If z is a complex number which simultaneously satisfies the equations 3abs(z-12)=5abs(z-8i) " and " abs(z-4) =abs(z-8) , where i=sqrt(-1) , then Im(z) can be

The system of equation |z+1+i|=sqrt2 and |z|=3} , (where i=sqrt-1 ) has

The equation z^(2)-i|z-1|^(2)=0, where i=sqrt(-1), has.

How many solutions the system of equations ||z + 4 |-|z-3i|| =5 and |z| = 4 has ?