If complex number `z(z!=2)` satisfies the equation `z^2=4z+|z|^2+(16)/(|z|^3)` ,then the value of `|z|^4` is______.

If z is a complex number satisfying the equaiton z^(6) - 6z^(3) + 25 = 0 , then the value of |z| is

Let z be a complex number satisfying the equation (z^3+3)^2=-16 , then find the value of |z|dot

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.

Let z be a complex number satisfying the equation (z^3+3)^2=-16 , then find the value of |z|

If complex number z=x +iy satisfies the equation Re (z+1) = |z-1| , then prove that z lies on y^(2) = 4x .

If z is a complex number satisfying the relation |z+ 1|=z+2(1+i) , then z is

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

If a complex number z satisfies |z|^(2)+(4)/(|z|)^(2)-2((z)/(barz)+(barz)/(z))-16=0 , then the maximum value of |z| is