For the complex number z satisfying the condition `|z+(2)/(z)|=2`, the maximum value of `|z|` is

The complex number z satisfies thc condition |z-(25)/(z)|=24. The maximum distance from the origin of co-ordinates to the points z is

The complex number z satisfying z^(2) + |z| = 0 is

Find the greatest value of the moduli of complex numbers z satisfying the equation |z-(4)/(z)|=2 . What is the minimum value ?

The complex number z satisfies thc condition |z-25/z|=24 . The maximum distance from the origin of co-ordinates to the points z is

The complex number z satisfies thc condition |z-25/z|=24 . The maximum distance from the origin of co-ordinates to the points z is

The complex number z satisfies thc condition |z-25/z|=24 . The maximum distance from the origin of co-ordinates to the points z is

If the complex no: z satisfies the condition |z|>=3, then the least value of |z+(1)/(z)| is

If complex number z satisfies the condition |z-2+i|<=1 , then maximum distance of origin from A(4+i(2-z)) is

If z is any complex number satisfying |z-3-2i|lt=2 then the maximum value of |2z-6+5i| is