Complex numbers z satisfy the equaiton `|z-(4//z)|=2`
The difference between the least and the greatest moduli of complex number is

Complex number z satisfy the equation |z-(4/z)|=2 The difference between the least and the greatest moduli of complex number is (a) 2 (b) 4 (c) 1 (d) 3

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

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

A complex number z satisfies |z-(2+7i)|=Re(z). Then the difference between least and greatest value of arg(z) is

Complex numbers z satisfy the equaiton |z-(4//z)|=2 Locus of z if |z-z_(1)| = |z-z_(2)| , where z_(1) and z_(2) are complex numbers with the greatest and the least moduli, is

Complex numbers z satisfy the equaiton |z-(4//z)|=2 The value of arg(z_(1)//z_(2)) where z_(1) and z_(2) are complex numbers with the greatest and the least moduli, can be

Complex numbers z satisfy the equaiton |z-(4//z)|=2 The value of arg(z_(1)//z_(2)) where z_(1) and z_(2) are complex numbers with the greatest and the least moduli, can be

Let the complex number z satisfy the equation |z+4i|=3 . Then the greatest and least values of |z+3| are

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