Let $z$ be a complex number such that $\dfrac{z-i}{z-1}$ is purely imaginary. Find the minimum value of $|z-(2+2i)|$.
Source: ISI 2017 BMATH UGA $$$$
Attempt:
Since $\dfrac{z-i}{z-1}$ is purely imaginary,
$$$$$$\dfrac{z-i}{z-1}+\overline{\left(\dfrac{z-i}{z-1}\right)}=0$$ This reduces to
$$|z|^2=\Re(z)+\Im(z)$$
This represents the locus of $z$ on the Argand Plane. The minimum value of $|z-(2+2i)|$ will be the shortest distance between any point $z$ lying on $|z|^2=\Re(z)+\Im(z)$ and the point $(2,2)$ on the Argand Plane. $$$$Unable to recognize the locus represented by $|z|^2=\Re(z)+\Im(z)$.
How to identify locus represented by $|z|^2=\Re(z)+\Im(z)$ without reducing to Cartesian Coordinates?
