In this range coloring plot, each point \(x+yi\) in the domain is marked with a color (left).
Then that point is transformed, so that \(f(x+yi)\) is plotted with the same color as the original \(x+yi\) that it came from (right).
\(x+yi\) points in the domain might be mapped to the same points in the range. These are plotted on top of each other, and some information is lost.
This version has complex output support. Try \(f(x)=sqrt(x)\)
Enter your function here:
\(f(x)= \) →
\(r \in\) [0,]
\(r\) scale