This simulation takes the input x=r+si for I=sqrt(-1), and inputs it through the function f(x)=ax^3+bx^2+cx+d for some constants a, b, c, and d 1 and 2 to control constant a q and w to control constant b a and s to control constant c z and x to control constant d arrow keys to stretch and squeeze graph along x and z axes space to change graph mode modes: 0: y-value is real part of complex output 1: y-value is imaginary part of complex output 2: complex output is converted to polar form, y-value is magnitude and color is angle 3: same as graph 2, but Y-Axis is now in logarithm. bold curve shows the curve when only real numbers are the input.
Wanted to see how cubic functions looked like in the complex plane, and to also visualize complex