A complex function derived from taking a hyperbolic angle "t" ((x+y)=(x^2-y^2)*e^t) and subtracting a complex angle "m" ((x+yi)=(x^2+y^2)*e^(mi)) so that everything is equal to e^(t+mi) then solving for "m" in terms of x,m and y,m. The e^t cancels out during this step. The results were arccos(e^[-mi/2]/x) and arcsin(e^[-mi/2]/y). Since neither equation is dependent on both x and y, I graphed them with (x,y)-->x and m-->y. Also, because geogebra doesn't like taking the arccos or arcsin of a complex number, the complex definitions of both were used instead. All of that to say- the resulting function creates a cool looking eye. There are also 4 functions, each is a different part of an eye. It's pretty cool, and definitely not a waste of my time.
