An odd property of an equivalency between simple polynomials and complex functions (not equation, the surface contains more than just the function, I'm only saying the relevant functions, x^(n-1) and x^(1-n) always lie on their respective complex planes, not that the two have equal value). The complex functions were derove from an earlier equation (this time they are the same) which states that "x^n=[i+(y/x)^n]*y^-(n-1)]. The placement of the "i" only changes what variable the left side is, which is either x^n or y^n since you just rotate the whole graph 90 degrees clockwise. This graph is concerned more with the geometry of the function(s) than the algebra (the term y^-(n-1) was derove by counting the rise and run of a graph x^n, then rewriting the "y" values in terms of "n", but with an extra step I don't remember).
