A complex plane multiplied by a function in y, dependent on a variable constant "n", that when graphed, always contains the relevant x^n graph as its second curve. Odd exponents will yeild two equal and opposite limbs, so only the graph of the absolute value of x^n will be present. In three dimensions, this problem fixes itself (note that in 3d this graph becomes the expression in y, without the complex number, divided by x^n)
