For anyone else who's mind went blank trying to work out just what sort of "inverse" can be applied to a circle. It's interesting math and the diagrams are worth checking out, some very nice use of interactivity to assist with understanding the nature of the function.
But definitely not the kind of inverse I was expecting.
I went to "A function that's equal everywhere not the circle you define in the function", some sort of f(x,y) = !f(circle) by way some sort of algebraic geometry math. Then I was trying to work out if it meant something else... then I loaded it and was genuinely surprised to find its a much more specific kind of inverse that never even occurred to me.
But definitely not the kind of inverse I was expecting.
I went to "A function that's equal everywhere not the circle you define in the function", some sort of f(x,y) = !f(circle) by way some sort of algebraic geometry math. Then I was trying to work out if it meant something else... then I loaded it and was genuinely surprised to find its a much more specific kind of inverse that never even occurred to me.