Closed form, graphical solutions to "elementary" complex functions utilizing two (or more) sets of equations: [f,g](x),-[f,g](x),[f,g](-x),-[f,g](-x): and equations derived from real objects, but utilizing the same partial differential "thing" that makes the other graphs work for some reason. Very little makes sense to me, but I think these look really cool and can be fun to solve, even if I don't know why I did certain things (or why those things worked). So the equations that I find that actually work, or at least seem to do what I was aiming for in some way, are now going to go in this book. So are random things I decide to do with complex numbers. Those will (probably) have separate explanations for each, that way some amount of reason can come from my shenanigans.