Gravitational Force
From SlimeWiki
Assuming that the world of the slimes has the Law of Conservetion Of Energy, there is no real "gravitational force" but instead, every atom (in their world, pixel) in their universe is expanding (see Mark McCutcheon's The Final Theory) at a certain rate. Their world would be expanding at a certain rate, pushing them up (of course making it technically keep excellerating, as a percentage of a larger thing is bigger than a percentage of a smaller thing), making it seem to the slimes as if they are being pushed down. The slimes would have an immeasurably small ammount of "gravity" compared to their world, as they don't have as many nearly as many pixels.
If Wedgey would give me the top speed that the ball falls at (perhaps in centimeters per second?) on AFL Slime and One Slime, I could determine the size of each of their planets. Since (at least on my computer) AFL Slime is slower than One Slime in terms of how many times the ball bounces per 10 seconds, they probably are played on different planets. If a slime world is similar to a circle on Graphic Converter, a program I have, then each slime world should be at least 4 meters in diameter (with a 17-inch screen on 1440 x 900 px), otherwise the playing field would be appear curved.
I'll leave Wedgey a message and come back to this when he answers.
I got it! The maximum ball speed is 562.5 pixels/second, and therefore the slime planet's diameter is getting larger at 1125 pixels per second (assuming that the center of mass is also the geometric center) while the ball is staying put (assuming that at it's top speed air resistance is countered by ball expansion, which is very small). If the Atomic Expansion Rate is the same as on Earth, 0.000077% per second, then 1125 pixels must be 0.000077%, making 100% being about 1,461,038,961.03896 pixels in diameter. Yes, I did the unthinkable. I HAVE DETERMINED THE DIAMETER OF THE ENTIRE SLIME PLANET!!!
P.S. Sorry Newtonians and Einsteinians, using your theories (which don't explain a lot of things), I could have found the mass of their planet, not the size. In my books, pixels don't have too much mass.
