Here's the second installment of my explanation of how hard and soft transitions work with Alien Jon's concept of arcs and loops. Here I demo all the permutations of these transitions through the intratangent circles (concentric) versus extratangent circles (outside--btw, if any mathematicians know what these concepts are actually called, please let me know) for a bunch of different circle sizes. From this, certain rules start to emerge and interesting patterns take shape, among them: hard and soft transitions always retain the region properties of their transition point while mixed transitions reverse these properties, CAPs seem to universally emerge from mixed transitions, static spin seems to work as both arc and loop, and isolations need an intermediary shape to get to extensions. Please leave feedback! Thanks :)
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