This came out a lot later than I wanted. I forgot about this for a bit. Whoops. Anyways I should be able to catch up on everything. N - A type of non euclidean space where every point has a negative curvature (thing pringle/saddle shaped instead of spherical) The straight lines form hyperbolas in this type of space. This wasn't really much of a vocab word to be honest, but more of an interesting topic I learned about and did a bit of research on to learn more about. Anyways, Hyperbolic space is where every direction of travel is in a hyperbola. Due to this, equilateral triangles have angles of less than 60 degrees, and circles are rather strange. In euclidean geometry, a circle’s circumference is C=2pi*r. This is a linear relationship. However, in hyperbolic space this relationship is hyperbolic (C = 2πsinh(r)). This means that a 2D circle in hyperbolic space would have to be displayed in 3D euclidean space as wrinkled in order to actually fit the extra circumference. This is what...
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