Course 4 on The Globally Distinguishable Vs. The Substringular, Session 8, Part Two

Consider the spinning to be holomorphic relative to the surface area of the paraboloid. Consider the rate of the spinning to be maintained at a constant speed. Of course, since you are spinning, your direction is always changing so that you are constantly accelerating. Think of the trans location of phenomena besides yourself, whom is staying put, that was at one point touching the parabola, from the surface area of it, as proportional to the differentiation in the speed of the sway spinning. This would mean that discharge from the surface would be transferred at a constant rate. Since this is true for the whole topology given, it is certainly true for the potential at which you would be at. You are in line with a potential discharge of residue from the surface of the paraboloid, which would be a trans location of surrounding phenomena. This would mean that the norm vector of each point along the surface would be constant in magnitude, although constantly changing in direction. Wouldn't this then mean that the norm conditions of the surface area of the given paraboloid would constantly alter part of its Caucy norm conditions, while constantly maintaining the others? Now, this is saying that the point is relatively stationary. It is going nowhere to a non moving observer. Now say that the paraboloid was just setting there. It is not necessarily a sphere, although it could be a sphere. It has a position since it has a shape. Anything that has a position exists at an angle. Now, let's say that the object rolled down the table. Its angle of position at each increment of motion along the table works to define its coexistence with its environment, including the table. The rolling of the object is like a spin. The change of the object's norm conditions as it rolls is the physical action of the object that brings it to the new positions which create the object's motion. The driving force of the object in whatever direction it is pressured into also causes motion by allowing a positional drive of the object. So, change in norm conditions in both radial translation and positional drive work together to form the basic building blocks of regular motion.