¶ Triangle
RBF Definitions
Triangle:
“A triangle’s three-vector parts constitute a basic event. Each triangle consists of three interlinked vectors. In the picture, we are going to add one triangle to the other. (See illustration 511.10 (Gray). In conventional arithmetic, one triangle plus one triangle equals two triangles. The two triangles represent two basic events operating in Universe. But experimentally triangles do not occur in planes. They are always omnidimensional positive or negative helixes. You may say that we do not have any right to break the triangles’ three-sided rims open in order to add them together, but the answer is that the triangles were never closed, because no line can ever come completely back ‘into’ or ‘through’ itself. Two lines cannot be passed though a given point at the same time. One will be superimposed on the other. Therefore, the superimposition of one end of a triangular closure upon another end produces a spiral–a very flat spiral, indeed, but openly superimposed at each of its three corners, the opening magnitude being within the critical limit of mass attraction’s 180-degree ‘falling-in’ effect. The triangle’s open-ended ends are within critical proximity and mass-attractively intercohered, as are each and all of the separate atoms in”
¶ Citations
