True Cones

I’ve been toiling away with the Theory of Everything based on the reflection of elementary particles of energy (kaus) and lately on its specific subset, where the reflecting elements are molecules. I’ve been introducing mathematical tools, which sometimes have stuck and sometimes I’ve realized them to be either imperfect, or sometimes even wrong. In today’s post I think I’ve finally found the first non-hand-waving version of the bent cones of reflection.

I think I won’t bore you with the details, but the accurate model requires me to start with the pentagon fold and then draw two scales of spheres. The one can draw circles at the intersection of these two scales of spheres, as well as a circle to the center of the largest sphere. The cones of reflection are formed by drawing a cone from the center of the central ring to the outer rings. Exactly why so, requires a bit more mathematics than I feel like explaining today. Suffice it to say that this model is mathematically rigorous.

And this is how the true bent bicone model looks like:

Again, it’s take a while for me to apply this to the larger Folded Reflection model, but once I do, the theory might just be ready. However, I’m constantly reminded of the Zeno’s paradox of always approaching a goal but never reaching it. For some possibly naïve reason I feel this time it’s different. I just hope I’m right.