Chaos Turns into System Through Analysis with Sanjoy Nath's Geometrifying Trigonometry

Sanjoy Nath's Geometrifying Trigonometry(C) proves presence of Isotropy inside AnIsotrpy of growths In the Chaos theory we have seen there are natures of Isotropy of self similarity jerks and the behavior looks like chaotic. Actually that is not the case . When we interpret any Algebraic equation geometrically , we see there are chances of 4 types of symmetry present there . Until Sanjoy Nath's Geometrifying Trigonometry introduced LOCKED_SET(C) concepts of 2 dimensional and 3 Dimensional objects with Additions , Concatenations and Multiplications we could not do modeling of these options of pictures on Autocad screen to see the effects of simple Algebraic or Trigonometric Expressions. We used to get only one possible graph in the picture forms where variables scalar values comparizations were visualized only . In fact there are several other forms of arrangements possible which forms real possible pictures of natural formations which explains the story of self similarity not only with single adhesive ness of coharent symmetries . These were hiding the facts inside the other possible arrangements of FLAKES or POLYTOPES Isotropic and Anisotropic positions in Permutations flow. These are Sanjoy Nath's RECURSIVE LOCUS of Permutation flow of Arrangements. Sanjoy Nath is not theoritical physicist so he does not know the nature of chaos and energy consumptions distributions behavior in each forms of Orientations but in Structural engineering he has tested with STAAD PRO that the force distributions and the moment distributions are coharent in all possible permutations arrangements but the shapes look very different there . There are 4 types of + , 4 types of - , 4 types of * and 4 types of ÷ in every kind of Actions on Trigonometric or Algebraic expressions which are not just scalar values but are arrangements of Polytopes(2D or 3D tested on Autocad and STAAD PRO) . If you check these CAD files in GIT hub , you will see the magic behaviors of these shapes so formed due to simple Algebraic or Trigonometric Operations.