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[Alexandr Korol]

thanks to four cubes, I ended up with a star they all hint at. While decoding it, I realized the cube — what is it made of? Of these Merkabas, these stars. And what are the stars made of? Two triangles joined together. I understood that these vertices, both inside and outside the intersections, all need to be somehow rotated and unfolded to create this spiky ball, which forms either a dodecahedron or an icosahedron. Because those are the geometric shapes... Well, I knew the place for the dodecahedron, but I didn’t understand where exactly I could fit the icosahedron into my matrix. There must be some reasonable explanation or proof for where and why this icosahedron is there. I assumed that if I start correctly copying and rotating cubes around my cube — but I need to figure out how many and which vertices — then I’ll form a sphere, a ball, so to speak, a source from which you can build either an icosahedron, a dodecahedron, or generally a sphere made of triangles. You often see this in sci-fi movies, futuristic and space-themed ones. And then I noticed that even in those alchemical engravings, when the process of understanding the Philosopher’s Stone is complete, Hermes holds a scepter — the orb — in his hand. I realized that this orb is what I need to find by creating a cube within a cube, unfolding it like a “hedgehog.” As I deciphered all the alchemical symbolism, I found this orb. But again, there are many ways to build these cubes, and I felt that although I had solved a lot correctly, something was still missing. I just didn’t feel that... As usual, when I’ve deciphered everything, I can say it with one hundred percent confidence. Today, I can say it, but earlier, when I was decoding all the alchemy in the eighth volume, I felt that something was just a little bit missing — just a bit. I faced a choice: is it correct to build the cubes like in alchemy, rotating them by 45 degrees? Or to build cubes according to the dodecahedron, because there the cubes multiply and rotate around themselves at a different angle? Or maybe combine both methods? Another question was: how many cubes do I need for the sphere to form outside or inside — this sphere where I want to find that orb — and for all the geometric shapes to finally appear? Because I couldn’t just... There are enthusiasts of sacred geometry who simply spot all the correct geometric shapes on various polyhedra and just fit them inside each other — and that’s it. But there must be proof,