Of course, this is a quick visual scheme I’m showing above. I’m simply demonstrating that my cube has 8 cubes around it, thanks to two dodecahedrons. Inside, from the intersections, a complex sphere is born, composed of two icosahedrons and two dodecahedrons, and from all their vertices they form this kind of sphere. If you actually draw the lines, you can see a sphere made of hexagons, a sphere made of pentagons, and a sphere made of triangles. All of that is there.
Now the most interesting part. Why did I specifically make a separate chapter and call this the second stage before deciphering the matrix? The first stage was a deepening, a study of that universe, that matrix which is mine — that cube with its many intersections, many cubes, many geometric figures — it’s all like one universe. And when I showed it to you, I demonstrated that there are only four levels of scale in this: a small cube, a bigger cube, an even bigger cube, and yet another bigger one. Or similarly with triangles — tetrahedrons — or with those circles, the wheels. There are exactly four levels, like four worlds, inside my cube, inside this matrix.
Alexandr Korol
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