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[Alexandr Korol]

At first, I begin to assume that this completion involves what I found in the second volume of “Alternative History”: the cube. Inside the cube, I have two tetrahedrons forming a stellated octahedron — that is, the Merkaba. Also inside the cube, I have an octahedron, a rhombus, and around the cube, I have wheels forming the Flower of Life. But all this seems like a single element, as if it’s one slice of a large mechanism, and this is what I presented in the second volume of “Alternative History”. That’s where my second volume ended.
I understand that what I hypothesized earlier in the second volume, I now must definitively prove and show in the eighth volume. What is this? I had several options, and I simply didn’t draw them because I knew people would get completely confused. So, in the second volume, I showed the matrix as a miniature and didn’t include many intersections in the version I deciphered. Now I realize that in the eighth volume I absolutely must show where the icosahedron will be, where it should be located within this matrix. I face the fact that there are many options for where to place it — it could be inside the rhombus, inside the octahedron, or conversely, around the throne, that is, outside rather than inside the matrix. So, there are many possibilities. The same applies to the dodecahedron — it can be constructed either inside or outside; there are many possibilities. I already saw the dodecahedron back in the second volume because when I made the wheels, the intersections of the wheels formed exactly the points needed to build the dodecahedron. What’s also interesting is that throughout this entire time, I understood I needed to fully comprehend this matrix from all angles and perspectives, to try all its construction methods. That’s why I separately glued sticks to make tetrahedrons, separately glued sticks to make rhombuses — that is, octahedrons — and separately glued sticks to make merkabas, that is, stellated octahedrons. Separately, I also made icosahedrons from sticks, explored the insides of the icosahedrons, and saw what emerges there — if you create different intersections inside the icosahedron, a small dodecahedron appears. Then, when I made the dodecahedron — I arrived at and understood it while completing the fifth volume about the otherworldly, death, winter, and night — on each of the dodecahedron’s 12 faces, I created intersections that formed pentacles, five-pointed stars. I noticed that inside the dodecahedron many cubes appeared. These cubes are all rotated differently in their own way,