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[Alexandr Korol]

As you continue your thoughts, you come to the conclusion that it folds, meaning 12 months, 4 seasons, 3 months in each, all together – this is one year. What do you think, does this formula have a root equation, that one unity which unfolds into the other elements, or is it a cyclic equation, like a spiral or a circle, meaning it folds infinitely?

Well, no, it has an end. Good question. I am currently working on the matrix, continuing, but this is already the eighth volume. Let’s say this: there are these geometric figures, or rather these regular polyhedra: octahedron, icosahedron, dodecahedron, cube, tetrahedron. You can also include a circle. And here... Well, it’s important to understand how one forms another, how one kind of matrix is arranged where all these shapes are correctly positioned and generate each other. But it’s as if, imagine, one little ball made of all these geometric shapes. And then – this is the next stage I’m working on – how to unfold this little ball and how many times it unfolds to generate another ball, one of a bigger size. So, for example, take the octahedron. The octahedron is a pyramid facing up and a pyramid facing down, so it’s like a diamond made from two pyramids. And now imagine, if I take a pyramid, and the base on which it stands is like a square foundation, and then there are four sides of the pyramid going down, up and down. Now imagine, I take one pyramid, place the second one next to it on the right, then place two more pyramids underneath, so four pyramids are connected. And if I put a pyramid between them and underneath them, I get one large pyramid made of six. That is, one, two, three, four in one plane, one more on top — five, and one more on the bottom — six. And when I do this, what forms? The seventh large one. It’s the same as the small one, but bigger. So it’s like these six gave birth to this seventh one. But what’s interesting is that in the center, there’s an eighth one, the same as the six. And what am I leading to with all this? What happens is that the seventh one, which is in the center, is the same size as the six around it. But together, they give birth to one that is the same as the seventh, but larger. And this eighth one, if it is also “unfolded,” will give birth to another, even larger one. And I just gave you an example using a rhombus. Now, imagine that this rhombus also has a cube, a tetrahedron, an icosahedron, and a dodecahedron. And now I need to make sure that this figure, which has unfolded around itself, will give birth to another figure of the same kind as the one in the center, but larger. That is the entire formula.