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| Vertical_Horizontal Line Problems |
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| Vertical_Horizontal Line Problems |
As you can see, vertical and horizontal lines are here to stay. While the answer doesn't have to be at the frequency Pythagoras has in the first illustration (square and rectangular), Its horizontal and vertical frequencies are present with smaller isolated triangular structures in the second illustration. They're inescapable as long as you're able to reduce to a prior dimension. So, it remains that for 2D surfaces, Pythagoras can escape with only triangles at every encounter , since my topological examples secured that logic. 2D's unique structure is lost in Pythagoras' world when a triangle can be reducible to horizontal and vertical lines. I replaced that with Clock Time which are threshold features above 1 dimensional environments. He is still inaccurate about the area of a circle, since he didn't account for Y(vertical) and X(horizontal) factors in a radius. Damn it, if there is a way out of these vertical and horizontal lines, it requires an alien level insight and metacognition of Nature's logical outcomes. I declare a draw with Pythagoras in the 2D space. I still gain something from this conflict. I've solved the oblique line problems. It was solved not with wheels within wheels(possible), but with rectangles and squares within rectangles and squares, triangles within triangles, and linear lines within lines. It's just unbelievable.
R.I.P Pythagoras ,
Dimension Basics Part 2: Incomplete Merger and Separation , Compatibility: 0.5 Dimension .
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