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Geometry |
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Authors: Gerasimos T. Soldatos
This article tackles the problem of quadrature through reductio ad impossibile in the form of proof by contradiction. The general conclusion is that an irrational number is irrational on the real plane, but in the three-dimensional world, it is as a vector the image of one at least constructible position vector, and through the angle formed between them, constructible becomes the “irrational vector” too, as a right-triangle side.
Comments: 9 Pages.
Download: PDF
[v1] 2021-12-16 21:03:01
Unique-IP document downloads: 294 times
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