Therefore Fermat is right
- It was Fernat's idea to investigate how many numbers would fulfill the equation according to the Pythagorean Theorem if the exponent were increased to random, e.g. to a3 + b3 = c3. His question became therefore: are there two whole numbers the cubes of which add up to the volume of the cube of a third whole number? He posed this same question, of course, for all kinds of higher exponents, so that the equation could be generalized: is there an integral solution for the equation an + bn = cn, if the exponent n is higher than 2? Although in 1993, the English mathematician Andrew Wiles was able to produce an arithmetical proof for Fermat's famous theorem, I will show that there is a simple logical explanation which is also pragmatic and plausible and what is the result of a fundamental alternative idea how our world seems to be constructed.
Author: | Walter van Laack |
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ISSN: | 2329-079X (E-Journal); 2329-0781 (Print) |
Parent Title (English): | American journal of humanities and social sciences : AJHSS |
Document Type: | Article |
Language: | English |
Year of Completion: | 2014 |
Volume: | 2 |
Issue: | 2 |
First Page: | 117 |
Last Page: | 120 |
Link: | https://worldscholars.org/index.php/ajhss/article/view/512 |
Zugriffsart: | weltweit |
Institutes: | FH Aachen / Fachbereich Medizintechnik und Technomathematik |