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- ...generic n. Fermat wrote in note in the book the enunciation of his famous theorem and then added:</p> [[Image:Fermat last teorem.jpg|600px|centre]] ...3 KB (451 words) - 13:01, 18 August 2007
- ...re faced and resolved but that which subsequently would be called the last theorem resisted all attempted assaults. Leonhard Euler obtained the first results [[Category:Fermat's last theorem]] ...2 KB (327 words) - 19:09, 29 May 2007
- <p align="justify">The story of Fermat's theorem and more generally of the theory of numbers is lost in the meanders of huma ==The theorem of Pythagoras== ...4 KB (573 words) - 19:01, 31 August 2007
- ==Pythagoras’ theorem== ...ly, together with quadratic reciprocity, it contends for the prize for the theorem with the most absolute proofs. It will be proved in a graphical manner util ...16 KB (2,833 words) - 22:25, 29 May 2007
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- ...generic n. Fermat wrote in note in the book the enunciation of his famous theorem and then added:</p> [[Image:Fermat last teorem.jpg|600px|centre]] ...3 KB (451 words) - 13:01, 18 August 2007
- ...re faced and resolved but that which subsequently would be called the last theorem resisted all attempted assaults. Leonhard Euler obtained the first results [[Category:Fermat's last theorem]] ...2 KB (327 words) - 19:09, 29 May 2007
- ...X_1^n+X_2^n-X_3^n </math>. This is [[w:Fermat's Last Theorem|Fermat's Last Theorem]] - and if <math>n \ge 3</math> then only trivial solutions to the problem ...it's degree is greater than 4 - see [[w:Abel–Ruffini theorem|Abel–Ruffini theorem]]) - so most study is dedicated towards the geometrical structure of the se ...2 KB (372 words) - 19:20, 17 June 2007
- <p align="justify">The story of Fermat's theorem and more generally of the theory of numbers is lost in the meanders of huma ==The theorem of Pythagoras== ...4 KB (573 words) - 19:01, 31 August 2007
- The derivation of Law of [[Reflection]] using [[Fermat's principle]] is straightforward. The Law of [[Reflection]] can be derived us 2. Using [[Pythagorean theorem]] from [[Euclidean Geometry]] we see that ...4 KB (680 words) - 11:16, 31 December 2007
- ...we will consider, ''successive substitution'' and the ''Chinese remainder theorem''. === Chinese remainder theorem === ...14 KB (2,437 words) - 05:06, 9 December 2010
- The derivation of Law of Reflection using Fermat's principle is straightforward. The Law of Reflection can be derived using el 2. Using Pythagorean theorem from Euclidean Geometry we see that ...7 KB (1,281 words) - 23:38, 12 August 2007
- ...posite. In particular, we will take a closer look at the Chinese Remainder Theorem (CRT), and how it allows us to break arithmetic modulo ''m'' into ''compone ...d inverses and be able to solve a system of congruences (Chinese Remainder Theorem) (see: [[High School Mathematics Extensions/Primes|Primes and Modular Arith ...24 KB (3,811 words) - 04:47, 30 November 2006
- ==Pythagoras’ theorem== ...ly, together with quadratic reciprocity, it contends for the prize for the theorem with the most absolute proofs. It will be proved in a graphical manner util ...16 KB (2,833 words) - 22:25, 29 May 2007
- ...equiv; 1 (mod ''p''-1) and ''ed'' ≡ 1 (mod ''q''-1). Fermat's little theorem yields ...10 KB (1,679 words) - 18:50, 24 June 2006