Surf these sites: A course on Fermat''s Last Theorem -- by J. Tunnel at Rutgers. The course discusses the proof of Fermat''s last theorem and related questions concerning modular forms, elliptic curves and representations of Galois groups. BBC horizon documentary -- Includes transcript of the programme Beal Conjecture -- The official Beal Conjecture site with information and links regarding the problem Fermat''s Last Theorem -- Visual Renaissance links Fermat''s Last Theorem -- video of a popular lecture on FLT arranged by the London Mathematical Society NOVA Online | The Proof -- NOVA Online presents The Proof, including an interview with Andrew Wiles, an essay on Sophie Germain, and the Pythagorean theorem. On a Generalized Fermat-Wiles Equation -- Steven Finch''s essay on the Diophantine equation of the form x^n + y^n = c.z^n. The Beal Conjecture -- $50,000 prized problem pertaining to the Diophantine equation of the form A^x + B^y = C^z where A, B, C, x, y and z are positive integers and x, y and z are all greater than 2, then A, B and C must have a common factor. The Mathematics of Fermat''s Last Theorem -- Charles Daney''s treatise on Fermat''s last theorem. The solving of Fermat''s Last Theorem -- This talk will tell the story of Fermat''s Last Theorem for a general audience, including the history of the problem, the story of Andrew Wiles'' solution and the excitement surrounding it, and some of the many ideas used in Wiles'' proof Visualizing Fermat''s Last Theorem -- A popularized introduction to Fermat''s Last Theorem. Three dimensional mathematical depictions are used in the beginning of the film to illustrate the meaning of the mathematical ideas involved. The second half of the film makes a transition to show a remarkable family of four dimensional surfaces related to Fermat''s theorem, and projects them to three dimensions for display using standard rendering and shading techniques. Wiles'' proof -- an overview, following Glenn Stevens'' article, by Paul Hewitt, Univ of Toledo Wiles, Ribet, Shimura-Taniyama-Weil and FLT -- Much of the material that seeded this archive was copied from the former gopher archive pertaining to "Fermat''s Last Theorem" at e-math
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