Papers by Joseph L Sparks
ProQuest, LLC, 2008
Problems attempted to be evaluated using the fundamentals of Mathematics include Goldbach's Conje... more Problems attempted to be evaluated using the fundamentals of Mathematics include Goldbach's Conjecture, The Riemann Hypothesis, the Collatz Conjecture, the theory of Dates, Complexity, the Twin Primes Conjecture, Fermat's Conjecture and Beal's Conjecture. A Beal's Conjecture Proof or Counterexample was found to also involve matrices which meant once it and the others would have been evaluated, they provided an evaluation to a disproof of Fermat's and Wiles' Conjecture and a disproof of Fermat's Last Theorem that the statement a^n + b^n = c^n is false, when in fact it is true. The paper also showed that (a^m*n + b^m*n) f = (c^n)^m , was a more definitive representation of a new valid revelation called the Computerized Finite Ascension Theorem where f = n*m. In the paper, we used m = 1, and m = a prime number, in the Computerized Finite Ascension Simulation. Likewise, it showed that (c^m)^n = (a^m*n + b^m*n)^f. It also revealed the Computerized Finite Ascension Relationship that g*c^n = g*c^z = v^w .
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Papers by Joseph L Sparks