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Number Functions Arising out of Number Linear Symmetry or Number Circular Asymmetry on a Number Line that Proves the Existence of the Exact Nature of Non-Trivial Zeros in A Riemann Zeta Function

Abstract

Siddaiah Ramananda

Different types of Numbers which might be Odd, Even, Prime and Zero which includes all Types of Numbers in the Elementary Number Theory have a Different Geometrical Representation on the Number Line which makes them belong to Symmetric or Asymmetric Groups which might be Divisible or Indivisible to give the Final Derivation that gives the Solution and Proof for the Basic Riemann Zeta Equation where the Value of Non Trivial Zeros is determined by ½ + xi where x is the Real Number and i is the Imaginary Number Component.

Avertissement: Ce résumé a été traduit à l'aide d'outils d'intelligence artificielle et n'a pas encore été examiné ni vérifié

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