Equation-Based Exploration of the Goldbach Conjecture in Quadrant I Coordinate Systems

EasyChair Preprint no. 13796

Abstract

A new proof of Goldbach’s Conjecture will be presented in this paper
using equations like (a + b) = 2
√
A1 in the first quadrant of the space
coordinate system with n dimensions. We shall show that (a+b) is equal
to the sum of the two numbers n raised to the power of N by summing
(a+b) for any real numbers. It follows that for every pair of real numbers
(a+b) must be equal to nnN in quarter of square whose side length is equal
to
√
2 times n raised to the power of N. Our method hereby formulates
the magnitude of N as n ∈ N, in which n is an infinite positive integral
set. Concerning the Goldbach Conjecture, our approach provides original
viewpoint and prospects for forking paths in pure mathematics.

Keyphrases: Goldbach’s Conjecture, integer, Prime number, real number

@Booklet{EasyChair:13796,
  author = {Budee U Zaman},
  title = {Equation-Based Exploration of the Goldbach Conjecture in Quadrant I Coordinate Systems},
  howpublished = {EasyChair Preprint no. 13796},

  year = {EasyChair, 2024}}