Conjecture About the Composition of Prime Numbers

What are the numbers made of? More precisely, what are prime numbers made of? I posed this question to myself on the evening of August 19, 2025, which prompted prolonged introspection and profound contemplation. Then, I began constructing a numerical pyramid with prime numbers. The number one took the place of the central axis. Therefore, it is possible that large prime numbers could be surrounded by prime numbers on either side of one. However, this property extends to all even and odd non-prime numbers, but without one. The Goldbach ternary conjecture, which was proven by Harald Helfgott and is now recognized as the Goldbach-Helfgott theorem, is applicable to the observation that all odd non-prime numbers can be expressed as a sum of at least three prime numbers. This is due to the fact that non-prime numbers are a subset of all numbers greater than five. Once Goldbach’s binary conjecture is proven, it will likely lead to the proof of Riemann’s conjecture because we will be able to detect the structure of even numbers preceding prime numbers. For now, we can visualize this in the numerical structure of the first one trillion numbers and even further up to the largest known prime number. Let 3 203 431 780 337 be our number, which is verified as prime. If we subtract another prime number, 3 333 977 , from it, we obtain 3 203 428 446 360$. Subtracting one from the product verifies that 3 203 428 446 359 is prime. If so, then the sum of the two prime numbers plus one equals the proposed prime number above. This study has two objectives. First, it aims to present prime numbers as more than just their primality property. Second, it seeks to define the numbers 2 and 3 as a set of authentic prime numbers.