A Unified Proof Showing Bias in Equidistribution of 6n+5 and 6n+1 Prime Residue

<br>This paper presents an unified proof demonstrating that common assumptions about the equidistribution of different prime residues in analytic number theory and probabilistic models are incorrect.While individual permutations of P₁ exponents (factors giving residue 5 mod 6) exhibit an inherent 50/50 split, the additional stream of pure P₂ composites (factors always giving residue 1 mod 6) forces the overall composite count to be biased. This renders any heuristic “equal distribution” of outcomes between P₁ and P₂ incorrect. The proof is presented first in universally accessible language and then with precise mathematical notation.<br>Addressing concerns around existing asymptotic density estimates over the entire number line:In similar style of Euclid’s classic proof of the infinitude of primes, one can argue that at any finite stage (with a fixed set of primes), the combinatorial or permutation arguments already reveal that the available arrangements lead to an imbalance in the cancellation (sieving) process. In other words, even though many investigations into prime distributions rely on asymptotic density arguments, this finite, elementary approach shows that with any finite set of prime factors, the structure of the products forces more composites built entirely from P₂ primes (or with an extra stream of P₂-only contributions) to be canceled. This cancellation in the 1 mod 6 category (where P₂ is the neutral factor) then leaves a relative surplus of surviving candidates in the 5 mod 6 slot, regardless of how large the set of primes is made.This finite method, carried over through induction or a limiting process, is as valid as the classical arguments used to prove the infinitude of primes.<i> I</i><i>t</i><i>s </i><i>method is robust in producing a P₂-dominated sieve regardless of the finite set chosen of known primes or its distribution/ratio of </i><i>5 mod 6 (</i><i>P₁) </i><i>and </i><i>1 mod 6 (</i><i>P₂)</i><i>.</i><br>This is the second of many other significant works to come.<br>If you would like to collaborate together or publish my paper, please do not hesitate to contact me at : cs.kava@proton.me<br>