Every Even Integer Greater than 500000 can be Expressed as a Sum of Two Odd Primes
Abstract
Every even integer greater than four can be expressed as a sum of two odd primes, and exists the
formula as follows:
Gp(N) ≥ INT{ Kpc×Ctwin×N/(Ln N)^2 }-1 ≥INT{ 0.66016×N/(Ln N)^2 }^1 ≥1