BSU lecturer discovers formula for exact total count count of primes up to a natural number
A Benue State University lecturer, Michael Atovigba has surprised the whole world with an algorithm for total count of prime numbers below or up to any natural number. The formula is an arithmetic of three algebraic numbers: 1+K-C, where K is total count of odds and C is total count of odd composites with algorithms for K and C provided. Mathematicians since the days of Euler have unsuccessfully sought this formula and concluded that total number of primes up to a natural number could only be approximated. This led them to propounding various zeta functions or algorithms of approximating the total counts of primes, one of the most revered being Riemann Hypothesis, which Atovigba proved in 2010 after 162 years of the hypothesis. Atovigba's algorithm is an edge above Riemann zeta function, because it provides exact count of the primes up to a given natural number while the zeta function is an approximation. Atovigba dedicates the equation to God who revealed it through various stages owing to prayers made during the December 2013 Shiloh event at Living Faith Church Worldwide. God led him through ethno-mathematically studying Tiv heaps patterns which form a special matrix group each of which rows has exactly k odd numbers. Atovigba's equation is before National Mathematical Centre Abuja for peer reviewing. He has also applied to his university to organize a university-based seminar where he might present the equation for critiquing. He is ready to appear before any mathematics or science audience to present and defend the equation. -- You received this message because you are subscribed to the Google Groups "Epistemology" group. To unsubscribe from this group and stop receiving emails from it, send an email to epistemology+unsubscr...@googlegroups.com. To post to this group, send email to epistemology@googlegroups.com. Visit this group at http://groups.google.com/group/epistemology. For more options, visit https://groups.google.com/d/optout.
