Estimates of the bounds of π(x) and π((x+1)2)-π(x2)

Abstract

We show the following bounds on the prime counting function π(x) using principles from analytic number theory, giving an estimate: 2 2 ≥ x → ∞ π(x)x / x ≥ x → ∞ π(x)x / x ≥ 2 for all x sufficiently large. We also conjecture about the bounding of π((x+1)2) - π(x2), as is relevant to Legendre's conjecture about the number of primes in the aforementioned interval such that: 12((x+1)2(x+1)-x2 x)-( x)2( x) ≤ π((x+1)2) - π(x2) ≤ 12((x+1)2(x+1)-x2 x) + 2x x