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GH from MO
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Let $X$ be positive integer number then $\pi{(X+\ln^2{X})}-\pi{(X-\ln^2{X})}>\ln{X}$

  • The prime-counting function is the function counting the number of prime numbers less than or equal to some real number $x$, It is denoted by $\pi{(x)}$. Using my computer I found that: Let $X$ be positive integer number $\leq 10^{9}$ then $$\pi{(X+\ln^2{X})}-\pi{(X-\ln^2{X})}>\ln{X}$$

  • Question: Is the result about hold? If $X$ be any positive integer number.