While addressing this question on MSE the following inequality was revealed, concerning the Prime Counting function ...
For $\forall x,y$ such that $60184\le x< y$ we have: $$\frac{x}{\pi(x)} < \frac{y}{\pi(y)} + 1$$
While addressing this question on MSE the following inequality was revealed, concerning the Prime Counting function ...
For $\forall x,y$ such that $60184\le x< y$ we have: $$\frac{x}{\pi(x)} < \frac{y}{\pi(y)} + 1$$
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