JIPAM - Journal of Inequalities in Pure and Applied Mathematics

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Approximation of $\pi(x)$ by $\Psi(x)$


	Authors:	Mehdi Hassani,
	Keywords:	Primes, Harmonic series, Gamma function, Digamma function.
	Date Received:	07/03/05
	Date Accepted:	25/08/05
	Subject Codes:	11A41, 26D15, 33B15.
	Editors:	Jozsef Sandor,


	Abstract:	In this paper we find some lower and upper bounds of the form $frac{n}{H_n-c}$ for the function , in which $H_n=sum_{k=1}^nfrac{1}{k}$ . Then, we consider as generalization of , such that $Psi(x)=frac{d}{dx}logGamma(x)$ and is Euler constant; this extension has been introduced for the first time by J. Sándor and it helps us to find some lower and upper bounds of the form $frac{x}{Psi(x)-c}$ for the function and using these bounds, we show that , when is equivalent with the Prime Number Theorem. ;

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