NEW OPTIMAL BOUNDS FOR LOGARITHMIC AND EXPONENTIAL FUNCTIONS

Lazhar Bougoffa; Panagiotis T. Krasopoulos

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Journal article

NEW OPTIMAL BOUNDS FOR LOGARITHMIC AND EXPONENTIAL FUNCTIONS

Lazhar Bougoffa and Panagiotis T. Krasopoulos

Journal of inequalities and special functions, Vol.12(3), pp.24-32

01/01/2021

Abstract

Mathematics

Physical Sciences

Science & Technology

We present new lower and upper bounds for the logarithmic function ln(1 + x). These bounds involve a parameter m and they become optimal as m -> 0. Moreover, by using these bounds we also present new optimal bounds for the exponential function e(x). We compare our bounds with other known bounds from the literature and we support their optimum performance.

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Title: NEW OPTIMAL BOUNDS FOR LOGARITHMIC AND EXPONENTIAL FUNCTIONS
Creators - without role: Lazhar Bougoffa - Imam Mohammad ibn Saud Islamic University
Panagiotis T. Krasopoulos - Elect Natl Social Secur Fund, Dept Informat, KEAO, 12 Patision St, Athens 10677, Greece
Publication Details: Journal of inequalities and special functions, Vol.12(3), pp.24-32
Publisher: Univ Prishtines
Number of pages: 9
Identifiers: 9916602508331
Academic Unit: Imam Mohammad Ibn Saud Islamic University (IMSIU)
Language: English
Resource Type: Journal article