Extended Inequality Satisfied by Pythagorean Classical Means

Authors

  • Dhritikesh Chakrabarty Independent Researcher (Ex Associate Professor of Statistics, Handique Girls’ College) Guwahati, Assam, India

DOI:

https://doi.org/10.5281/zenodo.13621318

Keywords:

Average, Pythagorean Classical Means, Extended Domain of Numbers, Inequality

Abstract

The great mathematician Pythagoras who is the inventor of the three basic measures of average namely Arithmetic Mean, Geometric Mean & Harmonic Mean, which are termed as the Pythagorean classical means, derived an inequality satisfied by these three measures in a domain of numbers. An inequality has here been derived which is satisfied by the three Pythagorean classical means in a wider domain of numbers. This article presents the derivation of this extended inequality with numerical example.

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Published

2024-08-25

How to Cite

Dhritikesh Chakrabarty. (2024). Extended Inequality Satisfied by Pythagorean Classical Means. Partners Universal International Innovation Journal, 2(4), 13–18. https://doi.org/10.5281/zenodo.13621318

Issue

Vol. 2 No. 4 (2024): PUIIJ

Section

Articles