Inherent Approaches to Solving Exponential Diophantine Equations involving Disarium Numbers of order 2 to 4.

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Published

23-09-2025

DOI:

https://doi.org/10.58414/SCIENTIFICTEMPER.2025.16.9.08

Keywords:

Exponential Diophantine equations, Disarium Numbers, Integer solutions, Catalan’s conjecture.

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Issue

Vol. 16 No. 09 (2025): The Scientific Temper

Section

Research article

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Copyright (c) 2025 The Scientific Temper

Creative Commons License

This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License.

Authors

  • P. Sangeetha Assistant Professor, PG and Research Department of Mathematics, Cauvery College for Women (Autonomous), Affiliated to Bharathidasan University, Tiruchirappalli-24, India.
  • G. Janaki Associate Professor, PG and Research Department of Mathematics, Cauvery College for Women (Autonomous), Affiliated to Bharathidasan University, Tiruchirappalli-24, India.

Abstract

Exponential Diophantine equations, which involve integer solutions to equations containing variables in exponents, represent a significant area of study in number theory. In this article, we explore, we introduce three distinct exponential Diophantine equations. By incorporating insights from the Catalan Conjecture and utilizing Disarium numbers of orders 2, 3, and 4, we establish non-negative integer solutions to these equations. A series of numerical examples is also presented to validate the proposed method and demonstrate how the equations can be effectively solved.

How to Cite

Sangeetha, P., & Janaki, G. (2025). Inherent Approaches to Solving Exponential Diophantine Equations involving Disarium Numbers of order 2 to 4. The Scientific Temper, 16(09), 4769–4771. https://doi.org/10.58414/SCIENTIFICTEMPER.2025.16.9.08

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