Summation Methods

Inhaltsverzeichnis (Table of Contents)

• Introduction
• Index
  • Effective intervals
  • Possible intervals
  • Particular intervals
  • Assembly of assemblies of indexes
• Summation method I
• Summation method II
• Summation method III
• Biswas triangle
• Summation method IV
• Conclusions

Zielsetzung und Themenschwerpunkte (Objectives and Key Themes)

This paper explores the concept of indexes and intervals in mathematics, demonstrating their applications within the framework of summation methods. The author introduces a new concept, the Biswas triangle, and develops theorems related to both summation methods and this new concept.

• Indexes and intervals in mathematics
• Summation methods and their applications
• The Biswas triangle as a new concept
• Relationships between addition and multiplication
• Theoretical frameworks for analyzing mathematical sequences and series

Zusammenfassung der Kapitel (Chapter Summaries)

The paper begins by defining essential terms and outlining the development of five theorems, four related to summation methods and one dedicated to the Biswas triangle. The second chapter delves into the concept of indexes, exploring their use in defining parent and infant assemblies. This chapter further discusses effective, possible, and particular intervals, demonstrating how they are constructed and used in analyzing the relationships between these assemblies. The chapter concludes with an introduction to assemblies of assemblies of indexes, providing a foundation for the subsequent exploration of summation methods.

Schlüsselwörter (Keywords)

This paper focuses on the mathematical concepts of index, interval, summation methods, and the Biswas triangle. The paper explores applications of these concepts, particularly in the context of analyzing sequences and series. The research is based on theoretical frameworks, aiming to illustrate the interconnectedness of addition and multiplication within specific mathematical contexts.