Abstract
This paper presents a new mathematical model for formation as well as computation of geometric series and summability in step-by-step procedures. Also, it provides mathematical structures for geometric series-ordered terms. The novel mathematical model uses Annamalai’s computing method of geometric series and summability, which provided a technique to establish the algorithmic geometric series and its formulae in an earlier paper, for further improvement in the scientific research study. This mathematical/computational models of geometric series are widely used in the fields of physics, engineering, biology, medicine, economics, computer science, queueing theory, finance, and management for the purpose of research and development meeting today’s challenges. In an earlier research article, the geometric series along with exponential decay model were used to determine effective medicine dosage. Few specific mathematical formulae had also been discovered by using Annamalai’s algorithmic geometric series and summability. This could be very interesting and informative for current students and researchers.
Highlights
Geometric series [1,2,3,4,5,6,7,8,9,10] played a vital role in differential and integral calculus at the earlier stage of development and still continues as an important part of the study in science, mathematics, economics, management and its applications [3,4,5,6]
This paper introduces a practical approach for developing a new mathematical/computational model called
These algorithmic geometric series and its formulae could be used in the research areas of biology, medicine, physical science, econometrics, statistics, finance, and management for further development of research techniques and/or technologies meeting today’s challenges
Summary
Geometric series [1,2,3,4,5,6,7,8,9,10] played a vital role in differential and integral calculus at the earlier stage of development and still continues as an important part of the study in science, mathematics, economics, management and its applications [3,4,5,6]. These algorithmic geometric series and its formulae could be used in the research areas of biology, medicine, physical science, econometrics, statistics, finance, and management for further development of research techniques and/or technologies meeting today’s challenges. The formation and computation of Annamalai’s algorithmic geometric series and summability differ from old pattern of geometric series and its mathematical expression. These novel mathematical techniques, methods, and models could be very interesting and informative for currents research scholars to enhance their knowledge and skills further
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