Mathematical Analysis of Some Infinite Power Series

Govind Raj Naunyal; Updesh Kumar; Dinesh Verma

doi:https://doi.org/10.14445/22315373/IJMTT-V68I3P507

International Journal of Mathematics Trends and Technology

Research Article | Open Access | Download PDF

Volume 68 | Issue 3 | Year 2022 | Article Id. IJMTT-V68I3P507 | DOI : https://doi.org/10.14445/22315373/IJMTT-V68I3P507

Mathematical Analysis of Some Infinite Power Series

Govind Raj Naunyal, Updesh Kumar, Dinesh Verma

Abstract

Power series in one variable is an infinite series. It is one of the most useful types of series in analysis; it is work just as well as for complex numbers as real numbers. We can use them to define transcendental functions. In this paper, we will find the Mahgoub Transformation of some power series. The purpose of paper is to prove the applicability of Mahgoub transform to some significant infinite power series.

Keywords

Mahgoub transformation, Power series.

References

[1] Verma Dinesh, Alam Aftab, Analysis of Simultaneous Differential Equations by Elzaki Transform Approach, Science, Technology and Development. 9(1) (2020).
[2] Shrivastava Sunil, Introduction of Laplace Transform and Elzaki Transform with Application (Electrical Circuits), International Research Journal of Engineering and Technology (IRJET). 5(02) (2018).
[3] Tarig M. Elzaki, Salih M. Elzaki and Elsayed Elnour, On the New Integral Transform Elzaki Transform Fundamental Properties Investigations and Applications, Global Journal of Mathematical Sciences: Theory and Practical. 4(1) (2012).
[4] Verma Dinesh and Gupta Rohit, Laplace Transformation Approach to Infinite Series, International Journal of Advance and Innovative Research. 6(2) (2019).
[5] Verma Dinesh, Elzaki Transformation of Some Significaknt Power Series, International Journal of Advance Research and Innovative Ideas in Education. 6(1) (2020).
[6] Verma Dinesh, Aboodh Transform Approach to Power Series by, Journal of American Science (JAS). 16(7).
[7] Shiferaw Geremew Gebede, Laplace Transform of Power Series, Impact: International Journal of Research in Applied, Natural and Social Sciences, Impact: IJRANSS. 5(3) (2017) 151-156
[8] Verma Dinesh and Rahul Gupta, Delta Potential Response of Electric Network Circuit, Iconic Research and Engineering Journal (IRE). 3(8) (2020).
[9] Gupta Rohit, Verma Dinesh and Singh Amit Pal, Double Laplace Transform Approach to the Electric Transmission Line with Trivial Leakages through Electrical Insulation to the Ground, Compliance Engineering Journal. 10(12) (2019).
[10] Gupta Rohit, Gupta Rahul and Verma Dinesh, Laplace Transform Approach for the Heat Dissipation from an Infinite Fin Surface, Global Journal of Engineering Science and Researches (GJESR). 6(2) (2019).
[11] Kumar D.S, Heat and Mass Transfer, Seventh Revised Edition, Publisher: S K Kataria and Sons. (2013).
12] Nag P.K, Heat and Mass Transfer. 3rd Edition, Publisher: Tata McGraw-Hill Education Pvt. Ltd. (2011)
[13] Gupta Rohit, Singh Amit Pal, Verma Dinesh, Flow of Heat through A Plane Wall, and through a Finite Fin Insulated at the Tip, International Journal of Scientific & Technology Research. 8(10) (2019) 125-128.
[14] Gupta Rohit, Neeraj Pandita, Rahul Gupta, Heat Conducted through a Parabolic Fin Via Means of Elzaki Transform, Journal of Engineering Sciences. 11(1) (2020) 533-535.
[15] Gupta Rohit, On Novel Integral Transform: Rohit Transform and its Application to Boundary Value Problems, ASIO Journal of Chemistry, Physics, Mathematics and Applied Sciences. 4(1) (2020) 08-13.
[16] Gupta Rohit, Gupta Rahul, Matrix Method Approach for the Temperature Distribution and Heat Flow Along a Conducting Bar Connected between Two Heat Sources, Journal of Emerging Technologies and Innovative Research. 5(9) (2018) 210-214.
[17] Gupta Rohit, Gupta Rahul, Heat Dissipation from the Finite Fin Surface Losing Heat at the Tip, International Journal of Research and Analytical Reviews. 5(3) (2018) 138-143.
[18] Verma Dinesh and Singh Amit Pal, Importance of Power Series by Dinesh Verma Transform (DVT). ASIO Journal of Engineering & Technological Perspective Research (ASIO-JETPR). 5(1) (2020) 08-13.
[19] Verma Dinesh, Analytical Solutuion of Differential Equations by Dinesh Verma Tranforms (DVT), ASIO Journal of Chemistry, Physics, Mathematics & Applied Sciences (ASIO-JCPMAS). 4(1) (2020) 24-27.
[20] Verma Dinesh, Singh Amit Pal and Verma Sanjay Kumar, Scrutinize of Growth and Decay Problems by Verma DineshTranform (DVT), Iconic Research and Engineering Journals (IRE Journals). 3(12) (2020) 148-153.
[21] Verma Dinesh and Verma Sanjay Kumar, Response of Leguerre Polynomial via Dinesh Verma Tranform (DVT), EPRA International Journal of Multidisciplinary Research (IJMR). 6(6) (2020) 154-157.
[22] Verma Dinesh, Empirical Study of Higher Order Diffeential Equations with Variable Coefficient by Dinesh Verma Transformation (DVT), ASIO Journal of Engineering & Technological Perspective Research (ASIO-JETPR). 5(1) (2020) 04-07.
[23] Verma Dinesh, Putting Forward a Novel Integral Transform: Dinesh Verma Transform (DVT) and its Applications, International Journal of Scientific Research in Mathematical and Statistical Sciences. 7(2) (2020) 139-145.
[24] Verma Dinesh, Elzaki Transform Approach to Differential Equations, Academia Arena. 12(7) (2020) 01-03.
[25] Naulyal Govind Raj, Kumar Updesh and Verma Dinesh, Analysis of Uniform infinite Fin by Elzaki Transform, Compliance Engg. Journal. 13(3) (2022).
[26] Kumar Updesh, Naulyal Govind Raj and Verma Dinesh, Elzaki Transform to Diffrential Equations with Delta Function, New York Science Journal. 15(2) (2022).

Citation :

Govind Raj Naunyal, Updesh Kumar, Dinesh Verma, "Mathematical Analysis of Some Infinite Power Series," International Journal of Mathematics Trends and Technology (IJMTT), vol. 68, no. 3, pp. 33-42, 2022. Crossref, https://doi.org/10.14445/22315373/IJMTT-V68I3P507