2025, Vol. 7, Issue 1, Part C
An introduction to mathematical bessel function of the first kind theory and its application
Author(s): Bhawana
Abstract: Bessel functions, which occur in a wide range of circumstances, are a sequence of resolution to a differential equation of the first order. This work builds the first sort of Bessel functions, investigates zeroes, and uses a series solution to a differential equation to deduce the Bessel functions. The easier said than done aspect of dealing in the midst of the Bessel performance is actually the major definition, which they discard after the method equation has been reduced to BF. It has been shown that the alternatives that are actually provided in the BDE formula are the same in both cases. We solve a few significant fractional-order equations to make obvious method's dependability, and we offer numerical consequences to reveal the method's convergence rate, applicability, and dependability.
DOI: 10.33545/27068919.2025.v7.i1c.1484Pages: 215-224 | Views: 124 | Downloads: 31Download Full Article: Click Here
How to cite this article:
Bhawana.
An introduction to mathematical bessel function of the first kind theory and its application. Int J Adv Acad Stud 2025;7(1):215-224. DOI:
10.33545/27068919.2025.v7.i1c.1484
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