Numerical Differentiation and Integration

Authors

  • Dragan Obradovic Elementary school "Jovan Cvijic", Kostolac-Pozarevac, teacher of Мathematics, Serbia
  • Lakshmi Narayan Mishra Department of Mathematics, School of Advanced Sciences, Vellore Institute of Technology (VIT) University, Vellore 632 014, Tamil Nadu, India
  • Vishnu Narayan Mishra Department of Mathematics, Indira Gandhi National Tribal University, Lalpur, Amarkantak, Anuppur 484 887, Madhya Pradesh, India

DOI:

https://doi.org/10.24297/jap.v19i.8938

Keywords:

Special cases of Newton-Cotes formulas., Newton-Cotes formulas, numerical differentiation, numerical integration

Abstract

There are several reasons why numerical differentiation and integration are used. The function that integrates f (x) can be known only in certain places, which is done by taking a sample. Some supercomputers and other computer applications sometimes need numerical integration for this very reason. The formula for the function to be integrated may be known, but it may be difficult or impossible to find the antiderivation that is an elementary function. One example is the function f (x) = exp (−x2), an antiderivation that cannot be written in elementary form. It is possible to find antiderivation symbolically, but it is much easier to find a numerical approximation than to calculate antiderivation (anti-derivative). This can be used if antiderivation is given as an unlimited array of products, or if the budget would require special features that are not available to computers.

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References

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Published

2021-01-25

How to Cite

Obradovic, D. ., Narayan Mishra, . L., & Narayan Mishra, V. . (2021). Numerical Differentiation and Integration. JOURNAL OF ADVANCES IN PHYSICS, 19, 1–5. https://doi.org/10.24297/jap.v19i.8938

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