Numerical calculation of double integrals with non-rectangular regions

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Publicación 1. Vol 6. Num 3.1 (Español (España)) HTML (Español (España)) EPUB (Español (España)) FLIP (Español (España))
Published: Aug 15, 2023
DOI: https://doi.org/10.33262/concienciadigital.v6i3.1.2641
Keywords:
Double integrals; numerical approximation; non-rectangular regions.

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Rómel Manolo Insuasti Castelo
Escuela Superior Politécnica de Chimborazo (ESPOCH)
Javier Roberto Mendoza Castillo
Escuela Superior Politécnica de Chimborazo (ESPOCH)

Abstract

Introduction. - In Mathematical Analysis, integrals are sometimes difficult to solve by integration methods, for this reason it is necessary to think of numerical methods to solve them, if these are definite integrals, even more so when it comes to double integrals. Objective: The ability to solve these integrals depends a lot on the solution knowledge and experience, for this reason the present study presents an alternative solution by numerical methods. Methodology: A double integral conceptually calculates the volume bounded by a surface over a region, the region may be rectangular or non-rectangular. The present study solves the type of indifferently, for which partitions are made along x and y of the region, thus showing a mesh within points (x,y) of the region, which are evaluated in the function f(x,y), which represents the surface, Results: with these values the integral is solved horizontally using the Simpson method and with the result of these it is solved vertically with the same method, obtaining the result of the double integral with excellent precision, Conclusions: a method of calculating double integrals  is then proposed with numerical calculation for rectangular or non-rectangular regions.

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How to Cite
Insuasti Castelo, R. M., & Mendoza Castillo, J. R. (2023). Numerical calculation of double integrals with non-rectangular regions. ConcienciaDigital, 6(3.1), 6-20. https://doi.org/10.33262/concienciadigital.v6i3.1.2641
Issue
Vol. 6 No. 3.1 (2023): Investigación Formativa
Section
Artículos

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