Numerical Integration on several real variables

Authors

  • Saumya Ranjan Jena Department of Mathematics, School of Applied Sciences,\\ Kalinga Institute of Industrial Technology(KIIT) Deemed to be University\\ Bhubaneswar-751024,Odisha,India
  • Sunita Kumari Nayak Department of Mathematics, School of Applied Sciences,\\ Kalinga Institute of Industrial Technology(KIIT) Deemed to be University\\ Bhubaneswar-751024,Odisha,India
  • Prasanta Kumar Mohanty Department of Mathematics, School of Applied Sciences,\\ Kalinga Institute of Industrial Technology(KIIT) Deemed to be University\\ Bhubaneswar-751024,Odisha,India
  • Narmada Behera Department of Mathematics, School of Applied Sciences,\\ Kalinga Institute of Industrial Technology(KIIT) Deemed to be University\\ Bhubaneswar-751024,Odisha,India
  • Seenith Sivasundaram College of Science, Engineering and Math, Daytona Beach, Florida, 32114-3099, USA
  • Utkal Keshari Dutta Department of Mathematics, School of Applied Sciences,\\ Kalinga Institute of Industrial Technology(KIIT) Deemed to be University\\ Bhubaneswar-751024,Odisha,India
  • Satya Kumar Misra Department of Mathematics, School of Applied Sciences,\\ Kalinga Institute of Industrial Technology(KIIT) Deemed to be University\\ Bhubaneswar-751024,Odisha,India

Abstract

In this manuscript we have evaluated the approximate value of numerical integrals involving more than one real variables.The multiple integrals of a bounded function for n-real variables is evaluated using $(1+2^{n}+n2^{n-1})$ points rule of precision five.Numerical examples are taken to obtain the theoretical satisfaction.

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Published

03/01/2025

Issue

Vol. 16 No. 1 (2025): Mathematics in Science, Engineering, and Aerospace (MESA)

Section

Articles