Calculation 15-Fold Integrals by Method of Optimal Coefficients for Small Values of the Numbers of Knots Quadrature Formulas

Chapter
Part of the Lecture Notes in Electrical Engineering book series (LNEE, volume 235)

Abstract

Were a founded sets optimal coefficients and is calculated importance’s 15-fold integral with small importance’s of the number of knots quadrature formulas for the reason influences of their importance on accuracy of the calculation. The revealed particularity for N < 600, concluding in forming the miscellaneous amount groups set coefficients, which give alike importance of the integral J, as well as not for all these N founded sets allow to calculate the integrals with good accuracy. It is determined that the calculation of the integral with good accuracy is possible for small values of the number of knots quadrature formulas N.

Keywords

Integral Number of knots Optimal coefficients Quadrature formula etc 

References

  1. 1.
    Korobov NM (1963) Theoretical—numbered method of approximate analysis. Physmathgyz, Moscow, RussiaGoogle Scholar
  2. 2.
    Zamanova SK (2012) Calculation tenfold integral by method of optimal coefficients with provision for numbers of knots quadrature formulas. In: Proceedings ICKIICE 2012—materials of the international conference of korea institute of information and communication engineering, vol. 5, no 1, pp 62–66. Istanbul, TurkeyGoogle Scholar

Copyright information

© Springer Science+Business Media Dordrecht 2013

Authors and Affiliations

  1. 1.Kazakh Leading Academy of Architecture and Civil EngineeringAlmatyKazakhstan

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