Bivariate Interpolation in Rectangular Form

Daw San San Nwe; Daw Hla Yin Moe; Daw Zin Nwe Khaing

doi:10.32628/IJSRSET207270

Bivariate Interpolation in Rectangular Form

Authors

Daw San San Nwe Faculty of Computing, University of Computer Studies, Taungoo, Bago Region, Myanmar
Daw Hla Yin Moe Faculty of Computing, University of Computer Studies, Taungoo, Bago Region, Myanmar
Daw Zin Nwe Khaing Faculty of Computing, University of Computer Studies, Taungoo, Bago Region, Myanmar

DOI:

https://doi.org//10.32628/IJSRSET207270

Keywords:

Four-Points-of-Fit, Six-Points-of–Fit And Mn-Points-of-Fit, Interpolation, Approximation.

Abstract

The purpose of this paper is to derive lagrange interpolation formula for a single variable and two independent variables. Firstly, single variable interpolation is derived and then two independent variable interpolation derived. Some practical problems are computed by virtue of these interpolation formula.

References

Demidovitch B. P. and Maron I. A., “Computational Mathematics”, Mir Publisher Co., New York, 1962..
Ralston A., “A First Course in Numerical Analysis”, McGraw Hill Book Company, New York, 1965

International Journal of Scientific Research in Science, Engineering and Technology

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Published

2020-04-30

Issue

Volume 7, Issue 2, March-April-2020

Section

Research Articles

License

This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

[1]

Daw San San Nwe, Daw Hla Yin Moe, Daw Zin Nwe Khaing, " Bivariate Interpolation in Rectangular Form, International Journal of Scientific Research in Science, Engineering and Technology(IJSRSET), Print ISSN : 2395-1990, Online ISSN : 2394-4099, Volume 7, Issue 2, pp.329-335, March-April-2020. Available at doi : https://doi.org/10.32628/IJSRSET207270