Computational Approach for Finding Pythagoras Nonagon Using Programming Language MATLAB

Authors

  • S. N. R. G. Bharat Iragavarapu  Department of Mathematics, GVP College of Engineering (Autonomous), Visakhapatnam, AP, India
  • Medapati Sai Teja  Department of Electrical and Electronics Engineering, GVP College of Engineering (Autonomous), Visakhapatnam, AP, India

Keywords:

Pythagoras Theorem, Nonagon, Pythagoras Nonagon, Natural Numbers, Programming Language

Abstract

In this paper, using computer programming language MATLAB, for any natural number n, we determine the Pythagoras nonagon (a, b, c, d, e, f, g, h, i) where h denotes the length of the hypotenuse and is ? k, when one of a, b, c, d, e, f, g or h is given, thereby the number of such Pythagoras nonagons are also known.

References

  1. S.N.R.G.Bharat Iragavarapu, B.saranya, ‘’Extension of Pythagoras Theorem using Programming Language’’, Journal of Information Technology and Sciences, Volume 3 Issue 1, Pg 1-4 , MAT Journals 2017.
  2. S.N.R.G.Bharat Iragavarapu, Computational approach for finding Pythagoras quadrilateral  (a, b, c, d), when a or b or c is given and hypotenuse d ? n, where n is a natural number’’, International Journal of Advanced Research in management Engineering and Technology, ISSN: 2456 – 2998 (Online), Volume 2, Issue 3, March 2017, pg: 512-517.  
  3. S.N.R.G.Bharat Iragavarapu, B.saranya, Computational approach for finding Pythagoras pentagon  (a, b, c, d, e), when a or b or c or d is given and hypotenuse e ? n, where n is a natural number’’, International Journal of Scientific Research and  development, ISSN: 2321 – 0613 (Online), Volume 5, Issue 5, june, 2017.
  4. S.N.R.G.Bharat Iragavarapu, k.kavya, Computational approach for finding Pythagoras hexagon  (a, b, c, d, e, f), when a or b or c or d or e  is given and hypotenuse f ? n, where n is a natural number’’, International Journal for Research in Applied Science & Engineering Technology (IJRASET), ISSN: 2321-9653; IC Value: 45.98; SJ Impact Factor:6.887, Volume 5 Issue VII, July 2017, pg: 2112-2116.
  5. S.N.R.G.Bharat Iragavarapu, K. Sai Rahul, Computational approach for finding Pythagoras heptagon  (a, b, c, d, e, f, g), when a or b or c or d or e  is given and hypotenuse f ? n, where n is a natural number’’, International Journal for Research in Applied Science & Engineering Technology (IJRASET), ISSN: 2321-9653; IC Value: 45.98; SJ Impact Factor:6.887, Volume 5 Issue VIII, August 2017, pg: 347-351.
  6. S.N.R.G.Bharat Iragavarapu, Kota Sai Amulya, Computational approach for finding Pythagoras Octagon using MATLAB, International Journal for Research in Applied Science & Engineering Technology (IJRASET), ISSN: 2321-9653; IC Value: 45.98; SJ Impact Factor:6.887 (paper submitted).

International Journal of Scientific Research in Science, Engineering and Technology

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Published

2017-10-31

Issue

Volume 3, Issue 6, September-October-2017

Section

Research Articles

License

Copyright (c) IJSRSET

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

How to Cite

[1]
S. N. R. G. Bharat Iragavarapu, Medapati Sai Teja, " Computational Approach for Finding Pythagoras Nonagon Using Programming Language MATLAB, International Journal of Scientific Research in Science, Engineering and Technology(IJSRSET), Print ISSN : 2395-1990, Online ISSN : 2394-4099, Volume 3, Issue 6, pp.344-346, September-October-2017.