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International Journal of Mathematical Education in Science and Technology Volume 53, 2022 - Issue 6
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Classroom Notes

Integrating rational functions of sine and cosine using the rules of Bioche

Seán M. StewartOmegadot Education, Bomaderry, NSW 2541, AustraliaCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-7872-4493
ORCID Icon
Pages 1688-1700 | Received 25 May 2020, Published online: 21 Apr 2021

References

  • Babbitt A. (1913). The rule of Bioche and its application to the solution of trigonometric equations. School Science and Mathematics, 13(6), 480–482. https://doi.org/10.1111/j.1949-8594.1913.tb07780.x
  • Bioche C. (1902). Sur les équations trigonométriques. Journal de Mathématiques Élémentaires, 26, 105.
  • Cunningham D. W. (2018). Why does trigonometric substitution work? International Journal of Mathematical Education in Science and Technology, 49(4), 588–593. https://doi.org/10.1080/0020739X.2017.1392049
  • Edwards J. (1921). A treatise on the integral calculus with applications, examples and problems (Vol. I). MacMillan.
  • Gordon I. S., & Sorkin S. (1959). The armchair science reader. Simon and Schuster.
  • Hardy G. H. (1916). The integration of functions of a single variable. Cambridge University Press.
  • Mercier D.-J. (2006). L'Epreve d'exposé au CAPES mathématiques (Vol. II). Publibook.
  • Spivak M. (2008). Calculus (4th ed.). Publish or Perish.
  • Stewart J. (2008). Calculus (7th ed.). Brooks/Cole.
  • Stewart S. M. (2018). How to integrate it: A practical guide to finding elementary integrals. Cambridge University Press.
  • Vidiani L. G. (1976). Règles de Bioche. Revue de Mathématiques et de Sciences Physiques, 3, 1–2.
  • Zwillinger D. (1992). Handbook of integration. Jones and Bartlett.

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