About Tartaglion’s representation of planes

Blagoi N. Djokov
Notes on Number Theory and Discrete Mathematics, ISSN 1310-5132
Volume 8, 2002, Number 3, Pages 77—84
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Blagoi N. Djokov
101 Bulgaria Str, ap 1,
4003 – Plovdiv, Bulgaria

Abstract

In the paper 3 is considered, but as a special and a new commutative ring. The elements of this ring are called tartaglions. Necessary and sufficient conditions, for a plane in 3 to be representated by Cartesian tartaglion’s equation, are established.

References

  1. Postnikov, M., Analytical geometry, Nauka., Moscow, 1973 (in Russian).
  2. Atanassov K., Shannon A., Matrix-tertions and matrix-noitrets: exercises in math-ematixal enrichment. Int. J. Math. Educ. Sci. Technol, 1998, Vol. 29, No. 6, 898-903.

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APA

Djokov, B. N. (2002). About Tartaglion’s representation of planes. Notes on Number Theory and Discrete Mathematics, 8(3), 77-84.

Chicago

Djokov, B. N. “About Tartaglion’s Representation of Planes.” Notes on Number Theory and Discrete Mathematics 8, no. 3 (2002): 77-84.

MLA

Djokov, B. N. “About Tartaglion’s Representation of Planes.” Notes on Number Theory and Discrete Mathematics 8.3 (2002): 77-84. Print.

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