P. 1
An Elegant Proof that the Catalan’s Constant is Irrational
Authors:
Citation: "An Elegant Proof that the Catalan’s Constant is Irrational", The Bulletin of Society for Mathematical Services and Standards, Vol. 7, pp. 1-2, 2013 |
P. 3
Principal Components Analysis and Factorial Analysis to Measure Latent Variables in a Quantitative Research: A Mathematical Theoretical Approach
Authors: Arturo García-Santillán, Milka Escalera-Chávez, Francisco Venegas-Martínez
Citation: A. García-Santillán et al., "Principal Components Analysis and Factorial Analysis to Measure Latent Variables in a Quantitative Research: A Mathematical Theoretical Approach", The Bulletin of Society for Mathematical Services and Standards, Vol. 7, pp. 3-12, 2013 |
P. 13
A Conjecture about Functions
Authors: K. Prasen
Citation: K. Prasen "A Conjecture about Functions", The Bulletin of Society for Mathematical Services and Standards, Vol. 7, pp. 13-16, 2013 |
P. 17
An All-Inclusive Proof of Beal’s Conjecture
Authors:
Citation: "An All-Inclusive Proof of Beal’s Conjecture", The Bulletin of Society for Mathematical Services and Standards, Vol. 7, pp. 17-22, 2013 |
P. 23
Integer Solutions, Rational Solutions of the Equations x^{4}+y^{4}+z^{4}-2x^{2}y^{2}-2y^{2}z^{2}-2z^{2}x^{2}=n and x^{2}+y^{4}+z^{4}-2xy^{2}-2xz^{2}-2y^{2}z^{2}=n - And Crux Mathematicorum Contest Corner Problem CC24
Authors: Konstantine Zelator
Citation: K. Zelator "Integer Solutions, Rational Solutions of the Equations x^{4}+y^{4}+z^{4}-2x^{2}y^{2}-2y^{2}z^{2}-2z^{2}x^{2}=n and x^{2}+y^{4}+z^{4}-2xy^{2}-2xz^{2}-2y^{2}z^{2}=n - And Crux Mathematicorum Contest Corner Problem CC24", The Bulletin of Society for Mathematical Services and Standards, Vol. 7, pp. 23-39, 2013 |
P. 40
Notes on Bipolar-Valued Fuzzy Subgroups of a Group
Authors: M.S. Anitha, K.L. Muruganantha Prasad, K. Arjunan
Citation: M.S. Anitha et al., "Notes on Bipolar-Valued Fuzzy Subgroups of a Group", The Bulletin of Society for Mathematical Services and Standards, Vol. 7, pp. 40-45, 2013 |
P. 46
The Pythagorean Triples Whose Hypotenuse and the Sums of the Legs are Squares
Authors: K. Raja Rama Gandhi, Reuven Tint
Citation: K. R. R. Gandhi and R. Tint, "The Pythagorean Triples Whose Hypotenuse and the Sums of the Legs are Squares", The Bulletin of Society for Mathematical Services and Standards, Vol. 7, pp. 46-53, 2013 |