Online since: August 2013
P. 1
About some Transcendental Numbers
Authors: Jamel Ghanouchi
Citation: J. Ghanouchi, "About some Transcendental Numbers", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 1-4, 2013 Downloads: |
P. 5
The Reproductive Solution for Fermat’s Last Theorem (Elementary Aspect)
Authors: K. Raja Rama Gandhi, Reuven Tint
Citation: K. R. R. Gandhi and R. Tint, "The Reproductive Solution for Fermat’s Last Theorem (Elementary Aspect)", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 5-11, 2013 Downloads: |
P. 12
The Second Proof of the Fermat's Last Theorem (Elementary Aspect)
Authors: K. Raja Rama Gandhi, Reuven Tint
Citation: K. R. R. Gandhi and R. Tint, "The Second Proof of the Fermat's Last Theorem (Elementary Aspect)", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 12-16, 2013 Downloads: |
P. 17
Investigations on the Theory of Riemann Zeta Function I: New Functional Equation, Integral Representation and Laurent Expansion for Riemann’s Zeta Function
Authors: Edigles Guedes, Raja Rama Gandhi, Srinivas Kishan Anapu
Citation: E. Guedes et al., "Investigations on the Theory of Riemann Zeta Function I: New Functional Equation, Integral Representation and Laurent Expansion for Riemann’s Zeta Function", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 17-21, 2013 Downloads: |
P. 22
Are there Infinitely many Twin Primes?
Authors: Edigles Guedes, Raja Rama Gandhi, Srinivas Kishan Anapu
Citation: E. Guedes et al., "Are there Infinitely many Twin Primes?", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 22-26, 2013 Downloads: |
P. 27
Investigations on the Theory of Riemann Zeta Function II: On the Riemann-Siegel Integral and Hardy’s Z-Function
Authors: Edigles Guedes, Raja Rama Gandhi, Srinivas Kishan Anapu
Citation: E. Guedes et al., "Investigations on the Theory of Riemann Zeta Function II: On the Riemann-Siegel Integral and Hardy’s Z-Function", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 27-29, 2013 Downloads: |
P. 30
A Proof of Beal’s Conjecture
Authors: Jamel Ghanouchi
Citation: J. Ghanouchi, "A Proof of Beal’s Conjecture", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 30-34, 2013 Downloads: |
P. 35
About an even as the Sum or the Difference of Two Primes
Authors: Jamel Ghanouchi
Citation: J. Ghanouchi, "About an even as the Sum or the Difference of Two Primes", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 35-43, 2013 Downloads: |
P. 44
The Proof of the Insolubility in Natural Numbers for n>2, the Fermat's Last Theorem and Beal's Conjecture for Co-Prime Integers Arranged in a Pair A, B, D in the Equations A^{n}+B^{n}=D^{n} and A^{n}+B^{y}=D^{z} (Elementary Aspect)
Authors: K. Raja Rama Gandhi, Reuven Tint
Citation: K. R. R. Gandhi and R. Tint, "The Proof of the Insolubility in Natural Numbers for n>2, the Fermat's Last Theorem and Beal's Conjecture for Co-Prime Integers Arranged in a Pair A, B, D in the Equations A^{n}+B^{n}=D^{n} and A^{n}+B^{y}=D^{z} (Elementary Aspect)", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 44-47, 2013 Downloads: |
P. 48
Proof of Beal's Conjecture
Authors: K. Raja Rama Gandhi, Reuven Tint
Citation: K. R. R. Gandhi and R. Tint, "Proof of Beal's Conjecture", Bulletin of Mathematical Sciences and Applications, Vol. 5, pp. 48-49, 2013 Downloads: |