On The Negative Pell Equation y2=15x2-6
Journal Title: Scholars Journal of Physics, Mathematics and Statistics - Year 2015, Vol 2, Issue 2
Abstract
The negative Pell equation represented by the binary quadratic equation is analyzed for its non-zero distinct integer solutions. A few interesting relations among the solutions are presented. Employing the solutions of the equation under consideration, the integer solutions for a few choices of hyperbola and parabola are obtained.
Authors and Affiliations
M. A Gopalan, S. Vidhyalakshmi, J. Shanthi, D. Kanaka
A Note on the Application of Wazewski’s Topological Method to an Integro- Differential Equation of Volterra Type
The purpose of this note is to generalize the Wazewski’s Topological Method 11, originally stated for ordinary differential equations, to the integro – differential equation of Volterra type (1), under suitable conditi...
Statistical Model in Data Merging
Geologists through two different kinds of instruments and equipment distribution respectively of two particle size of molecules. Based on statistical theory, this paper from three perspectives, by using the methods of re...
On Separation Properties and Spaces
The author introduces some open sets in bitopological spaces and studies some of their basic properties. Certain separation properties and obtained from standard separation by replacing open sets by –open sets in thei...
On The Ternary Quadratic Diophantine Equation x2+ y2-xy=103z2
The ternary quadratic Diophantine equation represented by is analyzed for its non-zero distinct integer solutions. A few interesting properties between the solutions and special figurate numbers are obtained.
Using the method of undetermined coefficients for solving general term formula of fractional linear recursive sequence
In this paper, using the method of undetermined coefficients, by constructing auxiliary series, fractional linear recursive sequence is derived for the general term formula of under various circumstances..