Abstract:In this paper, solution of the following difference equation is examined
{x_{n + 1}} = {{{x_{n - 13}}} \over {1 + {x_{n - 1}}{x_{n - 3}}{x_{n - 5}}{x_{n - 7}}{x_{n - 9}}{x_{n - 11}}}},
where the initial conditions are positive real numbers.
In this paper, we study the qualitative behavior of the rational recursive sequences where the initial conditions are arbitrary real numbers. Also, we give the numerical examples and solutions graphs of some cases of difference equations.
In this paper, we study the qualitative behavior of the rational recursive sequences where the initial conditions are arbitrary real numbers. Also, we give the numerical examples and solutions graphs of some cases of difference equations.
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