Abstract
In this paper, we study solution and periodic nature of the following difference equations
x(n+1) = x(n-1)x(n-5/)x(n-3)(+/- 1 +/- x(n-1)x(n-5)), n = 0,1,..,
where the initial conditions x(-5), x(-4), x(-3), x(-2), x(-1), xo are arbitrary positive real numbers. we studied the equilibrium points of the given equation. Some qualitative properties such as the global stability, and the periodic character of the solutions in each case have been studied. We presented some numerical examples by using random initial values and the coefficients of each case. Some figures have been given to explain the behavior of the obtained solutions by using MATLAB to confirm the obtained results. (C)2016 All rights reserved.