- Communications in Advanced Mathematical Sciences
- Vol: 4 Issue: 1
- On the Recursive Sequence $x_{n+1}= \frac{x_{n-29}}{1+x_{n-4}x_{n-9}x_{n-14}x_{n-19}x_{n-24}}$
On the Recursive Sequence $x_{n+1}= \frac{x_{n-29}}{1+x_{n-4}x_{n-9}x_{n-14}x_{n-19}x_{n-24}}$
Authors : Burak Oğul, Dağistan Şimşek
Pages : 46-54
Doi:10.33434/cams.814296
View : 13 | Download : 7
Publication Date : 2021-03-29
Article Type : Research
Abstract :In this paper, we are going to analyze the following difference equation $$x_{n+1}=\frac{x_{n-29}}{1+x_{n-4}x_{n-9}x_{n-14}x_{n-19}x_{n-24}} \quad n=0,1,2,...$$ where $x_{-29}, x_{-28}, x_{-27}, ..., x_{-2}, x_{-1}, x_{0} \in \left(0,\infty\right)$.Keywords : difference equation, recursive sequence, period 30 solutions