Abstract
In this paper, we study asymptotic behaviour of solutions of the following higher order nonlinear dynamic equations $$y^{\triangle^n}(t)+\delta p(t)f(y(g(t)))=0$$ and $$y^{\triangle^n}(t)+\delta p(t)f(y(h(t)))=0$$ on an arbitrary time scale \(\mathbb{T}\) with \(\sup {\mathbb{T}}=\infty\), where n is a positive integer and δ=1 or −1. We obtain some sufficient conditions for the equivalence of the oscillation of the above equations.
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