By means of Riccati transformation technique, we establish some new oscillation criteria for the second-order Emden-Fowler delay dynamic equations ( r x Δ ) Δ ( t ) + p ( t ) x γ ( τ ( t ) ) = 0 on a time scale 𝕋 ; here γ is a quotient of odd positive integers with r and p as real-valued positive rd-continuous functions defined on 𝕋 . Our results in this paper not only extend the results given in Agarwal et al. (2005), Akin-Bohner et al. (2007) and Han et al. (2007) but also unify the results about oscillation of the second-order Emden-Fowler delay differential equation and the second-order Emden-Fowler delay difference equation.