In this paper, we deal with the osicllatory and asymptotic properties of the solutions for the neutral delay differential equations d/(dt)[x(t)+p(t)x(t-τ)]-Q(t)x(t-σ(t))=0,t≥t0 and d/(dt)[x(t)+p(t)x(t-τ(t))]-Q(t)f(x(t-σ(t)))=0,t≥t0,where p(t)∈C([t0,+∞,R),Q(t)∈C([t0,+∞),R+),τ(t),σ(t)∈C([t0,+∞),R+), f∈C(R,R),f(u)u>0(u≠0). Some sufficient Conditions which keep all the boundedsolutions oscillating and all the solutions tending to zero or±∞(as t→+∞) are obtained. |