Many experimental systems can spend extended periods of time relative to their natural time scale in localized regions of phase space, transiting infrequently between them.  This display of metastability can arise in stochastically driven systems due to the presence of large energy barriers, or in deterministic systems due to the presence of narrow passages in phase space.  To investigate metastability in these different cases, we take the Langevin equation as an idealized model of a ferromagnetic system and determine the effects of small damping, small noise, and dimensionality on the dynamics and mean transition time.