The dynamical scaling properties of selfavoiding polymerized membranes with internal dimension D are studied using model A dynamics. It is shown that the theory is renormalizable to all orders in perturbation theory and that the dynamical scaling exponent z is given by z=2+D/nu. This result applies especially to membranes (D=2) but also to polymers (D=1), for which this scaling relation had been suggested but not proven.