This is mostly enhancing Nik Weaver's comments. Suppose that $M$ is compact of dimension $m$. For a generic metric $g$ on $M$ the eigenvalues $\lambda_k$ of the Laplacian $\Delta_g$ are simple. Weyl's spectral estimates then imply that
$$\lambda_k \sim C_m k^{\frac{2}{m}}, $$
where $C_m$ is an explicit universal constant that depends only on $m$. In particluar this shows that for $m\geq 2$ and a generic metric we have
$$\lambda_{k+1}-\lambda_k =O(1). $$
Now Nik Weaver's argument shows that there exists $r_0>0$ such for any $\xi\in [0,\infty)\setminus {\rm spec}\;(\Delta)$ we have $\Vert(R(\xi)\Vert\geq r_0$.