We compute the rate of change of mass and angular momentum of a black hole, namely tidal heating, in an eccentric orbit. The change is caused due to the tidal field of the orbiting companion. We compute the result for both the spinning and non-spinning black holes in the leading order of the mean motion, namely $\xi$. We demonstrate that the rates get enhanced significantly for nonzero eccentricity. Since eccentricity in a binary evolves with time we also express the results in terms of an initial eccentricity and azimuthal frequency $\xi_{\phi}$. In the process, we developed a prescription that can be used to compute all physical quantities in a series expansion of initial eccentricity, $e_0$. These results are computed taking account of the spin of the binary components. The prescription can be used to compute very high-order corrections of initial eccentricity. We use it to find the contribution to eccentricity up to $\mathcal{O}(e_0^5)$ in the spinning binary. We also provide an approximate expression for $\mathcal{O}(e_0^n)$, where $n$ is any odd number. With this, we compute approximate expression for $\mathcal{O}(e_0^7)$ and $\mathcal{O}(e_0^9)$ for non-spinning binary. Using the computed expression of eccentricity, we derived the rate of change of mass and angular momentum of a black hole in terms of initial eccentricity and azimuthal frequency up to $\mathcal{O}(e_0^6)$.
Comment: arXiv admin note: text overlap with arXiv:1605.00304 by other authors