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We show that the growth rates of solutions of the abstract differential equations ẋ(t) = Ax(t), $ẋ\left(t\right)=A^{-1}x\left(t\right)$, and the difference equation $x_d(n+1)=(A+I){(A-I)}^{-1}{x}_d\left(n\right)$ are closely related. Assuming that A generates an exponentially stable semigroup, we show that on a general Banach space the lowest growth rate of the semigroup ${\left(e^{A^{-1}t}\right)}_{t\ge 0}$ is O(∜t), and for $\left((A+I){(A-I)}^{-1}\right)ⁿ$ it is O(∜n). The similarity in growth holds for all Banach spaces. In particular, for Hilbert spaces the best estimates are O(log(t)) and O(log(n)), respectively. Furthermore, we give conditions...