We consider infinite-horizon $\gamma$-discounted Markov Decision Processes, for which it is known that there exists a stationary optimal policy. We consider the algorithm Value Iteration and the sequence of policies $\pi_1,\dots,\pi_k$ it implicitely generates until some iteration $k$. We provide performance bounds for non-stationary policies involving the last $m$ generated policies that reduce the state-of-the-art bound for the last stationary policy $\pi_k$ by a factor $\frac{1-\gamma}{1-\gamma^m}$. In particular, the use of non-stationary policies allows to reduce the usual asymptotic performance bounds of Value Iteration with errors bounded by $\epsilon$ at each iteration from $\frac{\gamma}{(1-\gamma)^2}\epsilon$ to $\frac{\gamma}{1-\gamma}\epsilon$, which is significant in the usual situation when $\gamma$ is close to $1$. Given Bellman operators that can only be computed with some error $\epsilon$, a surprising consequence of this result is that the problem of ''computing an approximately optimal non-stationary policy'' is much simpler than that of ''computing an approximately optimal stationary policy'', and even slightly simpler than that of ''approximately computing the value of some fixed policy'', since this last problem only has a guarantee of $\frac{1}{1-\gamma}\epsilon$.