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We present a novel approximation algorithm for k-median that achieves an approximation guarantee of 1 + root 3 + epsilon, improving upon the decade-old ratio of 3 + epsilon. Our improved approximation ratio is achieved by exploiting the power of pseudo-approximation. More specifically, our approach is based on two components, each of which, we believe, is of independent interest. First, we show that in order to give an alpha-approximation algorithm for k-median, it is sufficient to give a pseudo-approximation algorithm that finds an alpha-approximate solution by opening k + O(1) facilities. This is a rather surprising result as there exist instances for which opening k + 1 facilities may lead to a significantly smaller cost than that of opening only k facilities. Second, we give such a pseudo-approximation algorithm with alpha = 1 + root 3 + epsilon. Prior to our work, it was not even known whether opening k + o(k) facilities would help improve the approximation ratio.