Is it true that$\int_{k-1}^{k} \log (x)dx < \log (k)< \int_{k}^{k+1} \log (x)dx$ can you prove me that? I need this to prove Stirling.
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Is it true that$\int_{k-1}^{k} \log (x)dx < \log (k)< \int_{k}^{k+1} \log (x)dx$ can you prove me that? I need this to prove Stirling.