Everything Is Logarithms Some connections between things, which I have not seen elsewhere. Maybe they mean something?
- The Baseless Logarithm Normally one writes a logarithm with a base, (\log_b (x)), to mean [y = \log_b (x) \Lra b^y = x]And then you can change the base of the logarithm with [\log_b (x) = \frac{\log_a (x)}{\log_a(b)}]Which follows from rearranging (\log_a (x) = \log_a (b^{\log_b x}) = \log_b (x) \times \log_a (b)). One way of thinking about what this formula does is...