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<math>\log_ab=\frac{\log_cb}{\log_ca}=\frac{\ln{b}}{\ln{a}}</math> | <math>\log_ab=\frac{\log_cb}{\log_ca}=\frac{\ln{b}}{\ln{a}}</math> | ||
| − | Once you convert the format over to a fraction of natural logs, the problem is much easier. | + | Once you convert the format over to a fraction of natural logs, the problem is much easier. [[User:Jhunsber|Jhunsber]] |
Latest revision as of 03:54, 7 October 2008
I can't get anywhere on number 2. Idryg 21:44, 6 October 2008 (UTC)
- Number 2 is the one with $ \log_a2 $ and you have to find $ \lim_{a\to\inf}\log_a2 $ and other limits as a approaches different values.
Remember the change of base formula. Then this problem is a cinch.
$ \log_ab=\frac{\log_cb}{\log_ca}=\frac{\ln{b}}{\ln{a}} $
Once you convert the format over to a fraction of natural logs, the problem is much easier. Jhunsber
