Talk:Logarithm: Difference between revisions
imported>Catherine Woodgold (Stuff to add, possibly) |
imported>Aleksander Stos (definition) |
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*Taylor series of the natural logarithmic function (or just a link to the Taylor series page, if it give it). | *Taylor series of the natural logarithmic function (or just a link to the Taylor series page, if it give it). | ||
--[[User:Catherine Woodgold|Catherine Woodgold]] 20:33, 5 May 2007 (CDT) | --[[User:Catherine Woodgold|Catherine Woodgold]] 20:33, 5 May 2007 (CDT) | ||
== definition == | |||
The present intro (''A logarithm is a mathematical function which provides the number which would appear as the exponent in an expression'') seems to be clear only for those who already know what the logarithm is. In other words, "providing the exponent for _an_ expression" is correct but too general. I'd suggest something like this: "A logarithm is an [[elementary function|elementary mathematical function]] which is inverse to the [[exponential function]] of a given base, i.e. it returns the number which would appear as the exponent in the latter". Native speakers surely would find a better formulation. --[[User:Aleksander Stos|Aleksander Stos]] 15:31, 12 May 2007 (CDT) |
Revision as of 14:31, 12 May 2007
Workgroup category or categories | Mathematics Workgroup [Categories OK] |
Article status | Developed article: complete or nearly so |
Underlinked article? | No |
Basic cleanup done? | Yes |
Checklist last edited by | Fredrik Johansson 18:02, 28 April 2007 (CDT) |
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Logarithm article
I just wrote this today. It may be a little too elementary. I hope others will add to it and edit it. --Catherine Woodgold 17:09, 28 April 2007 (CDT)
...and check whether my math is correct (thanks, Fredrick Johansson -- and thanks again for the graph!) --Catherine Woodgold 18:44, 28 April 2007 (CDT)
Notational variants
I added a section on the different notations that are commonly used to indicate the base. It looks a little out of place where I put it, so plese move it if you think there's a better location in the article. Greg Woodhouse 22:47, 28 April 2007 (CDT)
- I see what you mean. It's not easy to find the best place for it. It could go almost anywhere, including right after the introduction, or at the end. Not between "Extension of logarithms to fractional and negative values" and "Shape of the logarithm function", though, as that would disturb the connection between those two sections. (Perhaps a sign of a well-written article would be that no two consecutive sections could have anything added between them without disturbing the flow.) Another possibility would be to combine the notational information into the introduction; yet another would be to move some of the information out of the introduction into the notational section. I've moved the notational section to be the second-last section just before the complex number section, but if someone wants to move it again, feel free. --Catherine Woodgold 08:17, 29 April 2007 (CDT)
Extension of logarithms to non-natural number exponents
Re this part: "Rules for adding and multiplying exponents were noticed, and to extend the idea to fractions and negative numbers it was assumed that the same rules would apply." This is an intuitive, non-rigourous explanation. I haven't shown that it's possible to do that in a consistent, meaningful way. I'm not sure whether I can figure out how to do it rigourously. Perhaps someone who knows how could help here. I'd like to keep the intuitively appealing explanation and either fix it up to make it rigourous, or add a rigourous explanation separately, or state that it's not rigourous and tell the reader where to find a rigourous definition/construction of logarithms in a bibliography (which I'm hoping others will eventually supply). --Catherine Woodgold 07:55, 29 April 2007 (CDT)
Stuff to add, possibly
- Use of logarithms to do multiplication using tables (or slide rules).
- Use of logarithmic scales on graphs
- Taylor series of the natural logarithmic function (or just a link to the Taylor series page, if it give it).
--Catherine Woodgold 20:33, 5 May 2007 (CDT)
definition
The present intro (A logarithm is a mathematical function which provides the number which would appear as the exponent in an expression) seems to be clear only for those who already know what the logarithm is. In other words, "providing the exponent for _an_ expression" is correct but too general. I'd suggest something like this: "A logarithm is an elementary mathematical function which is inverse to the exponential function of a given base, i.e. it returns the number which would appear as the exponent in the latter". Native speakers surely would find a better formulation. --Aleksander Stos 15:31, 12 May 2007 (CDT)
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