Misplaced Pages

Napierian logarithm: Difference between revisions

Article snapshot taken from Wikipedia with creative commons attribution-sharealike license. Give it a read and then ask your questions in the chat. We can research this topic together.
Browse history interactively← Previous editContent deleted Content addedVisualWikitext
Revision as of 09:10, 30 September 2008 editMalcolma (talk | contribs)Autopatrolled, Extended confirmed users, Pending changes reviewers145,247 editsm cat← Previous edit Latest revision as of 13:24, 13 October 2023 edit undoSkynxnex (talk | contribs)Extended confirmed users, New page reviewers, Pending changes reviewers, Rollbackers25,885 edits Undid revision 1179895041 by 2601:642:4600:3F80:7C5B:ED3B:67BE:2F38 (talk): even if it's functionally the same as the natural logarithm, it is independently discussed in sources to likely merit an articleTags: Removed redirect Undo 
(52 intermediate revisions by 32 users not shown)
Line 1: Line 1:
]
The term '''Napierian logarithm''', or Naperian logarithm, is often used to mean the ], but as first defined by ], it is a function which can be defined in terms of the modern ] by:
]'']]
The term '''Napierian logarithm''' or '''Naperian logarithm''', named after ], is often used to mean the ]. Napier did not introduce this ''natural'' logarithmic function, although it is named after him.<ref>{{cite book |last1=Larson |first1=Ron |last2=Hostetler |first2=Robert P. |last3=Edwards |first3=Bruce H. |year=2008 |title=Essential Calculus Early Transcendental Functions |publisher=Richard Stratton |isbn=978-0-618-87918-2 |location=U.S.A |pages=119}}</ref><ref name=Hobson>{{Citation|author=Ernest William Hobson|title=John Napier and the Invention of Logarithms, 1614|year=1914|publisher=The University Press|location=Cambridge|url=https://jscholarship.library.jhu.edu/bitstream/handle/1774.2/34187/31151005337641.pdf}}</ref>
However, if it is taken to mean the "]s" as originally produced by Napier, it is a function given by (in terms of the modern ]):
: <math>\mathrm{NapLog}(x) = -10^7 \ln (x/10^7) </math>


The Napierian logarithm satisfies identities quite similar to the modern logarithm, such as<ref>{{cite web|last1=Roegel|first1=Denis|title=Napier's ideal construction of the logarithms|url=https://hal.inria.fr/inria-00543934/document|website=HAL|publisher=INRIA|accessdate=7 May 2018}}</ref>
]
: <math>\mathrm{NapLog}(xy) \approx \mathrm{NapLog}(x)+\mathrm{NapLog}(y)-161180956</math>
or
:<math>\mathrm{NapLog}(xy/10^7) = \mathrm{NapLog}(x)+\mathrm{NapLog}(y) </math>


In Napier's 1614 '']'', he provides tables of logarithms of sines for 0 to 90°, where the values given (columns 3 and 5) are
<math>\mathrm{NapLog}(x) = \frac{\log \frac{10^7}{x}}{\log \frac{10^7}{10^7 - 1}}.</math>


: <math>\mathrm{NapLog}(\theta) = -10^7 \ln (\sin(\theta)) </math>
(Being a quotient of logarithms, the base of the logarithm chosen is irrelevant.)


== Properties ==
It is not a logarithm to any particular base in the modern sense of the term, however, it can be rewritten as:


Napier's "logarithm" is related to the ] by the relation
<math>\mathrm{NapLog}(x) = \log_{\frac{10^7}{10^7 - 1}} 10^7 - \log_{\frac{10^7}{10^7 - 1}} x</math>


: <math>\mathrm{NapLog} (x) \approx 10000000 (16.11809565 - \ln x)</math>
and hence it is a linear function of a particular logarithm, and so satisfies identities quite similar to the modern one.


The Napierian logarithm is related to the ] by the relation and to the ] by


<math>\mathrm{NapLog} (x) \approx 9999999.5 (16.11809565 - \ln(x))</math> : <math>\mathrm{NapLog} (x) \approx 23025851 (7 - \log_{10} x).</math>


Note that
and to the ] by


<math>\mathrm{NapLog} (x) \approx 23025850 (7 - \log_{10}(x))</math>. : <math>16.11809565 \approx 7 \ln \left(10\right) </math>


and
]


: <math>23025851 \approx 10^7 \ln (10).</math>
{{math-stub}}

Napierian logarithms are essentially natural logarithms with decimal points shifted 7 places rightward and with sign reversed. For instance the logarithmic values

:<math>\ln(.5000000) = -0.6931471806</math>
:<math>\ln(.3333333) = -1.0986123887</math>

would have the corresponding Napierian logarithms:

:<math>\mathrm{NapLog}(5000000) = 6931472</math>
:<math>\mathrm{NapLog}(3333333) = 10986124</math>

For further detail, see ].

==References==
{{Reflist}}
*{{citation
| last1 = Boyer
| first1 = Carl B.
| last2 = Merzbach
| first2 = Uta C.
| author2-link = Uta Merzbach
| isbn = 978-0-471-54397-8
| page =
| publisher = Wiley
| title = A History of Mathematics
| year = 1991
| url-access = registration
| url = https://archive.org/details/historyofmathema00boye/page/313
}}.
*{{cite book|author=C.H.Jr. Edwards|title=The Historical Development of the Calculus|url=https://books.google.com/books?id=ilrlBwAAQBAJ&q=napier+logarithm|date=6 December 2012|publisher=Springer Science & Business Media|isbn=978-1-4612-6230-5}}.
*{{citation
| last = Phillips
| first = George McArtney
| isbn = 978-0-387-95022-8
| page =
| publisher = Springer-Verlag
| series = CMS Books in Mathematics
| title = Two Millennia of Mathematics: from Archimedes to Gauss
| volume = 6
| year = 2000
| url = https://archive.org/details/twomillenniaofma0000phil/page/61
}}.

==External links==
* Denis Roegel (2012) , from the Loria Collection of Mathematical Tables.

]

Latest revision as of 13:24, 13 October 2023

A plot of the Napierian logarithm for inputs between 0 and 10.
The 19 degree pages from Napier's 1614 table of logarithms of trigonometric functions Mirifici Logarithmorum Canonis Descriptio

The term Napierian logarithm or Naperian logarithm, named after John Napier, is often used to mean the natural logarithm. Napier did not introduce this natural logarithmic function, although it is named after him. However, if it is taken to mean the "logarithms" as originally produced by Napier, it is a function given by (in terms of the modern natural logarithm):

N a p L o g ( x ) = 10 7 ln ( x / 10 7 ) {\displaystyle \mathrm {NapLog} (x)=-10^{7}\ln(x/10^{7})}

The Napierian logarithm satisfies identities quite similar to the modern logarithm, such as

N a p L o g ( x y ) N a p L o g ( x ) + N a p L o g ( y ) 161180956 {\displaystyle \mathrm {NapLog} (xy)\approx \mathrm {NapLog} (x)+\mathrm {NapLog} (y)-161180956}

or

N a p L o g ( x y / 10 7 ) = N a p L o g ( x ) + N a p L o g ( y ) {\displaystyle \mathrm {NapLog} (xy/10^{7})=\mathrm {NapLog} (x)+\mathrm {NapLog} (y)}

In Napier's 1614 Mirifici Logarithmorum Canonis Descriptio, he provides tables of logarithms of sines for 0 to 90°, where the values given (columns 3 and 5) are

N a p L o g ( θ ) = 10 7 ln ( sin ( θ ) ) {\displaystyle \mathrm {NapLog} (\theta )=-10^{7}\ln(\sin(\theta ))}

Properties

Napier's "logarithm" is related to the natural logarithm by the relation

N a p L o g ( x ) 10000000 ( 16.11809565 ln x ) {\displaystyle \mathrm {NapLog} (x)\approx 10000000(16.11809565-\ln x)}

and to the common logarithm by

N a p L o g ( x ) 23025851 ( 7 log 10 x ) . {\displaystyle \mathrm {NapLog} (x)\approx 23025851(7-\log _{10}x).}

Note that

16.11809565 7 ln ( 10 ) {\displaystyle 16.11809565\approx 7\ln \left(10\right)}

and

23025851 10 7 ln ( 10 ) . {\displaystyle 23025851\approx 10^{7}\ln(10).}

Napierian logarithms are essentially natural logarithms with decimal points shifted 7 places rightward and with sign reversed. For instance the logarithmic values

ln ( .5000000 ) = 0.6931471806 {\displaystyle \ln(.5000000)=-0.6931471806}
ln ( .3333333 ) = 1.0986123887 {\displaystyle \ln(.3333333)=-1.0986123887}

would have the corresponding Napierian logarithms:

N a p L o g ( 5000000 ) = 6931472 {\displaystyle \mathrm {NapLog} (5000000)=6931472}
N a p L o g ( 3333333 ) = 10986124 {\displaystyle \mathrm {NapLog} (3333333)=10986124}

For further detail, see history of logarithms.

References

  1. Larson, Ron; Hostetler, Robert P.; Edwards, Bruce H. (2008). Essential Calculus Early Transcendental Functions. U.S.A: Richard Stratton. p. 119. ISBN 978-0-618-87918-2.
  2. Ernest William Hobson (1914), John Napier and the Invention of Logarithms, 1614 (PDF), Cambridge: The University Press
  3. Roegel, Denis. "Napier's ideal construction of the logarithms". HAL. INRIA. Retrieved 7 May 2018.

External links

Category: