Stirling's approximation: Difference between revisions

Revision as of 14:48, 28 March 2007

James Stirling (1692-1770, Scotland)

\left.\ln N!\right.=\ln 1+\ln 2+\ln 3+...+\ln N=\sum _{k=1}^{N}\ln k

Because of Euler-MacLaurin formula

\sum _{k=1}^{N}\ln k=\int _{1}^{N}\ln x\,dx+\sum _{k=1}^{p}{\frac {B_{2k}}{2k(2k-1)}}\left({\frac {1}{n^{2k-1}}}-1\right)+R

where B₁ = −1/2, B₂ = 1/6, B₃ = 0, B₄ = −1/30, B₅ = 0, B₆ = 1/42, B₇ = 0, B₈ = −1/30, ... are the Bernoulli numbers, and R is an error term which is normally small for suitable values of p.

Then, for large N,

\ln N!\approx \int _{1}^{N}\ln xdx=N\ln N-N

@@ Line 9: / Line 9: @@
 where ''B''<sub>1</sub> = &minus;1/2, ''B''<sub>2</sub> = 1/6, ''B''<sub>3</sub> = 0, ''B''<sub>4</sub> = &minus;1/30, ''B''<sub>5</sub> = 0, ''B''<sub>6</sub> = 1/42, ''B''<sub>7</sub> = 0, ''B''<sub>8</sub> = &minus;1/30, ... are the [http://en.wikipedia.org/wiki/Bernoulli_numbers Bernoulli numbers], and ''R'' is an error term which is normally small for suitable values of ''p''.
-Then
+Then, for large ''N'',
-:<math>\ln N! \approx \int_1^N \ln x dx = N \ln N -N +1</math>
+:<math>\ln N! \approx \int_1^N \ln x dx = N \ln N -N</math>
-Thus, for large ''N''
-:<math>\ln N! \approx  N \ln N -N</math>
 [[Category: Mathematics]]

Stirling's approximation: Difference between revisions

Revision as of 14:48, 28 March 2007

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