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Posted (edited)

 Some more information :

 

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This problem refers to the classical occupancy problem (Boltzmann-Maxwell statistics): that is, r balls are distributed among n cells and each of the [math] n^{r} [/math] possible distributions has probability [math]n^{-r}[/math]

Edited by Dhamnekar Win,odd
Posted (edited)

Corrected equation (1) [math] A(r, n+1)= \displaystyle\sum_{k=1}^{r} \binom{r}{k} A(r-k, n)[/math]

Corrected equation (2) [math] A(r, n) = \displaystyle\sum_{v=0}^{n} (-1)^v\binom{n}{v}(n-v)^r[/math]

 

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Then the author W. Feller says to replace in the second sum v + 1 by a new index of summation and use important property of binomial theorem which I wrote in my original question 

Edited by Dhamnekar Win,odd

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