(48G/50g) Binomial Transform, Difference Table

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(48G/50g) Binomial Transform, Difference Table

01-18-2019, 08:50 PM

Post: #6

Thomas Klemm Offline

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Posts: 2,006
Joined: Dec 2013

RE: (48G/50g) Binomial Transform, Difference Table

That's just this formula for the inverse binomial transform from the linked Wikipedia article:

\(a_n=\sum_{k=0}^n {n\choose k} t_k\)

In the given example it leads to:

\(\begin{align*}
a_n&=0\binom{n}{0}+1\binom{n}{1}+2\binom{n}{2}+1\binom{n}{3}\\
&= 0+1\frac{n}{1}+2\frac{n(n-1)}{2}+1\frac{n(n-1)(n-2)}{6}\\
&=n+ n(n-1)+\frac{n(n-1)(n-2)}{6}\\
&=\frac{n(n+1)(n+2)}{6}
\end{align*}\)

This is in accordance with A000292.

Cheers
Thomas

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Messages In This Thread

(48G/50g) Binomial Transform, Difference Table - John Keith - 01-17-2019, 09:56 PM

RE: (48G/50g) Binomial Transform, Difference Table - Thomas Klemm - 01-18-2019, 05:53 AM

RE: (48G/50g) Binomial Transform, Difference Table - John Keith - 01-18-2019, 08:01 PM

RE: (48G/50g) Binomial Transform, Difference Table - Thomas Klemm - 01-18-2019, 08:14 AM

RE: (48G/50g) Binomial Transform, Difference Table - John Keith - 01-18-2019, 07:39 PM

RE: (48G/50g) Binomial Transform, Difference Table - Thomas Klemm - 01-18-2019 08:50 PM

RE: (48G/50g) Binomial Transform, Difference Table - John Keith - 01-18-2019, 09:44 PM

RE: (48G/50g) Binomial Transform, Difference Table - John Keith - 05-27-2019, 09:07 PM

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