Prove $\binom{n+k}{k+1}=\sum_{l=1}^n \binom{n+k-l}k$

Asked Jan 23 '20 at 00:35

Active Jan 23 '20 at 01:43

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I have to prove for (n > 0 and k >= 0, whole, non-negative numbers) that:

$$\binom{n+k}{k+1}=\sum_{l=1}^n \binom{n+k-l}k$$

Thanks for your help :)

edited Jan 23 '20 at 01:43

Ren Eh Daycart

asked Jan 23 '20 at 00:35

Klot

1

This is known as the hockey stick identity ... google it or search this site. – Donald Splutterwit Jan 23 '20 at 00:38
$l=1$ ? ....... – Donald Splutterwit Jan 23 '20 at 00:42
Yeah l=1 is right. Thats exactly what bothers me too – Klot Jan 23 '20 at 00:45

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