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With the aid of the simple identity \begin{equation*} \sum_{k=0}^{n}\binom{n+k}{k}\frac{1}{2^{k}}=2^n \end{equation*} in Item (1.79) on page 35 of the monograph R. Sprugnoli, Riordan Array Proofs of ...

As usual, denote $[n]_q=1+q+\cdots+q^{n-1}=\frac{\,\,1-q^n}{1-q}$ and $[n]_q!=[1]_q[2]_q\cdots[n]_q$. Furthermore, we write $$\binom{n}k_q=\frac{[n]_q!}{[k]_q!\cdot[n-k]_q!}.$$ As a follow up on this ...

I like the following binomial identity in that the RHS extracts the indeterminate $w$ from the LHS. Question. Can you show that $$\sum_{k=0}^n\binom{x+kw}k\binom{y-kw}{n-k}=\sum_{k=0}^n\binom{x+y-...