The central term of the binomial. With notation as in the previous problem, for each fixed n and…

The central term of the binomial. With notation as in the previous problem, for each fixed n and…

The central term of the binomial. With notation as in the previous problem, for each fixed n and p, show that there is a unique integer m such that bn(k; p) ≥ bn(k − 1; p) for all k ≤ m and show that (n + 1)p – 1

 

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