Higher derivatives of the inverse tangent function and a summation formula involving binomial coefficients

Abstract

In 2017, O. Deiser and C. Lasser obtained an explicit formula for the n-th derivative of the inverse tangent function. We calculate this derivative by a different method based on Fa\`a di Bruno's formula. Comparing the two results leads to the following identity for binomial coefficients: Σi=m[n/2](-1)i4iimn-ii=(-1)m2nn+12m+1, where n,m∈ N0 and m≤ [n/2]. As was pointed out to the author by C. Krattenthaler, this formula is a special case of Gau's formula for the hypergeometric function 2F1.