In the present work, we focus on the higher derivatives of polynomials and certain rational fractions expressed in terms of the well-known complete Bell polynomials. As consequences, we obtain explicit formulas of the higher derivatives of the binomial coefficient and its reciprocal. Our results represent a unified generalization of many previously presented works and provide a natural way to establish several new algebraic identities. Furthermore, we provide various interesting combinatorial identities involving the harmonic numbers, the generalized harmonic numbers, the Bernoulli numbers, and the Bernoulli polynomials.
Zriaa et al. (Wed,) studied this question.