90.39 On a family of polynomials

“…with integer coefficients, where n = 0,1,2, ... . In [2] two formulae for these polynomials are proved. The first is the recurrence formula fp"(t)dt = -ft (9) forn = 1,2,3... .…”

“…The first few non-zero Bernoulli numbers are Bo = 1, B\ ~ -, Bo = -, BA = ,5fi = -, Bs = , It is proved in[2] that the n th derivative of the function (1) is…”

93.12 Some integral representations for Bernoulli numbers

“…with integer coefficients, where n = 0,1,2, ... . In [2] two formulae for these polynomials are proved. The first is the recurrence formula fp"(t)dt = -ft (9) forn = 1,2,3... .…”

“…The first few non-zero Bernoulli numbers are Bo = 1, B\ ~ -, Bo = -, BA = ,5fi = -, Bs = , It is proved in[2] that the n th derivative of the function (1) is…”

93.12 Some integral representations for Bernoulli numbers

“…The polynomial, of order 5is known in the literature as the derivative polynomial. It can be proved (see [8]) that all…”

Logistic Function as a Tool of Planning

“…Independently the formula has been considered and proved, with a proof based on generating functions, by Franssens [10] (see also [17]). If a function x(t) satisfies equation (16), then the nth derivative of x(t) can be expressed by the following formula:…”

“…In the paper [17] (see also [4], [5], [10]) it is proved that the polynomials Q n (x) can be expressed in terms of the Stirling numbers of the second kind n k (number of the ways of partitioning a set of n elements into k nonempty subsets, see Graham et al [11]), namely…”

On some expansions for the Euler Gamma function and the Riemann Zeta function