19315 Gregory Call/Daniel Velleman: Pascal's matrices. Am. Math. Monthly 100 (1993), 372-376. 29045 Silvia Casacuberta Puig: On the divisibility of binomial coefficients. Internet ca. 2019, 22p. 18980 Alan Edelman/Gilbert Strang: Pascal matrices. Am. Math. Monthly 111/3 (2004), 189-197. 29061 Tom Edgar: Proof without words - Sums of reciprocals of binomial coefficients. Math. Mag. 89 (2016), 212-213. 7748 David Fowler: The binomial coefficient function. Am. Math. Monthly (1996), 1-17. 29057 G. Goetgheluck: Computing binomial coefficients. Am. Math. Monthl 94/4 (1987), 360-365. 29064 H. Gould: A new primality criterion of Mann and Shanks and its relation to a theorem of Hermite with extension to fibonomials. Fib. Quart. 10 (1972), 355-364, 372. 29065 H. Gould: Generalization of Hermite's divisibility theorems and the Mann-Shanks primality criterion for s-fibonomial arrays. Fib. Quart. 12 (1974), 157-166. 29063 Heiko Harborth: Über ein Primzahlkriterium nach Mann und Shanks. Arch. Math. (Basel) 27 (1976), 290-294. 29055 Heiko Harborth: Divisibility of binomial coefficients by their row number. Am. Math. Monthly 84/1 (1977), 35-37. 29059 Heiko Harborth: Number of odd binomial coefficients. Proc. AMS 62/1 (1977), 19-22. 7852 Donald Knuth: Johann Faulhaber and sums of powers. Internet, ca. 1990, 22p. 26854 John Konvalina: A unified interpretation of the binomial coefficients, the Stirling numbers, and the Gaussian coefficients. Am. Math. Monthly 107/10 (2000), 901-910. 29066 Henry Mann/Daniel Shanks: A necessary and sufficient condition for primality, and its source. J. Comb. Theory A 13 (1972), 131-134. 29054 Neville Robbins: On the number of binomial coefficients which are divisible by their row number. Can. Math. Bull. 25/3 (1982), 363-365. 29056 Neville Robbins: On the number of binomial coefficients which are divisible by their row number II. Can. Math. Bull. 28/4 (1985), 481-486. 3024 R. Roy: Binomial identities and hypergeometric series. Am. Math. Monthly 94 (1987), 36-47. [3570] 29062 David Singmaster: Notes on binomial coefficients III - Any integer divides almost all binomial coefficients. J. LMS 8 (1974), 555-560. 29073 Neil Sloane a.o.: Catalan numbers. OEIS ca. 2018, 21p. 29058 Lukas Spiegelhofer/Michael Wallner: Divisibility of binomial coefficients by powers of two. Arxiv 1710.10884 (2017), 15p. 7787 Volker Strehl: Recurrences and Legendre transform. Internet 1992, 22p. Apery and Franel recurrence relations between sums of binomial numbers are conjugate via Legendre transform. 5116 Marta Sved: Divisibility - with visibility. Math. Intell. 10/2 (1988), 56-64. 18979 ZZ: Pascal matrix. Wikipedia 2007, 2p.