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21: Foreword

… ►In 1964 the National Institute of Standards and Technology¹¹ 1 Then known as the National Bureau of Standards. published the Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables, edited by Milton Abramowitz and Irene A. … ►November 20, 2009 …

22: 26.5 Lattice Paths: Catalan Numbers

… ►See Table 26.5.1. ►

Table 26.5.1: Catalan numbers.

► ►►►

$n$	$C\left(n\right)$	$n$	$C\left(n\right)$	$n$	$C\left(n\right)$
…
6	132	13	7 42900	20	65641 20420

► …

23: 34.14 Tables

§34.14 Tables

►Tables of exact values of the squares of the

\mathit{3j}

and

\mathit{6j}

symbols in which all parameters are

\leq 8

are given in Rotenberg et al. (1959), together with a bibliography of earlier tables of

\mathit{3j},\mathit{6j}

, and

\mathit{9j}

symbols on pp. … ►Biedenharn and Louck (1981) give tables of algebraic expressions for Clebsch–Gordan coefficients and

\mathit{6j}

symbols, together with a bibliography of tables produced prior to 1975. … 270–289; similar tables for the

\mathit{6j}

symbols are given on pp. …Earlier tables are listed on p. …

24: 25.19 Tables

§25.19 Tables

►

•

Abramowitz and Stegun (1964) tabulates: $\zeta\left(n\right)$ , $n=2,3,4,\dots$ , 20D (p. 811); $\operatorname{Li}_{2}\left(1-x\right)$ , $x=0(.01)0.5$ , 9D (p. 1005); $f(\theta)$ , $\theta=15^{\circ}(1^{\circ})30^{\circ}(2^{\circ})90^{\circ}(5^{\circ})180^{\circ}$ , $f(\theta)+\theta\ln\theta$ , $\theta=0(1^{\circ})15^{\circ}$ , 6D (p. 1006). Here $f(\theta)$ denotes Clausen’s integral, given by the right-hand side of (25.12.9).

►

•

Morris (1979) tabulates $\operatorname{Li}_{2}\left(x\right)$ (§25.12(i)) for $\pm x=0.02(.02)1(.1)6$ to 30D.

►

•

Cloutman (1989) tabulates $\Gamma\left(s+1\right)F_{s}(x)$ , where $F_{s}(x)$ is the Fermi–Dirac integral (25.12.14), for $s=-\frac{1}{2},\frac{1}{2},\frac{3}{2},\frac{5}{2}$ , $x=-5(.05)25$ , to 12S.

►

•

Fletcher et al. (1962, §22.1) lists many sources for earlier tables of $\zeta\left(s\right)$ for both real and complex $s$ . §22.133 gives sources for numerical values of coefficients in the Riemann–Siegel formula, §22.15 describes tables of values of $\zeta\left(s,a\right)$ , and §22.17 lists tables for some Dirichlet $L$ -functions for real characters. For tables of dilogarithms, polylogarithms, and Clausen’s integral see §§22.84–22.858.

25: 26.4 Lattice Paths: Multinomial Coefficients and Set Partitions

… ►Table 26.4.1 gives numerical values of multinomials and partitions

\lambda,M_{1},M_{2},M_{3}

for

1\leq m\leq n\leq 5

. … ►

Table 26.4.1: Multinomials and partitions.

► ►►►►

$n$	$m$	$\lambda$	$M_{1}$	$M_{2}$	$M_{3}$
…
$5$	$2$	$2^{1},3^{1}$	$10$	$20$	$10$
$5$	$3$	$1^{2},3^{1}$	$20$	$20$	$10$
…

► …

26: 24.2 Definitions and Generating Functions

… ►

§24.2(iv) Tables

►

Table 24.2.1: Bernoulli and Euler numbers.

► ►►

$n$	$B_{n}$	$E_{n}$
…

► ►

Table 24.2.2: Bernoulli and Euler polynomials.

► ►►

$n$	$B_{n}\left(x\right)$	$E_{n}\left(x\right)$
…

► …

27: 26.6 Other Lattice Path Numbers

… ►See Table 26.6.1. ►

Table 26.6.1: Delannoy numbers

D(m,n)

► ►►

$m$	$n$
$m$	…

► … ►See Table 26.6.2. … ►See Table 26.6.3. … ►See Table 26.6.4. …

28: 18.41 Tables

§18.41 Tables

… ►For

P_{n}\left(x\right)

(

=\mathsf{P}_{n}\left(x\right)

) see §14.33. … ►See also Abramowitz and Stegun (1964, Tables 25.4, 25.9, and 25.10). ►

§18.41(iii) Other Tables

►For tables prior to 1961 see Fletcher et al. (1962) and Lebedev and Fedorova (1960).

29: 27.21 Tables

§27.21 Tables

… ►Table 24. 7 of Abramowitz and Stegun (1964) also lists the factorizations in Glaisher’s Table I(a); Table 24. … ►Lehmer (1941) gives a comprehensive account of tables in the theory of numbers, including virtually every table published from 1918 to 1941. … ►No sequel to Lehmer (1941) exists to date, but many tables of functions of number theory are included in Unpublished Mathematical Tables (1944). …

30: 35.11 Tables

§35.11 Tables

►Tables of zonal polynomials are given in James (1964) for

|\kappa|\leq 6

, Parkhurst and James (1974) for

|\kappa|\leq 12

, and Muirhead (1982, p. 238) for

|\kappa|\leq 5

. Each table expresses the zonal polynomials as linear combinations of monomial symmetric functions.