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11: 11.3 Graphics

See accompanying text — Figure 11.3.2: $\mathbf{K}_{\nu}\left(x\right)$ for $0<x\leq 16$ and $\nu=0,\frac{1}{2},1,\frac{3}{2},2,3$ . Magnify

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See accompanying text — Figure 11.3.4: $\mathbf{K}_{\nu}\left(x\right)$ for $0<x\leq 16$ and $\nu=-4,-3,-2,-1,0$ . … Magnify

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See accompanying text — Figure 11.3.14: $\mathbf{M}_{\nu}\left(x\right)$ for $0\leq x\leq 16$ and $\nu=0,\frac{1}{2},1,\frac{3}{2},2,3$ . Magnify

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See accompanying text — Figure 11.3.16: $\mathbf{M}_{\nu}\left(x\right)$ for $0<x\leq 16$ and $\nu=-3,-2,-\frac{3}{2},-1,-\frac{1}{2}$ . Magnify

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12: 11.15 Approximations

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MacLeod (1993) gives Chebyshev-series expansions for $\mathbf{L}_{0}\left(x\right)$ , $\mathbf{L}_{1}\left(x\right)$ , $0\leq x\leq 16$ , and $I_{0}\left(x\right)-\mathbf{L}_{0}\left(x\right)$ , $I_{1}\left(x\right)-\mathbf{L}_{1}\left(x\right)$ , $x\geq 16$ ; the coefficients are to 20D.

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13: 6.13 Zeros

6.13.2

c_{k},s_{k}\sim\alpha+\frac{1}{\alpha}-\frac{16}{3}\frac{1}{\alpha^{3}}+\frac{% 1673}{15}\frac{1}{\alpha^{5}}-\frac{5\;07746}{105}\frac{1}{\alpha^{7}}+\cdots,

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Symbols:: $\sim$ : Poincaré asymptotic expansion, $c_{k}$ : zeros of $\operatorname{Ci}\left(x\right)$ and $s_{k}$ : zeros of $\operatorname{Si}\left(x\right)$
Referenced by:: §6.13, §6.18(iii)
Permalink:: http://dlmf.nist.gov/6.13.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §6.13 and Ch.6

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14: 10.70 Zeros

10.70.1

\frac{\mu-1}{16t}+\frac{\mu-1}{32t^{2}}+\frac{(\mu-1)(5\mu+19)}{1536t^{3}}+% \frac{3(\mu-1)^{2}}{512t^{4}}+\dotsi.

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Defines:: $f(t)$ : function (locally)
A&S Ref:: 9.10.35
Referenced by:: §10.70
Permalink:: http://dlmf.nist.gov/10.70.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §10.70 and Ch.10

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15: 23.19 Interrelations

23.19.1

\lambda\left(\tau\right)=16\left(\frac{{\eta}^{2}\left(2\tau\right)\eta\left(% \tfrac{1}{2}\tau\right)}{{\eta}^{3}\left(\tau\right)}\right)^{8},

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Symbols:: $\eta\left(\NVar{\tau}\right)$ : Dedekind’s eta function (or Dedekind modular function), $\lambda\left(\NVar{\tau}\right)$ : elliptic modular function and $\tau$ : complex variable
Permalink:: http://dlmf.nist.gov/23.19.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §23.19 and Ch.23

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16: Richard A. Askey

16 Generalized Hypergeometric Functions & Meijer G-Function

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17: Bille C. Carlson

… â–ºDepartment of Energy) at Iowa State University, Ames, Iowa, until his death on August 16, 2013. …

18: 23.17 Elementary Properties

23.17.4

\lambda\left(\tau\right)=16q(1-8q+44q^{2}+\cdots),

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Symbols:: $\lambda\left(\NVar{\tau}\right)$ : elliptic modular function, $q$ : nome and $\tau$ : complex variable
Permalink:: http://dlmf.nist.gov/23.17.E4
Encodings:: pMML, png, TeX
See also:: Annotations for §23.17(ii), §23.17 and Ch.23

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23.17.7

\lambda\left(\tau\right)=16q\prod_{n=1}^{\infty}\left(\frac{1+q^{2n}}{1+q^{2n-% 1}}\right)^{8},

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Symbols:: $\lambda\left(\NVar{\tau}\right)$ : elliptic modular function, $q$ : nome, $n$ : integer and $\tau$ : complex variable
Permalink:: http://dlmf.nist.gov/23.17.E7
Encodings:: pMML, png, TeX
See also:: Annotations for §23.17(iii), §23.17 and Ch.23

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19: 27.2 Functions

Table 27.2.2: Functions related to division.

â–º â–º â–º â–º â–º â–º â–º â–º

$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$
1	1	1	1	14	6	4	24	27	18	4	40	40	16	8	90
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3	2	2	4	16	8	5	31	29	28	2	30	42	12	8	96
4	2	3	7	17	16	2	18	30	8	8	72	43	42	2	44
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6	2	4	12	19	18	2	20	32	16	6	63	45	24	6	78
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8	4	4	15	21	12	4	32	34	16	4	54	47	46	2	48
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20: 22.10 Maclaurin Series

22.10.2

\operatorname{cn}\left(z,k\right)=1-\frac{z^{2}}{2!}+\left(1+4k^{2}\right)% \frac{z^{4}}{4!}-\left(1+44k^{2}+16k^{4}\right)\frac{z^{6}}{6!}+O\left(z^{8}% \right),

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Symbols:: $O\left(\NVar{x}\right)$ : order not exceeding, $\operatorname{cn}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $!$ : factorial (as in $n!$ ), $z$ : complex and $k$ : modulus
A&S Ref:: 16.22.2
Permalink:: http://dlmf.nist.gov/22.10.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §22.10(i), §22.10 and Ch.22

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22.10.3

\operatorname{dn}\left(z,k\right)=1-k^{2}\frac{z^{2}}{2!}+k^{2}\left(4+k^{2}% \right)\frac{z^{4}}{4!}-k^{2}\left(16+44k^{2}+k^{4}\right)\frac{z^{6}}{6!}+O% \left(z^{8}\right).

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Symbols:: $O\left(\NVar{x}\right)$ : order not exceeding, $\operatorname{dn}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $!$ : factorial (as in $n!$ ), $z$ : complex and $k$ : modulus
A&S Ref:: 16.22.3
Permalink:: http://dlmf.nist.gov/22.10.E3
Encodings:: pMML, png, TeX
See also:: Annotations for §22.10(i), §22.10 and Ch.22

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