DLMF: Untitled Document

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22.12.1

\tau=i{K^{\prime}}\left(k\right)/K\left(k\right),

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Symbols:: ${K^{\prime}}\left(\NVar{k}\right)$ : Legendre’s complementary complete elliptic integral of the first kind, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\mathrm{i}$ : imaginary unit, $k$ : modulus and $\tau$ : ratio
Permalink:: http://dlmf.nist.gov/22.12.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §22.12 and Ch.22

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22.12.2

2Kk\operatorname{sn}\left(2Kt,k\right)=\sum_{n=-\infty}^{\infty}\frac{\pi}{% \sin\left(\pi(t-(n+\frac{1}{2})\tau)\right)}=\sum_{n=-\infty}^{\infty}\left(% \sum_{m=-\infty}^{\infty}\frac{(-1)^{m}}{t-m-(n+\frac{1}{2})\tau}\right),

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Symbols:: $\operatorname{sn}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $\pi$ : the ratio of the circumference of a circle to its diameter, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\sin\NVar{z}$ : sine function, $k$ : modulus and $\tau$ : ratio
Referenced by:: §22.12, §22.12
Permalink:: http://dlmf.nist.gov/22.12.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §22.12 and Ch.22

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22.12.8

2K\operatorname{dc}\left(2Kt,k\right)=\sum_{n=-\infty}^{\infty}\frac{\pi}{\sin% \left(\pi(t+\frac{1}{2}-n\tau)\right)}=\sum_{n=-\infty}^{\infty}\left(\sum_{m=% -\infty}^{\infty}\frac{(-1)^{m}}{t+\frac{1}{2}-m-n\tau}\right),

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Symbols:: $\operatorname{dc}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $\pi$ : the ratio of the circumference of a circle to its diameter, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\sin\NVar{z}$ : sine function, $k$ : modulus and $\tau$ : ratio
Permalink:: http://dlmf.nist.gov/22.12.E8
Encodings:: pMML, png, TeX
See also:: Annotations for §22.12 and Ch.22

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22.12.11

2K\operatorname{ns}\left(2Kt,k\right)=\sum_{n=-\infty}^{\infty}\frac{\pi}{\sin% \left(\pi(t-n\tau)\right)}=\sum_{n=-\infty}^{\infty}\left(\sum_{m=-\infty}^{% \infty}\frac{(-1)^{m}}{t-m-n\tau}\right),

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Symbols:: $\operatorname{ns}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $\pi$ : the ratio of the circumference of a circle to its diameter, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\sin\NVar{z}$ : sine function, $k$ : modulus and $\tau$ : ratio
Permalink:: http://dlmf.nist.gov/22.12.E11
Encodings:: pMML, png, TeX
See also:: Annotations for §22.12 and Ch.22

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22.12.12

2K\operatorname{ds}\left(2Kt,k\right)=\sum_{n=-\infty}^{\infty}\frac{(-1)^{n}% \pi}{\sin\left(\pi(t-n\tau)\right)}=\sum_{n=-\infty}^{\infty}\left(\sum_{m=-% \infty}^{\infty}\frac{(-1)^{m+n}}{t-m-n\tau}\right),

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Symbols:: $\operatorname{ds}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $\pi$ : the ratio of the circumference of a circle to its diameter, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\sin\NVar{z}$ : sine function, $k$ : modulus and $\tau$ : ratio
Permalink:: http://dlmf.nist.gov/22.12.E12
Encodings:: pMML, png, TeX
See also:: Annotations for §22.12 and Ch.22

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$l, m, n$	nonnegative integers.
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… ►All derivatives are denoted by differentials, not by primes. …

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29.10.2

z^{\prime}=\mathrm{i}(z-K-\mathrm{i}{K^{\prime}}),

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Symbols:: ${K^{\prime}}\left(\NVar{k}\right)$ : Legendre’s complementary complete elliptic integral of the first kind, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\mathrm{i}$ : imaginary unit, $z$ : complex variable and $k$ : real parameter
Permalink:: http://dlmf.nist.gov/29.10.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §29.10 and Ch.29

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23.7.1

\wp\left(\tfrac{1}{2}\omega_{1}\right)=e_{1}+\sqrt{(e_{1}-e_{3})(e_{1}-e_{2})}% =e_{1}+\omega_{1}^{-2}(K\left(k\right))^{2}k^{\prime},

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Symbols:: $\wp\left(\NVar{z}\right)$ (= $\wp\left(z|\mathbb{L}\right)$ = $\wp\left(z;g_{2},g_{3}\right)$ ): Weierstrass $\wp$ -function, $e_{\NVar{j}}$ : Weierstrass lattice roots, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\mathbb{L}$ : lattice, $\omega_{1}$ , $\omega_{3}$ , $\omega_{2}=-\omega_{1}-\omega_{3}$ : lattice generators, $k$ : modulus and $k^{\prime}$ : complementary modulus
A&S Ref:: 18.3.18
Permalink:: http://dlmf.nist.gov/23.7.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §23.7 and Ch.23

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23.7.2

\wp\left(\tfrac{1}{2}\omega_{2}\right)=e_{2}-i\sqrt{(e_{1}-e_{2})(e_{2}-e_{3})% }=e_{2}-i\omega_{1}^{-2}(K\left(k\right))^{2}kk^{\prime},

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Symbols:: $\wp\left(\NVar{z}\right)$ (= $\wp\left(z|\mathbb{L}\right)$ = $\wp\left(z;g_{2},g_{3}\right)$ ): Weierstrass $\wp$ -function, $e_{\NVar{j}}$ : Weierstrass lattice roots, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\mathrm{i}$ : imaginary unit, $\mathbb{L}$ : lattice, $\omega_{1}$ , $\omega_{3}$ , $\omega_{2}=-\omega_{1}-\omega_{3}$ : lattice generators, $k$ : modulus and $k^{\prime}$ : complementary modulus
A&S Ref:: 18.3.18
Permalink:: http://dlmf.nist.gov/23.7.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §23.7 and Ch.23

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23.7.3

\wp\left(\tfrac{1}{2}\omega_{3}\right)=e_{3}-\sqrt{(e_{1}-e_{3})(e_{2}-e_{3})}% =e_{3}-\omega_{1}^{-2}(K\left(k\right))^{2}k,

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Symbols:: $\wp\left(\NVar{z}\right)$ (= $\wp\left(z|\mathbb{L}\right)$ = $\wp\left(z;g_{2},g_{3}\right)$ ): Weierstrass $\wp$ -function, $e_{\NVar{j}}$ : Weierstrass lattice roots, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\mathbb{L}$ : lattice, $\omega_{1}$ , $\omega_{3}$ , $\omega_{2}=-\omega_{1}-\omega_{3}$ : lattice generators and $k$ : modulus
A&S Ref:: 18.3.18
Permalink:: http://dlmf.nist.gov/23.7.E3
Encodings:: pMML, png, TeX
See also:: Annotations for §23.7 and Ch.23

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§19.5 Maclaurin and Related Expansions

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19.5.5

q=\exp\left(-\pi{K^{\prime}}\left(k\right)/K\left(k\right)\right)=r+8r^{2}+84r% ^{3}+992r^{4}+\cdots,

r=\frac{1}{16}k^{2}

,

0\leq k\leq 1

.

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Symbols:: $\pi$ : the ratio of the circumference of a circle to its diameter, ${K^{\prime}}\left(\NVar{k}\right)$ : Legendre’s complementary complete elliptic integral of the first kind, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $\exp\NVar{z}$ : exponential function, $q$ : nome and $k$ : real or complex modulus
Referenced by:: §19.5
Permalink:: http://dlmf.nist.gov/19.5.E5
Encodings:: pMML, png, TeX
See also:: Annotations for §19.5 and Ch.19

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19.5.9

E\left(k\right)=K\left(k\right)+\frac{2\pi^{2}}{K\left(k\right)}\,\frac{\sum_{% n=1}^{\infty}(-1)^{n}n^{2}q^{n^{2}}}{1+2\sum_{n=1}^{\infty}(-1)^{n}q^{n^{2}}},

|q|<1

.

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Symbols:: $\pi$ : the ratio of the circumference of a circle to its diameter, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $E\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the second kind, $q$ : nome, $n$ : nonnegative integer and $k$ : real or complex modulus
Referenced by:: §19.5, §19.5
Permalink:: http://dlmf.nist.gov/19.5.E9
Encodings:: pMML, png, TeX
See also:: Annotations for §19.5 and Ch.19

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See accompanying text — Figure 29.13.5: $\mathit{uE}^{m}_{4}\left(x,0.1\right)$ for $-2K\leq x\leq 2K$ , $m=0,1,2$ . $K=1.61244\dotsc$ . Magnify

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§19.14 Reduction of General Elliptic Integrals

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19.14.1

\int_{1}^{x}\frac{\,\mathrm{d}t}{\sqrt{t^{3}-1}}=3^{-1/4}F\left(\phi,k\right),

\cos\phi=\dfrac{\sqrt{3}+1-x}{\sqrt{3}-1+x}

,

k^{2}=\dfrac{2-\sqrt{3}}{4}

.

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Symbols:: $\cos\NVar{z}$ : cosine function, $\,\mathrm{d}\NVar{x}$ : differential of $x$ , $F\left(\NVar{\phi},\NVar{k}\right)$ : Legendre’s incomplete elliptic integral of the first kind, $\int$ : integral, $\phi$ : real or complex argument and $k$ : real or complex modulus
Referenced by:: §19.14(i)
Permalink:: http://dlmf.nist.gov/19.14.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §19.14(i), §19.14 and Ch.19

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19.14.2

\int_{x}^{1}\frac{\,\mathrm{d}t}{\sqrt{1-t^{3}}}=3^{-1/4}F\left(\phi,k\right),

\cos\phi=\dfrac{\sqrt{3}-1+x}{\sqrt{3}+1-x}

,

k^{2}=\dfrac{2+\sqrt{3}}{4}

.

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Symbols:: $\cos\NVar{z}$ : cosine function, $\,\mathrm{d}\NVar{x}$ : differential of $x$ , $F\left(\NVar{\phi},\NVar{k}\right)$ : Legendre’s incomplete elliptic integral of the first kind, $\int$ : integral, $\phi$ : real or complex argument and $k$ : real or complex modulus
Permalink:: http://dlmf.nist.gov/19.14.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §19.14(i), §19.14 and Ch.19

… ►Legendre (1825–1832) showed that every elliptic integral can be expressed in terms of the three integrals in (19.1.2) supplemented by algebraic, logarithmic, and trigonometric functions. …

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Relation to Elliptic Integrals

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22.16.28

\mathcal{E}\left(x+K,k\right)=\mathcal{E}\left(x,k\right)+E\left(k\right)-k^{2% }\operatorname{sn}\left(x,k\right)\operatorname{cd}\left(x,k\right),

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Symbols:: $\mathcal{E}\left(\NVar{x},\NVar{k}\right)$ : Jacobi’s epsilon function, $\operatorname{cd}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $\operatorname{sn}\left(\NVar{z},\NVar{k}\right)$ : Jacobian elliptic function, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $E\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the second kind, $x$ : real and $k$ : modulus
Permalink:: http://dlmf.nist.gov/22.16.E28
Encodings:: pMML, png, TeX
See also:: Annotations for §22.16(ii), §22.16(ii), §22.16 and Ch.22

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22.16.29

\mathcal{E}\left(x+2K,k\right)=\mathcal{E}\left(x,k\right)+2E\left(k\right).

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Symbols:: $\mathcal{E}\left(\NVar{x},\NVar{k}\right)$ : Jacobi’s epsilon function, $K\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the first kind, $E\left(\NVar{k}\right)$ : Legendre’s complete elliptic integral of the second kind, $x$ : real and $k$ : modulus
Permalink:: http://dlmf.nist.gov/22.16.E29
Encodings:: pMML, png, TeX
See also:: Annotations for §22.16(ii), §22.16(ii), §22.16 and Ch.22

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Relation to the Elliptic Integral $E\left(\phi,k\right)$

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Definition

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§22.3(i) Real Variables: Line Graphs

►Line graphs of the functions

\operatorname{sn}\left(x,k\right)

,

\operatorname{cn}\left(x,k\right)

,

\operatorname{dn}\left(x,k\right)

,

\operatorname{cd}\left(x,k\right)

,

\operatorname{sd}\left(x,k\right)

,

\operatorname{nd}\left(x,k\right)

,

\operatorname{dc}\left(x,k\right)

,

\operatorname{nc}\left(x,k\right)

,

\operatorname{sc}\left(x,k\right)

,

\operatorname{ns}\left(x,k\right)

,

\operatorname{ds}\left(x,k\right)

, and

\operatorname{cs}\left(x,k\right)

for representative values of real

x

and real

k

illustrating the near trigonometric (

k=0

), and near hyperbolic (

k=1

) limits. … ►

\operatorname{sn}\left(x,k\right)

,

\operatorname{cn}\left(x,k\right)

, and

\operatorname{dn}\left(x,k\right)

as functions of real arguments

x

and

k

. … ►

§22.3(iii) Complex $z$ ; Real $k$

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§22.3(iv) Complex $k$

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►

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Legendre elliptic integrals

11—20 of 76 matching pages

11: 22.12 Expansions in Other Trigonometric Series and Doubly-Infinite Partial Fractions: Eisenstein Series

12: 19.1 Special Notation

13: 29.10 Lamé Functions with Imaginary Periods

14: 23.7 Quarter Periods

15: 19.5 Maclaurin and Related Expansions

§19.5 Maclaurin and Related Expansions

16: 29.13 Graphics

17: 19.14 Reduction of General Elliptic Integrals

§19.14 Reduction of General Elliptic Integrals

18: 22.16 Related Functions

Relation to Elliptic Integrals

Relation to the Elliptic Integral $E\left(\phi,k\right)$

Definition

19: 22.3 Graphics

§22.3(i) Real Variables: Line Graphs

§22.3(iii) Complex $z$ ; Real $k$

§22.3(iv) Complex $k$

20: 29.4 Graphics

Legendre elliptic integrals

11—20 of 76 matching pages

11: 22.12 Expansions in Other Trigonometric Series and Doubly-Infinite Partial Fractions: Eisenstein Series

12: 19.1 Special Notation

13: 29.10 Lamé Functions with Imaginary Periods

14: 23.7 Quarter Periods

15: 19.5 Maclaurin and Related Expansions

§19.5 Maclaurin and Related Expansions

16: 29.13 Graphics

17: 19.14 Reduction of General Elliptic Integrals

§19.14 Reduction of General Elliptic Integrals

18: 22.16 Related Functions

Relation to Elliptic Integrals

Relation to the Elliptic Integral E ⁡ ( ϕ , k )

Definition

19: 22.3 Graphics

§22.3(i) Real Variables: Line Graphs

§22.3(iii) Complex z ; Real k

§22.3(iv) Complex k

20: 29.4 Graphics

Relation to the Elliptic Integral $E\left(\phi,k\right)$

§22.3(iii) Complex $z$ ; Real $k$

§22.3(iv) Complex $k$