In integral calculus, an elliptic integral is one of a number of related functions defined as the value of certain integrals, which were first studied...

 Complete Elliptic integral of  τ 1 X 1 ′ =  Complete Elliptic integral of  1 − τ 1 2 X 2 =  Complete Elliptic integral of  τ 2 X 2 ′ =  Complete Elliptic integral...

named elliptic functions because they come from elliptic integrals. Those integrals are in turn named elliptic because they first were encountered for the...

In mathematics, the Jacobi elliptic functions are a set of basic elliptic functions. They are found in the description of the motion of a pendulum, as...

to proceed to calculate the elliptic integral. Given Eq. 3 and the Legendre polynomial solution for the elliptic integral: K ( k ) = π 2 ∑ n = 0 ∞ ( (...

to integrals that generalise the elliptic integrals to all curves over the complex numbers. They include for example the hyperelliptic integrals of type...

using the Arctangent Integral, also called Inverse Tangent Integral. The same procedure also works for the Complete Elliptic Integral of the second kind...

/2}{\sqrt {1-x\sin ^{2}\theta }}\ d\theta ,} known as the complete elliptic integral of the second kind, the perimeter can be expressed in terms of that...

which has genus zero: see elliptic integral for the origin of the term. However, there is a natural representation of real elliptic curves with shape invariant...

S2CID 125063457. Prasolov, V.; Solovyev, Y. (1997). Elliptic Functions and Elliptic Integrals. American Mathematical Society. pp. 58–60. ISBN 0-8218-0587-8...

of elliptic integrals are a canonical set of three elliptic integrals to which all others may be reduced. Legendre chose the name elliptic integrals because...

{\displaystyle {\sqrt {1-x^{4}}}} (elliptic integral) 1 ln ⁡ x {\displaystyle {\frac {1}{\ln x}}} (logarithmic integral) e − x 2 {\displaystyle e^{-x^{2}}}...

quickly, it provides an efficient way to compute elliptic integrals, which are used, for example, in elliptic filter design. The arithmetic–geometric mean...

by an incomplete elliptic integral of the second kind, the arc length of a spherical conic is given by an incomplete elliptic integral of the third kind...

latitude μ, are unrestricted. The above integral is related to a special case of an incomplete elliptic integral of the third kind. In the notation of the...

forms: as a relation between complete elliptic integrals, or as a relation between periods and quasiperiods of elliptic functions. The two forms are equivalent...

mathematics, the Carlson symmetric forms of elliptic integrals are a small canonical set of elliptic integrals to which all others may be reduced. They are...

multivalued function of z {\displaystyle z} . Abelian integrals are natural generalizations of elliptic integrals, which arise when F ( x , w ) = w 2 − P ( x )...

Elliptic functions: The inverses of elliptic integrals; used to model double-periodic phenomena. Jacobi's elliptic functions Weierstrass's elliptic functions...

with coefficients in finite fields, which amounts to counting integral points on an elliptic curve. An unfinished chapter, consisting of work done during...

using elliptic integrals and jacobi elliptic functions. Smith uses the third fast Jacobi elliptic function estimation algorithm found in the elliptic functions...

input x is a non-integer value. Ascending factorial Cahen–Mellin integral Elliptic gamma function Lemniscate constant Pseudogamma function Hadamard's...

circumference of an ellipse can be expressed exactly in terms of the complete elliptic integral of the second kind. More precisely, C e l l i p s e = 4 a ∫ 0 π /...

is a mapping of the parameters of an elliptic integral, useful for the efficient numerical evaluation of elliptic functions. It was originally due to John...

{x^{n+2}+1}}}\,\mathrm {d} x} In the following some Elliptic Integral Singular Values are derived: The elliptic nome function has these important values: q (...

yksikäsitteisyys (The single-valuedness of the inverse function of the elliptic integral of the first kind). His dissertation was the first and still is the...

lemniscate leads to elliptic integrals, as was discovered in the eighteenth century. Around 1800, the elliptic functions inverting those integrals were studied...

{\displaystyle \operatorname {E} (\varphi ,k)} is the incomplete elliptic integral of the second kind with modulus k {\displaystyle k} . It cannot be...

one of the Jacobi elliptic functions and K(m) is the complete elliptic integral of the first kind; both are dependent on the elliptic parameter m. The...

function is an inverse function of an integral function. Elliptic functions are the inverse functions of elliptic integrals. In particular, let: u ( z ) = ∫...