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Elliptic Integrals
Description
Elliptic integrals are integrals of the form
with R a rational function and y a polynomial of degree 3 or 4. This is the algebraic form of an elliptic integral. There are also trig forms (rational functions of sin and cos and a square root of a quadratic polynomial in sin and cos) and hyperbolic trig forms.
Elliptic integrals are reduced to their Legendre normal form in terms of elementary functions and the Elliptic functions EllipticF, EllipticE, and EllipticPi (or their complete versions).
Examples
Elementary answer
Symbolic parameters
Answer as sum of roots
Can evaluate to floating point:
Trig form
Indefinite trig form
Check answer:
See Also
EllipticE, EllipticF, EllipticPi
References
Labahn, G., and Mutrie, M. "Reduction of Elliptic Integrals to Legendre Normal Form." University of Waterloo Tech Report 97-21, Department of Computer Science, 1997.
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