# DistributionContinuedFractionPackage(R, z)ΒΆ

- R: CommutativeRing
- z: Symbol

A package to compute Jacobi continued fractions of Cauchy transforms.

- JContinuedFraction: (Distribution R, UnivariatePolynomial(z, Fraction R)) -> ContinuedFraction UnivariatePolynomial(z, Fraction R) if R has IntegralDomain and R hasn’t Field
`JContinuedFraction(d, z)`

returns the Cauchy transform as a continued fraction at`z`

.

- JContinuedFraction: (Distribution R, UnivariatePolynomial(z, R)) -> ContinuedFraction UnivariatePolynomial(z, R) if R has Field
`JContinuedFraction(d, z)`

returns the Cauchy transform as a continued fraction at`z`

.