# Double redirects

This page lists pages that redirect to other redirect pages.
Each row contains links to the first and second redirect, as well as the target of the second redirect, which is usually the "real" target page to which the first redirect should point.
~~Crossed out~~ entries have been solved.

Showing below up to **19** results in range #**1** to #**19**.

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- Airy functions → Airy → Airy Bi
- Associated Laguerre polynomials → Associated Laguerre → Associated Laguerre L
- Bessel function → Bessel → Bessel J
- Bessel functions → Bessel → Bessel J
- Leonard Lewin/Polylogarithms and Associated Functions → Book:Leonard Lewin/Polylogarithms and Associated Functions → Book:Leonard Lewin/Polylogarithms and Associated Functions/Second Edition
- Book:Milton Abramowitz/Handbook of Mathematical Functions → Book:Milton Abramowitz/Handbook of mathematical functions with formulas, graphs, and mathematical tables → Book:Milton Abramowitz/Handbook of mathematical functions
- Ei(-x)=-Integral from x to infinity of e^(-t)/t dt → Ei(-x)=-Integral from -x to infinity of e^(-t)/t dt → Ei(x)=-Integral from -x to infinity of e^(-t)/t dt
- Gamma-Sine Relation → Euler's reflection formula for gamma → Gamma(z)Gamma(1-z)=pi/sin(pi z)
- Exponential integral → Exponential integral E sub n → Exponential integral E
- Faber functions → Faber function F1 → Faber F1
- Hermite polynomial → Hermite polynomial (probabilist) → Hermite (probabilist)
- Generalized hypergeometric function → Hypergeometrc pFq → Hypergeometric pFq
- Klein's j-invariant → Klein's invariant J → Klein invariant J
- Logarithm (multivalued) of a positive integer power function → Logarithm (multivalued) of positive integer exponents → Relationship between logarithm (multivalued) and positive integer exponents
- Mobius function → Möbius function → Möbius
- Polygamma functions → Polygamma function → Polygamma
- Relationship between Bessel I sub n and Bessel J sub n → Relationship between Bessel I sub n and Bessel J → Relationship between Bessel I and Bessel J
- Taylor series of log(z) → Taylor series of log(z) for Re(z) greater than 1/2 → Series for log(z) for Re(z) greater than 1/2
- Talk:Klein's j-invariant → Talk:Klein's invariant J → Talk:Klein invariant J