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- where $\chi$ denotes the [[Legendre chi]] function and $\mathrm{arctanh}$ denotes the [[Arctanh|inverse hyperbolic326 bytes (41 words) - 01:31, 1 July 2017
- #REDIRECT [[Derivative of Legendre chi 2]]42 bytes (5 words) - 17:48, 25 June 2017
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- ...plies to such a wide range of functions that no single source contains all of them. We aim to remedy this problem. Due to a resurgence of automated spam bots, account registration and anonymous editing is currentl26 KB (2,938 words) - 15:47, 26 August 2023
- ...hyperbolic tangent function $\mathrm{arctanh}$ is the [[inverse function]] of the [[tanh|hyperbolic tangent]] function. It may be defined by File:Arctanhplot.png|Plot of $\mathrm{arctanh}$ on $(-1,1)$.718 bytes (89 words) - 23:47, 11 December 2016
- The Legendre chi function $\chi_{\nu}$ is defined by [[Derivative of Legendre chi 2]]<br />436 bytes (59 words) - 17:48, 25 June 2017
- :::[[Taylor series of log(1-z)|$(1.2)$]] :::[[Derivative of Li 2(-1/x)|$(1.6)$]]4 KB (488 words) - 05:15, 21 January 2017
- {{Book|Lectures on the theory of elliptic functions|1910|||Harris Hancock}} :::6. Convergence of series21 KB (2,630 words) - 06:16, 25 June 2016
- #REDIRECT [[Derivative of Legendre chi 2]]42 bytes (5 words) - 17:48, 25 June 2017
- The hyperbolic cosine integral $\mathrm{Chi}$ is defined for $|\mathrm{arg}(z)| < \pi$ the formula $$\mathrm{Chi}(z)=\gamma + \log(z) + \displaystyle\int_0^z \dfrac{\cosh(t)-1}{t} \mathrm{632 bytes (84 words) - 23:57, 10 December 2016
