Pagina:Werkecarlf03gausrich.djvu/171

ultimus ${\displaystyle =\cos 2m\omega .\log(2-2\cos 2\omega )}$ etc., ita ut bini termini semper sint aequales, excepto, si ${\displaystyle n}$ est par, termino singulari ${\displaystyle \cos {\tfrac {n}{2}}.m\omega \log(2-2\cos {\tfrac {n}{2}}\omega ),}$ qui fit ${\displaystyle =+2\log 2}$ pro ${\displaystyle m}$ pari, vel ${\displaystyle =-2\log 2}$ pro ${\displaystyle m}$ impari. Combinando iam cum aequatione 73 hanc

${\displaystyle \Psi (-{\tfrac {m}{n}})-\Psi (-{\tfrac {n-m}{n}})=\pi \operatorname {cotang} {\tfrac {m}{n}}\pi }$

habemus, pro valore impari ipsius ${\displaystyle n,}$ siquidem ${\displaystyle m}$ est integer positivus minor quam ${\displaystyle n}$

[74]

${\displaystyle {\begin{aligned}\Psi (-{\tfrac {m}{n}})=&\Psi 0+{\tfrac {1}{2}}\pi \operatorname {cotang} {\tfrac {m\pi }{n}}-\log n+\cos {\tfrac {2m\pi }{n}}.\log(2-2\cos {\tfrac {2\pi }{n}})\\&+\cos {\tfrac {4m\pi }{n}}.\log(2-2\cos {\tfrac {4\pi }{n}})+\cos {\tfrac {6m\pi }{n}}.\log(2-2\cos {\tfrac {6\pi }{n}})+{\text{etc. }}\\&+\cos {\tfrac {(n-1)m\pi }{n}}.\log(2-2\cos {\tfrac {(n-1)\pi }{n}})\end{aligned}}}$

Pro valore pari ipsius ${\displaystyle n}$ autem

[75]

${\displaystyle {\begin{aligned}\Psi (-{\tfrac {m}{n}})=&\Psi 0+{\tfrac {1}{2}}\pi \operatorname {cotang} {\tfrac {m\pi }{n}}-\log n+\cos {\tfrac {2m\pi }{n}}\log(2-2\cos {\tfrac {2\pi }{n}})\\&+\cos {\tfrac {4m\pi }{n}}\log(2-2\cos {\tfrac {4\pi }{n}})+{\text{etc.}}+\cos {\tfrac {(n-2)m\pi }{n}}\log(2-2\cos {\tfrac {(n-2)\pi }{n}})\\&\pm \log 2\end{aligned}}}$

ubi signum superius valet pro ${\displaystyle m}$ pari, inferius pro impari. Ita e.g. invenitur

${\displaystyle {\begin{array}{ll}\Psi (-{\tfrac {1}{4}})=\Psi 0+{\tfrac {1}{2}}\pi -3\log 2,&\Psi (-{\tfrac {3}{4}})=\Psi 0-{\tfrac {1}{2}}\pi -3\log 2\\\Psi (-{\tfrac {1}{3}})=\Psi 0+{\tfrac {1}{2}}\pi {\sqrt {\tfrac {1}{3}}}-{\tfrac {3}{2}}\log 3,&\Psi (-{\tfrac {2}{3}})=\Psi 0-{\tfrac {1}{2}}\pi {\sqrt {\tfrac {1}{3}}}-{\tfrac {3}{2}}\log 3\end{array}}}$

Ceterum combinatis his aequationibus cum aequatione 64 sponte patet, ${\displaystyle \Psi z}$ generaliter pro quovis valore rationali ipsius ${\displaystyle z,}$ positivo seu negativo per ${\displaystyle \Psi {0}}$ atque logarithmos determinari posse, quod theorema sane maxime est memorabile.

Quum, per art. 28, ${\displaystyle \Pi \lambda }$ sit valor integralis ${\displaystyle \int y^{\lambda }e^{-y}\operatorname {d} y,}$ ab ${\displaystyle y=0}$ usque ad ${\displaystyle y=\infty ,}$ siquidem ${\displaystyle \lambda +1}$ est quantitas positiva, fit differentiando secundum ${\displaystyle \lambda }$

${\displaystyle {\frac {\operatorname {d} \Pi \lambda }{\operatorname {d} \lambda }}={\frac {\operatorname {d} \int y^{\lambda }e^{-y}\operatorname {d} y}{\operatorname {d} \lambda }}=\int y^{\lambda }e^{-y}\log y\operatorname {d} y}$

sive

[76]	${\displaystyle \Pi \lambda .\Psi \lambda =\int y^{\lambda }e^{-y}\log y.\operatorname {d} y,}$ ab ${\displaystyle y=0}$ usque ad ${\displaystyle y=\infty }$