Pagina:Werkecarlf03gausrich.djvu/169

32.

Formula 55 nobis suppeditat ${\displaystyle \log \Pi (-z)+\log \Pi (z-1)=\log \pi -\log \sin z\pi ,}$ unde fit per differentiationem

[68]	${\displaystyle \Psi (-z)-\Psi (z-1)=\pi \operatorname {cotang} z\pi }$

Et quum e definitione functionis ${\displaystyle \Psi }$ generaliter habeatur

[69]	${\displaystyle \Psi x-\Psi y=-{\frac {1}{x+1}}+{\frac {1}{y+1}}-{\frac {1}{x+2}}+{\frac {1}{y+2}}-{\frac {1}{x+3}}+}$ etc.

oritur series nota

${\displaystyle \pi {\text{ cotang }}z\pi ={\frac {1}{z}}-{\frac {1}{1-z}}+{\frac {1}{1+z}}-{\frac {1}{2-z}}+{\frac {1}{2+z}}-{\frac {1}{3-z}}+}$ etc.

Simili modo e differentiatione formulae 57 prodit

[70]	${\displaystyle \Psi z+\Psi (z-{\tfrac {1}{n}})+\Psi (z-{\tfrac {2}{n}})+}$ etc. ${\displaystyle +\Psi (z-{\tfrac {n-1}{n}})=n\Psi nz-n\log n}$

adeoque statuendo ${\displaystyle z=0}$

[71]	${\displaystyle \Psi (-{\tfrac {1}{n}})+\Psi (-{\tfrac {2}{n}})+\Psi (-{\tfrac {3}{n}})+}$ etc. ${\displaystyle +\Psi (-{\tfrac {n-1}{n}})=(n-1)\Psi 0-n\log n}$

Ita e.g. habetur

${\displaystyle \Psi (-{\tfrac {1}{2}})=\Psi 0-2\log 2=-1,9635100260\;\;2142347944\;\;099,}$ unde porro

${\displaystyle \qquad \qquad \Psi {\tfrac {1}{2}}=+0,0364899739\;\;7857652055\;\;901.}$

33.

Sicuti in art. praec. ${\displaystyle \Psi (-{\tfrac {1}{2}})}$ ad ${\displaystyle \Psi 0}$ et logarithmum reduximus, ita generaliter ${\displaystyle \Psi (-{\tfrac {m}{n}}),}$ designantibus ${\displaystyle m,n}$ integros, quorum minor ${\displaystyle m,}$ ad ${\displaystyle \Psi 0}$ et logarithmos reducemus. Statuamus ${\displaystyle {\tfrac {2\pi }{n}}=\omega ,}$ sitque ${\displaystyle \varphi }$ alicui angulorum ${\displaystyle \omega ,}$ ${\displaystyle 2\omega ,}$ ${\displaystyle 3\omega \ldots (n-1)\omega }$ aequalis; unde ${\displaystyle 1=\cos n\varphi =\cos 2n\varphi =\cos 3n\varphi }$ etc., ${\displaystyle \cos \varphi =\cos(n+1)\varphi =\cos(n+2)\varphi }$ etc., ${\displaystyle \cos 2\varphi =\cos(n+2)\varphi }$ etc., nec non ${\displaystyle \cos \varphi +\cos 2\varphi +\cos 3\varphi +}$ etc. ${\displaystyle +\cos(n-1)\varphi +1=0.}$ Habemus itaque

${\displaystyle \cos \varphi .\Psi {\tfrac {1-n}{n}}=-n\cos \varphi +\cos \varphi .\log 2-{\tfrac {n}{n+1}}\cos(n+1)\varphi +\cos \varphi .\log {\tfrac {3}{2}}-}$ etc.
${\displaystyle \cos 2\varphi .\Psi {\tfrac {2-n}{n}}=-{\tfrac {n}{2}}\cos 2\varphi +\cos 2\varphi .\log 2-{\tfrac {n}{n+2}}\cos(n+2)\varphi +\cos 2\varphi .\log {\tfrac {3}{2}}-}$etc.

${\displaystyle \cos 3\varphi .\Psi {\tfrac {3-n}{n}}=-{\tfrac {n}{3}}\cos 3\varphi +\cos 3\varphi .\log 2-{\tfrac {n}{n+3}}\cos(n+3)\varphi +\cos 3\varphi .\log {\tfrac {3}{2}}-}$etc.

etc. usque ad