Pagina:Werkecarlf03gausrich.djvu/159

Generaliter autem pro quovis valore ipsius ${\displaystyle {z}}$ habemus

[41]	${\displaystyle \Pi (k,z+1)=\Pi (k,z)\cdot {\frac {1+z}{1+{\frac {1+z}{k}}}}}$
[42]	${\displaystyle \Pi (k+1,z)=\Pi (k,z)\cdot \left\{{\frac {\left(1+{\frac {1}{k}}\right)^{z+1}}{1+{\frac {1+z}{k}}}}\right\}}$

adeoque, quum ${\displaystyle \Pi (1,z)={\frac {1}{z+1}},}$

[43]	${\displaystyle \Pi (k,z)={\frac {1}{z+1}}\cdot {\frac {2^{z+1}}{1^{z}\cdot (2+z)}}\cdot {\frac {3^{z+1}}{2^{z}(3+z)}}\cdot {\frac {4^{z+1}}{3^{z}(4+z)}}\cdots {\frac {k^{z+1}}{(k-1)^{z}(k+z)}}}$

Imprimis vero attentione dignus est limes, ad quem pro valore dato ipsius ${\displaystyle z}$ functio ${\displaystyle \Pi (k,z)}$ continuo converget, dum ${\displaystyle k}$ in infinitum crescit. Sit primo ${\displaystyle h}$ valor finitus ipsius ${\displaystyle k}$ maior quam ${\displaystyle z,}$ patetque, si ${\displaystyle k}$ transire supponatur ex ${\displaystyle h}$ in ${\displaystyle h+1,}$ logarithmum ipsius ${\displaystyle \Pi (k,z)}$ accipere incrementum, quod per seriem convergentem sequentem exprimatur

${\displaystyle {\frac {z(1+z)}{2(h+1)^{2}}}+{\frac {z(1-zz)}{3(h+1)^{3}}}+{\frac {z(1+z^{3})}{4(h+1)^{4}}}+{\frac {z(1-z^{4})}{5(h+1)^{5}}}+{\text{etc.}}}$

Si itaque ${\displaystyle k}$ e valore ${\displaystyle h}$ transit in ${\displaystyle h+n,}$ logarithmus ipsius ${\displaystyle \Pi (k,z)}$ accipiet incrementum

${\displaystyle {\begin{alignedat}{3}&&&{\tfrac {1}{2}}z(1+z)&\left({\frac {1}{(h+1)^{2}}}+{\frac {1}{(h+2)^{2}}}+{\frac {1}{(h+3)^{2}}}+{\text{etc.}}+{\frac {1}{(h+n)^{2}}}\right)\\&+&{\tfrac {1}{3}}&z(1-zz)&\left({\frac {1}{(h+1)^{3}}}+{\frac {1}{(h+2)^{3}}}+{\frac {1}{(h+3)^{3}}}+{\text{etc.}}+{\frac {1}{(h+n)^{3}}}\right)\\&+&{\tfrac {1}{4}}&z(1+z^{3})&\left({\frac {1}{(h+1)^{4}}}+{\frac {1}{(h+2)^{4}}}+{\frac {1}{(h+3)^{4}}}+{\text{etc.}}+{\frac {1}{(h+n)^{4}}}\right)\\&+&&{\text{etc.}}&\end{alignedat}}}$

quod semper finitum manere, etiamsi ${\displaystyle n}$ in infinitum crescat, facile demonstrari potest. Quare nisi iam in ${\displaystyle \Pi (h,z)}$ factor infinitus affuerit, i. e nisi ${\displaystyle z}$ sit numerus integer negativus, limes ipsius ${\displaystyle \Pi (k,z)}$ pro ${\displaystyle k=\infty }$ certo erit quantitas finita. Manifesto itaque ${\displaystyle \Pi (\infty ,z)}$ tantummodo a ${\displaystyle z}$ pendet, sive functionem ipsius ${\displaystyle z}$ ex asse determinatam exhibet, quae abhinc simpliciter per ${\displaystyle \Pi z}$ denotabitur. Definimus itaque functionem ${\displaystyle \Pi z}$ per valorem producti

${\displaystyle {\frac {1\;.\;2\;.\;3\;.\ldots .\;k\;.\;k^{z}}{(z+1)(z+2)(z+3)\ldots (z+k)}}}$