Pagina:Werkecarlf03gausrich.djvu/164

[57]	${\displaystyle {\frac {n^{nz}\Pi z.\Pi (z-{\frac {1}{n}}).\Pi (z-{\frac {2}{n}})\ldots \ldots \Pi (z-{\frac {n-1}{n}})}{\Pi nz}}={\frac {(2\pi )^{{\frac {1}{2}}(n-1)}}{\sqrt {n}}}}$

27.

Integrale ${\displaystyle \int x^{\lambda -1}(1-x^{\mu })^{\nu }\operatorname {d} x,}$ ita acceptum, ut evanescat pro ${\displaystyle x=0,}$ exprimitur per seriem sequentem, siquidem ${\displaystyle \lambda ,}$ ${\displaystyle \mu }$ sunt quantitates positivae:

${\displaystyle {\frac {x^{\lambda }}{\lambda }}-{\frac {\nu x^{\mu +\lambda }}{\mu +\lambda }}+{\frac {\nu (\nu -1)x^{2\mu +\lambda }}{1.2.(2\mu +\lambda )}}-{\text{etc.}}={\frac {x^{\lambda }}{\lambda }}F\left(-\nu ,{\frac {\lambda }{\mu }},{\frac {\lambda }{\mu }}+1,x^{\mu }\right)}$

Hinc ipsius valor pro ${\displaystyle x=1}$ erit

${\displaystyle ={\frac {\Pi {\frac {\lambda }{\mu }}.\Pi \nu }{\lambda \Pi ({\frac {\lambda }{\mu }}+v)}}}$

Ex hoc theoremate omnes relationes, quas ill. Euler olim multo labore evolvit, sponte demanant. Ita e.g. statuendo

${\displaystyle \int {\frac {\operatorname {d} x}{\sqrt {(1-x^{4})}}}=A,\quad \int {\frac {xx\operatorname {d} x}{\sqrt {(1-x^{4})}}}=B}$

erit ${\displaystyle A={\tfrac {\Pi {\frac {1}{4}}.\Pi (-{\frac {1}{2}})}{\Pi (-{\frac {1}{4}})}},}$ ${\displaystyle B={\tfrac {\Pi {\frac {3}{4}}.\Pi (-{\frac {1}{2}})}{3\Pi {\frac {1}{4}}}}={\tfrac {\Pi (-{\frac {1}{4}}).\Pi (-{\frac {1}{2}})}{4\Pi {\frac {1}{4}}}},}$ adeoque ${\displaystyle AB={\tfrac {1}{4}}\pi .}$ Simul hinc sequitur, quoniam ${\displaystyle \Pi {\tfrac {1}{4}}.\Pi (-{\tfrac {1}{4}})={\tfrac {{\frac {1}{4}}\pi }{\sin {\frac {1}{4}}\pi }}={\frac {\pi }{\sqrt {8}}},}$

${\displaystyle \Pi {\tfrac {1}{4}}={\sqrt[{4}]{{\tfrac {1}{8}}\pi AA}}={\sqrt[{4}]{\frac {\pi ^{3}}{128BB}}},\quad \Pi (-{\tfrac {1}{4}})={\sqrt[{4}]{\frac {\pi ^{3}}{8AA}}}={\sqrt[{4}]{2\pi BB}}}$

Valor numericus ipsius ${\displaystyle A,}$ computante Stirling, habetur ${\displaystyle =1{,}3110287771\,4605987,}$ valor ipsius ${\displaystyle B,}$ secundum eundem auctorem, ${\displaystyle =0{,}5990701173\,6779611,}$ ex nostro calculo, artificio peculiari innixo, ${\displaystyle =0{,}5990701173\,6779610372.}$

Generaliter facile ostendi potest, valorem functionis ${\displaystyle \Pi {z},}$ si ${\displaystyle z}$ sit quantitas rationalis ${\displaystyle ={\tfrac {m}{\mu }},}$ denotantibus ${\displaystyle m,}$ ${\displaystyle \mu }$ integros, ex ${\displaystyle \mu -1}$ valoribus determinatis talium integralium pro ${\displaystyle x=1}$ deduci posse, et quidem permultis modis diversis. Accipiendo enim pro ${\displaystyle \lambda }$ numerum integrum atque pro ${\displaystyle \nu }$ fractionem, cuius denominator ${\displaystyle =\mu ,}$ valor illius integralis semper reducitur ad tres ${\displaystyle \Pi z,}$ ubi ${\displaystyle z}$ est fractio cum denominatore ${\displaystyle =\mu ;}$ quodvis vero huiusmodi ${\displaystyle \Pi z}$ vel ad ${\displaystyle \Pi (-{\tfrac {1}{\mu }}),}$ vel ad ${\displaystyle \Pi (-{\tfrac {2}{\mu }}),}$ vel ad ${\displaystyle \Pi (-{\tfrac {3}{\mu }})}$ etc. vel ad ${\displaystyle \Pi (-{\tfrac {\mu -1}{\mu }})}$ reduci potest per formulam 45, siquidem ${\displaystyle z}$ revera est fractio; si enim ${\displaystyle z}$ est integer, ${\displaystyle \Pi {z}}$ per se constat. Ex illis vero integralium valoribus, generaliter loquendo, quodvis ${\displaystyle \Pi (-{\tfrac {m}{\mu }}),}$