Pagina:Werkecarlf03gausrich.djvu/364

14.

E combinatione aequationum 20, 21, 22 cum aequationibus art. 5 obtinemus:

${\displaystyle {\begin{aligned}&at(A-a\cos E)=\alpha G-\alpha ^{\prime }G^{\prime }\cos T-\alpha ^{\prime \prime }G^{\prime \prime }\sin T\\&bt(B-b\sin E)=\beta G-\beta ^{\prime }G^{\prime }\cos T-\beta ^{\prime \prime }G^{\prime \prime }\sin T\end{aligned}}}$

Statuendo itaque brevitatis gratia

${\displaystyle {\begin{aligned}(\alpha G-\alpha ^{\prime }G^{\prime }\cos T-\alpha ^{\prime \prime }G^{\prime \prime }\sin T)(\gamma -e\alpha +(\gamma ^{\prime }-e\alpha ^{\prime })\cos T+(\gamma ^{\prime \prime }-e\alpha ^{\prime \prime })\sin T)&=aX\\(\beta G-\beta ^{\prime }G^{\prime }\cos T-\beta ^{\prime \prime }G^{\prime \prime }\sin T)(\gamma -e\alpha +(\gamma ^{\prime }-e\alpha ^{\prime })\cos T+(\gamma ^{\prime \prime }-e\alpha ^{\prime \prime })\sin T)&=bY\\C(\gamma +\gamma ^{\prime }\cos T+\gamma ^{\prime \prime }\sin T)(\gamma -e\alpha +(\gamma ^{\prime }-e\alpha ^{\prime })\cos T+(\gamma ^{\prime \prime }-e\alpha ^{\prime \prime })\sin T)&=Z\end{aligned}}}$

fit

${\displaystyle \operatorname {d} \xi ={\frac {\varepsilon X\operatorname {d} T}{2\pi t^{3}\rho ^{3}}},\quad }$${\displaystyle \operatorname {d} \eta ={\frac {\varepsilon Y\operatorname {d} T}{2\pi t^{3}\rho ^{3}}},\quad }$${\displaystyle \operatorname {d} \zeta ={\frac {\varepsilon Z\operatorname {d} T}{2\pi t^{3}\rho ^{3}}}}$

Sed habetur

${\displaystyle t\rho =\pm {\sqrt {G+G^{\prime }\cos T^{2}+G^{\prime \prime }\sin T^{2}}}}$

signo superiore vel inferiore valente, prout ${\displaystyle t}$ est quantitas positiva vel negativa (${\displaystyle \rho }$ enim natura sua semper positive accipitur), i.e. prout coëfficiens ${\displaystyle \gamma }$ est positivus vel negativus. Hinc

${\displaystyle {\frac {\varepsilon \operatorname {d} T}{2\pi t^{3}\rho ^{3}}}=\pm {\frac {\operatorname {d} T}{2\pi (G+G^{\prime }\cos T^{2}+G^{\prime \prime }\sin T^{2})^{\frac {3}{2}}}}}$

ubi signum ambiguum a signo quantitatis ${\displaystyle \gamma \varepsilon }$ pendet.

Ut iam valores ipsarum ${\displaystyle \xi ,}$ ${\displaystyle \eta ,}$ ${\displaystyle \zeta }$ obtineamus, integrationes differentialium exsequi oportet, a valore ipsius ${\displaystyle T,}$ cui respondet ${\displaystyle E=0,}$ usque ad valorem, cui respondet ${\displaystyle E=360^{\circ },}$ sive etiam (quod manifesto eodem redit) a valore ipsius ${\displaystyle T,}$ cui respondet valor arbitrarius ipsius ${\displaystyle E,}$ usque ad valorem, cui respondet valor ipsius ${\displaystyle E}$ auctus ${\displaystyle 360^{\circ };}$ licebit itaque integrare a ${\displaystyle T=0}$ usque ad ${\displaystyle T=360^{\circ },}$ quoties ${\displaystyle \varepsilon \gamma }$ est quantitas positiva, vel a ${\displaystyle T=360^{\circ }}$ usque ad ${\displaystyle T=0,}$ quoties ${\displaystyle \varepsilon \gamma }$ est negativa. Manifesto itaque, independenter a signo ipsius ${\displaystyle \varepsilon \gamma ,}$ erit:

${\displaystyle {\begin{aligned}&\xi =\int {\frac {X\operatorname {d} T}{2\pi (G+G^{\prime }\cos T^{2}+G^{\prime \prime }\sin T^{2})^{\frac {3}{2}}}}\\&\eta =\int {\frac {Y\operatorname {d} T}{2\pi (G+G^{\prime }\cos T^{2}+G^{\prime \prime }\sin T^{2})^{\frac {3}{2}}}}\\&\zeta =\int {\frac {Z\operatorname {d} T}{2\pi (G+G^{\prime }\cos T^{2}+G^{\prime \prime }\sin T^{2})^{\frac {3}{2}}}}\end{aligned}}}$

integrationibus a ${\displaystyle T=0}$ usque ad ${\displaystyle T=360^{\circ }}$ extensis.