Pagina:Werkecarlf03gausrich.djvu/360

${\displaystyle {\begin{aligned}\alpha \alpha ^{\prime }\alpha ^{\prime \prime }&={\phantom {-}}{\frac {\varepsilon aabAAB}{(G+G^{\prime })(G+G^{\prime \prime })(G^{\prime }-G^{\prime \prime })}}\\\beta \beta ^{\prime }\beta ^{\prime \prime }&=-{\frac {\varepsilon abbABB}{(G+G^{\prime })(G+G^{\prime \prime })(G^{\prime }-G^{\prime \prime })}}\\\alpha \beta &={\phantom {-}}{\frac {abAB}{(G+G^{\prime })(G+G^{\prime \prime })}}\\\alpha ^{\prime }\beta ^{\prime }&=-{\frac {abAB}{(G+G^{\prime })(G^{\prime }-G^{\prime \prime })}}\\\alpha ^{\prime \prime }\beta ^{\prime \prime }&={\phantom {-}}{\frac {abAB}{(G+G^{\prime \prime })(G^{\prime }-G^{\prime \prime })}}\end{aligned}}}$

10.

Formulae nostrae quibusdam casibus indeterminatae fieri possunt, quos seorsim considerare oportet. Ac primo quidem discutiemus casum eum, ubi aequationis cubicae radices negativae ${\displaystyle -G^{\prime },}$ ${\displaystyle -G^{\prime \prime }}$ aequales fiunt, unde, per formulas 18, 19, coëfficientes ${\displaystyle \gamma ,}$ ${\displaystyle \gamma ^{\prime \prime }}$ valores infinitos nancisci videntur, qui autem revera sunt indeterminati.

Statuendo in formula 14, ${\displaystyle g=G,}$ patet, ut duo valores ipsius ${\displaystyle x,}$ i.e. ut ${\displaystyle -G^{\prime }}$ et ${\displaystyle -G^{\prime \prime }}$ fiant aequales, necessario esse debere

${\displaystyle AB=0,\quad aa-bb-{\frac {aaAA}{aa+G}}+{\frac {bbBB}{bb+G}}=0}$

Hinc facile intelligitur, quum ${\displaystyle aa-bb}$ natura sua sit vel quantitas positiva, vel ${\displaystyle =0,}$ esse debere

${\displaystyle B=0}$

${\displaystyle aa-bb={\frac {aaAA}{aa+G}},\quad }$ sive ${\displaystyle \quad aa+G={\frac {aaAA}{aa-bb}}}$

Substituendo hos valores in aequatione 14, fit

${\displaystyle G^{\prime }=G^{\prime \prime }=bb}$

Substituendo porro valorem ${\displaystyle x=-bb}$ in aequatione cubica 13, prodit

${\displaystyle (aa-bb)(CC+bb)=bbAA}$

Quoties haec aequatio conditionalis simul cum aequatione ${\displaystyle B=0}$ locum habet, casus, quem hic tractamus, adducitur. Et quum fiat

${\displaystyle G={\frac {aaAA}{aa-bb}}-aa={\frac {aaCC}{bb}}}$