Pagina:Principia newton la.djvu/166

Exempl. 3. Sit linea AGK Hyperbola, Asymptoton habens NX plano horizontali AK perpendicularem; & quæratur Medii densitas quæ faciat ut Projectile moveatur in hac linea.

Sit MX Asymptotos altera, ordinatim applicatæ DG productæ occurrens in V, & ex natura Hyperbolæ, rectangulum XV in VG dabitur. Datur autem ratio DN ad VX, & propterea datur etiam rectangulum DN in VG. Sit illud bb; & completo parallelogrammo DNXZ, dicatur BNa, BDo, NXc, & ratio data VZ ad ZX vel DN ponatur esse ${\displaystyle {\tfrac {m}{n}}}$. Et erit DN æqualisa −o, VG æqualis ${\displaystyle {\tfrac {bb}{a-o}}}$, VZ æqualis ${\displaystyle {\tfrac {m}{na-o}}}$, & GD seu NX−VZ−VG æqualis ${\displaystyle c-{\tfrac {m}{n}}a+{\tfrac {m}{n}}o-{\tfrac {bb}{a-o}}}$. Resolvatur terminus ${\displaystyle {\tfrac {bb}{a-o}}}$ in seriem convergentem ${\displaystyle {\tfrac {bb}{a}}+{\tfrac {bb}{aao}}+{\tfrac {bb}{a^{3}}}oo+{\tfrac {bb3}{a^{4}}}o^{3}}$ etc. & fiet GD æqualis ${\displaystyle c-{\tfrac {m}{n}}a-{\tfrac {bb}{a}}+{\tfrac {m}{no}}-{\tfrac {bb}{aao}}-{\tfrac {bb}{a^{3}}}o^{2}-{\tfrac {bb}{a^{4}}}o^{3}}$ &c. Hujus seriei terminus secundus ${\displaystyle {\tfrac {m}{n}}o={\tfrac {bb}{aa}}o}$ usurpandus est pro Qo, tertius cum signo mutato ${\displaystyle {\tfrac {bb}{a^{3}}}o^{2}}$ pro ${\displaystyle Ro^{2}}$, & quartus cum signo etiam mutato ${\displaystyle {\tfrac {bb}{a^{4}}}o^{3}}$ pro ${\displaystyle So^{3}}$, eorumq; coefficientes ${\displaystyle {\tfrac {m}{n}}-{\tfrac {bb}{aa}}}$, ${\displaystyle {\tfrac {bb}{a^{3}}}}$ & ${\displaystyle {\tfrac {bb}{a^{4}}}}$ scribendæ sunt, in Regula superi ore, pro Q, R & S. Quo facto prodit medii densitas ut ${\displaystyle {\tfrac {\tfrac {bb}{a^{4}}}{{\tfrac {bb}{a^{3}}}{\sqrt {1-{\tfrac {mm}{nn}}-2{\tfrac {mbb}{naa}}+{\tfrac {b^{4}}{a^{4}}}}}}}}$ seu ${\displaystyle {\tfrac {1}{\sqrt {aa+{\tfrac {mm}{nn}}aa-{\tfrac {2mbb}{n}}+{\tfrac {b^{4}}{aa}}}}}}$

est, si in VZ sumatur VY æqualis VG, ut ${\displaystyle {\tfrac {1}{XY}}}$. Namq; aa & ${\displaystyle {\tfrac {mm}{nn}}aa-2{\tfrac {mbb}{n}}+{\tfrac {b^{4}}{aa}}}$ sunt ipsarum XZ & ZY quadrata. Resistentia autem invenitur in ratione ad Gravitatem quam habet XY ad YG, & velocitas ea est quacum corpus in Parabola pergeret verticem G diametrum DG & latus rectum YX quad. VG habente. Ponatur itaq; quod Medii densitates in locis singulis G sint reciproce ut distantiæ XY, quodq; resistentia in loco aliquo G sit ad gravitatem ut XY ad YG; & corpus de loco A justa cum velocitate emissum describet Hyperbolam illam AGK. Q. E. I.

Exempl. 4. Ponatur indefinite, quod linea AGK Hyperbola sit, centro X Asymptotis MX, NX, ea lege descripta, ut constructo rectangulo XZDN cujus latus ZD secet Hyperbolam in G & Asymptoton ejus in V, fuerit VG reciproce ut ipsius ZX vel DN dignitas aliqua NDn, cujus index est numerus n: & quæratur Medii densitas, qua Projectile progrediatur in hac curva. Pro DN, BD, NX scribantur A, O, C respective, sitq; VZ ad ZX vel DN ut d ad e, & VG æqualis ${\displaystyle {\tfrac {bb}{DN^{n}}}}$, & erit DN æqualis A−O, ${\displaystyle VG={\tfrac {bb}{A-O^{n}}}}$, ${\displaystyle VZ={\tfrac {d}{e}}}$ in A−O, & GD seu NX−VZ−VG æqualis ${\displaystyle C-{\tfrac {d}{e}}A+{\tfrac {d}{e}}O-{\tfrac {bb}{A-O^{n}}}}$. Resolvatur terminus ille ${\displaystyle {\tfrac {bb}{A-O^{n}}}}$ in seriam infinitam ${\displaystyle {\tfrac {bb}{A^{n}}}+{\tfrac {nbbO}{A^{n+1}}}+{\tfrac {nn+n}{2A^{n+2}}}bbO^{2}+{\tfrac {n^{3}+3nn+2n}{6A^{n+3}}}bbO^{3}}$ &c. ac fiet GD æqualis ${\displaystyle C-{\tfrac {d}{e}}A-{\tfrac {bb}{A^{n}}}}$ +${\displaystyle {\tfrac {d}{e}}O-{\tfrac {nbb}{A^{n+1}}}O-{\tfrac {nn+n}{2A^{n+2}}}bbO^{2}}$-${\displaystyle {\tfrac {n^{3}+3nn+2n}{6A^{n+3}}}bbO^{3}}$ &c. Hujus seriei terminus secundus ${\displaystyle {\tfrac {d}{e}}O}$-${\displaystyle {\tfrac {nbb}{A^{n+1}}}O}$ usurpandus est