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GZ, GK media GL, bimedia GM, trimedia GN;
propoſitas æ-
quationes explicabunt hæ lineæ. Nam ſi AG (vel GZ) vocetur _a_;
erit BG (vel GK) = _a_ - _b_; & GLq = _aa_ - _ba_; & GM cub.
= _a_3 - _baa_; & GN _qq_ = _a_4 - _ba_3.
quationes explicabunt hæ lineæ. Nam ſi AG (vel GZ) vocetur _a_;
erit BG (vel GK) = _a_ - _b_; & GLq = _aa_ - _ba_; & GM cub.
= _a_3 - _baa_; & GN _qq_ = _a_4 - _ba_3.
Not.
1.
Ductâ AD ad AI perpendiculari, &
EF ad AI parallelâ, ſi
AE ponatur æqualis ipſi _n_; erunt EK, EL, EM, EN radices æqua-
tionum reſpectivæ, ſeu æquales quæſitis _a_.
AE ponatur æqualis ipſi _n_; erunt EK, EL, EM, EN radices æqua-
tionum reſpectivæ, ſeu æquales quæſitis _a_.
2.
Quoniam ordinatæ GK, GL, GM, GN à termino B verſus I
infinitè excreſcunt, ſemper habetur una vera radix, & unica.
infinitè excreſcunt, ſemper habetur una vera radix, & unica.
4.
Si AB biſecetur in O, triſecetur in P, quadriſecetur in Q, du-
cantúrque ad AR parallelæ OT, PV, QX, erunt hæ curvarum BLL,
BMM, BNN _aſymptoti._
cantúrque ad AR parallelæ OT, PV, QX, erunt hæ curvarum BLL,
BMM, BNN _aſymptoti._
_b_ - _a_ = _n_.
_ba_ - _aa_ = _nn_.
_baa_ - _a_3 = _n_3.
Sit AB = _b_, &
anguli RAB, SBA ſemirecti;
tum curvæ
11Fig. 280. ALB, AMB, ANB tales, ut ductâ rectâ GK ad AB utcunque
perpendiculari (quæ lineas expoſitas ſecet, ut vides) ſit inter AG
(ſeu GZ) & GK _media_ GL, _bimedia_ GM, _trimedia_ GN; pro-
poſitas æquationes explicatas dabunt hæ lineæ. Nam poſito fore AG
= _a_, erit GK = _b_ - _a_; & GLq = _ba_ - _aa_; & GMq =
_baa_ - _a_3. & GNq = _ba_3 - _a_4.
11Fig. 280. ALB, AMB, ANB tales, ut ductâ rectâ GK ad AB utcunque
perpendiculari (quæ lineas expoſitas ſecet, ut vides) ſit inter AG
(ſeu GZ) & GK _media_ GL, _bimedia_ GM, _trimedia_ GN; pro-
poſitas æquationes explicatas dabunt hæ lineæ. Nam poſito fore AG
= _a_, erit GK = _b_ - _a_; & GLq = _ba_ - _aa_; & GMq =
_baa_ - _a_3. & GNq = _ba_3 - _a_4.