Barrow, Isaac, Lectiones opticae & geometricae : in quibus phaenomenon opticorum genuinae rationes investigantur, ac exponuntur: et generalia curvarum linearum symptomata declarantur

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4. Conſequentèr in harum ſecundo gradu ſin & gt;_ c_; in tertio, ſi _n_3
&
gt; _cc_√{_cc_/3} - {_cc_/3} {_cc_/3} = {2/3}_cc_ {_cc_/3}; vel _n_6& gt; {@@/27}_c_6; in quar-
to
ſi _n_4&
gt; {_c_4/4} - {_c_4/16} = {3/16}_c_4; nulla radix habetur; unam in iſtis
caſibus
recta EF curvas ſupergreditur;
nec iis occurrit.
6. Curva CYH eſt _Circuli quadrans_, reliquæ AMH, ANH
quodammodo
κυχλο{ει}δ{ετ}ς.
7. Ad ſextam ſeriem pertinentium curva HLL eſt _byperbola æqui_-
_latera_
, cujus axis AH;
reliquæ ſunt _Hyperboliformes_. Unde quoad
hanc
ſeriem liquent cætera.
_a_ + _b_ + {_cc_/_a_} = _n_.
_aa_ + _ba_ + _cc_ = _nn._
_a_3 + _baa_ + _cca_ = _n_3.
_a_4 + _ba_3 + _ccaa_ = _n_4, & c.
In recta BAH indefinitè protensâ capiatur AB = _b_; & in AD
11Fig. 214. ad BH perpendiculari ſit AC = _c_;
ſint etiam anguli HAR, HBS Semi-
recti
;
tum arbitrariè ductâ GY ad AH perpendiculari quæ ipſam
BS
ſecet in Y;
fiat AG. AC: : AC. YK; & per K intra angulum
DVS
deſcribatur _hyperbola_ KKK;
ſint demum curvæ CLL, AMM,
ANN
tales, ut inter AG (vel GZ) &
GK ſit _media_ GL, _bime_-
_dia_
GM, _trimedia_ GN;
ſatisfacient negotio. Nam eſt GK = _a_
+ _b_ + {_cc_/_a_};
& GLq = _aa_ + _ba_ + _cc_; & GMcub = _a_3 + _baa_
+ _cca_;
& GNqq = _a_4 + _ba_3 + _ccaa_.
Not.
1. Secundi gradûs curva CLL eſt pars _hyperbolæ æquilateræ_, cujus
_centrum_
O, ipſam AB biſecans;
& ſiquidem AC& gt; AO, eſt OH
(ad AB perpendicularis, &)
= ACq - AO qejus _ſemiaxis_;
ſin AC& lt; AO, ejus axis eſt OI = AOq - ACq. reliquæ
verò
curvæ AMM, ANN ſunt _hyperboliformes_.

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