MOMENTANEA AXIS GYRATIONIS A &c. 267
cof« tangS-
J\* } ‘ + fi)
linde fittang COS =:
aabb (aa — bb)fm cofm cof«’
ccfn(bb (bb — cc)fm 2 + aa (aa — cc) cof m z )tefn (aa (aa- cc) cofm 2 -s- bb (bb - cc)fm z )
(aa - bb ) fm cofm (aabb cofw 2 -f cc(aa + bb)fn z — c*fn zPorro ex eodem triangulo OCS colligitur,
/*„ cofs coffm + *) \cof/ = cof(m -f tf) cof?i cof A + fnfb —/A +•-tang^'- J
f n(aabb - (aa + bb) cc + c*) __ (aa-cc) (bb-cc)fnf$aabb * aabb
feu cofr=
unde fit da —
an (aa — bb) (aa — cc) (bb — cc)f m cofm fn cof?i*
aabbcc
. dt*
adt
Denique pofitis 0 A = «; OB — C, OC = y erit arculus 0 o = .
/■/a 4 /i 4 («a - W) 2 cof» * cof^ 244 (o«—f 0 * c0 ^« 2 c °fy 24 f 4 () 2 cofS* cofy 1V. — (aa — bb) 2 (aa — cc) z (bb — cc) z cof x z cofC 2, cofy 2
aabbcccc)
7 2
- (aa — M) 2 (aa — rr) 2 (W; — cc ) 2 c
88 (aa — bb) (aa — cc) (bb — cc) cof« cofScofy
et «8 — " ■ - --—-- --- - — - dt,
aabbcc
Verum fi cx o ad CO perpendiculum ducatur op, per regulas trigono-inetriae fphaericae, arculi dementares Op et op ita rationaliter exprimun-tur ut fit:
8 (aa bb) dt cof» cof Q(aabb — (aa — cc) (bb — cc) cofy 2 )
Op —
*p
aabbcc Rny
gdt cofy (aa(aa — cc) cof a 2 -\-bb(bb — cc) cof£ 2 )
aabbfy
C O R O L L. i,
aa(aa — bb) (aa—cc) (bb — cc) coftfcofficofy
670, Cum fit da— ---—- — - 1
aabbcc
dt patet fi trium momentorum principalium duo fuerint inter fe aequalia,tum celeritatem angularem plane non immutari,
C O R O L L, 2.
6yi. Introdudlis difiantiis a, C, 7 poli O a polis principalibus A,B, C erit
Ll r tang