- s . ‘ J . - 
oy yore -® achhid . o> ¢ «+ 
a ¢ 4 F al it, ri . 
; g » 382) 1 Th Inthe Mota 
’ ‘, a whe ? 
eae ; je@ork is. tel *eGnftruded, fc ning any 
ol -nutnber of. BY its at pleafure. i: 
‘Tf P= hy ‘orthe body be’ ‘projected - at fight 
Mic ails tO a: linedrawn, from the centre of “Torce,’ 
fu. te _ 
; then oh ea oe are whofe. fecant ~, and. i; 
Pons tad. = fi*s To coniftrita the orbit upon this fup- 
’ *-pofition; from the’ centre. C,,at the diftance. 
CV=r, (Fig. 2. ) deferibe _ the, circle VQS; 
take any arc VR, and draw ‘the tangent’ RT; 
eo one VR fer S13: Wm yr 
ae m—1 * 
Percale zs 3 bY sed Ns ear eee CG. 2 which — 
produce. to n: making Ca=. ie Se then 2 will : 
' be a point in the curve. If V.QS be taken to 
a.quadrant in. the above proportion, and, nG.5. > 
be produced indefinitely, it will be parallel to" 
an afymptote to the curve. This is too evident 
* to require any particular proof. From _ the 
centre Cdraw CP perpendicular. to Cee and 
ae anis mn or rea, a. 
take i= Bi A F aa Vita,” _ and. 
. through the point P draw PL parallelto CL, 
and-it will be an afymptote to pte curve or 
trajectory. 
The number of revolutions which the body “ 
will make, . while going. from an apfe to an 
infinite diftance, ‘will evigends be equal 10 
. : * 
