( ) 
X J? S xjp — t 
D = 
,c = 
q — m X q — ^ X q — s x q — t 
, Err 
t — m 
s — m xs — / xj* — x^ — ^ 
Eritque Fradtio propoflta 
xt — ^ xt — q X t — s 
oequalis liimmse, — ^ f 5 4 4L 
I — m X ^ I — £ X ' 1 — qx ^ 
— 5 L — 5 — . Lex Redudionis ita uno intui* 
I — s X ‘ I — s X 
• , 
tu fe prodir, tamque facilis eft illius continuatio ut in- 
utile forec ilJam verbis explanare. 
Qorollarium I. 
Si Radices omncs fint sequales, non poterit Fra(ftlo* 
propoflta reduci ad fimpliciores. 
Cor'ollarmm II. 
Si Radices aliquae fint sequales, ali^e vero insequales,, 
poterit reduci fracftio propofita ad fimpliciores ; fit-i;.^. 
fraiftio propoflta tt - t : tj faiftoque- 
^ ^ • I — ex-\~fxx — g x^ ^ 
ut prsefcriptum eft x^ — e x x -}-fx — g—o. Sint 
Radices iftius sequationis quarum m 8cp fint 
scquales : erunt fra(ftiones fimplices in quas refolvitun 
mm 
propoflta = -■ 
tP 
xm — q x x — m x ' p — m 

+ 
x/' — ^xi — J? X q — m xq — f xi — q x"* 
addantur du^e priores in unam fummam, do erit fumma. 
(divifis. 
