(, } 
(divifis Numcrator e 8 c D enomiiiatorc per m — /) 
mj’' — ^ X m ^ ^ . 
five 
^ — q X p — q -|-i — m X X I — p X 
mm — 2. q X m ^ 
m — q 
'P XI — m X 
2 
. qm 
m- 
— q^ X m x\ 
erunt 
m 
- - i 
m — q X I — mx 

; five.: 
m 
X I 
m X 
m 
m — q\ XI _ — m x\ 
m 
X 
Corollarlum- III. 
Si Frad:iones fimplices in quas refblvitur Fradtio 
propofita involvant Quantitates imaginarias, tunc quic- 
quid eft imaginarii femper deflruetur per additionem 
duarnm vel plurium fradlionum numero pari . lum- 
ptarum. 
t 
Coro liar him IV. 
Ex combinatio-he Fradtionum rimpliciuin, & apta 
limitatione Radicum, plurima fuborientur Theoremata 
in quibus inerit conciiinitas quaedam minime afpernan- 
da ,Ex.^.. fit fradtio propofita ^ 
fadloque ut antea x"^ - _ ^ 
Sint J-, Radices -ffie|uationis, fintquc Fradtio- 
A . JB 
JO X 
• + 
I — ex-\-fxx — gx^-^hx‘^^ 
e X’ -j~ f'x X — g X ~j~ /j — 0. 
nes in quas refblvitur propofita, 
