^) o (Uff in 



Quare in utroque cafu fucceflìve limites radicis erunt Tab. VL 



X <* q X <iq:p 



x> q pq K> q:p q:p^ 



X <*,q pq^P^q X <ìq:p q:p^>ì^q:p^ 



X > q pq^p-q—p^q X > q:p—q:p->i<q:p^ — q:p* 



&c. &c. 



Erit ergo tandem in cafu priori , quo ne npe p < i 



X == q —p q * p^-q ^p^q ^p^q <ì* &C = q : (l ^p") 



in pofteriori , quo /» > i 



x== q:p — q:p^'Ì^q:p'—q:p^^SiC ===q:(p^i) 



$. 35. Sit aequatio fecundi gradus 



X' >ì:< p X ==■ q. 

 erit 



IO. X <* q:p 



XX t^q^ : p^ 

 x'^ >iipx <* q^ : p^ ift pxp> q 



X jc > q^: p- 2 q^ : ^* >f< q'^ : p^ 



l '• '^-^PX> q'':p^ — 2q^:p^>iiq\-p^tf,px^q 



30. X <iq:p q^': p^ >ii2q^ :p' q\. p7 



&C. 



Unde limites radicis 



X <^q: p 



X > q: p q- : p^ 



X <\'q: p q- : p' *f* 2 q^ : p'' q* : p'^ 



X > q:p — q^-:p^^ 2q^ : p' — ^q* :p- tfi 6q^ :^' — ^/;^" 

 iìi ^q':p'' q^:p^' 



Scc. 



Voi. III. V Qpare 



