C 24 ) 



mm M zi y^S -^ B Sx + P (x^^ ^ 2p X ^p"" -\- f;). 

 Viilorqs ^J ct B inveniuntur in hac aequacione fi ponicur 

 pro X vel — p + ^*~^ vel -p-qV^i^ turn enim eva- 

 ne^cic P (^x -{-ipx^p'^ J^q^^. Verum' turn iff ec 6* 

 confistenc functionibus parcim renlibiis parti m irracionali- 

 bus; quare banc habebiinc formarrt : m^m'V^i ec 

 m'-m'V'^i'^ acquei-H-/ V^i Qi s — s'V^i ^ quae igitiir lint 

 aequales M et aS 11 m iis pro x fubflkuncur ^ p-hqV^i 

 \^\ ^p -r-qV^u Tttm aurein eric: 

 m^in'V^i-=:As^As'V^i ^Bps^Bqs* 



-hBQqs-ps'^V'-^i^tt 

 m ^ m V~i z: Js — A^' V-t — Bp s'-^Bq s* 



— B^qs-ps'^^it, 



i_ '"''-'.. 



unde m T^ As — Bp s--B qs' 

 et m ■nnAsjr-Bpi'^Bqs, 

 Ex his aequatiQmtnJs"'deterrainatur '/f et B^ quae efiint! 



P vero determinatur ita. Si 5 esc factor flmplex prions 

 functionis v. c. x-Hr, ille factor ponatui: =o, tnm eric 



m^P (V^ -^pr^p^ +^'), ecP^-.:. — 



ubi ilf notat valorem Mfi in eo pro x fcribicur —p. Si 

 duos continec faccores (implices v. c, (a; + r) Qx-^s) 



P ^ C D 



ponacur 7 — ;^^. j::;^^ / ubi C ec Z) dererminancur 



ponendo primum x :± - r^ tuTfiir'rr ^ ir, uti fecimus 

 in praecedencibus. Itaqu^ P Temper esc funecio variabilis 

 X dignitatis unitace niinoris quam iS*. 



§ XX. 



