5<^ DE FRACTIOniBFS CONTINFIS OBSERr. 



hZIZp-hq-\' (ir—qq 



i[p-^.l)-hi''i'-^qr'iq 



i{p-i-q)-i- ^r,-h]r-q q 



2 (PH-7j-h-'-'^?- +-^^-' 7? 

 2ip-i-q)-hetc- 



tj-rzp-^q-hr- hqr—q q 



«; p-t-'i-»-'^)-+-:£i±-_Kjzii 



..#tC- 2(p-h.i-H/)-H<^.c. 



§. 44.. Cum .autem feriei propofitae terminMs x^ui iffl' 

 acem liabet « fit =1 ^^ , ,j zrj^ ; erit A r^ 



.erit b =J^i^~:^dJTVl^y '^"^"""' '"*''" ^"^ 



per theorema in praecedente dilfertatione exporitiim 



pfv^-^dy^. y (i-j^)_ _ /fr-^-^r: v (i--.r^) _ 



^-^ ^^ ^^7 ^r — ^ ponatur /z= ft+ 2^-r; 



(p^^ciW-^^^-^^^-^dy : V (1-^''} 



quo fado erlt b = p+^^^^JTyTT^j^ ' 



Simili vero modo progrediendo erit c zz 



