»4 r>E PRODVCTIS EX INFINITIS 



§.35. Hoc modo progrediendo reperientur fequentes 

 aequationes , quando p non eft z:: i et quidem Ci p^2 

 inuenietur. 



j r ^^ .zdz r , , ,z^-'dz 



jj . dz _ Zdz Zzdz ^ ., . s r^°~^^« 



z^^-^^-^d z ^-^'dz z^^^dz 

 ^(i^^.^j.| •V(7i:piJ7--7(7Z^jr Generalltet 



dz 

 autem quicquid fit q, fi ponatur — -— zzXdz €X 



sf"^'dz 



U_^qgf_z:± =Y^^ erit /XdzfzXdz./z^Xd!^ 



Jz^i-^Xdz^ag^-^la-^^^fYdz.Jz^Y 4zfz^^Ydz..... 



fz^^^-^^^Yd^. 



§.35. Simili modo fi fit p =: 3 , ac ponatuc 



dz z^"dz 



-^^ =X^5,et g^3 r=Y^^ prodibit fequens 



aequatio generalis , fXdz.fzXdz.fz*Xdz. . .. .fz^-'X 



dz-ag^-^ ^±±^±2il fYdz.fz^Ydz.fz^^Ydz....... 



fz^^-'^^Ydz. Atque hinc omnes has fbrmulas in vnam 



latiffime patentem colligi licet. Sint enim p et ^ nume- 



. . . dz 

 n qmcunque mtegri affirmatiui , ac ponatur ^— 



(i-;S^JY 



Xdz 



