€. <. Statuatur nunc _ii!L zzz % \ eritque x^ ~ A.1. 

 tum vero n x^^^ d x ~ ---^ atque — zz — ^ — , quibus ia 



aequatione illa substitutis nanciscimur istam : 



dz ___ ^ y I _J!}:j_B±_ ^^ XT^^g ■ 



n(z — zs;) n (z — zz) ' i— a 



quam sub hac forma repraesentasse juvabit r 



I ~nz^ — n zzp^ -i-^mv -hXnvz 

 quo commodius eam in seriem infinitam convertere liceat. 



§. 6. Hunc in finem fingatur haec series pro littera vi 

 V~A.'-\~Bz-\^C'L-^T>%^-\~Ez^-\^ etc. 

 unde oriuntur sequentcs series : 



-\^ n%^~ -H/iBz + 2.nC%^ -h 3«Dz^ -\~ttc. 

 — n%%^ — — — wBz''^ — anCz^ — etc. 

 H- my = mh 4- mBz -H m-Cz^ -f- mDz' -|- etc. 

 -i->nt^2^ H-XnA5r-f->>nBz2-|^>vnC2,3-Hetc. 



quae sequentes relationes coefficientium A, By C, D etc. sup- 

 peditant. 



m A :r: I ; 



(m -h ?]) B zzz -— X n A ; 



(m H- 2 ?0 C zz: — (A— i) ?i B ;. 



(m -i^ 3 n) D zz: - - (A- 2) ?i C 5 



Qn -h 4 /z) E zz= — (x — 3) n D ; 



etc. etc. 



iinde coefficientes A ^ B , C , D , etc sequenti modo determi- 

 nantur ; 



