-^m ) 9 { m 



quare fi pofl: fingulas integrationes (latuamus x — a, vt fiat 

 j ~ o, habebimus hanc redudioncni: 



a + px ^^ ^ ^ ' a4-p.v ^ -^a-h(3.v 



f. 9. Loco « fiibfHtuamus nunc fuccefTiue nume* 

 ros I, 2, 3, 4 etc. atque comparatione cum formulis 

 generalibus inftituta habcbimus 



"vbi quidem pofl integrationem ficri debet x — a. Prac- 

 terea vero habebimus 



f—aa, f — z a a, /"3 <7 a , fn ^a a, etc. 



g=2u-^a, g' — ^a — 2^3a, §" — 4^-3,3^, etc. 



^ = 2 (3, Z>' — 3 P, />" rir 4 (3, ^"' = 5 i3, ctc. 

 atque ex his oritur fcqucns fradio continua: 

 aa A 



B 



-zz{2.ct — ^a) + ^act,^ 



(3a-2(3 ffj-fgflap 



(4-a— 3 ^o}-i 16 aa.^ 



(5a— 4(3^/}-t- etc. 

 §. 10. Intcgratione autcm inftituta fit 



r d X ' , — 1 / ot -^ ? X 

 ./a_f_j3x P a' 



quandoquidcm integralia euancfcere dehent faiflo .v zr o. 

 Nunc igitur fiat xiza, critquc A zz '^ I '^-^^-^ . Porro 



f-^^- ~a(x-^I ^-P— }, fadoquc x—a fict 



"R 3 a / a -t- ;3 <i 



^ — -p - p p ' -- ^- ' 



.^<Ji?a ^^G(/. Imp. Sc. Tom. UJ. P. I. B quam- 



