24 == 

 (px-—y) n " 1 (ax-\-pp' K " 1 y)Tldp. Hic ergo erit 



J a-\-fi p K 

 i 



ideoque K zz (a -+- (3 p x ) A , unde ftin&io quaefita II erit rz; 



A 



■ , ficqne formula noftra integrabilis eiit 



n - \ 



(p x — y) n "" r (a x ■+■ ^ p x "" I y) ^p 



n. -t- a 



(a H- .|3 p ) * 

 quippe cuius integiale eft ~ -A? — ~"~// . . 



Exemplum 6. 

 *5- 41. Sit nunc M — a p et N — {3, ita ut formala 

 integrabilis reddenda iit 



(p x — /) a — x ( a P 3C-+-P/) n dp, 

 Hic igittir erit 



•f & j> -H |3 p et -i- (3 t7 



J_ 



ideoque Krzipn-P. Hinc igitur fun&io propofita 1T ent 



(a -4- (3 ) p a -+- P 

 ficque formula integrabilis nunc erit 

 ( p x — /)" ~~ ~ ( p x -4- (3y) -■ p 



« - >n - T'(i 9 



( a -+- (3) p » -+- P 



( p % — yV 1 

 curus ergo integrale eft — — — 37P—- 



H pa^-0 



E». 



