cuius integrale eft 



% = I (/ - & )f*JJi - 1 (/ - g )/e^ ; 



exiftente 



1+1 . i — ' z 



p = et q = 



5 *, '■ 



}/(5Z+ioz 3 + 2 5 ) ]/(5Z+ioz' + s 5 ) 



8. Sit 7i = 5 et 7n = a 3 ideoque n — m~ 3. 



5 

 $. 70. Hic igitur erit y=z/(5z+ioz 5 -f z y )3 



F~ 1+3ZZ et G = 3 z + s 3 ; hinc formula fpecialis 

 2/ — / ^s[f(i-t-3ss)-+-g(3z-+z 3 )] ^ 



(1 — zz)y(5z+ioz 3 -\-z s y 

 cuius integrale eft 



3 = i (/V g)/|^? - 1 (/- g)./!£§ , 



exiftente 



p = et 9 - 



i 5 



/(5z + ioz 3 + z 5 ) ]/(5z+ios 3 + z 5 ) 



p. Sit 7i zz 5 et ra = 3, ideoque tz — m = 2. 



5 

 $. 71. Hic igitur erit 1; = y' (5 z •+• 10 z 3 ■+-%*), Fr 



i+zz et Gi2z; hinc formula fpecialis 



^ __ ~ . , 



(1 -hzz)y($ ^ + ioz 3 + z 5 ) 2 

 euius integrale eft 



Nova ASa Acad. Imp. Scient. Tom. XI. I exi- 



