F. Aljjebr. entiere. TABLE 33 suite. Lim.Oetp. 



) Sohnke, Saraml. 



2*/2 



/• 2W2 



5) / ar24+i da; I/- (p» - re' ) = ^^^^^ p^b+s ] 



36/2' 



/l*/2 TT 



ixV/(o«— a;»)2*-i = — »2*- 

 26/2^ 2 



8) 



7 6 + 2 '^ 



Dienger, Cr. 38. 266. 

 24/2 



/16|2 1<5'2 

 ar2*da;l/-(»»— a;n2<;-i = — —— o2,i+c)_ 

 ^ ' 2*+«'2 2 



/1 6/2 2c/2 

 a;2* dx 1/ (p» — ar')2c = . ^ a2(M-c)+i 

 ^ 36+0/2 



F. Algebr. fract. TABLE 34. Lim.Oetp. 



* — — 



[ dx 



1)1 ^ = Arctg.p Kaabe, Int. 136. 



f kdx 1 



2)1 = — JT, poar A = 0; Schlomilch, Gr. 11. 63. 



^'/?^=- ( 



Bidone, Mdm. Turin. 1812. 231. Art. 1. N°. 31. —Plana, Mem. Turin. 

 J Q I 1818. 7. Art. 1. N. 4. 



' Zp Zp] 



/dx 

 = Arcsin. p , p^ <C1; K^abe, Int. 185. 



/dx 1 ' 



— = - 71 Cauchy, Conrsi Lee. 32. 



/x dx 

 ; ss p Sohnke, Samml. 



Page 72. 



