F. Alg. rat. fract. a autre den. TABLE 30 suite. Liin. — oo ct oo . 



7)/ ^ = V. T. 113, N'. 17. et T. U7. N^ 8. 



/(p + xi)"-^ T(a)r(b) \ 



1— » — .rO^ + i r{a+J) -- ^ • I 



JCayley.L. l?.23l. 



[ dx %n 



10) I = Ohm, Ausw. 8. 



yi+a' + af' 1/3 



C dx Zn 

 \\)\ = Ohm, Ausw, 9 



71 — -^4- ^' V/3 



I ar — a 



12) I ^ dx = a, pour — x = — « (°^ ) ; Cauchy, Cours. Le(j, 88. 



13) =0 j 



/<ia, 1 [ Cauchy, Cours, LeQ. 32, — Grunert, Gr, 2. 266. 



/■ da; ^ 



15)1 = 2:Ti 



16) / — rfa; = 2 71 



/* dx 



17)1 — ;; = n Cosec. X Schlomilch, Int. 117. 



'J l—%xCo8.i.-{-x^ 



l^)/-; " \,^ . <i* = J^ , (a 6*) Plana, M^m. Turin. 1818. 7. Art, 1. NM8. 



'j x^ +2cxCos.l + c^ cSin.X^ 2 ' 



Baabe. Cr. 37. 355. 



F. Algebr. rat. fract. TABLE 31. Lim. 1 et oo. 



1 ) I dx = — n Cosec. p n ] 



I (If 



> Oettinger, Cr. 35. 13. 

 _. 1)1— p \ 



2) / dx ■= — n Cosec. p n 



fdx 1 



J aP p — 1 I 



3)/-= 



Baabe, Int. 120. 



4) = » .p<i;! 



Page 68. 



