F. A gebr, rat. cnt. rrini in j j-^ •• r • /» » 



„ " » ffT TABLE Ho suite. Lim.O«too. 



Expon. monome e""^. 



17)le~ X dx = ~ Cauchy, Cours. Le?. 39. — Lejeune-Dirichlet, Cr, 4. 94. 



>/' 



{p^qiy 



9 



18) = ^^'l ,,, -riArctang.^ ^^ ^ 



r 3 



19) j {I — e"') x e "^ dx = - V. T. 151. N". 12. 



F. Algebr. rat. ent. tapti? jj/. i- n » 



Expon. mononic e'" pour o special. 



l)/e ^ x^ dx = -t/tt 



r -I* 3 



2)le a;* diC = -]/ 71 ^ Kramp, E^fr. 3. N'. 70. — Boncompagni, Cr. 25. 74. 



, -x' 15 



'e x^ dx = —- ly n 



16 



—a; 2a+l , a— 2/1 ^ 



dx = 8 Oettinger, Cr. 35. 13. 



3,/ 



4) I e X 



5)1 =0 (fautif) Boncompagni, Cr. 25. 74. 



6)le a; da; = — T I — I Legendre, Exerc. 3. 29. 



7\ f _ ^ , Kramp, Kdfr. 3. N^ 70, — Laplace, Mem. Inst. 1809. 253. § 3 



^j g^+l '•'^ Boncompagni, Cr. 25. 74. — Oettinger, Cr. 35. 13. 



8\ f^"^'"' r^" dr — ^"'^ ii/'^ Schlomilch, Gr. 5. 90. — Id., Gr. 5. 100. — Id., Beitr. 

 »jje X dx - ^^^^, ^]y~ 14. _ Id., Stud. 1. 12. 



/%\ / — PX* 2o+l , 1 . /, 



9)le '^ X dx = - — ttt1°/1 Schlomilch, Beitr. III. 14. 

 J (2P) ^ 



III. 



- ^x^ 1 

 10) /e ^ " xdx — Schlomilch, Gr. 9. 379. 



7 2p* 



11) le .K^da; = -— 1/- Ohm, Ausw, 20. 



J 4p p 



Page 171. 23* 



