Expon. mononic. ^ TABLE loO suite. Lim. ct oc . 



loJ-f^^dx = ---{r-^.Ji.(/')-/'h-.(«-i's)} i^f™' C'- 23- 225. - Id.. Stud. 



-^ ^ dx = - {e-P9 I {.(/"') -I- /' Ii.{ff-Pl) ] Schlomilch, Cr. 33. 325. — Id., Stud. II. 20. 



1*) f;F^-^''^-=i^='''-' (e'"£i.(-;,,)-.-..£i.(p,)} +-l-ii.a-.»,.(p.,^)«-i jg-- ^de 

 •'•^ ~!? -^ P 1 (v.K.Ak.v. 



/e-px 1 „„ 1 « (Wet.Dl. II. 



F. Algebr. rat. fract. a den. [af^q-f. rp^p^E 131. Lim. et oe 

 Expon. nionome. 



[ e-x 1 



1)/ -dx = - + e«ij.(e-9) V. T. 43. N\ 18. 



2) \ ,^^ dx = — 1 + e-? it. (e«) V. T. 43. N'. 19. 

 y(j — a?)» 5 



_ Ja, _ —H:^ (p j^a) Kumraer, Cr, 17. 228. — Boncompagni, Cr. 25. 74. 



( I 4" a;)* aP 



/e — "'"^ d^P — ' r (u) 

 —dx = x(p,Ka) Bonoompagni, Cr. 25. 74. £lle ne vaut que pour c = 1. 

 (1 +«)* caP 



/p—P'x'^ ( l^a+c+l d''+'^ 

 — dx = '- .W^lUe-Pi)] Schlomilch, Stud. I. 18. 



fiN {JUL- dx =^(— Vfl -^^ ef''EU-pq)+ ^ , ''l\<.-«-i/i(_^5)n-i jBierens de 



J{x4-qY ^ l«-l/" ^ '^^^^ ia-1/loa-l j ^ (Haan,Verh. 



/ V. K. Ak. V, 

 [ f-px »n-l (_l)<i-l a-1 ,UVet. Dl. II. 



S)l dx = Poisson, P. 19. 404. N'. 68. 



^Jiq+xi)P Tip) 



Page 190. 



