F.AIg.rat.fract.aden.a;<'pourageneral. ^^p^^j, ^^8 suite. Lim.Octoo. 

 Export, polynomc en niimcr. 



5)/ { I e—P'^dx^ .p<^-Up, aprcs la differentiation mettez ^^ = 9; " ' ' " 



J \^ X ] i<^— '/^ l^p iN . 1 / . 



^ ^Xi— ^ «~''" ''•'-■ = A'^.p? Ip V. T. 168. N\ 18. 



7) / -^ '^ dx = Gosec.q 71 ^'^ ^^ , 7 < (-'; 



/ 26+c— 1 \ 

 .-Me--_l)^->-(-a;)-i i__^ ^ ^ f ^.^^_ 



8) / . i Ldx=— — Cosec.qrT^':-'^ t'',c<7<c+l;f cbv, 



j «*+' r(7+l) I P. 18. 



> 147 

 / ?.64-c-2 6t(ft+c— 2) + (c— 2)(3c— 7) \ [ r, o' 







Cosec. (? 7T A'^-- l^'' , c < -; < c 4- 1 ; 



F. Alwbr. lilt,, tract, a den. x^q. rp . pr .- .c^o in. 



Lx|)on. mononie. 



f g—px 

 1)1 dx = —e''li.{e-I') SchlSmilch, Beitr. III. 5. — Id., Gr. 5. 20-1. 



) I dx = 



7^ + 1 



2)/ dx = — c'Jli.{e~'i) 'WinckkT, Cr. 45. 102. — Sclilomilch, Stud. I. IS. — Id., Gr. 5. 204. 



f e-P^ 



3)1 dx = — ePI li. (e—Pl) Schlomilch, Stud. I. 18. 



J a: + q 



4) = — ePI E i. (— p q) Arndt, Gr. 10. 247. 



5)i-£ dx = ne-Pl^ie-Plllif^) Meyer, Int. Def. 264. 



jx + q 



f e—P^ „, 1 « , Bierens de Haau, Verb. 



e)j——X"dx = (— l)«+i 2" e;'?£i.(—p7) 4--^ 1'^-"/! (—;;<?"-! K. Akad. v. AV. Dl. IL 



y^ + 9 ■ P ' blad 19. 



7) / dx = e-Pli. (eP) SclilSmilch, Beitr. III. 5. — Id., Gr. 5. 204. 



j 1 — A- • 



C e-x 



8) / dx = e-ili. (e?) Schldmilcli, Gr. 5. 204. 



]q — x 



Pa-^e 18S. 



