p" , , ' , ° lAULbi I'io suite. Lim.Oetoo. 



Lxpon. polynome en numer. 



f fe-g' — 1\<- (— 1)" A"^ V T ir.s 



5)/ I ^~'"^^~ \c—ii •;>'^~^'p,apresla diffeijGntiation inettez ^^ = 5; ^\ ■^n 



/:g—rx \\c ( 1 )c fq 



> \ '^ dx = ■ Cosec. an £i,<' bl , a <rc; \ 



/ 26+c— 1 \ i 



e-»x(c.-_l)o-i_(_a;)-i 1— -^— 0. ^ /cau- 



X „/, 26+C-2 6b(h+c—2)+(c—2)('6c—7) \ ' p"!' 



9) j \ -^.^^^ Ld^==] 



= — —^— Cosec. <? TT A'^-2 6' ,c<?<c+l; 



F. Alsebr. rat. fract. a den. a; ± o. rr i m ir j on in. 



ir.. ^,. ^„„A.«^ JAliLiii IJu. Lim.Oetoo. 



Lxpon. monome. 



/e—P'^ 

 dx = —^'li.{e-P) Schlomilch, Beitr. III. 5. — Id., Gr. 5. 204. 



/«— ^ 

 dx = — eflli.{e—<l) \Vinckler, Cr. 45. 102. — Schlomilch, Stud. I. 18. —Id., Gr. 5. 204. 

 x-\-q 



f e-P^ 



8)/ dx = — eP9li. (er-Pt) Schlomilch, Stud, I. 18. 



'J x-\-q 



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



5) 1-1 dx = ne-Pt + ier-Plli.^f'') Meyer, Int. D^f. 264. 



J x-\-q 



. f ^'"' , / , ^ , , TT , X . 1 .^ , „ X , Bieren8 de Haau, Verh. 



6)/—— x^dx = (— l)«+l q^mEui—pq) + - .2 l"-"/! (- p g)"-! K. Akad. v. W. Dl. II. 

 J'^-rl pi blad 19. 



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

 J l — x 



f e-' 



8)/ dx = e-9it. (e?) Schlomilch, Gr. 5. 204. 



Page 188. 



