F. Algebr. rat. ent. nionome. K, - ^ i a rtMnTj^,,r, r- ^ 



Exi)on.binome«- + 1 nnfl/.n^"m«^at- algebr. TABLE H7 suite. Lim.Oetoo 



Expon. binome e"'' ± 1 en den.j 



p-i 



^^) /TXT ^-^ = r (p) ^ -^— i- V. T. 157. N". 8. 

 y c + A («+ 1)'' 



^^7^^111'^'^ ^ ^ (P)-^^:~T-rT7; v. t. 157. N". 9. 



7^—1 2-i 



/^i 1 

 -2-- dx = 



/ 1^ 



J a 



e 



/2a— 1 



(« + ijp 

 1 \ * 



Poisson, Mem. Inst. 1811. 163. N°. 40. 



20)/ "5^:^^ ^^ = ~«'' Cauchy, M^m. Ac. 1833. 603. 



^TD 



e — 1 



2a— 1 2^""^ 1 



21)/-;:;: dx = B Schlomilch, Gr, 8. 9. 



II .Ttx , ^ 2 a 2a-l 



2a— 1 Q2a— 1 



2 a 2a-l 

 2a+l 



-^; dx =^ B Malmsten, Cr. 85. 55. 



/za-j- 1 - 

 J^ j„ L Tj Binet, P. 27. 123. — Plana, Mem. Turin. 1820. 1. — Malmsten, 



g27rx_ J "-^ ^^ J^aa-l Cr. 35. 55. — Schlomilch, Gr. 3. 9. — Id., Gr. 12. 130. 



F. Algebr. rat. ent. monome. Kt , . Tiimi^jio r- ^. 



17"^ I- A „_ , . ,, JNumer.alff.etexp. TABLEilS. Lim.Oetoo. 



lliXpon.binomee'"^±lenden.J ^ 1 xj.u,.v^t,u 



/—x ' , 



-^ dx = -n* — l V. T. 152. N^ 8. 



^ " ^ dx= TT^ + 1 V. T. 152. N». 4. 



3) / ;; zr^ dx = —n^ V. T. 152. N°. 5. 



71+e^ 12 4 



4) /^ —, dx = "^^^^ r (^ + 1) ^ -^, V. T. 157. N^ 10. 



J i — qe 2 , 1 nr^ 



/I — P"^ h 1 



~'_, e""/-' d^ = 1"/' 2~ V. T. 157. N.. U. 

 1 — e ^ 1 w" 



Page 175. 



