^' rTru-'T/ . ..„ r„„» TABLE 278. Lim. et oc. 



Circul. Dir. ent. a un fact. 



10 

 11 

 12 

 18 

 14 

 15 

 16 



e~'Sin.xdx = - 

 2 



e-9''Sm.qx dx = — \ Oettingcr, Cr. 38. 216. 

 Zq{ 



e—^' Cos.qx dx = — 



1 ^ 

 P'Sm.xdx = 



/ 

 / 

 / 



/ e-P' Co».xdx = — - — 



; 1 + p^ 



( _x <i- ^ *_ Poisson. P. 19. 60. — Dienger, Cr. 46. 119. — Schlomilch, Gr. 



je ^tn.qxaa — j_^^, 5. 204. 



/e-'Cot.qxdx = Dienger, Cr. 46. 119. — Schlomilch, Gr. 5. 204. 

 1+5* 



Je-P'Sin.qxdx == , J Poisson, P. 16. 215. N°. 2. — Cauchy, Cours. LeQ. 32. — 



/ 



o» +11 



^ Dienger, Cr. 38. 231. — Raabe, Int. 152. 



Grunert, Cr. 8. 146. — Lobalto, Cr. 11. 169. — Boncompagni, 



^ - P I Cr. 25. 74. — Oettinger, Cr. 38. 216. 



e-px Coa.qxdx = ' ^ 



p»+3*, 



Sur la forraule (9) voyez encore: Poisson, M^m. Inst. 1811. 163. N». 26. — Id., P. 18. 295. 

 N'. 21. — Dienger, Cr. 38. 331. 



/e-P'=Sin.{qx + 'k)dx =■ {q Cos.X ^ p Sin.l) Poisson, Chal. 158. 



/e'>'^f Sin.qxidx = — Schlomilch, Gr. 3. 9. 



/er-P'Cot.~qxdx = Zq2 Cauchy, Exerc. 1827. p. 141. 

 * ip*+g*n' 



I j er" Sin.{2p-l^ x) dx = per-P^i^n Helmling, Transf. 14. 



j e-' Tang, (q \^ t) d X = Z q l^ n 2 (— 1)« n e-("1? V. T. 388. N". 20. 



le-^Cot.(ql^x)dx = — 2ql^7t S ne-M' V. T. 388. N' 21. 



I e-' Cosec. (2q\yx) dx= — 2q \yn .i* (2 n — 1 ) e-fS"-!)*?^ V. T. 888. N\ 22. 

 Page 374. 



