1 



s.q X dx = — 



/'^ Sin. X dx = — 



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

 P 



F. E\|.onent. <'±'''. Tiniro-Q i- n , 



Circul. Dir. ent. a un fact. ^''^^^ ^'^- L""' ^ ^^ *• 



f 1 



/ e— •'■ Sill. X dx = - 



J 2 



je-1^Sin.f/x dx = — } Oetlingcr, Cr. 38. 210 

 J 2r/( 



I e-1^ Co 



h 



I e—P'^ Cos. X d 3: = - 



/" Q. , 1 Poisson, P. 19. 60. — Dienger, Cr. 46. 119. — Schlomilcb, Gr. 



je i:>in.qxax — j_j_^, 5. 204. 



\e~^ Co%.qxdx = Dienger, Cr. 46. 119. — Schl6milcli, Gr. 5. 204. 



Je-P^Sin.qxdx = j poisgo,j_ p jg. 215. N^ 2..— Cauchy, Cours. Le?. 32. — 



^ '^ ' { Grunci-t, Cr. 8. 146. — Lobalto, Cr. 11. 169. — Boncompagni, 



/^ , P \ Cr. 25. 74. — Oettinger, Cr. 38. 216. 

 e—V^Cos,qxdx = 1 

 p^+q^-1 



Sur la formule (9) voyez encore: Poisson, Mem. Inst. 1811. 163. N'. 25. — Id., P. 18. 295. 

 N'. 21. — Dienger, Cr. 3S. 331. 



\e-P^Sin.{qx ^l) dx = (qCos.X -\-p Sin.l) Poisson, Chal. 153. 



I c''^^ Sin. q X i d X = Schlomilcb, Gr. 3. 9. 



\ e—P^ Cot. ~ q x d X = ZgjI" Cauchy, Eserc. 1827. p. 141. 



je-'^Sin.{2pU'x)dx = pe—P-l^n Helmling, Transf. 14. 



je-=': Tang.(ql^x)dx = 2 q \^ n ^ (— 1)" n e-ioi)' V. T. 388. N". 20. 



je-''Cot.(ql^x)dx = — 2^ I/tt J' n eH'"?)- V. T. 388. N' 21. 



I e-^ Cosec. (2qp^x) dx = — '2q \yn ^ (2 n — 1 ) e-'2'i-i)-r V. T. 388. N=. 22. 



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