^•p'^P^l,';. TABLE 298 suite. Lim. diverses. 



, tire. Dir. 



3)1 p^~-^Sin.2anxdx = ^^ — j — - — ^—^ Kumraer, Cr. 35. 1. 







1 — p 2,an 



(Ip)* -\- 4a* TT* p 



f^ 1 



4) I e-pCo^-^ Sin. (x—p Sin. x)dx = - (e-pC°^'^ Cos. (p Sin. X) — e-P) 



5)1 e-vCosxCos.{x—pSin.x)dx == ~ {e~pCos-\ Sin. {pSin.l)] 

 ^ 



, f „ ^ „ d<* e-pGos'i'Cos.{pSin 

 6) I e—pCos-x Sin. {ax — p Sin. x)dx = ( — 1 )" - — . 







f da e-pCos.l Sin. (p Sin. X) 



7 ) / er-pCos.x Cos. (ax — p Sin. x) dx = (— 1 )" . 



J \ t J ^ ' dp<^ p 







fO+l 



r ei—l 

 8)1 e-<'—^) Sin. {q(x — p)]dx =qe-cp— Schaar, Mem. Cour. Brux. T. 23. 



a 



fi d X 



9) I e-Tangx ^ » V. T. 112. N'. 4. 



Sin. 2 X 



'0 



T 



10) leTcng.x ^t^ , dx*=-e—l V. T. 112. N". 5 



7 {Sin.x-\-Cos.x)^ 2 



Ci Sin '2« 



11) / eGo'-^': —: dx = 2 (e— 2) V. T. 112, N^ 3. 



/ Cos.^x 







It 

 fi ^ Cotx ^ 1 



12) I e^°^-^ — ■ . dx = - 



'}„ {pos.x^Sin.xY 2 



dx = -e— 1 V. T. 112. N». 5. 

 ifios.x -\- Sin.x)''' 



f 1 e7T — e-1'^ „ 1 e9'r + e-9'<" 1 



13)1 ei'^ Cos. - p X d X ^^ '^qCos.-pn -\- —%pSin.-pn Dienger, Cr. 34. 75 



J 2 45»+p* 2 42*-j-p' 2 



It 

 11 2f 1 ^llvTaq) 



14)1 el'Sin.~pxdx = ———^Uen^-\-e~<i^)'lqSin.-pn—{e<l'^—e-'i'")pCos.-pn\ jf'". 13. 



—It 



15)/ -i ^i^— L ^.da, = 2n\p4-2 — r5"e"P> Poisson, P. 19. 404. N'. 80. 



'] I — q eP+Cos.x e(x-Sm.x)i (^ ' i l-Vi ^ ) 



Page 397. 



