F. Algebr. 



Expon. TABLE 376. Lim.Oetl 



Logar. 



/■ 1 — e 



l)je-^{l—x) Ixda; = V. T. 112. N'. 2. 



2)je''^{ax-\-2)wU dx = — — {(a— l)e« + l} V. T. 112. N', 1. 



/■ e—l 



S)le-''* {x^ — l)xlxdx=~- V. T. 112. N°. 2. 



J 4)6 



[ 1 I e 



4) le-(i-x)-(2_ x){l~x)xL{l —x)dx = -^ V. T. 376. N'. 3. 



J 4e 



li)\e^-'^ xl{l—x)dx = ^■^^- V. T. 112. N\ 2. 



— alx ax = 1 



^)/^'' *, '^.'^.T,'" alxdx = 1—^e V. T. 112. N°. 5. 



F. Algebr. ent. 



Expon. monome. TABLE 377. Lim. et oo. 



Logar. 



1) ie-^xP-^lxdx = -'^^^^ Cauohy, P. 28. 147. P. 1. § 6. — Lejeune-Dirichlet, Cr. 15. 258. — 

 ' j dp Gruiiert, Gr. 2. 266. — Lobatscliewsky, Mem. Kasan. 1835. 211. 



2) /e-°* icP-i I- dx =^ -~ [la— Z'(p)} Cauchy, P. 28. 147. I. § 6. — H hlomilch, Stud. I. 14. 



f , 1^'^ f * 11 



'6)je-»^x''lxdx = -— i~ A — la-\-2:~} Schlomilch, Gr. 4. 167. 



4')je-''{x — p)xP-^lxdx = r (p) V. T. 113. N\ 3. 



b) j e~=<: (2 x^P — 1) xP-U X d T = -l^n V. T. 115. N'. 5. 



6) /e-P^' (px^ — a)x^''-Uxdx = la-i/i V. T. 114. N^ 9 



7 : 2(2p)« 



f 2 1 /2a4-l\ 

 7)fe-='{-Zx''—2a—l)x^''lxdx=-ri !— j V. T. 114. N\ 6. 



S)le-P'*{2px^—2a~l)x^<^lxdx = l«/2 ]/ - V, T. 114. N'. 8. 



Page 487. . 62* 



