13.1 Iterated integrals 6553 By evaluating all of the integrals involved, show thatJot dz fozf(Y) dy= Jo` (t - y)f(y) dywhen
(a) p > -1 and f(Y) = Yp
(b) k > 0 and f (y) = e -4y
(e) w 0 and f(y) = sin wy4 The formula
Jotudv=uv]o-Jotvdu,
which abbreviates the formulafo u(x)v'(x) dz = u(z)v(x)]x=0-f of v(x)u'(x) d-,
for integration by parts, has unexpected applications. Assuming that f is con-
tinuous andI f,,'d, foxf(Y)dY,
find the result of integrating by parts withu(x) = foxf(y) dy v'(x) = 1
U, (x) = AX), v (x) _ - (t - x).5 Calculate the two integrals I and j defined byI - Jo° dxfoxf(x,Y) dy,j
=foa dy Jva f(x,Y)and show that they are equal when(a) p > -1, q > -1 and f(x,Y) = xpy4
(b) f(x,y) = ex+v6 Show that, when n > -1,
i i 2,.+s _ 2Jo dxf (x+Y)"dy= (n+1)(n+2)
7 Show that8 Show thatf dxJlx-f ydy=Zlog2.
1J
i i 1 _
o dxJo (x+Y)Zdy 0Ddx9 Supposing that 0 < p < 2 and p 0 1, showthat
i i 1 2z" - 2
Jo dxJo (x+y)pdy (2-p)(1-p)