524 Exponential and logarithmic functions
and is quite near 1 even when n is as small as 4 or 3. Thus, even when n is quite
small, the number 1/\ is a very good approximation to the probability of
finding exactly n heads and exactly n tails when 2n coins are tossed. This
astonishing result has very significant consequences, and persons who comprehend
it may say that mathematics was never so beautiful before, and mathematics
really is the Queen of the Sciences.
7 Derive the formula(1) I ersx sin bx dx =e°x(a sinabxl-bb cos bx) +in the following way. Setto obtain(2)Then setto obtain(3)u=ell, dv=sinbxdx
a
Jellsinbx dx = -eb
s x+ bfe0xcosbx dx.
u = sin bx, de = ell dx1
e °, sin bx dx =e°x sin bx-b jJ
a a ell cos bx dx.Then combine (2) and (3) to obtain (1). Now derive (1) in the following way.
Let I denote the left members of (1), (2), and (3). Setu = eax, de = cos bx dx
to put (2) in the form(4)ell cos bx + a eax sin bx-a I
b bL b b JThen solve (4) for I and obtain (1).
8 Derive the formulaf ell cos bx dx =e°x(b sin bx + 2 cos bx) +
c..9 Sketch graphs of y = ex and y = log x in the same figure. Let Rl be
the region consisting of points (x,y) for which x < 0 and 0 <y 5 Cr. This
unbounded region Rl is said to be bounded by (or to have boundaries) thex axis,
the y axis, and the graph of y = ex. Let R2 be the region consisting of points
(x,y) for which x = 0 and y 5 0 together with points (x,y) for which 0 <x 5 1
and log x 5 y 5 0. This region R2 is said to be bounded by the x axis, the y
axis, and the graph of y = log x. Observe that R, and R2 are congruent regions.
Use the fact that Rl and R2 possess areas IR1J and JR21 for whichAd = lim f h e x dx, JR21 = lim fhI (-log x) dx
to show that IRIJ = IR2I = 1.