498 Exponential and logarithmic functions
With or without more attention to details, jump to the conclusion that, for each
n=1, 2, 3, ... ,
n xk xn+1 Jn+1(6) O S e= - I -k!< e"(n + l)!<eA (n + 1)!
k=OWhile this may not be a suitable time to worry about the details, we can be sure
that if 4 = 400, then the quantity
,4n+1 14 .4 14 A A .4 A .4
(n+1)!- 1 2 3 4 5 n-1 nn+lwill be large when n is about J. The quantity will nevertheless be near 0 when
n is sufficiently great. Therefore,
n(7) ex = lim I = i + x +
xz+
x3+
x4+ ....
n-iw k-0 2! 3!^41While (7) is more spectacular than (6), it is not always as useful. Show that
putting x = B = 1 in (6) gives the formula(8)^11
(n+ 151*^3
Verify that
1=1.
1 = 1.
1/2! = 0.5
1/3! = 0.16666 66666
1/4! = 0.04166 66666
1/5! = 0.00833 33333
1/6! = 0.00138 88888and that the next term is obtained by dividing by 7. Continue the work to
obtain a decimal approximation to e that is correct to 6D (5 decimal places after
the decimal point).
9 Supposing that x < 0, observe that(1) OSel51.
Replace x by i and integrate over the interval from x to 0 to obtain(2) 051-e=5-x.
Replace x by i and integrate over the interval from x to 0 to obtain
?z
(3) 05e 1 -x5Repeat the process to obtain(4)(5)051+x+2a=<3
xz xa x4