4.2 Riemann sums and integrals 217So far, the integral in (4.271) has been defined only when x > a.now completethe definition by setting
We(4.281) f as f (t) dt= 0,
fax
f (t) dt = -f a
f (t) dt,the second formula being valid when x < a and f is integrable over the
interval from x to a.
Problems 4.29
1 Practice the art of telling how the numberLX f(i)dtis defined. Be prepared to give the full details, including Riemann sums, at
any time.
2 Tell whether you think it wise to abbreviate the statement "To each
positive number e there corresponds a positive number S such that
[nn
Ljlf(tk) At, - far' f(t) di I < ewhenever the sum is a Riemann sum formed for a partition P of the interval
a < t _< x having norm less than S" to the statementlim f(tk) Itk = f X f (t) dt.
PI-0 k=1aRemark: If you do not have an opinion, think about the matter and get one.
3 For better or for worse, the "formula"limIf(tk)L1tk =
faXf(t)
dtis considered to be an assertion. Tell precisely what it means.
4 Tell whether you would like to learn and use a completely new notation by
which the "formula"approxI f (tk) L1 tk = fx
f (t) dt
eJPI<5 k=1 ais used to abbreviate the statement that to each positive number a there corre-
sponds a positive number S such thatI f(tk) Otk -fax f(t) dt I < e
k=1whenever P is a partition of the interval a 5 t<-- x for which JPJ < S. Remark:
If you do not have an opinion, think about the matter and get one.
5 We often hear about the great scientific progress of our modern era,
and we should think about an example. One of the great strides forward is made