4.4 Areas and integrals 239two regions R1 and R2. Use partitions and Riemann sums to obtain the
formulasIR1I = f0
-2[fi(x) - 12(x)] dx, IR21 fog[j2(x)- fi(x)] dx,
1811 + IR21 = f221f1(x) -f2(x)1 dx.Remark: The widths and heights of rectangles are always positive, and mistakes
in sign are undesirable. When hasty calculations indicate that an area or a
R ,f,( x ) y
o'
R1
1 fi(x)
_21 -3
'- f2(x) 5Figure 4.491population of a city is negative, the calculations
should be examined.
2 The graphs in Figure 4.491 are graphs of
y = 3x and y = x3 - x. Find IR1I + 1R21, this
being the sum of the areas of the two regions
bounded by the graphs. 14ns.: 8.
3 With Figure 4.492 to provide assistance,
make a partition of the interval 0 <- x <- 2 to ob-
tain the area IS11 of the set S1 bounded by the
graphs of y = 0, x = 2, and y = x2. Try to repairYFigure 4.492the work if the result does not have reasonable agreement with an estimate made
by counting squares and partial squares included by S1. Then interchange the
roles of x and y to find the area IS21 of the set S2 bounded by the graphs of x = 0,
y = x2, and y = 4. Make a partition of the interval 0 < y < 4 and be sure that
the correct integrand and limits of integration( appear in the calculation
IS21 = lim I f(y) Ay=JvVZf(y)
dyIn this case also, try to repair the work if the result clashes with the result of
counting squares. Finally, have another look at Figure 4.492 and see what
IS1I + IS21 should be.
4 Referring again to Figure 4.492, obtain IS21 by starting with a partition
of the interval 0 S x S 2 and using an estimate of the area of the part of S2
that stands above the interval of length Ax (or Axk) containing the point x (or xk).