Transcript lecture33

6.5 Applications of the
Definite Integral
In this section, we will introduce applications of
the definite integral.
• Average Value of a Function
• Consumer’s Surplus
• Future Value of an Income Stream
The Average Value of a Function
Let f(x) be a continuous function on the interval a  x  b
The definite integral may be used to define the
average value of f(x) on this interval.
The average value of a continuous function f(x) over
the interval a  x  b is defined as the quantity
1 b
f
(
x
)
dx

ba a
Compute the average value of
over the interval
f ( x)  x
0 x9
Using a = 0 and b = 9, the average value of f(x) over
the interval is
1 9
x
dx

90 0
Then
Consumers’ Surplus
Using a demand curve, we can derive a
formula that shows the amount that
consumers benefit from an open system
that has no price discrimination.
Consider a typical demand curve p = f(x)
where price decreases as quantity increases.
Let A designate the amount available and
B = f(A) be the current selling price.
Divide the interval from 0 to A into n
subintervals and take xi to be the right-hand
endpoint of the ith interval.
Consider the first subinterval from 0 to x1.
Suppose that only x1 units had been available
The price per unit could have been set at f(x1)
and these x1 units sold at that price.
However, at this price no more units could be
sold.
Selling the first x1 units at f(x1) would yield
Now, suppose that after selling the first units,
more units become available so that there is
now a total of x2 units that have been
produced.
If the price is set at f(x2), the remaining
x2-x1 = Δx units can be sold.
Continuing this process of price discrimination,
the amount of money paid by consumers would
be a Riemann sum
Taking n large, we note that the Riemann sum
approaches

A
0
f ( x) dx
Since f(x) is positive, this is the area under the
graph of f(x) from x = 0 to x = A.
However, in an open system, everyone pays
the same price B, so the total amount paid by
consumers is
[price per unit][number of units] = BA
BA is the area under the graph of the line
p = B from x = 0 to x = A. The amount of
money saved by consumers is the area
between the curves p = f(x) and p = B.
The consumers’ surplus for a commodity
having demand curve p = f(x) is

A
0
[ f ( x)  B] dx
where the quantity demanded is A and
the price is B = f(A).
Find the consumers’ surplus for each of
the following demand curves at the given
sales level x.
2
x
p
 x  50; x  20
200
Future Value of an Income Stream
The future value, of a continuous income
stream, of K dollars per year for N years
at interest rate r compounded
continuously is

N
0
Ke
r ( N t )
dt
Suppose that money is deposited steadily
into a savings account at the rate of
$14,000 per year.
Determine the balance at the end of 6
years if the account pays 4.5% interest
compounded continuously.