Review

About This Presentation

Title:

Review

Description:

... quadratic function graphs as a parabola and looks like. If a ... Since a 0 the parabola of this quadratic function opens downward, TR is maximum at the vertex ... – PowerPoint PPT presentation

Number of Views:422

Avg rating:3.0/5.0

Slides: 113

Provided by: buha

Category:

more less

Transcript and Presenter's Notes

Title: Review

1
Review
2
Introduction to Linear Functions (Equations)

A function is a rule (process or method) that
produces a correspondence between two set of
elements such that to each element in the first
set (x-values) there corresponds one and only one
element in the second set (y-values). The set all
possible x-values is called the domain, and the
set of all possible y-values is called the range.

3
Linear Equation
Range
Domain

Y 2x 4 y-intercept (when x
0)
Independent Variable
Slope
Dependent Variable

X
Y
Y
-2 -1 0 1 2
0 2 4 6 8
4
X
-2
0
4
The Cartesian Coordinate System

Two perpendicular lines one of which is
horizontal
The lines are called the coordinate axes and
their point of intersection the origin

Y Axis
(,) Quadrant I
Quadrant II (-,)
X Axis
IV (,-)
III (-,-)
5
The Cartesian Coordinate System

The horizontal axis is usually called the x-axis
The vertical axis is called the y-axis
A point in the plane can now be represented
uniquely in this coordinate system by an ordered
pair of numbers - that is, a pair (x,y) where x
is the first number and y the second
Sketch the straight line that passes through the
point (-2,1) (3,4).

(3 , 4)
1
3
-2
6
Evaluating a function

For any element x in the domain of the function
, the symbol (x) represents the element in the
range of corresponding to x in the domain of .
If x is an input value, then (x) is the
corresponding output value.
For example if (x) 5x 5 evaluate (1), (-1),
(0) and then make a table of values including
ordered pairs.
(1)5(1)510 (1, 10)
(-1)5(-1)50 (-1, 0)
(0) 5(0)55 (0, 5)

7
Slope-intercept form of a linear Equation

Slope-intercept form of a linear Equation
Y mx b
b the y-intercept or the value of y when x 0
m slope
The concept of slope is extremely important in
applications to business since it is a measure of
the rate of change in Y (dependent Variable)
given a one unit increment in X (independent
Variable)

8
SLOPE

Marginal Revenue Change in Total Revenue /
Change in Quantity
The slope of a line is used to measure the
steepness of a line Tells how much line rises or
falls in response to a one unit increment along
horizontal axis
The slope of a straight line is a measure of the
rate of change of Y with respect to X
m (y2 - y1) / ( x2 - x1) vertical change /
horizontal change rise / run
A positive slope slants upward from left to
right ( Y increases as x increases ) Whereas,
line with negative slope slants downward from
left to right ( Y decreases as X increases)

Y
X
a. The line rises (mgt0)
Y
X
b. The line falls (mlt0)
10
Point-Slope Form

Recall the Slope Formula can be stated as
m (y2 - y1) / (x2 - x1)
which is equal to
y2 - y1 m (x2 - x1) or
y - y1 m ( x - x1) This is the point-slope
form of a linear equation
Point-Slope Form
An Equation of the line that has slope m and
passes through the point ( x1, y1) is given by
y - y1 m (x - x1)

11
Point Slope Form

Find an equation of the line that passes through
the point (1, 3) and has slope 2
y-32(x-1) y-32x-2 y2x1

12
SLOPE FORMULA

Find an equation of the line that passes through
the point
(-3, 2) and (4, -1)
Using the point slope form of the equation of a
line with the point (4,-1 and a slope m-3/7 we
have

13
DEMAND APPLICATIONS

Demand Equation
Suppose consumer will demand 40 units of a
product when the price is 12 per unit and 25
units when the price is 18 each. Find the
demand equation assuming that is linear. Find the
price per unit when 30 units are demanded

14
Demand Equation Solution

The Points are
(40,12) and (25,18)
Slope Formula
Hence an equation of the line is
P-12-2/5 (Q-40) or P-2/5Q28

15
Demand Equation Solution

If Q0 then P28
If P0 then Q70
When Q30 P16

P
28
16
30
Q
70
16
SUPPLY APPLICATIONS

Supply Equation
Suppose a manufacturer of shoes will place on the
market 50 (thousand pairs) when the price is 35
(dollars per pair) and 35 when the price is 30.
Find the supply equation, assuming that price p
and quantity q are linearly related

17
Supply Equation Solution

Solution
Hence the equation of the line is
P-351/3(Q-50) or

18
Cost Equation

Cost Equation
Suppose the cost to produce 10 units of a product
is 40 and the cost of 20 units is 70. If cost
c is linearly related to output q, find a linear
equation relating c and q. Find the cost to
produce 35 units.

19
Cost Equation Solution

The line passing through (10,40) and (20,70) has
slope
So an equation for the line is
C-403(Q-10) or C3Q10
If Q35 then C3(35)10115

20
Some Definitions from Microeconomics

Fixed Cost or FC is the component of cost that is
independent of output
Variable Cost or VC is that component of cost
that varies with output
Total Cost or TC is the sum of fixed cost and
variable cost or TC FC VC
Average Variable Cost is the variable cost per
unit of output or AVC VC/q
Average Fixed Cost is the Fixed Cost per unit of
output or AFC FC/q
Average Total Cost is the TC (VC FC) per unit
of output or ATC TC /q or (FCVC)/q
Marginal Cost is the Extra cost associated with
producing an additional unit of output.
MC Change in TC / Change in q
TR Price Quantity

21
COST-OUTPUT IN A LINEAR FRAMEWORK

TC3003q

VC
600
FC
If Q100 C600
VC
AVC(100)VC/Q300/1003
ATCTC/Q600/1006
300

FC
MC3(Slope of TC)
100
22
Quadratic Function

Although many business relationships are linear
or can be approximated by a linear function, in
some cases we must look for alternative
(nonlinear) functional forms to express business
relationships.
At this point we want to discuss quadratic
functions (text material is on pp. 10-12 in the
Algebra Refresher and 67-70)A quadratic function
is a function of the following form
where a, b, and c are constants and not 0
The y-intercept is c
The x-intercepts are found by setting y0 and
solving for x

A quadratic function graphs as a parabola and
looks like

Vertex
Vertex
If a gt 0
If a lt 0
24
Vertex

If agt0 the vertex is the lowest point on the
parabola. This means that f(x) has a minimum
value at this point.
If alt0 the vertex is the maximum value of f(x)
The Vertex is always

A quadratic equation is also referred to as
a second-degree equation
an equation of degree two
Solving quadratic equations
Solution by factoring
Example Solve
thus (x-6)(x-6)0
pr x6 note only 1 root

Solution by quadratic formula

Example Solve
1. Could factor (2x-3)(x5)0
so 2x-30 or x3/2
and x50 or x-5
2. Could use Quadratic Formula
note a2, b7, and c-15

-5
3/2
28

Suppose we have the following quadratic profit
function
We can use quadratic formula to find roots and
the vertex is always located at the point -b/2a
The vertex will occur where Adv (the x variable
in general) is equal to -b/2a
Where a and b are as defined in the quadratic
equation.

So for our specific function
a -2 b 20 and c 400
So the vertex occurs where Adv -b/2a
-20/2(-2) 5
If Adv 5

30
Quadratic Formula

What are the roots (Adv values where Profit0)?

Profit

Profit
450
Adv
5
-10
20
32
Maximum Revenue

The demand function for a manufacturers product
is p1000-2q, where p is the price (in dollars)
per unit when q units are demanded (per week) by
consumers. Find the level of production that will
maximize the manufacturers Total Revenue and
determine this revenue.
TRPQ(1000-2q)q1000q-2q2
Since alt0 the parabola of this quadratic function
opens downward, TR is maximum at the vertex
The maximum Revenue 1000(250)-2(250)125,000

33
Continued

Thus the maximum revenue that the manufacturer
can receive is 125,000 which occurs at a
production level of 250 units

TR1000q-2q2
TR
q
250
500
34
BREAK-EVEN ANALYSIS

Break-Even
Means that a firm has a profit of zero
Means TR TC, since Profit TR-TC
Provides bench mark for profit planning

35
Application

Profit Analysis
We know from microeconomics that profit is the
difference between total revenue and total cost.
Therefore, we can write Profit Total Revenue -
Total Cost or Profit TR - TC
If a firm can sell all it produces for 5 per
unit,
TR 5q, where q is output or units sold
If this same firm has fixed costs of 150 and
its variable costs increase by 3 for every unit
produced, TC 150 3q

36
Application

TR 5q and TC 150 3q and recall that
and profit is defined as, Profit TR - TC
Thus, Profit 5q - (150 3q)
or Profit 2q 150

37
Applications

a. Graph the following supply and demand
functions
SS p0.20q 10
DD p-0.40q70
By substituting 0.20q10 for p in the demand
equation
we get
0.20q10-0.40q 70
q0.6060 and q100
Substitute this value in the SS equation to find
p30

38
Continued

B. Find the equilibrium point E
(q,p) (100,30)

p
SS
P0.20q10
70
30
DD
10
P-0.40q70
100
q
39
Continued

C. Plot the new supply function
SS p0.25q18(NEW)
SS p0.20q10(Old)
DD p-0.40q70
By substituting 0.25q18 for p in the demand
equation we get
0.25q18-0.40q70
0.65q52 OR q80
Substitute this value in the New SS equation to
find p
P0.25(80)1838

40
Continued

D. Find the new equilibrium point (80,38)

p
New SS
New Equilibrium
Old SS
38
30
18
DD
10
80
100
q
41
Application

If the DD p-0.40q70 find the Revenue Function.
Ans TR-.4q270q

42
Calculus

Derivatives is basically nothing more than a set
of rules for finding slopes and rates of change.
In a business context finding the slope of a
curve at a point can mean among other uses,
1. Finding slope of Total Cost function at
certain level of output. MC is the slope of TC
and the derivative of TC
2. Finding slope of Total Revenue function at a
certain level of out put. MR is the slope of TR
and the derivative of TR
Knowing both MC (derivative of TC) and MR
(derivative of TR) enables the manager to
determine how much output a firm must produce to
earn its maximum possible profit

43
RULES FOR DIFFERENTIATION
44
1. CONSTANT RULE

1. THE CONSTANT RULE
The derivative of a constant function is zero.
That is f ( c ) 0, c is a constant.
Ex f(x)28 then f (x) 0
if f(x) -2 then f (x) 0

45
2. THE (SIMPLE) POWER RULE

f (x) xn then f (x) nx(n-1)
Ex if f(x) x then
f (x) 1x(1-1) 1
if f(x) x8 then
f (x) 8x(8-1) 8x7
if f(x) x-10, f (x) -10x-11
if f(x) x5/2 f (x) 5/2x3/2

46
3. THE CONSTANT MULTIPLE RULE

The derivative of a constant times a
differentiable function is equal to the constant
times the derivative of the function.
if f (x)3x2 f (x) 23x 6x
if f(x) 5x3 then f (x)15x2
if f(x) 3/ x1/2 f (x) 3x-1/2
f (x) 3(-1/2x-3/2) -3/2(x-3/2).

47
4. THE SUM AND DIFFERENCE RULES

The derivative of the sum or difference of two
differentiable functions is the sum or difference
of their derivatives.
Ex f(x) g(x) f (x) g (x)
and
f(x) - g (x) f (x) - g (x)

48
Continued

1. f(x) 4x5 3x4 - 8x2 x 3
f (x) 20x4 12x3 - 16x 1 0

49
Main Concepts

1. A derivative is the slope of a tangent line
to a function.
2. Evaluating a derivative means finding the
value of the derivative of the function yf(x) at
a point.
3. The derivative is an instantaneous rate of
change
4. If a derivative of a function is positive at
a point the slope will be positive at the same
point.

50
5. THE PRODUCT RULE

The derivative of the product of two
differentiable functions is equal to the first
function times the derivatives of the second plus
the second function times the derivative of the
first.
d/dx f(x) g(x) f(x) g (x) g(x) f
(x)
Ex f(x) (2x2 - 1)(x33)
f (x) (2x2 - 1)(3x2) (x3 3) (4x)
6x4 -3x2 4x4 12x
10x4 - 3x2 12x

51
6. THE QUOTIENT RULE
The derivative of the quotient of two
differentiable functions is equal to the
denominator times the derivative of the numerator
minus the numerator times the derivative of the
denominator, all divided by the square of the
denominator d/dx f(x)/g(x) g(x) f (x) -
f(x) g(x)/ g (x)2
52
THE QUOTIENT RULE

53
THE QUOTIENT RULE

54
Marginal Analysis

Marginal Cost function MC(x)C(x)
Marginal Revenue function MR(x)R(x)
Marginal Profit function MP(x)P(x)
Average Cost function AC(x) C(x)/x
Average Profit function AP(x)P(x)/x

55
Applications

An important use of rates of change is in the
field of economics. Economists refer to marginal
profit, marginal revenue and marginal cost as the
rates of change of the profit, revenue, and cost
with respect to the number q of units produced or
sold. An equation that relates these three
quantities is PR-C
where P, R and C represent the following
quantities
P total profit, RTotal revenue and Ctotal
cost
The derivatives of these quantities are called
the marginal profit, marginal revenue, and
marginal cost.

56
Continued

Ex Find the marginal profit for a production
level of 50 units
P 0.0002q3 10q
MP 0.0006q2 10
0.0006(502)10
11.50 per unit

57
Applications

Ex Find the marginal revenue
A fast-food restaurant has determined that the
monthly demand for their hamburgers is given by
p (60,000 -q)/20,000
Find the MR when q20,000
TR pq
(60,000q-q2)/20,000
MR 60,000-2(20,000)/20,000 1 per unit.

58
Applications

Ex find the marginal cost for a production level
10 units
IF TC0.1q2 3
MC .2(10) 2
MC is the approximate cost of one additional unit
of output.

59
Finding Average Cost

A company estimates that the cost (in dollars) of
producing x units of a product can be modeled by
C800 0.04x 0.0002x2
Find the the average cost function
Solution
C represent the total cost, x represents the
number of units produced, and AC represents the
average cost per unit.
AC C/x
Substituting the given equation for C produces
AC (8000.04x 0.0002x2)/(x)
800/x 0.04 0.0002x

60
7. CHAIN RULE (14.1)

If yf(u) is a differentiable function of u, and
g(x) is a differentiable function of x, then
yf(g(x)) is a differentiable function of x, and
d/dx f(g(x)) f (g(x))g(x).
When applying the Chain rule it helps to think of
the composite function yf(g(x) or yf(u) as
having two parts an inside and an outside
yf(g(x))f(u)

Inside
Outside
61
7. CHAIN RULE

The Chain Rule tells you that the derivative of
yf(u) is te derivative of the outer function
times the derivative of the inner function. That
is yf (u)u

62
General Power Rule

d/dx un nu(n-1) u

63
Further Applications of the Derivative

First Derivatives and Graphs
Second Derivatives and Graphs
Optimizing Functions on a Closed Interval
The second Derivative Test and Optimization

64
APPLICATION OF DIFFERENTIAL CALCULUS

WHAT IS OPTIMIZATION
Optimization deals with finding when minimum
values exist and linking that to variables
controlled by managers. And one of the most
useful applications to calculus in management and
economics is finding the maximum and minimum
values for a function.

65
Continued

STATIONARY POINTS
The slope of a line tangent to a curve at a
point is, by definition, the value of the first
derivative at that point. Hence when the first
derivative is 0, the tangent line is horizontal.
Point when this occurs are called
STATIONARY POINTS
A stationary point on f(x) is a point where
f(x)0

66
STATIONARY POINTS

Ex if
1.To find the stationary point we start with the
first derivative
and then we set it equal to zero

67
Continued

The values of x are determined by setting each
factor of the last expression equal to 0. Thus
x0 and x4.
The function values for x0 and x4 are
The stationary points are P(0,37) and Q(4,5)

68
Continued

Graph of
Where Plocal maximum. Q is a local minimum.
For this class Local Maximum and local minimum
are also Absolute minimum and absolute maximum

P(0,37)
Q(4,5)
69
Critical Number or Critical Value

Critical Number is a number for x that makes the
derivative of the function either 0 or
undefined.
Ex
Ex
x-2 is a critical number because it makes the
function undefined.
Ex

70
Continued

To find all critical numbers
Take the derivative of a given function
2. Set both the numerator and denominator of a
derivative0 and solve for x

71
Relative Extrema

We will examine the points at which a function
changes from increasing to decreasing or
viceversa. At such point, the function has a
relative extremum. (The plural of extremum is
extrema.) The relative extrema of a function
include the relative minima and the relative
maxima of the function

72
Relative ExtremaRelative Maximum and Minimum

To find relative max or min
1. Put critical number on a number line
2. Pick any number to the left side and
substitute into the first derivative
If you get a positive value, the functions graph
is sloping upward in that section of graph. If
you get a negative value, the functions graph
slopes down in that section.
3. Pick any number to right side and substitute
into 1st derivative. If you get a positive value
the functions graph is sloping upward in that
section of graph. If you get a negative value,
the functions graph slopes down in that section

73
Continued

Ex 1.
Differentiate original function
Set derivative equal to 0
Factor
Critical x0 and x1

74
Continued
75
Continued

f(x)

CN x0, x1
(0,0)
Increasing
Increasing
Decreasing
(1, ½)
76
Continued

Ex 2. Find the critical numbers and the open
intervals on which the function is increasing or
decreasing

77
Find the Relative Extrema

Find the Relative Extrema
f(x) 2x3 -3x2 -36x14
1st find the critical s of f
f (x)6x2 -6x -36 Find derivative of f
6x2 -6x -36 0 Set derivative equal
to 0
6(x2 -x -6)0 Factor out common
factor
6(x-3)(x2)0 Factor
x -2,3 Critical Numbers
Using these numbers, you can form three test
intervals
(-infinity, -2) (-2,3) and (3, infinity)

78
Continued
79
Continued

You can conclude that the critical number 2
yields a relative maximum (f (x) changes sign
from positive to negative) and the critical
number 3 yields a relative minimum (f (x)
changes sign from negative to positive)
To find the y-coordinates of the relative
extrema, substitute the x-coordinates into the
original function. For instance the relative
maximum is f(-2)58 and the relative minimum is
f(3)-67

80
Applications

Find the production level that produces a maximum
profit for the following profit function.
Solution
Begin by setting the MP equal to 0 and solving
for x
x24,400 units

81
Continued

X24,400 correspond to the production level that
produces a maximum profit. To find the maximum
profit, substitute x24,000 into the Profit
function.

82
Cost Function

A retailer has determined the cost ( C ) for
ordering and storing x units of a product to be
The delivery truck can bring at most 200 units
per order. Find the order size that will minimize
the cost
Solution
Find the critical numbers x?82 units
Therefore C(82)489.90 which is the minimum

0ltxlt2000
83
Profit

When a soft drinks sold for .80 per can at
football games, approximately 6,000 cans were
sold. When the price was raised to 1 per can,
the quantity demanded dropped to 5,600. The
initial cost is 5,000 and the cost per unit is
.40. Assuming that the demand function is
linear, what price will yield the maximum profit?
Solution
Demand (6,000 , 0.80) (5,600, 1)
m (1-.80)/(5600-6000) -0.0005
p -1 -0.0005(x-5600)
p -0.0005x 3.80
Cost
C5000 .40x

84
Continued

Profit Revenue - Cost(TOTAL COST)
Revenue PriceQuantity (instead of q lets use
x)
R x(-0.0005x 3.80)
Profit x(-0.0005x 3.80) - (5000.40x)
-0.0005x2 3.40x -5000
P -0.001x 3.400
Critical number x3,400
p(3,400) The price that will yield the maximum
profit is 2.10 per can.

85
HIGHER ORDER DERIVATIVE

We know that the derivative of a function yf(x)
is itself a function, f (x) If we differentiate
f (x), the resulting function is called
the second derivative of f at x. It is denoted f
(x), which is read f double prime of x.
Similarly, the derivative of the second
derivative is called the third derivative,
written f(x). Continuing this way, we get
higher order derivative.
Ex If f(x) 6x3 -12x26x-2 find all higher
order derivatives.
f (x) 18x2 -24x 6

86
HIGHER ORDER DERIVATIVE

f(x) 36x -24
f(x)36
f(4)(x)0

87
Concavity

We use the second derivative to find the
intervals when a function is concave up, concave
down, point of inflection or point of diminishing
returns.

88
Points of Inflection

If the tangent line to a graph exists at a point
at which the concavity changes, then the point is
a point of inflection.
Finding Points of inflection
Discuss the concavity of the graph of f and find
its points of inflection.
f(x) x4 x3 - 3x2 1
Solution
Begin by finding the second derivative of f
f (x) 4x3 3x2 - 6x Find first
derivative
f (x) 12x2 6x -6 Find second
derivative
6(2x-1)(x1) Factor

89
Continued

From this you can see that the possible points of
inflection occur at x1/2 and x-1.
After testing the intervals
(-infinity, -1) , (-1, 1/2) and (1/2, infinity),
you can determine that the graph is concave
upward in (-infinity, -1), concave downward in
(-1, 1/2), and concave upward in (1/2,
infinity). Because the concavity changes at x-1
and x1/2, you can conclude that the graph has
points of inflection a these x-values.

90
Continued

Graph

Concave Upward
Point of inflection
Concave Upward
-1
Concave Downward
1/2
-2
Point of inflection
91
Second Derivative Test for Relative Extrema

1. Set f (x)0 and solve for x to determine the
stationary points
2.
(a) If f (x) gt0 (concave up), then the
stationary point is a local minimum
(b) If f (x) lt0 (concave down), then the
stationary point is a local maximum

92
Continued

Ex If f(x) x3 -6x2 37
Find local minimum and local maximum and
inflection points
1. f (x) 3x2 -12x Find the first derivative
x(3x-12) Factor
x0 and x4 are the stationary points
2. f (x) 6x -12 Find the second
derivative
x2 Inflection point
(a) f (0) -12
Because f (0) lt0 (concave down) the stationary
point is a local maximum
(b) f (4) 12
Because f (4) gt0 (concave up) the stationary
point is a local minimum

93
Continued

Graph

Q (0, 37)
Inflection Point
Concave Up
Concave Down
2
Q (4, 5)
94
APPLICATIONS

In economics, the notions of concavity is related
to the concept of diminishing returns. (The
postulate that as more and more units of a
variable resource are combined with a fixed
amount of other resources, employment of
additional units of the variable resource will
eventually increase output only at a decreasing
rate. Once diminishing return are reached, it
will take successively larger amounts of the
variable factor to expand output by one unit)
Example By increasing its advertising cost x (in
thousand of dollars) for a product, a company
discovers that it can increase the sales y
(thousands of dollars) according to the model
y 1/(10,000)(300x2 -x3) 0x200
Find the point of diminishing returns for this
product.

95
Solution

Begin finding the first derivatives of
y 1/10000(600x -3x2) First derivative
y1/10000(600-6x) Second
derivative
The second derivative is zero only when x100. By
testing the intervals (0, 100) and (100,200), you
can conclude that the graph has a point of
diminishing returns when x100.

96
Finding The Maximum Revenue

A company has determined that its total revenue
(in dollars) for a product can be modeled by
R -x3 450x2 52,500x 0x546
where x is the number of units produced and sold.
What production level will yield a maximum
revenue?
Solution To maximize the revenue, find the
critical numbers
R -3x2 900x 52,5000 Set derivative
equal to 0.
-3(x-350)(x50) 0 Factor
x 350 , -50
Critical numbers
The only critical number in the feasible domain
is x350. Therefore a production level of 350
units corresponds to a maximum revenue

97
Graph

Revenue

(350, 30,625,000)
(546,0)
350
98
Finding the Minimum Average Cost

A company estimates that the cost (in dollars) of
producing x units of a product can be modeled by
C800 0.04x 0.0002x2
Find the production level that minimizes the
average cost per unit.
Solution
C represent the total cost, x represents the
number of units produced, and AC represents the
average cost per unit.
AC C/x

99
Continued

Substituting the given equation for C produces
AC (8000.04x 0.0002x2)/(x)
800/x 0.04 0.0002x
You can find the critical numbers as follows
AC - 800/x2 0.00020 Set the
derivative to zero.
x2 800/0.0002
x2 4,000,000
x 2,000
The production level of x2000 minimizes the
average cost per unit.

100
Continued

Graph

AC
.84
2000 Units
101
Finding the Maximum Revenue

A business sells 2,000 units per month at a price
of 10 each. It can sell 250 more items per month
for each 0.25 reduction in price. What price per
unit will maximize the monthly revenue? Solution
1. Let x represent the number of units sold in a
month, let p represent the price per unit, and
let R represent the monthly revenue.
2. Because the revenue is to be maximized, the
primary equation is
R xp
3. A price of p10 corresponds to x 2,000 and
a price of p9.75 corresponds to x 2250. Using
this information you can use the point-slope form
to create the demand equation.

102
CONTINUED

m (10 - 9.75) / (2000 -2250) Find the slope
m -.001
p-10 -0.001(x-2000) Point-slope
form
p-0.001x 12
Substituting this value into the revenue equation
produces
R x(-0.001x12)
-0.001x2 12x
4. To maximize the revenue function, find the
critical numbers
R 12 -.002x0

103
Continued

x 6,000 Critical number
The price that corresponds to this production
level is
p12-0.001x Demand function
12 - 0.001(6000) Substitute 6,000 for x
6 Price per unit

(6000, 36000)
Revenue
6000
104
Regression Using Excel

Go to Excel, Select Tools, Choose Data Analysis,
Choose Regression from the list of Analysis
tools. Click OK.
Enter the Y input Range, Enter the Xs range,
select labels, select confidence levels. Select
Residuals, Residuals Plot, Standardized
Residuals.

105
Continued
106
Continued
107
Example Programmer Salary Survey

Excel Computer Output
The regression is
Salary 3.17 1.40 Exper 0.251 Score
Predictor Coef Stdev
t-ratio p
Constant 3.174 6.156 .52 .613
Exper 1.4039 .1986 7.07 .000
Score .25089 .07735 3.24 .005
s 2.419 R-sq 83.4
R-sq(adj) 81.5

108
Interpreting the Coefficients
b1 1. 404
Salary is expected to increase by 1,404
for each additional year of experience (when
the variable score on programmer attitude test
is held constant).
109
Interpreting the Coefficients
b2 0.251
Salary is expected to increase by 251 for
each additional point scored on the programmer
aptitude test (when the variable years of
experience is held constant).
110
Example Programmer Salary Survey