the consumer theory how consumers make choices under income constraints
TRANSCRIPT
The Consumer Theory
How Consumers Make Choices under Income Constraints
Some Questions
• What is behind a consumer’s demand curve?
• How do consumers choose from among various consumer “goods”?
• What determines the value of a consumer good?
Utility • The value a consumer places on a unit of a good or
service depends on the pleasure or satisfaction he or she expects to derive form having or consuming it at the point of making a consumption (consumer) choice.
• In economics the satisfaction or pleasure consumers derive from the consumption of consumer goods is called “utility”.
• Consumers, however, cannot have every thing they wish to have. Consumers’ choices are constrained by their incomes.
• Within the limits of their incomes, consumers make their consumption choices by evaluating and comparing consumer goods with regard to their “utilities.”
Our basic assumptions about a “rational” consumer:
• Consumers are utility maximizers• Consumers prefer more of a good (thing) to less of it. • Facing choices X and Y, a consumer would either prefer
X to Y or Y to X, or would be indifferent between them. • Transitivity: If a consumer prefers X to Y and Y to Z,
we conclude he/she prefers X to Z• Diminishing marginal utility: As more and more of good
is consumed by a consumer, ceteris paribus, beyond a certain point the utility of each additional unit starts to fall.
How to Measure Utility
Measuring utility in “utils” (Cardinal): • Jack derives 10 utils from having one slice of pizza but only 5 utils from
having a burger.
• In many introductory microeconomics textbooks this approach to measuring utility is still considered effective for teaching purposes.
Measuring utility by comparison (Ordinal): • Jill prefers a burger to a slice of pizza and a slice of pizza to a hotdog. Often consumers are able to be more precise in expressing their preferences.For example, we could say: • Jill is willing to trade a burger for four hotdogs but she will give up only
two hotdogs for a slice of pizza. • We can infer that to Jill, a burger has twice as much utility as a slice of
pizza, and a slice of pizza has twice as much utility as a hotdog.
Utility and Money • Because we use money (rather than hotdogs!) in just about
all of our trade transactions, we might as well use it as our comparative measure of utility.
(Note: This way of measuring utility is not much different
from measuring utility in utils) • Jill could say: I am willing to pay $4 for a burger, $2 for a
slice of pizza and $1 for a hotdog.
Note: Even though Jill obviously values a burger more (four
times as much) than a hot dog, she may still choose to buy a
hotdog, even if she has enough money to buy a burger, or a
slice of pizza, for that matter. (We will see why and how shortly.)
Total Utility versus Marginal Utility • Marginal utility is the utility a consumer
derives from the last unit of a consumer good she or he consumes (during a given consumption period), ceteris paribus.
• Total utility is the total utility a consumer derives from the consumption of all of the units of a good or a combination of goods over a given consumption period, ceteris paribus.
Total utility = Sum of marginal utilities
The Law of Diminishing Marginal Utility
• Over a given consumption period, the more of a good a consumer has, or has consumed, the less marginal utility an additional unit contributes to his or her overall satisfaction (total utility).
• Alternatively, we could say: over a given consumption period, as more and more of a good is consumed by a consumer, beyond a certain point, the marginal utility of additional units begins to fall.
Total and Marginal Utility for Ice Cream
Q ($) TU ($) MU0 01 40 402 85 453 120 354 140 205 150 106 157 77 160 38 160 09 155 -510 145 -10
145
Total Utility
0
50
100
150
200
1 2 3 4 5 6 7 8 9 10 11
($) MU
-20
-10
0
10
20
30
40
50
1 2 3 4 5 6 7 8 9 1 11
Q ($) TU ($) MU0 01 40 402 85 453 120 354 140 205 150 106 157 77 160 38 160 09 155 -510 145 -10
145
How much ice cream does Jill buy in a month?
Some facts of life: • Limited income• Opportunity cost of making a choice:
Buying ice cream leaves Jill less money to buy other things: each dollar spent on ice
cream could be spent on hamburger. • In fact, consumers compare the (expected)
utility derived from one additional dollar spent on one good to the utility derived from one additional dollar spent on another good.
More facts • The prices of hamburger and ice cream are market-
given; the consumer cannot change the price of a good.• Jill, like any other rational consumer, wishes to
maximize her utility. • The opportunity cost of one dollar spent on ice cream is
the forgone utility of one dollar that could be on hamburger.
• If the utility of one additional dollar of ice cream is greater than the utility of the last dollar spent on hamburger, Jill can increase her total utility by spending one dollar less on hamburger and one dollar more one ice cream.
Hamburger or Hotdog • If based on their perceived marginal utilities
Jill values a hamburger four times as much as a hotdog, but the market price of a burger is eight times the price of a hotdog, she will buy a hotdog. That is because one dollar’s worth of hotdogs would give her more utility that one dollar’s worth of burgers. That is:
MUD/PD > MUH/PH
Utility Maximizing Rules • A rational consumer would buy an additional unit
of a good as long as the perceived dollar value of the utility of one additional unit of that good (say, its marginal dollar utility) is greater than its market price.
• The Two-Good Rule
MUI MUH
--------- = ----------
$PI $PH
Utility Maximization under An Income constraint
• Consumers’ spending on consumer goods is constrained by their incomes:
Income = Px Qx + Py Qy + Pw Ow + ….+Pz Qz • While the consumer tries to equalize MUx/Px , MUy/ Py,
MUw/Pw,………. and MUz/Pz , to maximize her utility her total spending cannot exceed her income.
For example, with an and income of $86 Jill is trying to decide how much ice cream and how much hamburger she should buy.
Jill’s income = 5x10 + 6 x 6 = 86
Optimal Purchase Mix: Ice Cream and Hamburger Q MUI PI MUI/PI MUH PH MUH/PH1 40 10 4 45 6 7.52 45 10 4.5 30 6 53 35 10 3.5 20 6 3.34 20 10 2 15 6 2.55 10 10 1 10 6 1.76 7 10 0.7 6 6 17 3 10 0.3 3 6 0.58 0 10 0 0 6 0
The Budget Line Income = QI.PI + QH.PH = (5 x 10)+(6 x 6) = 86
Ice Cream
Hamburger
o
8.6
14.33
5
6
86/10
86/6
Slope = PH/PI = 6/10 = 8.6/14.33 = 0.6
An Optimal Change Recall that to maximize utility a consumer
would set:
(MUx/Px) = (MUy/Py)
If Px increases this equality would be disturbed: (MUx/Px) < (MUy/Py)
To return to equality the consumer must adjust his/her consumption. (Have in mind that the consumer cannot change prices, and he/she has an income constraint.)
What are the consumer’s options?
(MUx/Px) < (MUy/Py)
In order to make the two sides of the above inequality equal again, given that Px and Py could not be changed, we would have to increase MUx and decrease MUy. Recalling the law of diminishing marginal utility, we can increase MUx by reducing X and decrease MUy by increasing Y.
Price and the Shape of the Demand Curve
The two effects of a price change:
– Income effect:Normal good (-)Inferior goods (+)
– Substitution effect Buying less X and substituting it with Y until the optimizing
condition is restored (-)
As Px increases, Qx decreases
Consumer Surplus
• The difference between what a consumer is willing to pay for an addition unit of a good and the market price that he/she actually pays is referred to as “consumer surplus”.
• The area between the demand curve and the price (line) measures the total consumer surplus.
Consumer Surplus
Price
DQx
0
P
Consumer Surplus
Price
DQx
0
P
D’
P’
An Alternative Approach to the Consumer Theory
• Indifference curves
An indifference curve is a line drawn in a two-dimensional space showing different combinations of two goods from which the consumer draws the same amount of utility and therefore he/she is “indifferent” about.
• Budget lines
A budget line is a line drawn in a two-dimensional space representing a certain level of income with which the consumer can purchase various combinations of two goods at given prices.
Properties of Indifference curves • Indifference curves for two “goods” are generally
negatively sloped• The slope of an indifference curve reflects the degree of
substitutability of two goods for one another• Indifference curves are generally convex, reflecting the
principle of diminishing returns• Indifference curves never cross• Indifference curves that are farther from the origin
represent higher levels of utility• Indifference curves for a “good” and a “bad” are
positively sloped
Indifference Curves
X
Y
U1U2
U3
U4
O
Slope = Change in Y/Change in X= MUx/MUy
Budget Line
X
Y
O
Income = Px .Qx + Py. Qy
I/Py
I/Px
Slope = Px/Py
Indifference Curves
X
Y
U1U2
U3
U4
O
a
b
c
d
e
MRS = MUx/MUy= Px/Py
A change in the price of X: Income and substitution effects
X
Y
U1
U2
U3
U4
O
a
b
c
d
e
U5C’
Xo X1
YoY1
c”
A change in the price of X: Income and substitution effects
X
Y
U1
U2
U3
U4
O
a
b
c
d
e
U5C’
Xo X1
YoY1
c”