axioms of rational choice completeness if a and b are any two situations, an individual can always...
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Axioms of Rational Choice
Completeness If A and B are any two situations, an individual
can always specify exactly one of these possibilities: A is preferred to B B is preferred to A A and B are equally attractive
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Axioms of Rational Choice
Transitivity If A is preferred to B, and B is preferred to C,
then A is preferred to C Assumes that the individual’s choices are
internally consistent
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Axioms of Rational Choice
Continuity If A is preferred to B, then situations “close to” A
must also be preferred to B Used to analyze individuals’ responses to
relatively small changes in income and prices
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Utility Given these assumptions, it is possible to
show that people are able to rank in order all possible situations from least desirable to most
Economists call this ranking utility If A is preferred to B, then the utility assigned to
A exceeds the utility assigned to B
U(A) > U(B)
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Utility Utility rankings are ordinal in nature
They record the relative desirability of commodity bundles
Because utility measures are nonunique, it makes no sense to consider how much more utility is gained from A than from B
It is also impossible to compare utilities between people
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Utility Utility is affected by the consumption of
physical commodities, psychological attitudes, peer group pressures, personal experiences, and the general cultural environment
Economists generally devote attention to quantifiable options while holding constant the other things that affect utility ceteris paribus assumption
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Utility Assume that an individual must choose
among consumption goods X1, X2,…, Xn
The individual’s rankings can be shown by a utility function of the form:
utility = U(X1, X2,…, Xn) Keep in mind that everything is being held
constant except X1, X2,…, Xn
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Economic Goods In the utility function, the X’s are assumed to
be “goods” more is preferred to less
Quantity of X
Quantity of Y
X*
Y*
Preferred to X*, Y*
Worsethan
X*, Y*
?
?
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Indifference Curves
An indifference curve shows a set of consumption bundles among which the individual is indifferent
Quantity of X
Quantity of Y
X1
Y1
Y2
X2
U1
Combinations (X1, Y1) and (X2, Y2)provide the same level of utility
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Marginal Rate of Substitution The negative of the slope of the indifference
curve at any point is called the marginal rate of substitution (MRS)
Quantity of X
Quantity of Y
X1
Y1
Y2
X2
U1
1UUdX
dYMRS
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Marginal Rate of Substitution MRS changes as X and Y change
reflects the individual’s willingness to trade Y for X
Quantity of X
Quantity of Y
X1
Y1
Y2
X2
U1
At (X1, Y1), the indifference curve is steeper.The person would be willing to give up more
Y to gain additional units of X
At (X2, Y2), the indifference curveis flatter. The person would bewilling to give up less Y to gainadditional units of X
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Indifference Curve Map Each point must have an indifference curve through it
Quantity of X
Quantity of Y
U1
U2
U3 U1 < U2 < U3
Increasing utility
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Transitivity Can two of an individual’s indifference curves intersect?
Quantity of X
Quantity of Y
U1
U2
A
BC
The individual is indifferent between A and C.The individual is indifferent between B and C.
Transitivity suggests that the individualshould be indifferent between A and B
But B is preferred to Abecause B contains more
X and Y than A
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Convexity A set of points is convex if any two points can be joined by a straight
line that is contained completely within the set
Quantity of X
Quantity of Y
U1
The assumption of a diminishing MRS isequivalent to the assumption that allcombinations of X and Y which are preferred to X* and Y* form a convex set
X*
Y*
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Convexity If the indifference curve is convex, then the combination (X1 + X2)/2, (Y1 + Y2)/2
will be preferred to either (X1,Y1) or (X2,Y2)
Quantity of X
Quantity of Y
U1
X2
Y1
Y2
X1
This implies that “well-balanced” bundles are preferredto bundles that are heavily weighted toward onecommodity
(X1 + X2)/2
(Y1 + Y2)/2
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Utility and the MRS
Suppose an individual’s preferences for hamburgers (Y) and soft drinks (X) can be represented by
YX 10 utility Solving for Y, we get
Y = 100/X
• Solving for MRS = -dY/dX:MRS = -dY/dX = 100/X2
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Utility and the MRS
MRS = -dY/dX = 100/X2
Note that as X rises, MRS falls When X = 5, MRS = 4 When X = 20, MRS = 0.25
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Marginal Utility
Suppose that an individual has a utility function of the form
utility = U(X1, X2,…, Xn) We can define the marginal utility of good
X1 by
marginal utility of X1 = MUX1 = U/X1 The marginal utility is the extra utility
obtained from slightly more X1 (all else constant)
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Marginal Utility
The total differential of U is
n
n
dXX
UdX
X
UdX
X
UdU
...2
2
1
1
nXXX dXMUdXMUdXMUdUn
...21 21
The extra utility obtainable from slightly more X1, X2,…, Xn is the sum of the additional utility provided by each of these increments
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Deriving the MRS
Suppose we change X and Y but keep utility constant (dU = 0)
dU = 0 = MUXdX + MUYdY Rearranging, we get:
YU
XU
MU
MU
dX
dY
Y
X
/
/
constantU
MRS is the ratio of the marginal utility of X to the marginal utility of Y
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Diminishing Marginal Utility and the MRS
Intuitively, it seems that the assumption of decreasing marginal utility is related to the concept of a diminishing MRS Diminishing MRS requires that the utility function
be quasi-concave This is independent of how utility is measured
Diminishing marginal utility depends on how utility is measured
Thus, these two concepts are different
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Marginal Utility and the MRS
Again, we will use the utility function5050 .. utility YXYX
The marginal utility of a soft drink is
marginal utility = MUX = U/X = 0.5X-0.5Y0.5
The marginal utility of a hamburger is
marginal utility = MUY = U/Y = 0.5X0.5Y-0.5
X
Y
YX
YX
MU
MU
dX
dYMRS
Y
X
5050
5050
5
5..
..
constantU .
.
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Examples of Utility Functions Cobb-Douglas Utility
utility = U(X,Y) = XY
where and are positive constants The relative sizes of and indicate the relative
importance of the goods
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Examples of Utility Functions Perfect Substitutes
utility = U(X,Y) = X + Y
Quantity of X
Quantity of Y
U1
U2
U3
The indifference curves will be linear.The MRS will be constant along the indifference curve.
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Examples of Utility Functions Perfect Complements
utility = U(X,Y) = min (X, Y)
Quantity of X
Quantity of YThe indifference curves will be L-shaped. Only by choosing more of the two goods together can utility be increased.
U1
U2
U3