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Consumer Preferences. Chapter 2. Introduction. Consumers are interested in consuming commodities that satisfy wants Food, shelter, and clothing Without these commodities there would probably be no happiness Not all commodities bring happiness Bad water, leaky roofs, smelly clothes.
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Consumer Preferences Chapter 2
Introduction • Consumers are interested in consuming commodities that satisfy wants • Food, shelter, and clothing • Without these commodities there would probably be no happiness • Not all commodities bring happiness • Bad water, leaky roofs, smelly clothes
Introduction • Because consumers are faced with limited resources, not all their wants can be satisfied • Must choose which wants to satisfy from limited resources • Consumer preferences are central to how consumers behave to satisfy as many wants as possible
Aim of Chapter • To investigate how consumer preferences are employed by consumers in making their individual commodity choices • Allows us to relate individual consumer preferences to society’s overall commodity choices • No central authority is required for determining overall consumer choices • Decentralized consumer choice underlies an efficient allocation of resources • Will investigate properties associated with a number of utility functions • Main objective—to derive demand functions based on consumer preferences, prices, and income
Aim of Chapter • Demand • How much of a commodity consumers are willing and able to purchase at a given price • May be willing and able to purchase 5 pounds of bananas at 59¢ per pound • Can afford to purchase more bananas, but you are not interested in purchasing more • As price of a commodity declines • Quantity demanded for commodity increases
Law of Demand • While at supermarket, you notice a special on bananas for 39¢ per pound • You are now willing to purchase 7 pounds instead of 5 pounds • Figure 2.1.2 illustrates law of demand • Inverse relationship between price and quantity demanded • Increase price, quantity demanded declines • Decrease price, quantity demanded increases
Introduction • To determine consumer demand, large firms employ applied economists to model demand for their products • For example, American Express employs hundreds of applied economists to model demand for their credit cards • Characteristics of consumers likely to default, commit fraud, or always pay their minimum balances • Demand functions are based on assumption • Consumers attempt to maximize their satisfaction by consuming commodities • Out of an infinite combination of commodities, they choose a particular set of commodities that maximize satisfaction • Maximization is constrained by limited resources
Commodity Bundles and Household Preferences • Foundation of consumer theory • Model of consumer or household preferences • Each household is a unit of society attempting to maximize its happiness based on its preferences for commodities • Commodity • Particular good or service delivered at a specific time and at a specific location • Commodities consumed at different times and locations should be viewed as distinct commodities • However, in practice, economic models often involve some aggregation over time and location (space) • Assumption • Commodities being aggregated are sufficiently similar
Commodity Bundles and Household Preferences • Problem facing a household • Deciding how much of each available commodity it should consume • Household’s objective • Maximize satisfaction from commodities it consumes • Given prices of all commodities and household’s limited resources • Monetary constraint (income) • For developing models of consumer behavior, economists abstract by assuming a finite number of k commodities • k could be restricted to just two commodities or be unrestricted
Commodity Bundles and Household Preferences • Level of consumption may be zero for some commodities • For example, consumers generally consume zero levels of antique buses or trips into outer space • A bundle comprising all the k commodities a household may consume is called a commodity bundle, and is represented as
Two-Commodity Assumption • Often assume a household is faced with a choice of only two commodities (x1 and x2) • These commodities could be either • Only two commodities a household consumes or • Only two commodities it can vary • All other commodities are fixed in terms of some given quantity • Represent the commodity bundle as • Where all commodities to right of the bar | are considered fixed
Two-Commodity Assumption • Two-commodity assumption can be generalized by assuming one of the commodities is a composite commodity—numeraire commodity—composed of all other commodities • In a graph of two commodities, x1 and x2, a commodity bundle is a point in commodity space • Set of all possible commodity bundles • A household cannot consume a negative amount of a commodity • Commodity space is represented by nonnegative quadrant
Preference Relation • Objective of a household • To consume commodity bundle that yields highest satisfaction it can afford • A household’s choice of preferred commodity bundle depends on • Commodity prices and household’s limited income • Tastes and preferences of household • Can be summarized by the preference relation, “is preferred to or indifferent to,” written as & • Indifference between x and y means household would be just as satisfied consuming x as it would be consuming y
Preference Ordering • Preference relation provides a method for modeling how a household orders or ranks a set of bundles • From most to least desirable • Often done unconsciously • But with large purchases it is also done consciously • Such as buying an automobile • Without preference ordering a household cannot determine its preferred consumption bundle • Two assumptions—preference axioms—are required to order a set of bundles • These assumptions are basic axioms in consumer theory • Axiom • An assumption that is generally accepted as true
Axiom 1: Completeness • If x and y are any two commodity bundles, a household can always specify exactly one of following • Commodity bundles within an area of household indecision cannot be ordered in terms of a household’s preferences • Completeness Axiom precludes areas of indecision • Assuming household members completely understand contents of each bundle and can always make up their minds • Households generally can make up their minds within their range of common experience
Axiom 2: Transitivity • States that a household’s preferences for alternative commodity bundles cannot be cyclical • Example • Partying Friday night is preferred to a Saturday football game • Saturday football game is preferred to going to church on Sunday • Going to church cannot be preferred to Friday partying • Necessary for any discussion of preference maximization • Without this axiom, households cannot order commodity bundles from most to least desirable • Rationality means households can ordinally rank a set of commodity bundles to maximize their satisfaction of wants given their limited resources
Utility Functions • Political theorist Jeremy Bentham introduced a ranking of commodity bundles • Represented by a utility function (U) • Utility • Ability or power of a commodity or commodity bundle to satisfy wants when a household consumes the commodity or bundle. • Utility functions • Indicate how a household ranks commodity bundles • Assigns numerical value to each level of satisfaction associated with each commodity bundle • Higher the preference ranking, larger the number assigned • Household then determines which bundle maximizes this utility function • Given household’s limited income and fixed commodity prices
Utility Functions • For graphical representation we assume that only two commodities can vary • Hold all other commodities constant • Utility function is represented as • U =U(x1, x2|x3, . . . , xk) • Suppressing fixed commodities x3 … xk • U = (x1, x2)
Characteristics of Utility Functions • Utility functions and indifference curves derived from them can take on a number of shapes • Depending on particular assumptions concerning a household’s preferences • Classical shape of a utility function assumes a commodity is desirable • Greater amounts of the commodity increase utility • Stated in Axiom 3 • Nonsatiation
Axiom 3: Nonsatiation • More of a commodity is preferred to less • Household can always do a little bit better by consuming more of a commodity • Such a commodity is termed a good (or desirable) commodity • As opposed to a bad (or undesirable) commodity • Results in a decline in utility as more of the commodity is consumed • More of the bad commodity is not preferred to less • Garbage by definition is a bad commodity • One that yields negative utility
Axiom 3: Nonsatiation • Assuming utility function U(x) is differentiable • Nonsatiation Axiom requires that all first-order partial derivatives of utility function be positive • Increasing consumption of any commodity increases utility • Holding consumption of all other commodities constant • In other words, nobody is content with their current level of any commodity • For example, assuming a household ranks commodities by utility function • U =U(x1, x2, . . . , xk) then • Represents extra utility obtained from consuming slightly more of xj • Holding amounts consumed of all other commodities constant
Axiom 3: Nonsatiation • Value of marginal utility depends on point at which partial derivative is to be evaluated • How much x1, x2, …, xk household is currently consuming • Only sign of MU is important • Actual magnitude is meaningless since utility is an ordinal ranking • Figure 2.5 illustrates result of Nonsatiation Axiom for x1 and x2 • Every point or bundle within positive quadrant represents a commodity bundle • States that given an initial commodity bundle x, every commodity bundle with more of at least one commodity will be preferred to x • Shaded area in Figure 2.5 represents preferred set of bundles
Axioms • Axioms 1 and 2 provide necessary assumptions for household preference ordering • Determine indifference sets of commodity bundles • Within each set a household receives same level of satisfaction • A household is indifferent between any two bundles within an indifference set • For example, a household may be willing to give up a six pack of beer for a pound of candy with no change in satisfaction • Axiom 3 provides direction of increasing utility given a change in a commodity bundle • These three axioms are all that is necessary for determining utility-maximizing bundle
Indifference Curves • Indifference sets are a set of curves • Each indifference curve is a locus of points (commodity bundles) that yield same level of utility • Every point along an indifference curve represents a different combination of two commodities • Each combination is equally satisfactory to a household • Each combination yields same level of total utility • Commodity bundles can be represented by an indifference space • Analogous to a relief map • Contour lines or curves represent equal levels of satisfaction or utility instead of equal elevation
Indifference Curves • Figure 2.6 shows an indifference space for a household consuming two commodities, x1 and x2 • Each of the indifference curves yield different levels of utility (U1,U2, and U3) • Commodity bundles x and y are on same indifference curve • Yield same level of utility even though they represent different combinations of commodities • More of commodity x2 and less of commodity x1 are consumed at x than y • Commodity bundle z is on a higher indifference curve and yields a higher level of total utility • According to Nonsatiation Axiom, increasing either or both of the commodities shifts household to higher and higher indifference curves • Until household approaches global bliss • Some households will never reach global bliss • In this case, there will be an infinite number of indifference curves
Indifference Curves • Between any two indifference curves are a finite number of curves • Household will not be able to distinguish between two indifference sets that are very close to each other • As sets diverge distinction will become apparent • Indifference curves cannot intersect • Transitivity Axiom is violated if indifference curves intersect
Marginal Rate of Substitution (MRS) • The (generally) negative slope of an indifference curve implies • If a household is forced to give up some x1, it must be compensated by an additional amount of x2 to remain indifferent • A measure for this substitution is marginal rate of substitution (MRS) • Defined as negative of indifference curve slope • For the two commodities x1 and x2 in Figure 2.6 • Where U = constant (dU = 0) indicates that utility is being held constant as slope changes • Represents a movement along an indifference curve • Marginal rate of substitution (x2 for x1) is defined as
Marginal Rate of Substitution (MRS) • How much a household is willing to pay in terms of x2 in order to consume more of x1 is measured by MRS(x1 for x2) • Results in flipping the axes • MRS is directly related to a household’s marginal utilities for each commodity • Extra utility obtainable from consuming slightly more x1, x2, … , xk is sum of additional utility provided by each of these increments
Marginal Rate of Substitution (MRS) • Taking total differential of U = U(x1, x2, …, xk) gives • Concept of MRS changes level of only two commodities (say, x1 and x2), keeping household indifferent (dU = 0) • Implies that all dx’s are equal to zero except dx1 and dx2
Marginal Rate of Substitution (MRS) • Rearranging terms yields an application of Implicit Function Theorem • Illustrates relationship of MRS to ratio of marginal utilities
Strictly Convex Indifference Curves • Generally, most people prefer a combination of beer and munchies • Vs. all beer and no munchies or all munchies and no beer • Strictly convex indifference curves indicate this type of trade-off • Based on Axiom 4 • Diminishing Marginal Rate of Substitution
Axiom 4: Diminishing Marginal Rate of Substitution (Strict Convexity) • Diminishing MRS exists when value of MRS(x2 for x1) approaches zero as x1 increases • In Figure 2.9, as x1 increases, slope of indifference curve tends to zero • Becomes less negative • Because MRS is the negative of the slope • MRS decreases toward zero as x1 increases • For very low values of x1, a household is willing to give up a larger amount of x2 to get another unit of x1
Axiom 4: Diminishing Marginal Rate of Substitution (Strict Convexity) • In Figure 2.9 household prefers average bundle z to two extreme bundles x and y (a > b) • Assumes indifference curves form a convex set of commodity bundles • Yield at least same level of utility represented by an indifference curve • As x1 increases, household is willing to give up less of x2 to obtain one more unit of x1 • Similarly, as x2 increases, household is willing to give up less of x1 to obtain one more unit of x2
Figure 2.9 Indifference curves with diminishing marginal rate of substitution
Axiom 4: Diminishing Marginal Rate of Substitution (Strict Convexity) • A set of points is a convex set if • Any two points within set can be joined by a straight line contained completely within the set • Can determine an implication of Diminishing MRS Axiom • Suppose a household is indifferent between following bundles • Diminishing MRS Axiom states combination bundle will be preferred
Axiom 4: Diminishing Marginal Rate of Substitution (Strict Convexity) • Strict convexity is equivalent to assumption of diminishing MRS • Provided linear combinations of the commodities are possible • Implication of diminishing MRS • Well-balanced, diversified bundles of commodities are preferred to bundles that are heavily weighted toward one commodity • Household prefers averages to extremes
Strictly Concave Indifference Curves • If a household’s preferences were represented by strictly concave preferences • Household would prefer extremes to averages • Generally, households attempt to diversify • Rules out these concave preferences • Some rational choices imply concave preferences • Examples • Preferring either alcohol or driving to consuming both together • Preferring grades of all As instead of some combination of As and Bs
Imperfect Substitutes • Indifference curves represent an individual household’s preferences for commodities • Suppose a household may prefer consuming relatively more of commodity x2 over commodity x1 • For household to be willing to give up a small amount x2 • Would have to be given a relatively large quantity of x1 • Results in relatively flat indifference curves • Imperfect substitutes are characterized by the four preference axioms • Most household preferences for most commodities fall into this category
Figure 2.11 Indifference curves where commodity x2 is relatively more preferred to x1
Perfect Substitutes • A utility function of form U =ax1 + bx2 represents preferences associated with perfect substitutes • a and b are positive parameters • For perfect substitutes • Slope of indifference curve does not change as one commodity is substituted for another • In general, perfect substitutes are associated with MRS = constant • Violates Diminishing MRS Axiom • Indifference curves are parallel straight lines with a constant slope • An example of perfect substitutes may be two different brands of cola
