If preferences are convex, then for any commodity bundle , the set of commodity bundles that...

In each of the following situations, the possible bundles contain apples and oranges and either 0,...

In each of the following situations, the possible bundles contain apples and oranges and either 0, 1 or 2 of each. An example bundle would be 2 apples and 1 orange = (2, 1). In each part, there is a description of a set of preferences. If an ordering can be made, make the ordering of the 9 possible bundles, and list any bundles that would be on the same indifference “curve”. If the ordering cannot be made, give a...

Consider a consumer that has preferences defined over bundles of non-negative amounts of each of two...

Consider a consumer that has preferences defined over bundles of non-negative amounts of each of two commodities. The consumer’s consumption set is R2+. Suppose that the consumer’s preferences can be represented by a utility func- tion, U(x1,x2). We could imagine a three dimensional graph in which the “base” axes are the quantity of commodity one available to the consumer (q1) and the quantity of commodity two available to the consumer (q2) respec- tively. The third axis will be the “height”...

Ambrose consumes only nuts and berries. Fortunately, he likes both goods. The consumption bundle where Ambrose...

Ambrose consumes only nuts and berries. Fortunately, he likes both goods. The consumption bundle where Ambrose consumes x1 units of nuts per week and x2 units of berries per week is written as (x1, x2). The set of consumption bundles (x1, x2) such that Ambrose is indifferent between (x1, x2) and (1, 16) is the set of bundles such that x1 ≥ 0, x2 ≥ 0, and x2 = 20 − 4 √ x1. The set of bundles (x1, x2)...

At interest rate r0 an individual with strictly convex preferences is neither a borrower nor a...

At interest rate r0 an individual with strictly convex preferences is neither a borrower nor a saver. At interest rate r1 > r0 which of the following statements is true? a. The individual is a borrower and is worse off than with r0. b. The individual is a saver and is worse off than with r0. c. The individual is a saver and is better off than with r0. d. The individual is a borrower and is better off than...

Explain and define. Explain and define the difference between a convex set, a convex function, and...

Explain and define. Explain and define the difference between a convex set, a convex function, and a convex preference. How should the utility function be if the preferences are convex?

Maria's preferences are strictly convex. At bundle A near the middle of her budget line, Maria's...

Maria's preferences are strictly convex. At bundle A near the middle of her budget line, Maria's marginal utility of good 1 is equal to 6.4 and her marginal utility of good 2 is equal to 4.2. The price of good 1 is equal to 3.9 and the price of good 2 is 2.2. What should Maria do to maximize her utility, buy more of good 1, less of good 1 or simply consume the amount in bundle A? Enter 0...

Maria's preferences are strictly convex. At bundle A near the middle of her budget line, Maria's...

Maria's preferences are strictly convex. At bundle A near the middle of her budget line, Maria's marginal utility of good 1 is equal to 6.4 and her marginal utility of good 2 is equal to 4.2. The price of good 1 is equal to 3.9 and the price of good 2 is 2.2. What should Maria do to maximize her utility, buy more of good 1, less of good 1 or simply consume the amount in bundle A? Enter 0...

Suppose that a consumer has perfect complements, or Leontief, preferences over bundles of non-negative amounts of...

Suppose that a consumer has perfect complements, or Leontief, preferences over bundles of non-negative amounts of each of two commodities. The consumer’s consumption set is R^2(positive). The consumer’s preferences can be represented by a utility function of the form U(x1, x2) = min(x1, x2). 1. Illustrate the consumer’s weak preference set for an arbitrary (but fixed) utility level U. 2. Illustrate a representative iso-expenditure line for the consumer. 3. Illustrate the consumer’s utility-constrained expenditure minimisation problem. 4. Illustrate the derivation...

A consumer’s preferences are represented by the following utility function: u(x, y) = lnx + 1/2...

A consumer’s preferences are represented by the following utility function: u(x, y) = lnx + 1/2 lny 1. Recall that for any two bundles A and B the following equivalence then holds A ≽ B ⇔ u(A) ≥ u (B) Which of the two bundles (xA,yA) = (1,9) or (xB,yB) = (9,1) does the consumer prefer? Take as given for now that this utility function represents a consumer with convex preferences. Also remember that preferences ≽ are convex when for...

Suppose Lea is presented with the following four bundles A=(14, 4), B = (10,6), C =...

Suppose Lea is presented with the following four bundles A=(14, 4), B = (10,6), C = (11, 6) and E=(8,8). Her preferences satisfy completeness, reflexivity and transitivity as well as strong monotonicity and strict convexity. It is also true that for Lea A~E Which of the following statements, if any, is correct? (If no statement is correct, select "None".) a. None. b. For Lea, bundle C is strictly preferred to bundle A. c. For Lea, bundle C is strictly preferred...