Lorelai's choice behavior can be represented by the utility function 11(xi, X2) = 0.91n(xi) + 0.1x2 The prices of both x and x2 are $5 and she has an income of $40. 1. What preference does this utility function represent? (Hint: the utility is function is not linear, but at least linear in good x2.) 2. Drawinwg indifference curves: you can copy down the graph on your paper using econgraphs. Set the preferences and parameters accordingly as given in the...
= 1/ 23/2. If the prices for goods 1 and 2 are, and respectively, and income is M, what is the Consider a consumer with a utility function consumer's optimal consumption of good 1? x1 = M/(3p2) xi = M/(482) xi = 3M/(4px) x1 = 4Mp1/(P2) None of the above Consider a consumer with a utility function y = 1/2/3/2. If the prices for goods 1 and 2 are 2 and 4 respectively, and income is 40, what is the...
Question 13 0/1 pts respectively, and income is M, what is the Consider a consumer with a utility function u = 1/2 3/2. If the prices for goods 1 and 2 arep, and consumer's optimal consumption of good 1? x1 = M/(3p2) Correct Answer xi = M/(41) You Answered x1 = 3M/(41) x = 4MP1/(p2) None of the above Question 14 1/1 pts Consider a consumer with a utility function y = x1/23/2. If the prices for goods 1 and...
3. When prices are (p1,P2) (1,2) a consumer demands (xi, 2) (1,2), and when prices are (p1,P2) (2,1) the consumer demands (x1,x2)-(2,1). Is this behavior consistent with the model of utility maximization?
Problem 3 Text: Suppose the utility function of the consumer is u(x1,x2)=min{x1,x2}. Further, suppose pi=$4, P2=$2 and 1=$18. Based on this information, answer the following questions (questions 16-25). Questions: 16. What is the optimal quantity of Good 1 chosen by the consumer? 17. What is the optimal quantity of Good 2 chosen by the consumer? 18. What is the optimal quantity of Good 1 chosen by the consumer if pı decreases to $1?
Cursue a consumer with preferences described by (x1, x2) = x1 + x2 Suppose she faces prices pi 1 and P2 = 1/2 and that she has an income of I = 2. For your reference, the marginal utilities at a bundle (x1, x2) in this setting are given by MU (x1, x2) = 1 MU?(x), x2) = 2V x2 3(a) Write down the two equations which characterize the consumer's utility-maximizing bundle (X1.3) in this situation. In other words, write...
Lorelai's choice behavior can be represented by the utility function u(x1, 2) 0.9n(x)0.1x2. The prices of both xi and x2 are $5 and she has an income of $40. 1. What preference does this utility function represent? (Hint: the utility is function is not linear, but at least linear in good x2) 2. Drawinwg indifference curves: you can copy down the graph on your paper using econgraphs. Set the preferences and parameters accordingly as given in the question. Click on...
Luke's choice behavior can be represented by the utility function u(x1,x2)= x1 + x2.The prices of x1 and x2 are denoted as p1 and p2, and his income is m. 1. Draw at least three indifference curves and find its slope (i.e. MRS). Is the MRS changing depending on the points of (x1, x2) at which it is evaluated, or constant? 2. Draw a budget constraint assuming that p1 < P2. Find the optimal bundle (x1*,x2*) as a function of income and prices. 3....
Each firm produces both goods, i.e., good 1 and good 2. Each firm takes the market prices p 0 and p2 2 0 as firm produces T units of good 1 and x2 units of good 2, with (xi, x2) the total costs of C(x.x) = 2i+0.5«% given and chooses output to maximize profits.1 If a R2, it has 1200 (a) (1 point ) For given prices p1 and p2, find the revenue, R(x1, x2), of a single firm (b)...
Question 2: Lorelai's choice behavior can be represented by the utility function u(x1, 2)0.9Inx)0.1x2 The prices of both x1 and x2 are $5 and she has an income of $40. 1. What preference does this utility function represent? (Hint: the utility is function is not linear, 2. Drawinwg indifference curves: you can copy down the graph on your paper using econgraphs. Set but at least linear in good x2) the preferences and parameters accordingly as given in the question. Click...