5. Consider the indirect utility function given by: m v(P1, P2, m) = P1 + P2 (a) What are the demand functions (b) What...
Q6 Deriving Demand Function Derive demand functions x1(P1, P2, m) and x2(P1, P2, m) for the consumer with the utility function U(x1, x2) = xi x2
The following exercise is to enable you to apply duality: Consider the following indirect utility function: v(p1, p2, m) = (3 ^0.75 )/4 · m/( (p1)^ 0.25*((p2)^ 0.75)) Find the expenditure function.
2. Consider the following utility function, (a) 15 points] Derive the Hicksian demand functions and the expenditure function. (b) [15 points] Derive the indirect utility functions
2. Consider the following utility function, (a) [15 pointsl) Derive the Hicksian demand functions and the expenditure function. (b) [15 points) Derive the indirect utility functions
2) Assume that utility is given by Utility-U(X,Y)-X03yo7 a) Calculate the ordinary demand functions, indirect utility function, and expenditure function. b) Use the expenditure function calculated in part (a) together with Shephard's lemma to compute the compensated demand function for good X. Use the results from part (b) together with the ordinary demand function for good X to show that the Slutsky equation holds for this case. c) d) Prove that the expenditure function calculated in part (a) is homogeneous...
Tricky question: Suppose that the consumer's indirect utility function is given by: v(p, y) = y/(apı + Bp2), where P1, P2 and y are prices and income and where a, ß are positive parameters. Derive the consumer's direct utility function.
Suppose you have a total income of I to spend on two goods x1 and x2, with unit prices p1 and p2 respectively. Your taste can be represented by the utility function u left parenthesis x subscript 1 comma x subscript 2 right parenthesis equals x subscript 1 cubed x subscript 2 squared (a) What is your optimal choice for x1 and x2 (as functions of p1 and p2 and I) ? Use the Lagrange Method. (b) Given prices p1...
Suppose an individual’s utility function is u=x11/2, x21/2. Let p1=4, p2=5, and income equal $200. With a general equation and general prices, derive the equal marginal principle. Graphically illustrate equilibrium and disequilibrium conditions and how consumers can reallocate their consumption to maximize utility. What is the optimal amount of x1 consumed? What is the optimal amount of x2 consumed? What is the marginal rate of substitution at the optimal amounts of x1 and x2? As functions of p1, p2, and...
Q2 For each of the following utility functions, derive the consumer's Marshallian demand functions, 21(P1, P2, B) and x (P1, P2, B), and calculate 11 (income elasticity of good 1), €1 (own-price elasticity of good 1), and €12 (cross-price elasticity). a U(x1, x2) = 21 b U(x1, x2) = 2.925-a for a € (0,1) CU(21, 12) = ln(21) + x2 where B > P2.
Given the following utility function:
Where, q1 and q2 are consumer goods and the budget
constraint is given as.
With p, and p the prices of the goods and the month
the income. Find.
1. The Marshallian Demands for (q1 and 92.
2. The Indirect Utility Function, V (p1, p2, m)
3. The Hicksian Demands for q1 and q2.
4. The Expenditure Function, m (p1, p2, U)
U(992)=9, +10 log2 U(992)=9, +10 log2