What is the difference between walrasian and hicksian demand curves. Fully explain with reference to their properties and those of the utility and expenditure functions.
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Q: Joan has the following utility function: u(x, y) = 5x + 3y. (b) Find Jane's hicksian demands.
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What is the difference between walrasian and hicksian demand
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- Consider a utility maximizing consumer who generates utility according to the following utility function: U=In(k)+s where k is the quantity of masks consumed and s is the quantity of hand sanitizer consumed. Let the price of k, the price of s, and income be noted as pk Ps, and M, respectively. Set up the utility maximizing Lagrangian and derive the Marshallian demand functions. What is the quantity demand of k and s if income = $120 pk = $2 and ps = $12? Derive the indirect utility function and the expenditure function. Use Shephard's Lemma to derive the compensated (Hicksian) demand curves. What is the money metric utility function in this case.If Philip's utility function is U=4 (41) 05+42. 0.5 what are his demand functions for the two goods? Let the price of q, be p,, let the price of q, be p2, and let income be Y. Philip's demand for q, as a function of p, and p, is 91 and his demand for good q, is (Properly format your expressions using the tools in the palette. Hover over tools to see keyboard shortcuts. Eg, a subscript oPlease help with this question
- A consumer's Marshallian demand for x is given by 9x(P, Py, I) 31 = consumer's indirect utility function is V(Pa, Py, I) Px +3py (Hint: make sure that you derive the Hicksian demand for x): əha > 0 and, hence, x and y are net complements дру მha (b) > 0 and, hence, x and y are net substitutes дру (c) ah <0 and, hence, x and y are net complements дру (d) ah <0 and, hence, x and y are net substitutes дру (e) მh = дру " If the Px +3py then we can conclude that = 0 and, hence, x and y are neither net complements nor net substitutesFor the utility u(x1,x2) = V*1+x2 ū - Vx1 = X2 (1) compute the Walrasian demands and the indirect utility function (2) compute the Hicksian demands and the expenditure function (3) check the indentities linking the indirect utility and expenditure functionsSuppose an individual has preferences over goods x and y, and their expenditure minimization problem has the following expenditure function: E(px, Py, U) = (px + 3p,)U. What is the person's Hicksian demand? O(h, hy) = (2p U, pU) O(h, hy) = (U, 3U) O(h, hy) = (Up,',Up,) O(hx, hy) = (3U, U) What is the individual's indirect utility? OV = 3p! p OV = P.+3p, OV = P Py OV = P.P
- Given the utility function and budjet constraint. Z=3X1+X1X2+2X2 , M=P1X1 + P2X2. 1. Obtain Marshallian demand curve equations. 2. Estimate the demand for X1 at P1 =2,4, P2 =4 and M=60. 3. Estimate the demand for X2 at P2 =2,4, P1=4 and M=60.Sarah has the following utility function: u(x, y) = 10x + 12y.Assume you spend your entire income on two goods X & Y with prices given as PX & PY, respectively. Prices and income (I) are exogenous and positive. Given that U= X2Y 2 , derive the Hicksian demand function for good Y.
- Consider the following utility function U(x1, x2) = Min{x1, X2} + 1/2Max{x1, x2} Calculate the Marshallian demand for both goodsConsider the following Marshallian Demand Function derived from the utility maximization problem, X = a M P where X is the quantity consumed, Mis income of the consumer, P is the price of the good, and α is some number between 0 and 1 which represents the relative importance of the good. Does this demand function satisfy the law of demand? (_ Why or why not? (*Suppose that we can represent Joyce's preferences for cans of pop (the x-good) and pizza slices (y-good) with the utility function min[4x,5y]. a) Find her Marshallian Demand Functions. b) Find her Hicksian Demand Functions