Julie’s utility function is U(x, z) = xz x+z . Solve for her optimal values of...

Anna’s utility function is U(x,z) = x? + z?. Solve for her optimal values of good...

Anna’s utility function is U(x,z) = x? + z?. Solve for her optimal values of good x and good z as a function of the price of good x, px, the price of good z, pz, and income, Y . For simplicity, assume that pz = 1. step by step

Diego’s utility function is U(x, z) = 100x 0.9 z 0.1 . Solve for her optimal...

Diego’s utility function is U(x, z) = 100x 0.9 z 0.1 . Solve for her optimal values of good x and good z as a function of the price of good x, px = 2, the price of good z, pz = 2, and income, Y = 800.

Show that if a consumer's utility function is given by U = 2X + Z, and...

Show that if a consumer's utility function is given by U = 2X + Z, and prices are pX = 2 and pZ =1, there is no unique utility maximizing solution regardless of income level. What does this tell you about X and Y as commodities?

1. Suppose utility for a consumer over food(x) and clothing(y) is represented by u(x,y) = 915xy....

1. Suppose utility for a consumer over food(x) and clothing(y) is represented by u(x,y) = 915xy. Find the optimal values of x and y as a function of the prices px and py with an income level m. px and py are the prices of good x and y respectively. 2. Consider a utility function that represents preferences: u(x,y) = min{80x,40y} Find the optimal values of x and y as a function of the prices px and py with an...

Diogo has a utility function: U = 100X^0.75Z^0.25 The price of X is Px = $2,...

Diogo has a utility function: U = 100X^0.75Z^0.25 The price of X is Px = $2, the price of Z is Pz = $4, and his income is $1,000. What is Diogo's optimal bundle? (round your answer to one decimal place) X0= _ units Z0= _ units

An agent has preferences for goods X and Y represented by the utility function U(X,Y) =...

An agent has preferences for goods X and Y represented by the utility function U(X,Y) = X +3Y the price of good X is Px= 20, the price of good Y is Py= 40, and her income isI = 400 Choose the quantities of X and Y which, for the given prices and income, maximize her utility.

Assume that Sam has following utility function: U(x,y) = 2√x+y MRS=(x)^-1/2, px = 1/5, py =...

Assume that Sam has following utility function: U(x,y) = 2√x+y MRS=(x)^-1/2, px = 1/5, py = 1 and her income I = 10. price increase for the good x from px = 1/5 to p0x = 1/2. (a) Consider a price increase for the good x from px = 1/5 to p0x = 1/2. Find new optimal bundle under new price using a graph that shows the change in budget set and the change in optimal bundle when the price...

Sam's is interested in two goods, X and Y. His indirect utility function is U* =...

Sam's is interested in two goods, X and Y. His indirect utility function is U* = M px-.6 py-4.    ( same as U* = M /(px.6 py0.4 ) ) where M is Sam's income, and px   and py denote respectively the price of good X and the price of good Y.   Sam's market demand functions are X*=0.6M/px and Y* = 0.4M/py . Find the absolute value of the change in Sam's consumers surplus if the price of good X...

Consider the utility function U ( x,y ) = min { x , 2y }. (a)...

Consider the utility function U ( x,y ) = min { x , 2y }. (a) Find the optimal consumption choices of x and y when I=50, px=10, and py=5. (b) The formula for own-price elasticity of x is εx,px = (−2px/2px + py) For these specific values of income, prices, x and y, what is the own-price elasticity? What does this value tell us about x? (c) The formula for cross-price elasticity of x is εx,py = (py/2px +...

Quantitative Question 2 Consider a situation where a consumer demands two goods, x and z with...

Quantitative Question 2 Consider a situation where a consumer demands two goods, x and z with the utility function U¯ = x 0.2 z 0.8 (a) Derive the marginal rate of substitution (b) Derive the demand functions for x and z as a function of income (Y ), the price of good x, (px) and the price of good z (pz) (c) Let Y = 200, px = 4, and pz = 8. Find the equilibrium quantities demanded for this...