U(x, y) = x^2 + y. The price of good x is $10, and the price of good y is $1. If Ambrose’s income is $200, how many units of good x would he consume if he chose the bundle that maximizes his utility subject to his budget constraint?
Peter has a utility function U(x, y) = min {2x, y}. The price of good x is $5, and the price of good y is $10. If Peter's income is $200, how many units of good x would he consume if he chose the bundle that maximizes his utility subject to his budget constraint?
Peter has a utility function U(x, y) = min {2x, y}. The price of good x is $5, and the price of good y is $10. If Peter's income is $200, how many units of good y would he consume if he chose the bundle that maximizes his utility subject to his budget constraint?
Question 9 Peter has a utility function U(x, y) = min {2x, y}. The price of good x is $5, and the priče of good y is $10. If Peter's income is $200, how many units of good x would he consume if he chose the bundle that maximizes his utility subject to his budget constraint?
Doreen has a utility function U(x, y) = 10x + 5y. The price of good x is $1, and the price of good y is $2. If Doreen's income is $100, how many units of good y would she consume if she chose the bundle that maximizes her utility subject to her budget constraint?
Doreen has a utility function U(x, y) = 10x + 5y. The price of good x is $1, and the price of good y is $2. If Doreen's income is $100, how many units of good x would she consume if she chose the bundle that maximizes her utility subject to her budget constraint?
Please show work: 3. Ollie has a utility function u(x, y) = (x + 2)(y + 3). The price of x is $1, and the price of y is $1. When he maximizes his utility subject to his budget constraint, he consumes positive amounts of both goods. In what proportion does Ollie consume goods x and y?
Suppose the price of Good X is $4 and the price of Good Y is $3. If a consumer has a Marginal Rate of Substitution (MRSxy) of 2 for the bundle they are considering, then given their budget constraint, the consumer... Select one O a. Cannot reach a higher level of utility given their budget constraint. Ob. Would have a higher utility if they bought more of Good X. c. Would have a higher utility if they bought less of...
1. (24 total points) Suppose a consumer’s utility function is given by U(X,Y) = X1/2*Y1/2. Also, the consumer has $72 to spend, and the price of Good X, PX = $4. Let Good Y be a composite good whose price is PY = $1. So on the Y-axis, we are graphing the amount of money that the consumer has available to spend on all other goods for any given value of X. a) (2 points) How much X and Y...
Imagine you consume two goods, X and Y, and your utility function is U = XY. Your budget is $100, the price of Good X is $4, and the price of Good Y is $25. So, the optimal bundle for you to consume is (12.5, 2). Now the price of good X increases to $10. The compensated price bundle is (7.91, 3.16). What is the income effect on X?
5. Melissa’s utility function for the bundle (x,y) is U(x,y)=xy. Price of good x is p1=1, price of good 2 is p2=2 and income m=10. If the price of good 1 goes up to p1=2, but the rest remain the same. Derive: Total effect? Substitution effect? Income effect?