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2. Consider a consumer with preferences over current and future consumption given by U(C1, C2) = (c1)1/2 (c2)1/2 where...
2. Consider a consumer with preferences over current and future consumption given by U (C1, C2)...
2. Consider a consumer with preferences over current and future consumption given by U (C1, C2) = (c1)1/(c2)1/2 where c1 denotes the amount consumed in period 1 and ch the amount consumed in period 2. Suppose that period 1 income expressed in units of good 1 is m1 = 20000 and period 2 income expressed in units of good 2 is m2 = 30000. Suppose also that P1 = P2 = 1 and let r denote the interest rate. (a)...
Consider a consumer with preferences over current and future consumption given by U (c1, c2) =...
Consider a consumer with preferences over current and future consumption given by U (c1, c2) = c1c2 where c1 denotes the amount consumed in period 1 and c2 the amount consumed in period 2. Suppose that period 1 income expressed in units of good 1 is m1 = 20000 and period 2 income expressed in units of good 2 is m2 = 30000. Suppose also that p1 = p2 = 1 and let r denote the interest rate. 1. Find...
Suppose Sansa lives for two periods. Her preferences are represented as follows: u(c1, c2) = (1+0.8VC2...
Suppose Sansa lives for two periods. Her preferences are represented as follows: u(c1, c2) = (1+0.8VC2 where cı is today's consumption level and c2 is tomorrow's consumption level. Suppose Bob's income today is yı = 100 and his income tomorrow is y2 = 190. Interest rate is denoted by r. 1. Write down Sansa's optimization problem including the budget set. 2. Determine Sansa's optimal consumption bundle (Cl*, C2*) as a function of r.
Question 1: Changes in the real interest rate and borrowing constraints Consider the problem of an...
Question 1: Changes in the real interest rate and borrowing constraints Consider the problem of an agent that has an endowment of y- 2 apples in period 1 and y2 in period 2, and takes the real interest rate r as given. Preferences are given by: 4 apples U (c1,c2)log (ci) + log (c2) where cı and c2 denote consumption of apples in period 1 and period 2, respectively. a) Solve for c1,c2 and savings when the real interest rate...
A consumer who lives for two periods has a standard Cobb-Douglas utility func- tion: u(c1,c2) =...
A consumer who lives for two periods has a standard Cobb-Douglas utility func- tion: u(c1,c2) = ccm, where Ct = consumption in period t and a + b = 1. Her income in period one is I1 = 500 and 12 = 400, and she can lend or borrow at interest rate r = 0.2. (a) Find the optimal consumption demand. (b) What values of a, if any, makes the consumer a borrower? Interpret this result. (c) Suppose now that...
5. A consumer who lives for two periods has a standard Cobb-Douglas utility func- tion: u(C1,C2)...
5. A consumer who lives for two periods has a standard Cobb-Douglas utility func- tion: u(C1,C2) = ccm, where Ct = consumption in period t and a + b = 1. Her income in period one is 1 = 500 and 12 = 400, and she can lend or borrow at interest rate r = 0.2. (a) Find the optimal consumption demand. (b) What values of a, if any, makes the consumer a borrower? Interpret this result. (c) Suppose now...
1. Harvey Habit's utility function is U (C1, C2) = min {c1, c2}, where cı is his consumption of bread in period 1 and c...
1. Harvey Habit's utility function is U (C1, C2) = min {c1, c2}, where cı is his consumption of bread in period 1 and c2 is his consumption of bread in period 2. The price of bread is $1 per loaf in period 1. The interest rate is 21%. Harvey earns $2,000 in period 1 and he will earn $1,100 in period 2. (a) Write Harvey's budget constraint in terms of future value. (b) How much bread does Harvey consume...
2.Consider the inter-temporal model of consumption studied in class, with two possible periods. A...
2.Consider the inter-temporal model of consumption studied in class, with two possible periods. Assume that initially that an individual is a saver. If the interest rate rises, which statement is false? a. The individual will never become a borrower. b.The individual will necessarily increase their savings. c.The individual must remain a saver d. The individual could increase or decrease their savings, but she must remain a saver. 4. Consider the inter-temporal model of consumption studied in class, with two possible...
can you please explain this deeply? thank you Question 7 Consider a consumer with preferences over...
can you please explain this deeply? thank you
Question 7 Consider a consumer with preferences over two goods 1 and 2. Assume that the horizontal axis pertains to the amount of good 1 and the vertical axis pertains to the amount of good 2. Suppose that, given the consumption bundle r = 10 and y = 10, a consumer's MRS (marginal rate of substitution) is equal (in absolute value) to 4. The price of good 1 is $1, the price...
Consider the typical individual in Fisher’s two-period model, who chooses between current and future consumption (C1...
Consider the typical individual in Fisher’s two-period model, who chooses between current and future consumption (C1 and C2) to maximize utility. Their preferences are such that the substitution effect dominates the income effect and savings increases when the interest rate rises. Draw the intertemporal budget constraint and indifference curve for this individual saver when r = 0.10. Label the utility-maximizing point by A. Which is greater, the marginal utility C1 or the marginal utility of C2? How do you know?...
2. Consider a consumer with preferences over current and future consumption given by U (C1, C2) = (c1)1/(c2)1/2 where c1 denotes the amount consumed in period 1 and ch the amount consumed in period 2. Suppose that period 1 income expressed in units of good 1 is m1 = 20000 and period 2 income expressed in units of good 2 is m2 = 30000. Suppose also that P1 = P2 = 1 and let r denote the interest rate. (a)...
Suppose Sansa lives for two periods. Her preferences are represented as follows: u(c1, c2) = (1+0.8VC2 where cı is today's consumption level and c2 is tomorrow's consumption level. Suppose Bob's income today is yı = 100 and his income tomorrow is y2 = 190. Interest rate is denoted by r. 1. Write down Sansa's optimization problem including the budget set. 2. Determine Sansa's optimal consumption bundle (Cl*, C2*) as a function of r.
Question 1: Changes in the real interest rate and borrowing constraints Consider the problem of an agent that has an endowment of y- 2 apples in period 1 and y2 in period 2, and takes the real interest rate r as given. Preferences are given by: 4 apples U (c1,c2)log (ci) + log (c2) where cı and c2 denote consumption of apples in period 1 and period 2, respectively. a) Solve for c1,c2 and savings when the real interest rate...
A consumer who lives for two periods has a standard Cobb-Douglas utility func- tion: u(c1,c2) = ccm, where Ct = consumption in period t and a + b = 1. Her income in period one is I1 = 500 and 12 = 400, and she can lend or borrow at interest rate r = 0.2. (a) Find the optimal consumption demand. (b) What values of a, if any, makes the consumer a borrower? Interpret this result. (c) Suppose now that...
5. A consumer who lives for two periods has a standard Cobb-Douglas utility func- tion: u(C1,C2) = ccm, where Ct = consumption in period t and a + b = 1. Her income in period one is 1 = 500 and 12 = 400, and she can lend or borrow at interest rate r = 0.2. (a) Find the optimal consumption demand. (b) What values of a, if any, makes the consumer a borrower? Interpret this result. (c) Suppose now...
1. Harvey Habit's utility function is U (C1, C2) = min {c1, c2}, where cı is his consumption of bread in period 1 and c2 is his consumption of bread in period 2. The price of bread is $1 per loaf in period 1. The interest rate is 21%. Harvey earns $2,000 in period 1 and he will earn $1,100 in period 2. (a) Write Harvey's budget constraint in terms of future value. (b) How much bread does Harvey consume...
can you please explain this deeply? thank you
Question 7 Consider a consumer with preferences over two goods 1 and 2. Assume that the horizontal axis pertains to the amount of good 1 and the vertical axis pertains to the amount of good 2. Suppose that, given the consumption bundle r = 10 and y = 10, a consumer's MRS (marginal rate of substitution) is equal (in absolute value) to 4. The price of good 1 is $1, the price...
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