A utility maximizing saver has u(f1, f2) = f11/2f21/2 and earns m1 = 150, m2 =...

Suppose that Jessica has the following utility, U = C1^1/2 C2^1/2 and that she earns $400...

Suppose that Jessica has the following utility, U = C1^1/2 C2^1/2 and that she earns $400 in the first period and $700 in the second period. Her budget constraint is given by C1 + C2/1+r = Y1 + Y2/1+r . The interest rate is 0.25 (i.e., 25%). She wants to maximize her utility. (a) What are her optimal values of C1 and C2? (b) Is Jessica a borrower or a saver in period 1? (c) Suppose the real interest rate...

A consumer is endowed with income M1 in the present and M2 in the future, with...

A consumer is endowed with income M1 in the present and M2 in the future, with M1 = M2 > 0. C1 and C2 are consumption in the present and future, respectively. The consumer has convex indifference curves, described by U(C1, C2), and can borrow and save at the nominal rate of interest of r > 0. (i) Use an isoquant diagram to carefully illustrate the optimal consumption choice when the consumer is a lender in the present (6 points)....

Hira has the utility function U(c1; c2) = c11/2 +2c21/2 where c1 is her consumption in...

Hira has the utility function U(c1; c2) = c11/2 +2c21/2 where c1 is her consumption in period 1 and c2 is her consumption in period 2. She will earn 100 units in period 1 and 100 units in period 2. She can borrow or lend at an interest rate of 10%. Write an equation that describes Hira’s budget. What is the MRS for the utility function between c1 and c2? Now assume that she can save at the interest rate...

an object of m=11 kg has 2 forces acting on it. f1=(6Nx,-5Ny), f2=11N 150° with respect...

an object of m=11 kg has 2 forces acting on it. f1=(6Nx,-5Ny), f2=11N 150° with respect to the x direction, counterclockwise. the objects initial velocity is 0 Starting from laws of motion find a then find v(t) then position(t) please inclide relevant calculus

A maximizing worker with u(z, f) = z1/2f1/2 earns 60 dollars per day in non-labour income...

A maximizing worker with u(z, f) = z1/2f1/2 earns 60 dollars per day in non-labour income and is paid a wage of 5 dollars per hour. How many hours will she work. If she joins a union she will be paid a wage of 20 dollars per hour but she will have to pay a membership fee. What is the maximum daily fee she would pay to join this union?

A maximizing worker with u(z, f) = z1/2f1/2 earns 60 dollars per day in non-labour income...

A maximizing worker with u(z, f) = z1/2f1/2 earns 60 dollars per day in non-labour income and is paid a wage of 5 dollars per hour. How many hours will she work. If she joins a union she will be paid a wage of 20 dollars per hour but she will have to pay a membership fee. What is the maximum daily fee she would pay to join this union?

1. Calculate F1, the force on the baby due to Mars. Mars has a mass M1...

1. Calculate F1, the force on the baby due to Mars. Mars has a mass M1 = 6.23x1023kg, and when it is at opposition, it is at r1 = 3.78x1011m distance. 2. Calculate F2, the force on the baby due to the doctor. A reasonable mass would be M2 = 65 kg, and the distance would be small, r2 = 1m. 3. What has a greater gravitational influence on the infant, the presence of Mars or the presence of the...

Emil has access to a perfect capital market1 with interest rate r ∈ (0, 1). He...

Emil has access to a perfect capital market1 with interest rate r ∈ (0, 1). He has preferences over bundles (x, y) ∈ R2+ of money for consumption in period 1 (x) and money for consumption in period 2 (y) that can be represented by the following utility function u(x, y) = x2 · y Emil has an endowment of E = (2000, 1200), that is his income in period 1 is m1 = 2000 and his income in period...

Suppose that an economist has a utility function U = (Income)0.25. Her income is $65K a...

Suppose that an economist has a utility function U = (Income)0.25. Her income is $65K a year, but there is a 10 percent chance of becoming ill and making only $57K. (a) What is her expected utility if she does not have insurance? (b) What is the actuarially fair insurance premium? (c) How much is she willing to pay for insurance?

An individual with 100, 000 dollars and must decide how much to consume now (period t)...

An individual with 100, 000 dollars and must decide how much to consume now (period t) and how much to save for the future (period t + 1) to maximize the sum of utilities over the two periods: U(Ct) + U (Ct+1). Ct is the consumption amount at date-t and Ct+1 is the consumption at date-t + 1. The bank will pay interest rate r for every dollar she saves. 8. Can you give an example of utility function U(C)...