Consider an economy with the following production function:

Y = AK^0.5 L^0.5

The labor force is constant. The rate of depreciation is δ=0.1, the savings rate is s=0.3

a) Has this production function constant returns to scale? Why?

b) Write the production function in per worker variables.

c) Does the per worker production function have diminishing marginal returns to capital? Why?

d)Write the fundamental Solow equation in per worker variables.

e) Depict the steady state of this economy.

f) What are the growth rates of per worker output and capital in steady state?

g) Calculate the steady state level of capital, output, consumption, and savings.

h) Redraw the initial equilibrium and show what happens when the savings rate increases. Do the growth rates change?

i) Redraw the initial equilibrium and show what happens when there is a one time increase in populatikon. Do the growth rates change?

j) Redraw the initial equilibrium and show what happens when there is a one time innovation that increases productivity. Do the growth rates change?

k) Redraw the initial equilibrium and show what happens when there is constant productivity growth. Do the growth rates change?

Consider an economy with the following production function:

Y = AK.5L.5
The labor force is constant. The rate of depreciation is δ = .1, the savings rate is s = .3.

a. Has this production function constant returns to scale? Why?

b. Write the production function in per worker variables.

c. Does the per worker production function have diminishing marginal returns to capital? Why?

d. Write the fundamental Solow equation in per worker variables.

e. Depict the steady state of this economy.

f. What are the growth rates of per worker output and capital in steady state?

g. Calculate the steady state level of capital, output, consumption and savings.

h. Redraw the initial equilibrium and show what happens when the savings rate increases. Do the growth

rates change?

i. Redraw the initial equilibrium and show what happens when there is a one time increase in population.

. Do the growth rates change?

j. Redraw the initial equilibrium and show what happens when there is a one time innovation that increases

productivity. Do the growth rates change?

k. Redraw the initial equilibrium and show what happens when there is constant productivity growth. Do

the growth rates change?

Consider an economy described by the production function: Y = F(K,L) = K^0.4 L^0.6

a. What is the per-worker production function?

b. Assuming no population growth or technological progress, find the steady-state capital stock per worker, output per worker, and consumption per worker as a function of the saving rate and the depreciation rate.

c. Assuming that the depreciation rate is 15% per year, make a table showing steady state capital per worker, output per worker, and consumption per worker for saving rates of 0 percent, 10 percent, 20 percent, 30 percent, and so on. What saving rate maximizes output per worker? What saving rate maximizes consumption per worker?

d. Use information from Chapter 3 to find the marginal product of capital. Add to your table, from part (c) the marginal product of capital net of depreciation for each of the saving rates. What does your table show about the relationship between the net marginal product of capita and steady-state consumption?

Consider an economy described by the production function F(K, L) = K± (EL) 1± . Originally, the economy was at the steady state. There was a one-time outbreak of disease that killed 5 percent of the population. Population growth then returns to normal after that. Assume there is no technology growth in this economy.

A. What is the immediate effect of the disease outbreak on total output? What is the immediate effect on output per worker? [It is sufficient to give qualitative description.]

B. How does the disease outbreak affect the steady-state level of capital per worker?

C. What is the growth rate of output per worker immediately after the disease outbreak compared to that before the outbreak? [It is sufficient to give qualitative description.]

D. Suppose that when the disease outbreak occurred, the economy was also hit by a natural disaster that destroyed capital stock by 5 percent as well. What is the growth rate of output per worker after the incidents?