If the production function is: Y=AK^aN^1-a and A=10, K=25, and a = ½, then: (a) what...

3. You are given the production function Y = AK 0.4 L 1.0. a. What is...

3. You are given the production function Y = AK 0.4 L 1.0. a. What is the marginal product of labor? b. Does this production function exhibit diminish marginal product of labor? Why?

The Hoosier economy has the production function: Y = A F (K, N) = 6 (K)...

The Hoosier economy has the production function: Y = A F (K, N) = 6 (K) 0.5 (N) 0.5    The capital is K = 64, and the labor demanded is N = 25;       the marginal product of labor is MPN = 3 K1/2/ N1/2 the marginal product of capital is MPK = 3 N1/2/ K1/2 What is the GDP? What is the labor demand function? What is the real wage?                    What is the total income to labor?...

1. Using the Cobb-Douglas production function: Yt = AtKt1/3Lt2/3 If K = 27, L = 8...

1. Using the Cobb-Douglas production function: Yt = AtKt1/3Lt2/3 If K = 27, L = 8 A = 2, and α = 1/3, what is the value of Y? (For K and L, round to the nearest whole number) ______ 2. If Y = 300, L = 10, and α = 1/3, what is the marginal product of labor? ______ 3. Using the values for Y and α above, if K = 900, what is the marginal product of capital?...

. Let the production function be Y=AL^1/2*K^1/2 where Y is output, K is capital, L is...

. Let the production function be Y=AL^1/2*K^1/2 where Y is output, K is capital, L is labor and A represents the level of technology. a. What happens to the marginal product of capital as the level of capital increases? b. If L=100, A=5, the savings rate is 1/2 and the depreciation rate is 1/3, what will the steady-state levels of capital, output and consumption be?

Consider the following production function Y=z*(a*K + (1-a)*N) where z represents total factor productivity, a is...

Consider the following production function Y=z*(a*K + (1-a)*N) where z represents total factor productivity, a is a parameter between 0 and 1, K is the level of capital, and N is labor. We want to check if this function satisfies our basic assumptions about production functions. 1. Does this production function exhibit constant returns to scale? Ex- plain 2. Is the marginal product of labor always positive? Explain 3. Does this function exhibit diminishing marginal product of labor? Ex- plain...

Consider the production function Y = F (K, L) = Ka * L1-a, where 0 <...

Consider the production function Y = F (K, L) = Ka * L1-a, where 0 < α < 1. The national saving rate is s, the labor force grows at a rate n, and capital depreciates at rate δ. (a) Show that F has constant returns to scale. (b) What is the per-worker production function, y = f(k)? (c) Solve for the steady-state level of capital per worker (in terms of the parameters of the model). (d) Solve for the...

Consider the following production function: Y = output = AK1/2N1/2, A = productivity, K = capital,...

Consider the following production function: Y = output = AK1/2N1/2, A = productivity, K = capital, N = labor. a) (3 pts.) Suppose that Y = 1331, K =121, and N = 121. Find A. b) (4 pts.) Find the marginal product of capital (MPK), measured as the additional output that arises when the capital stock is increased by 1 unit. (Start with the values of A, K and N that you found in part (a).) c) (4 pts.) Suppose...

Suppose an economy's production is defined by the following neoclassical function: Y=K 1/5L 4/5. What are...

Suppose an economy's production is defined by the following neoclassical function: Y=K 1/5L 4/5. What are the expressions for the marginal product of capital and the marginal product of labor? 1/5Y/L and 4/5Y/L 1/5Y/K and 4/5Y/L 1/5Y/L and 4/5Y/K 1/5Y/K and 4/5Y/K

Suppose Canada’s aggregate production function is given by the following: Y = K^1/3 *(AN)^2/3 Variables are...

Suppose Canada’s aggregate production function is given by the following: Y = K^1/3 *(AN)^2/3 Variables are defined as they were in class. Suppose the savings rate in Canada is 20% (s = 0.2), the depreciation rate is 5% (δ = 0.05), the population growth rate is 2% (gN = 0.02), and the growth rate of technology is 4% (gA = 0.04). a) Solve for the equilibrium level of capital per effective worker ( K/AN ) and output per effective worker...

An economy has a Cobb–Douglas production function: Y=Kα(LE)1−αY=Kα(LE)1−α The economy has a capital share of 0.30,...

An economy has a Cobb–Douglas production function: Y=Kα(LE)1−αY=Kα(LE)1−α The economy has a capital share of 0.30, a saving rate of 42 percent, a depreciation rate of 5.00 percent, a rate of population growth of 2.50 percent, and a rate of labor-augmenting technological change of 4.0 percent. It is in steady state. Solve for capital per effective worker (k∗)(k∗), output per effective worker (y∗)(y∗), and the marginal product of capital. k∗=k∗= y∗=y∗= marginal product of capital =