30 units Unanswered Question 6 0/1 pts I The production function for replica lamps is Q...
Suppose in the short run a firm’s production function is given by Q = L1/2*K1/2, and that K is fixed at K = 49. If the price of Labor, w = $6 per unit of Labor, what is the firm’s Marginal Cost of production when the firm is producing 28 units of output?
1. Suppose that the production function for lava lamps is given by Q = KL -ľ, where is the number of lamps produced per year, K is the machine-hours of capital, and L is the man-hours of labor. Suppose K = 600. a. Draw a graph of the production function over the range L = 0 to L = 500, putting L on the horizontal axis and on the vertical axis. Over what range of L does the production function...
3. Suppose a firm has the production function Q = 50 KL 1) If the wage rate is $10 per unit of labor and the rental rate of capital is $5 per unit of capital, how much capital and labor should the firm employ in the long run to minimize the cost of producing 40,000 units? 2) Using the solution in part 1), what will the firm’s long-run total cost be?
Question 6 1 pts For the production function Q = 0.2L? returns to scale is: Zero Return to Scale Decreasing Returns to Scale Increasing Returns to Scale Constant Returns to Scale Previous Next >
3. Suppose the production of Crocs is characterized by the production function Q = LK, where represents the number of pairs of Crocs produced. Suppose that the price of labor is $10 per unit and the price of capital is $1 per unit. a. Graph the isoquant for Q=121,000. b. On the graph you drew for part a, draw several isocost lines including one that is tangent to the isoquant you drew. What is the slope of the isocost lines?...
Suppose a firm has the production function Q = 50KL with MP, = 50K and MP, = 50L . 1) If the wage rate is $10 per unit of labor and the rental rate of capital is $5 per unit of capital, how much capital and labor should the firm employ in the long run to minimize the cost of producing 40,000 units? 2) Using the solution in part 1), what will the firm's long-run total cost be?
1. The production of airframes is characterized by a production function: Q=(Lk + K2)2. The price of labor is $10 per unit and the price of capital is $1 per unit. Find the cost-minimizing combination of labor and capital for an airframe manufacturer that wants to produce 121,000 airframes.
Suppose a firm has a production function given by Q = [1/2K1/2. Therefore, 8-1/2 21/2 MP= -1/2 and MPx=- 28-1/2 The firm can purchase labor, L at a price w = 36, and capital, K at a price of r = 9. a) What is the firm's Total Cost function, TC(Q)? b) What is the firm's marginal cost of production?
EXERCISE 1 COST MINIMIZATION, PART I Consider a firm with a Cobb-Douglas production function defined by the equation Q = 32K0.5 0.25 where Q is output, K the capital input and I the labour input. The prices of both production factors are given to the firm: labour costs w = 32 per unit, capital r = 16 per unit. Imagine that the firm wants to produce 512 units of output at minimum cost. (a) Determine the (unique) stationary point, say...
Started: Nov 4 at 2:30pm Quiz Instructions 1 pts Question 6 For the production function Q = 0.2L? returns to scale is: Constant Returns to Scale Decreasing Returns to Scale Increasing Returns to Scale Zero Return to Scale