a. Consider an economy with the following Cobb–Douglas production function:
Y = 4K1/4L3/4.
Derive the equation describing labor demand in this economy as a function of the real wage and the capital stock. (Hint: Review Chapter 3.)
bmoOsF/gFFCO1FxbuvZHJuHCZDZw/TVKhofeDGvmiSPsw43jynp1wtsGGoF3oKz9oknJH0LYoiHEvKm7Y5/TkuNTTAioqHnVn+ug4Pp5ClkzVy9q9LYKzaqtDUSkW218VNXvjdT/7tVrh2QIMiEGYwgN8FHo7bNVUo88+/urQv17EgTy1XeGVg==b. The economy has 160,000 units of capital and a labor force of 10,000 workers. Assuming that factor prices adjust to equilibrate supply and demand, calculate the real wage, total output, and the total amount earned by workers.
Real Wage = yBhAQ+3VvjM=
Total Output = 86lkhjXE6cSvY4pmYMEsiw==
Total Amount Earned by Workers = 3N1zdPKp0pHkYn9M6ec4vQ==
Consider an economy with the following Cobb–Douglas production function:
Y = 4K1/4L3/4.
Now suppose that Congress, concerned about the welfare of the working class, passes a law setting a minimum wage that is 5 percent above the equilibrium wage you derived in part (b). Assuming that Congress cannot dictate how many workers are hired at the mandated wage, what are the effects of this law? Specifically, calculate what happens to the real wage, employment, output, and the total amount earned by workers.
Real Wage = YKEOwYPXm3o=
Employment = bGTmYVeVuDCcK6UMqQ58SQ==
Total Output = VkJTVKvKAMDNzQsjWcxzmA==
Total Amount Earned by Workers = u/dSXkG/+jziAcFc8A3D6g==