1. (80 points). Consider a country in which there are 2 sectors called Sector 1 and Sector 2. The production functions and the marginal products in the two sectors are: Y,=20*(L))** and MPL,=10/(L,)"* Y2=10%(L2)"* and MPL:=5/(L2)"* where L; and L; are the number of workers employed in Sectors 1 and 2, respectively. The prices of goods in both sectors are equal to 1. The total number of workers in the economy is 2,000. The only difference between the sectors is that in Sector 2 workers are paid their average products, whereas in Sector 1 they are paid their marginal products. Workers move freely between sectors so that the wages are equal. (a) Draw a diagram for this economy. (See Figures 10. 3 10.5 for the idea). Calculate how many workers will work in each sector. (b) Assume that now producers in both sectors behave optimally. Draw a diagram for this economy. (See Figures 10. 3 10.5 for the idea). Calculate the optimal number of workers in each sector. (c) Use your answers from (a) and (b) to answer the following question: compared to the optimal allocation of workers, what sector has too many workers, and what sector has too small employment? (d) Assume that in both sectors producers still behave optimally and that the government introduces the minimum wage of 1. Draw a diagram for this situation. What will it do to the employment in each sector? Is this policy efficient? (Hint. Before drawing the figure calculate the optimal wage and compare it with the minimum wage). (e) Finally, assume that after the introduction of the minimum wage of 1, the productivity in Sector 2 has risen so that now Y2=100*(L2)** and MPL:=50/(L2)**. How will this change your answer to part (d)? (Hint: calculate the new optimal wage and compare it with the minimum one)