In: Economics
Consider two neighboring island countries called Contente and Euphoria. They each have 4 million labor hours available per week that they can use to produce jeans, rye, or a combination of both. The following table shows the amount of jeans or rye that can be produced using 1 hour of labor.
Country |
Jeans |
Rye |
---|---|---|
(Pairs per hour of labor) |
(Bushels per hour of labor) |
|
Contente | 6 | 12 |
Euphoria | 4 | 16 |
Initially, suppose Contente uses 1 million hours of labor per week to produce jeans and 3 million hours per week to produce rye, while Euphoria uses 3 million hours of labor per week to produce jeans and 1 million hours per week to produce rye. Consequently, Contente produces 6 million pairs of jeans and 36 million bushels of rye, and Euphoria produces 12 million pairs of jeans and 16 million bushels of rye. Assume there are no other countries willing to trade goods, so, in the absence of trade between these two countries, each country consumes the amount of jeans and rye it produces.
Contente's opportunity cost of producing 1 pair of jeans is__ of rye, and Euphoria's opportunity cost of producing 1 pair of jeans is __ of rye. Therefore, __ has a comparative advantage in the production of jeans, and__ has a comparative advantage in the production of rye.
Suppose that each country completely specializes in the production of the good in which it has a comparative advantage, producing only that good. In this case, the country that produces jeans will produce__million pairs per week, and the country that produces rye will produce__million bushels per week.
In the following table, enter each country's production decision on the third row of the table (marked "Production").
Suppose the country that produces jeans trades 14 million pairs of jeans to the other country in exchange for 42 million bushels of rye.
In the following table, select the amount of each good that each country exports and imports in the boxes across the row marked "Trade Action," and enter each country's final consumption of each good on the line marked "Consumption."
When the two countries did not specialize, the total production of jeans was 18 million pairs per week, and the total production of rye was 52 million bushels per week. Because of specialization, the total production of jeans has increased by__million pairs per week, and the total production of rye has increased by__million bushels per week.
Because the two countries produce more jeans and more rye under specialization, each country is able to gain from trade.
Calculate the gains from trade—that is, the amount by which each country has increased its consumption of each good relative to the first row of the table. In the following table, enter this difference in the boxes across the last row (marked "Increase in Consumption").
Contente |
Euphoria |
|||
---|---|---|---|---|
Jeans |
Rye |
Jeans |
Rye |
|
(Millions of pairs) |
(Millions of bushels) |
(Millions of pairs) |
(Millions of bushels) |
|
Without Trade | ||||
Production | 6 | 36 | 12 | 16 |
Consumption | 6 | 36 | 12 | 16 |
With Trade | ||||
Production | ||||
Trade action | ||||
Consumption | ||||
Gains from Trade | ||||
Increase in Consumption |
Each have 4 million labor hours
Country |
Jeans |
Rye |
---|---|---|
(Pairs per hour of labor) |
(Bushels per hour of labor) |
|
Contente | 6 | 12 |
Euphoria | 4 | 16 |
Contente's opportunity cost of producing 1 pair of jeans is 12/6=2 bushel of rye, and Euphoria's opportunity cost of producing 1 pair of jeans is 16/4=4 bushel of rye. Therefore, Contente has a comparative advantage in the production of jeans, and Euphoria has a comparative advantage in the production of rye.
Suppose that each country completely specializes in the production of the good in which it has a comparative advantage, producing only that good. In this case, the country that produces jeans will produce 6*4 = 24 million pairs per week, and the country that produces rye will produce 16*4 = 64 million bushels per week.
When the two countries did not specialize, the total production of jeans was 18 million pairs per week, and the total production of rye was 52 million bushels per week. Because of specialization, the total production of jeans has increased by 24-18 = 6 million pairs per week, and the total production of rye has increased by 64-42 = 22 million bushels per week.
Suppose the country that produces jeans trades 14 million pairs of jeans to the other country in exchange for 42 million bushels of rye.
Contente |
Euphoria |
|||
---|---|---|---|---|
Jeans |
Rye |
Jeans |
Rye |
|
(Millions of pairs) |
(Millions of bushels) |
(Millions of pairs) |
(Millions of bushels) |
|
Without Trade | ||||
Production | 6 | 36 | 12 | 16 |
Consumption | 6 | 36 | 12 | 16 |
With Trade | ||||
Production | 24 | 0 | 0 | 64 |
Trade action | Export 14 | Import 42 | Import 14 | Export 42 |
Consumption | 24-14=10 | 42 | 14 | 64-42=22 |
Gains from Trade | ||||
Increase in Consumption | 10-6=4 | 42-36=6 | 14-12=2 | 22-16=6 |