Consider a world composed of two countries, Home (H) and Foreign (F). Individuals living in each country i = H, F have preferences over two goods x and y. In each country there is only one factor of production, labour, which is perfectly mobile between industries but immobile between countries. The total labour endowment at Home is LH = 10 and the total labour endowment in Foreign is LF = 10. The marginal product of labour in each industry is constant. At Home, one worker can produce 2 units of good x or 1 unit of good y per unit of time; at Foreign one worker can produce 1 unit of good x or 2 units of good y per unit of time. Assume that consumers in Home and Foreign always consume goods x and y in the same quantity regardless of their prices. That is, Cxi = Cyi, i = H, F. A. Derive the production possibilities frontier (PPF) for Home and Foreign and plot it in a graph with good x in the horizontal axis and good y in the vertical axis.
Consider a world composed of two countries, Home (H) and Foreign (F). Individuals living in each country
i = H, F have preferences over two goods x and y.
In each country there is only one factor of production, labour, which is perfectly mobile between industries but
immobile between countries. The total labour endowment at Home is LH = 10 and the total labour endowment
in Foreign is LF = 10.
The marginal product of labour in each industry is constant. At Home, one worker can produce 2 units of
good x or 1 unit of good y per unit of time; at Foreign one worker can produce 1 unit of good x or 2 units of good
y per unit of time.
Assume that consumers in Home and Foreign always consume goods x and y in the same quantity regardless
of their prices. That is, Cxi = Cyi, i = H, F.
A. Derive the production possibilities frontier (
the horizontal axis and good y in the vertical axis.
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