An economy has a Cobb-Douglas production function: Y = Ka(LE)(1-a). The economy has a capital share...

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An economy has a Cobb-Douglas production function: Y = Ka(LE)(1-a). The economy has a capital share...

An economy has a Cobb-Douglas production function:

Y = K^a(LE)^(1-^a⁾.

The economy has a capital share of a third (means a= 1/3), a saving rate of 24 percent, a depreciation rate of 3 percent, and a rate of labor-augmenting technological change of 1 percent. It is in steady state.

a. At what rate does total output, output per worker, and output per effective worker grow?

b. Solve for steady state capital per effective worker, output per effective worker, consumption per effective worker and investment per effective worker.

c. Suppose savings rate decrease to 20 percent. Solve for new steady state capital per effective worker, output per effective worker, consumption per effective worker and investment per effective worker.

d. In a graph, show the initial and final steady states. Label the graph very clearly.

e. Explain the process by which the economy goes from one steady state to another.

business economics

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As per HOMEWORKLIB RULES,iam giving answer for the first question.

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An economy has a Cobb-Douglas production function: Y = Ka(LE)(1-a). The economy has a capital share...

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Homework Answers

Add Answer to: An economy has a Cobb-Douglas production function: Y = Ka(LE)(1-a). The economy has a capital share...

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An economy has a Cobb-Douglas production function: Y = Ka(LE)(1-a). The economy has a capital share...