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- Population Growth and Technological Progress-Work It Out An economy has a Cobb-Douglas production function: Y = K (LE)¹- The economy has a capital share of 0.20, a saving rate of 49 percent, a depreciation rate of 4.00 percent, a rate of population growth of 1.50 percent, and a rate of labor-augmenting technological change of 4.0 percent. It is in steady state. a. At what rates do total output and output per worker grow? Total output growth rate: Output per effective worker is constant in the steady state and does not change. increases in the steady state. declines in the steady state. % Output per worker growth rate: %Assume that a country's per-worker production is y = k1/2, where y is output per worker and kis capital per worker. Assume also that 10 percent of capital depreciates per year (= 0.10) 2 andthere is no population growth or technological change.a. If the saving rate (s) is 0.4, what are capital per worker, production per worker, andconsumption per worker in the steady state?b. Solve for steady-state capital per worker, production per worker, and consumption perworker with s = 0.6.c. Solve for steady-state capital per worker, production per worker, and consumption perworker with s = 0.8.d. Is it possible to save too much? Why?Consider a Solow growth model with a human capital augmented production function Y, = AK" H N-a- %3D Suppose that both physical and human capital are accumulated with constant savings rates sx and Sy respectively and depreciate at the common rate 8, that is K+1 - K, = sKY, - 8K, and H1 - H, = SKY, - SH, There is no growth in productivity A or raw labor N. "Suppose A = 1, a = ß = 1/4, sx = Sn = 0.12 and ô = 0.06. Let (a) y = YIN, k = KIN and h = HIN denote output per worker, physical capital per worker, and human capital per worker respectively. Let = hlk denote the intensity of human capital relative to physical capital. Calculate y, k, h and o in steady state. (b) . output per worker of the analogous Solow model without human capital (i.e., with Y, = AK" N- and A = 1, a = 1/2, s 0.12 and ô = 0.06. Explain the differences. How does steady state output per worker in this economy compare to the steady state * I Now consider the case a = 1/4 and ß = 3/4 with all the other parameters as in…
- QUESTION 22 whereas in the Solow model In the Romer model, the balanced growth path is equal to OAG-A; the steady-state level of capital is zero OB.0; infinity ; the growth rate declines as economy approaches the steady state O D. the level of the number researchers in an economy; capital is scarce OE. g=lL: there is a steady state G H. K. V. M Control Alt 無要換 AltConsider the growth model with labour augmenting technological progress. A decrease in the steady state capital per worker may be a result of O Increase in technological growth rate Decrease in savings rate O Increase in population growth rate All other options are correct,Given a saving rate of 5%, a depreciation rate of 1%, and a production function in which y = k0.5where y is output per worker and k is capital per worker, calculate the steady state values forii. output per worker, iii. consumption per worker, iv. Calculate the golden rule steady state level of capital
- estion 30 A country with neither population growth nor technological progress is nitaly in the golden-rule steady state. Carefuly ilustrate this situation using a graph with output per worker, investment per worker, and depreciation per worker on the vertical axis and capital per worker on the horizontal axis. Now suppose climate change increases the depreciation rate. If the country adjusts its saving rate to reach the new golden- rule steady state, is it possible to determine how output per worker and consumption per worker in the new steady state compare to their levels in the initial steady state? Explain.Economies with high growth rates tend to be those that increase their: O government regulations. O consumption. resources. human capital.e ncia.wwnorton.com b. Per capita real GDP doubled in South Korea again in only seven years, reaching $1600.00 by 1988.00. What was the average annual economic growth rate between 1981 and 1988.00? (NOTE: Round this to two places past the decimal point.) % 4th attempt 3rd attempt Okay Elizabeth 4 8 Q W E Y U P @ 23 & return A F G H J K % ! V N M .?123 .?123
- 3 pts in the Solow model, the economy reaches a steady-state because as capital per worker increases O savings per worker is constant, while the population growth rate is contare and the depreciation rate of capital decen, ing that the economy w gro endogenously while the population growth rate and the depreciation rate of capital are comitant implying that the economy will converge to a sady O marginal savings per worker diminishes, while the population growth rate and the depreciation rate of capital are constant implying that the economy will gro endogenously Osaving perv state. O marginal savings per worker diminishes, while the population growth rate and the depreciation rate of capital are constant, implying that the economy will converge to a steady-stateY - K"(LE) The economy has a capital share of 0.20, a saving rate of 45 percent, a depreciation rate of 3.75 percent, a rate of population growth of 5.00 percent, and a rate of labor-augmenting technological change of 3.5 percent. It is in steady state. b. Solve for capital per effective worker (k"), output per elffective worker (y"), and the marginal product of capital. k' - y* = marginal product of capital =Given a saving rate of 5%, a depreciation rate of 1%, and a production function in which y = k0.5where y is output per worker and k is capital per worker, calculate the steady state values fori. capital per worker, ii. output per worker, iii. consumption per worker
