Consider an economy with the following aggregate production function: Y=3 K13(AL) 2/3 Capital grows through investment but also decays due to wear and tear at a constant rate δ per period. Assume that A is growing at the exogenous rate g, that L is growing at the exogenous rate n, and that households save a constant proportion s of their income. a. Find the steady state level of the capital per effective worker (k∗), output per effective worker (y∗) and consumption per effective worker (c∗) - in terms of the parameters of the model. b. What is the level of k(k∗∗) that maximizes consumption? c. Given a depreciation rate of 7%, population growth rate of 2%, technological progress of 1% and a saving rate of 30%, calculate the steady state levels of k,y and c. d. To move to the level of capital that maximizes consumption, how should the saving rate be changed? Explain. c. Calculate the saving rate needed to reach the golden rule level of capital per effective worker. r. Suppose the government wants to double the steady state value of output per effective worker by using policies to change the saving rate. Determine the new saving rate and use the Solow growth diagram to show the effect of the policy change on the growth rate of capital per effective labour in both the short- and long run.