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4 Sep 2018
3. (10 marks) 2-1 (a) Compute f'(x) for f(x) = - 1. DO NOT SIMPLIFY. *+ sin(c) (b) Compute f'(x) for f(t) = e7r* (.22 +1). DO NOT SIMPLIFY. (c) If / and g are differentiable functions with S(5) = 5, f'(5) 0, 9(5) = 3, '(5) = -1, l'(3) = -2 and g'(3) - 2, then compute W/(5), where h(x) = f(g(x)) + 4xf(x) any po (d) Find the break-even points for Sprockets of Peace. Give both the price p and the quantity q at each of these points. operation point present of Peace, Clive both the pricep (e) If Entertainment Arbitrator is operating at the break-even point with high- est q-value, should it increase or decrease the price to increase its profit? Use the marginal profit function in your explanation. (f) How many copies of the game should Entertainment Arbitrator produce to maximize profit?
3. (10 marks) 2-1 (a) Compute f'(x) for f(x) = - 1. DO NOT SIMPLIFY. *+ sin(c) (b) Compute f'(x) for f(t) = e7r* (.22 +1). DO NOT SIMPLIFY. (c) If / and g are differentiable functions with S(5) = 5, f'(5) 0, 9(5) = 3, '(5) = -1, l'(3) = -2 and g'(3) - 2, then compute W/(5), where h(x) = f(g(x)) + 4xf(x) any po (d) Find the break-even points for Sprockets of Peace. Give both the price p and the quantity q at each of these points. operation point present of Peace, Clive both the pricep (e) If Entertainment Arbitrator is operating at the break-even point with high- est q-value, should it increase or decrease the price to increase its profit? Use the marginal profit function in your explanation. (f) How many copies of the game should Entertainment Arbitrator produce to maximize profit?
Deanna HettingerLv2
6 Sep 2018