The price-demand equation and the cost function for the production of table saws are given, respectively, by x= 9,600 - 32p and C(x) = 60,000 + 50x, where x is the number of saws that can be sold at a price of Sp per saw and C(x) is the total cost (in dollars) of producing x saws. Complete parts (A) through (1) below. ..... (A) Express the price p as a function of the demand x, and find the domain of this function. The price function is p=

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x=9 The price-demand equation and the cost function for the production of table saws are given, respectively, by x= 9,600 -32p and C(x)= 60,000 +50x, where x is the number of saws that can be sold at a price of Sp per saw and C(x) is the total cost (in dollars) of producing x saws. Complete parts (A) through (1) below. wh (A) Express the price p as a function of the demand x, and find the domain of this function. (A) (B) The price function is p= (C) (G)

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Find and interpret P (4,200). Select the correct choice below and fill in the answer boxes within your choice. (Simplify your answers.) O A. P'(4,200)= at a profit level of $ saw production is decreasing at the rate of saws per dollar. О В. Р'(4200)- at a profit level of $ saw production is increasing at the rate of saws per dollar. O C. P'(4,200) = at a production level of %3D saws, profit is decreasing at the rate of $ per saw. O D. P'(4,200)= at a production level of saws, profit is increasing at the rate of $ per saw. lath 1