Question: 74. Profit-loss analysis. Use the revenue function from Problem 70 and the given cost function: R(x) = x(2,000 - 60x) Revenue function C(x) = 4,000

74. Profit-loss analysis. Use the revenue function from Problem 70 and the given cost function: R(x) = x(2,000 - 60x) Revenue function C(x) = 4,000 + 500x Cost function where x is thousands of computers, and R(x) and C(x) are in thousands of dollars. Both functions have domain 1 = x S 25. (A) Form a profit function P, and graph R, C, and P in the same rectangular coordinate system. (B) Discuss the relationship between the intersection points of the graphs of R and C and the x intercepts of P. (C) Find the x intercepts of P and the break-even points. (D) Find the value of x that produces the maximum profit. Find the maximum profit and compare with Problem 70B

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