1. Total monthly profit ($) when producing and selling x number of circuit boards is (x) = 27x18,000 Interpret: A. Y-intercept B. Slope 2. A manufacturer of boots for a slalom water ski has a production cost of $30 for each boot. The cost each month to the manufacturer without producing any boots is $60,000. The boots sell for $45. A. Determine the Cost C(x), Revenue R(x), and Profit (x) functions. C(x) = R(x) = T(X) = B. What is the break-even point for the Cost and Revenue functions? C. For what quantity (x) is the profit zero? X= D. Graph the Cost, Revenue, and Profit functions. Label the axes, the functions, and the break-even point (as an ordered pair) for the Cost and Revenue Functions.

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5:30 LTE ) < Chapter 1 Practice Exer... B 1. Total monthly profit ($) when producing and selling x number of circuit boards is T(x)=27x 18,000 Interpret: A. Y-intercept B. Slope 2. A manufacturer of boots for a slalom water ski has a production cost of $30 for each boot. The cost each month to the manufacturer without producing any boots is $60,000. The boots sell for $45. A. Determine the Cost C(x), Revenue R(x), and Profit (x) functions. C(x) = R(x) = T(X) = B. What is the break-even point for the Cost and Revenue functions? C. For what quantity (x) is the profit zero? X = D. Graph the Cost, Revenue, and Profit functions. Label the axes, the functions, and the break-even point (as an ordered pair) for the Cost and Revenue Functions. 3. The quantity demanded for the Sony VCR model 37 is 2500 per week when the unit price is $700. For each increase in unit price of $50, the quantity demanded decreases by 250 units. The suppliers will provide 2500 units when the price is $800 per unit, and they will not supply any units for $500 or less. (Note: Define your variables.) A. Algebraically determine the supply equation. (Place in function form.) M Dashboard To Do Inbox 88 Calendar C Notifications