For a certain company, the cost function for producing a items is C(x) = 40 + 150 and the revenue function for selling items is R(x) = -0.5(x - 100)2 +5,000. The maximum capacity of the company is 150 items. The profit function P(x) is the revenue function R (r) (how much it takes in) minus the cost function C(x) (how much it spends). In economic models, one typically assumes that a company wants to maximize its profit, or at least make a profit! Answers to some of the questions are given below so that you can check your work. 1. Assuming that the company sells all that it produces, what is the profit function? P(x) = GS Hint: Profit= Revenue - Cost as we examined in Discussion 3. 2. What is the domain of P(x)? Hint: Does calculating P(x) make sense when x = -10 or r = 1,000? 3. The company can choose to produce either 60 or 70 items. What is their profit for each case, and which level of production should they choose? Profit when producing 60 items = Number Profit when producing 70 items = Number

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Chapter1: Making Economics Decisions
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For a certain company, the cost function for producing a items is C (x) = 40 + 150 and the
revenue function for selling a items is R(x) = -0.5(x - 100)2 +5,000. The maximum capacity
of the company is 150 items.
The profit function P(x) is the revenue function R (r) (how much it takes in) minus the cost function
C (r) (how much it spends). In economic models, one typically assumes that a company wants to
maximize its profit, or at least make a profit!
Answers to some of the questions are given below so that you can check your work.
1. Assuming that the company sells all that it produces, what is the profit function?
P(x) =
GD
Hint: Profit= Revenue - Cost as we examined in Discussion 3.
=
2. What is the domain of P(x)?
Hint: Does calculating P(x) make sense when r=-10 or x = 1,000?
3. The company can choose to produce either 60 or 70 items. What is their profit for each case, and
which level of production should they choose?
Profit when producing 60 items= Number
Profit when producing 70 items= Number
4. Can you explain, from our model, why the company makes less profit when producing 10 more
units?
Transcribed Image Text:For a certain company, the cost function for producing a items is C (x) = 40 + 150 and the revenue function for selling a items is R(x) = -0.5(x - 100)2 +5,000. The maximum capacity of the company is 150 items. The profit function P(x) is the revenue function R (r) (how much it takes in) minus the cost function C (r) (how much it spends). In economic models, one typically assumes that a company wants to maximize its profit, or at least make a profit! Answers to some of the questions are given below so that you can check your work. 1. Assuming that the company sells all that it produces, what is the profit function? P(x) = GD Hint: Profit= Revenue - Cost as we examined in Discussion 3. = 2. What is the domain of P(x)? Hint: Does calculating P(x) make sense when r=-10 or x = 1,000? 3. The company can choose to produce either 60 or 70 items. What is their profit for each case, and which level of production should they choose? Profit when producing 60 items= Number Profit when producing 70 items= Number 4. Can you explain, from our model, why the company makes less profit when producing 10 more units?
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