A company is planning to manufacture mountain bikes. The fixed monthly cost will be $300,000 and it will cost $200 to produce each bicycle.C(1000) =Interpret C(1000).When bicycles are produced in a month, it costs $ to produce each bicycle.C(2000) =Interpret C(2000)Whenbicycles are produced in a month, it costs $to produce each bicycle.C(4000) =|%3DInterpret C(4000).Whenbicycles are produced in a month, it costs $to produce each bicycle.D. What is the horizontal asymptote for the graph of the average cost function, C?The horizontal asympote is(Type an equation.)Describe what this means in practical terms.O A. The cost per bicycle approaches $300,000 as more bicycles are produced in a month.B. When 200 bicycles are produced in a month, the cost per bicycle is at a minimum.OC. The cost per bicycle approaches $200 as more bicycles are produced in a month.D. When 300,000 bicycles are produced in a month, the cost per bicycle is at a minimum. A company is planning to manufacture mountain bikes. The fixed monthly cost will be $300,000 and it will cost $200 to produce each bicycle.A. Write the cost function, C, of producing x mountain bikes per month.C(x) =B. Write the average cost function, C, of producing x mountain bikes per month.C(x)=|%3DC. Find and interpret C(500), C(1000), C(2000), and C(4000).C(500)=Interpret C(500).Whenbicycles are produced in a month, it costs $to produce each bicycle.C(1000) =Interpret C(1000).Whenbicycles are produced in a month, it costs $to produce each bicycle.C(2000) =Interpret C(2000).Whenbicycles are produced in a month, it costs $to produce each bicycle.C(4000) =Interpret C(4000)

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A company is planning to manufacture mountain bikes. The fixed monthly cost will be $300,000 and it will cost $200 to produce each bicycle. A. Write the cost function, C, of producing x mountain bikes per month. C(x)= B. Write the average cost function, C, of producing x mountain bikes per month Cx) = C. Find and interpret C(500), C(1000), C(2000), and C(4000). C(500) = Interpret C(500). When bicycles are produced in a month, it costs $to produce each bicycle. C(1000) = Interpret C(1000). When bicycles are produced in a month, it costs $ to produce each bicycle C(2000) = Interpret C(2000) When bicycles are produced in a month, it costs S to produce each bicycle CI4000) = Interpret C(4000).

A company is planning to manufacture mountain bikes. The fixed monthly cost will be $300,000 and it will cost $200 to produce each bicycle. A. Write the cost function, C, of producing x mountain bikes per month. C(x)= B. Write the average cost function, C, of producing x mountain bikes per month Cx) = C. Find and interpret C(500), C(1000), C(2000), and C(4000). C(500) = Interpret C(500). When bicycles are produced in a month, it costs $to produce each bicycle. C(1000) = Interpret C(1000). When bicycles are produced in a month, it costs $ to produce each bicycle C(2000) = Interpret C(2000) When bicycles are produced in a month, it costs S to produce each bicycle CI4000) = Interpret C(4000).

Intermediate Algebra

19th Edition

ISBN:9780998625720

Author:Lynn Marecek

Publisher:Lynn Marecek

Chapter4: Systems Of Linear Equations

Section4.3: Solve Mixture Applications With Systems Of Equations

Problem 158E: The manufacturer of an energy drink spends $1.20 to make each drink and sells them for $2. The...

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