A company manufactures and sells x cellphones per week. The weekly price-demand and cost equations are given below. p = 600 -0.1x and C(x) = 15,000 + 140x (A) What price should the company charge for the phones, and how many phones should be produced to maximize the weekly revenue? What is the maximum weekly revenue? The company should produce phones each week at a price of $ (Round to the nearest cent as needed.) The maximum weekly revenue is $ (Round to the nearest cent as needed.) (B) What price should the company charge for the phones, and how many phones should be produced to maximize the weekly profit? What is the maximum weekly profit? The company should produce phones each week at a price of $ (Round to the nearest cent as needed.) The maximum weekly profit is $. (Round to the nearest cent as needed.)
A company manufactures and sells x cellphones per week. The weekly price-demand and cost equations are given below. p = 600 -0.1x and C(x) = 15,000 + 140x (A) What price should the company charge for the phones, and how many phones should be produced to maximize the weekly revenue? What is the maximum weekly revenue? The company should produce phones each week at a price of $ (Round to the nearest cent as needed.) The maximum weekly revenue is $ (Round to the nearest cent as needed.) (B) What price should the company charge for the phones, and how many phones should be produced to maximize the weekly profit? What is the maximum weekly profit? The company should produce phones each week at a price of $ (Round to the nearest cent as needed.) The maximum weekly profit is $. (Round to the nearest cent as needed.)
Chapter4: Systems Of Linear Equations
Section4.3: Solve Mixture Applications With Systems Of Equations
Problem 4.60TI: The manufacturer of a weight training bench spends $120 to build each bench and sells them for $170....
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Transcribed Image Text:A company manufactures and sells x cellphones per week. The weekly price-demand and cost equations are given below.
p=600 -0.1x and C(x) = 15,000 + 140x
(A) What price should the company charge for the phones, and how many phones should be produced to maximize the
weekly revenue? What is the maximum weekly revenue?
The company should produce phones each week at a price of $
(Round to the nearest cent as needed.)
The maximum weekly revenue is $ (Round to the nearest cent as needed.)
(B) What price should the company charge for the phones, and how many phones should be produced to maximize the
weekly profit? What is the maximum weekly profit?
The company should produce phones each week at a price of $.
(Round to the nearest cent as needed.)
The maximum weekly profit is $. (Round to the nearest cent as needed.)
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