A company produces a special new type of TV. The company has fixed costs of $459,000, and it costs $1000 to produce each TV. The company projects that if it charges a price of $2300 for the TV, it will be able to sell 800 TVs. If the company wants to sell 850 TVs, however, it must lower the price to $2000. Assume a linear demand. What price should the company charge to earn a profit of $1,041,000? It would need to charge S (Round answer to nearest dollar. If more than one answer, separate with a comma.)
A company produces a special new type of TV. The company has fixed costs of $459,000, and it costs $1000 to produce each TV. The company projects that if it charges a price of $2300 for the TV, it will be able to sell 800 TVs. If the company wants to sell 850 TVs, however, it must lower the price to $2000. Assume a linear demand. What price should the company charge to earn a profit of $1,041,000? It would need to charge S (Round answer to nearest dollar. If more than one answer, separate with a comma.)
Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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Transcribed Image Text:A company produces a special new type of TV. The company has fixed costs of $459,000, and it costs $1000 to produce each TV. The company projects that if it charges a price of $2300 for the TV, it will be able to sell 800 TVs. If the company wants to sell 850 TVs, however, it must
lower the price to $2000. Assume a linear demand.
What price should the company charge to earn a profit of $1,041,000?
It would need to charge $
(Round answer to nearest dollar. If more than one answer, separate with a comma.)
Expert Solution
Step 1
- Fixed cost of company: $459000
- Cost of production of each TV=$1000
- Selling price of each TV when 850 units are sold=$2300 -Equation(1)
- Selling price of each TV when 800 units are sold=$2000 -Equation(2)
- To find the selling price of each TV to earn a profit $1041000
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