Question

$55-56$ : Revenue, Cost, and Profit A print shop makes bumper stickers for election campaigns. If $x$ stickers are ordered (where $x<10,000$ ), then the price per sticker is $0.15-0.000002 x$ dollars, and the total cost of producing the order is $0.095 x-0.0000005 x^{2}$ dollars. Use the fact that revenue $=$ price per item $\times$ number of items sold to express $R(x),$ the revenue from an order of $x$ stickers, as a product of two functions of $x .$

Name: Problem 55, Chapter 3: Algebra and Trigonometry
Uploaded: 2020-10-02T05:09:33-08:00
Duration: 2 min 48 s
Channel: Norman Atentar

   $55-56$ : Revenue, Cost, and Profit A print shop makes bumper stickers for election campaigns. If $x$ stickers are ordered (where $x<10,000$ ), then the price per sticker is $0.15-0.000002 x$ dollars, and the total cost of producing the order is $0.095 x-0.0000005 x^{2}$ dollars.
Use the fact that revenue $=$ price per item $\times$ number of items sold to express $R(x),$ the revenue from an order of $x$ stickers, as a product of two functions of $x .$

Algebra and Trigonometry

James Stewart,… 2nd Edition

Chapter 3, Problem 55

Instant Answer

Solved by Expert Norman Atentar

10/02/2020

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In this case, the price per sticker is given by the equation $0.15-0.000002x$. Show more…

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$55-56$ : Revenue, Cost, and Profit A print shop makes bumper stickers for election campaigns. If $x$ stickers are ordered (where $x<10,000$ ), then the price per sticker is $0.15-0.000002 x$ dollars, and the total cost of producing the order is $0.095 x-0.0000005 x^{2}$ dollars. Use the fact that revenue $=$ price per item $\times$ number of items sold to express $R(x),$ the revenue from an order of $x$ stickers, as a product of two functions of $x .$

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Key Concepts

Revenue Function

A revenue function models the total income from sales and is typically defined as the product of the number of items sold and the price per item. In the context of economics and business, understanding how revenue scales with the quantity sold is essential for planning and decision-making.

Price Function

The price function represents how the price per unit varies with the number of units produced or ordered. This function is crucial because it reflects pricing strategies such as bulk discounts or variable pricing, which directly affect the revenue generated from sales.

Product of Functions

Expressing the revenue as a product of two functions involves combining the price function and the quantity sold. This method highlights the multiplicative relationship between price and quantity, and how changes in one or both functions can impact overall revenue.

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