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Similar Question 1

<p>The Sticker Warehouse sells rolls of stickers for $4.00 each. The average customer buys six rolls of stickers. The owner finds that, for every $0.25 decrease in price. the average customer buys an additional roll.</p><p>a) Total sales revenue is the product of the number of units sold and the price. Make an algebraic model to represent The Sticker Warehouse's total revenue per customer.</p><p>b) With how many price reductions will the revenue per customer be $30?</p><p>c) What is the maximum predicted sales revenue per customer? With how many price reductions will this occur?</p>

Similar Question 2

<p>Shelly sells photos of athletes to baseball, basketball, and hockey fans after their games. Her regular price is $10 per photograph, and she usually sells about 30 photographs. Shelly finds that, for each reduction in price of $0.50, she can sell an additional two photographs.</p><p>a) Total sales revenue is the product of the number of units sold and the price. Make an algebraic model to represent Sherri’s total sales revenue.</p><p>b) At what price will Sherri’s revenue be $150?</p><p>c) At what price will her maximum revenue occur?</p><p>d) At what price will her revenue be $0?</p>

Similar Question 3

<p>An artisan can sell 120 garden ornaments per week at $4 per ornament. For each $0.50 decrease in price, he can sell 20 more ornaments.</p><p>a) Determine algebraic expressions for the price of a garden ornament and
the number of ornaments sold.</p><p>b) Write an equation for the revenue using your expressions from part a).</p><p>c) Use your equation from part b) to find what price the artisan should charge to maximize revenue.</p>

Similar Questions

Learning Path

L1
Quick Intro to Factoring Trinomial with Leading a

L2
Introduction to Factoring ax^2+bx+c

L3
Factoring ax^2+bx+c, ex1

Now You Try

<p>At the traffic safety bureau, Paul is conducting a study on the stoplights at a particular intersection. He determines that when there are <code class='latex inline'>18</code> green lights per hour, then, on average, <code class='latex inline'>12</code> cars can safely travel through the intersection on each green light. He also finds that if the number of green lights per hour increases by one, then one fewer car can travel through the intersection per light.</p><p>Determine a function to represent the total number of cars that will travel through the intersection for an increase of <code class='latex inline'>x</code> green light per hour.</p>

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