Final answer:
To find the maximum revenue, we need to determine the price that will maximize the number of wraps sold. By calculating the revenue for different number of $0.10 increases, we can identify the value that yields the highest revenue.
Step-by-step explanation:
To find the maximum revenue, we need to determine the price that will maximize the number of wraps sold. We know that for every $0.10 increase in price, 100 fewer wraps are sold.
Let's calculate the price that maximizes revenue:
Price = $1.50 + ($0.10 x Number of $0.10 increases)
Revenue = Price x Quantity
By substituting the price equation into the revenue equation, we can express revenue in terms of the number of $0.10 increases:
Revenue = ($1.50 + ($0.10 x Number of $0.10 increases)) x (2000 - (100 x Number of $0.10 increases))
To find the maximum revenue, we need to determine the number of $0.10 increases that maximizes the revenue.
We can do this by calculating the revenue for different number of $0.10 increases, and identifying the value that yields the highest revenue.