Answer:
Part A:
The equation for the maximum profit in standard form is y = 3360·x - 80·x²
Part B:
The equation for the maximum profit in vertex form is y = -80·(x - 21)² + 35280
Part C: The amount of dollars Fran can raise the price of her items to maximize her profit is given by value of x at the vertex, which is 21 dollars
Explanation:
Part A:
The current price for each product = $8
The number of customers for the product = 4,000
The number of customers lost per dollar rice in the product price = 80
Total revenue = f(x) = (4000 - 80·x) × (8 + x) = -80×(x² - 42·x -400)
Maximum Profit = Total revenue - Cost = -80×(x² - 42·x -400) - 4000×8
Profit, y = 3360·x - 80·x²
The equation for the maximum profit in standard form is y = 3360·x - 80·x²
Part B:
The maximum profit is given by the peak of the graph of the function for the profit, which is obtained by differentiating the function and equating to zero as follows;
dy/dx = d(3360·x - 80·x²)/dx = 3360 - 160·x = 0
3360 = 160·x
x = 3360/160 = 21
x = 21
f(21) = y₂₁ = 3360×21 - 80×21² = 35,280
The vertex = (21, 35,280)
Therefore, the equation for the maximum profit in vertex form is -80·(x - 21)² + 35280
Part C: The amount of dollars Fran can raise the price of her items to maximize her profit is given by value of x at the vertex, which is x = 21 dollars.