Profit and Revenue Function Analysis

To maximize the profit

To calculate the total revenue

To find the marginal cost function

To determine the total cost of production

By subtracting the cost function from the revenue function

By dividing the revenue function by the cost function

By multiplying the revenue and cost functions

By adding the revenue and cost functions

-Q^3 + 360Q^2 - 11Q - 480

3Q^2 - 720Q + 11

Q^3 - 360Q^2 + 11Q + 480

-3Q^2 + 720Q - 11

Quadratic formula

Completing the square

Factorization

Graphical method

The function is concave down, indicating a maximum

The function is concave up, indicating a minimum

The function is linear, indicating no extremum

The function is undefined at that point

The function is concave up, indicating a minimum

The function is concave down, indicating a maximum

The function is linear, indicating no extremum

The function is undefined at that point

To find the critical numbers

To determine the concavity of the function

To calculate the profit function

To derive the revenue function

239,980 units

2,399.8 units

23,998 units

239.98 units

$69,088.80

$6,908.88

$690,888.08

$6,908,880.08

To convert the units to dollars

To adjust for the scale of units sold

To simplify the quadratic formula

To find the derivative