Question 1140030

when your demand is 1650 and the price is 540, your revenue is equal to demand * price = 1650 * 540 = 891,000.


your cost is equal to 148,500 + 180 * the demand which becomes 148,500 + 180 * 1650 = 445,500.


your profit is then equal to revenue minus cost = 891,000 - 445,500 = 445,500.


you are given that, when the price goes down by 13 dollars a unit, the demand goes up by 130 units.


the equation for that is revenue = (1650 + 130 * x) * (540 - 13 * x).


the demand is (1650 + 130 * x) and the price per unit is (540 - 13 * x).


x does not represent the demand, nor does it represent the revenue.


130 * x represents the amount of change in the demand and 13 * x represents the amount of change in the price per unit.


when x = 0, the amount of change in the demand is 0 and the amount of change in the price is 0.


when x = 1, the amount of change in the demand is equal to plus 130 and the amount of change in the price is equal to minus 13 dollars.


when x = 2, the amount of change in the demand is equal to plus 260 and the amount of change in the price is equal to minus 26 dollars.


as such, x represents the number of increments of change in the demand and in the corresponding price.


it does not represent the demand itself.


this means that your cost equation, shown as 148500 + 180 * x, needs to be changed because the demand is represented by 1650 + 130 * x, and not x.


the cost equation becomes cost = 148,500 + 180 * (1650 + 130 * x).


you have a revenue equation equal to (1650 + 130 * x) * (540 - 130 * x).


you have a cost equation equal to 148,500 + 180 * (1650 + 130 * x).


since profit is equal to revenue minus cost, then your profit equation becomes:


profit = (1650 + 130 * x) * (540 - 130 * x) - (148,500 + 180 * (1650 + 130 * x)).


the revenue equation can be simplified to:


revenue = -1690x^2 + 48750x + 891000, which is a quadratic equation.


since it is in standard form, you get:


a = -1690
b = 48750
c = 891000


the maximum revenue occurs when x = -b/2a.


solve for x = -b/2a to get x = 14.42307692.


the maximum revenue is determined when you replace x in the revenue equation with 14.42307692.


this gets you max revenue of 1,242,562.5 dollars.


the answer to question a is:


the revenue function is revenue = (1650 + 130 * x) * (540 - 13 * x)


the demand is represented by (165 + 130 * x)


the price is represented by (540 - 13 * x)


x represents the number of increments of change required.


the answer to question b is:


revenue is maximized when the rebate is equal to 13 * 14.42307692 = 187.5 dollars.


when x = 14.423076972, the demand is equal to 1650 + 130 * 14.42307692 = 3525 and the price is equal to 540 - 187.5 = 352.50 dollars.


the answer to question c is:


the profit is maximized when the rebate is equal to 13 * 7.5 = 97.5 dollars.


when x = 7.5, the demand is equal to 1650 + 130 * 7.5 = 2625 and the price is equal to 540 - 13 * 7.5 = 442.5 dollars.


the graph of the revenue and profit functions are shown below.


<img src = "http://theo.x10hosting.com/2019/042811.jpg" alt="$$$">


the display of the excel spreadsheet calculations are shown below.


<img src = "http://theo.x10hosting.com/2019/042812.jpg" alt=$$$" >