Chapter 2, Problem 70RE

To determine

To find: The maximum profit and number of units sold to generate it.

Answer to Problem 70RE

The maximum profit is equal to $88500$ and number of units sold to generate it is equal to $15000$ .

Explanation of Solution

Given information:

The profit $P$ (in dollars) generated by selling $x$ units of a certain commodity is given by $P\left(x\right)=-1500+12x-0.0004x^2$ .

Calculation:

Graph the profit function $P\left(x\right)=-1500+12x-0.0004x^2$ .

To graph a function $y=-1500+12x-0.0004x^2$ , follow the steps using graphing calculator.

First press “ON” button on graphical calculator, press $\boxed{\text{Y}=}$ key and enter right hand side of the equation $y=-1500+12x-0.0004x^2$ after the symbol ${\text{Y}}_1$ . Enter the keystrokes $\boxed{(-)}\boxed{1500}\boxed{+}\boxed{12}\boxed{\text{X}}\boxed{-}\boxed{0.0004}\boxed{\text{X}}\boxed{^}\boxed{2}$ .

The display will show the equation,

  ${\text{Y}}_{\text{1}}=-1500+12\text{X}-0.0004\text{X}^2$

Press the window key and adjust the window to $\left[-20000,20000\right]$ to $\left[-10,100000\right]$ .

Now, press the $\boxed{\text{GRAPH}}$ key and $\boxed{\text{TRACE}}$ key to produce the graph of given function in standard window as shown in Figure (1).

  

Figure (1)

The maximum value of the profit function is $88500$ at $x=15000$ .

Therefore, the maximum profit is equal to $88500$ and number of units sold to generate it is equal to $15000$ .