Difference between revisions of "022 Sample Final A, Problem 9"

Revision as of 15:23, 6 June 2015

Given demand $p=116-3x$ , and cost $C=x^{2}+20x+64$ , find:

a) Marginal revenue when x = 7 units.

b) The quantity (x-value) that produces minimum average cost.

c) Maximum profit (find both the x-value and the profit itself).

Foundations:
Recall that the demand function, $p(x)$ , relates the price per unit $p$ to the number of units sold, $x$ . Moreover, we have several important important functions:
$C(x)$ , the total cost to produce $x$ units; $R(x)$ , the total revenue (or gross receipts) from producing $x$ units; $P(x)$ , the total profit from producing $x$ units; ${\overline {C}}(x)$ , the average cost of producing $x$ units.
In particular, we have the relations
$P(x)\,=\,R(x)-C(x),$
while
$R(x)\,=\,x\cdot p(x),$
and
${\overline {C}}(x)\,=\,{\frac {C(x)}{x}}.$
The marginal profit at $x_{0}$ units is defined to be the effective profit of the next unit produced, and is precisely $P'(x_{0})$ . Similarly, the marginal revenue or marginal cost would be $R'(x_{0})$ or $C'(x_{0})$ , respectively. On the other hand, any time they speak of minimizing or maximizing, we need to find a local extrema. These occur when the first derivative is zero.

Solution:

(a):

The revenue function is

R(x)\,=\,x\cdot p(x)\,=\,x(116-3x)\,=\,116x-3x^{2}

.

Thus, the marginal revenue at a production level of $7$ units is simply

R'(7)\,=\,116-6x{\bigg |}_{x=7}\,=\,116-6(7)\,=\,74.

(b):

We have that the average cost function is

{\begin{array}{rcl}{\overline {C}}(x)&=&{\displaystyle {\displaystyle {\frac {C(x)}{x}}}}\\\\&=&{\displaystyle {\displaystyle {\frac {x^{2}+20x+64}{x}}}}\\\\&=&{\displaystyle x+20+{\frac {64}{x}}.}\end{array}}

Our first derivative is then

{\overline {C}}\,'(x)\,=\,1-{\frac {64}{x^{2}}}\,=\,{\frac {x^{2}-64}{x^{2}}}\,=\,{\frac {(x-8)(+8)}{x^{2}}}.

This has a single positive root at $x=8$ , which will correspond to the minimum average cost.

(c):

First, we find the equation for profit. Using part of (a), we have

{\begin{array}{rcl}P(x)&=&{\displaystyle {\displaystyle R(x)-C(x)}}\\\\&=&116x-3x^{2}-(x^{2}+20x+64)\\\\&=&-4x^{2}+136x+64.\end{array}}

To find the maximum value, we need to find a root of the derivative:

0\,=\,P'(x)\,=\,-8x+136\,=\,-8(x-17),

which has a root at $x=17$ . Plugging this into our function for profit, we have

P(17)\,=\,-4(17)^{2}+136(17)+64\,=\,1220.

Final Answer:
(a) The marginal revenue at a production level of $7$ units is $74$ .
(b) The minimum average cost occurs at a production level of $8$ units.
(c) The maximum profit of $1220$ occurs at a production level of $17$ units.
Note that monetary units were not provided in the statement of the problem.

@@ Line 32: / Line 32: @@
 ::<math>\overline{C}(x)\,=\,\frac{C(x)}{x}.</math>
 |-
-|The '''marginal profit''' at <math style="vertical-align: -20%">x_0</math> units is defined to be the effective profit of the next unit produced, and is precisely <math style="vertical-align: -22%">P'(x_0)</math>.  Similarly, the '''marginal revenue''' or '''marginal cost''' would be <math style="vertical-align: -22%">R'(x_0)</math> or <math style="vertical-align: -22%">C'(x_0)</math>, respectively.
+|The '''marginal profit''' at <math style="vertical-align: -3px">x_0</math> units is defined to be the effective profit of the next unit produced, and is precisely <math style="vertical-align: -5px">P'(x_0)</math>.  Similarly, the '''marginal revenue''' or '''marginal cost''' would be <math style="vertical-align: -5px">R'(x_0)</math> or &thinsp;<math style="vertical-align: -5px">C'(x_0)</math>, respectively.
 On the other hand, any time they speak of minimizing or maximizing, we need to find a local extrema.  These occur when the first derivative is zero.