One-Variable & Multivariable Optimization Flashcards - Math Modeling

Assume that the growth rate of the cow is proportional to its weight.

In mathematical terms:

$\frac{dw}{dt}=cw$

Looking at the known information,

Variables:

$\t=\text{time (days)} \w=\text{weight (lbs)} \p=\text{proft (}$\text{/lbs)} \C=\text{cost to keep the cow} \R=\text{revenue} \P=\text{profit}$

Therefore,

$\frac{dw}{dt}=3\text{ lbs/day}$

when

$w=175\text{ lbs}$

$\frac{dw}{dt}=cw, w(0)=175$

$c=\frac{3}{175}=0.017$

Thus the differential equation to solve for is as follows.

$\frac{dw}{dt}=0.017w, w(0)=175$

Solving by separation of variables results in the following equation.

$w=175e^{0.017t}$

From here, formulate the model with the new weight equation.

$\y=f(x) \y=(0.75-0.01t)(175e^{0.017t})-0.30t$

Recall that the goal is to optimize the question over

$S=\begin{Bmatrix} x:x\geq0 \end{Bmatrix}$ .

Use a graphing calculator or computer technology to graph the function.

Screen shot 2016 04 27 at 9.31.27 am

Observing the graph it appears the maximum profit for the cow occurs around and .

From here, answer the question. Taking into account the growth rate of the cow is still increasing, it is recommended to wait 7 or 8 days to sell the cow. This should result in a net profit of $131.90.

One-Variable & Multivariable Optimization - Math Modeling