Chapter 3.5, Problem 35STP

To determine

To calculate: The maximum and minimum values of the function $f\left(x,y\right)=x+5y$ in the feasible region represented by given coordinates.

Answer to Problem 35STP

The maximum value of the function is $\text{16 at }\left(1,3\right)$ and minimum value of the function is $-8\text{ at }\left(2,-2\right)$ .

Explanation of Solution

Given information:

The vertices of the feasible region $\left(-3,2\right),\left(1,3\right),\left(6,1\right)\text{ and }\left(2,-2\right)$ .

Formula used:

To determine the maximum and minimum value of the function, substitute the coordinates of the feasible region in the function and determine the maximum and the minimum value.

Calculation:

Consider the provided vertices of the feasible region $\left(-3,2\right),\left(1,3\right),\left(6,1\right)\text{ and }\left(2,-2\right)$ .

The feasible region represented by the given vertices is drawn in the following graph,

  

Recall that to determine the maximum and minimum value of the function, substitute the coordinates of the feasible region in the function and determine the maximum and the minimum value.

So, substitute in the function $f\left(x,y\right)=x+5y$ and evaluate the maximum and minimum value as,

  $\begin{array}{ccc}\left(x,y\right)& x+5y& f\left(x,y\right)\\ \left(-3,2\right)& -3+5\left(2\right)& 7\\ \left(1,3\right)& 1+5\left(3\right)& 16\\ \left(6,1\right)& 6+5\left(1\right)& 11\\ \left(2,-2\right)& 2+5\left(-2\right)& -8\end{array}$

From the above table, it is observed that the maximum value of the function is $\text{16 at }\left(1,3\right)$ and minimum value of the function is $-8\text{ at }\left(2,-2\right)$ .

Thus, the maximum value of the function is $\text{16 at }\left(1,3\right)$ and minimum value of the function is $-8\text{ at }\left(2,-2\right)$ .