Answer: The value of x= 5
And the value of y =0.
Step-by-step explanation:
Since we have given that
[tex]Max\ c=7x-3y\\\\y<\frac{1x}{5}+2\\\\5>y+x\\\\s.t.\ x>0\ y>0[/tex]
As we can see from the graph, there are three points occurred in feasible region, which are as follows;
[tex]A(2.5,2.5)\\\\B(-10,0)\\\\C(5,0)[/tex]
Now, we put the above three values in the objective function:
[tex]c=7x-3y\\\\Put\ A(2.5,2.5)\\\\c=7\times 2.5-3\times 2.5\\\\c=17.5-7.5\\\\c=10\\\\Similarly,\\\\Put\ B(-10,0)\\\\c=7\times -10-3\times 0\\\\c=-70\\\\Similarly,\\\\Put\ C(5,0)\\\\c=7\times 5-3\times 0\\\\c=35[/tex]
Therefore, we can see that
At C(5,0) we get maximum value as c = 35.
Hence, The value of x= 5
And the value of y =0.
