Question 1192160
using the desmos.com calculator, you would graph the opposite of the constraint inequalities.
the feasible region is the unshaded portion of the graph.
evaluate the objective function at the corner points of the feasible region.
the corner point with the maximum profit is  your solution.
if your maximum solution have fractions, then you would need to adjust so that they come out as integers.
your constraints must all be met at the maximum solution.
my graph is shown below:
<img src = "http://theo.x10hosting.com/2022/031601.jpg" >
the maximum solution is at (x,y) = (25.455,18.182) = 207.276.
if the solution needs to be integer, then use (x,y) = (25,18).
maximum solution will then become 204.
all constraints will have been met.