Question

A company produces two types of drills, a corded and cordless. The cord-type drill requires 3 hours to make, and the cordless model requires 4 hours. The company has 720 work hours per day for manufacturing and daily storage of 220 drills per day. Let 2 = the number of cordless drills produced per day and y = the number of corded drills produced per day Write the system of inequalities < 720 5220 Graph the system of inequalities. 250 240 230 220 210 200 190 280 170 160 150 130 120

Answer 1

To write a system of inequalities based on the given information, we can use the constraints: 4x + 3y ≤ 720 and x + y ≤ 220. To graph the system of inequalities, plot the boundary lines for each inequality and shade the region that satisfies both inequalities.

Step-by-step explanation:

To write a system of inequalities based on the given information, we can use the following constraints:

The total number of work hours per day for manufacturing is 720. Therefore, 4x + 3y ≤ 720, where x represents the number of cordless drills produced per day and y represents the number of corded drills produced per day.

The daily storage capacity is 220 drills per day. Therefore, x + y ≤ 220.

To graph the system of inequalities, plot the boundary lines for each inequality and shade the region that satisfies both inequalities