Answer:
The variables are 'p' and 'c'.
The inequality is: [tex]10p+4c\geq100[/tex]
The graph is plotted below.
Three possible solutions are: (0, 25), (10, 0) and (5, 20)
Step-by-step explanation:
Let the number of pizzas sold be 'p' and number of cookies sold be 'c'.
Given:
Price per pizza = $10
Price per cookie = $4
Minimum amount to be earned = $100
Price for 'p' pizzas sold = [tex]10p[/tex]
Price for 'c' cookies sold = [tex]4c[/tex]
As per question:
[tex]10p+4c\geq100[/tex]
Also, number of pizzas and cookies can't be negative. So,
[tex]p\geq0,c\geq0[/tex]
Plotting the above inequalities on a graph using DESMOS.
The region that is common to all the above inequalities is the solution region and is shown in the graph below.
The solution region also includes all the points on the line.
So, the three possible combinations of solutions can be any 3 points in the solution region. One such combination is:
(0, 25), (10, 0) and (5, 20)
