Answer:
a. [tex]x-y > 0[/tex]
b. [tex]x+y \leq 50[/tex]
c. x=26; y=24 or (24,26)
Step-by-step explanation:
Let x = number of teachers hired.
Let y = number of tutors hired.
Now solving for part a we get
a. Write an inequality that represents the statement that the number of teachers hired must exceed the number of tutors hired.
[tex]x-y > 0[/tex]
solving for part b we get;
b. Write an inequality that represents the statement that the maximum number of teachers and tutors is 50.
[tex]x+y \leq 50[/tex]
solving for part c we get;
c. Choose a point that satisfies the situation, and explain why you chose that number of tutors and teachers.
Now we know that [tex]x-y > 0[/tex] also [tex]x+y \leq 50[/tex]
x=26; y=24
(24,26)
Explanation: To make number of teacher more than number of tutors this is the maximum value we can achieve for the requirement.