Answer:
A. [tex]22<19+0.05x[/tex]
B. If a customer makes more than 60 monthly calls, then Plan 1 is more economical
Step-by-step explanation:
Let x be the number of calls, y - total cost per month
Plan 1: $22 per month for unlimited calls, then
[tex]y=22[/tex]
Plan 2: $19 per month plus $0.05 per call ($0.05x for x calls). Then
[tex]y=19+0.05x[/tex]
A. If Plan 1 is more economical than Plan 2, then the total cost in Plan 1 is less than the total cost in Plan 2. Thus,
[tex]22<19+0.05x[/tex]
B. Solve this inequality:
[tex]22<19+0.05x\\ \\0.05x+19>22\\ \\0.05x+19-19>22-19\\ \\0.05x>3\\ \\5x>300\ [\text{ Multiplied by 100}]\\ \\x>60\ [\text{ Divided by 5}][/tex]
Meaning: If a customer makes more than 60 monthly calls, then Plan 1 is more economical
