Answer:
a. We can say that P > C, where 'P' represents Peter's earnings and 'C' represents Cindy's earnings.
Given that P = 3h and C = 2h, where h =$4.50. We can say also that 3h > 2h.
b. If Cindy wants to earn at least $14 a day working two hours. Then:
2h ≥ $14
To solve the problem, we just need to solve for 'h':
h ≥ $7
Therefore, se should earn more or equal to $14 per hour.
Answer:
Peter works part time for 3 hours every day and Cindy works part time for 2 hours every day.
Part A:
Peter's earning in 3 hours is = [tex]3\times4.50=13.5[/tex] dollars
Cindy's earnings in 2 hours is = [tex]2\times4.50=9[/tex] dollars
We can define the inequality as: [tex]9<13.50[/tex]
Part B:
Let Cindy's earnings be C and number of hours needed be H.
We have to find her per hour income so that C ≥ 14
As Cindy works 2 hours per day, the inequality becomes 2H ≥ 14
So, we have [tex]H\geq 7[/tex]
This means Cindy's per hour income should be at least $7 per hour so that she earns $14 a day.
