Answer:
A) The linear equation model: y = 0.06x + 18
B) If you spend 180 minutes on the phone in a month, you would be billed $28.8
C) If your bill was $45.00 one month, you must have spent 450 minutes on the phone in that month
Explanations:
x represents the number of minutes spent in a month
y = total cell phone charge for the month
Let c represent the monthly fee
The equation of a line is given as
y = mx + c
Let m represent the charge per minute
m = 0.06
y = 0.06x + c...........(*)
In one month, you spent 280 minutes over the phone, and had a bill totaling $34.80
x = 280 minutes
y = 34.80
Substitute these values into equation (*)
34.80 = 0.06(280) + c
34.80 = 16.8 + c
c = 34.80 - 16.8
c = 18
The monthly fee = $18
A) The linear equation model is therefore:
y = 0.06x + 18
B) If you spend 180 minutes on the phone in a month, how much will you be billed?
y = 0.06x + 18
x = 180
y = 0.06(180) + 18
y = 10.8 + 18
y = 28.8
If you spend 180 minutes on the phone in a month, you would be billed $28.8
C) If your bill was $45, find the number of minutes spent on phone
Substitute y = 45 into the linear equation gotten
y = 0.06x + 18
45 = 0.06x + 18
0.06x = 45 - 18
0.06x = 27
x = 27/0.06
x = 450
If your bill was $45.00 one month, you must have spent 450 minutes on the phone in that month