Answer:
[tex] a =\frac{138-54}{660-100}= 0.15[/tex]
And using the minutes from June we can find the value for b the intercept
[tex] 54 = 0.15*100 +b[/tex]
[tex] b = 39[/tex]
And the function would be:
[tex] C(x) = 0.15 x+ 39 [/tex]
Step-by-step explanation:
For this case we define the following notation first:
C represent the cost for a given month
x represent the number of minutes of calling time she used
And we want to find a function of C in terms of x
We have the following info:
June
x =100 , C = 54
July
x =660 , C = 138
For this case we can assume that we can use a linear function since we have just two points given, and the general formula would be:
[tex] C(x) = ax +b[/tex]
Where a is the slope and can be estimated as:
[tex] a =\frac{138-54}{660-100}= 0.15[/tex]
And using the minutes from June we can find the value for b the intercept
[tex] 54 = 0.15*100 +b[/tex]
[tex] b = 39[/tex]
And the function would be:
[tex] C(x) = 0.15 x+ 39 [/tex]
