Respuesta :
Answer:
60 miles.
Step-by-step explanation:
Given:
We rent a car for the day and are offered two payment options.
With option A we pay $25 flat rate plus $0.15 per mile.
With option B we pay a $10 flat rate plus $0.40 per mile.
Question asked:
For what amount of miles would the cost of option A be equal to option B ?
Solution:
Let amount of miles for which the cost of option A be equal to option B = [tex]x[/tex]
For option A, we pay = [tex]25+0.15\times x[/tex]
For option B, we pay = [tex]10+0.40\times x[/tex]
Now, to find amount of miles for which the cost of option A be equal to option B, we will equalize the equation to find the value of [tex]x[/tex]
[tex]25+0.15x=10+0.40x\\[/tex]
By subtracting both sides by 10
[tex]25-10+0.15x=10-10+0.40x\\15+0.15x=0.40x[/tex]
By subtracting both sides by [tex]0.15x[/tex]
[tex]15+0.15x-0.15x=0.40x-0.15x\\15=0.25x[/tex]
By dividing both sides by [tex]0.25[/tex]
[tex]x=60\ miles[/tex]
Therefore, for 60 miles, the cost of option A will be equal to option B.
