Answer:
Step-by-step explanation:
According to the information given in the statement, there are the following mathematical expressions:
[tex]priceA = K\\priceB = L + Ax[/tex]
Where
[tex]K,~L~and~A~are~fixed~constants.\\x~is~the~amount~of~driven~mileage.[/tex]
Considering
[tex]K>L[/tex]
Then
[tex]priceA > priceB\\K > L + Ax\\K - L > Ax\\\frac{K - L}{A} > x[/tex]
The last equation means that to maintain the [text]priceB[\text] lower than [text]priceA[\text], the amount of driven mileage must be less than [tex]\frac{K - L}{A}[/tex]. If [tex]x[\tex] becomes greater than the fraction, then the [text]priceA[\text] will be lower than [text]priceB[\text].
[tex]\frac{K - L}{A} < x \\ K - L < Ax \\ K < L + Ax[\tex]
