For this case we propose a system of equations:
x: Variable that represents the amount of hours that Olivia's mother drove
y: Variable that represents the amount of hours that Olivia's father drove
So, we have:
[tex]x + y = 14\\65x + 60y = 895[/tex]
From the first equation we have:
[tex]x = 14-y[/tex]
Substituting in the second equation:
[tex]65 (14-y) + 60y = 895\\910-65y + 60y = 895\\-5y = 895-910\\-5y = -15\\y = \frac {15} {5}\\y = 3[/tex]
Thus, Olivia's father drove 3 hours.
[tex]x = 14-3 = 11[/tex]
Olivia's mother drove 11 hours.
Answer:
[tex](x, y) :( 11,3)[/tex]
