Answer:
Allison worked 6 hours lifeguarding and 3 hours washing cars.
Step-by-step explanation:
Let
Number of hours Allison worked lifeguarding last week = x
Number of hours Allison worked washing cars last week = y
1. Last week Allison worked 3 more hours lifeguarding than hours washing cars hours, then
[tex]x-y=3[/tex]
Lifeguarding:
$12 per hour
$12x in x hours.
Washing cars:
$8 pere hour
$8y in y hours.
2. Allison earned a total of $96, hence
[tex]12x+8y=96[/tex]
You get the system of two equations:
[tex]\left\{\begin{array}{l}x-y=3\\ \\12x+8y=96\end{array}\right.[/tex]
Plot the graphs of these two equations (see attached diagram). These line intersect at point (6,3), so Allison worked 6 hours lifeguarding and 3 hours washing cars.
