Answer:
[tex]\boxed{y=500-60x}[/tex]
where:
- x is the time (in hours).
- y is the car's distance from Austin (in miles).
Step-by-step explanation:
Define the variables:
- Let x be the time (in hours).
- Let y be the car's distance from Austin (in miles).
Given:
- When x = 0, y = 500.
- When x = 5, y = 200.
Find the rate of change:
[tex]\implies \textsf{Rate of change}=\dfrac{\textsf{change in $y$}}{\textsf{change in $x$}}=\dfrac{500-200}{0-5}=-60[/tex]
Therefore, for every hour that passes, the car is 60 miles closer to Austin.
Therefore, the function that describes the car's distance from Austin is:
[tex]\boxed{y=500-60x}[/tex]
where:
- x is the time (in hours).
- y is the car's distance from Austin (in miles).
