Answer:
Car 2 arrives 3.16 minutes sooner to car 1 at 12 miles.
The faster car must travel 75.76 miles before it has a 20 min lead on the slower car.
Step-by-step explanation:
Speed of car 1 = 57 mph
Speed of car 2 = 76 mph
We need to find how much sooner does the faster car arrive at a destination 12 mi away.
Time taken for car 1
[tex]t_1=\frac{12}{57}=0.21hour=12.63minutes[/tex]
Time taken for car 2
[tex]t_2=\frac{12}{76}=0.158hour=9.47minutes[/tex]
Difference between arrival = 12.63 - 9.47 = 3.16 minutes
So the car 2 arrives 3.16 minutes sooner to car 1 at 12 miles.
Now we need to find the distance at which faster car has a 20 minute lead
Difference between arrival = 20 minutes
Let the distance be S
Time taken for car 1
[tex]t_1=\frac{S\times 60}{57}=1.053S[/tex]
Time taken for car 2
[tex]t_2=\frac{S\times 60}{76}=0.789S[/tex]
We have
1.053 S - 0.789 S = 20
S = 75.76 miles
So the faster car must travel 75.76 miles before it has a 20 min lead on the slower car.
