Asked by Luicia
A car leaves a city at 70 km/hr. After 15 minutes, another car follows at 80 km/h. How long will it take for the second car to reach the first, and at what distance?
Answers
Answered by
Jennifer
First, make sure all units are compatible:
Convert 15 minutes to hours, since the speeds are listed in km per hour.
15 minutes / 60 min/hr = .25 hours
Set up algebra equations:
Then let x be the distance traveled by the car that travels at 70 km/hr
Let y be the distance traveled by the car that travels at 80 km/hr
Let t be the time
When the second car starts, the first car has already traveled 70 km/h * .25 h = 17.5 km
x = 17.5 + 70*t
y = 80 * t
The cars will meet when x = y, or when
80*t = 17.5 + 70*t
Solve for t, the time at which they meet. Plug back t into the equation for x or y to find the distance at which they meet.
Convert 15 minutes to hours, since the speeds are listed in km per hour.
15 minutes / 60 min/hr = .25 hours
Set up algebra equations:
Then let x be the distance traveled by the car that travels at 70 km/hr
Let y be the distance traveled by the car that travels at 80 km/hr
Let t be the time
When the second car starts, the first car has already traveled 70 km/h * .25 h = 17.5 km
x = 17.5 + 70*t
y = 80 * t
The cars will meet when x = y, or when
80*t = 17.5 + 70*t
Solve for t, the time at which they meet. Plug back t into the equation for x or y to find the distance at which they meet.
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.