Asked by Shayna
The Yankee Clipper leaves the pier at 9:00 am at 8 knots. A half hour later the River Rover leaves the same peir going in the same direction traveling at 10 knots. At what time will the River Rover overtake the Yankee Clipper?
Please help me solve this using the d=rt formula and write an equation.
Please help me solve this using the d=rt formula and write an equation.
Answers
Answered by
MathMate
Arithmetic:
Clipper's lead = 8 knots * (1/2) hour = 4 nautical miles
For each hour, the Rover catches up by (10-8)=2 nautical miles.
Time required to catch up = 4/2 hours (after 9:30)
Time the Rover will catch up = 11:30
Algebra:
Let t=time (as of 9:30) to catch up
10*t - 8*t = 8*(1/2)
2t = 4
t=2
The Rover will catch up at 11:30.
Clipper's lead = 8 knots * (1/2) hour = 4 nautical miles
For each hour, the Rover catches up by (10-8)=2 nautical miles.
Time required to catch up = 4/2 hours (after 9:30)
Time the Rover will catch up = 11:30
Algebra:
Let t=time (as of 9:30) to catch up
10*t - 8*t = 8*(1/2)
2t = 4
t=2
The Rover will catch up at 11:30.
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.