Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
(1 pt) At noon, ship A is 50 nautical miles due west of ship B. Ship A is sailing west at 15 knots and ship B is sailing north...Asked by Parker
At noon, ship A is 10 nautical miles due west of ship B. Ship A is sailing west at 17 knots and ship B is sailing north at 20 knots. How fast (in knots) is the distance between the ships changing at 4 PM? (Note: 1 knot is a speed of 1 nautical mile per hour.)
Answers
Answered by
Reiny
let t hours be some time past 12:00 noon
After t hours, ship B has gone 20t knots
and ship A has gone 17t knots
let the distance between them be D
I see a right-angled triangle and
D^2 = (20t)^2 + (17t+10)^2
D^2 = 689t^2 + 340t + 100
2D(dD/dt) = 1378t + 340
dD/dt = (689t + 170)/D
at 4:00 pm, t=4 and
D^2 = 12484
D = 111.7318
so at t=4
dD/dt = (689(4) + 170)/111.7318
= 26.19 knots
After t hours, ship B has gone 20t knots
and ship A has gone 17t knots
let the distance between them be D
I see a right-angled triangle and
D^2 = (20t)^2 + (17t+10)^2
D^2 = 689t^2 + 340t + 100
2D(dD/dt) = 1378t + 340
dD/dt = (689t + 170)/D
at 4:00 pm, t=4 and
D^2 = 12484
D = 111.7318
so at t=4
dD/dt = (689(4) + 170)/111.7318
= 26.19 knots
Answered by
Parker
It still says NOT CORRECT.
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.