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A Trig/Calc Problem
I Just thought this up, so I don't have the answer to it.
An airplane traveling at a constant speed of 150 km/h receives report that a tropical storm is heading its way. As the Pilot hears the report, he feels the wind start to pick up. The wind is coming in at a 90* angle from the airport and is accelerating at a constant speed of 20km/h^2. The airplane is 50 km from the airport. What is the rate at which the airplane will have to change its direction (in degrees) in order to keep a straight path to the airport. Will the airplane make it?
Again I just thought this up, so I don't even know if our Pilot will make it. (but Now I can start to work on it.) Enjoy.
[Spell checked, and wind acel changed to faster speed]
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without looking at his compass? :D
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:). Im going to solve it now as I have nothing better to do. :) looks like I stumped this forum.
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solved, But im A little leary of the answer I got. for those of you still that wish to do it look no further.
Ok, I came out with ~18.45* per sec would have to be the rate of change. with that knowledge, he would not have made it.
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you can try to solve my recursive math problem...
btw - it doesn't have to be done recursively, just have each number be different, except when it represents the same letter throughout the puzzle.
:D
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20 km/h^2 = 20*1000/60/60/60/60 m/s^2 = 0.00154 m/s^2
Plane speed: 150 km/h = 150*1000/60/60 = 41.7 m/s
Normal time to go 50 km:
50 000 / 41.7 = 1, 199s = 1/3 hours
Time for wind to reach the plane's speed:
150 / 0.00154 = 97, 402 s = 27 hours
Wind speed at .5 hours =
.00154*30*60 = 2.7 m/s
Angle at 2.7 m/s:
arcsin(2.7/150) = 1 degree
Something tells me they're gonna make it :afrog:
Oh, the rate is going to be very slow, but it won't be constant.
