SOLUTION: A light aircraft flies A to B, 450km away, and back from B and A in a total time of 5 hours and 30 minutes. Suppose that during the whole journey there is a constant wind blowing f

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Question 523007: A light aircraft flies A to B, 450km away, and back from B and A in a total time of 5 hours and 30 minutes. Suppose that during the whole journey there is a constant wind blowing from A to B if the speed of the aircraft in still air is 165 km/h find the speed of the wind.
Found 2 solutions by mananth, oberobic:
Answer by mananth(16946) (Show Source):
You can put this solution on YOUR website!
plane speed = 165 km/h
wind speed = x km/h

against wind = 165 - x
with wind = 165 + x

Total distance =450 km Total Time= 5.50 hours
Time upstream + time downstream = 5.5 hours
450 /( 165 - x )+ 450 /( 165 + x )= 5.5
450 ( 165 + x )+ 450 ( 165 - x )= 5.5
74250 + 450 x + 74250 -450 x = 5.5 ( 15^2-x^2)
148500 = 5.5 ( 27225 - x^2 )
148500 = 149737.5 -5.5 X^2
X ^2 = 1237.5
X^2= 225
x= 15 km/h wind speed

Answer by oberobic(2304) (Show Source):
You can put this solution on YOUR website!
Problem: A light aircraft flies from A to B, 450km away, and returns from B and A in a total time of 5 hours and 30 minutes. Suppose that during the whole journey there is a constant wind blowing from A to B. The speed of the aircraft in still air is 165 km/h. Find the speed of the wind.
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Solution: The basic approach to solving problems such as these is to begin with the fundamental distance equation and plug in the known values and then solve for the unknowns.
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d = rt is the basic distance equation.
d = 450 km
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We are told the wind is blowing from A to B, so on the trip from A to B the airplane's speed is 165 km/h + w, where 'w' is the wind speed in km/h. That means the speed across the ground (the ground speed) is faster than the indicated airspeed. A wind from behind is called a 'tailwind.'
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Similarly, the ground speed going from B to A will be reduced by the wind. The indicated airspeed will still be 165, but the speed across the ground will be 165 - w. Such a wind is called a 'headwind.'
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We must assume the distance from A to B equals the distance from B to A. That is a reasonable mathematical assumption, although there are many factors in aviation that could force the path to be quite different going and coming.
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We assume the plane is flying at an indicated airspeed of 165 km/h in both directions.
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We are told the roundtrip time is 5 hr 30 min, which = 5.5 hr.
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A to B trip:
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B to A trip:
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Note that sqrt(225) = + or - 15, but a negative wind speed is not applicable.
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Substitute w = 15
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which is the time flying from A to B with a tailwind.
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which is the time flying from B to A with a headwind.
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Check the distances traveled to be sure this is the answer.

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Correct.
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Answer: The wind speed is 15 km/h.