at maximum speed , an airplane travels 1680 miles against the wind in 5 hours flying with the wind , the plane can travel the same distance in 4 hours. let x be the maximum speed of the plane and y be the speed pf the wind. what is the speed of the plane with no wind

x = velocity of plane
y = velocity of wind

x - y = 1680/5 = 336 mph .....(1) [ plane flying against the wind]
&
x + y = 1680/4 = 420 mph....(2) [ plane flying with the wind]

Adding (1) and (2) to eliminate y gives

2x = 756
x = 378 mph is the speed of the plane with no wind.

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chisnau chisnau · Answer 2 · 2019-07-19T15:12:09+02:00

Answer:

The speed of plane is 378 mph in still air.

Step-by-step explanation:

Let x be the maximum speed of the plane.

Let y be the speed of the wind.

Distance an airplane travels = 1680 miles against the wind in 5 hours

So, equation becomes,

[tex]\frac{1680}{5}=x-y[/tex] or [tex]x-y=336[/tex] .....(1)

And with the wind, equation becomes,

[tex]\frac{1680}{4}=x+y[/tex] or [tex]x+y=420[/tex] .... (2)

Solving both equations, we get;

[tex]2x=756[/tex]

x = 378

And x+y=420

[tex]y=420-378=42[/tex]

Hence, the speed of plane is 378 mph and the speed of wind is 42 mph.