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19 votes
19 votes
Hi! Been out due to medical issues. Trying to learn work so help would be appreciated! Thank you so much.

Hi! Been out due to medical issues. Trying to learn work so help would be appreciated-example-1
User Nogwater
by
2.8k points

1 Answer

30 votes
30 votes

To answer this question we will set and solve a system of equations.

Let A be the speed (in miles per hour) of the airplane in still air, and W be the wind speed (in miles per hour).

Since the airplane flying with the wind takes 4 hours to travel a distance of 1200 miles and flying against the wind takes 5 hours to travel the same distance, then we can set the following equation:


\begin{gathered} 4A+4W=1200, \\ 5A-5W=1200. \end{gathered}

Dividing the first equation by 4 we get:


\begin{gathered} (4A+4W)/(4)=(1200)/(4), \\ A+W=300. \end{gathered}

Subtracting A from the above equation we get:


\begin{gathered} A+W-A=300-A, \\ W=300-A\text{.} \end{gathered}

Substituting the above equation in the second one we get:


5A-5(300-A)=1200.

Simplifying the above result we get:


\begin{gathered} 5A-1500+5A=1200, \\ 10A-1500=1200. \end{gathered}

Adding 1500 to the above equation we get:


\begin{gathered} 10A-1500+1500=1200+1500, \\ 10A=2700. \end{gathered}

Dividing the above equation by 10 we get:


\begin{gathered} (10A)/(10)=(2700)/(10), \\ A=270. \end{gathered}

Finally, substituting A=270 at W=300-A we get:


\begin{gathered} W=300-270, \\ W=30. \end{gathered}

Answer:

The speed of the airplane in still air is 270 miles per hour.

The wind speed is 30 miles per hour.

User Andrew Ellis
by
2.9k points
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