The speed of plane is 105 miles per hour and speed of wind is 28 miles per hour.
Step-by-step explanation:
Given,
The distance traveled by plane = 1463 miles
The trip with the wind took 11 hours.
The trip took 19 hours against the wind.
Let,
s be the speed of plane and w be the speed of wind.
Therefore;
Speed with the wind = s+w
Speed into the wind = s-w
We know that;
Distance = Speed * Time
Therefore;
Equation for trip taken with wind.
1463 = 11(s+w)
Dividing both sides by 11
[tex]\frac{1463}{11}=\frac{11(s+w)}{11}\\133=s+w\\s+w=133\ \ \ Eqn\ 1[/tex]
Equation for trip taken into the wind
1463 = 19(s-w)
Dividing both sides by 19
[tex]\frac{1463}{19}=\frac{19(s-w)}{19}\\77=s-w\\s-w=77 \ \ \ Eqn\ 2[/tex]
Adding Eqn 1 and 2
[tex](s+w)+(s-w)=133+77\\s+w+s-w=210\\2s=210[/tex]
Dividing both sides by 2
[tex]\frac{2s}{2}=\frac{210}{2}\\s=105[/tex]
Putting s=105 in Eqn 1
[tex]105+w=133\\w=133-105\\w=28[/tex]
The speed of plane is 105 miles per hour and speed of wind is 28 miles per hour.
