The average speed of the train for the trip is equal to [tex]66.67\frac{km}{h}[/tex]
Why?
To calculate the average speed, we need to divide the trip into three moments:
- First moment, the train traveled 120 km at a speed of 60 km/h.
- Second moment, the train stopped for 0.5 hours, meaning that the train did not travel for that time (traveled distance equal to 0 km).
- Third moment, the train traveled 180 km at a speed of 90 km/h.
We can use the following formula to calculate the average speed:
[tex]AverageSpeed=\frac{TotalDistance}{TotalTime}[/tex]
So, for our problem we have:
[tex]AverageSpeed=\frac{distance_{1}+distance_{2}+distance{3}}{time_{1}+time_{2}+time_{3}}[/tex]
From the statement, we know that:
[tex]distance_{1}=120km\\speed_{1}=60\frac{km}{h}\\\\distance_{2}=0km\\time_{2}=0.5hours\\\\distance_{3}=180km\\speed_{1}=90\frac{km}{h}\\[/tex]
Calculating the times, we have:
[tex]speed=\frac{distance}{time}\\\\time=\frac{distance}{speed}[/tex]
[tex]time_{1}=\frac{distance_{1}}{speed_{1}}=\frac{120km}{60\frac{km}{h}}=2hours[/tex]
[tex]time_{3}=\frac{distance_{3}}{speed_{3}}=\frac{180km}{90\frac{km}{h}}=2hours[/tex]
Then, substituting the times into the main equation, we have:
[tex]AverageSpeed=\frac{120km+0km+180km}{2hours+0.5hours+2hours}=\frac{300km}{4.5hours}=66.67\frac{km}{h}[/tex]
Hence, we have that the average speed of the train for the trip is equal to [tex]66.67\frac{km}{h}[/tex]
Have a nice day!
