Answer:
The speed of the train decreases to [tex]v_{f}=1.828m/s[/tex] after the loading is completed.
Explanation:
Since the linear momentum of the train is conserved in the direction of motion we can write
[tex]\overrightarrow{p_{i}}=\overrightarrow{p_{f}}\\\\m_{1}v_{1}=m_{2}v_{2}[/tex]
When gravel falls at a rate of [tex]419kg/s[/tex] for a duration of [tex]2.89[/tex] seconds the mass of gravel added becomes [tex]2.89\times 419=1210.9kg[/tex]
Applying the calculated values in the initial equation we have
[tex]2.93m/s\times 2010kg=(2010+1210.9)kg\times v_{f}\\\\\therefore v_{f}=\frac{5889.3}{3220.9}=1.828m/s[/tex]
