Answer:
velocity of truck = 7.32 m/s
velocity of truck = 23.32 m/s
Explanation:
mass of truck, M = 1810 kg
initial velocity of truck, U = 16 m/s
mass of car, m = 673 kg
initial velocity of car, u = 0 m/s
Let the final speed of the car is v and the final speed of truck is V.
Use conservation of momentum
Momentum before collision = Momentum after collision
M x U + m x 0 = M x V + m x v
1810 x 16 + 0 = 1810 V + 673 v
28960 = 1810 V + 673 v .... (1)
As the collision is elastic, so the coefficient of restitution is 1.
By using the formula
[tex]e=\frac{v_{1}-v_{2}}{u_{2}-u_{1}}[/tex]
where, u1 be the initial velocity of truck, u2 be the initial velocity of the car, v1 be the final velocity of truck and v2 be the final velocity of car.
[tex]1=\frac{V - v}}{0-U}[/tex]
V - v = - U
V - v = - 16
v - V = 16
v = 16 + V
Substitute in equation (1), we get
28960 = 1810 V + 673 (16 + V)
28960 = 1810 V + 10768 + 673 V
18192 = 2483 V
V = 7.32 m/s
v = 16 + 7.32 = 23.32 m/s
Thus, the velocity of truck after collision is 7.32 m/s and the velocity of car after collision is 23.32 m/s.
