Answer:
v = 0.33 m/s
Explanation:
The final velocity of the skier and boat can be calculated by conservation of the lineal momentum:
[tex] m_{1}v_{1i} + m_{2}v_{2i} = m_{1}v_{1f} + m_{2}v_{2f} [/tex]
Where:
m1: is the mass of the water skier = 62.0 kg
m2: is the mass of the boat = 775 kg
v1i: is the initial velocity of the water skier = 4.50 m/s
v1f: is the final velocity of the water skier = ?
v2i: is the initial velocity of the boat = 0
v2f: is the final velocity of the boat = ?
Since the final velocity of the skier is the same that the final velocity of the boat, we have:
[tex] m_{1}v_{1i} + m_{2}v_{2i} = m_{1}v_{f} + m_{2}v_{f} [/tex]
[tex] m_{1}v_{1i} + 0 = v_{f}(m_{1} + m_{2}) [/tex]
[tex] v_{f} = \frac{62.0 kg*4.50 m/s}{(62.0 kg + 775 kg)} [/tex]
[tex] v_{f} = 0.33 m/s [/tex]
Therefore, the final velocity of the skier and boat is 0.33 m/s.
I hope it helps you!
