Answer:
47 m/s
Explanation:
golf club mass, mc = 180 g
golf ball mass, mb = 46 g
initial golf club speed, vc1 = 47 m/s
final golf club speed, vc2 = 35 m/s
initial golf ball speed, vb1 = 0 m/s
final golf ball speed, vb2 = ? m/s
The total momentum is conserved, then:
mc*vc1 + mb*vb1 = mc*vc2 + mb*vb2
Replacing with data and solving (dimension are omitted):
180*47 + 46*0 = 180*35 + 46*vb2
vb2 = (180*47 - 180*35)/46
vb2 = 47 m/s
Answer:
47.17 m/s
Explanation:
From the law of conservation of momentum,
Total momentum before collision = Total momentum after collision.
mu+m'u' = mv+m'v'......................... Equation 1
Where m = mass of the golf club, m' = mass of the gulf ball, u = initial velocity of the gulf club, u' = initial velocity of the gulf ball, v = final velocity of the gulf club, v' = final velocity of the gulf ball.
Note: The gulf ball was at rest before impact.
Therefore,
mu = mv+m'v'
Make v' the subject of the equation
v' = (mu-mv)/m'....................... Equation 2
Given: m = 180 g = 0.180 kg, m' = 46 g = 0.046 kg, u = 47 m/s, v = 35 m/s
Substitute into equation 2
v' = [(0.18×47)-(0.18×35)]/0.046
v' = (8.47-6.3)/0.046
v' = 2.17/0.046
v' = 47.17 m/s
Hence the speed of the gulf ball just after impact = 47.17 m/s
