Answer:
Step-by-step explanation:
Given that,
Mass of bullet
m = 0.0144kg
Mass of wooden block
M = 3.03kg
Spring constant
k = 800 N/m
Let the initial velocity of the bullet be u'.
The initial velocity of the block is zero since the block is not moving
u = 0
Amplitude is 0.208m
x = 0.208m
inelastic collision occurs between the bullet and the block, this shows that after collision both the bullet and the block moves together with common velocity, let the common velocity be V
Using conservation of momentum
Initial momentum = final momentum
mu' = (m + M) V
u' = (m+M)V / m
Using conservation of energy
Energy from the spring is transfers to K.E in the block
Ux = K.E
½kx² = ½(m+M)V²
½ × 800 × 0.208² = ½(0.0144 + 3.03) V²
17.3056 = 1.5222V²
V² = 17.3056 / 1.5222
V² = 11.37
V = √11.37
V = 3.37 m/s
Final speed of the bullet and the block is 3.37 m/s
Then,
u' = (m+M)V / m
u' = (0.0144 + 3.03) × 3.37 / 0.0144
u' = 3.0444 × 3.37 / 0.0144
u' = 712.47 m/s
u' ≈ 712.5 m/s
The initial speed of the bullet is 712.5 m/s.