Answer:
540.8m/s
Step-by-step explanation:
From the information giving, the total energy is conserved and the momentum is conserved.
To determine the speed of the ball after the collision, we use the energy conservation rule, I.e
Kinetic Energy of ball after collision = energy to rise to attain height
1/2mv²=mgh
where m,mass of ballistic pendulum=1.5kg,
v=velocity of ballistic pendulum after collision,
g=gravitational acceleration
h=height attain=11cm=0.11m
if we substitute we arrive at
v=√(2gh)
v=√(2*9.8*0.11)
v=1.47m/s.
since we have determine the velocity of the ballistic pendulum after collision, we now use conservation of momentum to determine the initial speed of the bullet.
since
initial momentum=final momentum
mₓ₁vₓ₁+mₐ₁vₐ₁=mₓ₂vₓ₂+mₐ₂vₐ₂
were mₓ₁vₓ₁,mₓ₂vₓ₂ =mass and velocity of ballistic pendulum before and after collision
mₐ₁vₐ₁,mₐ₂vₐ₂=mass and velocity of bullet before and after collision
if we substitute values,we arrive at
(1.5kg*0m/s)+(0.0057kg*vₐ₁)=(1.5kg*1.47m/s)+(0.0057kg*154m/s)
vₐ₁= 3.0828/0.0057
vₐ₁=540.8m/s