Answer:
A) What is the moment of inertia of the bowling ball?
The moment of inertia of a bowling ball is 2/5mr
2
, where m is the mass of the ball and r is the radius. In this case, m=6 kg and r=10.8 cm=0.108 m. Therefore, the moment of inertia of the bowling ball is:
I=
5
2
(6 kg)(0.108 m)
2
=0.023328 kg m
2
B) What is the translational kinetic energy of the bowling ball?
The translational kinetic energy of a bowling ball is
2
1
mv
2
, where m is the mass of the ball and v is the velocity. In this case, m=6 kg and v=8 m/s. Therefore, the translational kinetic energy of the bowling ball is:
KE
t
=
2
1
(6 kg)(8 m/s)
2
=192 J
C) What is the initial rotational kinetic energy of the bowling ball?
The initial rotational kinetic energy of a bowling ball is
2
1
Iω
2
, where I is the moment of inertia of the ball and ω is the angular velocity. In this case, I=0.023328 kg m
2
and ω=v/r=8 m/s/0.108 m=74.074 rad/s. Therefore, the initial rotational kinetic energy of the bowling ball is:
KE
r
=
2
1
(0.023328 kg m
2
)(74.074 rad/s)
2
=119.36 J
D) The bowling ball comes to the bottom of a ramp that is inclined 20 degrees with respect to the horizontal. What maximum height will the ball reach up this ramp?
The maximum height that the ball will reach up the ramp can be found using the following equation:
h=
2g
v
2
sin
2
(θ)
where v is the initial velocity of the ball, g is the acceleration due to gravity, and θ is the angle of the ramp. In this case, v=8 m/s, g=9.8 m/s
2
, and θ=20
∘
. Therefore, the maximum height that the ball will reach up the ramp is:
h=
2(9.8 m/s
2
)
(8 m/s)
2
sin
2
(20
∘
)=1.53 m
Step-by-step explanation: