Answer:
[tex]0.496 kg m^2[/tex]
Explanation:
The torque exerted is given by
[tex]\tau = Fd[/tex]
where
[tex]F=2.00 \cdot 10^3 N[/tex] is the force applied
d = 3.10 cm = 0.031 m is the length of the lever arm
Substituting,
[tex]\tau=(2.00\cdot 10^3 N)(0.031 m)=62 Nm[/tex]
The equivalent of Newton's second law for rotational motion is:
[tex]\tau = I \alpha[/tex]
where
[tex]\tau = 62 Nm[/tex] is the net torque
I is the moment of inertia
[tex]\alpha = 125 rad/s^2[/tex] is the angular acceleration
Solving the equation for I, we find
[tex]I=\frac{\tau}{\alpha}=\frac{62 Nm}{125 rad/s^2}=0.496 kg m^2[/tex]
