The equivalent of Newton's second law for rotational objects is given by:
[tex]\tau = I \alpha[/tex]
where
[tex]\tau[/tex] is the net torque acting on the object
[tex]I[/tex] is its moment of inertia
[tex]\alpha[/tex] is its angular acceleration
For a hoop rotating around its perpendicular axis, the moment of inertia is
[tex]I=mr^2[/tex]
where m is the mass and r the radius. By using the data of the wheel, m=0.750 kg and r=33.0 cm=0.33 m, we find
[tex]I=mr^2 = (0.750 kg)(0.33 m)^2=0.082 kg m^2[/tex]
and since the torque is [tex]\tau=0.850 Nm[/tex], the angular acceleration of the wheel is
[tex]\alpha= \frac{\tau}{I}= \frac{0.850 Nm}{0.082 km m^2}=10.37 rad/s^2 [/tex]
