Answer:
2.5 s
Explanation:
We use the equation of motion for rotational motion:
[tex]\theta = \omega_it + \frac{1}{2}\alpha t^2[/tex]
where
- [tex]\theta[/tex] is angular displacement,
- [tex]\omega_i[/tex] is initial angular velocity
- [tex]\alpha[/tex] is the angular acceleration
- [tex]t[/tex] is the time
Substituting values,
[tex]220 = \omega_i(9.0 \text{s}) + \frac{1}{2}(3.5\ \text{rad/s}^2) (9.0\ \text{s})^2[/tex]
[tex]\omega_i = 8.69\ \text{rad/s}[/tex]
Before the 9.0 s interval, this value is the final angular velocity. The initial angular velocity is 0 rad/s since it started from rest.
We use the equation:
[tex]\omega_f = \omega_i+\alpha t[/tex]
Note that [tex]\omega_f[/tex] is the value we got earlier and [tex]\omega_i[/tex] is the initial angular velocity and is equal to 0 rad/s.
[tex]8.694 \ \text{rad/s}= (0\ \text{rad/s})+(3.5\ \text{rad/s}^2)(t)[/tex]
[tex]t = 2.5\ \text{s}[/tex]
