First of all, we need to convert the final angular velocity from rpm (revolutions per minute) to rad/s. Keeping in mind that
[tex]1 rev = 2\pi rad[/tex]
[tex]1 min = 60 s[/tex]
We have
[tex]\omega _f = 1500 \frac{rev}{min} \cdot \frac{2 \pi rad/rev}{60 s/m}=0.157 rad/s [/tex]
the angular acceleration is given by
[tex]\alpha = \frac{\omega _f - \omega _i}{\Delta t} [/tex]
where [tex]\omega _i[/tex] is the initial velocity (in this case, zero), and [tex]\Delta t[/tex] is the time needed to accelerate the drill to its final velocity. Using [tex]\alpha = 64.3 rad/s^2[/tex], we can calculate [tex]\Delta t[/tex]:
[tex]\Delta t = \frac{\omega _f}{\alpha}= \frac{0.157 rad/s}{64.3 rad/s^2}=2.44 s [/tex]
