Answer:
40 rad/s
Explanation:
The moment of inertia around the disk pulley is
[tex]I = MR^2/2 = 25*0.2^2/2 = 0.5 kgm^2[/tex]
A force of 50N around the pulley of radius 0.2m would generate a torque of T = 50*0.2 = 10 Nm. According to Newton's 2nd law this torque would make an angular acceleration of:
[tex]\alpha = T/I = 10 / 0.5 = 20 rad/s^2[/tex]
The angular speed after ∆ t=2 when it starts from rest at that constant angular acceleration is
[tex]\omega = 0 + \alpha \Delta t = 0 + 20*2 = 40 rad/s[/tex]
