Final answer:
The acceleration of the mass is found to be 0.8 m/s^2 after calculating the net force on the mass using torque, the rotational inertia of the disk, and the gravitational force.
Step-by-step explanation:
To find the acceleration of the hanging mass, we first need to use the torque to find the angular acceleration of the disk, since torque (τ) is equal to the product of the rotational inertia (I) and the angular acceleration (α), τ = Iα. The torque given is 9.0 N·m, and the rotational inertia is 0.12 kg·m2.
To find α, we rearrange the equation to α = τ / I, which gives us:
α = 9.0 N·m / 0.12 kg·m2 = 75 rad/s2
Using the relationship between angular acceleration and linear acceleration (a = αr, where r is the radius), and knowing the radius (r = 0.08 m) we can calculate:
a = αr = 75 rad/s2 × 0.08 m = 6 m/s2
Since the only force acting on the mass besides the torque is gravity, we must calculate its effect. The force due to gravity (Fg) is:
Fg = m·g = 10 kg × 9.8 m/s2 = 98 N
The net force (Fnet) on the mass is the difference between the upward torque-induced force and gravity:
Fnet = Iα/r - Fg = (0.12 kg·m2 × 75 rad/s2) / 0.08 m - 98 N = 90 N - 98 N = -8 N
Finally, the linear acceleration (a) is:
a = Fnet/m = -8 N / 10 kg = -0.8 m/s2
Since the negative sign indicates the direction opposite to the positive torque, the actual acceleration of the mass is:
a = 0.8 m/s2