Answer:
The force that must be applied to the chain in order for the chain to have the given acceleration is approximately 694.2 N
Step-by-step explanation:
The given restive force,
= 130 N
The mass of the wheel, m = 1.70 kg
The diameter of the wheel, D = 50.0 cm
∴ The radius of the wheel, R = 50.0 cm/2 = 25.0 cm = 0.25 m
The diameter of the sprocket over which the chain passes, d = 8.75 cm
The radius of the sprocket over which the chain passes, r = 8.75 cm/2 = 4.375 cm = 0.04375 m
The angular acceleration, α = 3.50 rad/s²
Torque, τ = I·α
Where;
I = The moment of inertia = m·R²·α
The net torque = The applied torque - The friction torque
Therefore, we get;
I × α = m × R² × α = F × r -
× R
1.70 kg × (0.25 m)² × 3.50 rad/s² = F × 0.04375 m - 120 N × 0.25 m
F = (1.70 kg × (0.25 m)² × 3.50 rad/s² + 120 N × 0.25 m)/(0.04375 m) = 694.214286 N
The force that must be applied to the chain in order for the chain to have the given acceleration, F ≈ 694.2 N