A uniform disk of mass m = 1.4 kg and radius R = 25 cm can rotate about an axle through its center. Four forces are acting on it as shown in the figure. Their magnitudes are F₁ = 3.5 N, F₂ = 3.5 N, F₃ = 7.5 N and F₄ = 3.5 N. F₂ and F₄ act a distance d = 2.5 cm from the center of mass. These forces are all in the plane of the disk.

m = 1.4 kg
R = 25 cm
F₁ = 3.5 N
F₂ = 3.5 N
F₃ = 7.5 N
F₄ = 3.5 N
d = 2.5 cm

Write an expression for the magnitude τ₁ of the torque due to force F₁. 

Calculate the magnitude τ₁ of the torque due to force F₁, in N⋅m. 
    Write an expression for the magnitude τ₂ of the torque due to force F₂. 
   Calculate the magnitude τ₂ of the torque due to force F₂, in N⋅m. 
  Write an expression for the magnitude τ₃ of the torque due to force F₃. 
    Write an expression for the magnitude τ₄ of the torque due to force F₄. 
    Calculate the magnitude τ₄ of the torque due to force F₄, in N⋅m. 
    Calculate the angular acceleration α of the disk about its center of mass in rad/s². Let the counter-clockwise direction be positive. 

Transcribed Image Text:

F3 45° 53° F₁ F₁ Otheex