PSEYE
Aug26-08, 03:56 PM
1. The problem statement, all variables and given/known data
A nonuniform horizontal bar of mass m is supported by two massless wires against gravity. The left wire makes an angle (phi) with the horizontal, and the right wire makes an angle . The bar has length L.
What is the position of the center of mass of the bar, measured as distance from the bar's left end?
x=?
2. Relevant equations
-F₁ · sin(φ₁) + F₂ · sin(φ₂) = 0
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F₁x = -F₁ · sin(φ₁)
F₁y = F₁ · cos(φ₁)
F₂x = F₂ · sin(φ₂)
F₂y = F₂ · cos(φ₂)
forces in terms of magnitude and angle
x = L / ( (F₁/F₂)·(cos(φ₁)/cos(φ₂)) + 1)
3. The attempt at a solution
x = L / ( (tan(φ₂)/tan(φ₁) + 1)
this seems right, but I'm repeatedly getting it wrong no matter how I input the answer.
A nonuniform horizontal bar of mass m is supported by two massless wires against gravity. The left wire makes an angle (phi) with the horizontal, and the right wire makes an angle . The bar has length L.
What is the position of the center of mass of the bar, measured as distance from the bar's left end?
x=?
2. Relevant equations
-F₁ · sin(φ₁) + F₂ · sin(φ₂) = 0
___________________________________
F₁x = -F₁ · sin(φ₁)
F₁y = F₁ · cos(φ₁)
F₂x = F₂ · sin(φ₂)
F₂y = F₂ · cos(φ₂)
forces in terms of magnitude and angle
x = L / ( (F₁/F₂)·(cos(φ₁)/cos(φ₂)) + 1)
3. The attempt at a solution
x = L / ( (tan(φ₂)/tan(φ₁) + 1)
this seems right, but I'm repeatedly getting it wrong no matter how I input the answer.