One end of a uniform rigid rod $OA$ of length $L$ and mass $m$ is attached to a frictionless hinge at $O$. The other end of the rod is connected to the roof at $B$ with a massless inextensible thread $AB$. Initially the rod is horizontal and at rest. The gravity is acting vertically downward as shown. Immediately after the thread $AB$ is cut, the reaction on the rod at $O$ is:
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When a rod begins to rotate after a support is removed, find torque about the hinge, compute angular acceleration, then use COM acceleration to determine hinge reactions.
Right after the thread is cut, only gravity acts on the rod. The rod begins to rotate about hinge $O$. The weight $mg$ acts downward at the center of mass, which is at a distance $\tfrac{L}{2}$ from $O$.
The torque about $O$ immediately after cutting the thread is:
\[
\tau = mg \cdot \frac{L}{2}
\]
The moment of inertia of a uniform rod about one end is:
\[
I = \frac{1}{3} m L^2
\]
Thus, the angular acceleration is:
\[
\alpha = \frac{\tau}{I}
= \frac{mg(L/2)}{(1/3)mL^2}
= \frac{3g}{2L}
\]
Now consider the acceleration of the center of mass. The linear acceleration of the COM is purely vertical at this instant and equals:
\[
a_{\text{COM}} = \alpha \cdot \frac{L}{2}
= \frac{3g}{2L} \cdot \frac{L}{2}
= \frac{3g}{4}
\]
Apply Newton’s second law in the vertical direction to the rod:
\[
R_y - mg = m(-a_{\text{COM}})
\]
Since the COM accelerates downward, $-a_{\text{COM}} = -\tfrac{3g}{4}$:
\[
R_y - mg = -m\left(\frac{3g}{4}\right)
\]
Solving for $R_y$ gives:
\[
R_y = mg - \frac{3mg}{4}
= \frac{mg}{4}
\]
This is a positive value, meaning the reaction is upward (positive $y$-direction).
Thus, the reaction at hinge $O$ immediately after cutting the thread is:
\[
\frac{mg}{4} \text{ upward.}
\]
