Rod hinged to wall with elastic string or spring support

2 \includegraphics[max width=\textwidth, alt={}, center]{fcf239a6-6558-43ec-b404-70aa349af6a9-2_319_874_968_639} A uniform rod \(A B\), of length 2 m and mass 10 kg , is freely hinged to a fixed point at the end \(B\). A light elastic string, of modulus of elasticity 200 N , has one end attached to the end \(A\) of the rod and the other end attached to a fixed point \(O\), which is in the same vertical plane as the rod. The rod is horizontal and in equilibrium, with \(O A = 3 \mathrm {~m}\) and angle \(O A B = 150 ^ { \circ }\) (see diagram). Find

1. the tension in the string,
2. the natural length of the string.

4 \includegraphics[max width=\textwidth, alt={}, center]{baea9836-ea05-442f-9e87-a2a1480dc74c-2_338_957_1482_593} A uniform rod \(B C\) of length \(2 a\) and weight \(W\) is hinged to a fixed point at \(B\). A particle of weight \(3 W\) is attached to the rod at \(C\). The system is held in equilibrium by a light elastic string of natural length \(\frac { 3 } { 5 } a\) in the same vertical plane as the rod. One end of the elastic string is attached to the rod at \(C\) and the other end is attached to a fixed point \(A\) which is at the same horizontal level as \(B\). The rod and the string each make an angle of \(30 ^ { \circ }\) with the horizontal (see diagram). Find

1. the modulus of elasticity of the string,
2. the magnitude and direction of the force acting on the rod at \(B\).

4 \includegraphics[max width=\textwidth, alt={}, center]{eb3dccaf-d151-472d-82f3-6ba215b0b7f0-2_339_957_1482_593} A uniform rod \(B C\) of length \(2 a\) and weight \(W\) is hinged to a fixed point at \(B\). A particle of weight \(3 W\) is attached to the rod at \(C\). The system is held in equilibrium by a light elastic string of natural length \(\frac { 3 } { 5 } a\) in the same vertical plane as the rod. One end of the elastic string is attached to the rod at \(C\) and the other end is attached to a fixed point \(A\) which is at the same horizontal level as \(B\). The rod and the string each make an angle of \(30 ^ { \circ }\) with the horizontal (see diagram). Find

1. the modulus of elasticity of the string,
2. the magnitude and direction of the force acting on the rod at \(B\).

The end \(A\) of a uniform rod \(A B\), of length \(2 a\) and weight \(W\), is freely hinged to a vertical wall. The end \(B\) of the rod is attached to a light elastic string of natural length \(\frac { 3 } { 2 } a\) and modulus of elasticity \(3 W\). The other end of the string is attached to the point \(C\) on the wall, where \(C\) is vertically above \(A\) and \(A C = 2 a\). A particle of weight \(2 W\) is attached to the rod at the point \(D\), where \(D B = \frac { 1 } { 2 } a\). The angle \(A B C\) is equal to \(\theta\) (see diagram). Show that \(\cos \theta = \frac { 3 } { 4 }\) and find the tension in the string in terms of \(W\). Find the magnitude of the reaction force at the hinge.

4 \includegraphics[max width=\textwidth, alt={}, center]{2c6b6722-ebba-4ade-9a9d-dd70e61cf52b-3_513_643_260_749} A uniform rod \(A B\), of length \(l\) and mass \(m\), rests in equilibrium with its lower end \(A\) on a rough horizontal floor and the end \(B\) against a smooth vertical wall. The rod is inclined to the horizontal at an angle \(\alpha\), where \(\tan \alpha = \frac { 3 } { 4 }\), and is in a vertical plane perpendicular to the wall. The rod is supported by a light spring \(C D\) which is in compression in a vertical line with its lower end \(D\) fixed on the floor. The upper end \(C\) is attached to the rod at a distance \(\frac { 1 } { 4 } l\) from \(B\) (see diagram). The coefficient of friction at \(A\) between the rod and the floor is \(\frac { 1 } { 3 }\) and the system is in limiting equilibrium.

1. Show that the normal reaction of the floor at \(A\) has magnitude \(\frac { 1 } { 2 } m g\) and find the force in the spring.
2. Given that the modulus of elasticity of the spring is \(2 m g\), find the natural length of the spring.

4 \includegraphics[max width=\textwidth, alt={}, center]{5d40f5b4-e3d4-482c-8d8d-05a01bd3b43f-3_513_643_260_749} A uniform rod \(A B\), of length \(l\) and mass \(m\), rests in equilibrium with its lower end \(A\) on a rough horizontal floor and the end \(B\) against a smooth vertical wall. The rod is inclined to the horizontal at an angle \(\alpha\), where \(\tan \alpha = \frac { 3 } { 4 }\), and is in a vertical plane perpendicular to the wall. The rod is supported by a light spring \(C D\) which is in compression in a vertical line with its lower end \(D\) fixed on the floor. The upper end \(C\) is attached to the rod at a distance \(\frac { 1 } { 4 } l\) from \(B\) (see diagram). The coefficient of friction at \(A\) between the rod and the floor is \(\frac { 1 } { 3 }\) and the system is in limiting equilibrium.

1. Show that the normal reaction of the floor at \(A\) has magnitude \(\frac { 1 } { 2 } m g\) and find the force in the spring.
2. Given that the modulus of elasticity of the spring is \(2 m g\), find the natural length of the spring.

A uniform rod \(AB\) of length \(4a\) and weight \(W\) is smoothly hinged to a vertical wall at the end \(A\). The rod is held at an angle \(\theta\) above the horizontal by a light elastic string. One end of the string is attached to the point \(C\) on the rod, where \(AC = 3a\). The other end of the string is attached to a point \(D\) on the wall, with \(D\) vertically above \(A\) and such that angle \(ACD = 2\theta\). A particle of weight \(\frac{1}{4}W\) is attached to the rod at \(B\). It is given that \(\tan \theta = \frac{5}{12}\).

1. Show that the tension in the string is \(\frac{17}{12}W\). [4]
2. Find the magnitude and direction of the reaction at the hinge. [5]
3. Given that the natural length of the string is \(2a\), find its modulus of elasticity. [2]