Problem 3.13. Timoshenko beam with different end supports

A beam with solid circular cross section subjected to a linearly distributed load is given in the Figure. One end of the beam is hinged the other end is built-in. Write the differential equation system and the boundary conditions parametrically. Take the shear deformation
into account. (The equation system does not need to be solved.)

Solve Problem

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$[\begin{matrix} - G \frac{9 D π^2}{40} \frac{d^{2}}{d x^{2}} & - G \frac{9 D π^2}{40} \frac{d}{d x} \\ - G \frac{9 D π^2}{40} \frac{d}{d x} & G \frac{9 D π^2}{40} - E \frac{D^{4} π}{4} \frac{d^{2}}{d x^{2}} \end{matrix}] \{\begin{matrix} v \\ χ_{y} \end{matrix}\} = \{\begin{matrix} \frac{p x}{L} \\ 0 \end{matrix}\}$

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$v (0) = 0, \frac{d χ_{y} (0)}{d x} = 0 v (L) = 0, χ_{y} (L) = 0$

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Steps

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Step 1. Give the elements of the load vector (force and moment functions along the beam’s length).

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$\{\begin{matrix} p_{y} \\ m \end{matrix}\} = \{\begin{matrix} \frac{p x}{L} \\ 0 \end{matrix}\}$

Step 2. Determine the bending and shear stiffnesses of the solid circular cross section.

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Shear stiffness is given by Eqs.(3-59) and (3-60)

Shear correction factor is given in Figure 3.28.

E I_{z} = E \frac{D^{4} π}{4} S = \frac{G A}{n} = G \frac{D^{2} π}{4} \frac{9}{10}

Step 3. Write the differential equation system of the Timosenko beam.

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Eq.(3-61)

[\begin{matrix} - S \frac{d^{2}}{d x^{2}} & S \frac{d}{d x} \\ - S & S - E I \frac{d^{2}}{d x^{2}} \end{matrix}] \{\begin{matrix} v \\ χ_{y} \end{matrix}\} = \{\begin{matrix} p_{y} \\ m \end{matrix}\} [\begin{matrix} - G \frac{9 D π^2}{40} \frac{d^{2}}{d x^{2}} & G \frac{9 D π^2}{40} \frac{d}{d x} \\ - G \frac{9 D π^2}{40} \frac{d}{d x} & G \frac{9 D π^2}{40} - E \frac{D^{4} π}{4} \frac{d^{2}}{d x^{2}} \end{matrix}] \{\begin{matrix} v \\ χ_{y} \end{matrix}\} = \{\begin{matrix} \frac{p x}{L} \\ 0 \end{matrix}\}

Step 4. Show the boundary conditions for built-in and hinged edges.

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At the hinged end of the beam:

$v (0) = 0, M (0) = 0 \to M = E I κ_{z} = - E I \frac{d χ_{y}}{d x} \to \frac{d χ_{y} (0)}{d x} = 0$

At the built-in end of the beam:

$v (L) = 0, χ_{y} (L) = 0$

Step 5. Differential equation system with the given boundary conditions can be solved. Solution is not presented here.

Results

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First the load vector is given. Its elements are the force and moment functions along the beam’s length. Here no moment load acts, the linearly distributed load results in the following load vector:

$\{\begin{matrix} p_{y} \\ m \end{matrix}\} = \{\begin{matrix} \frac{p x}{L} \\ 0 \end{matrix}\}$

The bending and shear stiffnesses of the solid circular cross section are given below.