Question 15.5: Determine the rotation, i.e. the slope, of the beam ABC show...

The actual rotation of the beam at A produced by the actual concentrated load, W, is \theta_{\mathrm{A}}. Let us suppose that a virtual unit moment is applied at A before the actual rotation takes place, as shown in Fig. 15.11(b). The virtual unit moment induces virtual support reactions of R_{\mathrm{V}, \mathrm{A}}(=1 / L) acting downwards and R_{\mathrm{V}, \mathrm{C}}(=1 / L) acting upwards. The actual internal bending moments are

\begin{aligned}& M_{\mathrm{A}}=+\frac{W}{2} x \quad 0 \leq x \leq L / 2 \\& M_{\mathrm{A}}=+\frac{W}{2}(L-x) \quad L / 2 \leq x \leq L\end{aligned}

The internal virtual bending moment is

M_{\mathrm{v}}=1-\frac{1}{L} x \quad 0 \leq x \leq L

The external virtual work done is 1 \theta_{\mathrm{A}} (the virtual support reactions do no work as there is no vertical displacement of the beam at the supports) and the internal virtual work done is given by Eq. (15.21).

W_{\mathrm{i},M}=\sum\int_{L}{\frac{M_{\mathrm{A}}M_{\mathrm{v}}}{E I}}\,\mathrm{d}x     (15.21)

Hence

Simplifying Eq. (i) we have

\theta_{\mathrm{A}}=\frac{W}{2 E I L}\left[\int_{0}^{L / 2}\left(L x-x^{2}\right) \mathrm{d} x+\int_{L / 2}^{L}(L-x)^{2} \mathrm{~d} x\right]      (ii)

Hence

\theta_{\mathrm{A}}=\frac{W}{2 E I L}\left\{\left[L \frac{x^{2}}{2}-\frac{x^{3}}{3}\right]_{0}^{L / 2}-\frac{1}{3}\left[(L-x)^{3}\right]_{L / 2}^{L}\right\}

from which

\theta_{\mathrm{A}}=\frac{W L^{2}}{16 E I}

which is the result that may be obtained from Eq. (iii)

E I{\frac{\mathrm{d}v}{\mathrm{d}x}}={\frac{W}{16}}(4x^{2}-L^{2})       (iii)

of Ex. 13.5.