Question 17.29: Using the principle of virtual work, determine reaction of r...

The weight and their position of C.G. are shown in Fig. 17.32 (a).
Using principle of virtual work,

R_{B}(+\delta y)_{B}+\left[\left(\frac{1}{2} \times 6 \times 20\right)(-\delta y)_{M}\right]+\left[\left(\frac{1}{2} \times 3 \times 20\right)(-\delta y)_{L}\right] +\left[(15 \times 2)(+\delta y)_{N}\right]-80 . \delta \theta+50 . \delta \theta=0

R_{B} \cdot(\delta y)_{B}-60 \cdot(\delta y)_{M}-30 \cdot(\delta y)_{L}+30 \cdot(\delta y)_{N}-30 \cdot \delta \theta=0

From right angle triangles,

\delta \theta=\frac{(\delta y)_{B}}{9}=\frac{(\delta y)_{M}}{5}=\frac{(\delta y)_{L}}{2}=\frac{(\delta y)_{N}}{1}

(\delta y)_{B}=9 . \delta \theta,(\delta y)_{M}=5 . \delta \theta,(\delta y)_{L}=2 . \delta \theta,(\delta y)_{N}=\delta \theta

R_{B}(9 . \delta \theta)-60(5 . \delta \theta)-30(2 . \delta \theta)+30(\delta \theta)-30 . \delta \theta=0

R_{B}=40  kN