Question 17.26: Determine reaction of the hinge ‘A’ by using the principle o...

The load of UVL (Uniform Varying Load) will be,

=\frac{1}{2} \times 6 \times 90

= 270 kN

This will act at point ‘L’. Thus AL = =\frac{1}{3} \times 6 = 2  m
Using the principle of virtual work,

R _{ A } \cdot(+\delta y)_{ A }+270 \cdot(-\delta y)_{ L }+0 \cdot(\delta y)_{ B }+600(-\delta y)_{ C }+100 \cdot \delta \theta=0

R _{ A } \cdot(\delta y)_{ A }-270 \cdot(\delta y)_{ L }-600(\delta y)_{ C }+100 \cdot \delta \theta=0                                                                             ….. (1)

From the right–angled triangles,

\delta \theta=\frac{(\delta y)_{A}}{10}=\frac{(\delta y)_{L}}{8}=\frac{(\delta y)_{C}}{2}

(\delta y)_{A}=10 . \delta \theta,(\delta y)_{L}=8 . \delta \theta,(\delta y)_{C}=2 . \delta \theta

Substituting the values in equation (1),

R _{ A }(10 . \delta \theta)-270(8 . \delta \theta)-600(2 . \delta \theta)+100 . \delta \theta=0

R _{ A }=326  kN