Chapter 12 : Support Reactions 239
and reaction at Q RQ=+ =(2)^22 (1.73) 2.64 kN
Let θ = Angle, which the reaction RQ makes with the vertical.∴
2
tan 1.160
1.73θ= = or θ = 49.1° Ans.Example 12.17. A truss hinged at A, and supported on rollers inclined at 45° with the horizontal
at D, is loaded as shown in Fig. 12.33.
Fig. 12.33.
Find the reaction at A and D.
Solution. Since the truss is supported on rollers at D, therefore the reaction at this support
will be normal to the support i.e. inclined at 45° with the vertical (because the support is inclined at an
angle of 45° with the horizontal) as shown in Fig. 12.34. The reaction at A will be the resultant of
vertical and horizontal forces.
Let RA= Reaction at A, and
RD= Reaction at D.
∴ Horizontal component of reaction at D,
RDH=RDV = RD cos 45° = 0.707 RD
Now taking moments about A and equating the same,
RDV × 9 – RDH × 4 = (5 × 3) + (2 × 6)
(0.707 RD × 9) – (0.707 RD × 4) = 27or27
7.64 kN
D 3.535
R == Ans.∴ RDH=RDV = 7.64 × 0.707 = 5.4 kN
Now vertical component of reaction at A,
RAV= (5 + 2) – 5.4 = 1.6 kNand horizontal component of reaction at A
RAH=RDH = 5.4 kN∴ RA=+=(1.6)^22 (5.4) 5.63 kN Ans.Fig. 12.34.