Solve for the reaction forces at A and B. 3 ft -2 ft 900 lb/ft 400...
680 lb/ft Problem 5.3: Determine the reaction forces at B and C. 900 lb/ft 900 16/€ - BA 3 ft 6 ft- 2 ft
1. Determine the forces on member ABCD, Answers 3 ft 400 lb 3 ft roller 4 ft
Detenuine the intemal forces and 60 lb/ft at A for the loodings (a) and (b) 5 ft 3 0 4 m The left support is a pin and the right support is a roller Detenuine the intemal forces and 60 lb/ft at A for the loodings (a) and (b) 5 ft 3 0 4 m The left support is a pin and the right support is a roller
The spring has a stiffness k 50 lb/ft and an unstretchedlength of 2 ft Asshown. lt is confined by the plate and wall using cables so that its length is 1.5 ft A 4 4-lb block is given a speed "A when it is at A, and it slides down the incline having a coefficient of kinetic iction 0 2 It strikas the plate and pushes it forward 025 ft before stopping Neglect the mass of the plate and spring...
Find the forces on each member P, = 500 lb 8 ft 2 ft 2 ft B
Problem 2: Determine thelacceleration of 150-lb cabinet and the reaction forces at A and B if P 35 lb. The cabinet does not tip. The coefficient of kinetic friction between the cabinet and the plane is u0.15. The cabinet's center of gravity is located at G. [33 points] K D 4 ft 35 ft
2 ft 3 ft 200 lb Using a force meter, the following forces were measured for the truss above, subject of 2 external forces: o in 2 supports: 160lb, 2001b, 160lb o in 3 members: 1201b (T), 1791b (T), 2001b (C) Assign these force values to each support and member so that the structure is in equilibrium.
How to solve for reaction forces 5. Find the reaction forces at Point A and B. 500 lb 10' 10'
for F = 500 lb and G = 150 lb Solve for the force in each member, indicate whether the member is in tension or compression, and solve for the reaction forces. ЈУ F 17 ft х 10 ft Z 12 ft
E is constant, find the reaction forces and moments Using the Moment Distribution Method (modified stiffness approach) 240 lb/ft 300 in4 600 in4 20 ft 15 ft E is constant, find the reaction forces and moments Using the Moment Distribution Method (modified stiffness approach) 240 lb/ft 300 in4 600 in4 20 ft 15 ft