Determin members BC, BD, and ED of the truss and state if these members are in tension or compression using the method of joints and the method of sections.
Determin members BC, BD, and ED of the truss and state if these members are in tension or compression using the method of joints and the method of sections.
F1 = 871 lb F2 = 228 lb L=7ft h=5.25 ft 1 Use the method of joints to determine the forces in members BC BD. BE and CE) and state if the members are in tension or in compression 2 Use the method of sections to determine the forces in members (DF. EF and EG) and state if the members are in tension or in compression.
F1 = 695 lb F2 = 271 lb L = 3 ft 1 h = 2.25 ft .1 Use the method of joints to determine the forces in members (BC, BD, BE and CE) and state if the members are in tension or in compression. 2. Use the method of sections to determine the forces in members (DF, EF and EG) and state if the members are in tension or in compression.
F1 = 775 lb F2 = 499 lb L = 4 ft h = 3 ft 1- Use the method of joints to determine the forces in members (BC, BD, BE and CE) and state if the members are in tension or in compression. 2- Use the method of sections to determine the forces in members (DF, EF and EG) and state if the members are in tension or in compression.
For the roof truss shown, use method of sections to determine the forces in members BC and EF. State whether each is in compression or tension.
Using method of joints, determine the force in each member of the truss and state if the members are in tension or compression. Assume the truss have no weight.
A roof truss is loaded and supported as shown in Figure 2. The joints are all pinned. (a) Determine the support reactions at A and G. (25 marks) (b)Using "Method of joints" find the forces in members AB, AF, GF, CD and DE of the truss. State whether each of these members is in tension or compression. (75 marks) (c) Determine the force in members BC, CF and EF of the truss using "Method of sections". State whether each of...
For the truss shown, determine the axial load in members BC and BE. Indicate whether the mem- bers are in tension (T) or compression (C). Use both method of sections and method of joints. 2 m 2 m 3 m
10tes CC Question 3 10 pts First solve member BC and GC using Method of Sections, then solve the remaining through Method of Joints. 6-6. Determine the force in each member of the platform truss and state if the members are in tension or compression. Approximate each joint as a pin. 16 KN Prob. 6-6
By the method of joints determines the strength in each member of the truss and if it is in tension or compression. Verify the strength in the elements DC and AB by the method of sections. 1.5 m 30° 4 KN
Find the force in member GC of the loaded truss using method of sections and of joints and compare your answer. Which elements are in compression and which in tension. Are there any zero force member? Why or why not. are 1010 2 kips 20° 4 kips 4 kips 2 kips Find the force in member GC of the loaded truss using method of sections and of joints and compare your answer. Which elements are in compression and which in...