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.
Use the method of joints to determine the forces in members (BC, BD, BE and CE)
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 = 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.
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.
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.
please help Use the METHOD of SECTIONS to determine the forces in members BD, BE, and EG.
1. Determine the forces in members: AB, AH, BH and BC using Method of Joints. 2. Determine the forces in members: CD, CF, and GF using Method of Sections. G H F 4.5 m 3 m E 16300 B DI 6 KN 2 KN 8 KN -12 m, 4@3 m
3. Determine the forces in members BC, CD, and BD, and state whether each is in tension or compression. Note: the truss is supported by a pin joint at A and a simple (roller) support at H. (25 points) G 10 15 10 H E 300 LBS 300 LBS 300 LBS 150 * 15 * 15 15
For the following trusses determine the forces in all members using the method of joints. Specify whether the member is in tension or compression. Problem #4: -5 ft . 5 ft . 5 ft 5 ft 11.5k 8 ft
Use the Method of Sections to find the force in members BD, BE, & CE below. Analyze the left section of the structure. Be sure to indicate if each member is in Tension or Compression. 5m 10 kN 10 kN 5m 5m Figure 1
(a) Determine the forces in members: AB, AH, BH and BC using Method of Joints. (b) Determine the forces in members: CD, CF, and GF using Method of Sections. н. 4.5 m 3 m TA E BU 6 kN 2 KN 8 KN -12 m, 4 @ 3 m