1 / 27

Design of Steel Flexural Members

Design of Steel Flexural Members. Design for : Economy – choose lightest beam that can carry the load Serviceability – May need deeper beam to prevent serviceability problems such as deflection or vibrations. Design of Steel Flexural Members. Bending about strong axis (x-axis):

ikia
Download Presentation

Design of Steel Flexural Members

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Design of Steel Flexural Members Design for : • Economy – choose lightest beam that can carry the load • Serviceability – May need deeper beam to prevent serviceability problems such as deflection or vibrations

  2. Design of Steel Flexural Members • Bending about strong axis (x-axis): • Bending about weak axis w X X w Y Y

  3. Stress and Strain in the Cross-section Strain Stress N.A. N.A. ε=εy ε=εy small ε small ε plastic ε plastic ε E = F/ε E ≠ F/ε N.A. small F Fy Fy Fy

  4. LRFD Equation Load Effect ≤ Factored Resistance

  5. Specification for Flexural Membersp. 16.1-207

  6. Part 5 – Design of Flexural Members • Beam Tables – Table 5-3, p. 5-42 – 5-48 • Beam Charts – Table 5-5, p. 5-71 – 5-102 • Beam Diagrams – Table 5-17, p. 5-162 – 5-177

  7. Flexural Design Example p. 27 notes You are to select the lightest A992 steel beam that can carry a live load of 1.9 k/ft and a dead load of 1.4 k/ft for a span of 33 feet. Assume first continuous lateral support, and then lateral support 10 ft from each end only.

  8. Flexural Design Example p. 27 notes Select an A36 channel to carry a 500 lb/ft live load and a 300 lb/ft dead load for a simply supported span of 15 ft. Lateral support will be continuous for both flanges.

  9. Deflections • Serviceability (not strength) – Chapter L • Calculated for service live load only • KBC: • ∆max = L/360 floor members • ∆max = L/240 roof members where ∆max = maximum deflection L = span length

  10. Deflections p.5-11 LRFD Can also be written

  11. Check deflection of beams chosen in previous examples

  12. Beam Shear Maximum moment: Also an internal shear: w w M V R

  13. Beam Shear

  14. Beam Shear

  15. Shear Strength of Beams p. 16.1-35 LRFD (with no holes in web) if, where, Fyw = yield strength web = Fy for steel shapes Aw = area of web = d x tw p. 16.1 – 67 At connection where holes are in web: true for steel shapes

  16. Check Shear Strength of beams previously designed

  17. Floor Systems for Steel Frame Structures Typical floor systems consist of steel decking filled with concrete Figures of steel decking p. 16.1- 223 (Commentary to chapter I)

  18. ExampleData Sheetfor Steel Decking

  19. Construction Details

  20. Design Example with Floor System p. 33 notes Design the floor system for an office building using the KBC minimum distributed live load for corridors (to allow flexibility of office space). The depth of the floor beams is limited to 24.5” to allow space for mechanical systems. Use EC366 steel decking and lightweight concrete without shoring.

  21. 30’ 24.5” 45’ 30’ 30’ 30’

  22. KBC Minimum Distributed Live Loads

  23. KBC Minimum Concentrated Load

  24. Composite Construction • Detail of shear connectors

  25. Composite Construction PNA in steel PNA in concrete b b a Ycon Ycon C = Ccon+Cst Tst C=T b b a C con Ycon Tst

  26. Composite Construction Ccon = 0.85f’cba T = FyAs C and T can not exceed force carried by studs, ∑Qn ∑Qn =0.85 f’cba Depth of compression block

  27. Composite Construction p.5-33 • Y1 – Distance from PNA to beam top flange • Y2 – Distance from concrete flange force to beam top flange • b – effective width of concrete slab flange • a – effective concrete flange thickness

More Related