Seismic Design of a Concentrically Braced Frame

By : Unknown

On : 20:32

In : Civil Softwares

In frames with concentric diagonal bracings the dissipative zones are located in the tension diagonals only. In this case, the yielding of the tension diagonals should occur before yielding or buckling of the beams or columns and before the failure of the connections. The compressive diagonals do not contribute to the ductility of the framebecause they can fail due to buckling. In this article we will present how to calculate the minimum axial forceresistance requirement of beams and columns according to EN 1998-1 clause 6.7.4.

The following figure shows an idealised concentrically braced frame in which the masses are concentrated at the nodes and all the connections between the members are assumed to be pinned. The loads were calculated using the provisions of Eurocode 8 (EN 1998-1) for dissipative behaviour (q>1.50). 

 

Total gravity load: 840 kN
Total seismic lateral load: 270 kN

sinφ=3/5=0.60
cosφ=4/5=0.80

N_Ed,1*cosφ=270 => N_Ed,1=337.50 kN
N_Ed,2*cosφ=180 => N_Ed,2=225 kN

The yield strength of steel is f_y=355 N/mm².

A_min*f_y>=N_Ed,1 => A_min>=337.50*10³/355 = 950.70 mm²

Choose CHS 114.3 x 3.6

A=1250 mm² and i=39.20 mm

The non-dimensional slenderness of the bracing should be less than 2.00 in order to limit early buckling.

λ=(L/i)/(93.9*ε)=(5000/39.20)/(93.9*(235/355)^0.50)=1.66 < 2.00 OK

Ω=N_pl,Rd/N_Ed,1=1250*355/(337.50*10³)=1.314

 

Vertical Members - Columns	Horizontal Members - Beams
Internal Column - 1st Level:	Internal Beam - 1st Level:
NEd,G=280 kN and ΝΕd,E=337.50 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=280+1.10*1.25*1.314*337.50 => Npl,Rd(ΜΕd)>=889.77 kN (compression)	NEd,G=0 kN and ΝΕd,E=15+225*0.80+30-337.50*0.80=-45 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=0+1.10*1.25*1.314*(-45) => Npl,Rd(ΜΕd)>=-81.30 kN (tension)
Internal Column - 2nd Level:	Internal Beam - 2nd Level:
NEd,G=140 kN and ΝΕd,E=135 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=140+1.10*1.25*1.314*135 => Npl,Rd(ΜΕd)>=383.91 kN (compression)	NEd,G=0 kN and ΝΕd,E=30+60-225*0.80=-90 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=0+1.10*1.25*1.314*(-90) => Npl,Rd(ΜΕd)>=-162.60 kN (tension)
External Column - 1st Level:	External Beam - 1st Level:
NEd,G=140 kN and ΝΕd,E=-337.50+202.50=-135 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=140+1.10*1.25*1.314*(-135) => Npl,Rd(ΜΕd)>=-103.91 kN (tension) The gravity load NEd,G=140 kN is more critical!	NEd,G=0 kN and ΝΕd,E=15+225*0.80=195 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=0+1.10*1.25*1.314*195 => Npl,Rd(ΜΕd)>=352.31 kN (compression) or NEd,G=0 kN and ΝΕd,E=15 kN  Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=0+1.10*1.25*1.314*15 => Npl,Rd(ΜΕd)>=27.10 kN (compression)
External Column - 2nd Level:	External Beam - 2nd Level:
NEd,G=70 kN and ΝΕd,E=-135+135=0 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=70+1.10*1.25*1.314*0 => Npl,Rd(ΜΕd)>=70 kN (compression)	NEd,G=0 kN and ΝΕd,E=30 kN Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=0+1.10*1.25*1.314*30 => Npl,Rd(ΜΕd)>=54.20 kN (compression) or NEd,G=0 kN and ΝΕd,E=-30 kN  Npl,Rd(ΜΕd)>=NEd,G+1.10*γov*Ω*ΝΕd,E => Npl,Rd(ΜΕd)>=0+1.10*1.25*1.314*(-30) => Npl,Rd(ΜΕd)>=-54.20 kN (tension)