youngstructural
Structural
- Aug 17, 2004
- 713
Hello All;
I need to know the bending moment capacity for a finger beam I'm working with. The beam is 600mm wide, 2700mm long (and 400mm deep) and is bearing on 100kPa Safe Bearing Pressure soil. The vertical load veries, but I would need it for 25kN and 40kN. The load and moment look like:
| N | Axial Load (N) & Moment (M) act about the Dot, 400mm from LHS
| M |
___·____________________
| |
|_______________________|
My problem is that I don't do enough geotechnical work to be 100% confident in my methodology. I have the following two fomulae for qmin and qmax,
qmin = N/A - M/S ; qmax = N/A + M/S
where S = (Width*Length^2)/6
and A = Area under Footing (0.6*2.7 = 1.62m^2)
BUT, qmin turns out negative, so I use the following formula for solving for the point where the slope of the stress envelop crosses zero stress:
x = 3(N*Width - 2M)/(2N)
and then
qmax = 2N/(x*Length)
This yields a very small moment capacity... In the order of 10 to 20 kN·m. I believe that what I've done is correct, that it is rational to restrict the moment to this low a load. However, I am not 100% confident, and would greatly appreciate some advice!
Is it as simple as recognizing that the slope of the stress field cannot change? Because if I try the first two formulae for qmin and qmax with a high moment and set qmin to zero, solving for qmax gives me 30kN·m!!! I would think this is not realistic, because the back of the footing would lift up before acheiving this stress distribution, but am I right?
Your thoughts are appreciated,
Regards,
YS
B.Eng (Carleton)
Working in New Zealand, thinking of my snow covered home...
I need to know the bending moment capacity for a finger beam I'm working with. The beam is 600mm wide, 2700mm long (and 400mm deep) and is bearing on 100kPa Safe Bearing Pressure soil. The vertical load veries, but I would need it for 25kN and 40kN. The load and moment look like:
| N | Axial Load (N) & Moment (M) act about the Dot, 400mm from LHS
| M |
___·____________________
| |
|_______________________|
My problem is that I don't do enough geotechnical work to be 100% confident in my methodology. I have the following two fomulae for qmin and qmax,
qmin = N/A - M/S ; qmax = N/A + M/S
where S = (Width*Length^2)/6
and A = Area under Footing (0.6*2.7 = 1.62m^2)
BUT, qmin turns out negative, so I use the following formula for solving for the point where the slope of the stress envelop crosses zero stress:
x = 3(N*Width - 2M)/(2N)
and then
qmax = 2N/(x*Length)
This yields a very small moment capacity... In the order of 10 to 20 kN·m. I believe that what I've done is correct, that it is rational to restrict the moment to this low a load. However, I am not 100% confident, and would greatly appreciate some advice!
Is it as simple as recognizing that the slope of the stress field cannot change? Because if I try the first two formulae for qmin and qmax with a high moment and set qmin to zero, solving for qmax gives me 30kN·m!!! I would think this is not realistic, because the back of the footing would lift up before acheiving this stress distribution, but am I right?
Your thoughts are appreciated,
Regards,
YS
B.Eng (Carleton)
Working in New Zealand, thinking of my snow covered home...
