Axial and Flexure – How To Engineer http://howtoengineer.com Engineers In Training Wed, 26 Mar 2014 12:24:31 +0000 en-US hourly 1 https://wordpress.org/?v=4.4.14 Masonry Subject to Compression and Flexure – Stability – ASD https://howtoengineer.com/masonry-subject-to-axial-compression-and-flexure/ https://howtoengineer.com/masonry-subject-to-axial-compression-and-flexure/#comments Tue, 19 Nov 2013 14:00:39 +0000 https://howtoengineer.com/?p=793 How To Engineer - Engineers In Training

Masonry Subject to Compression and Flexure – Stability – ASD References Ref 1 ACI 530/ASCE 5/TMS 402 direct number references are for the 2005 version however the method does not change up to the 2013 version. Found here Ref 2 Masrony Structures…

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Masonry Subject to Compression and Flexure – Stability – ASD

References

Ref 1 ACI 530/ASCE 5/TMS 402 direct number references are for the 2005 version however the method does not change up to the 2013 version. Found here

Ref 2 Masrony Structures Behavior and Design by Robert G. Drysdale, Hamid, and Baker 2nd Edition. (the Third edition found here)

Ref 3 Reinforced Masonry Engineering Handbook 6th Edition by Max Porter. Found here

Overview / Discussion

This pertains to stability of reinforced masonry subject to compression and flexure. Now when I first started to post about this subject I was a bit confused as I started digging into the code. Here’s what I mean. In my experience it seems that most engineers Most of us are used to some sort of moment magnifier when axial and moment forces are present such as in ACI 318 and AISC’s Steel Construction Manual. However, when we are designing masonry with ASD provisions we do not seem to find this when we read through the reinforced masonry section of ACI 530 (section 2.3.2 in the ’05 code). We don’t seem to find any adjustment or magnifier for second order / slenderness effects. This had confused me for sometime. I was setting up calculations using force equilibrium and compatibility equations similar to reinforced concrete (Only instead of an approximate rectangular stress block a triangular shape is used assuming a linear elastic stress distribution). Then in the analysis of the section you can directly solve for or iterate to find the location of the neutral axis. Well in doing this you are checking that the masonry is not crushing and also checking that there is adequate tension strength in the steel reinforcement, both of these are what I would say are ‘material’ checks. Meaning that you are checking the capacity of the local material not the overall member which may have less of a capacity due to buckling (stability check). You may say that there is a check for buckling, and that would be true. The required axial force vs the allowed axial force (eqn 2-17 and 2-18 in Ref 1). This however does not account for any moment which may be present. This to me did not seem right as there was no interaction in these equations for axial, moment and buckling. So I dug a little deeper and here is what I found.

Some Quick Background To Clarify My Point

I just want to provide some comparison and clarity for what I am referring to when I’m talking about second order / slenderness / stability effects. These effects are the results of the axial force and the deflection of the member which create ‘secondary’ moments. We can account for these effects in a number of approximate ways. If we go back to Timoshenko’s Theory of Elastic Stability we see that we can account (approximately) this additional bending moment by multiplying the first order moment, M by 1/(1-P_r/P_c) where P_r is the required axial force as found from the results of a first order analysis and P_c is the critical buckling load. We find this amplification in a number of design manuals – AISC 9th edition for a member subject to combined forces. However this formula was removed from the ‘design side’ of the AISC equations and is now found in the ‘analysis side’ in the form of B1 (see chapter c of the AISC 13th edition). This is also found in ACI 318 in the moment magnification procedure. We even find it in the strength design section of the ACI 530 (ref 1). However the procedure if for slender walls and differs from the ACI and AISC approach. In ACI 530 the deflection due to the applied loads is found, then the moment due to axial is found which causes additional deflection. The process is repeated with the new moments until successive trial results in less than 2% error (convergence).
Knowing this now and then reading through Ref 1 ASD design for reinforced masonry we start to think ‘hey something seems to be missing’. Well it is, sorta. Lets take a look.

Design – ASD

UPDATE – this was my first attempt to reason that there was some sort of provision in the code that was considering stability, but ultimately I was wrong. I am leaving this in, for reference.

Whether you are designing reinforced masonry or unreinforced masonry you basically are going back to the unreinforced masonry equations anyway so lets look at reinforced masonry.

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  1. Reinforced Masonry
    1. Members must satisfy a buckling check given by eqn 2-17 or 2-18 in Ref 1, depending on the h/r ratio.
      1. This is basically a pure axial buckling check, no secondary moments
    2. “The compressive stress in the masonry due to flexure or due to flexure in combination with axial load shall not exceed f’m/3 ”
      1. This is what I was referring to as more of a ‘local’ material failure check as stability does not come into play with these equations.
    3. “The axial load component fa does NOT exceed the allowable stress Fa given in section 2.2.3.1” of Ref 1 which is the unreinforced masonry allowable compressive stress section
      1. Notice that you are only checking the axial stress component not the combined stress.
      2. This is ultimately where stability is check but it is not obvious at first. So we look further.
  2. Unreinforced Masonry (section 2.2.3 in Ref 1)
    1. fa/Fa + fb/Fb < 1
      1. Unity check
    2. P<1/4 Pe
      1. Where Pe is simply a buckling equation limit to safegaurd against a premature stability failure caused by eccentricity of an applied axial load. Therefore in equation 2-15 (Ref 1) e is the actual eccentricity of the applied load (min value typically = 0.1t) not M/P where M is caused by other than eccentric load.
      2. Does this e consider deflection?

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I ended up contacting MSJC and received an excellent response from a Mr. Art Schultz from the University of Minnesota. I would like to add that I am very appreciative of Mr. Schultz and MSJC’s assistance. Also the “masonry community” in general seems to be very helpful.

Here the response:MSJC Stability Treatment ASD Axial and Flexure

To summarize: The code does not address stability / second order effects for reinforced masonry design using ASD.

I would say use the LRFD approach, it’s not so bad, see here.

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