Will…
Thank you very much for your responses, they are much appreciated.
You are right, proprietary data is about all one can hope for on this matter. It’s too trivial for anyone at a “seat of higher learning” to tackle, and companies don’t always have the budget for such testing. My methods group head agrees that this is a gap in their methodology guidelines, but cannot get the funds to perform in-house testing.
My interest in this arose because of a recent MRB requirement to “move” an item, using a shim strip, in order to recover a very high-cost item. To substantiate the affected joint we were forced to use the commonly employed so-called Peery method, based on Peery’s 1950 book. As you probably know, it is based on the guided cantilever action of the pin. This assumes that the thin sheet in the joint, joined by a pin diameter larger than the sheet thickness, can clamp the pin to such an extent as to create a zero rotation in the pin at the centerlines of the sheets. Anyone who has done any lab testing on cantilevers understands what encastré means in terms of the rotational stiffness required to achieve this condition.
This didn’t seem plausible to me, so I embarked on a reverse engineering exercise on a set of protruding head Ti Hi-lok zero-shim joint strength data. The data-set covers -5 thru -12 fastener diameters in commonly-used 2000 and 7000 series alloys of standard thicknesses. In my analysis, the joint failure was broken down into the constant stress ratio (Ra) and the bend-bearing ratio (Rb) using the allowable yield and ultimate bearing stresses for e/D = 2 joints. The calculation is done per the method used for single pin offset lug bearings from the “Stress Analysis Manual”, NTIS No. AD-759199. No fastener head/collar clamping per Bill McCombs’ Bruhn Supplement was considered.
As would be expected, the resultant bend-bearing component of the failure data indicated that even for thicker joint plates, i.e. t/D = 0.9, the maximum zero-shim clamping is in the region of 10 to 15% of the Peery assumption, and is terminated by the shear strength of the pin.
This indicates to me that the fully encastré assumption of Peery is not borne out by the joint strength test data.
It was with this background that I appealed for some test data to confirm or deny that the Liaison Engineer’s Handbook that I have in my possession is over conservative.
I shall try to get the documents you suggest.
Regards,
Ed
