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Deformed cantilever length
Posted 2013年11月6日 GMT-5 00:16 Modeling Tools & Definitions, Parameters, Variables, & Functions, Studies & Solvers, Structural Mechanics Version 4.3, Version 4.3b 4 Replies
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I have a cantilever, clamped at one end, 100 units long. It bends under its own weight (so, add a body load in the z direction of solid.rho*g_const).
Now, since this cantilever is bending downwards, the top surface will be stretched and will be longer than 100 units (like, 100.1 units or something) and the bottom will be shorter (like, 99.9 units or something). I need to calculate the length along the top surface of the cantilever. So the output number I desire is 100.1 or something.
To do this, I try: Model 1 > Definitions > Right click and add Integration > select the edge running down the side of the cantilever > Call it intop1. Solve the model and then collect the result under Results > Derived Value > Global Evaluation > Expression = intop1(1). I am integrating unity here so that I get the length in units of meters. Integral of 1 with respect to dx is just the length.
Now, I have tried this with Frame = Mesh, Geometry, Material, Spatial. None of them work. They all give me an answer of 100 rather than 100.1.
How do I integrate along the length of the DEFORMED cantilever?
I have attached a similar model in case you need to take a look. Though this model has a few extra things.
Thanks!
(Of course this is a simple example so you may say I should do it analytically - in fact the actual model is more complicated and there is no analytical solution. So COMSOL it is!)
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You were almost there. The correct thing to do is to integrate (1) on the Spatial frame. But in order to get a difference between the Material and the Spatial frame you must activate Geometric Nonlinearity for the study step.
Regards,
Henrik
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However now my model won't solve. I get this error message:
> Failed to find a solution.
> Maximum number of Newton iterations reached.
> Returned solution is not converged.
I've tried various things including changing the mesh from free tetrahedral to a well-defined rectangular swept mesh, and having far fewer mesh points, because I thought it might be a meshing issue. Any ideas? I've attached my model.
Thanks!
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So this is okay - but could anyone enlighten me why the other mesh sizes (and rectangular swept mesh for that matter) don't work, and what I might do in the future to be able to solve for any arbitrary mesh?
Thanks
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If the geometrically nonlinar analysis has convergence problems, your model probably has very large deformations. If so, you must increase the load gradually using a continuation parameter rather than applying the full load in one step.
Regards,
Henrik