Numerical Validation of Spreader Beam – SOLIDWORKS SIMULATION
Knowing how to model and validate the spreader beam can actually make us to understand the proper pre-processing, solving and post-processing that is involved in any CAE tool.
FEA Tools that are going to be involved here are as follows
1) SOLIDWORKS SIMULATION
2) 3DEXEPREIENCE SIMULIA &
3) Abaqus Legacy
We plan to write this Numerical Validation of Spreader Beam as three parts by the usage of CAE Tools. First to begin with the problem represented in the Figure 1, has been solved by the following element selection and its boundary conditions.
Numerically when spreader beam is represented, it can be represented in two ways of element selection i.e., Either by selecting Beam element (1D Element) or selecting Solid elements(3D Element).
In this blog we will be discussing the advantages and disadvantages that we are going to face depending on the selection of elements
Spreader Beam can be analyzed by modelling
Entire beam or Symmetrical Beam into 3D CAD model and Validated with Solid Element Beam Model (3D Element)
Entire beam into 3D CAD model and Validated with Beam Element (1D Element)
By default, Sling Rod has been modelled as Linkage Rod as shown in figure 2
Solid Element (3D) Beam Model - Boundary Conditions
Load
Interaction
Constraints
1. Load ( Same for Both Cases)
3000Lbs of weight has to be lifted
3000/2 = 1500Lbs load at a distance of 2.85ft from both end
2. Interaction – Bonded (Same for Both Cases)
All interaction is treated as Bonded, since all parts will be welded together
3. Constraints
All DoF arrested (Case 1)
Free at Y & Z (Case 2), Since Solid Elements (3D Element) have only Translational DoF, Translation along X (At Solid Beam End Faces) should be restrained to achieve bending.
Beam when Modelled and Validated with Solid Element – Usage of Full Model Approach
Solid-type elements, in this case, are tetrahedrons in place of all modeled geometry
Computational Cost with respect to time is high
Solid Elements, gives good results when beam length is in higher range, but lacks in stress prediction
Solid Element – Full Model Approach
Solid Element – Full Model Approach
Case 1: All DoF arrested ( X, Y & Z)
Free Body Forces
Solid Element – Full Model Approach
Case 1: All DoF arrested ( X, Y & Z)
Free Body Forces
Displacement
Shear Stress
Allowable shear = 371 Psi
Shear Stress 
Allowable Shear
Solid Element – Full Model Approach
Case 2: Free at Y & Z
Free Body Forces
Solid Element – Full Model Approach
Case 2: Free at Y & Z
Free Body Forces
Displacement
Shear Stress
Allowable shear = 371 Psi
Shear Stress Allowable Shear
Solid Element – Symmetry Model Approach
Case 1: All DoF arrested ( X, Y & Z)
Free Body Forces
Solid Element – Symmetry Approach
Case 1: All DoF arrested ( X, Y & Z)
Free Body Forces
Displacement
Shear Stress
Allowable shear = 371 Psi
Shear Stress Allowable Shear
Solid Element – Symmetry Approach
Case 2: Free at Y & Z
Free Body Forces
Free Body Forces
Displacement
Shear Stress
Observation:
| Free Body Force | Displacement | Shear Stress |
Full Model Approach |
|
|
|
Case 1 | 97.5% Deviation | 0.129mm | 62.918Psi |
Case 2 | 0 to 1.5% Deviation | 0.441mm | 182.051Psi |
Symmetric Approach |
|
|
|
Case 1 | 98.5% Deviation | 0.126mm | 49.731Psi |
Case 2 | 0 to 1.2% Deviation | 0.585mm | 181.25Psi |
As stated earlier, we can understand that, the maximum amount of deflection variation has been observed between two approaches. But regarding the stress developed we can see that there is a correlation. And also, by referring many Journals we can understand that the maximum of stress variation is observed when lengthier beam has been used.
As we discussed the calculations for Solid approach here, we will discuss the beam Element approach on upcoming blogs of this CAE Validation Series. Ciao!
Contact Us:
Have questions or need assistance? Feel free to reach out!
Email: mktg@egs.co.in
Phone: +91 94454 24704
