IndeterminateBeam is a Python Package aiming to serve as a foundation for civil and structural engineering projects in Python. The module can also serve as a stand-alone program and is useful for determining:
- reaction forces for indeterminate beams
- internal forces for indeterminate beams (shear, bending, axial)
- deflections of beams due to resulting forces
- axial force, shear force, bending moment and deflection diagrams.
The package is based mainly on engineering concepts of statics as described in (Hibbeler, 2013), and Python packages Sympy (Meurer et al., 2017) and Plotly (Plotly Technologies Inc, 2015).
The package documentation provides a brief overview of the theory behind the solutions used to calculate the forces on the indeterminate beam. The full package documentation can be accessed here.
Text-based examples of the package presented in the documentation can be found on this Jupyter Notebook and a web-based graphical user interface (GUI) is available at https://indeterminatebeam.onrender.com .
The purpose of this project is two-fold:
- Create a free website that has more features than paid and free beam calculators that exist on the web.
- Provide a foundation for civil and structural engineers who want to create higher order engineering Python programs.
Several (mostly paid) beam calculator websites currently exist online, providing the same service as this package, with web traffic in the hundreds of thousands per month (Similiarweb, 2021). Despite this, no online service exists (to the authors knowledge) that has all the features of IndeterminateBeam
and is also free.
Similiarly, there are no well-documented indeterminate beam solving Python packages (to the authors knowledge) despite the importance of such a calculation in engineering. Several python finite element analysis (FEA) packages do exist, however they are vastly overcomplicated for someone wanting to only solve for forces on a one-dimensional beam.
This python package was heavily inspired by beambending (Carella, 2019), a module created for educational purposes by Alfredo Carella of the Oslo Metropolitan University. The beambending module, although well documented, can only solve for simply supported beams consisting of a pin and roller support. The package documentation for this project includes a more rigorous overview of the theory behind the basics for solving determinate structures.
A typical use case of the IndeterminateBeam
package involves the following steps:
- Create a
Beam
object - Create
Support
objects and assign toBeam
- Create
Load
objects and assign toBeam
- Solve for forces on
Beam
object - Plot results
You can follow along with the example below in this web-based Jupyter Notebook. Alternatively, you can download the jupyter-notebook for this example here, or the python file for this code here.
The units used throughout the Python package are the base SI units (newtons and metres), but can be updated using the update_units
method. Units and load direction conventions are described in the package documentation.
The creation of a Beam
instance involves the input of the beam length (m) and optionally the input of the Young's Modulus (E), second moment of area (I), and cross-sectional area (A). E, I and A are optional and by default are the properties of a steel 150UB18.0. For a beam with constant properties, these parameters will only affect the deflections calculated and not the distribution of forces, unless spring supports are specified.
from indeterminatebeam import Beam
# Create 7 m beam with E, I, A as defaults
beam = Beam(7)
# Create 9 m beam with E, I, and A assigned by user
beam_2 = Beam(9, E=2000, I=10**6, A=3000)
Support
objects are created separately from the Beam
object, and are defined by an x-coordinate (m) and the beams translational and rotational degrees of freedom.
Degrees of freedom are represented by a tuple of 3 booleans, representing the x , y , and m directions respectively. A 1
indicates the support is fixed in a direction and a 0
indicates it is free.
Optionally, stiffness can be specified in either of the translational directions, which overrides the boolean specified.
from indeterminatebeam import Support
# Defines a pin support at location x = 5 m
a = Support(5, (1,1,0))
# Defines a roller support at location x = 0 m
b = Support(0, (0,1,0))
# Defines a fixed support at location x = 7 m
c = Support(7, (1,1,1))
# Assign the support objects to a beam object created earlier
beam.add_supports(a,b,c)
Load
objects are created separately from the Beam
object, and are generally defined by a force value and then a coordinate value, however this varies slightly for different types of loading classes.
from indeterminatebeam import PointLoadV, PointTorque, DistributedLoadV
# Create a 1000 N point load at x = 2 m
load_1 = PointLoadV(1000, 2)
# Create a 2000 N/m UDL from x = 1 m to x = 4 m
load_2 = DistributedLoadV(2000, (1, 4))
# Defines a 2 kN.m point torque at x = 3.5 m
load_3 = PointTorque(2*10**3, 3.5)
# Assign the load objects to the beam object
beam.add_loads(load_1,load_2,load_3)
Once the Beam
object has been assigned with Load
and Support
objects it can then be solved. To solve for reactions and internal forces we call the analyse function.
beam.analyse()
After the beam has been analysed we can plot the results.
fig_1 = beam.plot_beam_external()
fig_1.show()
fig_2 = beam.plot_beam_internal()
fig_2.show()
The plot_beam_external
and plot_beam_internal
methods collate otherwise seperate plots.
The script above produces the following figures:
If you want to install the indeterminatebeam
package, you run this one-liner:
pip install indeterminatebeam
NOTE: You need Python 3 to install this package (you may need to write
pip3
instead ofpip
).
The library dependencies are listed in the file requirements.txt
, but you only need to look at them if you clone the repository.
If you install the package via pip
, the listed dependencies should be installed automatically.
The following are areas that can be implemented in future:
- allow for segmental beam properties (E,I,A)
- calculate axial deflections
- Latex or PDF output of calculations
- More indeterminate beams in testing
The guidelines for contributing are specified here.
The guidelines for support are specified here.
Copyright (c) 2020, Jesse Bonanno
- Carella, A. (2019). BeamBending: A teaching aid for 1-d shear force and bending moment diagrams. Journal of Open Source Education, 2(16), 65. https://doi.org/10.21105/ jose.00065
- Hibbeler, R. (2013). Mechanics of materials. P.Ed Australia. ISBN: 9810694369
- Meurer, A., Smith, C. P., Paprocki, M., Čertík, O., Kirpichev, S. B., Rocklin, M., Kumar, A., Ivanov, S., Moore, J. K., Singh, S., Rathnayake, T., Vig, S., Granger, B. E., Muller, R. P., Bonazzi, F., Gupta, H., Vats, S., Johansson, F., Pedregosa, F., … Scopatz, A. (2017). SymPy: symbolic computing in Python. PeerJ Computer Science, 3, e103. https://doi.org/10.7717/peerj-cs.103
- Similiarweb, 2021, https://www.similarweb.com/. Accessed 1 Mar 2021.
- Plotly Technologies Inc. Collaborative data science. Montréal, QC, 2015. https://plot.ly."