This course discusses the process of building two-dimensional problems for the linear and elliptic PDEs using a scalar variable. The strong and the weak form are discussed using constitutive relations and boundary conditions. Then, we talk about the gradient of the trial solution and the weighting function. Lastly, we discuss the matrix-vector weak form. This course was developed by Prof. Krishna Garikipati and Dr. Gregory Teichert, at the University of Michigan in partnership with Ansys.
A course completion badge allows you to showcase your success. With our badging platform, digital badges can be easily shared in email signatures, digital resumes, and social media profiles, helping you highlight your achievements. The digital image contains verified metadata that describes your participation in our course and the topics and skills that were covered. This badge is for successfully completing the FEA - Linear and Elliptic Partial Differential Equations for a Scalar Variable in Two Dimensions course.
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Cost: FREE
- Course Duration: 1-2 HOURS
- Skill Level: Beginner
- Skills Gained: Finite Element Method, Strong Form, Weak Form, Constitutive Relation
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