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This course concerns the calculus of variations.

FREE
This course includes
Hours of videos

1 hour, 17 minutes

Units & Quizzes

4

Unlimited Lifetime access
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Certificate of Completion

Section 1 introduces some key ingredients by solving a seemingly simple problem – finding the shortest distance between two points in a plane. The section also introduces the notions of a functional and of a stationary path. Section 2 describes basic problems that can be formulated in terms of functionals. Section 3 looks at partial and total derivatives. Section 4 contains a derivation of the Euler-Lagrange equation. In Section 5 the Euler-Lagrange equation is used to solve some of the earlier problems, as well as one arising from a new topic, Fermat’s principle.

Course learning outcomes

After studying this course, you should be able to:

  • Understand what functionals are, and have some appreciation of their applications
  • Apply the formula that determines stationary paths of a functional to deduce the differential equations for stationary paths in simple cases
  • Use the Euler-Lagrange equation or its first integral to find differential equations for stationary paths
  • Solve differential equations for stationary paths, subject to boundary conditions, in straightforward cases.

Course Currilcum

  • Introduction 00:25:00
  • Learning outcomes 00:07:00
  • Link to course PDF 00:30:00
  • Conclusion 00:15:00