1. The Lagrangian Equation INTERMEDIATE MECHANICS WESLEY QUEEN

2. Developing a new perspective  Hero of Alexandria (70 A.D.) - light reflections takes the shortest path  Pierre de Fermat (1657) - light travels along a path that requires the least time  Maupertuis (1747) - action is minimized through the “wisdom of God”  Action is a quantity with dimensions of energy x time  William Hamilton (1834) – “Of all the possible paths along which a dynamical system may move from one point to another within a specified time interval, the actual path followed is that which minimizes the time integral of the difference between the kinetic and potential energies.”

3. The Lagrangian L = T - U

4. Calculus of Variations Use the Chain rule to separate

5. Calculus of Variations

7.  Begun by Newton  Developed by Johann Bernoulli, Jakob Bernoulli, and Leonhard Euler  Important contributions made by Joseph Lagrange, Hamilton, and Jacobi Leonhard Euler (1707 - 1783)

8. A falling object

9. A projectile

10. An Orbiting body r m M x y

11. r m M x y Shows conservation of Angular momentum Indicates the acceleration in the direction r is the central force acceleration + the tangential acceleration

12. Charge interaction y x

13. A rotating pendulum m y x r ωtωt θ

14. m y x r ωtωt θ

15. m y x r ωtωt θ Reduces to simple pendulum when ω = 0.

16. Lagrangian Benefits  Deals with energy which is invariant to coordinate transformations.  Can greatly simplify complicated systems.  Allows us to understand mechanical systems where all of the forces cannot be stated explicitly.  Provides an alternative view of a mechanical system: rather than seeing only cause and effect, we now see the purpose of the system which is to minimize the action.

17. Sources  http://www.people.fas.harvard.edu/~djmorin/chap6.pdf http://www.people.fas.harvard.edu/~djmorin/chap6.pdf  https://en.wikipedia.org/wiki/Leonhard_Euler (photo) https://en.wikipedia.org/wiki/Leonhard_Euler  Marion, Thornton. Classical Dynamics of Particles and Systems, 4 th edition,1995. Harcourt Brace & Co.  http://physicsinsights.org/rotating_polar_1.html http://physicsinsights.org/rotating_polar_1.html