12-267/Derivation of Euler-Lagrange

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Disclamer: This is a student prepared note based on the lecure of Tuesday October 2nd.

For a function defined on to be an extremum of , it must be that for any function defined on that preserves the endpoints of (that is, and ), we have .

Let signify F differentiated with respect to its nth variable.

(integrating by parts)

Due to the constraints of and , .

As this must be equal to 0 for all h satisfying the endpoint constraints, we must have that , or in other terms, .