- #1
brisingr7
- 3
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Euler Lagrange Equation : if y(x) is a curve which minimizes/maximizes the functional :
F\left[y(x)\right] = \int^{a}_{b}f(x,y(x),y'(x))dx
then, the following Euler Lagrange Differential Equation is true.
\frac{\partial}{\partial x} - \frac{d}{dx}(\frac{\partial f}{\partial y'})=0
Well...
I don't understand why the function f has only three variables x, y(x) and the derivative of that.
what about y'' or y^{(3)}? I think it could be possible.(physically) All files related to this topic states that the function f as a function of variables x, f(x), and f'(x).
i.e. can function f be like : f(x,y(x),y'(x),y''(x),...) ? or... is it unnecessary to think about the second derivative and furthermore?
F\left[y(x)\right] = \int^{a}_{b}f(x,y(x),y'(x))dx
then, the following Euler Lagrange Differential Equation is true.
\frac{\partial}{\partial x} - \frac{d}{dx}(\frac{\partial f}{\partial y'})=0
Well...
I don't understand why the function f has only three variables x, y(x) and the derivative of that.
what about y'' or y^{(3)}? I think it could be possible.(physically) All files related to this topic states that the function f as a function of variables x, f(x), and f'(x).
i.e. can function f be like : f(x,y(x),y'(x),y''(x),...) ? or... is it unnecessary to think about the second derivative and furthermore?
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