Hamiltonian and Lagrangian Mechanics: Online Resource

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Several users recommend online resources for studying Lagrangian and Hamiltonian mechanics, highlighting a Harvard course website as particularly useful. The main link provided includes lecture notes that are accessible yet not overly simplistic. Additional resources, such as a PDF handout and a website focused on the principle of least action, are also suggested. These materials cater to those with a basic understanding of the subject looking to deepen their knowledge. Overall, the discussion emphasizes the value of these resources for learning advanced mechanics concepts.
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Does anyone know of a good online resource on Lagrangian and Hamiltonian mechanics?
 
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Thread 'Question about pressure of a liquid'

Thread 'Question about pressure of a liquid'

I am looking at pressure in liquids and I am testing my idea. The vertical tube is 100m, the contraption is filled with water. The vertical tube is very thin(maybe 1mm^2 cross section). The area of the base is ~100m^2. Will he top half be launched in the air if suddenly it cracked?- assuming its light enough. I want to test my idea that if I had a thin long ruber tube that I lifted up, then the pressure at "red lines" will be high and that the $force = pressure * area$ would be massive...
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Thread 'Why is the 3 body problem unsolvable? And what will happen if someone solves it?'

I feel it should be solvable we just need to find a perfect pattern, and there will be a general pattern since the forces acting are based on a single function, so..... you can't actually say it is unsolvable right? Cause imaging 3 bodies actually existed somwhere in this universe then nature isn't gonna wait till we predict it! And yea I have checked in many places that tiny changes cause large changes so it becomes chaos........ but still I just can't accept that it is impossible to solve...
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