Where Can I Find a Website for Advanced Mechanics Help?

AI Thread Summary
For advanced mechanics help, users recommend seeking out specialized websites and books, as many online resources may not provide adequate explanations. One participant is developing a website focused on classical mechanics, featuring real-world application problems suitable for first-year university students. Users are encouraged to share specific questions in the forum's homework help section for targeted assistance. The discussion emphasizes the importance of solid resources, with a preference for books over websites for in-depth learning. Overall, finding reliable online support can enhance understanding of complex mechanics topics.
3nTr0pY
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Im looking for a good website that explains topics in mechanics to high A level/first year University standard. Because currently I just get stuck on a question at Uni and I don't really know what to do to find the answer.
 
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Well done, you have suceeded in finding a good website already.

What books do you have on mechanics? I don't really recommend websites over book in anything apart from quick references. They are generally crap to learn from and explanations are taken from books anyway.

What is it you are having a problem with? (on the off chance I do know of a good website to help)

And if you get stuck, post the question and your attempt at a solution on the homework help section on this very forum.
 
I'm currently building a website that focuses on classical mechanics. It covers problems taken from real world applications, so you might find it helpful. Most of the material is first year level, but some is more advanced.

I'm not sure I can post the link here, but if you click on my name you'll get a pull down menu which allows you to go to my webpage.

3nTr0pY said:
Im looking for a good website that explains topics in mechanics to high A level/first year University standard. Because currently I just get stuck on a question at Uni and I don't really know what to do to find the answer.
 
I have recently been really interested in the derivation of Hamiltons Principle. On my research I found that with the term ##m \cdot \frac{d}{dt} (\frac{dr}{dt} \cdot \delta r) = 0## (1) one may derivate ##\delta \int (T - V) dt = 0## (2). The derivation itself I understood quiet good, but what I don't understand is where the equation (1) came from, because in my research it was just given and not derived from anywhere. Does anybody know where (1) comes from or why from it the...

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