Imagine a person who is able to walk up the steps of a ladder. Let our person at his request they substitute infinitely long stairs, the step of which is a multiple of his step. From the ground, a man can jump on a step of a ladder, the distance between the neighboring steps of which is equal to two of his steps, but then, when climbing, he takes only one step each time, and at the same time puts his foot either on the step of the new ladder requested by him, or on the step of the old ladder set earlier. The question is, how many stairs will he need to climb N steps, if N is large enough
My solution to the problem in the appendix to the
Preprint Chaotic dynamics of an electron
I created a power series for the number of primes up to x. Head to my page to read it, under An exact formula for the prime counting function.
Jose R. Sousa,
Thank you, I will definitely look. However, you are also interested in physics. Then you will also be interested to see the notes on my page.
Jose R. Sousa, you have a clear style of presentation, and I hope the reviewers will understand your formulas. I, on the contrary, do not know how to write clearly and it is difficult for reviewers to understand me.
Igor Bayak Nobody is born knowing Lol, you can learn as well. Yes, I really think that I write down my ideas in a very simple and easy to follow way, usually. That is unlike most mathematicians, because, either they want their work to look more difficult than it is, or because they're not able to break down their ideas in an easy to follow way. Or even because their stuff is so advanced that what they write about is really above other people's heads, that happens too.
That said, I think that at times mathematicians think that a paper written in a very clear way may not be desirable, since it doesn't make it look as advanced. Again, some mathematicians like the obfuscation in their papers.
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