Yes, that looks correct in every way. I'd state your result as: Every composite number can be written as the sum of consecutive odd or consecutive even integers. No prime number can be written this ...

EDIT : I realized that calling Macavity's answer "working by accident" is not fair. What it does is use the general prescription for solving an inequality involving one irrational expression, just ...

As requested, I will expound upon my comment, but I'll do it in the form of an answer, since it's rather lengthy. I noted that the given proof deviates to stronger inequalities, which allow the ...

Following almagest: The standard Dirichlet result gives infinitely many primes pp of the form 35n−1. For such primes we have 5(7n−1)\lt p\lt 7⋅5n The same argument works with a=6, b=7, primes ...

Your proof is correct. Here is an alternative proof. As you do we assume a_1\cdots a_n=1 and a_1\leq\cdots\leq a_n and prove that e_k(a_1,\ldots,a_n)\geq\binom{n}{k}. We do this using Lagrange ...

we were able to list these elements b_1,b_2,\ldots Those elements are the elements of B' by definition. They are an enumeration of B', so they prove that B' is denumerable. But if B' \ne B, ...