Interesting question. Beatty sequences give that every positive natural number is either of the form \lfloor \sqrt{2}\,a\rfloor or of the form \lfloor (2+\sqrt{2})\,b\rfloor , for some a,b\in\mathbb{N} ...

First note that m can take all the perfect square values. Assume that m is npt a perfect square. So there exist a unique t such that t^2<m<(t+1)^2 assume that m=t^2+k where k\in{\mathbb{N}} ...

If we prove that for every x there exists a prime number between x^2 and x^2+2x+1, we are done. This is Legendre's conjecture , which remains unsolved. Hence the big smile on your teacher's ...

Your approach using approximating fractions seems like a good one. You can use the solutions to the Pell equation to your advantage. If \frac ef is one approximation to \sqrt 2, the next one ...

A greedy algorithm works here. Keep adding elements to B any way you like until you can't continue. Therefore let B be a subset of A that meets the requirements and is maximal for inclusion. ...

\lfloor \sqrt{2} \rfloor + \lfloor \sqrt{3} \rfloor + ... + \lfloor \sqrt{p_i} \rfloor... \lt \lfloor \sqrt{2} \rfloor + \lfloor \sqrt{2^2} \rfloor + \lfloor \sqrt{2^3} \rfloor + ... + \lfloor \sqrt{2^n} \rfloor = ...