It’s just not true that for real a and b, \sqrt{ab}=\sqrt{a}\sqrt{b}. The radical or square-root sign \sqrt{\ \ } refers to the principal square root. This means the positive square ...

If you want a number to be a perfect square, all its prime factors must be raise to an even power i.e. b^{2n}. So p = 2*3*5 because 480p=2^6*3^2*5^2 => \sqrt{480p}=\sqrt{2^6*3^2*5^2}=2^3*3*5 ...

Your solution works. Here's an alternate solution, perhaps more generic . . . We know that \mathbb{R}^2 has the same cardinality as \mathbb{R}, hence |S| \le |\mathbb{R}^2|=|\mathbb{R}|= {\frak{c}} ...

HINT 1 Note that r(x)={\large \dfrac {\mathrm{lcm}(x^2+x)}{\mathrm{lcm}(x^2)}\cdot{\dfrac {(x^2)\#}{(x^2+x)\#}} = \prod_{p_k<x+1} p_k^{[\log_{p_k}(x^2+x)]-[\log_{p_k}(x^2)]}}. Calculations ...

It's the countable union of measure 0 sets, so its measure is 0.

Below is a solution to your problem as I understand it. Your main mistake was that you only considered one threshold when dealing with more than 2 states. For the sake of readability I start with the ...