Find all natural $n$ such that for some different natural $a, b, c$ and $d$ among numbers $$\frac{(a-c)(b-d)}{(b-c)(a-d)} , \frac{(b-c)(a-d)}{(a-c)(b-d)} , \frac{(a-b)(d-c)}{(a-d)(b-c)} , \frac{(a-c)(b-d)}{(a-b)(c-d)} ,$$there are at least two numbers equal to $n$.