Let $S = \{1,..., 999\}$. Determine the smallest integer $m$. for which there exist $m$ two-sided cards $C_1$,..., $C_m$ with the following properties: $\bullet$ Every card $C_i$ has an integer from $S$ on one side and another integer from $S$ on the other side. $\bullet$ For all $x,y \in S$ with $x\ne y$, it is possible to select a card $C_i$ that shows $x$ on one of its sides and another card $C_j$ (with $i \ne j$) that shows $y$ on one of its sides.

(a) Decide whether there exist two decimal digits $a$ and $b$, such that every integer with decimal representation $ab222 ... 231$ is divisible by $73$. (b) Decide whether there exist two decimal digits $c$ and $d$, such that every integer with decimal representation $cd222... 231$ is divisible by $79$.

Let $a, b, c, d$ be four positive real numbers. Prove that $$\frac{(a + b + c)^2}{a^2+b^2+c^2}+\frac{(b + c + d)^3}{b^3+c^3+d^3}+\frac{(c+d+a)^4}{c^4+d^4+a^4}+\frac{(d+a+b)^5}{d^5+a^5+b^5}\le 120$$

The triangle $ABC$ is inscribed in a circle $\gamma$ of center $O$, with $AB < AC$ . A point $D$ on the angle bisector of $\angle BAC$ and a point $E$ on segment $BC$ satisfy $OE$ is parallel to $AD$ and $DE \perp BC$. Point $K$ lies on the extension line of $EB$ such that $EA = EK$. A circle pass through points $A,K,D$ meets the extension line of $BC$ at point $P$, and meets the circle of center $O$ at point $Q\ne A$. Prove that the line $PQ$ is tangent to the circle $\gamma$.