1. There are $100$ participants. Out of every group of $12$ participants, there is one pair of familiar participants. Each participant is given a number (not necessarily $1$ through $100$). Prove that there is a pair of familiar participants whose number has the same starting digit. 2. $\sqrt{x + \sqrt{x + \sqrt{x + \dots + \sqrt{x}}}} = y$. If the left side is finite, find all integer solutions. 3. Is there a geometric sequence such that $a_0 > 0, b > 1$, and so that $a_l$ is an integer for $0 \le l \le 9$, but $a_l$ is not an integer for $l>9$? If so, find it. 4. Suppose r and s are positive integers and that $2^r$ is a permutation of the decimal representation of $2^s$. Prove that $r=s$. 5. Find the minimum area of a right triangle with an inscribed circle that has a radius of $1$ cm. [hide = Note]This isn't exactly verbatim, just paraphrased. I will update the questions when the official problems/solutions are released. In the meanwhile, feel free to post your solutions below![/hide]