1. Prove that every tournament contains a Hamiltonian path. (Tournament map: a directed graph such that for every pair of distinct vertices u and v, there is either an edge from u to v or v to u, but never both.) (I can prove this easily by double induction, but I heard there is a classic proof by strong induction. How?) 2. Given Bertrand's Theorem (there always exists a prime p such that n<p<2n for every n that is a positive integer), prove that all integers greater than 6 can be written as the sum of one or more distinct primes. -- ※ 發信站: 批踢踢實業坊(ptt.cc) ◆ From: 128.12.47.33