Problem 3 is interesting... Not too hard I think, that is, after someone showed me the answer. ※ 引述《boggart0803 (幻形怪)》之銘言： : Problem 1 : Let H be the orthocenter of an acute-angled triangle ABC. : The circle G_A centered at the midpoint of BC and passing : through H intersects the sideline BC at points A_1 and A_2. : Similarly, define the points B_1, B_2, C_1, C_2. : Prove that six points A_1, A_2, B_1, B_2, C_1, C_2 are concyclic. : Problem 2 : (i) If x, y and z are three real numbers, all different : from 1, such that xyz=1, then prove that Σ(x^2/(x-1)^2)>=1 : (ii) Prove that equality is achieved for infinitely many : triples of rational numbers x, y and z. : Problem 3 : Prove that there are infinitely many positive integers n : such that n^2+1 has a prime divisor greater than 2n+sqrt(2n) -- r=e^theta 即使有改變，我始終如一。 --

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