1. In an acute - angled triangle ABC , A=30 ^ , H is the orthocentre, and M is the midpoint of BC . On the line HM , take a point T such that HM=MT. Show that AT=2BC 2. Show that there are infinitely many pairs (a,b) of relatively prime integers(not necessarily positive) such that both the quadratic equations x^ 2 + ax + b=0 and x^ 2 + 2ax + b=0 have integer roots. 3. Show that the number of 3 - element subsets {a,b,c} of {1,2,3,... ,63} with a + b + c<95 is less than the number of those with a + b + c>95. 4. Let ABC be a triangle and a circle ' be drawn lying inside the triangle, touching its incircle externally and also touching the two sides AB and AC . Show that the ratio of the radii of the circles ' and is equal to 2 (( pi - A) / (4) .). 5. Let a 1 ,a 2 ,a 3 ,... ,a n be n real numbers all greater than 1 and such that |a k - a k + 1|< ;1 for 1 <= k <= n - 1. Show that (a 1 ) / (a 2 ) . + (a 2 ) / (a 3 ) . + (a 3 ) / (a 4 ) . + ... + (a n - 1) / (a n ) . + (a n ) / (a 1 ) .<2n - 1. 6. Find all primes p for which the quotient (2 p - 1 - 1)/p is a square. ^^ -- ~~ 曾經 我在一張卡片上 寫下"一個烏賊和魚的故事" 記錄著那三年所有的點點滴滴 和所有的我的朋友 ~~ -- ※ 發信站: 批踢踢實業坊(ptt.cc) ◆ From: 140.112.249.199