美国数学天才选拔赛 (USA Math Talent Search)www.ddhw.com
2. (难度:+.5) Anna writes a sequence of integers starting with the number 12. Each subsequent integer she writes is chosen randomly with equal chance from among the positive divisors of the previous integer (including the possibility of the integer itself). She keeps writing integers until she writes the integer 1 for the first time, and then she stops. One such sequence is
12, 6, 6, 3, 3, 3, 1.www.ddhw.com
What is the expected value of the number of terms in Anna’s sequence? 5. (难度:++.5) Lisa and Bart are playing a game. A round table has n lights evenly spaced around its circumference. Some of the lights are on and some of them off; the initial configuration is random. Lisa wins if she can get all of the lights turned on; Bart wins if he can prevent this from happening.www.ddhw.com
On each turn, Lisa chooses the positions at which to flip the lights, but before the lights are flipped, Bart, knowing Lisa’s choices, can rotate the table to any position that he chooses (or he can leave the table as is). Then the lights in the positions that Lisa chose are flipped: those that are off are turned on and those that are on are turned off.
Lisa can take as many turns as she needs to win, or she can give up if it becomes clear to her that Bart can prevent her from winning.
(a) Show that if n = 7 and initially at least one light is on and at least one light is off, then Bart can always prevent Lisa from winning.
(b) Show that if n = 8, then Lisa can always win in at most 8 turns.
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哈哈哈哈 O(∩_∩)O哈哈~ 好久不来了,不小心看了一眼自己主页,发现自动关联了自己以往发过的帖,点进这个看了一眼,笑个半死。。。敢情我当初还发过这么搞笑的东西啊,我自己完全不记得了 
雷达卡
发表于 2006-1-17 19:50:32
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千斤顶
发表于 2006-1-19 18:16:03
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