绳圈

constant

口袋里有 n 根绳子。随机选出两个绳头系在一起，这样重复 n 次。求最后连成一个大绳圈的概率。

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乱弹

What is the probability of not getting a loop of length 1 after one step (which leaves n-1 ropes)?  I think it is (2n-2)/(2n-1) if we assume that all ropes are labeled 1, 2, ..., n and the rope ends of rope k  are labeled 2k-1， 2k (so we think the two ends are different).   Then we use the principle of multiplication: p(1)=1, p(n+1)=2n/(2n+1)*p(n)=(2n)!!/(2n+1)!!.      Different setting may lead to different answer. For example, under some setting, p(n) could be just 1/n. However,  the one I use might be the right one. www.ddhw.com

heavenarch

2^n *n!/(2*n)!www.ddhw.com

heavenarch

,wrong, but almost. 2^n *(n!)^2 /(2*n)! : all possible knots: (2*n)!/(n! *2^n) : big circles among them: n!www.ddhw.com hope not wrong againwww.ddhw.com I am glad to find so many interesting quizs here and so many great men too, respect.www.ddhw.com

constant

  Induction again?

husonghu

  你也是高手。希望你也能多献好题，多显身手

husonghu

n根绳时，总的接法数是C(2n，2)，不成圈的接法数(每根头尾相接) 是n，能成圈(接成n-1根绳)的概率是(2n-2)/(2n-1)；www.ddhw.com 依次，n-1根绳时，能成圈(接成n-2根绳)的概率是(2n-4)/(2n-3)；www.ddhw.com .............www.ddhw.com 所以，P(n)=(2n-2)!!/(2n-1)!!www.ddhw.com 不知做得对不对?www.ddhw.com

vicky3712

if n = 1,  p(1) = 0!!/1!! = 1; right    n = 2,  p(2) = 2!!/3!! = 2/6! this is wrong. the correct approach is   p(1) = 1; for n > 1,   p(2) = (4/C(4, 2)) p(1)  = 2/3;   p(3) = (C(6,2) - 3)/C(6,2)) P(2) = 8/15;   p(n) = (C(2n, 2) -n)/C(2n, 2)) p(n-1) which is a ugly expression.         www.ddhw.com

husonghu

You were wrong by saying 2!!/3!! = 2/6!www.ddhw.com Instead, 2!!/3!! = 2/3     In fact, if you simplify your result, you will get exactly the same thing: P(n)=(2n-2)!!/(2n-1)!!   www.ddhw.com

乱弹

  

constant

I was thinking about using permutation groups. But somehow the answer was different. Probably "randomness" is defined differently. www.ddhw.com

QL

"Different setting may lead to different answer. For example, under some setting, p(n) could be just 1/n. "www.ddhw.com   Can you elaborate this? www.ddhw.com

乱弹

My first thought: each permutation is corresponding to a way of tieing. There are n! permutations, with (n-1)! of them being cycles of length n.www.ddhw.com   However, later I thought this was wrong. This mapping is not one-one or in any sense constant-constant. www.ddhw.com