tag:blogger.com,1999:blog-14856978.post113940780410133098..comments2024-03-28T05:12:10.477-07:00Comments on Gone Gaming: A Lesson From BessColdfoothttp://www.blogger.com/profile/11636345146138362966noreply@blogger.comBlogger3125tag:blogger.com,1999:blog-14856978.post-1139512461605261782006-02-09T11:14:00.000-08:002006-02-09T11:14:00.000-08:00The point about the odds is that, in the second ga...The point about the odds is that, in the second game, Jeremy had just as much of a chance of being the traitor as anyone else...if there were a third game, there'd be a 1/8 shot, again, that Jeremy would be the traitor--and a 1/8 chance that you would be the traitor, etc.Alfredhttps://www.blogger.com/profile/11834640361290803383noreply@blogger.comtag:blogger.com,1999:blog-14856978.post-1139439805191765462006-02-08T15:03:00.000-08:002006-02-08T15:03:00.000-08:00Thanks, Shannon. Pretty slim odds, then, but not ...Thanks, Shannon. Pretty slim odds, then, but not ridiculously so. I'm just glad we didn't decide to play a 3rd game!<BR/><BR/>As to 'grognads', <B>I</B> enjoy the watchings of such and would not <I>presume</I> to <B>"interfere"</B> in that. ;)Coldfoothttps://www.blogger.com/profile/11636345146138362966noreply@blogger.comtag:blogger.com,1999:blog-14856978.post-1139431325514101742006-02-08T12:42:00.000-08:002006-02-08T12:42:00.000-08:009.375%.It's the odds that there was a traitor in t...9.375%.<BR/><BR/>It's the odds that there was a traitor in the first game times the odds that the same person is the traitor in the second game.<BR/><BR/>For a six-player game that's:<BR/>6/8 * 1/8 = .09375Shannon Appelclinehttps://www.blogger.com/profile/10454937577535623129noreply@blogger.com