• Sweden beat Switzerland,3-0, and in Sunday's late game, Finland topped Russia,5-1.

    VOA: standard.2010.02.15

  • Can I get you all to look at Game 1 and start thinking about it.

    大家先浏览下游戏1 然后思考一下

    耶鲁公开课 - 博弈论课程节选

  • And there are two games labeled Game 1 and Game 2.

    有两页分别印有游戏1和游戏2的传单

    耶鲁公开课 - 博弈论课程节选

  • But please try and look at--somebody's not looking at it, because they're using it as a fan here-- So look at Game 1 and fill out that form for me, okay?

    请大家看下游戏1 我知道有人没看,他们用那张纸扇风呢,快浏览下游戏1 然后填完 好吗

    耶鲁公开课 - 博弈论课程节选

  • Game 1, a simple grade scheme for the class.

    游戏1是一个简单的成绩博弈

    耶鲁公开课 - 博弈论课程节选

  • Filling in Game 1? Keep writing.

    还在填游戏1 好吧 继续填

    耶鲁公开课 - 博弈论课程节选

  • How do we know that everyone choosing 1 is the Nash Equilibrium in the game where you all chose numbers?

    我们怎么知道在那个数字游戏中,选择1就是这个博弈的均衡呢

    耶鲁公开课 - 博弈论课程节选

  • It's really as if the game is being played where the only choices available on the table are 1 through 67.

    就如同这游戏的可选项只有,1到67之间的数字了

    耶鲁公开课 - 博弈论课程节选

  • Even the game, when you chose numbers, you chose numbers 1, 2, 3, 4, 5, up to a 100, there were 100 strategies.

    比如那个数字游戏,你能从1到100这100个数字中选择

    耶鲁公开课 - 博弈论课程节选

  • As we played the game repeatedly, we noticed that play seemed to converge down towards 1.

    当我们不断地重复博弈,我们会发现最后会不断接近1

    耶鲁公开课 - 博弈论课程节选

  • The reason is that the best response for Firm 1, So it turns out it's pretty to check that this is the only Nash Equilibrium in the game.

    因为公司1的最佳对策,所以很容易验证,这是此博弈中唯一的纳什均衡

    耶鲁公开课 - 博弈论课程节选

  • How do we know that's the Nash Equilibrium of that game?

    我们怎么知道1是纳什均衡呢

    耶鲁公开课 - 博弈论课程节选

  • In that numbers game it converged to 1.

    在数字游戏中最后就只剩1

    耶鲁公开课 - 博弈论课程节选

  • Because at this point, as in the partnership game, which there was a similar thing, as in the partnership game where the best responses intersect is where Player 1 is playing a best response to Player 2, and Player 2 is playing a best response to Player 1.

    因为这一点,与合伙人博弈的情况一样,两者的情况是很类似的,合伙人博弈中最佳对策曲线的交点处,参与人1采用了回应参与人2的最佳对策,参与人2采用了回应参与人1的最佳对策

    耶鲁公开课 - 博弈论课程节选

  • All right, so why don't we send the T.A.S, with or without mikes, up and down the aisles and collect in your Game

    1; not Game

    耶鲁公开课 - 博弈论课程节选

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