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Let's say you have to go through three or four operations to get a final number, well, do it algebraically.
让我们说,你不得不通过3-4个操作,才能得到最终的数,好吧,用代数方法求解。
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As you put a dollar in treasury bills, you end up with a nineteen multiple; that sounds pretty good.
比如你用一美元买了短期国库券,最终你的投资会翻19倍,听上去很不错吧
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But we know already from week zero that computers ultimately represent all information with numbers, and if they want to represent letters inside memory, well what do they do or what do they use?
但是自从上周我们已经知道,计算机最终是用数字来表示所有的,信息,如果它们要描绘,在内存中的字母,它们该怎么做,用什么方式呢?
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And we reasoned that these two eventually reach some kind of an equilibrium separation which we are using lowercase r to represent.
我们推导,这两个最终能达到,某种平衡分离,我们用小写的r代表。
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So suppose we eventually learn how to do this with humans.
假设我们最终能够将这技术用在人身上。
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So the Diadokhoi, the Greek plural of Diadochi, as we often refer to it, ended up splitting his army into four parts and four dynasties descending from the four successors.
所以这四个Diadokhoi,也就是Diadochi的复数形式,我们通常用这个词,最终将他的军队分割为四个部分,由此产生了四个王朝。
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It turns out we can express all these functions in terms of G, G we wouldn't need to choose G, but it's a very useful function to choose.
最终我们能把所有的这些函数,用自由焓G表示出来,我们没有必要选择,但是这个选择很有用。
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If they do make big bets maybe they get lucky once, or twice,or three times, but ultimately their luck is going to run out.
搏大了,可能会侥幸那么一次,两次或三次,但最终运气是会用完的
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This is just the folder containing all of that stuff that we created a PDF out of ultimately.
就是这个文件夹包含了所有,最终我们用PDF列出来的东西。
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