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  • Today we're going to count infinity. Now counting may seem elementary, like, when we say that

  • we have five sheep, what we mean is that we have one sheep for every number from one to

  • five. And ten sheep means one for every number from one to tenor two to eleven.

  • So we say that two sets have the same number of things in them, simply if you can draw

  • a line relating every item in one set to something in the other, and vice versa, exactly once.

  • They're partners!

  • It's the same when we say that two plus one equals three, or three doesn't equal four:

  • we're just describing the lines you draw to relate one set of things to another. But either

  • way, counting sheep is boring, that is, unless you want to count INFINITELY many sheep.

  • Like, if you had a sheep for every number between 0 and 2, would that be more sheep

  • than if you had one for every number between 0 and 1? Nope! Because you can relate every

  • number between 0 and 1 to its double, giving you every number between 0 and 2 (and if you

  • want to "undo," you can just divide every number between 0 and 2 in half to get back

  • all the numbers between 0 and 1).

  • But there are more real numbers between 0 and 1 than there are in the infinite set of

  • integers 1, 2, 3, 4, and so on. How on earth do we know that? Just draw some lines. For

  • "1", draw a line to a number between 0 and 1. And for "2", draw a line to another number

  • between zero and one. For "3", draw a line to a number between... zero and one. And so

  • on. BUT, no matter what numbers between 0 and 1 that we've drawn lines to, we can always

  • write down a number between 0 and 1 that disagrees with the first digit here, and the second

  • digit here, and the third digit here, and so onso this new number will be different

  • from ALL of the other numbers we've drawn lines to. But we've already drawn a line from

  • every integer, so there's no one left to be this number's partner!

  • What's more, because of the clever way we built it, we can find an extra, lonely number

  • like this no matter what other numbers we picked, which means we can NEVER draw lines

  • from the integers to all of the numbers between 0 and 1 with only one line per integer

  • And this means that there really are more real numbers between 0 and 1 than there are

  • in the infinite set of counting numbers 1, 2, 3, 4, and so on forever.

  • So, Hazel Grace, some infinities truly are bigger than other infinities.

Today we're going to count infinity. Now counting may seem elementary, like, when we say that

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B1 中級

無限大の数え方 (How to Count Infinity)

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    cheungyingwww に公開 2021 年 01 月 14 日
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