Fix a few typos (thanks, Arthur)
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@ -115,7 +115,7 @@ deduce that \\(b-r\\) is divisible by \\(a\\) (it's literally equal to \\(a\\) t
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so it must be divisible). Thus, we can write:
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{{< latex >}}
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(b-r)|a
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a|(b-r)
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{{< /latex >}}
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There's another notation for this type of statement, though. To say that the difference between
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@ -203,7 +203,7 @@ The results are similarly cool:
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### Sequences of Remainders
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So now we know what the digit-summing algorithm is really doing. But that algorithm isn't all there
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is to it! We're repeatedly applying this algorithm over and over to multiples of another number. How
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does this work, and why does it always loop around? Why don't we ever spiral further and further
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does this work, and why does it always loop around? Why don't we ever spiral farther and farther
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from the center?
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First, let's take a closer look at our sequence of multiples. Suppose we're working with multiples
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