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In this video,
I'll introduce you
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to a new way of
computing division,
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especially for larger numbers.
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And then we'll think a little
bit about why it works.
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So we're going to try to
compute what 96 divided by 4 is.
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And I'm going to write it
a little bit differently.
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I'm going to write 96
divided by-- so I'm
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going to write this
strange-looking symbol
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right over here, this
thing that covers the 96.
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But you could view this
as 96 divided by 4.
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And I'll show you in a second
why we write it this way.
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This is actually a very useful
way of actually computing it.
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So the first thing we'll
do is we'll say, well,
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how many times does 4 go into 9?
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Well, we know that 4 times 2 is
equal to 8 and that 4 times 3
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is equal to 12.
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So 3 would be too much.
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We would go above 9.
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So we want to be below 9 but
not have too much left over.
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We want the largest
number that gets us
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into 9 without going over 9.
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So we'll say it goes two times.
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4 goes into 9 two times.
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And then we say,
what's 2 times 4?
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Well, 2 times 4 is 8.
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4 times 2 is 8.
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Or 2 times 4 is 8.
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And now, we subtract.
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We subtract the 8 from the 9.
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And we get 1.
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And now we bring down the
next digit, which is the 6.
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And then we ask ourselves,
well, how many times
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does 4 go into 16?
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Well, in this case, we know
that 4 goes into 16 exactly
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four times.
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4 times 4 is 16.
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So we say 4 goes
into 16 four times.
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Then we multiply
4 times 4 is 16.
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We subtract.
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And 16 minus 16, we have
absolutely nothing left over.
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And there we have our answer.
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I know it seems kind of
magical at this point.
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But in a few
seconds, we're going
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to think about why
this actually worked.
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We got that 96 divided
by 4 is equal to-- I
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want to do that in a
different color-- 24.
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Now, what I want you to do
right now is pause this video
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and think about why
did this actually work.
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How did we magically get
the right answer here?
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And you can verify this.
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Multiply 4 times 24,
and you will get 96.
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Well, I'm assuming
you gave a go at it.
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And the important
thing always is
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to keep track of
the place value.
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And it really tells
you what's going
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on when we do this process.
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When we looked at this
9 right over here,
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this 9 is in the tens place.
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This is actually
representing 90.
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It represents 9 tens.
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So we're saying,
well, how many times
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does 4 go into 90 if we're
thinking about multiples of 10?
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Well, it goes 20 times.
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4 times 20 is 80.
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And so we said, well,
4 times 20 is 80.
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But we still have 16 left over.
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You do 96 minus 80.
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You have 16 left over
to divide 4 into.
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And then 4 goes
into 16 four times.
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So really, a lot of this
is just saying, well,
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we first figured out that
we could go 20 times.
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And then we said, well,
that doesn't get us
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all the way to 96.
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We have to go
another four times.
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Hopefully, that helps.
Khan Academy
