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I want to show you a way that,
at least, I find more useful to
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subtract numbers in my head.
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And I do it this way-- it's
not necessarily faster on
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paper, but it allows you to
remember what you're doing.
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Because if you start borrowing
and stuff it becomes very hard
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to remember what's
actually going on.
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So let's try out a
couple of problems.
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Let's have nine thousand four hundred fifty-six minus seven thousand five hundred eighty-nine.
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So the way I do
this in my head.
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I say that nine thousand four hundred fifty-six minus
seven thousand five hundred eighty-nine-- you have to
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remember the two numbers.
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So the first thing I do is
I say, well, what's nine thousand four hundred fifty-six
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minus just seven thousand?
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That's pretty easy because I
just take nine thousand minus seven thousand.
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So what I can do is I'll
cross out this and I'll
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subtract seven thousand from it.
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And I'm going to get two thousand four hundred fifty six.
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So in my head I tell myself
that nine thousand four hundred fifty-six minus seven thousand five hundred eighty-nine is the
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same thing as-- if I just
subtract out the seven thousand--
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as two thousand four hundred fifty-six minus five hundred eighty-nine.
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I took the seven thousand out
of the picture.
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I essentially subtracted it
from both of these numbers.
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Now, if I want to do two thousand four hundred fifty-six
minus five hundred eighty-nine what I do is I
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subtract five hundred from both
of these numbers.
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So if I subtract five hundred from
this bottom number,
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this five will go away.
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And if I subtract five hundred from this
top number, what happens?
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What's two thousand four hundred fifty-six minus five hundred?
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Or an easier way to
think about it?
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What's twenty-four minus five?
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Well, that's nineteen.
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So it's going to be one thousand nine hundred fifty-six.
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Let me scroll up a little bit.
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So it's one thousand nine hundred fifty six.
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So my original problem has now
been reduced to one thousand nine hundred fifty-six minus eighty-nine.
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Now I can subtract eighty from both
that number and that number.
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So if I subtract eighty from this
bottom number the eight disappears.
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Eighty-nine minus eighty is just nine.
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And I subtract eighty from this top
number, I can just think of,
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well, what's one hundred ninety-five minus eight?
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Well, one hundred ninety-five minus eight, let's see.
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Fifteen minus eight is seventeen.
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So one hundred ninety-five minus eight is going
to be one hundred eighty-seven and then you
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still have the six there.
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So essentially I said,
one thousand nine hundred fifty-six minus eighty is one thousand eight hundred seventy-six.
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And now my problem has been
reduced to one thousand eight hundred seventy-six minus nine.
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And then we can do
that in our head.
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What's seventy-six minus nine?
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That's what?
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Sixty-seven.
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So our final answer is one thousand eight hundred sixty-seven.
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And as you can see this isn't
necessarily faster than the way
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we've done it in other videos.
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But the reason why I like it
is that at any stage, I just
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have to remember two numbers.
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I have to remember my
new top number and my
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new bottom number.
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My new bottom number is always
just some of the leftover
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digits of the original
bottom number.
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So that's how I like to
do things in my head.
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Now, just to make sure that we
got the right answer and maybe
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to compare and contrast
a little bit.
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Let's do it the
traditional way.
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Nine thousand four hundred fifty-six minus seven thousand five hundred eighty-nine.
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So the standard way of doing
it, I like to do all my
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borrowing before I do any of my
subtraction so that I can stay
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in my borrowing mode, or you
can think of it as regrouping.
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So I look at all of my numbers
on top and see, are they all
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larger than the numbers
on the bottom?
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And I start here at the right.
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Six is definitely not larger
than nine, so I have to borrow.
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So I'll borrow ten or I'll
borrow one from the tens place,
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which ends up being ten.
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So the six becomes a sixteen and
then the five becomes a four.
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Then I go to the tens place.
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Four needs to be larger than
eight, so let me borrow one
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from the hundreds place.
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So then that four becomes a fourteen
or fourteen tens because
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we're in the tens place.
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And then this four becomes a three.
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Now these two columns or places
look good, but right here I
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have a three, which is
less than a five.
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Not cool, so I have
to borrow again.
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That three becomes a thirteen and
then that nine becomes an eight.
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And now I'm ready to subtract.
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So you get sixteen minus nine is seven.
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Fourteen minus eight is six.
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Thirteen minus five is eight.
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Eight minus seven is one.
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And lucky for us, we
got the right answer.
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I want to make it very clear.
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There's no better
way to do this.
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This way is actually kind of
longer and it takes up more
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space on your paper than this
way was, but this for me,
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is very hard to remember.
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It's very hard for me to keep
track of what I borrowed and
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what the other number
is and et cetera.
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But here, at any point
in time, I just have to
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remember two numbers.
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And the two numbers get
simpler every step that I
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go through this process.
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So this is why I think
that this is a little
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bit easier in my head.
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But this might be, depending on
the context, easier on paper.
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But at least here you didn't
have to borrow or regroup.
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Well, hopefully you find
that a little bit useful.
