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What is the area of this figure?
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And this figure right
over here is sometimes
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called a kite for
obvious reasons.
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If you tied some
string here, you
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might want to fly
it at the beach.
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And another way to think
about what a kite is,
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it's a quadrilateral that is
symmetric around a diagonal.
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So this right over here is the
diagonal of this quadrilateral.
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And it's symmetric around it.
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This top part and this bottom
part are mirror images.
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And to think about how we
might find the area of it
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given that we've been
given essentially
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the width of this
kite, and we've also
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been given the
height of this kite,
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or if you view this
as a sideways kite,
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you could view this
is the height and that
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the eight centimeters
as the width.
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Given that we've got
those dimensions,
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how can we actually
figure out its area?
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So to do that, let
me actually copy
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and paste half of the kite.
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So this is the bottom
half of the kite.
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And then let's take the
top half of the kite
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and split it up into sections.
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So I have this little
red section here.
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I have this red section here.
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And actually, I'm going to try
to color the actual lines here
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so that we can keep
track of those as well.
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So I'll make this line green
and I'll make this line purple.
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So imagine taking this little
triangle right over here--
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and actually, let me do
this one too in blue.
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So this one over here is blue.
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You get the picture.
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Let me try to color it
in at least reasonably.
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So I'll color it in.
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And then I could make this
segment right over here,
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I'm going to make orange.
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So let's start focusing
on this red triangle here.
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Imagine flipping it over and
then moving it down here.
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So what would it look like?
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Well then the green side is
going to now be over here.
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This kind of mauve colored
side is still on the bottom.
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And my red triangle is going
to look something like this.
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My red triangle is
going to look like that.
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Now let's do the same thing
with this bigger blue triangle.
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Let's flip it over and
then move it down here.
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So this green side, since we've
flipped it, is now over here.
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And this orange side
is now over here.
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And we have this
blue right over here.
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And the reason that we know
that it definitely fits
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is the fact that it is
symmetric around this diagonal,
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that this length
right over here is
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equivalent to this
length right over here.
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That's why it fits
perfectly like this.
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Now, what we just
constructed is clearly
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a rectangle, a rectangle that
is 14 centimeters wide and not
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8 centimeters high, it's
half of 8 centimeters high.
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So it's 8 centimeters times
1/2 or 4 centimeters high.
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And we know how to
find the area of this.
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This is 4 centimeters
times 14 centimeters.
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So the area is equal
to 4 centimeters
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times 14 centimeters which
is equal to-- let's see,
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that's 40 plus 16--
56 square centimeters.
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So if you're taking
the area of a kite,
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you're really just
taking 1/2 the width
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times the height, or 1/2
the width times the height,
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any way you want
to think about it.
