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I have a circle here whose
circumference is 18 pi.
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So if we were to measure all
the way around the circle,
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we would get 18 pi.
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And we also have a
central angle here.
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So this is the
center of the circle.
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And this central angle
that I'm about to draw
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has a measure of 10 degrees.
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So this angle right
over here is 10 degrees.
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And what I'm curious
about is the length
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of the arc that subtends
that central angle.
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So what is the length of
what I just did in magenta?
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And one way to think about
it, or actually maybe the way
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to think about it, is
that the ratio of this arc
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length to the entire
circumference--
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let me write this
down-- should be
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the same as the ratio
of the central angle
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to the total number
of angles if you were
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to go all the way around the
circle-- so to 360 degrees.
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So let's just think about that.
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We know the
circumference is 18 pi.
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We're looking for
the arc length.
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I'm just going to call
that a. a for arc length.
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That's what we're going
to try to solve for.
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We know that the central
angle is 10 degrees.
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So you have 10 degrees
over 360 degrees.
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So we could simplify this
by multiplying both sides
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by 18 pi.
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And we get that our arc
length is equal to-- well,
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10/360 is the same
thing as 1/36.
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So it's equal to
1/36 times 18 pi,
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so it's 18 pi over 36, which
is the same thing as pi/2.
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So this arc right
over here is going
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to be pi/2, whatever units
we're talking about, long.
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Now let's think about
another scenario.
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Let's imagine the same circle.
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So it's the same circle here.
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Our circumference
is still 18 pi.
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There are people
having a conference
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behind me or something.
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That's why you might hear
those mumbling voices.
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But this circumference
is also 18 pi.
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But now I'm going to make the
central angle an obtuse angle.
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So let's say we were to
start right over here.
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This is one side of the angle.
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I'm going to go and
make a 350 degree angle.
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So I'm going to go all
the way around like that.
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So this right over here
is a 350 degree angle.
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And now I'm curious
about this arc that
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subtends this really huge angle.
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So now I want to figure out this
arc length-- so all of this.
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I want to figure out this
arc length, the arc that
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subtends this really obtuse
angle right over here.
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Well, same exact logic-- the
ratio between our arc length,
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a, and the circumference of
the entire circle, 18 pi,
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should be the same as the
ratio between our central angle
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that the arc subtends, so
350, over the total number
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of degrees in a
circle, over 360.
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So multiply both sides by 18 pi.
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We get a is equal to-- this
is 35 times 18 over 36 pi.
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350 divided by 360 is 35/36.
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So this is 35 times
18 times pi over 36.
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Well both 36 and 18
are divisible by 18,
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so let's divide them both by 18.
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And so we are left with 35/2 pi.
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Let me just write it
that way-- 35 pi over 2.
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Or, if you wanted to
write it as a decimal,
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this would be 17.5 pi.
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Now does this makes sense?
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This right over here,
this other arc length,
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when our central
angle was 10 degrees,
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this had an arc
length of 0.5 pi.
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So when you add these two
together, this arc length
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and this arc length,
0.5 plus 17.5,
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you get to 18 pi, which was
the circumference, which
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makes complete sense because
if you add these angles, 10
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degrees and 350 degrees, you
get 360 degrees in a circle.
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Khan Academy
