-
Let's say I have two
intersecting line segments.
-
So let's call that segment AB.
-
And then I have segment CD.
-
So that is C and that is D. And
they intersect right over here
-
at point E. And let's
say we know, we're given,
-
that this angle right over here,
that the measure of angle--
-
That B is kind of, I don't know
why I wrote it so far away.
-
So let me make that
a little bit closer.
-
Let me make that B
a little bit closer.
-
So let's say-- I'll
do that in yellow.
-
Let's say that we know that
the measure of this angle
-
right over here,
angle BED, let's
-
say that we know that
measure is 70 degrees.
-
Given that information,
what I want to do,
-
based only on what
we know so far
-
and not using a protractor,
what I want to do
-
is figure out what the other
angles in this picture are.
-
So what's the measure of angle
CEB, the measure of angle AEC,
-
and the measure of angle AED?
-
So the first thing
that you might
-
notice when you
look at this, I've
-
already told you that
this is a line segment
-
and that this is a line segment.
-
You see that angle BED and
angle CEB are adjacent.
-
And we also see that if
you take the outer sides
-
of those angles, it
forms a straight angle.
-
And we also see that angle
CED is a straight angle.
-
So we know that these two angles
must also be supplementary.
-
They're next to each other
and they form a straight angle
-
when you take their outer sides.
-
So we know that angle BED and
angle CEB are supplementary,
-
which means they add up to,
or that their measures add up
-
to 180 degrees.
-
Supplementary angles.
-
Which tells us that
the measure of angle
-
BED plus the measure
of angle CEB--
-
and I keep writing measure here.
-
Sometimes you'll just
see people write,
-
angle BED plus angle CEB
is equal to 180 degrees.
-
Now we already know the measure
of angle BED is 70 degrees.
-
So we already know that
this thing right over here
-
is 70 degrees.
-
And so 70 degrees plus
the measure of angle CEB
-
is 180 degrees.
-
You subtract 70 from
both sides, and we
-
get the measure of angle
CEB is equal to 110 degrees.
-
I just subtracted 70
from both sides of that.
-
So we figured out that this
right over here is 110 degrees.
-
Well, that's interesting.
-
And I went through
more steps than you
-
would if you were doing
this problem quickly.
-
If you did this problem quickly
in your head, you'd say,
-
look this is 70 degrees,
this angle plus this angle
-
would be 180 degrees, so
this has to be 110 degrees.
-
So now let's use the
same logic to figure out
-
what angle CEA is.
-
So now we care about the
measure of angle CEA.
-
And we can use the exact same
logic that we used over here.
-
Angle CEA and angle
CEB, they are adjacent.
-
They form a straight angle,
if you look at their outsides,
-
so they must be supplementary.
-
They form a straight
angle right over here.
-
So they're supplementary.
-
So they must add
up to 180 degrees.
-
So the measure of angle CEA
plus the measure of angle CEB,
-
which is 110 degrees, must
be equal to 180 degrees.
-
So once again, subtract
110 from both sides.
-
You get the measure of angle
CEA is equal to 70 degrees.
-
So this one right over
here is also 70 degrees.
-
And what we'll learn
in the next video
-
is that this is no coincidence.
-
These two angles, angle
CEA and angle BED,
-
sometimes they're called
opposite angles-- well,
-
I have often called
them opposite angles,
-
but the more correct term
for them is vertical angles.
-
And we haven't proved it.
-
We've just seen a
special case here
-
where these vertical
angles are equal.
-
But it actually turns out that
vertical angles are always
-
equal.
-
But we haven't proved it to
ourselves for the general case.
-
But let me just
write down this word
-
since it's a nice new word.
-
So angle CEA and angle
BED are vertical.
-
And you might say, wait, they
look like they're horizontal,
-
they're next to each other.
-
And the vertical
really just means
-
that they're across
from each other,
-
across an intersection
from each other.
-
Angle CEB and angle
AED are also vertical.
-
So let me write that down.
-
Angle CEB and angle
AED are also vertical.
-
And that might even make
a little bit more sense,
-
because it literally is, one
is on top and one is on bottom.
-
They're kind of vertically
opposite from each other.
-
But these horizontally
opposite angles
-
are also called vertical angles.
-
So now we have one angle left
to figure out, angle AED.
-
And based on what
I already told you,
-
vertical angles tend to be,
or they are always, equal.
-
But we haven't proven that to
ourselves yet so we can't just
-
use that property to say
that this is 110 degrees.
-
So what we're going to do
is use the exact same logic.
-
CEA and AED are
clearly supplementary.
-
Their outsides form
a straight angle.
-
They're clearly
supplementary, so CEA and AED
-
must add up to 180 degrees.
-
Or we could say the
measure of angle AED
-
plus the measure of angle CEA
must be equal to 180 degrees.
-
We know the measure
of CEA is 70 degrees.
-
We know it is 70 degrees.
-
So you subtract 70
from both sides.
-
You get the measure of angle
AED is equal to 110 degrees.
-
So we got the exact
result that we expected.
-
So this angle right over
here is 110 degrees.
-
And so if you take any
of the adjacent angles
-
that their outer sides
form a straight angle,
-
you see they add up to 180.
-
This one and that
one add up to 180.
-
This one and that
one add up to 180.
-
This one and that
one add up to 180.
-
And this one and that
one add up to 180.
-
If you go all the way
around the circle,
-
you'll see that they
add up to 360 degrees.
-
Because you literally are
going all the way around.
-
So 70 plus 110 is
180, plus 70 is 250,
-
plus 110 is 360 degrees.
-
I'll leave you there.
-
This is the first
time that we've
-
kind of found some interesting
results using the tool
-
kit that we've built up so far.
-
In the next video,
we'll actually
-
prove to ourselves using pretty
much the exact same logic here,
-
but we'll just do it with
generalized numbers--
-
we won't use 70
degrees-- to prove
-
that the measure of
vertical angles are equal.
Khan Academy
