WEBVTT

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In this video, we're going to be
looking at polar.

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Coordinates.
Let's begin by actually

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looking at another coordinate
system. The Cartesian coordinate

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system. Now in that system we

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take 2. Axes and X axis
which is horizontal.

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And Y Axis which is vertical and
a fixed .0 called the origin,

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which is where these two points
cross. These two lines cross.

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Now we fix a point P in
the plane by saying how far it's

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displaced along the X axis to
give us the X coordinate.

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And how far it's displaced along
the Y access to give us the Y

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coordinate and so we have.

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A point P which is uniquely
described by its coordinates XY

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and notice I said how far it's
displaced because it is

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displacement that we're talking
about and not distance. That's

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what these arrowheads that we
put on the axes are all about

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their about showings, in which
direction we must move so that

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if we're moving down this
direction, it's a negative

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distance and negative
displacement that we're making.

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Now that is more than one way of
describing where a point is in

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the plane. And we're going to
be having a look at a system

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called polar coordinates.

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So in this system of polar
coordinates, we take a poll. Oh,

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and we take a fixed line.

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Now, how can we describe a point
in the plane using this fixed

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.0? The pole and this baseline.
Here. One of the ways is to

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think of it as. What if we turn?

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Around. Centering on oh
for the moment we rotate around,

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we can pass through a fixed
angle. Let's call that theater.

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And then along this radius we
can go a set distance.

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And we'll end up at a point P.

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And so the coordinates of that
point would be our theater, and

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this is our system of polar.

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Coordinates.

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Now, just as we've got certain
conventions with Cartesian

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coordinates, we have certain
conventions with polar

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coordinates, and these are quite
strong conventions, so let's

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have a look at what these are.
First of all, theater is

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measured. In

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radians. So
that's how first convention

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theater is measured in radians.

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2nd convention

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well. Our second convention
is this that if this is our

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initial line and this is our
poll, then we measure theater

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positive when we go round in

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that direction. Anticlockwise
and we measure theater negative.

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When we go around in
that direction which is

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clockwise. So in just the same
way as we had an Arrowhead on

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our axes X&Y. In a sense, we've
got arrowheads here,

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distinguishing a positive
direction for theater and a

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negative direction for measuring

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theater. We have 1/3
convention to do with theater

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and that is that we never go
further round this way.

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Number there's our poll. Oh, our
fixed point. We never go further

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around this way then there, so
theater is always less than or

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equal to pie and we never go
round further that way than

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there again. So theater is
always strictly greater than

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minus Π - Π ramped there plus Π
round to there. And notice that

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we include. This bit of the line
if you like this extended bit of

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the line by going route to their
having the less than or equal to

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and having strictly greater than
Theta strictly greater than

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minus pie there.

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1/4 Convention 1/4
convention is that

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our is always

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positive. One of the things that
is quite important is that we be

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able to move from one system of
coordinates to another. So the

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question is if we have.

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A point. In our

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XY plane.
Who's coordinates are

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X&Y? How can we
change from cartesians into

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pohlers? And how can we change
back again, but one obvious

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thing to do is to associate the
pole with the origin, and then

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to associate the initial line
with the X axis.

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And then if we draw the radius
out to pee.

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And that's our.

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And that is the angle theater.

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So we can see that in
Cartesians, we're

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describing it as XY, and
in Pohlers, where

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describing it as our
theater. So what's the

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relationship between them?

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Let's drop that perpendicular
down and we can see that this is

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a height. Why? Because of the Y
coordinate the point and this is

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at a distance X because of the X
coordinate of the point.

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And looking at that, we can see
that Y is equal to R sign

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theater and X is equal to our
cause theater. So given R and

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Theta, we can calculate X&Y.
What about moving the other way

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will from Pythagoras? We can see
that X squared plus Y squared is

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equal to R-squared. So give now

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X. I'm now why we can
calculate all and we can also

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see that if we take the
opposite over the adjacent, we

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have Y over X is equal to 10
theater. So given AY in an X,

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we can find out what theater
is.

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Now.

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Always when doing these, it's
best to draw sketches. If we're

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converting from one sort of
point in Cartesians to its

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equivalent in Pohlers, or if
we're moving back from Pohlers

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to cartesians, draw a picture,
see where that point actually is

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now. Want to have a look at some
examples. First of all, we're

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going to have a look at how to

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plot points. Then we're going to
have a look at how to convert

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from one system into the other
and vice versa. So let's begin

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with plotting. Plot.

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And what I'm going to do is I'm
going to plot the following

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points and they're all in polar

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coordinates. I'm going to put
them all on the same

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picture so we can get
a feel for whereabouts things

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are in the polar play
or the plane for the

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polar coordinates. So we put
our poll, oh.

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And we have our initial line.

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First one that we've got to plot

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is 2. Pie so we know
that Pi is the angle all the

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way around here, so there's pie
to there and we want to go

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out to units.

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So it's there. This
is the .2.

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Pie.

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Next to .1 N wealthy to is 0 so
we're on the initial line.

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An one will be about there,
so there is the .1 note.

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2 - Π by 3 - π by
3 means come around this

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way, and so minus π by
three is about there, and

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we're coming around there
minus π by three, and we

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want to come out a distance
to, so that's roughly 2 out

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there, so this would be the
.2 - π by 3.

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And finally, we've got the
point. One 2/3 of Π. So we take

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the 2/3. That's going all the

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way around. To there.

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And we draw out through there,
and we want a distance of one

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along there, which roughly
called the scale we're using is

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about there, and so that's the

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.1. 2/3 of Π.

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Notice that we've taken theater
first to establish in which

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direction were actually facing.

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OK, let's now have a

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look. Having got used to
plotting points, let's now have

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a look in polar coordinates.
These points 2.

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Minus Π by 2.

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1.
3/4 of

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Π. And 2
- π by three. Now these

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are all in Pohlers.

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What I want to do is convert
them into cartesian coordinates.

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So first a picture whereabouts
are they? And I'll do them one

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at a time. So let's take this
one 2 - π by two initial point

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poll. Oh, and initial line.

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Minus Π by two? Well, that's
coming down here.

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To there. So that's minus
π by two, and we've

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come a distance to to

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there. Well, we don't need to do
much calculation. I don't think

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to find this. If again we take
our origin for our cartesians as

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being the pole, and we align the
X axis with our initial line.

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And there's our X. There's RY
and we can see straight away the

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point in Pohlers that's 2 - π
by two in fact, goes to the

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point. In Cartesians, That's 0 -
2 because it's this point here

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on the Y axis, and it's 2
units below the X axis, so it's

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0 - 2.

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Notice how plotting the point
actually saved as having to do

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any of the calculations. So
let's take the next point now,

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which was one 3/4 of Π.

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1 3/4 of π. So
again, let's plot where it

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is. Take our initial.

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.0 our poll and our initial line
3/4 of π going round. It's

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positive so it drought there be
somewhere out along that.

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Direction there's our angle of
3/4 of Π, where somewhere out

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here at a distance one unit.
So again, let's take our X&Y

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axes, our X axis.

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To be along the initial line.

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And now why access to be
vertical and through the pole?

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Oh So that the polo becomes our
origin of, and it's this point.

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But where after?

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Now how we going to work
this out that remember the

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formula that we had was X
equals our cause theater.

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Let's have a look at that.
Are is one an we've got

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cause of 3/4 of Π and
the cosine of 3/4 of Π

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is minus one over Route 2,
so that's minus one over Route

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2. Why is our sign Theta?

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And so this is one times the
sign of 3/4 of Π and the sign

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of 3/4 of Π is just one over
Route 2, and so we have one over

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Route 2 for RY coordinate. And
notice that these answers agree

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with where the point is in this
particular quadrant. Negative X

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and positive Y, negative X and
positive Y so.

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Even if I've got the calculation
wrong in the sense that I, even

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if I've done the arithmetic
wrong, have no, I've got the

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point in the right quadrant.

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Let's have a look at the
last one of these two.

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Minus Π by

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3. So again, our poll.

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Our initial line.

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Minus Π by three is around here.

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So we've come around there minus
π by three, and we're out a

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distance, two along there.

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Take our X axis to coincide with
the initial line.

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And now origin.

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Coincide with the pole.

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Let's write down our equations
that tell us X is

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our cause theater, which is
2 times the cosine of

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minus π by three, which
is equal to 2.

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Times Now we want the cause
of minus π by three and

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the cosine of minus π by
three is 1/2, and so that

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gives US1.

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Why is equal to our

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sign theater? Which is 2 times
the sign of minus π by three,

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which is 2 Times Now we want the
sign of my minus Pi π three, and

00:17:24.865 --> 00:17:31.235
that is minus Route 3 over 2.
The two is cancelled to give us

00:17:31.235 --> 00:17:32.600
minus Route 3.

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And so again, notice we know
that we've got it in the right

00:17:37.628 --> 00:17:41.434
quadrant. 'cause when we drew
the diagram, we have positive X

00:17:41.434 --> 00:17:44.894
and negative Y, and that's how
we've ended up here.

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What do we do about going back
the other way?

00:17:51.650 --> 00:17:59.054
Well, let's have a look at
some examples that will do that

00:17:59.054 --> 00:18:05.238
for us. What I'm going to look
at as these points, which are

00:18:05.238 --> 00:18:11.230
cartesians. The .22 point
minus 3 four.

00:18:12.010 --> 00:18:17.890
The point minus 2 -
2 Route 3.

00:18:18.730 --> 00:18:25.150
And the .1 - 1 now these
are all points in Cartesian's.

00:18:25.150 --> 00:18:28.360
So let's begin with this one.

00:18:29.060 --> 00:18:32.228
Show where it is.

00:18:32.740 --> 00:18:38.920
To begin with, on the cartesian
axes so it's at 2 for X and two

00:18:38.920 --> 00:18:40.980
for Y. So it's there.

00:18:42.220 --> 00:18:48.110
So again.
We'll associate the origin in

00:18:48.110 --> 00:18:53.236
Cartesians with the pole in
polar's, and the X axis, with

00:18:53.236 --> 00:18:58.828
the initial line and what we
want to calculate is what's that

00:18:58.828 --> 00:19:01.158
angle there an what's that

00:19:01.158 --> 00:19:03.550
radius there? Well.

00:19:04.060 --> 00:19:09.400
All squared is equal to X
squared plus Y squared.

00:19:10.890 --> 00:19:17.845
So that's 2 squared +2 squared,
keeps us 8 and so are is

00:19:17.845 --> 00:19:20.520
equal to 2 Route 2.

00:19:21.260 --> 00:19:23.416
When we take the square root of

00:19:23.416 --> 00:19:31.065
8. What about theater? Well,
tan Theta is equal to

00:19:31.065 --> 00:19:33.270
Y over X.

00:19:33.870 --> 00:19:41.010
In this case it's two over
2, which is one, and so

00:19:41.010 --> 00:19:46.960
theater is π by 4, and
so therefore the polar

00:19:46.960 --> 00:19:52.910
coordinates of this point are
two route 2π over 4.

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Let's have a look at this one
now, minus 3 four.

00:20:00.750 --> 00:20:05.310
Let's

00:20:05.310 --> 00:20:13.954
begin.
By establishing whereabouts it

00:20:13.954 --> 00:20:17.238
is on our cartesian

00:20:17.238 --> 00:20:22.318
axes. Minus 3 means it's back
here somewhere, so there's

00:20:22.318 --> 00:20:28.454
minus three and the four on
the Y. It's up there, so I'll

00:20:28.454 --> 00:20:29.870
point is there.

00:20:32.450 --> 00:20:39.665
Join it up to the origin as our
point P and we are after. Now

00:20:39.665 --> 00:20:44.956
the polar coordinates for this
point. So again we associate the

00:20:44.956 --> 00:20:50.728
pole with the origin and the
initial line with the X axis,

00:20:50.728 --> 00:20:56.019
and so there's the value of
theater that we're after. And

00:20:56.019 --> 00:21:01.791
this opie is the length are that
were after, so R-squared is

00:21:01.791 --> 00:21:03.715
equal to X squared.

00:21:03.740 --> 00:21:10.592
Plus Y squared, which in this
case is minus 3 squared, +4

00:21:10.592 --> 00:21:18.586
squared. That's 9 + 16, gives us
25, and so R is the square

00:21:18.586 --> 00:21:22.583
root of 25, which is just five.

00:21:23.210 --> 00:21:27.560
What about finding
theater now well?

00:21:28.640 --> 00:21:30.968
Tan Theta is.

00:21:32.100 --> 00:21:34.839
Y over X.

00:21:35.880 --> 00:21:37.488
Which gives us.

00:21:38.480 --> 00:21:41.948
4 over minus three.

00:21:42.510 --> 00:21:47.119
Now when you put that into your
Calculator, you will get.

00:21:47.720 --> 00:21:53.110
A slightly odd answers. It will
actually give you a negative

00:21:53.110 --> 00:21:56.130
answer. That might be
difficult for you to

00:21:56.130 --> 00:21:58.470
interpret. It sits actually
telling you this angle out

00:21:58.470 --> 00:21:58.730
here.

00:21:59.890 --> 00:22:06.415
And we want to be all the way
around there now the way that I

00:22:06.415 --> 00:22:11.635
think these are best done is
actually to look at a right

00:22:11.635 --> 00:22:16.420
angle triangle like this and
call that angle Alpha. Now let's

00:22:16.420 --> 00:22:23.380
have a look at what an Alpha is.
Tan Alpha is 4 over 3 and when

00:22:23.380 --> 00:22:28.165
you put that into your
Calculator it will tell you that

00:22:28.165 --> 00:22:29.905
Alpha is nought .9.

00:22:29.920 --> 00:22:36.300
Three radians. Remember, theater
has to be in radians and

00:22:36.300 --> 00:22:43.074
therefore. Theater here is
equal to π minus

00:22:43.074 --> 00:22:49.490
Alpha, and so that's
π - 4.9. Three,

00:22:49.490 --> 00:22:52.698
which gives us 2.2

00:22:52.698 --> 00:22:58.202
one radians. And that's
theater so you can see that

00:22:58.202 --> 00:23:02.292
the calculation of our is
always going to be relatively

00:23:02.292 --> 00:23:05.155
straightforward, but the
calculation this angle theater

00:23:05.155 --> 00:23:10.063
is going to be quite tricky,
and that's one of the reasons

00:23:10.063 --> 00:23:14.562
why it's best to plot these
points before you try and

00:23:14.562 --> 00:23:16.198
workout what theater is.

00:23:17.850 --> 00:23:21.765
Now the next example was the
point minus 2.

00:23:22.580 --> 00:23:25.980
Minus 2 Route 3.

00:23:26.730 --> 00:23:28.100
So again.

00:23:30.830 --> 00:23:36.147
Let's have a look where it is in
the cartesian plane. These are

00:23:36.147 --> 00:23:40.646
its cartesian coordinates, so
we've minus two for X. So we

00:23:40.646 --> 00:23:45.554
somewhere back here and minus 2
route 3 four Y. So where

00:23:45.554 --> 00:23:48.826
somewhere down here? So I'll
point is here.

00:23:49.690 --> 00:23:52.690
Join it up to our origin.

00:23:53.600 --> 00:23:55.828
Marking our point P.

00:23:56.380 --> 00:24:02.395
Again, we'll take the origin to
be the pole and the X axis to be

00:24:02.395 --> 00:24:07.207
the initial line, and we can see
that the theater were looking

00:24:07.207 --> 00:24:08.811
for is around there.

00:24:09.510 --> 00:24:12.825
That's our theater, and here's

00:24:12.825 --> 00:24:18.876
our. So again, let's
calculate R-squared that's X

00:24:18.876 --> 00:24:21.508
squared plus Y squared.

00:24:22.200 --> 00:24:29.328
Is equal to. Well, in this
case we've got minus two all

00:24:29.328 --> 00:24:36.456
squared plus minus 2 route 3
all squared, which gives us 4

00:24:36.456 --> 00:24:43.536
+ 12. 16 and so R is equal
to the square root of 16, which

00:24:43.536 --> 00:24:44.892
is just 4.

00:24:45.730 --> 00:24:50.867
Now, what about this? We can
see that theater should be

00:24:50.867 --> 00:24:55.070
negative, so let's just
calculate this angle as an

00:24:55.070 --> 00:24:59.273
angle in a right angle
triangle. So tan Alpha

00:24:59.273 --> 00:25:03.943
equals, well, it's going to
be the opposite, which is

00:25:03.943 --> 00:25:05.344
this side here.

00:25:07.300 --> 00:25:13.324
2 Route 3 in length over the
adjacent, which is just two

00:25:13.324 --> 00:25:20.352
which gives us Route 3. So Alpha
just calculated as an angle is π

00:25:20.352 --> 00:25:27.380
by three. So if that's pie by
three this angle in size is 2π

00:25:27.380 --> 00:25:32.902
by three, but of course we must
measure theater negatively when

00:25:32.902 --> 00:25:37.922
we come clockwise from the
initial line, and so Theta.

00:25:37.950 --> 00:25:44.255
Is minus 2π by three the 2π
three giving us the size the

00:25:44.255 --> 00:25:50.075
minus sign giving us the
direction so we can see that the

00:25:50.075 --> 00:25:55.895
point we've got described as
minus 2 - 2 route 3 in

00:25:55.895 --> 00:26:03.170
Cartesians is the .4 - 2π over 3
or minus 2/3 of Π in Pollas.

00:26:03.970 --> 00:26:08.470
Now we've taken a point in this
quadrant. A point in this

00:26:08.470 --> 00:26:12.220
quadrant appointing this
quadrant. Let's have a look at a

00:26:12.220 --> 00:26:16.720
point in the fourth quadrant
just to finish off this set of

00:26:16.720 --> 00:26:20.470
examples and the point we chose
was 1 - 1.

00:26:21.490 --> 00:26:22.650
So again.

00:26:24.320 --> 00:26:29.060
Let's have a look at where it is
in our cartesian system.

00:26:30.020 --> 00:26:35.090
So we've a value of one 4X
and the value of minus one

00:26:35.090 --> 00:26:39.770
for Y. So there's our point
P. Join it to the origin.

00:26:40.790 --> 00:26:45.510
And again will associate the
origin in the Cartesian's with

00:26:45.510 --> 00:26:50.230
the pole of the polar
coordinates and the initial line

00:26:50.230 --> 00:26:55.894
will be the X axis, so we're
looking for this angle theater.

00:26:57.010 --> 00:27:00.290
And this length of OP.

00:27:02.020 --> 00:27:07.487
So all squared is equal to X
squared plus Y squared.

00:27:08.130 --> 00:27:14.478
So that's one squared plus minus
one squared, and that's one plus

00:27:14.478 --> 00:27:19.768
one is 2 so far is equal
to Route 2.

00:27:20.510 --> 00:27:24.713
Let's not worry about the
direction here. Let's just

00:27:24.713 --> 00:27:28.916
calculate the magnitude of
theater well. The magnitude of

00:27:28.916 --> 00:27:34.053
theater, in fact, to do that,
I'd rather actually call it

00:27:34.053 --> 00:27:39.190
Alpha, just want to calculate
the magnitude. So tan Alpha is.

00:27:39.860 --> 00:27:45.896
Opposite, which is one over the
adjacent, which is one which is

00:27:45.896 --> 00:27:52.938
just one. So Alpha is in fact
Π by 4. That means that my

00:27:52.938 --> 00:27:58.471
angle theater for the coordinate
coming around this way is minus

00:27:58.471 --> 00:28:04.507
π by 4, and so my polar
coordinates for this point, our

00:28:04.507 --> 00:28:08.028
Route 2 and minus π by 4.

00:28:08.760 --> 00:28:15.126
So. We've seen here why it's
so important to plot your points

00:28:15.126 --> 00:28:17.406
before you do any calculation.

00:28:18.110 --> 00:28:21.854
Having looked at what happens
with points, let's see if we can

00:28:21.854 --> 00:28:25.910
now have a look at what happens
to a collection of points. In

00:28:25.910 --> 00:28:27.158
other words, a curve.

00:28:28.000 --> 00:28:31.210
Let's take a very simple curve

00:28:31.210 --> 00:28:37.398
in Cartesians. X squared plus Y
squared equals a squared.

00:28:37.950 --> 00:28:42.430
Now this is a circle, a
circle centered on the

00:28:42.430 --> 00:28:44.222
origin of Radius A.

00:28:45.260 --> 00:28:47.096
So if we think about that.

00:28:49.650 --> 00:28:56.982
Circle centered on the origin of
radius a, so it will go through.

00:28:57.930 --> 00:29:01.470
These points on the axis.

00:29:09.150 --> 00:29:10.080
Like so.

00:29:11.580 --> 00:29:16.910
If we think about what that
tells us, it tells us that no

00:29:16.910 --> 00:29:18.960
matter what the angle is.

00:29:22.220 --> 00:29:24.770
For any one of our points.

00:29:26.640 --> 00:29:32.412
If we were thinking in Pohlers,
the radius is always a constant.

00:29:32.412 --> 00:29:39.146
So if we were to guess at the
polar equation, it would be our

00:29:39.146 --> 00:29:44.918
equals A and it wouldn't involve
theater at all. Well, it just

00:29:44.918 --> 00:29:51.171
check that we know that X is
equal to our cause theater, and

00:29:51.171 --> 00:29:55.019
we know that Y is equal to our

00:29:55.019 --> 00:30:01.549
sign Theta. So we can
substitute these in R-squared

00:30:01.549 --> 00:30:07.642
cost, Square theater plus
R-squared. Sine squared Theta is

00:30:07.642 --> 00:30:14.412
equal to a squared. We
can take out the R-squared.

00:30:16.770 --> 00:30:24.100
And that leaves us with
this factor of Cos squared

00:30:24.100 --> 00:30:26.299
plus sign squared.

00:30:26.410 --> 00:30:31.162
Now cost squared plus sign
squared is a well known identity

00:30:31.162 --> 00:30:36.346
cost squared plus sign squared
at the same angle is always one,

00:30:36.346 --> 00:30:41.098
so this just reduces two
R-squared equals a squared or R

00:30:41.098 --> 00:30:46.282
equals AR is a constant, which
is what we predicted for looking

00:30:46.282 --> 00:30:49.738
at the situation there now.
Another very straightforward

00:30:49.738 --> 00:30:54.922
curve is the straight line Y
equals MX. Let's just have a

00:30:54.922 --> 00:30:56.218
look at that.

00:30:56.760 --> 00:31:01.140
Y equals MX is a straight line
that goes through the origin.

00:31:02.550 --> 00:31:07.518
Think about it, is it has a
constant gradient and of course

00:31:07.518 --> 00:31:12.900
M. The gradient is defined to be
the tangent of the angle that

00:31:12.900 --> 00:31:17.454
the line makes with the positive
direction of the X axis.

00:31:18.060 --> 00:31:22.361
So if the gradient is a
constant, the tangent of the

00:31:22.361 --> 00:31:27.444
angle is a constant, and so this
angle theater is a constant. So

00:31:27.444 --> 00:31:31.745
let's just have a look at that.
Why is we know?

00:31:32.350 --> 00:31:39.630
All. Sign
Theta equals M times

00:31:39.630 --> 00:31:43.534
by our cause theater.

00:31:44.490 --> 00:31:51.224
The ask cancel out and so I
have sign theater over Cos Theta

00:31:51.224 --> 00:31:58.423
equals M. And so I
have tan Theta equals M and

00:31:58.423 --> 00:32:01.558
so theater does equal a

00:32:01.558 --> 00:32:08.256
constant. But and here there is
a big bot for Y equals MX.

00:32:08.256 --> 00:32:13.129
That's the picture that we get
if we're working in Cartesians.

00:32:13.840 --> 00:32:20.033
But if we're working in Pohlers,
there's our poll. There's our

00:32:20.033 --> 00:32:25.663
initial line Theta equals a
constant. There is the angle

00:32:25.663 --> 00:32:33.056
Theta. And remember, we do not
have negative values of R and so

00:32:33.056 --> 00:32:39.888
we get a half line. In other
words, we only get this bit of

00:32:39.888 --> 00:32:45.084
the line. The half line there.
That simple example should

00:32:45.084 --> 00:32:49.957
warnors that whenever we are
moving between one sort of curve

00:32:49.957 --> 00:32:53.944
in cartesians into its
equivalent in polar's, we need

00:32:53.944 --> 00:32:58.374
to be very careful about the
results that we get.

00:32:59.140 --> 00:33:05.185
So let's just have a look at a
couple more examples. Let's take

00:33:05.185 --> 00:33:11.695
X squared plus. Y squared is
equal to 9. We know that X is

00:33:11.695 --> 00:33:15.880
our cause theater. And why is
our sign theater?

00:33:16.720 --> 00:33:23.170
We can plug those in R-squared,
Cos squared Theta plus

00:33:23.170 --> 00:33:25.750
R-squared, sine squared Theta

00:33:25.750 --> 00:33:29.300
equals 9. All squared is a

00:33:29.300 --> 00:33:35.246
common factor. So we can take it
out and we've got cost squared

00:33:35.246 --> 00:33:40.238
Theta plus sign squared. Theta
is equal to 9 cost squared plus

00:33:40.238 --> 00:33:45.230
sign squared is an identity cost
squared plus sign squared of the

00:33:45.230 --> 00:33:50.638
same angle is always one, and so
R-squared equals 9. R is equal

00:33:50.638 --> 00:33:53.550
to three IE a circle of radius

00:33:53.550 --> 00:33:56.455
3. Let's

00:33:56.455 --> 00:34:03.265
take. The
rectangular hyperbola XY is

00:34:03.265 --> 00:34:05.830
equal to 4.

00:34:06.280 --> 00:34:13.168
And again, we're going to use
X equals our cause theater and

00:34:13.168 --> 00:34:18.908
Y equals R sign theater. So
we're multiplying X&Y together.

00:34:18.908 --> 00:34:25.222
So when we do that, we're
going to have our squared.

00:34:25.290 --> 00:34:32.870
Sign theater
Cos Theta equals 4.

00:34:34.350 --> 00:34:41.936
Now. Sign Theta Cos
Theta will twice sign tita cost

00:34:41.936 --> 00:34:45.156
theater would be signed to

00:34:45.156 --> 00:34:51.006
theater. But I've taken 2 lots
there, so if I've taken 2 lots

00:34:51.006 --> 00:34:54.889
there, it's the equivalent of
multiplying that side by two. So

00:34:54.889 --> 00:34:57.007
I've got to multiply that side

00:34:57.007 --> 00:34:59.386
by two. So I end up with that.

00:35:00.580 --> 00:35:01.819
For my equation.

00:35:02.670 --> 00:35:06.856
I still some the other way round
now, but one point to notice

00:35:06.856 --> 00:35:10.730
before we do. Knowledge of
trig identity's is very

00:35:10.730 --> 00:35:14.105
important. We've used cost
squared plus sign. Squared is

00:35:14.105 --> 00:35:18.605
one and we've now used sign to
Theta is equal to two

00:35:18.605 --> 00:35:21.980
scientist accosts theater. So
knowledge of those is very

00:35:21.980 --> 00:35:26.855
important. So as I said, let's
see if we can turn this around

00:35:26.855 --> 00:35:31.355
now and have a look at some
examples going the other way.

00:35:32.660 --> 00:35:39.954
First one will take is 2 over,
R is equal to 1 plus cause

00:35:39.954 --> 00:35:45.930
theater. I don't like really the
way it's written, so let's

00:35:45.930 --> 00:35:51.762
multiply up by R so I get R
Plus R cause theater.

00:35:52.540 --> 00:35:57.530
Now, because I've done that,
let's just remember that are

00:35:57.530 --> 00:36:02.021
squared is equal to X squared
plus Y squared.

00:36:03.080 --> 00:36:09.968
So that means I can replace
this are here by the square

00:36:09.968 --> 00:36:13.412
root of X squared plus Y

00:36:13.412 --> 00:36:19.595
squared. Our costs theater.
Will, our Cos Theta is equal

00:36:19.595 --> 00:36:25.145
to X so I can replace this
bit by X.

00:36:26.420 --> 00:36:31.136
Now it looks untidy's got a
square root in it, so naturally

00:36:31.136 --> 00:36:36.638
we would want to get rid of that
square root. So let's take X

00:36:36.638 --> 00:36:38.210
away from each side.

00:36:38.370 --> 00:36:44.090
And then let's Square both
sides. So that gives us X

00:36:44.090 --> 00:36:50.850
squared plus Y squared there and
on this side it's 2 minus X

00:36:50.850 --> 00:36:57.610
all squared, which will give us
4 - 4 X plus X squared.

00:36:58.170 --> 00:37:04.570
So I've got an X squared on each
side that will go out and so I'm

00:37:04.570 --> 00:37:08.970
left with Y squared is equal to
4 - 4 X.

00:37:10.410 --> 00:37:15.503
And what you should notice there
is that actually a parabola.

00:37:16.180 --> 00:37:22.251
So this would seem to be the
way in which we define a

00:37:22.251 --> 00:37:24.119
parabola in polar coordinates.