-
-
PROFESSOR: We will pick
up from where we left.
-
I hope the attendance will
get a little bit better today.
-
It's not even Friday,
it's Thursday night.
-
So last time we talked a
little bit about chapter 13,
-
we started 13-1.
-
I wanted to remind you that we
revisited the notion of work.
-
-
Now, if you notice
what the book does,
-
it doesn't give
you any specifics
-
about the force field.
-
May the force be with you.
-
They don't say what kind
of animal this f is.
-
We sort of informally
said I'm going to have
-
some sort of path integral.
-
And I didn't say what conditions
I was assuming about f.
-
And I just said that r
is the position vector.
-
-
It's important for us to
imagine that is plus c1, what
-
does that mean, c1?
-
It means that this function,
let's write it R of t, equals.
-
Let's say we are implying not
in space, so we have x of t,
-
y of t, the parametrization
of this position vector.
-
Of course we wrote that
last time as well, we
-
said x is x of t, y is y of t.
-
But why I took c1
and not continuous?
-
Could anybody tell me?
-
If I'm going to go ahead
and differentiate it,
-
of course I'd like it
to be differentiable.
-
And its derivatives
should be continuous.
-
But that's actually not
enough for my purposes.
-
So if I want R of t
to be c1, that's good,
-
I'm going to smile.
-
But when we did that in
chapter-- was it chapter 10?
-
It was chapter 10,
Erin, am I right?
-
We assumed this was
a regular curve.
-
A regular curve is not
just as differentiable
-
with the derivative's
continuous with respect to time.
-
x prime of t, y prime
of t, both must exist
-
and must be continuous.
-
We wanted something
else about the velocity.
-
Do you remember the drunken bug?
-
The drunken but was
fine and he was flying.
-
As long as he was flying,
everything was fine.
-
When did the drunken
bug have a problem?
-
When the velocity
field became 0,
-
at the instant where the bug
lost his velocity, right?
-
So we said regular means c1 and
R prime of t at any value of t
-
should be different from 0.
-
We do not allow the particle
to stop on it's way.
-
We don't allow it, whether it
is a photon, a drunken bug,
-
an airplane, or whatever it is.
-
We don't want it to
stop in it's trajectory.
-
Is that good for
other reasons as well?
-
Very good for the
reason that we want
-
to think later in arc length.
-
[INAUDIBLE] came up with
this idea last time.
-
I didn't want to tell you
the truth, but he was right.
-
One can define certain
path integrals with respect
-
to s, with respect to
arc length parameter.
-
But as you remember
very well, he
-
had this correspondence between
an arbitrary parameter type t
-
and s, and this is s of t.
-
And also going back
and forth, that
-
means from s you head back to t.
-
So here's s of t and
this is t of s, right?
-
So we have this correspondence
and everything worked fine
-
in terms of being
able to invert that.
-
And having some sort
of equal morphisms
-
as long as the
velocity was non-0.
-
OK, do you remember
who s of t was?
-
S of t was defined--
It was a long time ago.
-
So I'm reminding you
s of t was integral
-
from 0 to t-- or from t0 to t.
-
Your favorite initial
moment in time.
-
Of the speed, uh-huh, and
what the heck was the speed?
-
The speed was the norm or the
length of the R prime of t.
-
This is called speed, that
we assume different from 0,
-
for a good purpose.
-
We can go back and forth
between t and s, t to s,
-
s to t, with
differentiable functions.
-
Good, so now we can apply the
inverse mapping through them.
-
We can do all sorts
of stuff with that.
-
On this one we did not
quite define it rigorously.
-
What did they say is?
-
We said f would be a
good enough function,
-
but know that I do
not need f to be c1.
-
This is too strong, too strong.
-
So in Calc 1 when you had to
integrate a function of one
-
variable you just
assumed that- in Calc 1
-
I remember- you assume
that continuous.
-
It doesn't even have
to be continuous
-
but let's assume that
f would be continuous.
-
-
OK, so you have, in one sense,
that the composition with R,
-
if you have f of x
of t, y of t, z of t.
-
In terms of time will be a
functions of one variable,
-
and this will be continuous.
-
-
All right?
-
OK, now what if
it's not continuous?
-
Can't I have a piecewise,
continuous function?
-
Like in Calc 1, do you guys
remember we had some of this?
-
And from here like that
and from here like this
-
and from here like that.
-
And we had these continuities,
and this was piecewise
-
continuous.
-
Yeah, for god sake,
I can integrate that.
-
Why do we assume integral
of a continuous function?
-
Just to make our
lives easier and also
-
because we are in freshman
and sophomore level Calculus.
-
If we were in advanced
Calculus we would say,
-
I want this function
to be integrable.
-
This is a lot weaker
than continuous,
-
maybe the set of discontinuities
is also very large.
-
Who told you that you
have finitely many jumps
-
these continuities?
-
Maybe you have a
much larger set.
-
And this is what you learn
in advanced Calculus.
-
But you are not at
the level of a senior
-
yet so we'll just assume,
for the time being,
-
that f is continuous.
-
All right, and we say,
what is this animal?
-
We called it w and
be baptised it.
-
We said, just give
it some sort of name
-
and we say that is work.
-
And by definition,
by definition,
-
this is going to be
integral from-- Now,
-
the thing is, we define this as
a simple integral with respect
-
to time as a definition.
-
That doesn't mean
that I introduced
-
the notion of path
integral the way I should,
-
I was cheating on that.
-
So the way we
introduced it was like,
-
let f be a function of
the spatial coordinates
-
in terms of time.
-
x, y, z are space
coordinates, t is time.
-
So I have f of R of t here.
-
Dot Product, who
the heck is the R?
-
This is nothing but
a vector art drawing.
-
These are both
vectors, sometimes
-
I should put them in bold
like they do in the book.
-
To make it clear I can
put a bar on top of them,
-
they are free vectors.
-
So, f of R times
R prime of t dt.
-
And your favorite moments of
time are-- let's say on my arc
-
that I'm describing from time,
t, equals a, to time equals b.
-
Therefore, I'm going to
take time for a to b.
-
And this is how we define
the work of a force.
-
-
The work of a
force that's acting
-
on a particle that is moving
between time, a, and time, b,
-
on this arc of a curve
which is called c.
-
Do you like this c?
-
Okay, and the
force is different.
-
So we have a force field.
-
So I cheated, I knew
a lot in the sense
-
that I didn't tell
you how you actually
-
introduce the path integral.
-
Now this is more or less
where I stop and [INAUDIBLE].
-
But couldn't we actually
introduce this integral
-
and even define it with respect
to some arc length grammar?
-
Maybe if everything goes
fine in terms of theory?
-
And the answer is yes.
-
And I'm going to show
you how one can do that.
-
I'm going to go ahead and
clean here a little bit.
-
I'm going to leave this on
by comparison for awhile.
-
And then I will assume
something that we have not
-
defined whatsoever, which is
an animal called path integral.
-
So the path integral of a vector
field along a trajectory, c.
-
I don't know how to draw.
-
I will draw some skewed
curve, how about that?
-
Some pretty skewed curve, c,
it's not self intersecting,
-
not necessarily.
-
You guys have to imagine
this is like the trajectory
-
of an airplane in
the sky, right?
-
OK, and I have it on d
equals a, to d equals b.
-
But I said forget
about the time, t,
-
maybe I can do everything
in arc length forever.
-
So if that particle,
or airplane,
-
or whatever it is has
a continuous motion,
-
that's also differentiable.
-
And the velocity
never becomes zero.
-
Then I can parametrize
an arc length
-
and I can say, forget about
it, I have integral over c.
-
See, this is c,
it's not f, okay?
-
But f of x of s, y
of s, z of s, okay?
-
And this is going to be a ds.
-
And you'll say, yes Magdelina--
this is little s, I'm sorry.
-
Yes, Magdelina, but what
the heck is this animal,
-
you've never introduced it.
-
I have not introduced it because
I have to discuss about it.
-
When we introduced Riemann
sums, then we took the limit.
-
We always have to think how
to partition our domains.
-
So this curve can be partitioned
in as many as n, this is s k.
-
S k, this is s1, and this is
s n, the last of the Mohicans.
-
I have n sub intervals,
pieces of the art.
-
And how am I going
to introduce this?
-
As the limit, if it exists.
-
Because I can be in
trouble, maybe this limit
-
is not going to exist.
-
The sum of what?
-
For every [? seg ?] partition
I will take a little arbitrary
-
point inside the subarc.
-
-
Subarc?
-
STUDENT: Yeah.
-
PROFESSOR: Subarc,
it's a little arc.
-
Contains a-- let's take it here.
-
What am I going to
define in terms of wind?
-
s k, y k, and z k, some
people put a star on it
-
to make it obvious.
-
But I'm going to
go ahead and say
-
x star k, y star k, z star k,
is my arbitrary point in the k
-
subarc.
-
Times, what shall I multiply by?
-
A delta sk, and then
I take k from one to n
-
and I press to the
limit with respect n.
-
But actually I could also
say in some other ways
-
that the partitions length goes
to 0, delta s goes to zero.
-
And you say but,
now wait a minute,
-
you have s1, s2 s3, s4,
s k, little tiny subarc,
-
what the heck is delta s?
-
Delta s is the largest subarc.
-
So the length of the largest
subarc, length of the largest
-
subarc in the partition.
-
So the more points I take,
the more I refine this.
-
I take the points closer
and closer and closer
-
in this partition.
-
What happens to the
length of this partition?
-
It shrinks to-- it goes to 0.
-
Assuming that this
would be the largest
-
one, well if the
largest one goes to 0,
-
everybody else goes to 0.
-
So this is a Riemann
sum, can we know for sure
-
that this limit exists?
-
No, we hope to god
that this limit exists.
-
And if the limit exists then
I will introduce this notion
-
of integral around the back.
-
-
And you said, OK I
believe you, but look,
-
what is the connection
between the work- the way
-
you introduced it as a simple
Calculus 1 integral here-
-
and this animal that looks like
an alien coming from the sky.
-
We don't know how to look at it.
-
Actually guys it's not so
bad, you do the same thing
-
as you did before.
-
In a sense that, s is connected
to any time parameter.
-
So Mr. ds says, I'm
your old friend,
-
trust me, I know who I am.
ds was the speed times dt.
-
Who can tell me if we are in R
three, and we are drunken bugs,
-
ds will become what?
-
A long square root times
dt, and what's inside here?
-
I want to see if
you guys are awake.
-
[INTERPOSING VOICES]
-
PROFESSOR: Very good, x prime
of t squared, I'm so lazy
-
but I'll write it down. y prime
of t squared plus z prime of t
-
squared.
-
And this is going
to be the speed.
-
So I can always do
that, and in this case
-
this is going to become always
some-- let's say from time, t0,
-
to time t1.
-
Some in the integrals
of-- some of the limit
-
points for the time.
-
I'm going to have
f of R of s of t,
-
in the end everything
will depend on t.
-
And this is my face being happy.
-
It's not part of the integral.
-
Saying what?
-
Saying that, guys, if
I plug in everything
-
back in terms of t- I'm
more familiar to that type
-
of integral- then I have what?
-
Square root of-- that's
the arc length element
-
x prime then t squared,
plus y prime then t
-
squared, plus z prime
then t squared, dt.
-
So in the end it is-- I think
the video doesn't see me
-
but it heard me, presumably.
-
This is our old
friend from Calc 1,
-
which is the simple integral
with respect to t from a to b.
-
OK, all right, and we
believe that the work
-
can be expressed like that.
-
I introduced it
last time, I even
-
proved it on some
particular cases
-
last time when Alex wasn't
here because, I know why.
-
Were you sick?
-
ALEX: I'll talk to
you about it later.
-
I'm a bad person.
-
PROFESSOR: All right, then
I'm dragging an object like,
-
the f was parallel to the
direction of displacement.
-
And then I said
the work would be
-
the magnitude of f times the
magnitude of the displacement.
-
And then we proved that is
just a particular case of this,
-
we proved that last time,
it was a piece of cake.
-
Actually, we proved
the other one.
-
It proved that if force is going
to be oblique and at an angle
-
theta with the displacement
direction, then
-
the work will be the
magnitude of the force times
-
cosine of theta, times the
magnitude of displacement,
-
all right?
-
And that was all an application
of this beautiful warp formula.
-
Let's see something more
interesting from an application
-
viewpoint.
-
Assume that you are
looking at the washer,
-
you are just doing laundry.
-
And you are looking at
this centrifugal force.
-
We have two forces, one is
centripetal towards the center
-
of the motion, circular
motion, one is centrifugal.
-
I will take a
centrifugal force f,
-
and I will say I want
to measure at the work
-
that this force is producing
in the circular motion
-
of my dryer.
-
My poor dryer died so I
had to buy another one
-
and it cost me a lot of money.
-
And I was thinking,
such a simple thing,
-
you pay hundreds
of dollars on it
-
but, anyway, we take
some things for granted.
-
-
I will take the washer because
the washer is a simpler
-
case in the sense that the
motion-- I can assume it's
-
a circular motion of
constant velocity.
-
And let's say this
is the washer.
-
-
And centrifugal
force is acting here.
-
Let's call that--
what should it be?
-
Well, it's continuing
the position vector
-
so let's call that lambda
x I, plus lambda y j.
-
In the sense that it's
collinear to the vector that
-
starts at origin, and here
is got to be x of t, y.
-
X and y are the
special components
-
at any point on my
circular motion.
-
If it's a circular
motion I have x
-
squared plus y squared
equals r squared,
-
where the radius is the
radius of my washer.
-
You have to compute
the work produced
-
by the centrifugal force
in one full rotation.
-
It doesn't matter, I can have
infinitely many rotations.
-
I can have a hundred rotations,
I couldn't care less.
-
But assume that the
motion has constant speed.
-
So if I wanted, I could
parametrize in our things
-
but it doesn't
bring a difference.
-
Because guys, when this
speed is already constant,
-
like for the circular motion
you are familiar with.
-
Or the helicoidal case
you are familiar with,
-
you also saw the case when
the speed was constant.
-
Practically, you were
just rescaling the time
-
to get to your speed, to your
time parameter s, arc length.
-
So whether you work with
t, or you work with s,
-
it's the same thing if
the speed is a constant.
-
So I'm not going to use my
imagination to go and do it
-
with respect to s.
-
I could, but I
couldn't give a damn
-
because I'm going to have
a beautiful t that you
-
are going to help me recover.
-
From here, what is
the parametrization
-
that comes to mind?
-
Can you guys help me?
-
I know you can after all
the review of chapter 10
-
and-- this is what?
-
-
R what?
-
You should whisper cosine t.
-
Say it out loud, be
proud of what you know.
-
This is R sine t.
-
And let's take t
between 0 and 2 pi.
-
One, the revolution only,
and then I say, good.
-
The speed is what?
-
Speed, square root of
x prime the t squared
-
plus y prime the t squared.
-
Which is the same as writing
R prime of the t in magnitude.
-
Thank God we know that.
-
How much is this?
-
R, very good, this
is R, very good.
-
So life is not so hard, it's--
hopefully I'll be able to do
-
the w.
-
What is the w?
-
It's the path integral
all over the circle
-
I have here, that I traveled
counterclockwise from any point
-
to any point.
-
Let's say this would be
the origin of my motion,
-
then I go back.
-
And I have this
force, F, that I have
-
to redistribute in terms
of R. So this notation
-
is giving me a little
bit of a headache,
-
but in reality it's
going to be very simple.
-
This is the dot product, R
prime dt, which was the R.
-
Which some other people asked
me, how can you write that?
-
Well, read the
review, R of x equals
-
x of t, i plus y of t, j.
-
Also, read the
next side plus y j.
-
It short, the dR
differential out of t,
-
sorry, I'll put R.
dR is dx i plus dy j.
-
And if somebody wants
to be expressing
-
this in terms of speeds,
we'll say this is x prime dt,
-
this is y prime dt.
-
So we can rewrite this x prime
then t i, plus y prime then t
-
j, dt.
-
-
All right?
-
OK, which is the same
thing as R prime of t, dt.
-
-
[INAUDIBLE]
-
-
This looks awfully theoretical.
-
I say, I don't like it, I
want to put my favorite guys
-
in the picture.
-
So I have to think, when
I do the dot product
-
I have the dot product
between the vector that
-
has components f1 and f2.
-
How am I going to do that?
-
Well, if I multiply with this
guy, dot product, the boss guy,
-
with this boss guy.
-
Are you guys with me?
-
What am I going to do?
-
First component times
first component,
-
plus second component times
second component of a vector.
-
So I have to be smart and
understand how I do that.
-
Lambda is a constant.
-
Lambda, you're my
friend, you stay there.
-
x is x of t, x of
t, but I multiplied
-
with the first
component here, so I
-
multiplied by x prime of t.
-
Plus lambda times y of
t, times y prime of t.
-
And who gets out of the
picture is dt at the end.
-
I have integrate with
respect to that dt.
-
This would be incorrect, why?
-
Because t has to move
between some specific limits
-
when I specify what
a path integral is.
-
I cannot leave a c-- very good,
from 0 to 2 pi, excellent.
-
-
Is this hard?
-
No, It's going to
be a piece of cake.
-
Why is that a piece of cake?
-
Because I can keep writing.
-
You actually are faster than me.
-
STUDENT: Your chain rule
is already done for you.
-
PROFESSOR: Right,
and then lambda
-
gets out just because--
well you remember
-
you kick the lambda out, right?
-
And then I've put R cosine
t times minus R sine t.
-
I'm done with who?
-
I'm done with this
fellow and that fellow.
-
-
And plus y, R sine
t, what is R prime?
-
R cosine, thank you guys, dt.
-
And now I'm going to ask
you, what is this animal?
-
-
Stare at that, what
is the integrand?
-
Is a friend of
yours, he's so cute.
-
He's staring at you and
saying you are done.
-
Why are you done?
-
What happens to the integrand?
-
It's zero, it's a
blessing, it's zero.
-
How come it's zero?
-
Because these two terms
simplify, they cancel out.
-
They cancel out, thank god
they cancel out, I got a zero.
-
So we discover something
that a physicist
-
or a mechanical engineer
would have told you already.
-
And do you think he would
have actually plugged
-
in the path integral?
-
No, they wouldn't
think like this.
-
He has a simpler explanation for
that because he's experienced
-
with linear experiments.
-
And says, if I drag this like
that I know what to work with.
-
If I drag in, like
at an angle, I
-
know that I have the
magnitude of this,
-
cosine theta, the angle.
-
So, he knows for linear
cases what we have.
-
For a circular case he
can smell the result
-
without doing the path integral.
-
So how do you think the guy,
if he's a mechanical engineer,
-
would think in a second?
-
Say well, think of
your trajectory, right?
-
It's a circle.
-
The problem is that centrifugal
force being perpendicular
-
to the circle all the time.
-
And you say, how can a line
be perpendicular to a circle?
-
It is, it's the
normal to the circle.
-
So when you say this
is normal to the circle
-
you mean it's normal to
the tangent of the circle.
-
So if you measure the angle made
by the normal at every point
-
to the trajectory of a
circle, it's always lines.
-
So he goes, gosh, I got
cosine of 90, that's zero.
-
So if you have some
sort of work produced
-
by something perpendicular
to your trajectory,
-
that must be zero.
-
So he or she has
very good intuition.
-
Of course, how do we prove it?
-
We are mathematicians, we
prove the path integral,
-
we got zero for the
work, all right?
-
But he could sense that kind
of stuff from the beginning.
-
Now, there is another example
where maybe you don't have
-
90 degrees for your trajectory.
-
Well, I'm going to just take--
what if I change the force
-
and I make a difference problem?
-
Make it into a
different problem.
-
-
I will do that later, I
won't go and erase it.
-
-
Last time we did one
that was, compute
-
the work along a parabola
from something to something.
-
Let's do that again.
-
-
For some sort of
a nice force field
-
I'll take your vector valued
function to be nice to you.
-
I'll change it, y i plus x j.
-
-
And then we are in
plane and we move
-
along this parabola between
0, 0 and-- what is this guys?
-
1, 1-- well let make it
into a one, it's cute.
-
And I'd like you to measure
the work along the parabola
-
and also along the arc of a--
along the segment of a line
-
between the two points.
-
So I want you to compute
w1 along the parabola,
-
and w2 along this
thingy, the segment.
-
Should it be hard?
-
No, this was old
session for many finals.
-
I remember, I think it
was 2003, 2006, 2008,
-
and very recently, I
think a year and 1/2 ago.
-
A problem like that was given.
-
Compute the path
integrals correspond
-
to work for both parametrization
and compare them.
-
Is it hard?
-
I have no idea, let me think.
-
For the first one we
have parametrization
-
that we need to distinguish
from the other one.
-
The first parametrization
for a parabola,
-
we discussed it last
time, was of course
-
the simplest possible
one you can think of.
-
And we did this
last time but I'm
-
repeating this because I
didn't want Alex to miss that.
-
And I'm going to say integral
from some time to some time.
-
Now, if I'm between 0
and 1, time of course
-
will be between 0 and
1 because x is time.
-
All right, good,
that means what else?
-
This Is f1 and this is f2.
-
So I'm going to have f1 of t,
x prime of t, plus f2 of t,
-
y prime of t, all the
[? sausage ?] times dt.
-
Is this going to be hard?
-
Hopefully not, I'm going to
have to identify everybody.
-
Identify this guys prime
of t with respect to t
-
is 1, piece of cake, right?
-
This fellow is-- you told
me last time you got 2t
-
and you got it right.
-
This guy, I have to be
a little bit careful
-
because y is the fourth guy.
-
This is t squared and this is t.
-
-
So my integral will be a joke.
-
0 to 1, 2t squared plus t
squared equals 3t squared.
-
Is it hard to integrate?
-
No, for God's sake,
this is integral-- this
-
is t cubed between 0
and 1, right, right?
-
So I should get
1, and if I get, I
-
think I did it right, if I get
the other parametrization you
-
have to help me write it again.
-
The parametrization
of this straight line
-
between 0, 0 and 1, 1.
-
Now on the actual
exam, I'm never
-
going to forgive you if you
don't know how to parametrize.
-
Now you know it but two months
ago you didn't, many of you
-
didn't.
-
So if somebody gives you 2
points, OK, in plane I ask you,
-
how do you write that symmetric
equation of the line between?
-
You were a little
bit hesitant, now
-
you shouldn't be hesitant
because it's a serious thing.
-
So how did we write that?
-
We memorized it. x minus
x1, over x2 minus x1
-
equals y minus y1,
over y2 minus y1.
-
This can also be written
as-- you know, guys,
-
that this over that
is the actual slope.
-
This over that, so
it can be written
-
as a [INAUDIBLE] formula.
-
It can be written in many ways.
-
And if we put a, t, we transform
it into a parametric equation.
-
So you should be
able, on the final,
-
to do that for any segment of
a line with your eyes closed.
-
Like, you see the
numbers, you plug them in,
-
you get the
parametric equations.
-
We are nice on the exams
because we usually give you
-
a line that's easy to write.
-
Like in this case you would
have x equals t and y equal,
-
let's see if you
are asleep yet, t.
-
Why is that?
-
Because the line that joins
0, 0 and 1, 1 is y equals x.
-
So y equals x is called
also, first bicycle.
-
It's the old friend of
yours from trigonometry,
-
from Pre-Calc, from algebra,
I don't know where, college
-
algebra.
-
Alrighty, is this hard to do?
-
No, it's easier than before.
w2 is integral from 0 to 1,
-
this is t and this is t, this
is t and this is t, good.
-
So we have t times
1 plus t times 1,
-
it's like a funny, nice, game
that's too simple, 2t, 2t.
-
-
So the fundamental
theorem of Calc
-
says t squared between 0
and 1, the answer is 1.
-
Am I surprised?
-
Look at me, do I
look surprised at all
-
that I got the same answer?
-
No, I told you a
secret last time.
-
I didn't prove it.
-
I said that R times happy times.
-
When depending on the
force that is with you,
-
you have the same work
no matter what path
-
you are taking between a and b.
-
Between the origin
and finish line.
-
So I'm claiming that if I
give you this zig-zag line
-
and I asked you what-- look,
it could be any crazy path
-
but it has to be a nice
differentiable path.
-
Along this differentiable
path, no matter
-
how you compute the work,
that's your business,
-
I claim I still get 1.
-
-
Can you even think why,
some of you remember maybe,
-
the force was key?
-
STUDENT: It's a
conservative force.
-
PROFESSOR: It had to
be good conservative.
-
Now this is conservative but
why is that conservative?
-
What the heck is a
conservative force?
-
So let's write it
down on the-- we
-
say that the vector
valued function, f,
-
valued in R2 or R3, is
conservative if there exists
-
a smooth function.
-
Little f, it actually
has to be just c1,
-
called scalar potential.
-
Called scalar potential,
such that big F as a vector
-
field will be not little f.
-
That means it will be the
gradient of the scalar
-
potential.
-
Definition, that
was the definition,
-
and then criterion for a f
in R2 to be conservative.
-
-
I claim that f equals f1 i,
plus f two eyes, no, f2 j.
-
I'm just making
silly puns, I don't
-
know if you guys follow me.
-
If and only if f sub 1
prime, with respect to y,
-
is f sub 2 prime,
with respect to x.
-
Can I prove this?
-
Prove, prove Magdelina, don't
just stare at it, prove.
-
Why would that be
necessary and sufficient?
-
-
Well, for big F
to be conservative
-
it means that it has
to be the gradient
-
of some little function, little
f, some scalar potential.
-
Alrighty, so let me
write it down, proof.
-
f conservative if
and only if there
-
exists f, such that gradient
of f is F. If and only
-
if-- what does it
mean about f1 and f2?
-
f1 and f2 are the f
sub of x and the f sub
-
y of some scalar potential.
-
So if f is the gradient, that
means that the first component
-
has to be little f sub x And
the second component should
-
have to be little f sub y.
-
But that is if and only if f
sub 1 prime, with respect to y,
-
is the same as f sub 2
prime, with respect to x.
-
What is that?
-
The red thing here is called
a compatibility condition
-
of this system.
-
This is a system of two OD's.
-
You are going to
study ODEs in 3350.
-
And you are going
to remember this
-
and say, Oh, I know that because
she taught me that in Calc 3.
-
Not all instructors will
teach you this in Calc 3.
-
Some of them fool you
and skip this material
-
that's very important
to understand in 3350.
-
So guys, what's going to
happened when you prime this
-
with respect to y?
-
You get f sub x prime,
with respect to y.
-
When you prime this
with respect to x
-
you get f sub y prime,
with respect to x.
-
Why are they the same thing?
-
I'm going to remind
you that they
-
are the same thing
for a smooth function.
-
Who said that?
-
A crazy German mathematician
whose name was Schwartz.
-
Which means black, that's
what I'm painting it in black.
-
Because is the Schwartz
guy, the first criterion
-
saying that no
matter in what order
-
you differentiate the
smooth function you
-
get the same answer for
the mixed derivative.
-
So you see we prove if
and only if that you
-
have to have this
criterion, otherwise
-
it's not going to
be conservative.
-
So I'm asking you,
for your old friend, f
-
equals- example
one or example two,
-
I don't know- y i plus x j.
-
Is the conservative?
-
You can prove it in two ways.
-
Prove in two differently
ways that it is conservative.
-
-
a, find the criteria.
-
What does this criteria say?
-
Take your first component,
prime it with respect to y.
-
So y prime with respect to y.
-
Take your second component,
x, prime it with respect to x.
-
Is this true?
-
Yes, and this is me,
happy that it's true.
-
So this is 1 equals
1, so it's true.
-
So it must be conservative,
so it must be conservative.
-
Could I have done
it another way?
-
-
By definition, by definition,
to prove that a force field
-
is conservative by
definition, that it a matter
-
of the smart people.
-
There are people
who- unlike me when
-
I was 18- are able to see
the scalar potential in just
-
about any problem I give them.
-
I'm not going to make this
experiment with a bunch of you
-
and I'm going to reward you
for the correct answers.
-
But, could anybody
see the existence
-
of the scalar potential?
-
So these there, this exists.
-
That's there exists a little
f scalar potential such
-
that nabla f equals F.
-
And some of you may see
it and say, I see it.
-
So, can you see
a little function
-
f scalar function so
that f sub of x i is y
-
and f sub- Magdelena--
x of y j is this x j?
-
STUDENT: [INAUDIBLE]?
-
PROFESSOR: No, you need to
drink some coffee first.
-
You can get this, x times what?
-
Why is that?
-
I'll teach you how to get it.
-
Nevertheless, there
are some people
-
who can do it with
their naked eye
-
because they have a little
computer in their head.
-
But how did I do it?
-
It's just a matter of
experience, I said,
-
if I take f to be x y,
I sort of guessed it.
-
f sub x would be y and f sub y
will be x so this should be it,
-
and this is going to do.
-
And f is a nice function,
polynomial in two variables,
-
it's a smooth function.
-
I'm very happy I'm
over the domain,
-
open this or whatever,
open domain in plane.
-
I'm very happy, I have
no problem with it.
-
So I can know that this is
conservative in two ways.
-
Either I get to the
source of the problem
-
and I find the little
scalar potential whose
-
gradient is my force field.
-
Or I can verify the
criterion and I say,
-
the derivative of
this with respect to y
-
is the derivative
of this with respect
-
to x is-- one is the same.
-
The same thing, you're going
to see it again in math 3350.
-
All right, that I
taught many times,
-
I'm not going to teach
that in the fall.
-
But I know of some
very good people
-
who teach that in the fall.
-
In any case, they
would reteach it to you
-
because good teachers don't
assume that you know much.
-
But when you will see
it you'll remember me.
-
Hopefully fondly, not cursing
me or anything, right?
-
OK, how do we actually
get to compute f by hand
-
if we're not experienced
enough to guess it like I was
-
experienced enough to guess?
-
So let me show you how you solve
a system of two differential
-
equations like that.
-
So how I got-- how
you are supposed
-
to get the scalar potential.
-
f sub x equals F1,
f sub y equals F2.
-
So by integration, 1 and 2.
-
-
And you say, what
you mean 1 and 2?
-
I'll show you in a second.
-
So for my case,
example 2, I'll take
-
my f sub x must be y, right?
-
Good.
-
My f sub y must be x, right?
-
Right.
-
Who is f?
-
Solve this property.
-
Oh, I have to start
integrating from the first guy.
-
What kind of information
am I going to squeeze?
-
I'm going to say I
have to go backwards,
-
I have to get-- f
is going to be what?
-
Integral of y with respect to
x, say it again, Magdelina.
-
Integral of y with respect
to x, but attention,
-
this may come because, for
me, the variable is x here,
-
and y is like, you cannot
stay in this picture.
-
So I have a constant
c that depends on y.
-
Say what?
-
Yes, because if you go backwards
and prime this with respect
-
to x, what do you
get? f sub x will
-
be y because this is
the anti-derivative.
-
Plus this prime with
respect to x, zero.
-
So this c of y may, a
little bit, ruin your plans.
-
I've had students
who forgot about it
-
and then they got in trouble
because they couldn't get
-
the scalar potential correctly.
-
All right?
-
OK, so from this one you
say, OK I have some--
-
what is the integral of y dx?
-
xy, plus some guy c
constant that depends on y.
-
From this fellow
I go, but I have
-
to verify the second condition,
if I don't I'm dead meat.
-
There are two coupled
equations, these
-
are coupled equations
that have to be
-
verified at the same time.
-
So f sub y will be prime with
respect to y. x plus prime
-
with respect to y. c prime
of y, God gave me x here.
-
So I'm really lucky in that
sense that c prime of y
-
will be 0 because I have
an x here and an x here.
-
So c of y will simply be
any constant k. c of y
-
is just a constant k, it's
not going to depend on y,
-
it's a constant k.
-
So my answer was not correct.
-
The best answer would have
been f of xy must be xy plus k.
-
But any function like xy will
work, I just need one to work.
-
I just need a scalar
potential, not all of them.
-
This will work, x2, xy plus 7
will work, xy plus 3 will work,
-
xy minus 1,033,045 will work.
-
But I only need one
so I'll take xy.
-
Now that I trained
your mind a little bit,
-
maybe you don't need
to actually solve
-
the system because your
brain wasn't ready before.
-
But you'd be amazed, we
are very trainable people.
-
And in the process of doing
something completely new,
-
we are learning.
-
And your brain next,
will say, I think
-
I know how to function
a little bit backwards.
-
And try to integrate and
see and guess a potential
-
because it's not so hard.
-
So let me give you example 3.
-
-
Somebody give you over a
domain in plane x i plus y j,
-
and says, over D, simply
connected domain in plane,
-
open, doesn't matter.
-
Is this conservative?
-
-
Find a scalar potential.
-
-
This is again, we
do section 13-2,
-
so today we did 13-1
and 13-2 jointly.
-
-
Find the scalar potential.
-
Do you see it now?
-
STUDENT: [INAUDIBLE]?
-
PROFESSOR: Excellent,
we teach now, got it.
-
He says, I know where
this comes from.
-
I've got it, x squared
plus y squared over 2.
-
How did he do it?
-
He's a genius.
-
No he's not, he's just
learning from the first time
-
when he failed.
-
And now he knows what he has
to do and his brain says,
-
oh, I got it.
-
Now, [INAUDIBLE] could
have applied this method
-
and solved the coupled
system and do it slowly
-
and it would have taken
him another 10 minutes.
-
And he's in the final, he
doesn't have time to spare.
-
If he can guess the potential
and then verify that,
-
it's going to be easy for him.
-
Why is that?
-
This is going to be 2x over 2
x i, and this is 2y over 2 y j.
-
So yeah, he was right.
-
-
All right, let me
give you another one.
-
Let's see who gets this one.
-
F is a vector valued
function, maybe a force field,
-
that is this.
-
-
Of course there are many
ways-- maybe somebody's
-
going to ask you
to prove this is
-
conservative by the criterion,
but they shouldn't tell you
-
how to do it.
-
So show this is conservative.
-
If somebody doesn't want the
scalar potential because they
-
don't need it, let's say.
-
Well, prime f1 with respect to
y, I'll prime this with respect
-
to x.
-
f1 prime with respect to
y equals 2x is the same
-
as f2 prime with respect with.
-
Yeah, it is conservative, I
know it from the criterion.
-
But [INAUDIBLE] knows
that later I will ask him
-
for the scalar potential.
-
And I wonder if he can find
it for me without computing it
-
by solving the system.
-
Just from his
mathematical intuition
-
that is running in the
background of your--
-
STUDENT: x squared,
multiply y [INAUDIBLE].
-
PROFESSOR: x squared
y, excellent.
-
-
Zach came up with
it and anybody else?
-
Alex?
-
So all three of you, OK?
-
Squared y, very good.
-
Was it hard?
-
Yeah, it's hard for most people.
-
It was hard for me
when I first saw
-
that in the first 30
minutes of becoming familiar
-
with the scalar
potential, I was 18 or 19.
-
But then I got it in
about half an hour
-
and I was able to
do them mentally.
-
Most of the examples I
got were really nice.
-
Were on purpose made nice for
us for the exam to work fast.
-
And now let's see why
would the work really not
-
depend on the trajectory
you are taking
-
if your force is conservative.
-
If the force is
conservative there
-
is something magic
that's going to happen.
-
And we really don't
know what that is,
-
but we should be able to prove.
-
-
So theorem, actually
this is funny.
-
It's called the fundamental
theorem of path integrals
-
but it's the fundamental
theorem of calculus 3.
-
I'm going to write it like
this, the fundamental theorem
-
of calc 3, path integrals.
-
It's also called- 13.3,
section- Independence of path.
-
-
So remember you have a
work, w, over a path, c.
-
F dot dR where there R is the
regular parametrized curve
-
overseen.
-
-
This is called a
supposition vector.
-
-
Regular meaning c1, and
never vanishing speed,
-
the velocity never vanishes.
-
Velocity times 0 such
that f is continuous,
-
or a nice enough integral.
-
-
If F is conservative of
scalar potential, little f,
-
then the work, w, equals
little f at the endpoint
-
minus little f at the origin.
-
-
Where, by origin and endpoint
are those for the path,
-
are those for the arc, are
those for the curve, c.
-
-
So the work, the w, will
be independent of time.
-
So w will be independent of f.
-
And you saw an
example when I took
-
a conservative function
that was really nice,
-
y times i plus x times j.
-
That was the force field.
-
Because that was
conservative, we got w being 1
-
no matter what path we took.
-
We took a parabola, we
took a straight line,
-
and we could have
taken a zig-zag
-
and we still get w equals 1.
-
So no matter what
path you are taking.
-
Can we prove this?
-
Well, regular classes don't
prove anything, almost nothing.
-
But we are honor students
so lets see what we can do.
-
We have to understand
what's going on.
-
Why do we have this fundamental
theorem of calculus 3?
-
The work, w, can be expressed--
assume f is conservative
-
which means it's going to come
from a potential little f.
-
Where f is [INAUDIBLE] scalar
function over my domain, omega.
-
-
Now, the curve, c,
is part of this omega
-
so I don't have any
problems on the curve.
-
w will be rewritten beautifully.
-
So I'm giving you a
sketch of a proof.
-
But you would be able to do
this, maybe even better than me
-
because I have taught
you what you need to do.
-
So this is going to
be f1 i, plus f2 j.
-
And I'm going to write it.
f1 times-- what is this guys?
-
dR, I taught you, you taught
me, x prime of t, right?
-
Plus f2 times y prime of t,
all dt, and time from t0 to t1.
-
I start my motion along
the curve at t equals t0
-
and I finished my
motion at t equals t1.
-
-
Do I know where f1 and f2 are?
-
This is the point,
that's the whole point,
-
I know who they are, thank God.
-
And now I have to again
apply some magical think,
-
I'll ask you in a
minute what that is.
-
So, what is f1?
-
df dx, or f sub base.
-
If you don't like f sub base,
if you don't like my notation,
-
you put f sub x, right?
-
And this df dy.
-
Why?
-
Because it's
conservative and that
-
was the gradient of little f.
-
Of course I'm using the fact
that the first component would
-
be the partial of little
f with respect to x.
-
The second component would
be the partial of little
-
f with respect to y.
-
Have you seen this
formula before?
-
What in the world
is this formula?
-
STUDENT: It's the chain rule?
-
PROFESSOR: It's the chain rule.
-
I don't have a dollar but I
will give you a dollar, OK?
-
Imagine a virtual dollar.
-
This is the chain rule.
-
So by the chain
rule we can write
-
this to be the
derivative with respect
-
to t of little f of
x of t, and y of t.
-
Alrighty, so I know
what I'm doing.
-
I know that by chain rule I had
little f evaluated at x of t,
-
y of t, and time t,
prime with respect to t.
-
Now when we take the fundamental
theorem of calculus, FTC.
-
That reminds me, I was
teaching calc 1 a few years ago
-
and I said, that's the
Federal Trade Commission.
-
Federal Trade Commission,
fundamental theorem
-
of calculus.
-
So coming back to
what I have, I prove
-
that w is the Federal
Trade Commission, no.
-
w is the application
of something
-
that we knew from calc
1, which is beautiful.
-
f of xt, y of t dt, this
is nothing but what?
-
Little f evaluated at-- I'm
going to have to write it down,
-
this whole sausage.
-
f of x of t1, y of t1,
minus f of x of t0, y of t0.
-
For somebody as lazy as
I am, that they effort.
-
How can I write It better?
-
f at the endpoint
minus f at the origin.
-
And of course, we are trying to
be quite rigorous in the book.
-
We would never say
that in the book.
-
We actually denote
the first point
-
with p, the origin, and
the endpoint with q.
-
So we say, f of q minus f of p.
-
And we proved q e d, we
proved the fundamental theorem
-
of path integrals, the
independence of that.
-
So that means the work
is independent of path
-
when the force is conservative.
-
Now attention, if f is not
conservative you are dead meat.
-
You cannot say what I just said.
-
So I'll give you two
separate examples
-
and let's see how we
solve each of them.
-
-
A final exam type of
problem-- every final exam
-
contains an
application like that.
-
Even the force field, f,
or the vector value, f.
-
Is it conservative?
-
Prove what is proved and
after that-- so the path
-
integral in any way you can.
-
If it's conservative you're
really lucky because you're
-
in business.
-
You don't have to do any work.
-
You just find the little
scalar potential evaluated
-
at the endpoints and subtract,
and that's your answer.
-
So I'm going to give you an
example of a final exam problem
-
that happened in the past year.
-
So, a final type exam problem.
-
-
f of xy equals 2xy
i plus x squared j,
-
over r over r squared.
-
STUDENT: Didn't we just
do [INAUDIBLE] that?
-
PROFESSOR: Well, I just did
that but I changed the problem.
-
I wanted to keep the
same force field.
-
STUDENT: Alright.
-
PROFESSOR: OK.
-
Compute the work, w,
performed by f along the arc
-
of the circle in the picture.
-
-
And they draw a picture.
-
And they do a picture for you,
and you stare at this picture
-
and-- So you say,
oh my God, if I
-
were to parametrize it
would be a little bit of-- I
-
could, but it would be
a little bit of work.
-
I would have x equals 2
cosine t, y equals sine t.
-
I would have to plug in and
do that whole work, definition
-
with parametrization.
-
Do you have to parametrize?
-
Not in this case, why?
-
Because the f is conservative.
-
If they ask you- some professors
give hints, most of them
-
are nice and give hints-
show f is conservative.
-
-
So that's a big
hint in the sense
-
that you see it
immediately, how you do it.
-
You have 2xy prime
with respect to y,
-
is 2x, which is x squared
prime with respect to x.
-
So it is conservative.
-
But he or she told you more.
-
He said, I'm selling
you something here,
-
you have to get your
own scalar potential.
-
And you did, and
you got x squared y.
-
Now, most of the
scalar potentials
-
that we are giving
you on the exam
-
can be seen with naked eyes.
-
You wouldn't have to do
all the integration of that
-
coupled system with respect
to x, with respect to y,
-
integrate backwards,
and things like that.
-
What do I need to do
in that case guys?
-
Say in words.
-
Since the force is
conservative, just two lines.
-
I'm applying the fundamental
theorem of calculus.
-
I'm applying the fundamental
theorem of path integrals.
-
I know the work is
independent of that.
-
So w, in this case
is already there,
-
is going to be f at the point.
-
I didn't say how I'm going to
travel it, in what direction.
-
f of q minus f of p.
-
-
And you'll say, well
what does it mean?
-
How do we do that?
-
That means x squared
y, evaluated at q,
-
who the heck is q?
-
Attention, negative 2,
0, Matt, you got it?
-
OK, right?
-
So, are you guys with me?
-
Right?
-
And p is 2, 0.
-
So at negative 2, 0,
minus x squared y at 2, 0.
-
So, if you set 0, big, as
you knew that you got 0,
-
that is the answer.
-
Now if somebody would give you
a wiggly look that this guy's
-
wrong, then he took this past.
-
He's going to do
exactly the same work
-
if he's under influence the
same conservative force.
-
If the force acting
on it is the same.
-
No matter what path you
are taking-- yes, sir?
-
STUDENT: Is it still working
for your self-intersecting.
-
PROFESSOR: Yeah, because
you're not stopping,
-
it works for any
parametrization.
-
So if you're able to parametrize
that as a differentiable
-
function so that the
derivative would never vanish,
-
it's going to work, right?
-
All right, it can work also
for this piecewise contour
-
or any other path point.
-
As long as it starts and
it ends at the same point
-
and as long as your
conservative force is the same.
-
So that force is very
[INAUDIBLE], yes?
-
STUDENT: Do [INAUDIBLE] graphs
but the endpoints the same.
-
And if they are conservative
then [INTERPOSING VOICES].
-
PROFESSOR: If everything
is conservative
-
the work along this
path is the same.
-
There were people
who played games
-
like that to catch if
the student knows what
-
they are talking-- yes, sir?
-
STUDENT: So, in a
problem, if they wanted
-
to find the work
couldn't we simplify it
-
by just saying, we
need to find-- because,
-
since we're in R2, couldn't we
just say it's a straight line?
-
Because that's the--
Like, instead of a curve
-
we could just set the straight
line [INTERPOSING VOICES].
-
PROFESSOR: If it
were moving from here
-
to here in a straight
line you would still
-
get the same answer.
-
And you could have-- if
you did that, actually,
-
if you were to compute this
kind of work on a straight line
-
it has-- let me
show you something.
-
You see, when you compute
dx y dx, plus x squared dy.
-
If y is 0 like Matthew said,
I'm walking on-- I'm not drunk.
-
I'm walking straight.
-
y will be 0 here, and 0 here,
and the integral will be 0.
-
So he would have noticed
that from the beginning.
-
But unless you know the
force is conservative,
-
there is no guarantee
that on another path
-
you don't have a
different answer, right?
-
So, let me give you another
example because now Matthew
-
brought this up.
-
-
A catchy example
that a professor
-
gave just to make the
students life miserable,
-
and I'll show it
to you in a second.
-
-
He said, for the picture--
very similar to this one,
-
just to make people confused.
-
Somebody gives you
this arc of a circle
-
and you travel from a to b.
-
And this the thing.
-
And he says, compute w for
the force given by y i plus j.
-
And the students
said OK, I guess
-
I'm going to get 0 because
I'm going to get something
-
like y dx plus x dy.
-
And if y is 0, I get 0, and
that way you wouldn't be 0
-
and I'm done.
-
No, it's not how you
think because this is not
-
conservative.
-
So you cannot say I can change
my path and it's still going
-
to be the same.
-
No, why is this
not conservative?
-
Quickly, this prime
with respect to y
-
is 1, this prime with
respect to x is 0.
-
So 1 different from
0 so, oh my God, no.
-
In that case, why do we do?
-
We have no other choice but
say, x equals 2 cosine t,
-
y equals 2 sine t, and
t between 0 and pi.
-
And then I get integral of
f1, y, what the heck is y?
-
2 sine t, times x prime of t.
-
-
Yeah, minus 2 sine
t, this is x prime.
-
Plus 1, are you guys with me?
-
Times y prime, which
is 2 cosine t, dt.
-
And t between 0 and pi.
-
-
And you get something
ugly, you get 0 to pi.
-
What is the nice thing?
-
When you integrate this with
respect to t, you get sine t.
-
And thank God, sine, whether you
are at 0 or if pi is still 0.
-
So this part will disappear.
-
So all you have left is
minus 4 sine squared dt.
-
But you are not done
so compute this at home
-
because we are out of time.
-
So don't jump to
conclusions unless you know
-
that the force is conservative.
-
If your force is
not conservative
-
then things are going
to look very ugly
-
and your only chance is to go
back to the parametrization,
-
to the basics.
-
So we are practically
done with 13.3
-
but I want to watch
more examples next time.
-
And I'll send you the homework.
-
Over the weekend you would be
able to start doing homework.
-
Now, when shall I
grab the homework?
-
What if I closed it right
before the final, is that?
-
STUDENT: Yeah.
-
PROFESSOR: Yeah?
-
