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- [Instructor] Let's say we're
going to trace out a curve
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where our X coordinate
and our Y coordinate
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that they are each defined by
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or they're functions
of a third parameter T.
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So, we could say that X is a function of T
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and we could also say
that Y is a function T.
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If this notion is completely
unfamiliar to you,
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I encourage you to review the
videos on parametric equations
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on Khan Academy.
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But what we're going to think about
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and I'm gonna talk about in
generalities in this video.
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In future videos we're going to be dealing
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with more concrete examples
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but we're gonna think
about what is the path
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that is traced out
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from when T is equal to A,
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so this is where we are
when T is equal to A,
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so in this case this
point would be X of A,
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comma Y of A,
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that's this point
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and then as we increase from T equals A
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to T is equal to B,
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so our curve might do something like this,
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so this is when T is equal to B,
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T is equal to B,
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so this point right over here is X of B,
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comma Y of B.
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Let's think about how do we figure out
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the length of this actual curve,
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this actual arc length from
T equals A to T equals B?
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Well, to think about that
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we're gonna zoom in and
think about what happens
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when we have a very small change in T?
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So, a very small change in T.
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Let's say we're starting at
this point right over here
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and we have a very small change in T,
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so we go from this point
to let's say this point
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over that very small change in T.
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It actually would be
much smaller than this
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but if I drew it any smaller,
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you would have trouble seeing it.
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So, let's say that that
is our very small change
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in our path in our arc
that we are traveling
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and so, we wanna find this length.
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Well, we could break it down
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into how far we've
moved in the X direction
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and how far we've moved
in the Y direction.
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So, in the X direction,
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the X direction right over here,
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we would have moved a
very small change in X
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and what would that be equal to?
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Well, that would be the rate of change
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with which we are
changing with respect to T
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with which X is changing with respect to T
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times our very small change in T
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and this is a little hand wavy,
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I'm using differential notion
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and I'm conceptually using the idea
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of a differential as an
infinitesimally small change
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in that variable.
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And so, this isn't a formal proof
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but it's to give us the intuition
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for how we derive arc length
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when we're dealing with
parametric equations.
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So, this will hopefully
make conceptual sense
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that this is our DX.
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In fact, we could even write it this way,
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DX/DT, that's the same thing
as X prime of T times DT
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and then our change in Y
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is going to be the same idea.
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Our change in Y, our
infinitesimally small change in Y
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when we have an infinitesimally
small change in T,
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well, you could view that
as your rate of change
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of Y with respect to T
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times your change in T,
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your very small change in T
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which is going to be equal to,
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we could write that as Y prime of T DT.
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Now, based on this,
what would be the length
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of our infinitesimally small
arc length right over here?
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Well, that we could just
use the Pythagorean theorem.
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That is going to be the square root of,
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that's the hypotenuse
of this right triangle
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right over here.
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So, it's gonna be the square root
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of this squared plus this squared.
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So, it is the square root of,
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I'm gonna give myself a
little bit more space here
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because I think I'm gonna use a lot of it,
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so the stuff in blue squared,
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DX squared we could
rewrite that as X prime
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of T DT squared
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plus this squared which
is Y prime of T DT squared
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and now let's just try to
simplify this a little bit.
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Remember, this is this
infinitesimally small arc length
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right over here.
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So, we can actually
factor out a DT squared,
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it's a term in both of these
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and so, we can rewrite this as,
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let me, so I can rewrite this
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and then write my big radical sign,
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so I'm gonna factor out a DT squared here,
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so we could write this as DT squared
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times X prime of T squared
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plus Y prime of T squared
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and then to be clear
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this is being multiplied
by all of this stuff
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right over there.
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Well, now if we have this DT
squared under the radical,
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we can take it out
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and so, we will have a DT
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and so, this is all going to
be equal to the square root
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of, so the stuff that's
still under the radical
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is going to be X prime of T squared
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plus Y prime of T squared
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and now we took out a DT
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and now we took out a DT.
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I could have written it right over here
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but I'm just writing it on the other side,
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we're just multiplying the two.
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So, this is once again just
rewriting the expression
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for this infinitesimally
small change in arc length.
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Well, what's lucky for us is in calculus
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we have the tools for adding up
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all of these infinitesimally small changes
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and that's what the definite
integral does for us.
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So, what we can do if we wanna add up that
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plus that plus that plus that
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and remember, these are
infinitesimally small changes.
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I'm just showing them
as not infinitesimally
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just so that you can
kind of think about them
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but if you were to add them all up,
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then we are essentially
taking the integral
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and we're integrating with respect to T
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and so, we're starting at T is equal to A,
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all the way to T is equal to B
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and just like that we
have been able to at least
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feel good conceptually
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for the formula of arc length
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when we're dealing with
parametric equations.
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In the next few videos
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we'll actually apply it
to figure out arc lengths.
Khan Academy
