- [Instructor] What we're
going to do in this video
is look at the tangible example
where we calculate angular velocity,
but then we're going to
see if we can connect that
to the notion of speed.
So let's start with this
example where once again
we have some type of a ball tethered
to some type of center of
rotation right over here.
Let's say this is connected with a string.
And so if you were to
move the ball around,
it would move along this blue
circle in either direction.
Let's just say for the sake of argument,
the length of the string is seven meters.
We know that at time is
equal to three seconds,
our angle is equal to,
theta is equal to pi over two radians,
which we've seen in previous videos.
We would measure from the
positive x-axis, just like that.
And let's say that at T
is equal to six seconds,
T is equal to six seconds,
theta is equal to pi radians.
And so after three seconds, the
ball is now right over here.
And so if we wanted to actually
visualize how that happens,
let me see if I can rotate
this ball in three seconds.
So it would look like this.
One Mississippi, two
Mississippi, three Mississippi.
Let's do that again.
It would be...
One Mississippi, two
Mississippi, three Mississippi.
So now that we can visualize
or conceptualize what's going on,
see if you can pause this
video and calculate two things.
So the first thing that I
want you to calculate is
what is the angular velocity of the ball?
And actually, it would be the ball
and every point on that string.
What is that angular velocity
which we denote with omega?
And then I want you to figure out
what is the speed of the ball?
So what is the speed?
See if you can figure
out both of those things,
and for extra points,
see if you can figure out
a relationship between the two.
Alright, well let's go
angular velocity first.
I'm assuming you've had a go at it.
Angular velocity, you might remember
is just going to be equal
to our angular displacement,
which we could say is delta theta,
and it is a vector quantity.
And we are going to divide
that by our change in time.
So delta T.
And so what is this going to be?
Well this is going to be
our angular displacement.
Our final angle is pi.
Pi radians minus our initial
angle, pi over two radians.
And then all of that's going
to be over our change in time,
which is six seconds,
which is our final time
minus our initial time,
minus three seconds.
And so we are going to
get in the numerator,
we have been rotated in
the positive direction,
Pi over two radians.
Because it's positive, we
know it's counterclockwise.
And that happened over three seconds.
And so we could rewrite this as
this is going to be equal to pi over six.
And let's remind
ourselves about the units.
Our change in angle, that's
going to be in radians,
and then that is going to be per second.
So we're going pi over
six radians per second,
and if you do that over three seconds,
well then you're going to
go pi over two radians.
Now with that out of the way,
let's see if we can calculate speed.
If you haven't done so
already, pause this video
and see if you can calculate it.
Well speed is going to
be equal to the distance
the ball travels, and we've
touched on that in other videos.
I encourage you to watch
those if you haven't already.
The distance that we travel
we could denote with S.
S is sometimes used to denote arc length,
or the distance traveled right over here.
So the speed is going to be our arc length
divided by our change in time.
Divided by our change in time.
But what is our arc length going to be?
Well we saw in a previous video
where we related angular
displacement to arc length,
or distance, that our arc
length is nothing more
than the absolute value of
our angular displacement,
of our angular displacement,
times the radius.
Times the radius.
And in this case, our radius
would be seven meters.
So if we substitute all of this up here,
what are we going to get?
We are going to get that our speed,
I'm writing it out because
I don't want to overuse,
well I am overusing S,
but I don't want people to get confused.
Our speed is going to be equal
to the distance we travel,
which we just wrote is the magnitude
of our angular displacement.
And this is all fancy notation,
but when you actually apply it,
it's pretty straightforward.
Times the radius of the circle.
I guess you can say we
are traveling along.
Let me write that in a different color.
So times the radius.
All of that over our change in time.
All of that over our change in time.
Well we could put in the
numbers right over here.
We know that this is
going to be pi over two.
You take the absolute value of that.
It's still going to be pi over two.
We know that our radius in this case
is the length of that string.
It is seven meters.
And we know that our change in time here,
we know that this over here
is going to be three seconds,
and we can calculate everything.
But what's even more
interesting is to recognize
that what is this right over here?
What is the absolute value
of our angular displacement
over change in time?
Well, this is just the absolute value
of our angular velocity.
So we could say that speed
is equal to the absolute
value of our angular velocity.
Absolute value of our angular
velocity, times our radius.
Times our radius.
And now so this is super useful.
Our speed in this case,
is going to be pi over six
radians per second.
So pi over,
pi over six.
Times the radius.
Times seven meters.
Times seven meters.
And so what do we get?
We are going to get seven
pi over six meters per,
meters per second, which will
be our units for speed here.
And the reason why we're
doing the absolute value
is 'cause remember, speed
is a scalar quantity.
We're not specifying the direction.
In fact, the whole time we're traveling,
our direction is constantly changing.
So there you have it.
There's multiple ways to approach
these types of questions,
but the big takeaway here is one,
how we calculated angular velocity,
and then how we can relate
angular velocity to speed.
And what's nice is there's a
nice, simple formula for it.
And all of this just came out of something
that relates to what we
learned in seventh grade
around the circumference of the circle,
which we touched on in the video
relating angular
displacement to arc length,
or distance traveled.