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Let's keep going with our 2008 Calculus BC free
answer questions.
So we're on problem number 2.
And I cut and pasted the table that they gave for the problem.
And I'll read the rest of the problem.
And let's see what we can do.
So it says concert tickets went on sale at noon, t equals 0,
and were sold out within 9 hours.
The number of people waiting in line to purchase tickets at
time t, is modeled by a twice differentiable
function L, L of t.
So this is the number of people waiting in line at anytime.
And this is noon, 12:00 noon, 1:00 pm, 9:00 pm.
All the tickets are sold by 9:00 pm.
And they tell us it's twice differentiable.
So that means that whatever function we're modeling this,
this L of t, that it's continuous because
it's differentiable.
And since it's twice differentiable, we also know
that its derivative is continuous because the second
derivative exists at all points.
So it says part a-- let me make sure I'm not writing too
thickly-- use the data in the table to estimate the rate--
let me actually just copy and paste this, I've just
figured out how to do this.
So I figure it doesn't hurt.
There you go.
You probably can't read it.
But it says use the data in the table to estimate the rate at
which the number of people waiting in line was
changing at 5:30 pm.
So they don't give us any data on 5:30 pm.
They give us 4:00 pm and 7:00 pm, or t equals 5.5.
Show the computations that lead to your answer.
Indicate the units of measure.
So what do they want to know?
They want to know an estimate of the rate at which the
number of people waiting in line was changing.
So they don't give us a continuous function definition.
They just give us a bunch of sample points of
this function L of t.
So the best estimate I can do, of the rate at which this L of
t is changing at time 5.5-- and 5.5 is in between these two--
is to just figure out the average rate of change
between time 4 and time 7.
So how do we figure that out?
Well the average rate of change is just the slope.
So let's write it.
So we could write average rate of change or delta
L over delta t at 5.5.
You can write it however you want, however you think that
the exam graders would best like to see it.
We could say at time 5.5.
We could say approximately equals, or whatever.
But it's just going to be the slope between these two points.
So it's L of 7 minus L of 4, all of that over 7 over 4.
Rise over run or change in the value of the function
divided by change in the independent variable.
L of 7 is 154.
They give us that.
L of 4 is 126.
And we divide it by 7 minus 4.
So that equals 54 minus 126 is 24 plus 26 is 50.
So it's equal to 28.
Right, if this was 2 less, it would be 30.
And 7 minus 4 is 3.
So you could say that the average rate of
change is 28 over 3.
Or you could write that as 9 1/3.
And they want us to use the units of measure.
Indicate units of measure.
So the numerator, this is people.
And what's the denominator?
It's hours, people per hour.
So my best estimate, or our best estimate of the rate at
which the number of people waiting in line was changing at
5:30 pm, which is between these two points, is the average
slope between these two points.
Which is 9 1/3 people per hour.
That's it.
Let's do part b.
Let me clear all of this so we have enough space for part b.
And I'll copy and don't know if you can read it.
But maybe you can.
So doesn't hurt to just copy and paste.
OK part b says, use a trapezoidal sum with
three subintervals.
Maybe I can make this a little bit bigger.
Let me see if I can grow that a little bit.
I don't want to take up all the space though.
No that doesn't look good.
OK well I'll read it out loud in case you can't see it.
Use a trapezoidal sum with three subintervals to estimate
the average number of people waiting in line during the
first 4 hours that the tickets were on sale.
If you want to do this really fast, you wouldn't
have to graph it.
But I'm about to graph it because I want you to
understand how to do this problem.
If you understand it, you don't have to graph it.
So let's graph some of these points.
And we really just have to do the first 4 hours.
Actually let's graph all of them, just because it
might be useful in future parts of the problem.
If you weren't graphing it while recording a video, it
probably would be a little bit faster.
That should be good enough.
What are our data points?
We have 1, 2, 3, 4, 5, 6, 7, 8, 9.
You don't have do it so neatly.
Well it's good to do it neatly when you're doing the exam,
because otherwise you'll confuse yourself.
And let's see, how high should my L values?
This is time right here.
This is my L of t axis.
It goes up to about, 176 is a high point, at least
on the data we have.
Let's say this is 200.
So halfway up would be 100.
This would be 150.
This would be 50.
I don't know what that sound was from.
But let's keep going forward.
Let's plot the points.
At t equals 0 there are 120 people in line.
That's about right there.
At t equals 1, 156.
I'm just approximating.
It's about right there.
At t equals 3-- they skip 2-- at t equals 3 it's
176 people in line.
So that's going to be right about there,
just approximating it.
At t equals 4, we have 126 people in line.
It's a little bit more than at t equals 0.
At t equals 7, we have 150 people in line.
It's right about there.
At t equals 8 we have 80.
That's about right there.
And t equal 9, the line is gone.
Everyone has gotten their tickets, or maybe
they got sold out.
Let's connect those points.
Connect the dots.
So from here to there.
And from there to there.
There to there.
There to there, almost done.
OK so we've at least plotted the sample points and
connected them with lines.
We know that the real L of t, whatever we used to approximate
it, it's not going to have these sharp edges because
it's differentiable.
It's actually twice differentiable.
So it's actually going to be a smoother curve, right?
Because we can take the derivative of any point.
If this was the actual function, you wouldn't be
able to take a derivative at this point.
Because there's a positive slope here and then it
immediately switches to a negative slope like the
absolute value functions.
You actually wouldn't be able to take the
derivative at that point.
But anyway back to the problem.
Use a trapezoidal sum with three subintervals to estimate
the average number of people waiting in line during
the first 4 hours.
So the first 4 hours, that's right here.
Now this might seem kind of daunting.
The trapezoidal sum for the fourth.
Actually I just realized.
For some reason, YouTube used to let me do longer videos
because I thought I was a partner.
But now for some reason it's been limiting me again.
So I will continue part b in the next video.
See you soon.
