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Sequences are nice. Without them, there would be no rhyme or reason to anything—no way to ever know what’s coming next. And it would make tryin...
SAT Math 1.5 Numbers and Operations. How many dots would be in the 5th term of this sequence?
SAT Math 2.1 Numbers and Operations. How many dots will be in the 6th term of this sequence?
Infinite Geometric Series 2815 Views
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Description:
Help Pepe on his quest to once again become the "Pizza King." Or put that healthy metabolism to use and steal his title. Ten slices in less than a minute? That's nothing.
Transcript
- 00:04
Infinite Geometric Series, a la Shmoop. Pepe holds the world record as the fastest [Pepe with his trophy in front of lots of pizza boxes]
- 00:08
pizza eating human.
- 00:10
Back in 2010 he inhaled 10 slices in 60 seconds.
- 00:14
He was crowned the “Pizza King” and has held the record ever since.
- 00:18
But in the years since, he has let himself go.
Full Transcript
- 00:21
He can barely muster up the motivation to make his way to the phone to order one.
- 00:24
Still, he finds a way.
- 00:26
One day he is sitting in a pizza joint with some friends when he is challenged to a pizza [Pepe sat with his friends and a pizza is chucked onto the table]
- 00:31
eating contest by an unknown stranger.
- 00:33
Pepe wants to relive the glory days, but he isn’t sure he has what it takes.
- 00:37
Just to be safe, he first eats half a pizza.
- 00:41
Then one-sixth, one-eighteenth, one-fifty-fourth, and so on...
- 00:43
If he keeps eating the pizza this way forever, how much pizza will he have eaten in total?
- 00:52
Well, first let's look at the numbers we have. [Boy looking through binoculars]
- 00:54
One-half, one- sixth, one-eighteenth, one-fifty-fourth...and so on...
- 00:58
…looks like we have something called a series.
- 01:01
Or actually, since we're assuming he'll eat forever... an infinite series, [Pizza slowly disappearing and a clock ticking]
- 01:06
But let's take a closer look at the numbers and we notice a pattern.
- 01:11
Between the first two terms, one-half and one-sixth, there's a ratio of one-third.
- 01:17
Between one-sixth and one-eighteenth, we have the same ratio of one-third.
- 01:22
Between one-eighteenth and one-fiftieth fourth, the same ratio, one-third.
- 01:26
We can call this number one-third, the common ratio, or r, of the series. [Old women answers the phone]
- 01:33
Because the terms of the series are separated by a constant ratio, we can describe the series
- 01:37
even more specifically, as an infinite geometric series.
- 01:42
Now that we've identified the type of numbers we're dealing with and the common ratio between [Fraction locked behind bars]
- 01:46
them, let's get back to the problem.
- 01:48
If we want to find the total amount of pizza Pepe ate, we should add all the slices together
- 01:53
and find the sum.
- 01:54
But wait, if he's eating infinite slices, how can we find a finite sum?
- 01:59
No worries, Pepe… the sum of an infinite geometric series has a finite sum as long
- 02:05
as the absolute value of the common ratio is less than one.
- 02:09
In this case, the absolute value of one-third is one-third, which is less than one. [Teacher at the front of class writing on a whiteboard]
- 02:15
As you can see from the series above, the numbers are getting smaller and smaller…
- 02:19
…one-fifty-fourths would go to one over 162, which is getting closer and closer to 0.
- 02:26
So as you add smaller and smaller numbers, the addition of such small numbers doesn't
- 02:31
matter much.
- 02:32
Ok, so let's find that total for Pepe. [Addition of fractions formula]
- 02:34
The formula for the sum of an infinite geometric series equals the first term divided by the
- 02:40
quantity one minus the common ratio.
- 02:44
Substituting our pizza values into the formula, we see that the sum will equal one half divided
- 02:48
by the quantity one minus one third.
- 02:51
One minus one-third equals two-thirds, so we're left with one half divided by two thirds.
- 02:56
Instead of dividing one half by that nasty fraction two thirds, let’s multiply by its
- 03:01
reciprocal three over two, to get one half times three halves, or 3-fourths.
- 03:09
That’ll be three quarters of a pizza.
- 03:12
You can do that, right Pepe? [Pepe picks up the 3/4 of pizza]
- 03:14
We have faith in you. Here's the water, and the Pepto-bismol and the barf bag... [Arms hold out water etc.. for Pepe]
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