Section 6.3: How to See the Future

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Title: Section 6.3: How to See the Future

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Section 6.3 How to See the Future

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How do sample means vary?

Heres a graph of the survival time of 72 guinea
pigs, each injected with a drug.
Note The mean and std. dev. for the population
are

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Understanding the POPULATION Data

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Distribution of Sample Means

Suppose that lots and lots of us each randomly
sampled 12 guinea pigs and found the average
survival time for each set of 12 guinea pigs. We
would each have a sample mean, .
Would all of our values be the same?
Use yesterdays simulation data (consisting of
106 sample means) to see if there are any
patterns.

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Graph of 106 sample means
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Graph of the Sample Means

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Graph of the Sample Means

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Comparing Population Data with Sample Mean Data

What does this say in
words?
What does this say in
words?
The graph of the population data is skewed but
the graph of the sample mean data is bell-shaped.

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Standard Error

Since standard deviation of the sample means is
a mouthful, well instead call this quantity
standard error.
Remember, we have two standard deviations
floating around the first is the population
standard deviation and the second is the standard
error.
The first describes how much spread there is in
the population. The second describes how much
spread there is in the sample means.

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Understanding Standard Error

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Ex 2 Coin Problem

Imagine you go home, collect all of the coins in
your home, and make a graph of the age of each
coin.
This graph represents the graph of the population
data.
What do you expect its shape to be?

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Sample means of coins

Take repeated samples, each of size 5 coins, and
find the mean age of the coins. If you were to
make a graph of the sample means, what would you
expect it to look like?
How about if instead you took samples of size 10?
Or of size 25?

13
Guinea Pigs and Coins

In both situations the population graphs were
severely skewed, yet the graph of the sample mean
data was bell-shaped.
In both cases the graphs of the sample mean data
is centered at the population mean.
In both cases the standard error is the
population standard deviation divided by the
square root of the sample size.
Hmmmmm..

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Coincidence?

No, we couldnt be that lucky! In fact, this is
the Central Limit Theorem in action.

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Central Limit Theorem

Suppose that a random sample of size n is taken
from a large population in which the variable you
are measuring has mean and standard deviation
.
Then, provided n is at least 30, the sampling
distribution of the sample means is roughly
bell-shaped, centered at the population mean,
, with standard error equal to .

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Since the graph of sample means will always be
bell-shaped.

68 of the sample means should come within one
standard error of the center (population mean).
95 of the sample means should come within two
standard errors of the center (population mean).
99.7 of the sample means should come within
three standard errors of the center (population
mean).

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Confidence Intervals to Estimate

What is the average number of hours Ship students
sleep per night during final exam week?
Who is the population?
What is the parameter we are interested in
estimating?

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Confidence Intervals, Contd