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Lesson 7.1 Description of the Central Limit
Theorem
The Central
Limit Theorem
The Central Limit Theorem is one of the most
powerful theorems in all of statistics. There are
two alternatives of this theorem: means (or
averages) and sums. Both alternatives are
concerned with drawing finite samples of size n
from a population with a known mean μ and a known
standard deviation σ.
For the first alternative, we collect samples of
size n and calculate the mean or average of each
sample. Then, we construct a histogram of the
sample means. If n is "large enough," then the
histogram will tend to have an approximate bell
shape.
For the second alternative, we collect samples of
size n and calculate the sum of each sample. Then,
we construct a histogram of the sample sums. If n
is "large enough," then the histogram will tend to
have an approximate bell shape.
Facts About the Central
Limit Theorem
Sampling is done with replacement.
We may or may not know the probability
distribution of the original population. We do not
need to know it.
If the original population is far from normal,
then we must take more observations for each
sample and n will be large.
Watch what happens to the graph
as n is increased. Close the window when you
are done viewing the example. You will return
here.
Abbreviation for the
Central Limit Theorem
The abbreviation for the Central Limit Theorem is
CLT.
Please continue to the next section
of this lesson.
Up » 7.1 Central Limit Theorem »
7.2 Central Limit Theorem for Averages »
7.3 Central Limit Theorem for Sums
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