Independent and Identically Distributed Gamma
This web page gives a few examples of the central limit theorem (CLT) in action.
We know the sum of gamma random variables is gamma. The CLT says when the number of terms in the sum is large, this gamma distribution should be approximately normal.
But how large the number of terms in the sum has to be depends on the actual gamma distribution chosen for the terms.
Change the assignments of alpha
and n
in the
first two lines to experiment.
The larger alpha
is, the less skewed the distribution of
the individual terms is and the smaller n
has to be to get
good normal approximation. You should be able to see this for yourself,
if you experiment.
Independent and Identically Distributed Bernoulli Mixture of Normal
In this example, we use a bimodal distribution for the individual terms.
Since there are no brand name
bimodal distributions, we make one
up, the distribution of X + Y when X has
the Bernoulli distribution with success probability p and
X has the normal distribution with mean zero and variance
σ2.
The distribution of the sum of n IID random variables having this distribution is the distribution of X + Y when X has the Binomial(n, p) distribution and X has the Normal(0, n σ2) distribution.
Change the assignments of p
, sigma
,
and n
in the first three lines to experiment.
The closer p
is to one-half, the less skewed the distribution of
the individual terms is and the smaller n
has to be to get
good normal approximation. You should be able to see this for yourself,
if you experiment.
The wiggliness caused by small sigma
is less important.