## Re: [aima-talk] conditional independence chp13

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• It might be easier to think of it as 8 values. For example, these might be the eight values: [.2, .2, .1, .1, .1, .1 .1, .1] Notice that these sum to 1.0
Message 1 of 2 , May 20, 2008
It might be easier to think of it as 8 values.  For example, these might be the eight values:

[.2, .2, .1, .1, .1, .1 .1, .1]

Notice that these sum to 1.0 (since they are mmutually exclusive and exhaustive possibilities).  Because we know they sum to 1.0, if we know the first 7, we must know the last one.  The first 7 sum to .9, so the last one must be .1.  Therefore, if we want to save space, we can drop the last one:

[.2, .2, .1, .1, .1, .1 .1]

There are 7 values, and we can derive the fact that the missing 8th value must be .1.

-Peter

Hi,
In the book p.482 it is mentioned that the full joint distribution
table has seven independent members (2*2*2 - 1 because the number must
sum to 1). I didn't understand why it is 7. the provided explanation is
not clear for me.

Thanks for you cooperation

zayan

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