5.5 EXPECTATION FOR DISCRETE SAMPLE SPACES
For discrete random variables with N outcomes, the expectation 
is given by (5.11). The expectation for a discrete random variable with a countably infinite number of outcomes is derived by considering a sequence of simple random variables as follows. Assume initially that X is nonnegative. It is straightforward to show that a sequence of simple random variables exists that tends to 
in the limit. For example, assume that 
and let 
be the identity mapping so that the outcomes of 
are nonnegative integers. Define the following sequence of simple random variables:
for 
. The outcomes of this sequence of simple random variables are 0, {0, 1}, {0, 1, 2}, and so on. Note that by construction, this sequence is nondecreasing for every : . For example, ...
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