Chapter 7: Q.7.12 (page 360)
Let be a sequence of independent random variables having the probability mass function
The random variable is said to have the Cantor distribution.
Find and
The mean value of is
The variance is
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A group of 20 people consisting of 10 men and 10 women is randomly arranged into 10 pairs of 2 each. Compute the expectation and variance of the number of pairs that consist of a man and a woman. Now suppose the 20 people consist of 10 married couples. Compute the mean and variance of the number of married couples that are paired together.
Suppose that and are independent random variables having a common mean . Suppose also that and . The value of is unknown, and it is proposed that be estimated by a weighted average of and . That is, will be used as an estimate of for some appropriate value of . Which value of yields the estimate having the lowest possible variance? Explain why it is desirable to use this value of
Consider a gambler who, at each gamble, either wins or loses her bet with respective probabilities and . A popular gambling system known as the Kelley strategy is to always bet the fraction of your current fortune when . Compute the expected fortune aftergambles of a gambler who starts with units and employs the Kelley strategy.
Let be independent random variables with the common distribution function, and suppose they are independent of , a geometric random variable with a parameter . Let
(a) Findby conditioning on.
(b) Find.
(c) Find
(d) Use (b) and (c) to rederive the probability you found in (a)
Prove Proposition when
and have a joint probability mass function;
and have a joint probability density function and
for all .
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