161-A3.2

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Exercises

  1. (3 points) Let be independent and uniformly distributed random variables over the common alphabet , and define a third random variable as , where is the XOR operation. Show that the three random variables are pairwise independent, but not mutually independent.
  2. (3 points) Show that if is not a deterministic random variable, then is strictly positive.
  3. (2 points) Show that if , then .
  4. (2 points) For , show that if forms a Markov chain, then also forms a Markov chain.