9/6/2023
Chapter 2 - Conditional Probaility and Independence
- Solutions to the Bayes examples on the handout
- Questions on your reading from Chapter 2
- General multiplication rule - see p. 52
- Bayes Rule - see p. 67
- Independence
- In class exercises
- Consider a sample space S of 5 outcomes {w1, w2, w3, w4, and w5} with probabilities P(w1)=1/8, P(w2)=P(w3)=P(w4)=3/16. Let A={w1, w2, w3} and B={w1, w2, w4} and C={w1, w3, w4}.
- Show that P(ABC)=P(A) x P(B) x P(C), but that A, B, and C are not pairwise independent.
- Show that if A, B, C, and D are independent, then AB and CUD are independent.
- Prove the inclusion-exclusion formula for n events.
Please read Sections 3.1 through 3.4 for class on Monday. Our next Problem Session will be on Friday.