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§3.2 – Conditional Probability and Independence Mark R. Woodard Furman U 2010 Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 1/6 Outline 1 Conditional Probability 2 Independence 3 Examples and Assignment Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 2/6 Conditional Probability Main Idea The main idea of conditional probability is that knowing some extra information about an experiment might change the probability in a specific way. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 3/6 Conditional Probability Main Idea The main idea of conditional probability is that knowing some extra information about an experiment might change the probability in a specific way. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 3/6 Conditional Probability Main Idea The main idea of conditional probability is that knowing some extra information about an experiment might change the probability in a specific way. For example, if you pick a card out of a deck at random, the probability that the card is from the diamond suit is 1/4, but if you knew somehow that the card was red, then the probability would jump to 1/2. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 3/6 Conditional Probability Main Idea The main idea of conditional probability is that knowing some extra information about an experiment might change the probability in a specific way. For example, if you pick a card out of a deck at random, the probability that the card is from the diamond suit is 1/4, but if you knew somehow that the card was red, then the probability would jump to 1/2. We say that the conditional probability of “diamond” given “red” is 1/2. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 3/6 Conditional Probability Main Idea The main idea of conditional probability is that knowing some extra information about an experiment might change the probability in a specific way. For example, if you pick a card out of a deck at random, the probability that the card is from the diamond suit is 1/4, but if you knew somehow that the card was red, then the probability would jump to 1/2. We say that the conditional probability of “diamond” given “red” is 1/2. The symbolism for this is Pr(A|B) which we read as “the conditional probability of A given B,” or sometimes we simply say “the probability of A given B.” Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 3/6 Conditional Probability Main Idea The main idea of conditional probability is that knowing some extra information about an experiment might change the probability in a specific way. For example, if you pick a card out of a deck at random, the probability that the card is from the diamond suit is 1/4, but if you knew somehow that the card was red, then the probability would jump to 1/2. We say that the conditional probability of “diamond” given “red” is 1/2. The symbolism for this is Pr(A|B) which we read as “the conditional probability of A given B,” or sometimes we simply say “the probability of A given B.” In this symbolism, A and B are events, that is, subsets of the sample space. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 3/6 Conditional Probability Definition The formula for conditional probability is as follows: Pr(A|B) = Mark R. Woodard (Furman U) Pr(A ∩ B) . Pr(B) §3.2 – Conditional Probability and Independence 2010 4/6 Conditional Probability Definition The formula for conditional probability is as follows: Pr(A|B) = Mark R. Woodard (Furman U) Pr(A ∩ B) . Pr(B) §3.2 – Conditional Probability and Independence 2010 4/6 Conditional Probability Definition The formula for conditional probability is as follows: Pr(A|B) = Pr(A ∩ B) . Pr(B) In class, we will dicuss why this is a reasonable formula, but you can take this to be the definition of conditional probability if you like. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 4/6 Conditional Probability Definition The formula for conditional probability is as follows: Pr(A|B) = Pr(A ∩ B) . Pr(B) In class, we will dicuss why this is a reasonable formula, but you can take this to be the definition of conditional probability if you like. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 4/6 Independence Independent Events The following statements turn out to be equivalent: Whenever any of the above are true, we say that A and B are independent events. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Independence Independent Events The following statements turn out to be equivalent: Pr(A ∩ B) = Pr(A) · Pr(B). Whenever any of the above are true, we say that A and B are independent events. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Independence Independent Events The following statements turn out to be equivalent: Pr(A ∩ B) = Pr(A) · Pr(B). Pr(A|B) = Pr(A). Whenever any of the above are true, we say that A and B are independent events. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Independence Independent Events The following statements turn out to be equivalent: Pr(A ∩ B) = Pr(A) · Pr(B). Pr(A|B) = Pr(A). Pr(B|A) = Pr(B). Whenever any of the above are true, we say that A and B are independent events. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Independence Independent Events The following statements turn out to be equivalent: Pr(A ∩ B) = Pr(A) · Pr(B). Pr(A|B) = Pr(A). Pr(B|A) = Pr(B). Whenever any of the above are true, we say that A and B are independent events. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Independence Independent Events The following statements turn out to be equivalent: Pr(A ∩ B) = Pr(A) · Pr(B). Pr(A|B) = Pr(A). Pr(B|A) = Pr(B). Whenever any of the above are true, we say that A and B are independent events. Warning Note that although the word “independent” seems something like the word “disjoint”, they are very different in this context. In particular, if A and B are disjoint, then Pr(A ∩ B) = Pr(φ) = 0, rather than as in the definition above. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Independence Independent Events The following statements turn out to be equivalent: Pr(A ∩ B) = Pr(A) · Pr(B). Pr(A|B) = Pr(A). Pr(B|A) = Pr(B). Whenever any of the above are true, we say that A and B are independent events. Warning Note that although the word “independent” seems something like the word “disjoint”, they are very different in this context. In particular, if A and B are disjoint, then Pr(A ∩ B) = Pr(φ) = 0, rather than as in the definition above. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Independence Independent Events The following statements turn out to be equivalent: Pr(A ∩ B) = Pr(A) · Pr(B). Pr(A|B) = Pr(A). Pr(B|A) = Pr(B). Whenever any of the above are true, we say that A and B are independent events. Warning Note that although the word “independent” seems something like the word “disjoint”, they are very different in this context. In particular, if A and B are disjoint, then Pr(A ∩ B) = Pr(φ) = 0, rather than as in the definition above. You should think of events as being independent when knowing that one occurs doesn’t have any effect on the probability of the other. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 5/6 Examples and Assignment Examples and Assignment Examples: 6, 10, 12, 18, 24. Assignment: Numbers 1, 5, 9, 11, 15, 19, 23, 27, 31. Mark R. Woodard (Furman U) §3.2 – Conditional Probability and Independence 2010 6/6
