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Chapter 11. Probability. Chapter 11: Probability. 11.1 Basic Concepts 11.2 Events Involving “ Not ” and “ Or ” 11.3 Conditional Probability and Events Involving “ And ” 11.4 Binomial Probability 11.5 Expected Value and Simulation. Section 11-3.
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Chapter 11 Probability
Chapter 11: Probability • 11.1 Basic Concepts • 11.2 Events Involving “Not” and “Or” • 11.3 Conditional Probability and Events Involving “And” • 11.4 Binomial Probability • 11.5 Expected Value and Simulation
Section 11-3 • Conditional Probability; Events Involving “And”
Conditional Probability; Events Involving “And” p.605 • Apply the conditional probability formula. • Determine whether two events are independent. • Apply the multiplication rule for the event“A and B.”
Conditional Probability p.605 Sometimes the probability of an event must be computed using the knowledge that some other event has happened (or is happening, or will happen – the timing is not important). This type of probability is called conditional probability.
Conditional Probability p.605 The probability of event B, computed on the assumption that event A has happened, is called the conditional probability of B given Aand is denoted P(B | A).
Example: Selecting From a Set of Numbers p.605 From the sample space S = {2, 3, 4, 5, 6, 7, 8, 9}, a single number is to be selected randomly. Given the events A: selected number is odd, and B: selected number is a multiple of 3 find each probability. a) P(B) b) P(A and B) c) P(B | A)
Example: Selecting From a Set of Numbers Solution a) P(B) B = {3, 6, 9}, so P(B) = 3/8 b) A and B = {3, 5, 7, 9} {3, 6, 9} = {3, 9}, so P(A and B) = 2/8 = 1/4 c) The given condition A reduces the sample space to {3, 5, 7, 9}, so P(B | A) = 2/4 = 1/2
Conditional Probability Formula p.607 The conditional probability of B given Ais calculated as follows.
Example: Finding Probabilities of Boys and Girls in a Family p.607 Given a family with two children, find the probability that both are boys, given that at least one is a boy. Solution Define S = {gg, gb, bg, bb}, A = {gb, bg, bb}, and B = {bb}.
Independent Events p.608 Two events A and B are called independent events if knowledge about the occurrence of one of them has no effect on the probability of the other one, that is, if P(B | A) = P(B), or equivalently P(A | B) = P(A).
Example: Checking Events for Independence p.608 A single card is to be drawn from a standard 52-card deck. Given the events A: the selected card is an ace B: the selected card is red a) Find P(B). b) Find P(B | A). c) Determine whether events A and B are independent.
Example: Checking for Independence Solution c. Because P(B | A) = P(B), events A and B are independent.
Events Involving “And” If we multiply both sides of the conditional probability formula by P(A), we obtain an expression for P(A and B). The calculation of P(A and B) is simpler when A and B are independent.
Multiplication Rule of Probability p.608 If A and B are any two events, then If A and B are independent, then
Example: Selecting From an Urn of Balls p.610 Jeff draws balls from the jar below. He draws two balls without replacement. Find the probability that he draws a red ball and then a blue ball, in that order. 4 red 3 blue 2 yellow
Example: Selecting From an Urn of Balls Solution JAR 4 red 3 blue 2 yellow
Example: Selecting From an Urn of Balls Jeff draws balls from the jar below. He draws two balls, this time with replacement. Find the probability that he gets a red and then a blue ball, in that order. 4 red 3 blue 2 yellow
Example: Selecting From an Urn of Balls Solution Because the ball is replaced, repetitions are allowed. In this case, event B2 is independent of R1. JAR 4 red 3 blue 2 yellow
Example: Selecting from a Deck of Cards p.611 • If five cards are drawn without replacement from a standard 52-card deck, find the probability that they all are hearts. • Solution • Each time a heart is drawn, the number of available cards decreases by one and the number of hearts decreases by one.
Example: Selecting Door Prizes p.613 • Rob is among five door prize winners at a Christmas party. The five winners are asked to choose, without looking, from a bag that, they are told, contains five tokens, four of them redeemable for candy canes and one specific token redeemable for a $100 gift certificate. Can Rob improve his chance of getting the gift certificate by drawing first among the five people?
Example: Selecting Door Prizes • Solution • We denote candy cane by C, gift certificate by G, and first draw, second draw, and so on by subscripts 1, 2, . . . . If Rob draws first, his probability of getting the gift certificate is
Example: Selecting Door Prizes • If he draws second, his probability of getting the gift certificate is
Example: Selecting Door Prizes • For the third draw, • The probability of getting the gift certificate is also 1/5 when drawing fourth or fifth. The order in which the five winners draw does not affect Rob’s chances.