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Probability of Compound Events
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compound event combines two or more events, using the word and or the word or. The word “or” in probability means Union of two events The word “and” in probability means the intersection of two events mutually exclusive have no common outcomes. P(A B) = 0 Overlapping events have at least one common outcome. Vocabulary
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The probability is found by summing the individual probabilities of the events: P(A B) = P(A) + P(B) A Venn diagram is used to show mutually exclusive events. Mutually Exclusive Events
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Find the probability that a girl’s favorite department store is Macy’s or Nordstrom. Find the probability that a girl’s favorite store is not JC Penney. Mutually Exclusive Events Macy’s0.25 Saks0.20 Nordstrom0.20 JC Penney0.10 Bloomingdale’s0.25 0.45 0.90
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When rolling two dice, what is probability that your sum will be 4 or 5? Possibilities sum of 4 _____________________________ Possibilities sum of 5 _____________________________ Total possible combinations of rolling 2 die ____________ P(sum4 sum 5) = P(sum5) + P(sum4) Mutually Exclusive Events 7/36 1&3, 2&2, 3&1 1&4, 2&3, 3&2, 4&1 36
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What is the probability of picking a queen or an ace from a deck of cards Mutually Exclusive Events = 2/13 P(Ace) = 4/52 P(QN) = 4/52 P(AUQ) = 8/52
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Probability that overlapping events A or B will occur expressed as: P(M E) = P(M) + P(E) - P(M E) Overlapping Events
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Find the probability of picking a king or a club in a deck of cards. Overlapping Events Kings____ Clubs ____ Kings that are clubs ____ Total Cards ____ 4 13 1 52 P(K C) = P(K) + P(Clubs) – P(kings that are clubs) P(K C) = 4/52 + 13/52 – 1/52 = 16/52= 4/13
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Find the probability of picking a female or a person from Tennessee out of the 31 committee members. Overlapping Events FemMale TN84 AL63 GA73 Females ____ People from TN ____ Females from TM ____ Total People _____ 21 12 8 31
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Independent Events Two events A and B, are independent if A occurs & does not affect the probability of B occurring. Examples- Landing on heads from two different coins, rolling a 4 on a die, then rolling a 3 on a second roll of the die. Probability of A and B occurring: P(A and B) = P(A) ∙ P(B)
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A jar contains three red, five green, two blue and six yellow marbles. A marble is chosen at random from the jar. After replacing it, a second marble is chosen. What is the probability of choosing a green and a yellow marble? P (green) = 5/16 P (green) = 5/16 P (yellow) = 6/16 P (yellow) = 6/16 P (green and yellow) = P (green) P (yellow) P (green and yellow) = P (green) ∙ P (yellow) = 15 / 128 = 15 / 128
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Dependent Events Two events A and B, are dependent if A occurs & affects the probability of B occurring. Examples- Picking a blue marble and then picking another blue marble if I don’t replace the first one. Probability of A and B occurring: P(A and B)=P(A) ∙ P(B given A)
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A random sample of parts coming off a machine is done by an inspector. He found that 5 out of 100 parts are bad on average. If he were to do a new sample, what is the probability that he picks a bad part and then picks another bad part if he doesn’t replace the first? P (bad) = 5/100 P (bad) = 5/100 P (bad given bad) = 4/99 P (bad given bad) = 4/99 P (bad and then bad) = 1/495 P (bad and then bad) = 1/495
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A jar contains three red, five green, two blue and six yellow marbles. A marble is chosen at random from the jar. A second marble is chosen. What is the probability of choosing a green and a yellow marble if the first marble is not replaced? P (green) = 5/16 P (green) = 5/16 P (yellow) = 6/15 P (yellow) = 6/15 P (green and yellow) = P (green) P (yellow) P (green and yellow) = P (green) ∙ P (yellow) = 30 / 240 = 1/8 = 30 / 240 = 1/8
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A jar contains three red, five green, two blue and six yellow marbles. A marble is chosen at random from the jar. A second marble is chosen. What is the probability of choosing a green marble both times if the first marble is not replaced? P (green) = 5/16 P (green) = 5/16 P (green) = 4/15 P (green) = 4/15 P (green and green) = P (green) P (green) P (green and green) = P (green) ∙ P (green) = 20 / 240 = 1/12 = 20 / 240 = 1/12
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P(A or B) = P(A) + P(B)P(A or B) = P(A) + P(B) - P(overlap) P(A and B) = P(A) ∙ P(B)P(A and B) = P(A) ∙ P(B given A) -Drawing a king or a queen -Selecting a male or a female -Selecting a blue or a red marble -Drawing a king or a diamond -rolling an even sum or a sum greater than 10 on two dice -Selecting a female from Georgia or a female from Atlanta WITH REPLACEMNT: -Drawing a king and a queen -Selecting a male and a female -Selecting a blue and a red marble WITHOUT REPLACEMENT: -Drawing a king and a queen -Selecting a male and a female -Selecting a blue and a red marble
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Find Probabilities of Compound Events Example 1 Find the probability of A or B You randomly choose a card from a standard deck of 52 playing cards. Solution a.Choosing a 9 or a King are mutually exclusive events. a.Find the probability that you choose a 9 or a King. b.Find the probability that you choose an Ace or a spade.
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Find Probabilities of Compound Events Example 1 Find the probability of A or B You randomly choose a card from a standard deck of 52 playing cards. Solution b.Because there is an Ace of spades, choosing an Ace or spade are ___________________. There are 4 Aces, 13 spades, and 1 Ace of spades. a.Find the probability that you choose a 9 or a King. overlapping events
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Find Probabilities of Compound Events Example 2 Find the probability of A and B You roll two number cubes. What is the probability that you roll a 1 first and a 2 second? Solution The events are _____________. The number on one number cube does not affect the other. independent P(1) P(2)
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Find Probabilities of Compound Events Example 3 Find the probability of A and B Markers A box contains 8 red markers and 3 blue markers. You choose one marker at random, do not replace it, then choose a second marker at random. What is the probability that both markers are blue? Solution Because you do not replace the first marker, the events are __________. Before you choose a marker, there are 11 markers, 3 of them are blue. After you choose a blue marker, there are 10 markers left and two of them are blue. So, the ______________________ that the second marker is blue given that the first marker is blue, is dependent 3 10 conditional probability
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Find Probabilities of Compound Events Example 3 Find the probability of A and B Markers A box contains 8 red markers and 3 blue markers. You choose one marker at random, do not replace it, then choose a second marker at random. What is the probability that both markers are blue? Solution P(blue) P(blue given blue)
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Find Probabilities of Compound Events 1.In a standard deck of cards, find the probability you randomly select a King of diamonds or a spade. Choosing a King of diamonds or a spade are mutually exclusive events.
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Find Probabilities of Compound Events 2.In Example 3, suppose there are also 4 orange markers in the box. Calculate the probability of selecting a blue marker and then an orange marker, without replacement. P(blue) + P(orange given blue)
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