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Independent and Dependent Probability Independent events - the occurrence of one event has no effect on the probability that a second event will occur. Dependent events, the occurrence of one event does have an effect on the probability that a second event will occur. Insert Lesson Title Here Decide whether the set of events are dependent or independent. 1 Joann flips a coin and gets a head. Then she rolls a 6 on a number cube. independent. 2 Sam chooses a book from the shelf to read, and then Janette chooses a book from the books that remain. dependent. 3 4 Kathy draws a 4 from a set of cards numbered 1–10 and rolls a 2 on a number cube. independent. John draws a card numbered 1–10 and replaces it and draws another card. independent. 5 John draws a card numbered 1–10 and does not replaces it and draws another card. dependent. To find the probability that two independent events will happen, multiply the probabilities of the two events. Probability of Two Independent Events P(A and B) Probability of both events = P(A) Probability of first event X P(B) Probability of second event An experiment consists of spinning this spinner and rolling a number cube. Find the probability. P(red , 4) = 1 4 X 1 6 1 = 24 P(yellow, even number) 1 4 X 3 6 1 3 = 24 = 8 P(not green, odd number) 3 3 9 3 = 8 = X 6 24 4 P(Red or Green, 3 or 2) 1 2 4 2 = 24 = 6 4 X 6 Thomas roles a number cube 3 times. Find the probability of the following. P(3) = 1/6 X 1/6 X 1/6 = 1/216 P(even) = 1/2 X 1/2 X 1/2 = 1/8 Sharon has 4 coins. If Sharon flips all the coins at once, how many outcomes are in the sample space 2 X 2 X 2 X 2 =16 With Replacing P(Yellow then Blue) = 2 • 3 = 1 • 3 = 3 8 8 4 8 32 P(Yellow then Yellow) = P (Pink then not blue) = 2 • 2 =1 • 1 = 1 16 8 8 4 4 0 • 5 = 0 = 0 8 8 64 To find the probability that two dependent events will happen, multiply the probability of A and the probability of B after A occurs. Probability of Two Independent Events P(A and B) Probability of both events = P(A) • P(B following A) Probability of first event Probability of second event after A occurs With Out Replacing P(Yellow then Blue) = 2 • 3 = 1 • 3 = 3 8 7 4 7 28 P(Yellow then Yellow) = P (Purple then Purple) = 2 • 1 =1 • 1 = 1 28 8 7 4 7 1 • 0 = 0 = 0 7 8 56 Mary is getting ready to paint her bedroom. Her mother went to the store and purchased samples for her to choose from. Colors # of samples Red shades Orange Shades 2 4 Yellow Shades 1 If she randomly picks a color sample then does not replace it and picks another color sample, then what is the probability of Mary choosing …… A red shade and then a purple shade? 2 2 • 3 1 • 1 = 1 = 40 15 5 16 8 A blue shade and then a orange shade? Blue Shades 4 4 • 4 = 1 • 41 = 1 15 15 15 16 1 4 A yellow shade and then a yellow shade? Purple Shades 3 Green Shades 1 • 0 15 = 0 16 Assignment Page 423 – 424 Problems 1-9 Page 423 – 424 Problems 1-9, 10 Date _____________ Independent and Dependent Probability Insert Lesson Title Here Decide whether the set of events are dependent or independent. 1 Joann flips a coin and gets a head. Then she rolls a 6 on a number cube. 2 Sam chooses a book from the shelf to read, and then Janette chooses a book from the books that remain. 3 Kathy draws a 4 from a set of cards numbered 1–10 and rolls a 2 on a number cube. 4 John draws a card numbered 1–10 and replaces it and draws another card. 5 John draws a card numbered 1–10 and does not replaces it and draws another card. To find the probability that two independent events will happen, multiply the probabilities of the two events. Probability of Two Independent Events P(A and B) Probability of both events = P(A) Probability of first event X P(B) Probability of second event An experiment consists of spinning this spinner and rolling a number cube. Find the probability. P(red , 4) P(yellow, even number) P(not green, odd number) P(red or green, 3 or 2) Thomas roles a number cube 3 times. Find the probability of the following. P(__) P(______) Sharon has ___ coins. If Sharon flips all the coins at once, how many outcomes are in the sample space To find the probability that two dependent events will happen, multiply the probability of A and the probability of B after A occurs. Probability of Two Independent Events P(A and B) Probability of both events = P(A) • P(B following A) Probability of first event Probability of second event after A occurs With Out Replacing y r b b g b y p P(Yellow then Blue) = P(Yellow then Yellow) = P (Purple then Purple) = Mary is getting ready to paint her bedroom. Her mother went to the store and purchased samples for her to choose from. Colors Red shades Orange Shades # of samples If she randomly picks a color sample then does not replace it and picks another color sample, then what is the probability of Mary choosing …… Yellow Shades A red shade and then a purple shade? Green Shades A blue shade and then a orange shade? Blue Shades Purple Shades A yellow shade and then a yellow shade?
