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Chapter 14: From Randomness to Probability Sami Sahnoune Amin Henini
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Probability ● probability - an event’s long-run relative frequency ● each trial generates an outcome ● the probability allows us to see general outcomes that would happen in the long run ● independent trial - outcome of one trial doesn’t influence outcome of another ● Law of Large Numbers (LLN) - long-run relative frequency gets closer and closer to true relative frequency as the number of trials increases
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● Random Phenomenon - A phenomenon is random if we know what outcomes could happen, but not which particular values will happen. ● Probability - The probability of an event is a number between 0 and 1 that reports the likelihood of the event’s occurrence. P(A) represents the probability of event A. ● Trial - A single attempt or realization of a random phenomena. ● Outcome - The outcome of a trial is the value measured, observed, or reported for an individual instance of that trial. ● Event- A collection of outcomes. ● Independence - Two events are independent if knowing whether one event occurs does not alter the probability that the other event occurs. ● Disjoint - Two events are disjoint if they share no outcomes in common. Disjoint events are also called “mutually exclusive”. Probability Vocabulary
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Probability and Rules ● probability must be between 0 and 1, inclusive o A probability of 0 indicates impossibility. o A probability of 1 indicates certainty. ●“Something Has to Happen Rule”- Sum of all probabilities must equal one ●Complement Rule- The probability an event will happen is 1 minus the probability it won’t happen
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Probability and Rules ● Addition Rule- If A and B are disjoint events, then the probability of A or B is P(A) + P(B) ● Multiplication Rule- If A and B are independent events, then the probability of A and B is P(A) * P(B)
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Probability Notation ● P( A ∪ B) or P(A or B) ● P(A ∩ B) or P(A and B) ● An important thing to remember is that working with the complement of the event we care about can often be easier.
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Things To Avoid ● Make sure that your probabilities end up adding to one. ● Don’t add probabilities together if they aren’t disjoint. ● Don’t multiply probabilities together if they aren’t independent. ● Don’t mix up disjoint and independent events - disjoint events can’t be independent.
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Summary ●Remember that the probability of one event or multiple events must end up equaling one. If not, then the probabilities that were assigned to the outcomes aren’t legitimate. ●Make sure you remember that LLN only applies to long-run relative frequencies. ●The four rules used to calculate probabilities are: 1. Multiplication Rule 2. Addition Rule 3. “Something Has to Happen” Rule 4. Complement Rule ●These rules can be combined in various ways in order to find the probabilities of complex events.
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Problems 25.Disjoint or Independent? The Masterfoods company says that before the introduction of purple, yellow candies made up 20% of their plain M&M’s, red another 20% and orange, blue, and green each made up 10%. The rest were brown. a. If you draw one M&M, are the events of getting a red one and getting an orange one disjoint or independent or neither? For one draw, the events of getting a red M&M and getting an orange M&M are disjoint events, as you cannot draw both red and orange. b. If you draw two M&M’s one after the other, are the events of getting a red on the first and a red on the second disjoint, independent, or neither? They are independent, since drawing red the first time does not mean you will draw a red one the second time. c. Can disjoint events ever be independent? Explain. Disjoint events can never be independent because in a disjoint event there can only be one outcome. This will affect the probability of all the other outcomes, something which doesn’t happen independent events.
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Problems 27.Dice. You roll a fair die three times. What is the probability that: a) you roll all 6's? P(6) = ⅙, so P(all 6’s) = ( ⅙ )( ⅙ )( ⅙ ) = 0.005 b) you roll all odd numbers? P(odd) = P(1 ∪ 3 ∪ 5) = ½, so P(all odd) = (½)(½)(½) = 0.125 c) none of your rolls gets a number divisible by 3? P(not divisible by 3) = P(1 or 2 or 4 or 5) = 4/6 = ⅔ P(none divisible by 3) = ( ⅔ )( ⅔ )( ⅔ ) = 0.296 d) you roll at least one 5? P(at least one 5) = 1 – P(no 5’s) = 1 - ( ⅚ )( ⅚ )( ⅚ ) = 0.421 e) the numbers you roll are not all 5's? P(not all 5’s) = 1 – P(all 5’s) = 1 - ( ⅙ )( ⅙ )( ⅙ ) = 0.995
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