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Download Name 8-1 Notes IB Math SL Lesson 8
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Name ___________________________ 8-1 Notes IB Math SL Lesson 8-1 Probability Distributions Learning Goa ls: What are the properties of Probability distributions. Random variables Probability Distributions A probability distribution/probability model is a table/chart that displays _________________________ along with their _____________________ __________________. A probability model has two parts: 1) A list of _______________________________________________ and 2) The probability that ______________________________________________. The Probability distribution of a discrete random variable can be given in: Graphical form Table form In functional form as a probability mass function. Example: If you are rolling a die X= P(x) 1 2 3 4 5 6 The value we summarize in a probability distribution is called a _______________________________. This is a variable whose possible values represent the possible outcomes of an experiment, usually in a probability distribution. Notation: We use a _________________________________, like X or Y, to denote a random variable. A specific value of a random variable will be denoted with a lower case letter, in this case x. Properties of Random Variables: Since we are talking about variables and their probabilities the same 2 cardinal rules still hold: 1. 2. Class Data: Data will be collected by each member of the class. Each student will share out the total number of biological siblings they have. Let the random variable X represent the number of siblings each student has. a) What are the possible values that the random variable X can possibly take on? Is this a discrete or continuous random variable? b) What are the values that the random variable X has taken on? c) Draw the probability distribution d) Find P( X 1) . e) Find P( X 2) . f) Find P( X 3) . g) Find P( X 2) . Using the Properties of probability distributions to help us solve! 1. Property used: 2. Property used: 3. Property used: 4. Tabulate the probability distributions for each: a. The number of sixes that are obtained when two ordinary dice are thrown b. The product of the faces when two ordinary dice are thrown. Practice time! 1.
