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candy colors are equally likely outcomes, here are three equivalent ways of describing the probability function:

      1 0.200.200.200.200.20

      2 

      3 The five colors are equally likely.

      Letting H denote heads and T denote tails, an obvious model for a simple coin toss is upper P left-parenthesis normal upper H right-parenthesis equals upper P left-parenthesis normal upper T right-parenthesis equals 0.50 period

      Actually, there is some extremely small, but nonzero, probability that a coin will land on its side. So perhaps a better model would be

upper P left-parenthesis normal upper H right-parenthesis equals upper P left-parenthesis normal upper T right-parenthesis equals 0.49999999995 and upper P left-parenthesis Side right-parenthesis equals 0.0000000001 period

      Ignoring the possibility of the coin landing on its side, a more general model is

upper P left-parenthesis normal upper H right-parenthesis equals p and upper P left-parenthesis normal upper T right-parenthesis equals 1 minus p comma

      where 0 less-than-or-equal-to p less-than-or-equal-to 1. If p equals 1 slash 2, we say the coin is fair. If p not-equals 1 slash 2 comma we say that the coin is biased. In this text, assume coins are fair unless otherwise specified.

      In a mathematical sense, all of these coin tossing models are “correct” in that they are consistent with the definition of what a probability is. However, we might debate which model most accurately reflects reality and which is most useful for modeling actual coin tosses.

       Example 1.6 Suppose that a college has six majors: biology, geology, physics, dance, art, and music. The percentage of students taking these majors are 20, 20, 5, 10, 10, and 35, respectively, with double majors not allowed. Choose a random student. What is the probability they are a science major?The random experiment is choosing a student. The sample space isThe probability model is given in Table 1.1. The event in question isFinally,

Bio Geo Phy Dan Art Mus
0.20 0.20 0.05 0.10 0.10 0.35

       Example 1.7 In three coin tosses, what is the probability of getting at least two tails?Although the probability model here is not explicitly stated, the simplest and most intuitive model for fair coin tosses is that every outcome is equally likely. As the sample spacehas eight outcomes, the model assigns to each outcome the probability The event of getting at least two tails can be written as This gives

      Events can be combined together to create new events using the connectives “or,” “and,” and “not.” These correspond to the set operations union, intersection, and complement.

      For sets upper A comma upper B subset-of-or-equal-to normal upper Omega, the union upper A union upper B is the set of all elements of normal upper Omega that are in either upper A or upper B or both. The intersection upper A upper B is the set of all elements of normal upper Omega that are in both upper A and upper B. (Another common notation for the intersection of two events is upper A intersection upper B.) The complement upper A Superscript c is the set of all elements of normal upper Omega that are not in upper A.

      One of the most basic, and important, properties of a probability function is the simple addition rule for mutually exclusive events. We say that two events are mutually exclusive, or disjoint, if they have no outcomes in common. That is, upper A and upper B are mutually exclusive if upper A upper B equals empty-set, the empty set.

Description Set notation

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