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Learn about the definitions of experiments, sample space, and events, as well as the different types of probabilities - theoretical and empirical. Explore properties of events and DeMorgan's Laws, and understand how probability can help with decision-making.
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Definitions • Experiment – a process by which an observation ( or measurement ) is observed • Sample Space (S)- The set of all possible outcomes (or results) of an experiment • Event (E) – a collection of outcomes
Example Experiment : Toss a balanced die once and observe its uppermost face Sample Space =S={1,2,3,4,5,6} Events: 1.observe a even number E= { 2,4,6} 2. observe a number less than or equal to 4 F= { 1,2,3,4}
Probability • Given a event (E) , we would like to assign it a number, P(E) • P(E) is called the probability of E (likelihood that E will occur) • Practical Interpretation The fraction of times that E happens out of a huge number of trials of the same experiment will be close to P(E)
Types of Probabilities • Theoretical • Empirical
Theoretical Probabilities • Used if the outcomes of an experiment are equally likely to occur • If E is an Event
Example • Toss a balanced die once and observe its uppermost face S={1,2,3,4,5,6} Let G=“observe a number divisible by 3” G={3,6} Then P(G)=2/6=1/3
Empirical Probabilities • Used when theoretical probabilities cannot be used • The experiment is repeated large number of times • If E is an Event
Example • The freshman class at ABC college - 770 students - 485 identified themselves as “smokers” Compute the empirical probability that a randomly selected freshman student from this class is not a smoker
Example-contd. • E= event that a randomly chosen student from this class is not a smoker • P(E)= 285/770=0.37
Properties I 1. 2. If E is certain to happen 3. If E and F cannot both happen 4.
Union • Def. The union of two sets, E and F, is the set of outcomes in EorF . • Example: E= { 2,4,6} F= { 1,2,3,4}
Intersection • Def. The intersection of two sets, E and F, is the set of outcomes in EandF . • Example: E= { 2,4,6} F= { 1,2,3,4}
Mutually Exclusive • Def. Two events, E and F, are mutuallyexclusive if they have no outcomes in common, i.e. . • If E and F are mutually exclusive, then
This property can be extended to more than two events. • For any two events, E and F,
Complement of an Event • Def. The complement of an event, E, is the event that E does not happen . • Example: S={1,2,3,4,5,6} • E= { 2,4,6} • Does E and have common outcomes?
Assign probability to each outcome • Each probability must be between 0 and 1 • The sum of the probabilities must be equal to 1 • If the outcomes of an experiment are all equally likely, then the probability of each outcome is given by ,where n is the number of possible outcomes
Project Focus • How can probability help us with the decision on whether or not to attempt a loan work out? Events: S- an attempted work out is successful F- an attempted work out fails Goal: P(S) – Probability of S or fraction of past work out arrangements which were successful P(F) - Probability of F or fraction of past work out arrangements which were unsuccessful?
Using “Countif” function in Excel • Counts the number of cells within a given range that meets the given criteria • Fields for the function • Range • Criteria
More on Events S & F • F is the complement of S Recall:
