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Introduction to Probability Elementary properties of probability • Definition: Probability is the likelihood or chance of an event occurring. • Probability of an event is usually referred to as relative frequency • Probability statements used frequently in biostatistics – e.g., we say that we are 90% probably sure that an observed treatment effect in a study is real; the success probability of this surgery is only 10%; the probability of tumor to develop is 50%...... THE RELATIVE FREQUENCY INTERPRETATION OF PROBABILITY • We are interested in learning about the probability of some event to occur in a certain process based on the number of actual occurrence of that event relative to number of times that process repeated. • For example, our process could be rolling a dice, and we are interested in the probability in the event that the number on the dice is equal to 6. • I did this dice experiment 20 times. Each time I recorded the sum of the two dice and got the following outcomes: results are below: 1 3 2 2 4 6 4 5 3 1 3 5 6 4 2 1 2 5 6 2 Experimental Probability Vs Theoretical Probability • Experimental Probability = 3/20 • Theorotical probability = 1/6 • The theoretical probability is what you expect to happen, but it isn't always what actually happens. • When n increases experimental probability approaches theoretical probability. When n ∞, experimental probability = theoretical probability. In general, the probability of an event can be approximated by the relative frequency , or proportion of times that the event occurs. PROBABILITY (EVENT) is approximately = # of times event occurs/# of experiments THE SUBJECTIVE INTERPRETATION OF PROBABILITY • The relative frequency notion of probability is useful when the process of interest, say tossing a coin, can be repeated many times under similar conditions. But we wish to deal with uncertainty of events from processes that will occur a single time. e.g. probability of a success of a surgery, probability to get A in class. • A subjective probability reflects a person's opinion about the likelihood of an event. Different between people Elementary properties of probability 1. Given some process (or experiment) with n mutually exclusive outcomes (called events), E1, E2, E3, …, En, the probability of any event Ei is assigned a nonnegative number. That is: P( Ei ) 0 • In other words, all events must have a probability of more than or equal to zero (no negative probability) 2. The sum of probabilities of the mutually exclusive outcomes is equal to 1 (exhaustiveness): P( E1 ) P( E2 ) P( E3 ) ...............P( En ) 1 Elementary properties of probability 3. Mutual Exclusiveness: Two or more events are said to be mutually exclusive if the occurrence of any one of them means the others will not occur (That is, we cannot have 2 events occurring at the same time) Mutually exclusive events H Non-Mutually exclusive events A T Example: Tossing a coin: the outcome of head or tail is mutual exclusive events. No way in a certain toss you will have head and tail at the same time. It is either H or T Example: A B B
