Addition Rule Mr. Evans Statistics B. Venn Diagram It is often possible to illustrate the various sets or events of an experiment. For this we use Venn.

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Presentation transcript:

Addition Rule Mr. Evans Statistics B

Venn Diagram It is often possible to illustrate the various sets or events of an experiment. For this we use Venn Diagrams. In a Venn Diagram a rectangle is drawn to represent the sample space S. Then all the possible outcomes of a random experiment are contained at points within the rectangle. If we represent two events A and B by circles such that all the elements of A and B respectively are contained within the circles, we can illustrate a number of combined events. Some common events are illustrated and defined in the table on the next slide

Venn Diagrams

Compound Events Compound Event is any event combining 2 or more simple events P(A or B) = P(event A occurs or event B occurs or they both occur)

Mutually Exclusive Two event, A and B, are mutually exclusive if they cannot occur at the same time.

Guided Exercise #1 Decide if the 2 events are mutually exclusive. Event 1: Roll a number less than 3 on a die. Event 2: Roll a 4 on a die. Event 1: Select a Jack from a deck of cards. Event 2: Select a heart from a deck of cards. Mutually Exclusive Not Mutually Exclusive

The Addition Rule The probability that event A or B will occur is given by P(A or B)=P(A)+P(B)-P(A and B) If events A and B are mutually exclusive, then the rule can be simplified to P(A or B)=P(A)+P(B)

Guided Exercise #2 Find the probability that you roll a number less than 3 or a 4. A card is randomly selected from a deck of cards. Find the probability that the card is a Jack or the card is a heart. Roll 1 or 2 Roll 4 JacksHeartsJack of Hearts