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Combinations & Permutations. Essentials: Permutations & Combinations (So that’s how we determine the number of possible samples!). Definitions: Permutation; Factorial; Combination. What a Factorial is and how to use it.
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Essentials:Permutations & Combinations(So that’s how we determine the number of possible samples!) • Definitions: Permutation; Factorial; Combination. • What a Factorial is and how to use it. • Ability to determine the number of permutations or combinations resulting from a stated situation. • Extras here: Tree diagrams & the multiplication rule.
A Tree Diagram systematically lists all possible ways a sequence of events can occur. Advantage: Visual display of sequential events. Disadvantage: Only practical where the number of choices are small. Example: What are the possible results of flipping a coin twice? Tree Diagrams H H T H T T Results: HH HT TH TT
Multiplication Rule (events independent) • In a sequence of n events in which the first event has k1 possibilities, the second event k2, etc. (to kn), the total number of possibilities is k1* k2* …* kn-1* kn. • Example 1: • What are the possible results of flipping a coin twice? • Answer: 2 * 2 = 4 • The Multiplication Rule replaces tree diagrams of any size. Consider the tree diagram that would result from the following example. • Example 2: • What are the dinner possibilities if there are 10 beverages, 6 appetizers, 11 entrees, and 8 desserts? • Answer: 10 * 6 * 11 * 8 = 5,280 dinner possibilities.
Factorials • The Factorial of a number is the multiplication of that number by every smaller number down to 1. • The Factorial Notation is n!, where n represents the number and the “!” indicates the factorial process. • Note the following: By definition 0! = 1 • Example: 8! = 8 * 7 *6 * 5 * 4 * 3 * 2 *1 = 40,320
Permutations • A Permutation is an arrangement of n objects in a specific order using r objects at a time.
Permutations: Examples • Example: A news program has time to present 2 of four available news stories. How many ways can the evening news be set up? • Checking the process: • If we let A, B, C, D represent the four shows, then the possible show orders would be: • AB BA CA DA • AC BC CB DB • AD BD CD DC • Twelve (12) possible presentations where order matters.
Combinations • A combination is the selection of r objects from n objects without regard to order.
Combinations: Examples • Example: A news program has time to present 2 of four available news stories. How many different sets of stories can be presented on the evening news? • Checking the process: • If we let A, B, C, D represent the four shows, then the possible show orders would be: • AB BA CA DA • AC BC CB DB • AD BD CD DC • However, AB and BA represent the presentation of the same two stories. If order does not matter, one of these two may be deleted. Repeating the process results in: AB, AC, AD, BC, BD, CD, • Six (6) different presentations where order does not matter.