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Chapter 11: Problem 79

Explain how to distinguish between permutation and combination problems.

Short Answer

Expert verified
In permutational problems, the order of arrangement matters making different orders distinct solutions, while in combinational problems, the order of selection does not matter. Identifying which situation is applicable is based on whether different orders could produce different and valid outcomes.

Step by step solution

01

Understanding Permutations

Permutations refer to the arrangement of items where the order is important. For instance, imagine you have three books and you want to know how many ways they can be arranged on a shelf. This is a permutation, as changing the order of books results in a different outcome.
02

Understanding Combinations

A combination is a selection of items where order does not matter. For example, if you were to select two books out of your three to take on a trip, the order in which you chose them doesn't affect the final result - you end up with the same two books either way. This is a combination.
03

Distinguishing Between Permutations and Combinations

To discern whether a problem is a permutation or a combination, you need to determine whether changing the order would produce a different and valid outcome. If yes, it's a permutation. If no, it's a combination. For instance, if you are asked to arrange letters to form words, it's a permutation because changing the order of letters gives a different word. If you are asked to choose a team from a group of people, it's a combination because changing the order of selection doesn't affect the team's composition.

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