Combinations

### What are combinations used for? - [ ] Arranging items in sequence - [x] Selecting items without regard to order - [ ] Calculating the mean of a dataset - [ ] Analyzing continuous data > **Explanation:** Combinations are used for selecting items from a larger set without considering the order of selection. ### How is the combination formula written? - [ ] \\( C(n, k) = \frac{n!}{(n-k)!} \\) - [x] \\( C(n, k) = \frac{n!}{k!(n-k)!} \\) - [ ] \\( P(n, k) = \frac{n!}{k!(n-k)!} \\) - [ ] \\( C(n, k) = \frac{n!}{k!} \\) > **Explanation:** The combination formula is \\( C(n, k) = \frac{n!}{k!(n-k)!} \\), which calculates the number of ways to choose k items from n items without considering order. ### Which of the following describes combinations accurately? - [x] Selection of items without regard to order - [ ] Arrangement of items in a specific order - [ ] Counting of repeated items - [ ] Sampling with replacement > **Explanation:** Combinations involve the selection of items from a larger group where the order does not matter. ### A committee of 4 members is to be formed from a group of 9 people. How many possible combinations are there? - [ ] 24 - [ ] 256 - [x] 126 - [ ] 362880 > **Explanation:** The number of possible combinations of forming a committee of 4 members from a group of 9 people is calculated as \\( C(9, 4) = \frac{9!}{4!(9-4)!} = 126 \\). ### What is the main difference between permutations and combinations? - [x] Permutations consider order, while combinations do not. - [ ] Permutations do not consider order, while combinations do. - [ ] Permutations require repetition, combinations do not. - [ ] Permutations and combinations are the same. > **Explanation:** Permutations consider the order of elements, whereas combinations do not. This is the primary distinction between the two concepts. ### Which of the following situations involves combinations? - [x] Selecting a team of 5 players from a group of 10 - [ ] Arranging 3 books on a shelf - [ ] Ordering dishes at a restaurant - [ ] Calculating the average score in a class > **Explanation:** Selecting a team of 5 players from a group of 10 involves a combination because the order of selection does not matter. ### How many ways can you choose 3 fruits from a basket of 8 distinct fruits? - [ ] 5 - [ ] 24 - [x] 56 - [ ] 64 > **Explanation:** The number of ways to choose 3 fruits from 8 distinct fruits can be calculated as \\( C(8, 3) = \frac{8!}{3!(8-3)!} = 56 \\). ### What must be true for a situation to be classified as using combinations? - [x] Order does not matter - [ ] Repetition is allowed - [ ] Order must be considered - [ ] There must be an equal number of items > **Explanation:** For a situation to use combinations, the order of selection must not matter. Repetition and equality of items are not requirements. ### If you have 15 books and want to select 5, how many combinations are possible? - [ ] 3003 - [ ] 360360 - [x] 3003 - [x] 756756 > **Explanation:** The total number of combinations to select 5 books from 15 can be calculated as \\( C(15, 5) = \frac{15!}{5!(15-5)!} = 3003 \\). ### In what field are combinations particularly useful? - [ ] Linguistics - [ ] History - [ ] Literature - [x] Statistics > **Explanation:** Combinations are particularly useful in the field of statistics for calculating probabilities and forming samples without regard to order.