 |  Permutation and Combination 24 Flashcards |  Start |
 | What is the definition of a permutation? |  Card: 1 / 24 |
| A permutation is an arrangement of objects in a specific order. The number of permutations of n distinct objects taken r at a time is calculated using the formula | Card: 2 / 24 |
| What is the formula for the number of combinations of n distinct objects taken r at a time? | Card: 3 / 24 |
| The formula for combinations is | Card: 4 / 24 |
| If you have 7 different shirts and want to choose 4 to wear, how many different combinations can you make? | Card: 5 / 24 |
| Using the combination formula: | Card: 6 / 24 |
Thus, there are 35 ways to choose the shirts. | How many ways can you arrange the letters in the word 'APPLE'? | Card: 7 / 24 |
| Since 'APPLE' has 5 letters with the letter 'P' repeated twice, the arrangements can be calculated using the formula for arrangements of a multiset: 5! / (2!) = 60. Therefore, there are 60 distinct arrangements. | Card: 8 / 24 |
| A basketball team has 12 players. How many ways can a coach choose 5 players to start the game? | Card: 9 / 24 |
| Using the combination formula: | Card: 10 / 24 |
| How many different ways can you arrange 5 books on a shelf? | Card: 11 / 24 |
| The number of ways to arrange 5 distinct books is given by the permutation of all 5 books: P(5, 5) = 5! = 120. Therefore, there are 120 different arrangements. | Card: 12 / 24 |
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| If a committee of 4 is to be formed from 9 members, how many different committees can be formed? | Card: 13 / 24 |
| Using the combination formula: | Card: 14 / 24 |
| How many ways can you arrange the letters in the word 'MISSISSIPPI'? | Card: 15 / 24 |
| The total arrangements of the letters in 'MISSISSIPPI' can be calculated using: | Card: 16 / 24 |
| What is a useful tip for solving permutation and combination problems quickly? | Card: 17 / 24 |
| A useful tip is to identify whether the order of selection matters (permutation) or not (combination). Also, for combinations, remember C(n, r) = C(n, n - r) which can simplify calculations. | Card: 18 / 24 |
| In how many different ways can 10 students be seated in a row of 10 chairs? | Card: 19 / 24 |
| The number of ways to arrange 10 students in 10 chairs is | Card: 20 / 24 |
| How many ways can you select a president, vice president, and secretary from a group of 5 people? | Card: 21 / 24 |
| 60 ways | Card: 22 / 24 |
| How many ways can you select 4 fruits from 10 different fruits if the selection order does not matter?
| Card: 23 / 24 |
| Using the combination formula: | Card: 24 / 24 |
| Completed! Keep practicing to master all of them. |  Restart |
