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==관련된 개념 및 나중에 더 배우게 되는 것들== | ==관련된 개념 및 나중에 더 배우게 되는 것들== | ||
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==관련있는 다른 과목== | ==관련있는 다른 과목== | ||
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[http://www.mathlove.org/pds/mathqa/faq/combin/-%EC%88%9C%EC%97%B4 ]http://www.mathlove.org/pds/mathqa/faq/combin/-순열 관련 수학사랑 질문 모음음 | [http://www.mathlove.org/pds/mathqa/faq/combin/-%EC%88%9C%EC%97%B4 ]http://www.mathlove.org/pds/mathqa/faq/combin/-순열 관련 수학사랑 질문 모음음 | ||
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==동영상 강좌== | ==동영상 강좌== | ||
| + | |||
| + | == 노트 == | ||
| + | |||
| + | ===위키데이터=== | ||
| + | * ID : [https://www.wikidata.org/wiki/Q161519 Q161519] | ||
| + | ===말뭉치=== | ||
| + | # A permutation is a mathematical technique that determines the number of possible arrangements in a set when the order of the arrangements matters.<ref name="ref_9fa2c7ab">[https://corporatefinanceinstitute.com/resources/knowledge/other/permutation/ Definition, Formula, and Practical Example]</ref> | ||
| + | # This selection of subsets is called a permutation when the order of selection is a factor, a combination when order is not a factor.<ref name="ref_8f32b3ba">[https://www.britannica.com/science/permutation permutations and combinations | Description, Examples, & Formula]</ref> | ||
| + | # Read More on This Topic combinatorics: Binomial coefficients …n objects is called a permutation of n things taken r at a time.<ref name="ref_8f32b3ba" /> | ||
| + | # indistinguishable permutations for each choice of k objects; hence dividing the permutation formula by k!<ref name="ref_8f32b3ba" /> | ||
| + | # In mathematics, a permutation of a set is, loosely speaking, an arrangement of its members into a sequence or linear order, or if the set is already ordered, a rearrangement of its elements.<ref name="ref_364fa5eb">[https://en.wikipedia.org/wiki/Permutation Permutation]</ref> | ||
| + | # This is related to the rearrangement of the elements of S in which each element s is replaced by the corresponding f(s).<ref name="ref_364fa5eb" /> | ||
| + | # The group operation is the composition (performing two given rearrangements in succession), which results in another rearrangement.<ref name="ref_364fa5eb" /> | ||
| + | # As a bijection from a set to itself, a permutation is a function that performs a rearrangement of a set, and is not a rearrangement itself.<ref name="ref_364fa5eb" /> | ||
| + | # Before we discuss permutations we are going to have a look at what the words combination means and permutation.<ref name="ref_2f775480">[https://www.mathplanet.com/education/algebra-2/discrete-mathematics-and-probability/permutations-and-combinations Permutations and combinations (Algebra 2, Discrete mathematics and probability) – Mathplanet]</ref> | ||
| + | # If the order doesn't matter then we have a combination, if the order does matter then we have a permutation.<ref name="ref_2f775480" /> | ||
| + | # Here’s an easy way to remember: permutation sounds complicated, doesn’t it?<ref name="ref_e40625c7">[https://betterexplained.com/articles/easy-permutations-and-combinations/ Easy Permutations and Combinations – BetterExplained]</ref> | ||
| + | # You know, a "combination lock" should really be called a "permutation lock".<ref name="ref_e40625c7" /> | ||
| + | # We’re using the fancy-pants term “permutation”, so we’re going to care about every last detail, including the order of each item.<ref name="ref_e40625c7" /> | ||
| + | # Wait a minute… this is looking a bit like a permutation!<ref name="ref_e40625c7" /> | ||
| + | # To help you to remember, think "Permutation ...<ref name="ref_2a13f8c5">[https://www.mathsisfun.com/combinatorics/combinations-permutations.html Combinations and Permutations]</ref> | ||
| + | # A permutation, also called an "arrangement number" or "order," is a rearrangement of the elements of an ordered list into a one-to-one correspondence with itself.<ref name="ref_7a713d3d">[https://mathworld.wolfram.com/Permutation.html Permutation -- from Wolfram MathWorld]</ref> | ||
| + | # Sedgewick (1977) summarizes a number of algorithms for generating permutations, and identifies the minimum change permutation algorithm of Heap (1963) to be generally the fastest (Skiena 1990, p. 10).<ref name="ref_7a713d3d" /> | ||
| + | # This is denoted , corresponding to the disjoint permutation cycles (2) and (143).<ref name="ref_7a713d3d" /> | ||
| + | # A permutation can be calculated by hand as well, where all the possible permutations are written out.<ref name="ref_6f6231bc">[https://www.investopedia.com/terms/p/permutation.asp Permutation]</ref> | ||
| + | # A simple approach to visualize a permutation is the number of ways a sequence of a three-digit keypad can be arranged.<ref name="ref_6f6231bc" /> | ||
| + | # Both permutation and combinations involve a group of numbers.<ref name="ref_6f6231bc" /> | ||
| + | # A permutation or combination is a set of ordered things.<ref name="ref_10cda419">[https://www.statisticshowto.com/probability-and-statistics/probability-main-index/permutation-combination-formula/ Permutation, Combination and Derangement: Formula, Examples]</ref> | ||
| + | # If you do care about order, it’s a permutation.<ref name="ref_10cda419" /> | ||
| + | # Picking winners for a first, second and third place raffle is a permutation, because the order matters.<ref name="ref_10cda419" /> | ||
| + | # Permutation isn’t a word you use in everyday language.<ref name="ref_10cda419" /> | ||
| + | # Again, this is because order no longer matters, so the permutation equation needs to be reduced by the number of ways the players can be chosen,thenorthen, 2, or 2!.<ref name="ref_fc50ae04">[https://www.calculator.net/permutation-and-combination-calculator.html Permutation and Combination Calculator]</ref> | ||
| + | # It makes sense that there are fewer choices for a combination than a permutation, since the redundancies are being removed.<ref name="ref_fc50ae04" /> | ||
| + | # A permutation refers to an arrangement of elements.<ref name="ref_8cc465e4">[https://www.w3schools.com/python/numpy_random_permutation.asp Random Permutations]</ref> | ||
| + | # Robinson and Schensted found a one to one correspondence between a permutation and a pair of standard Young tableaux of the same shape.<ref name="ref_a0a0ae42">[https://www.sciencedirect.com/topics/mathematics/permutation Permutation - an overview]</ref> | ||
| + | # Given the permutation of (1, …, k) two standard Young tableaux P and Q of the same shape are constructed step by step according to a set of specified rules.<ref name="ref_a0a0ae42" /> | ||
| + | # We start the tableaux P and Q by one box each, with 3 in the box of P and 1 in the box of Q corresponding to the first column entries in the permutation.<ref name="ref_a0a0ae42" /> | ||
| + | # The simplest example of a permutation is the case where all objects need to be arranged, as the introduction did for a , b , c , d .<ref name="ref_9ac4e5b0">[https://brilliant.org/wiki/permutations/ Brilliant Math & Science Wiki]</ref> | ||
| + | # Since each permutation is an ordering, start with an empty ordering which consists of n n n positions in a line to be filled by the n n n objects.<ref name="ref_9ac4e5b0" /> | ||
| + | # A permutation is represented by an array of integers in the range 0 to , where each value occurs once and only once.<ref name="ref_ea4cad65">[https://www.gnu.org/software/gsl/doc/html/permutation.html Permutations — GSL 2.6 documentation]</ref> | ||
| + | # The application of a permutation to a vector yields a new vector where .<ref name="ref_ea4cad65" /> | ||
| + | # For example, the array represents a permutation which exchanges the last two elements of a four element vector.<ref name="ref_ea4cad65" /> | ||
| + | # A permutation is defined by a structure containing two components, the size of the permutation and a pointer to the permutation array.<ref name="ref_ea4cad65" /> | ||
| + | # If the function can determine the next higher permutation, it rearranges the elements as such and returns true .<ref name="ref_17c955fb">[http://www.cplusplus.com/reference/algorithm/next_permutation/ next_permutation]</ref> | ||
| + | # If the function can determine the next higher permutation, it rearranges the elements as such and returns.<ref name="ref_17c955fb" /> | ||
| + | # You may also notice that, according to the permutation formula, the number of permutations for choosing one element is simply n .<ref name="ref_c9497ee2">[https://www.omnicalculator.com/statistics/permutation Permutation Calculator]</ref> | ||
| + | # Examples of 'permutation' in a sentence permutation These examples have been automatically selected and may contain sensitive content.<ref name="ref_60f3dec8">[https://www.collinsdictionary.com/dictionary/english/permutation Permutation definition and meaning]</ref> | ||
| + | # A permutation, also called an “arrangement number” or “order,” is a rearrangement of the elements of an ordered list S into a one-to-one correspondence with S itself.<ref name="ref_846bb98b">[https://www.geeksforgeeks.org/write-a-c-program-to-print-all-permutations-of-a-given-string/ Write a program to print all permutations of a given string]</ref> | ||
| + | # A given permutation of a finite set can be denoted in a variety of ways.<ref name="ref_a242f85d">[https://artofproblemsolving.com/wiki/index.php/Permutation Art of Problem Solving]</ref> | ||
| + | # The most straightforward representation is simply to write down what the permutation looks like.<ref name="ref_a242f85d" /> | ||
| + | # A permutation is a way of counting elements in a set.<ref name="ref_8f512ea8">[https://www.cut-the-knot.org/do_you_know/permutation.shtml Permutations: Introduction]</ref> | ||
| + | # In other words, a permutation is a way of reindexing a set.<ref name="ref_8f512ea8" /> | ||
| + | # Permutation is used when we are counting without replacement and the order matters.<ref name="ref_a8421c8c">[https://www.onlinemathlearning.com/permutations-math.html Permutations P(n,r) (video lessons, examples and solutions)]</ref> | ||
| + | # The following diagrams give the formulas for Permutation, Combination, and Permutation with Repeated Symbols.<ref name="ref_a8421c8c" /> | ||
| + | # Generalizing, we can define permutation as an ordered arrangement of n district objects.<ref name="ref_d80dad6f">[https://accendoreliability.com/permutations-and-combinations/ Permutations and Combinations]</ref> | ||
| + | # Keep in mind that permutation applies when the order matters, and combinations when it does not.<ref name="ref_d80dad6f" /> | ||
| + | # An array may be reordered according to a common permutation of the digits of each of its element indices.<ref name="ref_37004be3">[https://dl.acm.org/doi/abs/10.1145/321941.321949 Array Permutation by Index-Digit Permutation]</ref> | ||
| + | # By examination of this class of permutation in detail, very efficient algorithms for transforming very long arrays are developed.<ref name="ref_37004be3" /> | ||
| + | # A permutation is a collection or a combination of objects from a set where the order or the arrangement of the chosen objects does matter.<ref name="ref_619c8d52">[https://www.toppr.com/guides/maths/permutations-and-combinations/permutations/ Permutation: Definition, Formula, Videos and Solved Examples]</ref> | ||
| + | # Permutation is an assortment or a combination of things from a set where the arrangement of the selected things does matter.<ref name="ref_619c8d52" /> | ||
| + | # With permutation, we consider the order of the elements whereas with combinations we do not consider it.<ref name="ref_619c8d52" /> | ||
| + | # Answer: As we know permutation is the arrangement of all or part of a set of things carrying importance of the order of the arrangement.<ref name="ref_619c8d52" /> | ||
| + | # Permutation and combination are explained here elaborately, along with the difference between them.<ref name="ref_4bfbd10c">[https://byjus.com/maths/permutation-and-combination/ Permutation and Combination (Definition, Formulas & Examples)]</ref> | ||
| + | # In mathematics, permutation relates to the act of arranging all the members of a set into some sequence or order.<ref name="ref_4bfbd10c" /> | ||
| + | # There are many formulas involved in permutation and combination concepts.<ref name="ref_4bfbd10c" /> | ||
| + | # A permutation is used for the list of data (where the order of the data matters) and the combination is used for a group of data (where the order of data doesn’t matter).<ref name="ref_4bfbd10c" /> | ||
| + | # Permutation tests permit us to choose the test statistic best suited to the task at hand.<ref name="ref_307eb8ae">[https://www.springer.com/gp/book/9781475723465 Permutation Tests - A Practical Guide to Resampling Methods for Testing Hypotheses]</ref> | ||
| + | # Flexible, robust in the face of missing data and violations of assump tions, the permutation test is among the most powerful of statistical proce dures.<ref name="ref_307eb8ae" /> | ||
| + | # Through sample size reduction, permutation tests can reduce the costs of experiments and surveys.<ref name="ref_307eb8ae" /> | ||
| + | ===소스=== | ||
| + | <references /> | ||
| + | |||
| + | ==메타데이터== | ||
| + | ===위키데이터=== | ||
| + | * ID : [https://www.wikidata.org/wiki/Q161519 Q161519] | ||
| + | ===Spacy 패턴 목록=== | ||
| + | * [{'LEMMA': 'permutation'}] | ||
| + | * [{'LEMMA': 'arrangement'}] | ||
| + | * [{'LEMMA': 'rearrangement'}] | ||
| + | * [{'LEMMA': 'shuffle'}] | ||
2021년 2월 17일 (수) 03:16 기준 최신판
간단한 요약
서로 다른 n개에서 서로다른 r개를 택하여 순서대로 나열한것.
배우기 전에 알고 있어야 하는 것들
경우의 수
확률
조합
중요한 개념 및 정리
재미있는 문제
관련된 개념 및 나중에 더 배우게 되는 것들
관련있는 다른 과목
관련된 대학교 수학
참고할만한 도서 및 자료
[1]http://www.mathlove.org/pds/mathqa/faq/combin/-순열 관련 수학사랑 질문 모음음
동영상 강좌
노트
위키데이터
- ID : Q161519
말뭉치
- A permutation is a mathematical technique that determines the number of possible arrangements in a set when the order of the arrangements matters.[1]
- This selection of subsets is called a permutation when the order of selection is a factor, a combination when order is not a factor.[2]
- Read More on This Topic combinatorics: Binomial coefficients …n objects is called a permutation of n things taken r at a time.[2]
- indistinguishable permutations for each choice of k objects; hence dividing the permutation formula by k![2]
- In mathematics, a permutation of a set is, loosely speaking, an arrangement of its members into a sequence or linear order, or if the set is already ordered, a rearrangement of its elements.[3]
- This is related to the rearrangement of the elements of S in which each element s is replaced by the corresponding f(s).[3]
- The group operation is the composition (performing two given rearrangements in succession), which results in another rearrangement.[3]
- As a bijection from a set to itself, a permutation is a function that performs a rearrangement of a set, and is not a rearrangement itself.[3]
- Before we discuss permutations we are going to have a look at what the words combination means and permutation.[4]
- If the order doesn't matter then we have a combination, if the order does matter then we have a permutation.[4]
- Here’s an easy way to remember: permutation sounds complicated, doesn’t it?[5]
- You know, a "combination lock" should really be called a "permutation lock".[5]
- We’re using the fancy-pants term “permutation”, so we’re going to care about every last detail, including the order of each item.[5]
- Wait a minute… this is looking a bit like a permutation![5]
- To help you to remember, think "Permutation ...[6]
- A permutation, also called an "arrangement number" or "order," is a rearrangement of the elements of an ordered list into a one-to-one correspondence with itself.[7]
- Sedgewick (1977) summarizes a number of algorithms for generating permutations, and identifies the minimum change permutation algorithm of Heap (1963) to be generally the fastest (Skiena 1990, p. 10).[7]
- This is denoted , corresponding to the disjoint permutation cycles (2) and (143).[7]
- A permutation can be calculated by hand as well, where all the possible permutations are written out.[8]
- A simple approach to visualize a permutation is the number of ways a sequence of a three-digit keypad can be arranged.[8]
- Both permutation and combinations involve a group of numbers.[8]
- A permutation or combination is a set of ordered things.[9]
- If you do care about order, it’s a permutation.[9]
- Picking winners for a first, second and third place raffle is a permutation, because the order matters.[9]
- Permutation isn’t a word you use in everyday language.[9]
- Again, this is because order no longer matters, so the permutation equation needs to be reduced by the number of ways the players can be chosen,thenorthen, 2, or 2!.[10]
- It makes sense that there are fewer choices for a combination than a permutation, since the redundancies are being removed.[10]
- A permutation refers to an arrangement of elements.[11]
- Robinson and Schensted found a one to one correspondence between a permutation and a pair of standard Young tableaux of the same shape.[12]
- Given the permutation of (1, …, k) two standard Young tableaux P and Q of the same shape are constructed step by step according to a set of specified rules.[12]
- We start the tableaux P and Q by one box each, with 3 in the box of P and 1 in the box of Q corresponding to the first column entries in the permutation.[12]
- The simplest example of a permutation is the case where all objects need to be arranged, as the introduction did for a , b , c , d .[13]
- Since each permutation is an ordering, start with an empty ordering which consists of n n n positions in a line to be filled by the n n n objects.[13]
- A permutation is represented by an array of integers in the range 0 to , where each value occurs once and only once.[14]
- The application of a permutation to a vector yields a new vector where .[14]
- For example, the array represents a permutation which exchanges the last two elements of a four element vector.[14]
- A permutation is defined by a structure containing two components, the size of the permutation and a pointer to the permutation array.[14]
- If the function can determine the next higher permutation, it rearranges the elements as such and returns true .[15]
- If the function can determine the next higher permutation, it rearranges the elements as such and returns.[15]
- You may also notice that, according to the permutation formula, the number of permutations for choosing one element is simply n .[16]
- Examples of 'permutation' in a sentence permutation These examples have been automatically selected and may contain sensitive content.[17]
- A permutation, also called an “arrangement number” or “order,” is a rearrangement of the elements of an ordered list S into a one-to-one correspondence with S itself.[18]
- A given permutation of a finite set can be denoted in a variety of ways.[19]
- The most straightforward representation is simply to write down what the permutation looks like.[19]
- A permutation is a way of counting elements in a set.[20]
- In other words, a permutation is a way of reindexing a set.[20]
- Permutation is used when we are counting without replacement and the order matters.[21]
- The following diagrams give the formulas for Permutation, Combination, and Permutation with Repeated Symbols.[21]
- Generalizing, we can define permutation as an ordered arrangement of n district objects.[22]
- Keep in mind that permutation applies when the order matters, and combinations when it does not.[22]
- An array may be reordered according to a common permutation of the digits of each of its element indices.[23]
- By examination of this class of permutation in detail, very efficient algorithms for transforming very long arrays are developed.[23]
- A permutation is a collection or a combination of objects from a set where the order or the arrangement of the chosen objects does matter.[24]
- Permutation is an assortment or a combination of things from a set where the arrangement of the selected things does matter.[24]
- With permutation, we consider the order of the elements whereas with combinations we do not consider it.[24]
- Answer: As we know permutation is the arrangement of all or part of a set of things carrying importance of the order of the arrangement.[24]
- Permutation and combination are explained here elaborately, along with the difference between them.[25]
- In mathematics, permutation relates to the act of arranging all the members of a set into some sequence or order.[25]
- There are many formulas involved in permutation and combination concepts.[25]
- A permutation is used for the list of data (where the order of the data matters) and the combination is used for a group of data (where the order of data doesn’t matter).[25]
- Permutation tests permit us to choose the test statistic best suited to the task at hand.[26]
- Flexible, robust in the face of missing data and violations of assump tions, the permutation test is among the most powerful of statistical proce dures.[26]
- Through sample size reduction, permutation tests can reduce the costs of experiments and surveys.[26]
소스
- ↑ Definition, Formula, and Practical Example
- ↑ 2.0 2.1 2.2 permutations and combinations | Description, Examples, & Formula
- ↑ 3.0 3.1 3.2 3.3 Permutation
- ↑ 4.0 4.1 Permutations and combinations (Algebra 2, Discrete mathematics and probability) – Mathplanet
- ↑ 5.0 5.1 5.2 5.3 Easy Permutations and Combinations – BetterExplained
- ↑ Combinations and Permutations
- ↑ 7.0 7.1 7.2 Permutation -- from Wolfram MathWorld
- ↑ 8.0 8.1 8.2 Permutation
- ↑ 9.0 9.1 9.2 9.3 Permutation, Combination and Derangement: Formula, Examples
- ↑ 10.0 10.1 Permutation and Combination Calculator
- ↑ Random Permutations
- ↑ 12.0 12.1 12.2 Permutation - an overview
- ↑ 13.0 13.1 Brilliant Math & Science Wiki
- ↑ 14.0 14.1 14.2 14.3 Permutations — GSL 2.6 documentation
- ↑ 15.0 15.1 next_permutation
- ↑ Permutation Calculator
- ↑ Permutation definition and meaning
- ↑ Write a program to print all permutations of a given string
- ↑ 19.0 19.1 Art of Problem Solving
- ↑ 20.0 20.1 Permutations: Introduction
- ↑ 21.0 21.1 Permutations P(n,r) (video lessons, examples and solutions)
- ↑ 22.0 22.1 Permutations and Combinations
- ↑ 23.0 23.1 Array Permutation by Index-Digit Permutation
- ↑ 24.0 24.1 24.2 24.3 Permutation: Definition, Formula, Videos and Solved Examples
- ↑ 25.0 25.1 25.2 25.3 Permutation and Combination (Definition, Formulas & Examples)
- ↑ 26.0 26.1 26.2 Permutation Tests - A Practical Guide to Resampling Methods for Testing Hypotheses
메타데이터
위키데이터
- ID : Q161519
Spacy 패턴 목록
- [{'LEMMA': 'permutation'}]
- [{'LEMMA': 'arrangement'}]
- [{'LEMMA': 'rearrangement'}]
- [{'LEMMA': 'shuffle'}]