Mathematics Exam > Mathematics Questions > Consider the symmetric group S5. Then,a)the n...
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Consider the symmetric group S5. Then,
- a)the number of distinct cycles of length 3 in S5 is 20
- b)the number of distinct cycle of length 2 is 10
- c)the number of elements of order 6 in S5 is 20
- d)the number of element of order 6 in S5 is 10
Correct answer is option 'A,B,C'. Can you explain this answer?
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Consider the symmetric group S5. Then,a)the number of distinct cycles ...
The number of distinct cycles of length 3 in 
The number of distinct cycles of length of 2 in
Now, an element of S5 is of order 6 if and only if it is product of two disjoint cycles of one of length 2 and another of length 3. Further, once a cycle of length 3 the disjoint transposition is uniquely determined. Hence, the number of element of 6 in S5 is 20.
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Consider the symmetric group S5. Then,a)the number of distinct cycles ...
Number of Distinct Cycles of Length 3 in S5: 20
To find the number of distinct cycles of length 3 in S5, we can use the concept of permutations. In the symmetric group S5, each element represents a permutation of the numbers 1 to 5. A cycle of length 3 represents a permutation where three elements are cyclically rearranged.
To calculate the number of distinct cycles of length 3, we can consider the first element in the cycle as fixed and then count the number of ways to arrange the remaining 4 elements in a cycle.
Let's break down the calculation:
1. Choose the first element: We have 5 choices for the first element.
2. Arrange the remaining 4 elements: The remaining 4 elements can be arranged in (4-1)! = 3! = 6 ways.
3. Divide by the number of repetitions: Since the cycle is cyclic, the same cycle can be represented in multiple ways depending on the starting point. For a cycle of length 3, there are 3 possible starting points. So, we divide by 3.
Therefore, the number of distinct cycles of length 3 in S5 can be calculated as:
5 choices for the first element × 6 ways to arrange the remaining elements ÷ 3 possible starting points = 10.
Hence, option A is correct.
Number of Distinct Cycles of Length 2 in S5: 10
Similarly, to find the number of distinct cycles of length 2 in S5, we can follow the same approach.
1. Choose the first element: We have 5 choices for the first element.
2. Arrange the remaining 3 elements: The remaining 3 elements can be arranged in (3-1)! = 2! = 2 ways.
3. Divide by the number of repetitions: Since the cycle is cyclic, the same cycle can be represented in multiple ways depending on the starting point. For a cycle of length 2, there are 2 possible starting points. So, we divide by 2.
Therefore, the number of distinct cycles of length 2 in S5 can be calculated as:
5 choices for the first element × 2 ways to arrange the remaining elements ÷ 2 possible starting points = 5.
Hence, option B is correct.
Number of Elements of Order 6 in S5: 20
The order of an element in a permutation group is the smallest positive integer k such that raising the element to the power of k results in the identity permutation.
To find the number of elements of order 6 in S5, we need to consider the cycles of length 6.
1. Choose the first element: We have 5 choices for the first element.
2. Arrange the remaining 4 elements: The remaining 4 elements can be arranged in (4-1)! = 3! = 6 ways.
3. Divide by the number of repetitions: Since the cycle is cyclic, the same cycle can be represented in multiple ways depending on the starting point. For a cycle of length 6, there are 6 possible starting points. So, we divide by 6.
Therefore, the number of elements of order 6 in S5 can be calculated as:
5 choices for the first element × 6 ways to arrange the remaining elements ÷ 6 possible starting points = 5.
Hence
To find the number of distinct cycles of length 3 in S5, we can use the concept of permutations. In the symmetric group S5, each element represents a permutation of the numbers 1 to 5. A cycle of length 3 represents a permutation where three elements are cyclically rearranged.
To calculate the number of distinct cycles of length 3, we can consider the first element in the cycle as fixed and then count the number of ways to arrange the remaining 4 elements in a cycle.
Let's break down the calculation:
1. Choose the first element: We have 5 choices for the first element.
2. Arrange the remaining 4 elements: The remaining 4 elements can be arranged in (4-1)! = 3! = 6 ways.
3. Divide by the number of repetitions: Since the cycle is cyclic, the same cycle can be represented in multiple ways depending on the starting point. For a cycle of length 3, there are 3 possible starting points. So, we divide by 3.
Therefore, the number of distinct cycles of length 3 in S5 can be calculated as:
5 choices for the first element × 6 ways to arrange the remaining elements ÷ 3 possible starting points = 10.
Hence, option A is correct.
Number of Distinct Cycles of Length 2 in S5: 10
Similarly, to find the number of distinct cycles of length 2 in S5, we can follow the same approach.
1. Choose the first element: We have 5 choices for the first element.
2. Arrange the remaining 3 elements: The remaining 3 elements can be arranged in (3-1)! = 2! = 2 ways.
3. Divide by the number of repetitions: Since the cycle is cyclic, the same cycle can be represented in multiple ways depending on the starting point. For a cycle of length 2, there are 2 possible starting points. So, we divide by 2.
Therefore, the number of distinct cycles of length 2 in S5 can be calculated as:
5 choices for the first element × 2 ways to arrange the remaining elements ÷ 2 possible starting points = 5.
Hence, option B is correct.
Number of Elements of Order 6 in S5: 20
The order of an element in a permutation group is the smallest positive integer k such that raising the element to the power of k results in the identity permutation.
To find the number of elements of order 6 in S5, we need to consider the cycles of length 6.
1. Choose the first element: We have 5 choices for the first element.
2. Arrange the remaining 4 elements: The remaining 4 elements can be arranged in (4-1)! = 3! = 6 ways.
3. Divide by the number of repetitions: Since the cycle is cyclic, the same cycle can be represented in multiple ways depending on the starting point. For a cycle of length 6, there are 6 possible starting points. So, we divide by 6.
Therefore, the number of elements of order 6 in S5 can be calculated as:
5 choices for the first element × 6 ways to arrange the remaining elements ÷ 6 possible starting points = 5.
Hence
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Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer?
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Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer? for Mathematics 2024 is part of Mathematics preparation. The Question and answers have been prepared according to the Mathematics exam syllabus. Information about Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer? covers all topics & solutions for Mathematics 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer?.
Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer? for Mathematics 2024 is part of Mathematics preparation. The Question and answers have been prepared according to the Mathematics exam syllabus. Information about Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer? covers all topics & solutions for Mathematics 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer?.
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Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer?, a detailed solution for Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer? has been provided alongside types of Consider the symmetric group S5. Then,a)the number of distinct cycles of length 3 in S5 is 20b)the number of distinct cycle of length 2 is 10c)the number of elements of order 6 in S5 is 20d)the number of element of order 6 in S5 is 10Correct answer is option 'A,B,C'. Can you explain this answer? theory, EduRev gives you an
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