In group theory, c6 typically refers to a cyclic group of order 6. This group can be represented as the set of integers modulo 6 under addition, denoted as \(C_6\) or \(Z/6Z\). It is an essential example when classifying groups of small order and connects to concepts like cyclic groups, their subgroups, and the structure of groups based on their orders.
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The cyclic group c6 has exactly one subgroup for each divisor of 6, which are 1, 2, 3, and 6.
The elements of c6 can be represented as \{0, 1, 2, 3, 4, 5\} under addition modulo 6.
The group is abelian, meaning that the group operation (addition) is commutative: for any two elements a and b in c6, \(a + b = b + a\).
Using Sylow's theorems, one can conclude that all groups of order 6 are either isomorphic to c6 or to the symmetric group S3.
The presence of a subgroup of order 3 indicates that c6 contains elements of different orders, specifically elements of order 1, 2, and 3.
Review Questions
How does the structure of the cyclic group c6 help in classifying groups of small order?
The cyclic group c6 serves as a fundamental example in classifying groups due to its unique properties. Specifically, it shows how every element can be generated by a single generator and reveals the number and types of subgroups present based on the divisors of its order. This understanding helps in determining whether other groups of similar small orders might be cyclic or non-cyclic.
Discuss how Sylow's theorems apply to c6 and what implications this has for understanding its subgroup structure.
Sylow's theorems state that if a group has order that is divisible by a prime power, then certain subgroups exist within it. For c6, which has order 6 (with prime factors 2 and 3), Sylow's theorems assure us that there exists at least one subgroup of order 3 and at least one subgroup of order 2. This indicates that c6 not only has these specific subgroups but also provides insight into the group's overall structure and symmetry.
Evaluate the significance of c6 in relation to other groups of small order through comparison and contrast.
c6 plays a significant role in relation to other groups of small order by providing a clear example of an abelian group compared to non-abelian counterparts like S3. Understanding c6 allows us to see how certain characteristics define group behavior—such as commutativity versus non-commutativity—enabling deeper insights into how structures like direct products and semi-direct products form. This comparison enriches our comprehension of group theory as we classify and analyze various groups based on their orders and properties.