MAT401H1 Lecture Notes - Lecture 1: Coset, Abelian Group, Cyclic Group

Let G be a group having a finite number of elements. Then For any a in G, there exist n in Z' such that a^n = e. for some n in Z^+, then G has n elements. Let b be the inverse of a in G. If there exists n in Z^+ such that a^n = e, then b ^n not equal e. If a is in G and a^n = e for some n in Z^+, then G is a cyclic group. Which of the following is true there exist a group in which the cancellation law holds. In every cyclic group every element is a generator. a cyclic group has a unique generator. Every group is a subgroup of itself. _______ Which of the following is a cyclic group The set of all integral multiples of 6 under addition. The set of 2 * 2 matrices having integer entries under addition. The set of symmetries of an equilateral triangle under function composition. The Klein 4-group. _________ Which of the following is false Every cyclic group is abelian. Not every abelian group is cyclic. Every group of order less than or equal to 4 is cyclic. If G is a cyclic group then G is isomorphic to Z under addition or to Z_s under addition modulo n where n is a positive integer. ______ Which of the following is false Every permutation is a one-to-one and onto function. The symmetric group S_3 is cyclic. The symmetric group S_10 has 10! Elements. Every subgroup of an abelian group is abelian.

» Notations: Gn is the group of invertible congruence classes mod n. D(n) is the group of symmetries of a regular polygon with n vertices. S(n) is the symmetric group on n symbols. i.e., the group of permutations of {i. . . . , n} 1. Consider the group D(4) (it was described in problem 1 of Hw 11) In (a, b, c), determine weather the given subset H of D(4) is a subgroup is a subgroup, just answer Yes; if it is not, answer No and explain why (b) H-{id, Ri ) (c) H-{id, R1, R2, R3, R4\ (d) What is the order of p? (e) List all elements in the subgroup 〈ρ〉 generated by ρ (f) Is the group D(4) cyclic? Justify your answer