Question

(a) Let G be a group of order 4 with identity e. Show that G is either cyclic or a2-e for all (b) Does the result of part (a) generalize to groups of order p2 for any positive integer p? In other words, is it the case that if G is a group of order p2 with identity e, then is either cyclic or a- e for every a E G. Prove your answer (c) Is there any condition on p that will make the answer to the question in part (b) yes? If so, state and prove a conjecture. If no, explain why. (d) Does the result of part (a) generalize to groups of order 2* for any positive integer k2? That is, if G is a group of order 2k for some k e Z with k >2, must it be the case that either G is cyclic or a2-e for every a C? Prove your answer.

(Abstract Algebra) Please answer a-d clearly. Show your work and explain your answer.

Answer 1

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