Exercise 14.4.22. Let o be a permutation in S„. (a) Show that there exists an integer k > 1 such that ok = o. %3D (b) Show that there exists an integer { > 1 such that oʻ = o-1. (c) Let K be the set of all integers k > 1 such that ơk = 0. Show that K is an infinite set (that is, K has an infinite number of elements).

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Please do Exercise 14.4.22 and do all the parts. Please show step by step and explain

Exercise 14.4.22. Let o be a permutation in S„.
(a) Show that there exists an integer k >1 such that ok = o.
(b) Show that there exists an integer l > 1 such that of = o-1.
(c) Let K be the set of all integers k > 1 such that ok = o. Show that K
is an infinite set (that is, K has an infinite number of elements).
(d) Let L be the set of all integers e > 1 such that of = o-1. Show that L
is an infinite set.
= 0.
(e) What is the relationship between the sets K and L?
Transcribed Image Text:Exercise 14.4.22. Let o be a permutation in S„. (a) Show that there exists an integer k >1 such that ok = o. (b) Show that there exists an integer l > 1 such that of = o-1. (c) Let K be the set of all integers k > 1 such that ok = o. Show that K is an infinite set (that is, K has an infinite number of elements). (d) Let L be the set of all integers e > 1 such that of = o-1. Show that L is an infinite set. = 0. (e) What is the relationship between the sets K and L?
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