Problem

Exercise 29 of Section 4 showed that every finite group of even order In contains an eleme...

Exercise 29 of Section 4 showed that every finite group of even order In contains an element of order 2. Using the theorem of Lagrange, show that if n is odd, then an abelian group of order 2n contains precisely one element of order 2.

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Solutions For Problems in Chapter S.10

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