Condier that is the centre of a group F, So prove thatXEZ <> M(x) = F.and prove that if Fis finite, xeZif and only if o(M(x)) = o(F).=

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Answered: Condier that is the centre of a group…

Condier that is the centre of a group F, So prove that > M(x) = F. and prove that if Fis finite,xe Zif and only if o(M(x)) = o(F). XEZ < =

Elements Of Modern Algebra

8th Edition

ISBN:9781285463230

Author:Gilbert, Linda, Jimmie

Publisher:Gilbert, Linda, Jimmie

Chapter4: More On Groups

Section4.6: Quotient Groups

Problem 30E: Let G be a group with center Z(G)=C. Prove that if G/C is cyclic, then G is abelian.

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Condier that is the centre of a group F, So prove that
XEZ <
> M(x) = F.
and prove that if Fis finite, xeZif and only if o(M(x)) = o(F).
=

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