Isomorphism of a Group

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January 25th, 2023

Group theory
Modern Algebra
Group Theory (LV)
Isomorphism of a Group
Automorphism of a Group
Inner Automorphism of a Group

Let G be any group, g a fixed element in G. Define phi:G–> G by phi(x) = gxg^-1.
Prove that phi is an isomorphism of G onto G.

The fully formatted problem is in the attached file.

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