Let H be a subgroup of G, let a be a fixed element of G, and let K be the set of all ele- ments of the form aha¯', where h E H. That is, K = {x E G|x = aha¯' for some h E H}. Prove or disprove that K is a subgroup of G.

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I need help showing that for any arbitrary pair of elements of K (namely b and c), b x c^-1 is also in K.

(11, Let H be a subgroup of G, let a be a fixed element of G, and let K be the set of all ele-
ments of the form aha¯', where h E H. That is,
1
oo to
K = {x E G|x = aha¯' for some h E H}.
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Prove or disprove that K is a subgroup of G.
Transcribed Image Text:(11, Let H be a subgroup of G, let a be a fixed element of G, and let K be the set of all ele- ments of the form aha¯', where h E H. That is, 1 oo to K = {x E G|x = aha¯' for some h E H}. - %3D Prove or disprove that K is a subgroup of G.
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