Let H1 and H2 be finite groups, and let K = H1 × H2 be the product group. Let C1 be a conjugacy class of H1 and C2 be a conjugacy class of H2. Show that C1 × C2 ⊆ K is a conjugacy class and that all conjugacy classes of K are of this form.

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ISBN:9780470458365
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  1. Let H1 and H2 be finite groups, and let K = H1 × H2 be the product group. Let C1 be a conjugacy class of H1 and C2 be a conjugacy class of H2. Show that C1 × C2 ⊆ K is a conjugacy class and that all conjugacy classes of K are of this form.

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