Let (G, *) and (H, *) be groups. The direct product of G and H is the set G × H equipped with product given by (91, h1) · (92, h2) = (91 * 92, h1 * h2). a. Verify that the direct product (G × H,·) is a group.

Let (G, ) and (H, ) be groups. The direct product of G and H is the set G × H equipped with product given by (91, h1) · (92, h2) = (91 * 92, h1 * h2). a. Verify that the direct product (G × H,·) is a group.

Elements Of Modern Algebra

8th Edition

ISBN:9781285463230

Author:Gilbert, Linda, Jimmie

Publisher:Gilbert, Linda, Jimmie

Chapter3: Groups

Section3.5: Isomorphisms

Problem 33E: Suppose that G and H are isomorphic groups. Prove that G is abelian if and only if H is abelian.

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Question

Let (G, *) and (H, *) be groups. The direct product of G and H is the set G × H equipped with product
given by
(91, h1) · (92, h2) = (91 * 92, h1 * h2).
a. Verify that the direct product (G × H, ') is a group.
b. Prove that G × H is abelian if and only if both G and H are abelian.

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