14. Prove or disprove (a). (H.)( (G, *), and H is an abelian subgroup ⇒ HAG. (b). (H,*) ≤ (G,*), and G is an abelian group = N(H) G. (c). All subgroups of an abelian group are normals. (d). All subgroups of group with prime order are normals. (e). If (G, *) a group and HG such that G/H is finite G is finite. (f). There are 6 normal subgroups in the dihedral group D4. lack o

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14. Prove or disprove (a). (H, (G, *), and H is an abelian subgroup ⇒ HAG. (b), (H. *) ≤ (G, *), and G is an abelian group ⇒ N(H) - G. (c). All subgroups of an abelian group are normals. (d). All subgroups of group with prime order are normals. (e). If (G, *) a group and HG such that G/H is finite G is finite. (f). There are 6 normal subgroups in the dihedral group D₁. lack o