1 point let f be a homomorphic mapping of a group g into a group g. let f(g) be the homomorphic image of g in g then a. f(g) is an abelian subgroup of g b. f(g)

1 point Let F be a homomorphic mapping of a group G into a group G. Let F(G) be the homomorphic image of G in G then A. F(G) is an abelian subgroup of G B. F(G)= G C. F(G) is a subgroup of G D. F(G) is a normal subgroup of G OA O B Oc O D 1 point IfG is a finite group andH is a normal subgroup of G, then o is A. OH) o(G) B. o(H) C. o(G) oCH) D. None of these OA O B Oc OD