Problem 6: Let K be a proper subgroup of H, and H a proper subgroup of...

Let H and K be subgroups of G. Prove that H ∪ K is a subgroup...

Let H and K be subgroups of G. Prove that H ∪ K is a subgroup of G iff H ⊆ K or K ⊆ H.

Let G be an Abelian group and let H be a subgroup of G Define K...

Let G be an Abelian group and let H be a subgroup of G Define K = { g∈ G | g3 ∈ H }. Prove that K is a subgroup of G .

f H and K are subgroups of a group G, let (H,K) be the subgroup of...

f H and K are subgroups of a group G, let (H,K) be the subgroup of G generated by the elements {hkh−1k−1∣h∈H, k∈K}. Show that : H◃G if and only if (H,G)<H

Let G be a non-trivial finite group, and let H < G be a proper subgroup....

Let G be a non-trivial finite group, and let H < G be a proper subgroup. Let X be the set of conjugates of H, that is, X = {aHa^(−1) : a ∈ G}. Let G act on X by conjugation, i.e., g · (aHa^(−1) ) = (ga)H(ga)^(−1) . Prove that this action of G on X is transitive. Use the previous result to prove that G is not covered by the conjugates of H, i.e., G does not equal...

Let G be a finite group, and suppose that H is normal subgroup of G. Show...

Let G be a finite group, and suppose that H is normal subgroup of G. Show that, for every g ∈ G, the order of gH in G/H must divide the order of g in G. What is the order of the coset [4]42 + 〈[6]42〉 in Z42/〈[6]42〉? Find an example to show that the order of gH in G/H does not always determine the order of g in G. That is, find an example of a group G, and...

Suppose that H is a normal subgroup of G and K is any subgroup of G....

Suppose that H is a normal subgroup of G and K is any subgroup of G. Define HK = {hk : h ? H, k ? K}. (a) Show that HK is a subgroup of G. (b) Does the conclusion of (a) continue to hold if H is not normal in G? Justify

prouve that let H normal subgroup of G and (|G:H|,|H|)=1 H hall subgroup then H characterstic...

prouve that let H normal subgroup of G and (|G:H|,|H|)=1 H hall subgroup then H characterstic G

Let f : G → H be a group isomorphism, and K ⊂ G be a...

Let f : G → H be a group isomorphism, and K ⊂ G be a subgroup. Show that f(K) ⊂ H is a subgroup.

(Abstract algebra) Let G be a group and let H and K be subgroups of G...

(Abstract algebra) Let G be a group and let H and K be subgroups of G so that H is not contained in K and K is not contained in H. Prove that H ∪ K is not a subgroup of G.

Determine if the indicated subgroup H is a normal subgroup of G. (a) Let G =...

Determine if the indicated subgroup H is a normal subgroup of G. (a) Let G = Z and H = 6Z. (b) Let G = A4 and H = {id,(12)(34),(13)(24),(14)(23)}.