Can you have a homomorphism from S3 to the group G' with 35 element?

4. Let f : G→H be a group homomorphism. Suppose a∈G is an element of finite...

4. Let f : G→H be a group homomorphism. Suppose a∈G is an element of finite order n. (a) Prove that f(a) has finite order k, where k is a divisor of n. (b) If f is an isomorphism, prove that k=n.

Let G be a cyclic group, and H be any group. (i) Prove that any homomorphism...

Let G be a cyclic group, and H be any group. (i) Prove that any homomorphism ϕ : G → H is uniquely determined by where it maps a generator of G. In other words, if G = <x> and h ∈ H, then there is at most one homomorphism ϕ : G → H such that ϕ(x) = h. (ii) Why is there ‘at most one’? Give an example where no such homomorphism can exist.

Let G be a group and α : G → H be a homomorphism of groups...

Let G be a group and α : G → H be a homomorphism of groups with H abelian. Show that α factors via G/[G, G], i.e. there exists a homomorphism β : G/[G, G] −→ H, such that α = β◦q, where q : G −→ G/[G, G] is the quotient homomorphis

Suppose G, H be groups and φ : G → H be a group homomorphism. Then...

Suppose G, H be groups and φ : G → H be a group homomorphism. Then the for any subgroup K of G, the image φ (K) = {y ∈ H | y = f(x) for some x ∈ G} is a group a group in H.

Let G be a group and let p be a prime number such that pg =...

Let G be a group and let p be a prime number such that pg = 0 for every element g ∈ G. a.      If G is commutative under multiplication, show that the mapping f : G → G f(x) = xp is a homomorphism b.     If G is an Abelian group under addition, show that the mapping f : G → G f(x) = xpis a homomorphism.

Letφ:G→G′is a group homomorphism. Prove that φ is one-to-one if and only if Ker(φ) ={e}.

Letφ:G→G′is a group homomorphism. Prove that φ is one-to-one if and only if Ker(φ) ={e}.

Let G be a group. g be an element of G. if <g^2>=<g^4> show that order...

Let G be a group. g be an element of G. if <g^2>=<g^4> show that order of g is finite.

Prove the following theorem: Let φ: G→G′ be a group homomorphism, and let H=ker(φ). Let a∈G.Then...

Prove the following theorem: Let φ: G→G′ be a group homomorphism, and let H=ker(φ). Let a∈G.Then the set (φ)^{-1}[{φ(a)}] ={x∈G|φ(x)} =φ(a) is the left coset aH of H, and is also the right coset Ha of H. Consequently, the two partitions of G into left cosets and into right cosets of H are the same

Let G be a group and a be an element of G. Let φ:Z→G be a...

Let G be a group and a be an element of G. Let φ:Z→G be a map defined by φ(n) =a^{n} for all n∈Z. Find the image φ(Z) and prove that φ(Z) a subgroup of G

Find the group homomorphism from Z_14 to A_4, where A4 is the alternating subgroup of S4....

Find the group homomorphism from Z_14 to A_4, where A4 is the alternating subgroup of S4. List the elements of A_4