Show that A4 is normal by finding a homomorphism whose kernel is A4.

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

Let φ : G → G′ be an onto homomorphism and let N be a normal...

Let φ : G → G′ be an onto homomorphism and let N be a normal subgroup of G. Prove that φ(N) is a normal subgroup of G′.

Please explain it in detail. Let φ∶G → H be a homomorphism with H abelian. Show...

Please explain it in detail. Let φ∶G → H be a homomorphism with H abelian. Show that G/ ker φ must be abelian.

Let G and H be groups and f:G--->H be a surjective homomorphism. Let J be a...

Let G and H be groups and f:G--->H be a surjective homomorphism. Let J be a subgroup of H and define f^-1(J) ={x is an element of G| f(x) is an element of J} a. Show ker(f)⊂f^-1(J) and ker(f) is a normal subgroup of f^-1(J) b. Let p: f^-1(J) --> J be defined by p(x) = f(x). Show p is a surjective homomorphism c. Show the set kef(f) and ker(p) are equal d. Show J is isomorphic to f^-1(J)/ker(f)

Kernels on real vectors Let x,z ∈ Rn, show the following is valid kernel: Gaussian or...

Kernels on real vectors Let x,z ∈ Rn, show the following is valid kernel: Gaussian or RBF: k(x, z) = exp(-α ||x - z||2), for α > 0.

Let N1 be a normal subgroup of group G1, and N2 be a normal subgroup of...

Let N1 be a normal subgroup of group G1, and N2 be a normal subgroup of group G2. Use the Fundamental Homomorphism Theorem to show that G1/N1 × G2/N2 ≃ (G1 × G2)/(N1 × N2).

Show that the set is linearly dependent by finding a nontrivial linear combination of vectors in...

Show that the set is linearly dependent by finding a nontrivial linear combination of vectors in the set whose sum is the zero vector. (Use s1, s2, and s3, respectively, for the vectors in the set.) S = {(5, 2), (−1, 1), (2, 0)} a) (0, 0) = b) Express the vector s1 in the set as a linear combination of the vectors s2 and s3. s1 =

The correct formula function to use in Excel when finding probabilities for a normal distribution is...

The correct formula function to use in Excel when finding probabilities for a normal distribution is Norm.dist() Prob.Norm() Norm.Prob() Dist.Norm()

using theorem 11.10 (First Isomorphism Theorem), Show that G1xG2/G1x{e _G2} is iso to G2 Theorem 11.10...

using theorem 11.10 (First Isomorphism Theorem), Show that G1xG2/G1x{e _G2} is iso to G2 Theorem 11.10 First Isomorphism Theorem. If ψ : G → H is a group homomorphism with K = kerψ, then K is normal in G. Let ϕ : G → G/K be the canonical homomorphism. Then there exists a unique isomorphism η : G/K → ψ(G) such that ψ = ηϕ.

Show that the function ? = (? + ?) ?(??), where ? is a function whose...

Show that the function ? = (? + ?) ?(??), where ? is a function whose first order derivative is continuous, satisfies the equation (? + ?) (??x − ??y) = (? − ?)?.