Relevant Classes: Math 493
The First Isomorphism Theorem
Let and be groups and let be a homomorphism. Then the kernel is a normal subgroup of , and
Proof:
Relevant Classes: Math 493
The First Isomorphism Theorem
Let G and H be groups and let ϕ:G→H be a homomorphism. Then the kernel ker(G) is a normal subgroup of G, and G/ker(ϕ)≃H.
Proof: