Question

if the group g has four elements show it must be abelian​

Answer 1

Answer:

Prove every group of order 4 is Abelian

Prove every group of order 4 is Abelian3 Answers. All elements in such a group have order 1,2 or 4. If there's an element with order 4, we have a cyclic group – which is abelian. Otherwise, all elements ≠e have order 2, hence there are distinct elements a,b,c such that {e,a,b,c}=G.

Answer 2

Answer:All elements in such a group have order 1,2 or 4. If there's an element with order 4, we have a cyclic group – which is abelian. Otherwise, all elements ≠e have order 2, hence there are distinct elements a,b,c such that {e,a,b,c}=G.

Step-by-step explanation: