If every element of a group G is its own inverse, then G is
Show Hint
- finite
- infinite
- not abelian
- abelian
The Correct Option is D
Solution and Explanation
$a = a^{-1}$ means $a^2 = e$ for all $a \in G$.
Step 2: Detailed Explanation:
Take any $a,b \in G$. Then $(ab)^2 = e \Rightarrow abab = e$. Multiply on left by $a$: $a(abab) = a \Rightarrow (a^2)bab = a \Rightarrow bab = a$. Multiply on right by $b$: $(bab)b = ab \Rightarrow ba(b^2) = ab \Rightarrow ba = ab$. So $ab = ba$, hence G is abelian.
Step 3: Final Answer:
G is abelian.
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