Why Are There an Odd Number of Elements in a Finite Group Where g^3 Equals 1?

Euge · Sep 14, 2019

Here is this week's POTW:

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Show that if $G$ is a finite group, then there are an odd number of elements $g\in G$ for which $g^3 = 1$.

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Remember to read the https://mathhelpboards.com/showthread.php?772-Problem-of-the-Week-%28POTW%29-Procedure-and-Guidelines to find out how to https://mathhelpboards.com/forms.php?do=form&fid=2!

Euge · Sep 25, 2019

This week's problem was solved correctly by castor28. You can read his solution below.

The elements of order $3$ can be grouped in pairs $\{g,g^{-1}\}$. Together with the identity, that makes an odd number of elements satisfying $g^3=1$.

Why Are There an Odd Number of Elements in a Finite Group Where g^3 Equals 1?

Related to Why Are There an Odd Number of Elements in a Finite Group Where g^3 Equals 1?

1. What does "POTW" stand for?

2. What does "Odd No. of Elements" mean?

3. What does $g \in G$ mean?

4. What does $g^3 = 1$ mean?

5. Why is it important to find elements in a group for which $g^3 = 1$?

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