Group Theory: Proving Subgroup of Elements of Order 2 and e

HuaYongLi · Feb 4, 2011

Homework Statement

G is a commutative group, prove that the elements of order 2 and the identity element e form a subgroup.

Homework Equations

The Attempt at a Solution

I don't know where to even begin.

ystael · Feb 4, 2011

Given any subset H \subset G, how would you attempt to prove that it is a subgroup of G? What properties of H would you attempt to verify?

HuaYongLi · Feb 5, 2011

Well I guess associativity, unique inverse and identity element are all trivial.
What I'm having trouble with is closure, proving that for any elements a and b in the group, ab is also in the group.

Dickfore · Feb 5, 2011

You need to prove that if a and b are elements of order 2 (i.e. a^{2} = b^{2} = e), then so is c = a b. You need to evaluate c^{2} and use the commutativity of the group.

HuaYongLi · Feb 6, 2011

Thank You

Group Theory: Proving Subgroup of Elements of Order 2 and e

Homework Statement

Homework Equations

The Attempt at a Solution

Thread 'Prove that the integral is equal to ##\pi^2/8##'

Similar threads

Hot Threads

Prove that the integral is equal to ##\pi^2/8##

Calculating radius of gyration of plane figure about x-axis

Solve this problem that involves induction

The volume of a "spherical cap" using triple integrals

Finding the modulus and argument of ##\dfrac{a}{(b±ci)^n}##

Recent Insights

Insights Why Entangled Photon-Polarization Qubits Violate Bell’s Inequality

Insights Quantum Entanglement is a Kinematic Fact, not a Dynamical Effect

Insights What Exactly is Dirac’s Delta Function? - Insight

Insights Relativator (Circular Slide-Rule): Simulated with Desmos - Insight

Insights Fixing Things Which Can Go Wrong With Complex Numbers

Insights Fermat's Last Theorem