Phy5645/AngularMomentumProblem: Difference between revisions

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We may first rewrite the notation for the system as follows;

|\psi >=1/{\sqrt {5}}|1,-1>+{\sqrt {3/5}}|1,0>+1/{\sqrt {5}}|1,1>

L_{z}

acting on the system produces three values for

l_{z}

;

l_{z}=-\hbar ,0,\hbar

The probablity for finding the value

l_{z}=-\hbar

is;

P_{1}=|<1,-1|\psi >|^{2}=|1/{\sqrt {5}}<1,-1|1,-1>+{\sqrt {3/5}}<1-1|1,0>+1/{\sqrt {5}}<1,-1|1,1>|^{2}

=1/5

This can easily be verified since;

<1,-1|1,0>=<1,-1|1,1>=0

and

<1,-1|1,-1>=1

The probablites of measuring

l_{z}=\hbar ,0

are give as follows;

P_{0}=|<1,0|\psi >|^{2}=|{\sqrt {3/5}}<1,0|1,0>|^{2}=3/5

P_{1}=|<1,1|\psi >|^{2}=|{\sqrt {1/5}}<1,1|1,1>|^{2}=1/5

Now we will calculate the uncertainties

\Delta L_{x}

and

\Delta L_{y}

and the product

\Delta L_{x}\Delta L_{y}

After measuring

l_{z}=-\hbar

the system will be in the eigenstate

|lm>=|1,-1>

, that is

\psi (\theta ,\phi )=Y_{1},_{-}1(\theta ,|\phi )

. We will first calculate the expectation values of

L_{x},L_{y},L_{x}^{2},L_{y}^{2}

using

|1,-1>

. Symmetry requires

<1,-1|L_{x}|1,-1>=<1,-1|L_{y}|1,-1>=0

. Using the relation

l-1

and

m=-1

;

<L_{x}^{2}>=<L_{y}^{2}>=1/2[<L^{2}>-<L_{z}^{2}>]=\hbar ^{2}/2[l(l+1)-m^{2}]=\hbar ^{2}/2

\Delta L_{x}={\sqrt {<L_{x}^{2}>}}=\hbar /{\sqrt {2}}=\Delta L_{y}

Therefore;

\Delta L_{x}\Delta L_{y}={\sqrt {<L_{x}^{2}><L_{y}^{2}>}}=\hbar ^{2}/2

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