Wigner 3j symbol recursion relation

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pstq
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Hi all!

Homework Statement


I have to show:

[itex]\sqrt{(j \pm m ) (j \mp m+1} <j_1 j_2 m_1 m_2 | j_1 j_2 j m\mp 1 > = \sqrt{(j_1 \mp m_1 ) (j_1 \pm m_1+1} <j_1 j_2 m_1 \pm1, m_2 | j_1 j_2 j m > +\sqrt{(j_2 \mp m_2 ) (j_2 \pm m_2+1} <j_1 j_2 m_1 , m_2 \pm1 | j_1 j_2 j m >[/itex]


Homework Equations



Wigner 3-j symbols are related to Clebsch–Gordan coefficients through

[itex]\begin{pmatrix}<br /> j_1 & j_2 & j_3\\<br /> m_1 & m_2 & m_3<br /> \end{pmatrix}<br /> \equiv \frac{(-1)^{j_1-j_2-m_3}}{\sqrt{2j_3+1}} \langle j_1 m_1 j_2 m_2 | j_3 \, {-m_3} \rangle[/itex]

[itex]j_3=j, m_3=m[/itex]

The Attempt at a Solution


I've tried to put each term [itex]<j_1 j_2 m_1 \pm1, m_2 | j_1 j_2 j m >[/itex] and [itex]<j_1 j_2 m_1 , m_2 \pm1 | j_1 j_2 j m >[/itex] on the matrix form , but I don't know how i can get the square roots, any idea?

thanks in advance
 
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Do you even need the 3j symbol to do the problem? Hint: try to compute [itex]\langle j_1 j_2 m_1 m_2 | J_\mp | j_1 j_2 j m \rangle[/itex].