Phy5645/AngularMomentumExercise: Difference between revisions

Team 2

Suppose that classically, the earth revolves around the sun counter-clockwise in the x-y plane with the sun at the origin. Quantum mechanically, what is the minimum angle the angular momentum vector of the earth can make with the z axis? Ignore the intrinsic spin of the earth. The angular momentum of the earth is ${\displaystyle \ 4.83\cdot 10^{31}J\cdot s}$. Compare the minimum angle with that of a quantum particle with ${\displaystyle \ l=4}$.

Solution:

Recall that in QM: ${\displaystyle \ L=\hbar {\sqrt {l(l+1)}}}$; ${\displaystyle \ L_{z}=m\hbar }$.

The angle ${\displaystyle \ \theta }$ between ${\displaystyle \mathbf {L} }$ and the z-axis fulfills: ${\displaystyle \ \cos \theta ={\frac {L_{z}}{L}}={\frac {m}{\sqrt {l(l+1)}}}}$.

To make ${\displaystyle \ \theta }$ as small as possible, ${\displaystyle \ m}$ must be maximum (${\displaystyle \ l}$ is fixed in this problem). This is when ${\displaystyle \ m=l}$. Therefore, the minimum angle ${\displaystyle \ \alpha }$ obeys: ${\displaystyle \ \cos \alpha ={\frac {l}{\sqrt {l(l+1)}}}}$

We solve ${\displaystyle \ L=\hbar {\sqrt {l(l+1)}}}$ to find ${\displaystyle \ l}$. Since ${\displaystyle \ l}$ will be very large we invoke the approximation: ${\displaystyle \ {\sqrt {l(l+1)}}\approx l{\sqrt {\left(1+{\frac {1}{l}}\right)}}=l+{\frac {1}{2}}}$. We resist the urge to discard the ${\displaystyle {\frac {1}{2}}}$ because without it our result will be trivial. ${\displaystyle \ L=\hbar \left(l+{\frac {1}{2}}\right)}$. Therefore ${\displaystyle \ l={\frac {L}{\hbar }}-{\frac {1}{2}}}$. Plugging this expression into the equation for ${\displaystyle \ \alpha }$ and using the previous approximation again, we have: ${\displaystyle \ \cos \alpha \approx {\frac {l}{l+{\frac {1}{2}}}}={\frac {{\frac {L}{\hbar }}-{\frac {1}{2}}}{\frac {L}{\hbar }}}={\frac {2L-\hbar }{2L}}}$.

${\displaystyle \ \alpha \approx cos^{-1}{\frac {2L-\hbar }{2L}}}$.

Plugging in ${\displaystyle \ L=4.83\cdot 10^{31}J\cdot s}$ and ${\displaystyle \ \hbar =1.055\cdot 10^{-34}J\cdot s}$ we obtain:

${\displaystyle \ \alpha \approx cos^{-1}(0.999999999999999999999999999999999999999999999999999999999999999998908)\approx 1.48\cdot 10^{-33}rad}$.

This is the smallest angle that ${\displaystyle \ \mathbf {L} }$ can make with the z-axis in the case of the earth going around the sun.

In the case of a quantum particle with ${\displaystyle \ l=4}$, we must use the exact expression: ${\displaystyle \ \cos \alpha ={\frac {l}{\sqrt {l(l+1)}}}}$.

${\displaystyle \ \cos \alpha ={\frac {4}{\sqrt {4(4+1)}}}={\frac {4}{\sqrt {4(4+1)}}}={\frac {4}{\sqrt {20}}}={\frac {2}{\sqrt {5}}}}$.

${\displaystyle \ \alpha \approx 0.464rad\approx 26.6\deg }$. This is the smallest angle that the angular momentum vector of a particle with ${\displaystyle \ l=4}$ can make with the z-axis.