It's better to review this problem in a linear algebra way. You just need to calculate the cross product of two vectors which are in the same plane. Like Lx equals the r vector( in the plane zy) multiply( cross product) the p vector(in the plane zy), fairly easy.
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phi in spherical coordinates should be in this notation arctan(y/x) no arctan(y/z)
Note: two matrices that do not commute can have a common eigenvector
[x,p] = ihbar is a particular case
How can they?
I mean unless you use the commutator factor i h bar and multiply with it the eigen functions won't be Same? No??
why the questions asked by students are omitted from the videos?? there are lot to learn from those questions too
Thanks ❤️🤍
Here I am, a PhD student, taking online undergrad courses. I hope my department does not see how bad of an investment they have made
:))))))))
How to get L^2 is that formidable formula? I still cannot figure out.
Derive the laplacian using spherical coordinates
This is helpful ❤️🤍
How come the d/d phi equation ?
thanku sir
Ihope that you are fine sir .
How to derive lx and y???
Jamshed saeed it’s in the previous video titled 20.3
It's better to review this problem in a linear algebra way. You just need to calculate the cross product of two vectors which are in the same plane. Like Lx equals the r vector( in the plane zy) multiply( cross product) the p vector(in the plane zy), fairly easy.
How to derive Lx and Ly??
zp H from the classical definition L=rxp