ArielGenesis said:
and so, Nick89, does it means that if I tilt my Lz value into Lz', then i simply not know any of all 3 values, Lx Ly and Lz, but only Lz'?
No, it's worse than that. It's not about
knowing the values. The system won't
have values for those variables. This can be proved by considering a pair of spin 1/2 particles prepared in a state such that if you measure L
z of one of them and get the result +1/2, you know with certainty that a measurement of the other will yield the result -1/2. See e.g.
this.
If your system is in an eigenstate of L
z, and you rotate your coordinate system a bit, then the system is in an eigenstate of \hat n\cdot\vec L, where \hat n is a unit vector determined by the rotation. The eigenstates of this operator can be expressed as
|\hat n\pm\rangle=\frac{1}{\sqrt 2}\Big(|+\rangle+\frac{n_1+n_2}{\sqrt{n_1^2+n_2^2}}\mbox{ sign}(n_3\pm 1)|-\rangle\Big)
where |+> and |-> are the eigenstates of L
z. (I had this already written down, because I calculated this as an excercise some time ago, and made a note. I think I verified that it's correct, but I'm not 100% sure).
