![SOLVED: (a) Show that the canonical commutation relations for the components of the operators r and p are [ri, Pj] = ihOij, [ri, rj] = [pi, Pj] = 0, where the indices](https://cdn.numerade.com/ask_images/8dbeaab48a5a47d488d9843cd3375f0c.jpg "SOLVED: (a) Show that the canonical commutation relations for the components of the operators r and p are [ri, Pj] = ihOij, [ri, rj] = [pi, Pj] = 0, where the indices")
SOLVED: (a) Show that the canonical commutation relations for the components of the operators r and p are [ri, Pj] = ihOij, [ri, rj] = [pi, Pj] = 0, where the indices
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![SOLVED: Consider the Orbital Angular Momentum Operator Z defined by: Lz = ypz - zpy, Lx = 2px - ypx, Ly = ypx - 2py. Using the commutation relations: [x,px] = [yp,z] = [](https://cdn.numerade.com/ask_images/35c644beaa3e40a6b3209c4312ae3b0a.jpg "SOLVED: Consider the Orbital Angular Momentum Operator Z defined by: Lz = ypz - zpy, Lx = 2px - ypx, Ly = ypx - 2py. Using the commutation relations: [x,px] = [yp,z] = [")
SOLVED: Consider the Orbital Angular Momentum Operator Z defined by: Lz = ypz - zpy, Lx = 2px - ypx, Ly = ypx - 2py. Using the commutation relations: [x,px] = [yp,z] = [
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![Tamás Görbe on X: "Commutation relations like this form the basis of quantum mechanics. This example expresses the connection between position (X) and momentum (P): [X,P]=XP-PX=ih/2π, where h is Planck's constant. It](https://pbs.twimg.com/media/E_o9UrsXsAQCKX1?format=png&name=4096x4096 "Tamás Görbe on X: \"Commutation relations like this form the basis of quantum mechanics. This example expresses the connection between position (X) and momentum (P): [X,P]=XP-PX=ih/2π, where h is Planck's constant. It")